"subnr" "exp" "block" "trial" "format" "cond" "prob1" "prob2" "val1" "val2" "plot1" "plot2" "vlot1" "vlot2" "resp" "rt" "profit" "gain"
"3101" "exp3" 1 1 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 707 22 1
"3101" "exp3" 1 2 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1300 39 1
"3101" "exp3" 1 3 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1371 33 1
"3101" "exp3" 1 4 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1414 0 0
"3101" "exp3" 1 5 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 940 34 1
"3101" "exp3" 1 6 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 952 32 1
"3101" "exp3" 1 7 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 626 0 0
"3101" "exp3" 1 8 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 721 20 1
"3101" "exp3" 1 9 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1491 27 1
"3101" "exp3" 1 10 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 2224 0 0
"3101" "exp3" 1 11 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1952 30 1
"3101" "exp3" 1 12 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1193 41 1
"3101" "exp3" 1 13 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 638 14 1
"3101" "exp3" 1 14 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 540 19 1
"3101" "exp3" 1 15 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 771 18 1
"3101" "exp3" 1 16 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 676 33 1
"3101" "exp3" 1 17 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 557 13 1
"3101" "exp3" 1 18 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 534 8 1
"3101" "exp3" 1 19 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1850 69 1
"3101" "exp3" 1 20 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 941 35 1
"3101" "exp3" 1 21 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1939 66 1
"3101" "exp3" 1 22 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 853 10 1
"3101" "exp3" 1 23 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1718 28 1
"3101" "exp3" 1 24 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1093 38 1
"3101" "exp3" 1 25 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 943 17 1
"3101" "exp3" 1 26 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 764 0 0
"3101" "exp3" 1 27 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 670 0 0
"3101" "exp3" 1 28 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1450 0 0
"3101" "exp3" 1 29 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 961 9 1
"3101" "exp3" 1 30 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 607 12 1
"3101" "exp3" 1 31 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 494 4 1
"3101" "exp3" 1 32 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 3195 0 0
"3101" "exp3" 1 33 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 961 22 1
"3101" "exp3" 1 34 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1066 37 1
"3101" "exp3" 1 35 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 3808 0 0
"3101" "exp3" 1 36 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1051 13 1
"3101" "exp3" 1 37 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 713 25 1
"3101" "exp3" 1 38 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 533 15 1
"3101" "exp3" 1 39 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 524 23 1
"3101" "exp3" 1 40 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 603 25 1
"3101" "exp3" 1 41 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1408 0 0
"3101" "exp3" 1 42 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 749 0 0
"3101" "exp3" 1 43 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1107 24 1
"3101" "exp3" 1 44 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 621 28 1
"3101" "exp3" 1 45 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 639 27 1
"3101" "exp3" 1 46 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 706 5 1
"3101" "exp3" 1 47 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 774 21 1
"3101" "exp3" 1 48 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 779 28 1
"3101" "exp3" 1 49 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 761 30 1
"3101" "exp3" 1 50 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 561 5 1
"3101" "exp3" 1 51 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1115 0 0
"3101" "exp3" 1 52 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 657 24 1
"3101" "exp3" 1 53 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 3171 0 0
"3101" "exp3" 1 54 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1533 30 1
"3101" "exp3" 1 55 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 712 0 0
"3101" "exp3" 1 56 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 650 0 0
"3101" "exp3" 1 57 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 653 18 1
"3101" "exp3" 1 58 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 555 0 0
"3101" "exp3" 1 59 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 768 30 1
"3101" "exp3" 1 60 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 779 32 1
"3101" "exp3" 1 61 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 734 29 1
"3101" "exp3" 1 62 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 715 11 1
"3101" "exp3" 1 63 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 561 31 1
"3101" "exp3" 1 64 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 618 0 0
"3101" "exp3" 1 65 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 711 7 1
"3101" "exp3" 1 66 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 594 6 1
"3101" "exp3" 1 67 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 888 0 0
"3101" "exp3" 1 68 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 730 3 1
"3101" "exp3" 1 69 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1280 39 1
"3101" "exp3" 1 70 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 606 19 1
"3101" "exp3" 1 71 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 655 22 1
"3101" "exp3" 1 72 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1156 16 1
"3101" "exp3" 1 73 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1113 0 0
"3101" "exp3" 1 74 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1160 48 1
"3101" "exp3" 1 75 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1081 7 1
"3101" "exp3" 1 76 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 777 21 1
"3101" "exp3" 1 77 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 890 28 1
"3101" "exp3" 1 78 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 853 22 1
"3101" "exp3" 1 79 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 946 32 1
"3101" "exp3" 1 80 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 814 15 1
"3101" "exp3" 1 81 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 912 21 1
"3101" "exp3" 1 82 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 978 2 1
"3101" "exp3" 1 83 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1205 0 0
"3101" "exp3" 1 84 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 806 20 1
"3101" "exp3" 1 85 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 812 33 1
"3101" "exp3" 1 86 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 723 9 1
"3101" "exp3" 1 87 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1168 27 1
"3101" "exp3" 1 88 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2246 40 1
"3101" "exp3" 1 89 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1128 19 1
"3101" "exp3" 1 90 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 5634 0 0
"3101" "exp3" 1 91 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 3795 69 1
"3101" "exp3" 1 92 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1663 0 0
"3101" "exp3" 1 93 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 766 14 1
"3101" "exp3" 1 94 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 591 1 1
"3101" "exp3" 1 95 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 865 17 1
"3101" "exp3" 1 96 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1070 26 1
"3101" "exp3" 1 97 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1375 0 0
"3101" "exp3" 1 98 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 3245 0 0
"3101" "exp3" 1 99 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1153 43 1
"3101" "exp3" 1 100 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1082 0 0
"3101" "exp3" 1 101 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 2058 23 1
"3101" "exp3" 1 102 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 774 13 1
"3101" "exp3" 1 103 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1225 29 1
"3101" "exp3" 1 104 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 677 0 0
"3101" "exp3" 1 105 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1057 6 1
"3101" "exp3" 1 106 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 973 15 1
"3101" "exp3" 1 107 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 955 24 1
"3101" "exp3" 1 108 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 837 21 1
"3101" "exp3" 1 109 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1121 0 0
"3101" "exp3" 1 110 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1974 0 0
"3101" "exp3" 1 111 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 965 23 1
"3101" "exp3" 1 112 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 759 42 1
"3101" "exp3" 1 113 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 774 37 1
"3101" "exp3" 1 114 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 833 44 1
"3101" "exp3" 1 115 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 783 20 1
"3101" "exp3" 1 116 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 751 40 1
"3101" "exp3" 1 117 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 655 18 1
"3101" "exp3" 1 118 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 651 26 1
"3101" "exp3" 1 119 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 991 0 0
"3101" "exp3" 1 120 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 730 35 1
"3101" "exp3" 1 121 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 672 11 1
"3101" "exp3" 1 122 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 740 26 1
"3101" "exp3" 1 123 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 671 8 1
"3101" "exp3" 1 124 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 735 43 1
"3101" "exp3" 1 125 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 573 36 1
"3101" "exp3" 1 126 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 588 16 1
"3101" "exp3" 1 127 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 888 16 1
"3101" "exp3" 1 128 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 542 14 1
"3101" "exp3" 1 129 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1098 44 1
"3101" "exp3" 1 130 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 651 20 1
"3101" "exp3" 1 131 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 905 33 1
"3101" "exp3" 1 132 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 701 27 1
"3101" "exp3" 2 1 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 859 24 1
"3101" "exp3" 2 2 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 674 33 1
"3101" "exp3" 2 3 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 764 44 1
"3101" "exp3" 2 4 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 741 19 1
"3101" "exp3" 2 5 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 577 20 1
"3101" "exp3" 2 6 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2133 0 0
"3101" "exp3" 2 7 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1207 13 1
"3101" "exp3" 2 8 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 804 30 1
"3101" "exp3" 2 9 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1692 42 1
"3101" "exp3" 2 10 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1470 20 1
"3101" "exp3" 2 11 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1846 31 1
"3101" "exp3" 2 12 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 744 33 1
"3101" "exp3" 2 13 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 680 30 1
"3101" "exp3" 2 14 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 780 37 1
"3101" "exp3" 2 15 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 616 21 1
"3101" "exp3" 2 16 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 683 24 1
"3101" "exp3" 2 17 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 775 0 0
"3101" "exp3" 2 18 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 641 0 0
"3101" "exp3" 2 19 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 773 10 1
"3101" "exp3" 2 20 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1070 23 1
"3101" "exp3" 2 21 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 663 25 1
"3101" "exp3" 2 22 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 752 21 1
"3101" "exp3" 2 23 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2634 0 0
"3101" "exp3" 2 24 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 630 7 1
"3101" "exp3" 2 25 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 797 0 0
"3101" "exp3" 2 26 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 645 0 0
"3101" "exp3" 2 27 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 666 0 0
"3101" "exp3" 2 28 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1912 0 0
"3101" "exp3" 2 29 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 809 0 0
"3101" "exp3" 2 30 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1657 0 0
"3101" "exp3" 2 31 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 763 0 0
"3101" "exp3" 2 32 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 827 0 0
"3101" "exp3" 2 33 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1251 14 1
"3101" "exp3" 2 34 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 4024 0 0
"3101" "exp3" 2 35 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 3842 43 1
"3101" "exp3" 2 36 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 3191 38 1
"3101" "exp3" 2 37 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 3258 84 1
"3101" "exp3" 2 38 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1610 0 0
"3101" "exp3" 2 39 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1249 0 0
"3101" "exp3" 2 40 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 2525 0 0
"3101" "exp3" 2 41 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 5354 21 1
"3101" "exp3" 2 42 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 618 9 1
"3101" "exp3" 2 43 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 639 0 0
"3101" "exp3" 2 44 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 794 39 1
"3101" "exp3" 2 45 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1346 26 1
"3101" "exp3" 2 46 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2328 0 0
"3101" "exp3" 2 47 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 2205 27 1
"3101" "exp3" 2 48 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1179 35 1
"3101" "exp3" 2 49 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1285 0 0
"3101" "exp3" 2 50 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 2639 28 1
"3101" "exp3" 2 51 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 3828 39 1
"3101" "exp3" 2 52 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 3211 83 1
"3101" "exp3" 2 53 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 4612 18 1
"3101" "exp3" 2 54 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1210 15 1
"3101" "exp3" 2 55 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 4896 0 0
"3101" "exp3" 2 56 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 3009 22 1
"3101" "exp3" 2 57 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1765 25 1
"3101" "exp3" 2 58 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 841 29 1
"3101" "exp3" 2 59 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 862 0 0
"3101" "exp3" 2 60 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1383 0 0
"3101" "exp3" 2 61 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 4408 0 0
"3101" "exp3" 2 62 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 4466 0 0
"3101" "exp3" 2 63 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 1707 72 1
"3101" "exp3" 2 64 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2976 0 0
"3101" "exp3" 2 65 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1875 17 1
"3101" "exp3" 2 66 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1721 45 1
"3101" "exp3" 2 67 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 3245 0 0
"3101" "exp3" 2 68 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1078 14 1
"3101" "exp3" 2 69 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 2426 17 1
"3101" "exp3" 2 70 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1244 0 0
"3101" "exp3" 2 71 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 2802 0 0
"3101" "exp3" 2 72 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 3116 24 1
"3101" "exp3" 2 73 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1313 34 1
"3101" "exp3" 2 74 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 2192 0 0
"3101" "exp3" 2 75 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2304 0 0
"3101" "exp3" 2 76 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 4133 0 0
"3101" "exp3" 2 77 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 5002 0 0
"3101" "exp3" 2 78 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2387 92 1
"3101" "exp3" 2 79 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 5406 31 1
"3101" "exp3" 2 80 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 3188 22 1
"3101" "exp3" 2 81 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 2038 32 1
"3101" "exp3" 2 82 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1404 26 1
"3101" "exp3" 2 83 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1309 45 1
"3101" "exp3" 2 84 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2022 40 1
"3101" "exp3" 2 85 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2535 0 0
"3101" "exp3" 2 86 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 2539 23 1
"3101" "exp3" 2 87 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 3366 26 1
"3101" "exp3" 2 88 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 3709 0 0
"3101" "exp3" 2 89 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 8548 0 0
"3101" "exp3" 2 90 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 2436 0 0
"3101" "exp3" 2 91 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 4605 43 1
"3101" "exp3" 2 92 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1495 33 1
"3101" "exp3" 2 93 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1164 0 0
"3101" "exp3" 2 94 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1450 87 1
"3101" "exp3" 2 95 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1572 37 1
"3101" "exp3" 2 96 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1266 22 1
"3101" "exp3" 2 97 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1505 0 0
"3101" "exp3" 2 98 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 4949 31 1
"3101" "exp3" 2 99 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 866 27 1
"3101" "exp3" 2 100 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1365 0 0
"3101" "exp3" 2 101 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 3190 0 0
"3101" "exp3" 2 102 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1225 36 1
"3101" "exp3" 2 103 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1816 18 1
"3101" "exp3" 2 104 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2076 0 0
"3101" "exp3" 2 105 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1295 41 1
"3101" "exp3" 2 106 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1773 16 1
"3101" "exp3" 2 107 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 4669 36 1
"3101" "exp3" 2 108 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 797 17 1
"3101" "exp3" 2 109 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1277 29 1
"3101" "exp3" 2 110 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1025 0 0
"3101" "exp3" 2 111 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1406 0 0
"3101" "exp3" 2 112 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1024 28 1
"3101" "exp3" 2 113 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1050 93 1
"3101" "exp3" 2 114 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 3753 44 1
"3101" "exp3" 2 115 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 2148 0 0
"3101" "exp3" 2 116 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1423 20 1
"3101" "exp3" 2 117 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2320 0 0
"3101" "exp3" 2 118 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 10634 49 1
"3101" "exp3" 2 119 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 868 0 0
"3101" "exp3" 2 120 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1015 35 1
"3101" "exp3" 2 121 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 3081 19 1
"3101" "exp3" 2 122 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1320 21 1
"3101" "exp3" 2 123 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1924 0 0
"3101" "exp3" 2 124 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 2818 0 0
"3101" "exp3" 2 125 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 2885 0 0
"3101" "exp3" 2 126 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1127 0 0
"3101" "exp3" 2 127 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 2030 0 0
"3101" "exp3" 2 128 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1783 28 1
"3101" "exp3" 2 129 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 3520 0 0
"3101" "exp3" 2 130 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1663 0 0
"3101" "exp3" 2 131 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2754 34 1
"3101" "exp3" 2 132 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1346 40 1
"3101" "exp3" 1 1 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 523 0 0
"3101" "exp3" 1 2 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 613 6 1
"3101" "exp3" 1 3 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 412 19 1
"3101" "exp3" 1 4 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 471 20 1
"3101" "exp3" 1 5 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 896 18 1
"3101" "exp3" 1 6 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 491 15 1
"3101" "exp3" 1 7 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 618 16 1
"3101" "exp3" 1 8 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 436 0 0
"3101" "exp3" 1 9 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 376 49 1
"3101" "exp3" 1 10 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 498 14 1
"3101" "exp3" 1 11 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 486 0 0
"3101" "exp3" 1 12 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 504 0 0
"3101" "exp3" 1 13 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 598 0 0
"3101" "exp3" 1 14 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 579 37 1
"3101" "exp3" 1 15 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 554 15 1
"3101" "exp3" 1 16 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 464 47 1
"3101" "exp3" 1 17 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 506 0 0
"3101" "exp3" 1 18 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 950 45 1
"3101" "exp3" 1 19 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 534 37 1
"3101" "exp3" 1 20 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 451 20 1
"3101" "exp3" 1 21 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 907 26 1
"3101" "exp3" 1 22 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 504 43 1
"3101" "exp3" 1 23 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 461 4 1
"3101" "exp3" 1 24 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 447 6 1
"3101" "exp3" 1 25 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 449 26 1
"3101" "exp3" 1 26 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 698 0 0
"3101" "exp3" 1 27 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 524 31 1
"3101" "exp3" 1 28 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 498 36 1
"3101" "exp3" 1 29 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 499 43 1
"3101" "exp3" 1 30 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 418 22 1
"3101" "exp3" 1 31 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 615 35 1
"3101" "exp3" 1 32 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 487 27 1
"3101" "exp3" 1 33 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 489 0 0
"3101" "exp3" 1 34 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 444 17 1
"3101" "exp3" 1 35 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 465 0 0
"3101" "exp3" 1 36 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 431 19 1
"3101" "exp3" 1 37 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 387 28 1
"3101" "exp3" 1 38 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 514 25 1
"3101" "exp3" 1 39 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 624 30 1
"3101" "exp3" 1 40 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 516 41 1
"3101" "exp3" 1 41 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 375 48 1
"3101" "exp3" 1 42 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 356 22 1
"3101" "exp3" 1 43 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 416 24 1
"3101" "exp3" 1 44 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 378 7 1
"3101" "exp3" 1 45 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 391 17 1
"3101" "exp3" 1 46 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 308 23 1
"3101" "exp3" 1 47 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 578 10 1
"3101" "exp3" 1 48 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 408 29 1
"3101" "exp3" 1 49 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 462 34 1
"3101" "exp3" 1 50 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 373 12 1
"3101" "exp3" 1 51 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 477 0 0
"3101" "exp3" 1 52 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 403 35 1
"3101" "exp3" 1 53 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 441 25 1
"3101" "exp3" 1 54 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 397 0 0
"3101" "exp3" 1 55 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 482 0 0
"3101" "exp3" 1 56 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 378 13 1
"3101" "exp3" 1 57 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 436 37 1
"3101" "exp3" 1 58 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 484 17 1
"3101" "exp3" 1 59 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1147 0 0
"3101" "exp3" 1 60 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 405 0 0
"3101" "exp3" 1 61 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 410 11 1
"3101" "exp3" 1 62 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 454 29 1
"3101" "exp3" 1 63 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 413 0 0
"3101" "exp3" 1 64 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 487 0 0
"3101" "exp3" 1 65 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 380 42 1
"3101" "exp3" 1 66 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 374 0 0
"3101" "exp3" 1 67 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 491 0 0
"3101" "exp3" 1 68 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 420 33 1
"3101" "exp3" 1 69 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 422 16 1
"3101" "exp3" 1 70 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 402 13 1
"3101" "exp3" 1 71 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 450 21 1
"3101" "exp3" 1 72 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 501 12 1
"3101" "exp3" 1 73 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 446 8 1
"3101" "exp3" 1 74 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 651 31 1
"3101" "exp3" 1 75 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 524 0 0
"3101" "exp3" 1 76 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 493 28 1
"3101" "exp3" 1 77 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 457 20 1
"3101" "exp3" 1 78 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 555 9 1
"3101" "exp3" 1 79 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 474 23 1
"3101" "exp3" 1 80 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 429 44 1
"3101" "exp3" 1 81 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 497 0 0
"3101" "exp3" 1 82 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 407 32 1
"3101" "exp3" 1 83 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 521 26 1
"3101" "exp3" 1 84 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 349 21 1
"3101" "exp3" 1 85 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 451 18 1
"3101" "exp3" 1 86 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 356 0 0
"3101" "exp3" 1 87 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 530 22 1
"3101" "exp3" 1 88 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 576 0 0
"3101" "exp3" 1 89 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 709 11 1
"3101" "exp3" 1 90 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 464 38 1
"3101" "exp3" 1 91 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 351 17 1
"3101" "exp3" 1 92 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 338 24 1
"3101" "exp3" 1 93 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 287 77 1
"3101" "exp3" 1 94 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 506 27 1
"3101" "exp3" 1 95 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 559 30 1
"3101" "exp3" 1 96 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 746 46 1
"3101" "exp3" 1 97 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 461 32 1
"3101" "exp3" 1 98 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 476 36 1
"3101" "exp3" 1 99 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 450 8 1
"3101" "exp3" 1 100 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 511 21 1
"3101" "exp3" 1 101 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 551 0 0
"3101" "exp3" 1 102 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 454 25 1
"3101" "exp3" 1 103 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 466 38 1
"3101" "exp3" 1 104 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 569 32 1
"3101" "exp3" 1 105 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 510 0 0
"3101" "exp3" 1 106 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 639 5 1
"3101" "exp3" 1 107 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 440 35 1
"3101" "exp3" 1 108 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 659 0 0
"3101" "exp3" 1 109 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 500 30 1
"3101" "exp3" 1 110 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 460 0 0
"3101" "exp3" 1 111 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 725 31 1
"3101" "exp3" 1 112 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 561 1 1
"3101" "exp3" 1 113 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 461 29 1
"3101" "exp3" 1 114 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 482 20 1
"3101" "exp3" 1 115 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 495 33 1
"3101" "exp3" 1 116 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 456 14 1
"3101" "exp3" 1 117 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 482 29 1
"3101" "exp3" 1 118 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 406 0 0
"3101" "exp3" 1 119 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 414 7 1
"3101" "exp3" 1 120 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 570 13 1
"3101" "exp3" 1 121 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 511 0 0
"3101" "exp3" 1 122 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 432 21 1
"3101" "exp3" 1 123 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 434 19 1
"3101" "exp3" 1 124 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 326 34 1
"3101" "exp3" 1 125 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 540 0 0
"3101" "exp3" 1 126 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 420 0 0
"3101" "exp3" 1 127 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 372 18 1
"3101" "exp3" 1 128 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 731 16 1
"3101" "exp3" 1 129 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 450 33 1
"3101" "exp3" 1 130 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 351 3 1
"3101" "exp3" 1 131 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 429 2 1
"3101" "exp3" 1 132 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 341 22 1
"3101" "exp3" 2 1 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 620 17 1
"3101" "exp3" 2 2 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 580 21 1
"3101" "exp3" 2 3 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 422 1 1
"3101" "exp3" 2 4 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 425 0 0
"3101" "exp3" 2 5 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 480 24 1
"3101" "exp3" 2 6 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 497 7 1
"3101" "exp3" 2 7 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 338 36 1
"3101" "exp3" 2 8 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 328 0 0
"3101" "exp3" 2 9 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 405 30 1
"3101" "exp3" 2 10 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 434 16 1
"3101" "exp3" 2 11 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 511 0 0
"3101" "exp3" 2 12 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 348 37 1
"3101" "exp3" 2 13 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 485 0 0
"3101" "exp3" 2 14 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 438 38 1
"3101" "exp3" 2 15 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 496 26 1
"3101" "exp3" 2 16 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 432 32 1
"3101" "exp3" 2 17 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 396 0 0
"3101" "exp3" 2 18 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 402 18 1
"3101" "exp3" 2 19 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 337 9 1
"3101" "exp3" 2 20 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 510 0 0
"3101" "exp3" 2 21 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 445 7 1
"3101" "exp3" 2 22 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 393 3 1
"3101" "exp3" 2 23 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 430 30 1
"3101" "exp3" 2 24 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 536 0 0
"3101" "exp3" 2 25 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 500 20 1
"3101" "exp3" 2 26 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 580 20 1
"3101" "exp3" 2 27 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 494 19 1
"3101" "exp3" 2 28 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 812 40 1
"3101" "exp3" 2 29 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 552 44 1
"3101" "exp3" 2 30 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 466 0 0
"3101" "exp3" 2 31 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 589 37 1
"3101" "exp3" 2 32 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 473 26 1
"3101" "exp3" 2 33 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 411 29 1
"3101" "exp3" 2 34 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 542 49 1
"3101" "exp3" 2 35 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 431 11 1
"3101" "exp3" 2 36 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 354 17 1
"3101" "exp3" 2 37 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 624 45 1
"3101" "exp3" 2 38 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 432 20 1
"3101" "exp3" 2 39 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 530 0 0
"3101" "exp3" 2 40 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 435 21 1
"3101" "exp3" 2 41 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 535 25 1
"3101" "exp3" 2 42 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 470 0 0
"3101" "exp3" 2 43 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 428 31 1
"3101" "exp3" 2 44 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 425 16 1
"3101" "exp3" 2 45 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 479 31 1
"3101" "exp3" 2 46 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 495 12 1
"3101" "exp3" 2 47 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 635 0 0
"3101" "exp3" 2 48 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 517 0 0
"3101" "exp3" 2 49 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 593 0 0
"3101" "exp3" 2 50 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 503 0 0
"3101" "exp3" 2 51 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 561 0 0
"3101" "exp3" 2 52 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 402 0 0
"3101" "exp3" 2 53 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 515 21 1
"3101" "exp3" 2 54 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 485 0 0
"3101" "exp3" 2 55 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 498 21 1
"3101" "exp3" 2 56 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 425 30 1
"3101" "exp3" 2 57 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 416 0 0
"3101" "exp3" 2 58 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 543 14 1
"3101" "exp3" 2 59 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 421 16 1
"3101" "exp3" 2 60 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 526 0 0
"3101" "exp3" 2 61 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 357 0 0
"3101" "exp3" 2 62 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 496 4 1
"3101" "exp3" 2 63 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 505 0 0
"3101" "exp3" 2 64 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 442 0 0
"3101" "exp3" 2 65 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 620 0 0
"3101" "exp3" 2 66 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 534 42 1
"3101" "exp3" 2 67 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 665 0 0
"3101" "exp3" 2 68 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 463 22 1
"3101" "exp3" 2 69 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 528 8 1
"3101" "exp3" 2 70 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 488 0 0
"3101" "exp3" 2 71 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 556 20 1
"3101" "exp3" 2 72 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 376 5 1
"3101" "exp3" 2 73 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 639 0 0
"3101" "exp3" 2 74 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 542 0 0
"3101" "exp3" 2 75 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 394 0 0
"3101" "exp3" 2 76 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 423 0 0
"3101" "exp3" 2 77 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 621 10 1
"3101" "exp3" 2 78 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 809 19 1
"3101" "exp3" 2 79 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1405 9 1
"3101" "exp3" 2 80 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1293 28 1
"3101" "exp3" 2 81 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 635 35 1
"3101" "exp3" 2 82 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 565 33 1
"3101" "exp3" 2 83 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 450 26 1
"3101" "exp3" 2 84 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 375 0 0
"3101" "exp3" 2 85 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 843 0 0
"3101" "exp3" 2 86 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 479 0 0
"3101" "exp3" 2 87 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 912 0 0
"3101" "exp3" 2 88 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 1597 0 0
"3101" "exp3" 2 89 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 911 0 0
"3101" "exp3" 2 90 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 752 0 0
"3101" "exp3" 2 91 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1110 0 0
"3101" "exp3" 2 92 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1226 0 0
"3101" "exp3" 2 93 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 706 73 1
"3101" "exp3" 2 94 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1235 17 1
"3101" "exp3" 2 95 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1585 72 1
"3101" "exp3" 2 96 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 763 77 1
"3101" "exp3" 2 97 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 517 0 0
"3101" "exp3" 2 98 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 430 15 1
"3101" "exp3" 2 99 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 605 12 1
"3101" "exp3" 2 100 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 2811 27 1
"3101" "exp3" 2 101 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 722 13 1
"3101" "exp3" 2 102 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1531 0 0
"3101" "exp3" 2 103 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1073 0 0
"3101" "exp3" 2 104 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 584 0 0
"3101" "exp3" 2 105 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 410 57 1
"3101" "exp3" 2 106 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1444 0 0
"3101" "exp3" 2 107 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 601 27 1
"3101" "exp3" 2 108 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 811 39 1
"3101" "exp3" 2 109 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 743 0 0
"3101" "exp3" 2 110 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 939 42 1
"3101" "exp3" 2 111 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 402 24 1
"3101" "exp3" 2 112 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 391 23 1
"3101" "exp3" 2 113 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 766 31 1
"3101" "exp3" 2 114 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 585 22 1
"3101" "exp3" 2 115 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 423 17 1
"3101" "exp3" 2 116 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 445 18 1
"3101" "exp3" 2 117 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 609 2 1
"3101" "exp3" 2 118 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 426 0 0
"3101" "exp3" 2 119 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1057 28 1
"3101" "exp3" 2 120 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 769 0 0
"3101" "exp3" 2 121 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1522 0 0
"3101" "exp3" 2 122 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1573 34 1
"3101" "exp3" 2 123 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 2051 0 0
"3101" "exp3" 2 124 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1877 0 0
"3101" "exp3" 2 125 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1676 92 1
"3101" "exp3" 2 126 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1046 32 1
"3101" "exp3" 2 127 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1115 34 1
"3101" "exp3" 2 128 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1114 0 0
"3101" "exp3" 2 129 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 731 0 0
"3101" "exp3" 2 130 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 741 53 1
"3101" "exp3" 2 131 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1213 0 0
"3101" "exp3" 2 132 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1870 43 1
"3101" "exp3" 1 1 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 635 0 0
"3101" "exp3" 1 2 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 841 0 0
"3101" "exp3" 1 3 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 548 92 1
"3101" "exp3" 1 4 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 796 0 0
"3101" "exp3" 1 5 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 655 91 1
"3101" "exp3" 1 6 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 632 76 1
"3101" "exp3" 1 7 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 959 0 0
"3101" "exp3" 1 8 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 644 0 0
"3101" "exp3" 1 9 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 579 0 0
"3101" "exp3" 1 10 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 794 0 0
"3101" "exp3" 1 11 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 487 0 0
"3101" "exp3" 1 12 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 827 0 0
"3101" "exp3" 1 13 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 627 0 0
"3101" "exp3" 1 14 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 422 0 0
"3101" "exp3" 1 15 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 576 54 1
"3101" "exp3" 1 16 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 568 0 0
"3101" "exp3" 1 17 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 695 72 1
"3101" "exp3" 1 18 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 600 79 1
"3101" "exp3" 1 19 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 604 0 0
"3101" "exp3" 1 20 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 586 0 0
"3101" "exp3" 1 21 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 524 0 0
"3101" "exp3" 1 22 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 536 0 0
"3101" "exp3" 1 23 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 608 0 0
"3101" "exp3" 1 24 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 713 0 0
"3101" "exp3" 1 25 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 676 0 0
"3101" "exp3" 1 26 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 718 52 1
"3101" "exp3" 1 27 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 559 22 1
"3101" "exp3" 1 28 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 720 67 1
"3101" "exp3" 1 29 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 556 0 0
"3101" "exp3" 1 30 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 792 0 0
"3101" "exp3" 1 31 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 701 66 1
"3101" "exp3" 1 32 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 662 0 0
"3101" "exp3" 1 33 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 786 0 0
"3101" "exp3" 1 34 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 691 73 1
"3101" "exp3" 1 35 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 503 0 0
"3101" "exp3" 1 36 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 800 63 1
"3101" "exp3" 1 37 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 375 27 1
"3101" "exp3" 1 38 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 611 0 0
"3101" "exp3" 1 39 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 660 72 1
"3101" "exp3" 1 40 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 573 0 0
"3101" "exp3" 1 41 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 691 0 0
"3101" "exp3" 1 42 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 676 0 0
"3101" "exp3" 1 43 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 866 79 1
"3101" "exp3" 1 44 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 509 0 0
"3101" "exp3" 1 45 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 493 55 1
"3101" "exp3" 1 46 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 586 12 1
"3101" "exp3" 1 47 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 676 0 0
"3101" "exp3" 1 48 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 770 82 1
"3101" "exp3" 1 49 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 507 65 1
"3101" "exp3" 1 50 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 423 86 1
"3101" "exp3" 1 51 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 416 80 1
"3101" "exp3" 1 52 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 392 43 1
"3101" "exp3" 1 53 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 392 0 0
"3101" "exp3" 1 54 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 463 95 1
"3101" "exp3" 1 55 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 629 0 0
"3101" "exp3" 1 56 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 400 65 1
"3101" "exp3" 1 57 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 556 0 0
"3101" "exp3" 1 58 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 600 0 0
"3101" "exp3" 1 59 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 557 0 0
"3101" "exp3" 1 60 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 601 71 1
"3101" "exp3" 1 61 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 568 63 1
"3101" "exp3" 1 62 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 450 0 0
"3101" "exp3" 1 63 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 495 0 0
"3101" "exp3" 1 64 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 474 0 0
"3101" "exp3" 1 65 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 550 0 0
"3101" "exp3" 1 66 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 707 72 1
"3101" "exp3" 1 67 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 748 70 1
"3101" "exp3" 1 68 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 594 0 0
"3101" "exp3" 1 69 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 572 0 0
"3101" "exp3" 1 70 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 592 85 1
"3101" "exp3" 1 71 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 772 0 0
"3101" "exp3" 1 72 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 639 0 0
"3101" "exp3" 1 73 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 1167 0 0
"3101" "exp3" 1 74 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 696 0 0
"3101" "exp3" 1 75 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 480 0 0
"3101" "exp3" 1 76 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 563 87 1
"3101" "exp3" 1 77 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 559 0 0
"3101" "exp3" 1 78 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 439 0 0
"3101" "exp3" 1 79 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 496 0 0
"3101" "exp3" 1 80 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 1103 60 1
"3101" "exp3" 1 81 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 741 0 0
"3101" "exp3" 1 82 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 496 0 0
"3101" "exp3" 1 83 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 483 0 0
"3101" "exp3" 1 84 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 685 0 0
"3101" "exp3" 1 85 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 815 53 1
"3101" "exp3" 1 86 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 524 0 0
"3101" "exp3" 1 87 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 444 0 0
"3101" "exp3" 1 88 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 405 0 0
"3101" "exp3" 1 89 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 581 0 0
"3101" "exp3" 1 90 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 600 55 1
"3101" "exp3" 1 91 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 574 73 1
"3101" "exp3" 1 92 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 432 0 0
"3101" "exp3" 1 93 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 641 62 1
"3101" "exp3" 1 94 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 946 74 1
"3101" "exp3" 1 95 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 735 0 0
"3101" "exp3" 1 96 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 592 68 1
"3101" "exp3" 1 97 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 616 0 0
"3101" "exp3" 1 98 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 796 0 0
"3101" "exp3" 1 99 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 820 0 0
"3101" "exp3" 1 100 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 516 0 0
"3101" "exp3" 1 101 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 642 0 0
"3101" "exp3" 1 102 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 598 71 1
"3101" "exp3" 1 103 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 586 0 0
"3101" "exp3" 1 104 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 633 0 0
"3101" "exp3" 1 105 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 617 0 0
"3101" "exp3" 1 106 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 602 68 1
"3101" "exp3" 1 107 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 393 88 1
"3101" "exp3" 1 108 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 1241 68 1
"3101" "exp3" 1 109 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 426 0 0
"3101" "exp3" 1 110 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 563 75 1
"3101" "exp3" 1 111 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 542 0 0
"3101" "exp3" 1 112 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 614 77 1
"3101" "exp3" 1 113 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 585 0 0
"3101" "exp3" 1 114 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 620 0 0
"3101" "exp3" 1 115 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 465 87 1
"3101" "exp3" 1 116 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 941 0 0
"3101" "exp3" 1 117 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 591 0 0
"3101" "exp3" 1 118 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 731 0 0
"3101" "exp3" 1 119 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 737 66 1
"3101" "exp3" 1 120 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1356 0 0
"3101" "exp3" 1 121 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 606 0 0
"3101" "exp3" 1 122 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 599 97 1
"3101" "exp3" 1 123 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 861 0 0
"3101" "exp3" 1 124 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 619 25 1
"3101" "exp3" 1 125 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 571 0 0
"3101" "exp3" 1 126 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 847 0 0
"3101" "exp3" 1 127 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 876 0 0
"3101" "exp3" 1 128 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 765 0 0
"3101" "exp3" 1 129 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1905 59 1
"3101" "exp3" 1 130 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1259 0 0
"3101" "exp3" 1 131 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 934 0 0
"3101" "exp3" 1 132 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1060 0 0
"3101" "exp3" 2 1 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 769 0 0
"3101" "exp3" 2 2 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 947 0 0
"3101" "exp3" 2 3 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 590 0 0
"3101" "exp3" 2 4 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 556 0 0
"3101" "exp3" 2 5 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 595 64 1
"3101" "exp3" 2 6 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 643 37 1
"3101" "exp3" 2 7 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1044 19 1
"3101" "exp3" 2 8 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 1099 0 0
"3101" "exp3" 2 9 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 539 0 0
"3101" "exp3" 2 10 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 818 0 0
"3101" "exp3" 2 11 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 811 0 0
"3101" "exp3" 2 12 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 585 80 1
"3101" "exp3" 2 13 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 856 0 0
"3101" "exp3" 2 14 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1230 0 0
"3101" "exp3" 2 15 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 411 0 0
"3101" "exp3" 2 16 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 628 71 1
"3101" "exp3" 2 17 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 740 0 0
"3101" "exp3" 2 18 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 584 0 0
"3101" "exp3" 2 19 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 396 63 1
"3101" "exp3" 2 20 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 570 75 1
"3101" "exp3" 2 21 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 363 0 0
"3101" "exp3" 2 22 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 439 81 1
"3101" "exp3" 2 23 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 471 0 0
"3101" "exp3" 2 24 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 313 44 1
"3101" "exp3" 2 25 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 577 77 1
"3101" "exp3" 2 26 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 683 0 0
"3101" "exp3" 2 27 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 836 0 0
"3101" "exp3" 2 28 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 458 0 0
"3101" "exp3" 2 29 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 623 0 0
"3101" "exp3" 2 30 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 924 0 0
"3101" "exp3" 2 31 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 588 34 1
"3101" "exp3" 2 32 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 612 0 0
"3101" "exp3" 2 33 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 510 0 0
"3101" "exp3" 2 34 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 687 0 0
"3101" "exp3" 2 35 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 693 0 0
"3101" "exp3" 2 36 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 671 67 1
"3101" "exp3" 2 37 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 408 68 1
"3101" "exp3" 2 38 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 429 78 1
"3101" "exp3" 2 39 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 575 72 1
"3101" "exp3" 2 40 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 610 61 1
"3101" "exp3" 2 41 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 448 0 0
"3101" "exp3" 2 42 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 523 0 0
"3101" "exp3" 2 43 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 354 0 0
"3101" "exp3" 2 44 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 453 0 0
"3101" "exp3" 2 45 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 409 79 1
"3101" "exp3" 2 46 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 581 65 1
"3101" "exp3" 2 47 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 556 0 0
"3101" "exp3" 2 48 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 580 0 0
"3101" "exp3" 2 49 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 853 88 1
"3101" "exp3" 2 50 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 528 0 0
"3101" "exp3" 2 51 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 536 0 0
"3101" "exp3" 2 52 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 505 0 0
"3101" "exp3" 2 53 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 436 73 1
"3101" "exp3" 2 54 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 421 0 0
"3101" "exp3" 2 55 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 434 0 0
"3101" "exp3" 2 56 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 465 0 0
"3101" "exp3" 2 57 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 457 80 1
"3101" "exp3" 2 58 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 382 86 1
"3101" "exp3" 2 59 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 436 16 1
"3101" "exp3" 2 60 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 606 0 0
"3101" "exp3" 2 61 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 551 0 0
"3101" "exp3" 2 62 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 551 0 0
"3101" "exp3" 2 63 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 543 66 1
"3101" "exp3" 2 64 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 582 0 0
"3101" "exp3" 2 65 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 611 69 1
"3101" "exp3" 2 66 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 397 72 1
"3101" "exp3" 2 67 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 452 0 0
"3101" "exp3" 2 68 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 407 62 1
"3101" "exp3" 2 69 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 299 0 0
"3101" "exp3" 2 70 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 384 0 0
"3101" "exp3" 2 71 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 767 0 0
"3101" "exp3" 2 72 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 952 0 0
"3101" "exp3" 2 73 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 552 0 0
"3101" "exp3" 2 74 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 436 0 0
"3101" "exp3" 2 75 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 438 30 1
"3101" "exp3" 2 76 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 936 0 0
"3101" "exp3" 2 77 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 435 0 0
"3101" "exp3" 2 78 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 702 58 1
"3101" "exp3" 2 79 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 588 68 1
"3101" "exp3" 2 80 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 512 0 0
"3101" "exp3" 2 81 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 525 76 1
"3101" "exp3" 2 82 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 961 0 0
"3101" "exp3" 2 83 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 558 0 0
"3101" "exp3" 2 84 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 511 69 1
"3101" "exp3" 2 85 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 544 0 0
"3101" "exp3" 2 86 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 435 76 1
"3101" "exp3" 2 87 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 626 0 0
"3101" "exp3" 2 88 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 516 0 0
"3101" "exp3" 2 89 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 864 0 0
"3101" "exp3" 2 90 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 756 0 0
"3101" "exp3" 2 91 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 454 0 0
"3101" "exp3" 2 92 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 597 0 0
"3101" "exp3" 2 93 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 558 75 1
"3101" "exp3" 2 94 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 589 0 0
"3101" "exp3" 2 95 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 698 0 0
"3101" "exp3" 2 96 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 542 0 0
"3101" "exp3" 2 97 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 501 0 0
"3101" "exp3" 2 98 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 537 0 0
"3101" "exp3" 2 99 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 418 0 0
"3101" "exp3" 2 100 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 433 0 0
"3101" "exp3" 2 101 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 342 29 1
"3101" "exp3" 2 102 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 602 85 1
"3101" "exp3" 2 103 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 444 0 0
"3101" "exp3" 2 104 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 772 0 0
"3101" "exp3" 2 105 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 473 0 0
"3101" "exp3" 2 106 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 565 0 0
"3101" "exp3" 2 107 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 345 0 0
"3101" "exp3" 2 108 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 744 0 0
"3101" "exp3" 2 109 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 432 0 0
"3101" "exp3" 2 110 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 488 3 1
"3101" "exp3" 2 111 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 658 65 1
"3101" "exp3" 2 112 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 489 60 1
"3101" "exp3" 2 113 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 603 0 0
"3101" "exp3" 2 114 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 498 0 0
"3101" "exp3" 2 115 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 546 0 0
"3101" "exp3" 2 116 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 662 0 0
"3101" "exp3" 2 117 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 535 0 0
"3101" "exp3" 2 118 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 414 0 0
"3101" "exp3" 2 119 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 496 0 0
"3101" "exp3" 2 120 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 460 0 0
"3101" "exp3" 2 121 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 566 89 1
"3101" "exp3" 2 122 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 506 0 0
"3101" "exp3" 2 123 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 732 0 0
"3101" "exp3" 2 124 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 529 0 0
"3101" "exp3" 2 125 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 418 0 0
"3101" "exp3" 2 126 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 711 0 0
"3101" "exp3" 2 127 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 560 0 0
"3101" "exp3" 2 128 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 413 0 0
"3101" "exp3" 2 129 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 450 0 0
"3101" "exp3" 2 130 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 646 0 0
"3101" "exp3" 2 131 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 736 0 0
"3101" "exp3" 2 132 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 445 90 1
"3101" "exp3" 1 1 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 893 0 0
"3101" "exp3" 1 2 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 520 0 0
"3101" "exp3" 1 3 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 361 33 1
"3101" "exp3" 1 4 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 411 35 1
"3101" "exp3" 1 5 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 433 0 0
"3101" "exp3" 1 6 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 400 23 1
"3101" "exp3" 1 7 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 499 14 1
"3101" "exp3" 1 8 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 641 2 1
"3101" "exp3" 1 9 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 470 35 1
"3101" "exp3" 1 10 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 450 5 1
"3101" "exp3" 1 11 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 379 13 1
"3101" "exp3" 1 12 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 581 30 1
"3101" "exp3" 1 13 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 660 31 1
"3101" "exp3" 1 14 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 407 23 1
"3101" "exp3" 1 15 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 442 0 0
"3101" "exp3" 1 16 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 402 41 1
"3101" "exp3" 1 17 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 560 38 1
"3101" "exp3" 1 18 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 509 21 1
"3101" "exp3" 1 19 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 458 0 0
"3101" "exp3" 1 20 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 396 0 0
"3101" "exp3" 1 21 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 364 29 1
"3101" "exp3" 1 22 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 539 15 1
"3101" "exp3" 1 23 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 360 0 0
"3101" "exp3" 1 24 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 722 25 1
"3101" "exp3" 1 25 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 515 30 1
"3101" "exp3" 1 26 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 369 13 1
"3101" "exp3" 1 27 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 556 24 1
"3101" "exp3" 1 28 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 379 0 0
"3101" "exp3" 1 29 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 560 27 1
"3101" "exp3" 1 30 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 565 21 1
"3101" "exp3" 1 31 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 432 0 0
"3101" "exp3" 1 32 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 413 6 1
"3101" "exp3" 1 33 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 368 30 1
"3101" "exp3" 1 34 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 374 42 1
"3101" "exp3" 1 35 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 366 19 1
"3101" "exp3" 1 36 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 540 49 1
"3101" "exp3" 1 37 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 360 7 1
"3101" "exp3" 1 38 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 414 24 1
"3101" "exp3" 1 39 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 399 17 1
"3101" "exp3" 1 40 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 469 18 1
"3101" "exp3" 1 41 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 391 21 1
"3101" "exp3" 1 42 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 391 43 1
"3101" "exp3" 1 43 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 475 36 1
"3101" "exp3" 1 44 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 439 20 1
"3101" "exp3" 1 45 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 511 24 1
"3101" "exp3" 1 46 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1026 45 1
"3101" "exp3" 1 47 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 434 15 1
"3101" "exp3" 1 48 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 588 39 1
"3101" "exp3" 1 49 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 467 17 1
"3101" "exp3" 1 50 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 594 0 0
"3101" "exp3" 1 51 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 414 17 1
"3101" "exp3" 1 52 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 513 19 1
"3101" "exp3" 1 53 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 408 0 0
"3101" "exp3" 1 54 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 352 1 1
"3101" "exp3" 1 55 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 2227 0 0
"3101" "exp3" 1 56 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 2505 22 1
"3101" "exp3" 1 57 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 440 0 0
"3101" "exp3" 1 58 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 849 22 1
"3101" "exp3" 1 59 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 509 8 1
"3101" "exp3" 1 60 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 952 12 1
"3101" "exp3" 1 61 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 582 15 1
"3101" "exp3" 1 62 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 541 11 1
"3101" "exp3" 1 63 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 857 0 0
"3101" "exp3" 1 64 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 419 22 1
"3101" "exp3" 1 65 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 392 0 0
"3101" "exp3" 1 66 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 1560 4 1
"3101" "exp3" 1 67 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1039 0 0
"3101" "exp3" 1 68 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 706 34 1
"3101" "exp3" 1 69 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 523 29 1
"3101" "exp3" 1 70 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 597 44 1
"3101" "exp3" 1 71 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 550 12 1
"3101" "exp3" 1 72 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 624 25 1
"3101" "exp3" 1 73 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 738 28 1
"3101" "exp3" 1 74 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1594 16 1
"3101" "exp3" 1 75 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 1389 16 1
"3101" "exp3" 1 76 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1256 18 1
"3101" "exp3" 1 77 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 490 20 1
"3101" "exp3" 1 78 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1370 9 1
"3101" "exp3" 1 79 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 552 28 1
"3101" "exp3" 1 80 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 420 25 1
"3101" "exp3" 1 81 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 370 8 1
"3101" "exp3" 1 82 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 604 0 0
"3101" "exp3" 1 83 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 462 26 1
"3101" "exp3" 1 84 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 426 0 0
"3101" "exp3" 1 85 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 539 37 1
"3101" "exp3" 1 86 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 386 11 1
"3101" "exp3" 1 87 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 417 0 0
"3101" "exp3" 1 88 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 451 3 1
"3101" "exp3" 1 89 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 517 0 0
"3101" "exp3" 1 90 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 457 0 0
"3101" "exp3" 1 91 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 476 29 1
"3101" "exp3" 1 92 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 766 34 1
"3101" "exp3" 1 93 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 375 18 1
"3101" "exp3" 1 94 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 362 34 1
"3101" "exp3" 1 95 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 335 0 0
"3101" "exp3" 1 96 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 425 32 1
"3101" "exp3" 1 97 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 407 5 1
"3101" "exp3" 1 98 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 388 0 0
"3101" "exp3" 1 99 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 497 10 1
"3101" "exp3" 1 100 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 742 40 1
"3101" "exp3" 1 101 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 448 20 1
"3101" "exp3" 1 102 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 602 23 1
"3101" "exp3" 1 103 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 666 18 1
"3101" "exp3" 1 104 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 505 0 0
"3101" "exp3" 1 105 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1243 36 1
"3101" "exp3" 1 106 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 461 25 1
"3101" "exp3" 1 107 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 622 46 1
"3101" "exp3" 1 108 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 847 28 1
"3101" "exp3" 1 109 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 441 26 1
"3101" "exp3" 1 110 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 606 9 1
"3101" "exp3" 1 111 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1074 21 1
"3101" "exp3" 1 112 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 833 0 0
"3101" "exp3" 1 113 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 550 0 0
"3101" "exp3" 1 114 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 542 31 1
"3101" "exp3" 1 115 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 426 37 1
"3101" "exp3" 1 116 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 402 47 1
"3101" "exp3" 1 117 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 412 0 0
"3101" "exp3" 1 118 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 381 0 0
"3101" "exp3" 1 119 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 442 7 1
"3101" "exp3" 1 120 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 494 27 1
"3101" "exp3" 1 121 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 483 0 0
"3101" "exp3" 1 122 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 680 45 1
"3101" "exp3" 1 123 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 470 40 1
"3101" "exp3" 1 124 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 654 0 0
"3101" "exp3" 1 125 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 456 17 1
"3101" "exp3" 1 126 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 425 33 1
"3101" "exp3" 1 127 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 581 14 1
"3101" "exp3" 1 128 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1052 0 0
"3101" "exp3" 1 129 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 897 32 1
"3101" "exp3" 1 130 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 701 0 0
"3101" "exp3" 1 131 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 473 38 1
"3101" "exp3" 1 132 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 413 0 0
"3101" "exp3" 2 1 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 575 35 1
"3101" "exp3" 2 2 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 677 48 1
"3101" "exp3" 2 3 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 483 23 1
"3101" "exp3" 2 4 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 368 5 1
"3101" "exp3" 2 5 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1185 0 0
"3101" "exp3" 2 6 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1571 13 1
"3101" "exp3" 2 7 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 639 0 0
"3101" "exp3" 2 8 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 888 24 1
"3101" "exp3" 2 9 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 644 26 1
"3101" "exp3" 2 10 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 448 0 0
"3101" "exp3" 2 11 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 794 34 1
"3101" "exp3" 2 12 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 802 0 0
"3101" "exp3" 2 13 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 562 3 1
"3101" "exp3" 2 14 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1249 0 0
"3101" "exp3" 2 15 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1672 0 0
"3101" "exp3" 2 16 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 660 0 0
"3101" "exp3" 2 17 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 474 0 0
"3101" "exp3" 2 18 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 914 27 1
"3101" "exp3" 2 19 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 608 43 1
"3101" "exp3" 2 20 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 467 33 1
"3101" "exp3" 2 21 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 604 1 1
"3101" "exp3" 2 22 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 896 21 1
"3101" "exp3" 2 23 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 723 34 1
"3101" "exp3" 2 24 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 574 0 0
"3101" "exp3" 2 25 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 516 18 1
"3101" "exp3" 2 26 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 488 0 0
"3101" "exp3" 2 27 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 908 49 1
"3101" "exp3" 2 28 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 990 0 0
"3101" "exp3" 2 29 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1131 0 0
"3101" "exp3" 2 30 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1734 24 1
"3101" "exp3" 2 31 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 478 31 1
"3101" "exp3" 2 32 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 398 10 1
"3101" "exp3" 2 33 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1383 40 1
"3101" "exp3" 2 34 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 730 36 1
"3101" "exp3" 2 35 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 617 2 1
"3101" "exp3" 2 36 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 592 0 0
"3101" "exp3" 2 37 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 522 0 0
"3101" "exp3" 2 38 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 530 30 1
"3101" "exp3" 2 39 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 769 31 1
"3101" "exp3" 2 40 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 760 23 1
"3101" "exp3" 2 41 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 555 19 1
"3101" "exp3" 2 42 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 661 31 1
"3101" "exp3" 2 43 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 443 29 1
"3101" "exp3" 2 44 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 430 6 1
"3101" "exp3" 2 45 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 547 19 1
"3101" "exp3" 2 46 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 383 6 1
"3101" "exp3" 2 47 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 585 16 1
"3101" "exp3" 2 48 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 616 0 0
"3101" "exp3" 2 49 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 405 22 1
"3101" "exp3" 2 50 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 463 44 1
"3101" "exp3" 2 51 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 405 14 1
"3101" "exp3" 2 52 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 546 0 0
"3101" "exp3" 2 53 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 410 4 1
"3101" "exp3" 2 54 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 927 8 1
"3101" "exp3" 2 55 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1156 19 1
"3101" "exp3" 2 56 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 507 0 0
"3101" "exp3" 2 57 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 637 0 0
"3101" "exp3" 2 58 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 420 22 1
"3101" "exp3" 2 59 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 522 38 1
"3101" "exp3" 2 60 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 503 9 1
"3101" "exp3" 2 61 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 424 42 1
"3101" "exp3" 2 62 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 579 22 1
"3101" "exp3" 2 63 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 501 16 1
"3101" "exp3" 2 64 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 490 25 1
"3101" "exp3" 2 65 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 518 37 1
"3101" "exp3" 2 66 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 479 17 1
"3101" "exp3" 2 67 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 744 18 1
"3101" "exp3" 2 68 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 571 0 0
"3101" "exp3" 2 69 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 431 26 1
"3101" "exp3" 2 70 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 487 24 1
"3101" "exp3" 2 71 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 477 9 1
"3101" "exp3" 2 72 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1308 0 0
"3101" "exp3" 2 73 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 536 19 1
"3101" "exp3" 2 74 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 822 0 0
"3101" "exp3" 2 75 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 457 11 1
"3101" "exp3" 2 76 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 507 21 1
"3101" "exp3" 2 77 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 433 0 0
"3101" "exp3" 2 78 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 443 23 1
"3101" "exp3" 2 79 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 613 0 0
"3101" "exp3" 2 80 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 666 43 1
"3101" "exp3" 2 81 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 577 0 0
"3101" "exp3" 2 82 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 430 15 1
"3101" "exp3" 2 83 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 445 29 1
"3101" "exp3" 2 84 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 931 10 1
"3101" "exp3" 2 85 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 544 0 0
"3101" "exp3" 2 86 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 836 0 0
"3101" "exp3" 2 87 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 641 32 1
"3101" "exp3" 2 88 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 456 36 1
"3101" "exp3" 2 89 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 452 11 1
"3101" "exp3" 2 90 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 895 16 1
"3101" "exp3" 2 91 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 706 35 1
"3101" "exp3" 2 92 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 650 17 1
"3101" "exp3" 2 93 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 421 25 1
"3101" "exp3" 2 94 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 382 0 0
"3101" "exp3" 2 95 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 398 65 1
"3101" "exp3" 2 96 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 390 28 1
"3101" "exp3" 2 97 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 399 14 1
"3101" "exp3" 2 98 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 1497 0 0
"3101" "exp3" 2 99 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 814 12 1
"3101" "exp3" 2 100 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 534 15 1
"3101" "exp3" 2 101 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 546 28 1
"3101" "exp3" 2 102 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 579 26 1
"3101" "exp3" 2 103 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 498 0 0
"3101" "exp3" 2 104 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 383 0 0
"3101" "exp3" 2 105 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 725 13 1
"3101" "exp3" 2 106 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 839 23 1
"3101" "exp3" 2 107 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 572 13 1
"3101" "exp3" 2 108 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 573 0 0
"3101" "exp3" 2 109 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 1471 0 0
"3101" "exp3" 2 110 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 426 0 0
"3101" "exp3" 2 111 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 795 0 0
"3101" "exp3" 2 112 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 841 73 1
"3101" "exp3" 2 113 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 629 0 0
"3101" "exp3" 2 114 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2030 0 0
"3101" "exp3" 2 115 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 762 68 1
"3101" "exp3" 2 116 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 455 80 1
"3101" "exp3" 2 117 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 687 0 0
"3101" "exp3" 2 118 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 577 0 0
"3101" "exp3" 2 119 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 534 0 0
"3101" "exp3" 2 120 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 412 71 1
"3101" "exp3" 2 121 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 449 0 0
"3101" "exp3" 2 122 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 481 0 0
"3101" "exp3" 2 123 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 555 56 1
"3101" "exp3" 2 124 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 356 30 1
"3101" "exp3" 2 125 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 443 80 1
"3101" "exp3" 2 126 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 370 59 1
"3101" "exp3" 2 127 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 329 0 0
"3101" "exp3" 2 128 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 1586 0 0
"3101" "exp3" 2 129 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 750 0 0
"3101" "exp3" 2 130 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1686 0 0
"3101" "exp3" 2 131 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2252 0 0
"3101" "exp3" 2 132 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1827 46 1
"3102" "exp3" 1 1 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 871 24 1
"3102" "exp3" 1 2 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 735 0 0
"3102" "exp3" 1 3 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 680 0 0
"3102" "exp3" 1 4 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 763 40 1
"3102" "exp3" 1 5 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 745 20 1
"3102" "exp3" 1 6 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 915 37 1
"3102" "exp3" 1 7 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 784 0 0
"3102" "exp3" 1 8 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 744 12 1
"3102" "exp3" 1 9 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 606 2 1
"3102" "exp3" 1 10 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1240 0 0
"3102" "exp3" 1 11 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1250 0 0
"3102" "exp3" 1 12 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1462 0 0
"3102" "exp3" 1 13 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2679 0 0
"3102" "exp3" 1 14 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2196 17 1
"3102" "exp3" 1 15 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1548 21 1
"3102" "exp3" 1 16 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 998 18 1
"3102" "exp3" 1 17 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 938 0 0
"3102" "exp3" 1 18 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1170 47 1
"3102" "exp3" 1 19 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1017 48 1
"3102" "exp3" 1 20 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1642 20 1
"3102" "exp3" 1 21 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1170 32 1
"3102" "exp3" 1 22 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 937 19 1
"3102" "exp3" 1 23 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 2009 10 1
"3102" "exp3" 1 24 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1644 31 1
"3102" "exp3" 1 25 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1262 49 1
"3102" "exp3" 1 26 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2581 0 0
"3102" "exp3" 1 27 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 4389 0 0
"3102" "exp3" 1 28 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2953 36 1
"3102" "exp3" 1 29 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1359 32 1
"3102" "exp3" 1 30 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1099 35 1
"3102" "exp3" 1 31 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1328 39 1
"3102" "exp3" 1 32 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1228 30 1
"3102" "exp3" 1 33 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1038 0 0
"3102" "exp3" 1 34 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1107 0 0
"3102" "exp3" 1 35 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1122 38 1
"3102" "exp3" 1 36 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1585 0 0
"3102" "exp3" 1 37 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1187 34 1
"3102" "exp3" 1 38 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1097 0 0
"3102" "exp3" 1 39 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1397 38 1
"3102" "exp3" 1 40 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 941 0 0
"3102" "exp3" 1 41 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1883 18 1
"3102" "exp3" 1 42 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 2251 0 0
"3102" "exp3" 1 43 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2253 97 1
"3102" "exp3" 1 44 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2662 13 1
"3102" "exp3" 1 45 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 3539 0 0
"3102" "exp3" 1 46 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2379 0 0
"3102" "exp3" 1 47 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 2384 11 1
"3102" "exp3" 1 48 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1097 25 1
"3102" "exp3" 1 49 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1304 28 1
"3102" "exp3" 1 50 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1152 22 1
"3102" "exp3" 1 51 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1320 0 0
"3102" "exp3" 1 52 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1328 29 1
"3102" "exp3" 1 53 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1283 35 1
"3102" "exp3" 1 54 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1762 0 0
"3102" "exp3" 1 55 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 2564 0 0
"3102" "exp3" 1 56 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 2475 16 1
"3102" "exp3" 1 57 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1200 12 1
"3102" "exp3" 1 58 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1205 27 1
"3102" "exp3" 1 59 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1306 24 1
"3102" "exp3" 1 60 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1421 21 1
"3102" "exp3" 1 61 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1541 26 1
"3102" "exp3" 1 62 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1117 24 1
"3102" "exp3" 1 63 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1952 0 0
"3102" "exp3" 1 64 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1227 17 1
"3102" "exp3" 1 65 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 2143 15 1
"3102" "exp3" 1 66 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1354 0 0
"3102" "exp3" 1 67 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1796 0 0
"3102" "exp3" 1 68 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 826 0 0
"3102" "exp3" 1 69 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 821 27 1
"3102" "exp3" 1 70 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1363 15 1
"3102" "exp3" 1 71 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1685 0 0
"3102" "exp3" 1 72 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 4344 72 1
"3102" "exp3" 1 73 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 2279 75 1
"3102" "exp3" 1 74 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1954 0 0
"3102" "exp3" 1 75 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 2208 11 1
"3102" "exp3" 1 76 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 2213 57 1
"3102" "exp3" 1 77 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 3989 0 0
"3102" "exp3" 1 78 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 2756 59 1
"3102" "exp3" 1 79 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 5964 71 1
"3102" "exp3" 1 80 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2815 0 0
"3102" "exp3" 1 81 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 4493 54 1
"3102" "exp3" 1 82 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 5728 0 0
"3102" "exp3" 1 83 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 5364 26 1
"3102" "exp3" 1 84 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1146 0 0
"3102" "exp3" 1 85 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 4035 10 1
"3102" "exp3" 1 86 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2139 0 0
"3102" "exp3" 1 87 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1282 45 1
"3102" "exp3" 1 88 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2075 0 0
"3102" "exp3" 1 89 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 3057 0 0
"3102" "exp3" 1 90 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1372 39 1
"3102" "exp3" 1 91 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1422 0 0
"3102" "exp3" 1 92 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 2069 14 1
"3102" "exp3" 1 93 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1406 22 1
"3102" "exp3" 1 94 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 2224 0 0
"3102" "exp3" 1 95 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 2034 0 0
"3102" "exp3" 1 96 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 2043 14 1
"3102" "exp3" 1 97 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 2647 29 1
"3102" "exp3" 1 98 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 2688 0 0
"3102" "exp3" 1 99 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 4187 31 1
"3102" "exp3" 1 100 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 8464 32 1
"3102" "exp3" 1 101 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1560 18 1
"3102" "exp3" 1 102 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1125 23 1
"3102" "exp3" 1 103 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 862 0 0
"3102" "exp3" 1 104 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1380 17 1
"3102" "exp3" 1 105 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1682 0 0
"3102" "exp3" 1 106 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1152 0 0
"3102" "exp3" 1 107 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 2692 0 0
"3102" "exp3" 1 108 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1329 30 1
"3102" "exp3" 1 109 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 6421 40 1
"3102" "exp3" 1 110 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 996 19 1
"3102" "exp3" 1 111 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1524 23 1
"3102" "exp3" 1 112 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 2030 14 1
"3102" "exp3" 1 113 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1295 21 1
"3102" "exp3" 1 114 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 3941 45 1
"3102" "exp3" 1 115 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 825 20 1
"3102" "exp3" 1 116 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 624 26 1
"3102" "exp3" 1 117 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1017 25 1
"3102" "exp3" 1 118 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 775 16 1
"3102" "exp3" 1 119 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 950 8 1
"3102" "exp3" 1 120 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1145 22 1
"3102" "exp3" 1 121 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1196 24 1
"3102" "exp3" 1 122 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1618 30 1
"3102" "exp3" 1 123 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1543 28 1
"3102" "exp3" 1 124 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1204 20 1
"3102" "exp3" 1 125 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1188 42 1
"3102" "exp3" 1 126 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1662 19 1
"3102" "exp3" 1 127 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1638 34 1
"3102" "exp3" 1 128 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1699 23 1
"3102" "exp3" 1 129 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 3952 0 0
"3102" "exp3" 1 130 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 4752 0 0
"3102" "exp3" 1 131 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2058 0 0
"3102" "exp3" 1 132 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1390 33 1
"3102" "exp3" 2 1 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 915 37 1
"3102" "exp3" 2 2 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1145 0 0
"3102" "exp3" 2 3 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1654 74 1
"3102" "exp3" 2 4 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 981 29 1
"3102" "exp3" 2 5 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1367 0 0
"3102" "exp3" 2 6 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 907 27 1
"3102" "exp3" 2 7 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1640 15 1
"3102" "exp3" 2 8 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 2417 27 1
"3102" "exp3" 2 9 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 3749 47 1
"3102" "exp3" 2 10 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1148 11 1
"3102" "exp3" 2 11 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1795 0 0
"3102" "exp3" 2 12 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1827 0 0
"3102" "exp3" 2 13 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1477 25 1
"3102" "exp3" 2 14 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 4912 0 0
"3102" "exp3" 2 15 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2883 30 1
"3102" "exp3" 2 16 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 795 28 1
"3102" "exp3" 2 17 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 693 0 0
"3102" "exp3" 2 18 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1170 30 1
"3102" "exp3" 2 19 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 897 0 0
"3102" "exp3" 2 20 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 4495 36 1
"3102" "exp3" 2 21 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 4382 0 0
"3102" "exp3" 2 22 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1661 24 1
"3102" "exp3" 2 23 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 4738 0 0
"3102" "exp3" 2 24 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1068 21 1
"3102" "exp3" 2 25 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1104 27 1
"3102" "exp3" 2 26 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1163 15 1
"3102" "exp3" 2 27 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 964 28 1
"3102" "exp3" 2 28 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 972 33 1
"3102" "exp3" 2 29 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2707 0 0
"3102" "exp3" 2 30 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1462 93 1
"3102" "exp3" 2 31 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 5968 49 1
"3102" "exp3" 2 32 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2637 0 0
"3102" "exp3" 2 33 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1065 19 1
"3102" "exp3" 2 34 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 2349 0 0
"3102" "exp3" 2 35 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1917 19 1
"3102" "exp3" 2 36 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1376 13 1
"3102" "exp3" 2 37 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1351 39 1
"3102" "exp3" 2 38 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1248 0 0
"3102" "exp3" 2 39 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1394 0 0
"3102" "exp3" 2 40 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 3287 0 0
"3102" "exp3" 2 41 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1014 18 1
"3102" "exp3" 2 42 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2478 32 1
"3102" "exp3" 2 43 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1431 0 0
"3102" "exp3" 2 44 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1299 0 0
"3102" "exp3" 2 45 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1155 17 1
"3102" "exp3" 2 46 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1616 91 1
"3102" "exp3" 2 47 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 2112 0 0
"3102" "exp3" 2 48 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2318 32 1
"3102" "exp3" 2 49 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1146 34 1
"3102" "exp3" 2 50 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 803 15 1
"3102" "exp3" 2 51 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1134 24 1
"3102" "exp3" 2 52 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1029 22 1
"3102" "exp3" 2 53 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 2863 0 0
"3102" "exp3" 2 54 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1160 35 1
"3102" "exp3" 2 55 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1873 17 1
"3102" "exp3" 2 56 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1443 0 0
"3102" "exp3" 2 57 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1410 0 0
"3102" "exp3" 2 58 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1450 0 0
"3102" "exp3" 2 59 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 2222 0 0
"3102" "exp3" 2 60 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1359 0 0
"3102" "exp3" 2 61 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1603 27 1
"3102" "exp3" 2 62 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1339 0 0
"3102" "exp3" 2 63 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 2285 45 1
"3102" "exp3" 2 64 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 2682 0 0
"3102" "exp3" 2 65 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1328 14 1
"3102" "exp3" 2 66 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1102 19 1
"3102" "exp3" 2 67 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1728 33 1
"3102" "exp3" 2 68 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 2053 56 1
"3102" "exp3" 2 69 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1406 16 1
"3102" "exp3" 2 70 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1724 16 1
"3102" "exp3" 2 71 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1409 33 1
"3102" "exp3" 2 72 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1078 30 1
"3102" "exp3" 2 73 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1013 20 1
"3102" "exp3" 2 74 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 4669 0 0
"3102" "exp3" 2 75 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 4107 57 1
"3102" "exp3" 2 76 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1368 0 0
"3102" "exp3" 2 77 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 3275 62 1
"3102" "exp3" 2 78 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2732 13 1
"3102" "exp3" 2 79 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 3445 0 0
"3102" "exp3" 2 80 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1566 0 0
"3102" "exp3" 2 81 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2745 0 0
"3102" "exp3" 2 82 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1130 20 1
"3102" "exp3" 2 83 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1470 11 1
"3102" "exp3" 2 84 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2567 42 1
"3102" "exp3" 2 85 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2034 0 0
"3102" "exp3" 2 86 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 4210 48 1
"3102" "exp3" 2 87 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1376 20 1
"3102" "exp3" 2 88 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 3417 68 1
"3102" "exp3" 2 89 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1443 35 1
"3102" "exp3" 2 90 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 775 21 1
"3102" "exp3" 2 91 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1354 24 1
"3102" "exp3" 2 92 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1202 26 1
"3102" "exp3" 2 93 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1586 0 0
"3102" "exp3" 2 94 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 3375 29 1
"3102" "exp3" 2 95 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2164 41 1
"3102" "exp3" 2 96 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2068 0 0
"3102" "exp3" 2 97 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1138 21 1
"3102" "exp3" 2 98 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 915 23 1
"3102" "exp3" 2 99 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 744 0 0
"3102" "exp3" 2 100 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1523 10 1
"3102" "exp3" 2 101 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 760 22 1
"3102" "exp3" 2 102 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 777 0 0
"3102" "exp3" 2 103 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 959 14 1
"3102" "exp3" 2 104 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 2907 67 1
"3102" "exp3" 2 105 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1168 18 1
"3102" "exp3" 2 106 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 965 18 1
"3102" "exp3" 2 107 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1778 31 1
"3102" "exp3" 2 108 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1132 0 0
"3102" "exp3" 2 109 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1525 17 1
"3102" "exp3" 2 110 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 5032 0 0
"3102" "exp3" 2 111 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1908 0 0
"3102" "exp3" 2 112 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1587 0 0
"3102" "exp3" 2 113 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1438 25 1
"3102" "exp3" 2 114 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1578 0 0
"3102" "exp3" 2 115 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2835 64 1
"3102" "exp3" 2 116 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2017 94 1
"3102" "exp3" 2 117 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 4244 19 1
"3102" "exp3" 2 118 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1892 10 1
"3102" "exp3" 2 119 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1022 12 1
"3102" "exp3" 2 120 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1025 0 0
"3102" "exp3" 2 121 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2959 0 0
"3102" "exp3" 2 122 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 2437 0 0
"3102" "exp3" 2 123 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1433 0 0
"3102" "exp3" 2 124 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1754 31 1
"3102" "exp3" 2 125 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1132 0 0
"3102" "exp3" 2 126 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1111 0 0
"3102" "exp3" 2 127 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 881 12 1
"3102" "exp3" 2 128 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 887 0 0
"3102" "exp3" 2 129 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1165 43 1
"3102" "exp3" 2 130 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1018 23 1
"3102" "exp3" 2 131 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 839 0 0
"3102" "exp3" 2 132 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 716 22 1
"3102" "exp3" 1 1 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 887 0 0
"3102" "exp3" 1 2 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1129 0 0
"3102" "exp3" 1 3 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 769 18 1
"3102" "exp3" 1 4 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 974 0 0
"3102" "exp3" 1 5 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1665 21 1
"3102" "exp3" 1 6 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1208 69 1
"3102" "exp3" 1 7 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 975 10 1
"3102" "exp3" 1 8 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 711 38 1
"3102" "exp3" 1 9 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 931 23 1
"3102" "exp3" 1 10 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1012 0 0
"3102" "exp3" 1 11 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 776 24 1
"3102" "exp3" 1 12 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1148 28 1
"3102" "exp3" 1 13 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 864 22 1
"3102" "exp3" 1 14 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 988 0 0
"3102" "exp3" 1 15 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1014 10 1
"3102" "exp3" 1 16 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 725 16 1
"3102" "exp3" 1 17 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 675 26 1
"3102" "exp3" 1 18 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1182 41 1
"3102" "exp3" 1 19 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 701 29 1
"3102" "exp3" 1 20 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 586 0 0
"3102" "exp3" 1 21 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 572 0 0
"3102" "exp3" 1 22 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 786 21 1
"3102" "exp3" 1 23 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 779 42 1
"3102" "exp3" 1 24 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1640 44 1
"3102" "exp3" 1 25 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 713 29 1
"3102" "exp3" 1 26 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2260 0 0
"3102" "exp3" 1 27 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 649 14 1
"3102" "exp3" 1 28 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 584 6 1
"3102" "exp3" 1 29 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1210 0 0
"3102" "exp3" 1 30 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1152 36 1
"3102" "exp3" 1 31 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 848 0 0
"3102" "exp3" 1 32 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 918 0 0
"3102" "exp3" 1 33 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1689 46 1
"3102" "exp3" 1 34 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 680 0 0
"3102" "exp3" 1 35 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1138 0 0
"3102" "exp3" 1 36 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1924 0 0
"3102" "exp3" 1 37 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2757 31 1
"3102" "exp3" 1 38 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 892 0 0
"3102" "exp3" 1 39 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 514 12 1
"3102" "exp3" 1 40 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 613 11 1
"3102" "exp3" 1 41 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 873 0 0
"3102" "exp3" 1 42 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 2616 19 1
"3102" "exp3" 1 43 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1194 12 1
"3102" "exp3" 1 44 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1458 0 0
"3102" "exp3" 1 45 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1307 13 1
"3102" "exp3" 1 46 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 3184 0 0
"3102" "exp3" 1 47 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 859 0 0
"3102" "exp3" 1 48 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 824 0 0
"3102" "exp3" 1 49 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1590 0 0
"3102" "exp3" 1 50 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 555 20 1
"3102" "exp3" 1 51 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 543 0 0
"3102" "exp3" 1 52 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 576 0 0
"3102" "exp3" 1 53 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 1100 53 1
"3102" "exp3" 1 54 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 639 37 1
"3102" "exp3" 1 55 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 458 34 1
"3102" "exp3" 1 56 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 611 0 0
"3102" "exp3" 1 57 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 575 8 1
"3102" "exp3" 1 58 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 632 0 0
"3102" "exp3" 1 59 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 488 30 1
"3102" "exp3" 1 60 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 558 25 1
"3102" "exp3" 1 61 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 523 0 0
"3102" "exp3" 1 62 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 827 13 1
"3102" "exp3" 1 63 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 827 70 1
"3102" "exp3" 1 64 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 833 29 1
"3102" "exp3" 1 65 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 589 34 1
"3102" "exp3" 1 66 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 626 22 1
"3102" "exp3" 1 67 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 483 0 0
"3102" "exp3" 1 68 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 561 19 1
"3102" "exp3" 1 69 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 585 19 1
"3102" "exp3" 1 70 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 432 6 1
"3102" "exp3" 1 71 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 610 20 1
"3102" "exp3" 1 72 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 899 25 1
"3102" "exp3" 1 73 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 621 16 1
"3102" "exp3" 1 74 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 664 40 1
"3102" "exp3" 1 75 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1438 43 1
"3102" "exp3" 1 76 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 553 0 0
"3102" "exp3" 1 77 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 501 18 1
"3102" "exp3" 1 78 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 573 25 1
"3102" "exp3" 1 79 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 502 14 1
"3102" "exp3" 1 80 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 1309 52 1
"3102" "exp3" 1 81 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1781 0 0
"3102" "exp3" 1 82 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1045 18 1
"3102" "exp3" 1 83 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1369 37 1
"3102" "exp3" 1 84 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 755 17 1
"3102" "exp3" 1 85 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 761 0 0
"3102" "exp3" 1 86 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 599 15 1
"3102" "exp3" 1 87 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 467 17 1
"3102" "exp3" 1 88 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 884 19 1
"3102" "exp3" 1 89 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 681 35 1
"3102" "exp3" 1 90 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 605 23 1
"3102" "exp3" 1 91 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 551 26 1
"3102" "exp3" 1 92 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 835 0 0
"3102" "exp3" 1 93 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 633 31 1
"3102" "exp3" 1 94 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 788 0 0
"3102" "exp3" 1 95 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1522 49 1
"3102" "exp3" 1 96 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1431 39 1
"3102" "exp3" 1 97 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 589 26 1
"3102" "exp3" 1 98 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 745 0 0
"3102" "exp3" 1 99 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 853 27 1
"3102" "exp3" 1 100 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1066 0 0
"3102" "exp3" 1 101 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1639 0 0
"3102" "exp3" 1 102 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 3177 0 0
"3102" "exp3" 1 103 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 594 30 1
"3102" "exp3" 1 104 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 779 23 1
"3102" "exp3" 1 105 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 674 27 1
"3102" "exp3" 1 106 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 610 20 1
"3102" "exp3" 1 107 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 806 33 1
"3102" "exp3" 1 108 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 623 44 1
"3102" "exp3" 1 109 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 599 28 1
"3102" "exp3" 1 110 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 533 36 1
"3102" "exp3" 1 111 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 601 22 1
"3102" "exp3" 1 112 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 511 3 1
"3102" "exp3" 1 113 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 909 68 1
"3102" "exp3" 1 114 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 589 25 1
"3102" "exp3" 1 115 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 513 14 1
"3102" "exp3" 1 116 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 709 13 1
"3102" "exp3" 1 117 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 615 15 1
"3102" "exp3" 1 118 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 544 27 1
"3102" "exp3" 1 119 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1070 0 0
"3102" "exp3" 1 120 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1339 0 0
"3102" "exp3" 1 121 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 609 35 1
"3102" "exp3" 1 122 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 460 0 0
"3102" "exp3" 1 123 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 471 20 1
"3102" "exp3" 1 124 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 486 31 1
"3102" "exp3" 1 125 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 891 17 1
"3102" "exp3" 1 126 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 749 24 1
"3102" "exp3" 1 127 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 705 23 1
"3102" "exp3" 1 128 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1214 0 0
"3102" "exp3" 1 129 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 712 18 1
"3102" "exp3" 1 130 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 662 21 1
"3102" "exp3" 1 131 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 824 92 1
"3102" "exp3" 1 132 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1137 30 1
"3102" "exp3" 2 1 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 504 17 1
"3102" "exp3" 2 2 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 511 18 1
"3102" "exp3" 2 3 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 439 12 1
"3102" "exp3" 2 4 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 545 30 1
"3102" "exp3" 2 5 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 657 0 0
"3102" "exp3" 2 6 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1166 33 1
"3102" "exp3" 2 7 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 747 0 0
"3102" "exp3" 2 8 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 747 23 1
"3102" "exp3" 2 9 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 814 0 0
"3102" "exp3" 2 10 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 815 33 1
"3102" "exp3" 2 11 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 592 0 0
"3102" "exp3" 2 12 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1782 47 1
"3102" "exp3" 2 13 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 984 0 0
"3102" "exp3" 2 14 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1048 10 1
"3102" "exp3" 2 15 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 895 22 1
"3102" "exp3" 2 16 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1654 0 0
"3102" "exp3" 2 17 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 769 0 0
"3102" "exp3" 2 18 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2059 45 1
"3102" "exp3" 2 19 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1226 38 1
"3102" "exp3" 2 20 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1356 0 0
"3102" "exp3" 2 21 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1141 10 1
"3102" "exp3" 2 22 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1106 0 0
"3102" "exp3" 2 23 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1488 36 1
"3102" "exp3" 2 24 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 895 0 0
"3102" "exp3" 2 25 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1092 28 1
"3102" "exp3" 2 26 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 753 0 0
"3102" "exp3" 2 27 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 639 28 1
"3102" "exp3" 2 28 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 658 0 0
"3102" "exp3" 2 29 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 726 15 1
"3102" "exp3" 2 30 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1340 68 1
"3102" "exp3" 2 31 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 543 21 1
"3102" "exp3" 2 32 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 620 0 0
"3102" "exp3" 2 33 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1575 57 1
"3102" "exp3" 2 34 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1213 0 0
"3102" "exp3" 2 35 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 877 37 1
"3102" "exp3" 2 36 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 973 31 1
"3102" "exp3" 2 37 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 810 36 1
"3102" "exp3" 2 38 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 763 35 1
"3102" "exp3" 2 39 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1167 0 0
"3102" "exp3" 2 40 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1108 63 1
"3102" "exp3" 2 41 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 814 0 0
"3102" "exp3" 2 42 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1050 17 1
"3102" "exp3" 2 43 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1414 0 0
"3102" "exp3" 2 44 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 598 26 1
"3102" "exp3" 2 45 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 522 22 1
"3102" "exp3" 2 46 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 623 0 0
"3102" "exp3" 2 47 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 862 29 1
"3102" "exp3" 2 48 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 454 14 1
"3102" "exp3" 2 49 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 682 46 1
"3102" "exp3" 2 50 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 665 45 1
"3102" "exp3" 2 51 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 657 42 1
"3102" "exp3" 2 52 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 668 0 0
"3102" "exp3" 2 53 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 576 0 0
"3102" "exp3" 2 54 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 523 19 1
"3102" "exp3" 2 55 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 568 23 1
"3102" "exp3" 2 56 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 591 0 0
"3102" "exp3" 2 57 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 695 0 0
"3102" "exp3" 2 58 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 563 22 1
"3102" "exp3" 2 59 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 557 17 1
"3102" "exp3" 2 60 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 610 0 0
"3102" "exp3" 2 61 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 868 26 1
"3102" "exp3" 2 62 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 589 34 1
"3102" "exp3" 2 63 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 804 13 1
"3102" "exp3" 2 64 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 684 21 1
"3102" "exp3" 2 65 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 941 0 0
"3102" "exp3" 2 66 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 605 0 0
"3102" "exp3" 2 67 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 569 0 0
"3102" "exp3" 2 68 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 603 0 0
"3102" "exp3" 2 69 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 559 12 1
"3102" "exp3" 2 70 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 2030 0 0
"3102" "exp3" 2 71 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 605 19 1
"3102" "exp3" 2 72 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1489 44 1
"3102" "exp3" 2 73 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 907 23 1
"3102" "exp3" 2 74 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 572 0 0
"3102" "exp3" 2 75 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 671 0 0
"3102" "exp3" 2 76 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 1331 0 0
"3102" "exp3" 2 77 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 907 24 1
"3102" "exp3" 2 78 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 491 23 1
"3102" "exp3" 2 79 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 548 13 1
"3102" "exp3" 2 80 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 509 0 0
"3102" "exp3" 2 81 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 903 32 1
"3102" "exp3" 2 82 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 549 32 1
"3102" "exp3" 2 83 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 728 0 0
"3102" "exp3" 2 84 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 887 21 1
"3102" "exp3" 2 85 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 518 11 1
"3102" "exp3" 2 86 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 573 36 1
"3102" "exp3" 2 87 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 2935 40 1
"3102" "exp3" 2 88 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 708 96 1
"3102" "exp3" 2 89 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 527 9 1
"3102" "exp3" 2 90 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 792 0 0
"3102" "exp3" 2 91 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1231 0 0
"3102" "exp3" 2 92 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1260 0 0
"3102" "exp3" 2 93 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1022 0 0
"3102" "exp3" 2 94 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 884 0 0
"3102" "exp3" 2 95 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1673 0 0
"3102" "exp3" 2 96 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 824 22 1
"3102" "exp3" 2 97 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 728 14 1
"3102" "exp3" 2 98 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 766 0 0
"3102" "exp3" 2 99 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 740 25 1
"3102" "exp3" 2 100 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 651 30 1
"3102" "exp3" 2 101 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1708 65 1
"3102" "exp3" 2 102 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1060 40 1
"3102" "exp3" 2 103 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 823 0 0
"3102" "exp3" 2 104 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1828 44 1
"3102" "exp3" 2 105 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1037 41 1
"3102" "exp3" 2 106 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 2096 0 0
"3102" "exp3" 2 107 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 907 34 1
"3102" "exp3" 2 108 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 846 19 1
"3102" "exp3" 2 109 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 588 20 1
"3102" "exp3" 2 110 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 633 29 1
"3102" "exp3" 2 111 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 500 16 1
"3102" "exp3" 2 112 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 512 0 0
"3102" "exp3" 2 113 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 595 0 0
"3102" "exp3" 2 114 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 632 0 0
"3102" "exp3" 2 115 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 921 17 1
"3102" "exp3" 2 116 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 768 28 1
"3102" "exp3" 2 117 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 569 43 1
"3102" "exp3" 2 118 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 605 0 0
"3102" "exp3" 2 119 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 696 0 0
"3102" "exp3" 2 120 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1091 0 0
"3102" "exp3" 2 121 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 646 25 1
"3102" "exp3" 2 122 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 626 0 0
"3102" "exp3" 2 123 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 557 5 1
"3102" "exp3" 2 124 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 642 24 1
"3102" "exp3" 2 125 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 540 0 0
"3102" "exp3" 2 126 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 655 25 1
"3102" "exp3" 2 127 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 748 24 1
"3102" "exp3" 2 128 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 696 15 1
"3102" "exp3" 2 129 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 520 18 1
"3102" "exp3" 2 130 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 529 20 1
"3102" "exp3" 2 131 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 680 27 1
"3102" "exp3" 2 132 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 758 14 1
"3102" "exp3" 1 1 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 1448 8 1
"3102" "exp3" 1 2 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2041 63 1
"3102" "exp3" 1 3 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1337 14 1
"3102" "exp3" 1 4 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1348 23 1
"3102" "exp3" 1 5 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2157 17 1
"3102" "exp3" 1 6 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1512 44 1
"3102" "exp3" 1 7 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1859 0 0
"3102" "exp3" 1 8 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1373 0 0
"3102" "exp3" 1 9 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1299 12 1
"3102" "exp3" 1 10 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 875 0 0
"3102" "exp3" 1 11 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1249 0 0
"3102" "exp3" 1 12 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 4208 0 0
"3102" "exp3" 1 13 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1726 0 0
"3102" "exp3" 1 14 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1431 26 1
"3102" "exp3" 1 15 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 766 34 1
"3102" "exp3" 1 16 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 887 14 1
"3102" "exp3" 1 17 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1042 0 0
"3102" "exp3" 1 18 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 747 15 1
"3102" "exp3" 1 19 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2658 44 1
"3102" "exp3" 1 20 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1529 26 1
"3102" "exp3" 1 21 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1564 30 1
"3102" "exp3" 1 22 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1124 31 1
"3102" "exp3" 1 23 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 2455 10 1
"3102" "exp3" 1 24 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1140 23 1
"3102" "exp3" 1 25 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 668 0 0
"3102" "exp3" 1 26 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 2251 16 1
"3102" "exp3" 1 27 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 4009 0 0
"3102" "exp3" 1 28 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1593 0 0
"3102" "exp3" 1 29 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1317 38 1
"3102" "exp3" 1 30 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1083 19 1
"3102" "exp3" 1 31 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 961 0 0
"3102" "exp3" 1 32 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 5066 0 0
"3102" "exp3" 1 33 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 3392 9 1
"3102" "exp3" 1 34 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2927 0 0
"3102" "exp3" 1 35 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1200 40 1
"3102" "exp3" 1 36 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 948 15 1
"3102" "exp3" 1 37 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1186 36 1
"3102" "exp3" 1 38 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1566 13 1
"3102" "exp3" 1 39 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2407 33 1
"3102" "exp3" 1 40 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 857 23 1
"3102" "exp3" 1 41 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 845 32 1
"3102" "exp3" 1 42 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 765 0 0
"3102" "exp3" 1 43 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 826 18 1
"3102" "exp3" 1 44 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1872 0 0
"3102" "exp3" 1 45 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1258 0 0
"3102" "exp3" 1 46 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 5576 0 0
"3102" "exp3" 1 47 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1843 46 1
"3102" "exp3" 1 48 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1252 0 0
"3102" "exp3" 1 49 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1068 30 1
"3102" "exp3" 1 50 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1451 0 0
"3102" "exp3" 1 51 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 694 0 0
"3102" "exp3" 1 52 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 3834 99 1
"3102" "exp3" 1 53 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 923 29 1
"3102" "exp3" 1 54 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 779 16 1
"3102" "exp3" 1 55 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 965 39 1
"3102" "exp3" 1 56 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 758 22 1
"3102" "exp3" 1 57 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1712 0 0
"3102" "exp3" 1 58 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 986 0 0
"3102" "exp3" 1 59 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1258 11 1
"3102" "exp3" 1 60 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1428 22 1
"3102" "exp3" 1 61 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1015 0 0
"3102" "exp3" 1 62 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 868 37 1
"3102" "exp3" 1 63 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 772 35 1
"3102" "exp3" 1 64 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1665 0 0
"3102" "exp3" 1 65 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1417 0 0
"3102" "exp3" 1 66 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 914 27 1
"3102" "exp3" 1 67 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 687 0 0
"3102" "exp3" 1 68 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 772 0 0
"3102" "exp3" 1 69 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1405 47 1
"3102" "exp3" 1 70 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 601 0 0
"3102" "exp3" 1 71 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 741 24 1
"3102" "exp3" 1 72 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 872 95 1
"3102" "exp3" 1 73 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2365 93 1
"3102" "exp3" 1 74 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 933 41 1
"3102" "exp3" 1 75 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 846 26 1
"3102" "exp3" 1 76 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 939 29 1
"3102" "exp3" 1 77 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 841 22 1
"3102" "exp3" 1 78 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 609 25 1
"3102" "exp3" 1 79 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 594 34 1
"3102" "exp3" 1 80 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1099 0 0
"3102" "exp3" 1 81 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 707 21 1
"3102" "exp3" 1 82 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1013 18 1
"3102" "exp3" 1 83 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 574 31 1
"3102" "exp3" 1 84 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 922 14 1
"3102" "exp3" 1 85 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 572 0 0
"3102" "exp3" 1 86 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1386 0 0
"3102" "exp3" 1 87 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1142 94 1
"3102" "exp3" 1 88 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1051 32 1
"3102" "exp3" 1 89 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1197 17 1
"3102" "exp3" 1 90 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 866 0 0
"3102" "exp3" 1 91 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 2581 0 0
"3102" "exp3" 1 92 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1590 28 1
"3102" "exp3" 1 93 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 2727 35 1
"3102" "exp3" 1 94 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 853 21 1
"3102" "exp3" 1 95 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 787 19 1
"3102" "exp3" 1 96 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1299 25 1
"3102" "exp3" 1 97 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1513 0 0
"3102" "exp3" 1 98 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1066 18 1
"3102" "exp3" 1 99 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1671 0 0
"3102" "exp3" 1 100 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1082 0 0
"3102" "exp3" 1 101 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1003 17 1
"3102" "exp3" 1 102 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 903 0 0
"3102" "exp3" 1 103 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2429 20 1
"3102" "exp3" 1 104 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1948 32 1
"3102" "exp3" 1 105 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 902 18 1
"3102" "exp3" 1 106 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2944 0 0
"3102" "exp3" 1 107 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 2059 21 1
"3102" "exp3" 1 108 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3159 67 1
"3102" "exp3" 1 109 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 2258 0 0
"3102" "exp3" 1 110 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 784 28 1
"3102" "exp3" 1 111 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 571 41 1
"3102" "exp3" 1 112 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1881 43 1
"3102" "exp3" 1 113 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1238 0 0
"3102" "exp3" 1 114 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1069 31 1
"3102" "exp3" 1 115 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 3723 13 1
"3102" "exp3" 1 116 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 971 0 0
"3102" "exp3" 1 117 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 6586 15 1
"3102" "exp3" 1 118 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1434 0 0
"3102" "exp3" 1 119 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 683 0 0
"3102" "exp3" 1 120 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 670 36 1
"3102" "exp3" 1 121 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 949 25 1
"3102" "exp3" 1 122 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 5433 36 1
"3102" "exp3" 1 123 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 3306 11 1
"3102" "exp3" 1 124 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 1375 0 0
"3102" "exp3" 1 125 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 891 0 0
"3102" "exp3" 1 126 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1624 23 1
"3102" "exp3" 1 127 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 2159 26 1
"3102" "exp3" 1 128 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1000 28 1
"3102" "exp3" 1 129 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 713 21 1
"3102" "exp3" 1 130 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1274 92 1
"3102" "exp3" 1 131 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 910 24 1
"3102" "exp3" 1 132 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1425 22 1
"3102" "exp3" 2 1 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1224 0 0
"3102" "exp3" 2 2 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 698 0 0
"3102" "exp3" 2 3 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 686 28 1
"3102" "exp3" 2 4 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 573 41 1
"3102" "exp3" 2 5 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 602 26 1
"3102" "exp3" 2 6 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 987 21 1
"3102" "exp3" 2 7 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2052 0 0
"3102" "exp3" 2 8 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 917 12 1
"3102" "exp3" 2 9 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 930 20 1
"3102" "exp3" 2 10 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1356 0 0
"3102" "exp3" 2 11 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1758 0 0
"3102" "exp3" 2 12 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 4315 11 1
"3102" "exp3" 2 13 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 2400 31 1
"3102" "exp3" 2 14 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1343 10 1
"3102" "exp3" 2 15 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1586 0 0
"3102" "exp3" 2 16 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1195 22 1
"3102" "exp3" 2 17 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 924 0 0
"3102" "exp3" 2 18 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 921 16 1
"3102" "exp3" 2 19 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1034 0 0
"3102" "exp3" 2 20 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1140 17 1
"3102" "exp3" 2 21 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1032 19 1
"3102" "exp3" 2 22 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 935 18 1
"3102" "exp3" 2 23 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 756 30 1
"3102" "exp3" 2 24 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 738 30 1
"3102" "exp3" 2 25 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1636 46 1
"3102" "exp3" 2 26 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 899 0 0
"3102" "exp3" 2 27 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1208 22 1
"3102" "exp3" 2 28 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 568 0 0
"3102" "exp3" 2 29 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 735 0 0
"3102" "exp3" 2 30 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 808 97 1
"3102" "exp3" 2 31 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 713 16 1
"3102" "exp3" 2 32 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1543 24 1
"3102" "exp3" 2 33 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 698 18 1
"3102" "exp3" 2 34 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 869 33 1
"3102" "exp3" 2 35 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 579 0 0
"3102" "exp3" 2 36 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1586 0 0
"3102" "exp3" 2 37 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1284 29 1
"3102" "exp3" 2 38 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1013 0 0
"3102" "exp3" 2 39 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1290 0 0
"3102" "exp3" 2 40 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1208 24 1
"3102" "exp3" 2 41 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1271 0 0
"3102" "exp3" 2 42 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1827 15 1
"3102" "exp3" 2 43 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2274 27 1
"3102" "exp3" 2 44 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 692 28 1
"3102" "exp3" 2 45 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 603 20 1
"3102" "exp3" 2 46 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 630 0 0
"3102" "exp3" 2 47 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 895 27 1
"3102" "exp3" 2 48 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 2919 0 0
"3102" "exp3" 2 49 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1958 0 0
"3102" "exp3" 2 50 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 3200 22 1
"3102" "exp3" 2 51 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 3943 0 0
"3102" "exp3" 2 52 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1169 0 0
"3102" "exp3" 2 53 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1754 29 1
"3102" "exp3" 2 54 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2967 42 1
"3102" "exp3" 2 55 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2525 0 0
"3102" "exp3" 2 56 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2057 40 1
"3102" "exp3" 2 57 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 6226 21 1
"3102" "exp3" 2 58 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 739 16 1
"3102" "exp3" 2 59 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 694 35 1
"3102" "exp3" 2 60 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 978 0 0
"3102" "exp3" 2 61 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 907 25 1
"3102" "exp3" 2 62 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1169 43 1
"3102" "exp3" 2 63 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 495 0 0
"3102" "exp3" 2 64 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1472 34 1
"3102" "exp3" 2 65 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 779 25 1
"3102" "exp3" 2 66 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 744 0 0
"3102" "exp3" 2 67 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 574 0 0
"3102" "exp3" 2 68 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 903 21 1
"3102" "exp3" 2 69 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 823 32 1
"3102" "exp3" 2 70 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 784 0 0
"3102" "exp3" 2 71 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 601 0 0
"3102" "exp3" 2 72 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 2795 17 1
"3102" "exp3" 2 73 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1291 44 1
"3102" "exp3" 2 74 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 681 0 0
"3102" "exp3" 2 75 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 573 20 1
"3102" "exp3" 2 76 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 827 23 1
"3102" "exp3" 2 77 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 573 24 1
"3102" "exp3" 2 78 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1337 33 1
"3102" "exp3" 2 79 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 948 37 1
"3102" "exp3" 2 80 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1161 13 1
"3102" "exp3" 2 81 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 646 0 0
"3102" "exp3" 2 82 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 704 0 0
"3102" "exp3" 2 83 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1219 15 1
"3102" "exp3" 2 84 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1203 0 0
"3102" "exp3" 2 85 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1140 23 1
"3102" "exp3" 2 86 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1177 19 1
"3102" "exp3" 2 87 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 685 21 1
"3102" "exp3" 2 88 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1116 0 0
"3102" "exp3" 2 89 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 753 20 1
"3102" "exp3" 2 90 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 909 0 0
"3102" "exp3" 2 91 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 756 0 0
"3102" "exp3" 2 92 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 893 0 0
"3102" "exp3" 2 93 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1229 23 1
"3102" "exp3" 2 94 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1100 0 0
"3102" "exp3" 2 95 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 943 0 0
"3102" "exp3" 2 96 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 841 45 1
"3102" "exp3" 2 97 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 723 14 1
"3102" "exp3" 2 98 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 610 35 1
"3102" "exp3" 2 99 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 628 34 1
"3102" "exp3" 2 100 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 551 33 1
"3102" "exp3" 2 101 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 767 0 0
"3102" "exp3" 2 102 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 733 0 0
"3102" "exp3" 2 103 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1043 15 1
"3102" "exp3" 2 104 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 954 0 0
"3102" "exp3" 2 105 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 917 0 0
"3102" "exp3" 2 106 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 690 11 1
"3102" "exp3" 2 107 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 814 34 1
"3102" "exp3" 2 108 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 719 0 0
"3102" "exp3" 2 109 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 581 0 0
"3102" "exp3" 2 110 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 580 28 1
"3102" "exp3" 2 111 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 587 14 1
"3102" "exp3" 2 112 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 972 36 1
"3102" "exp3" 2 113 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 521 29 1
"3102" "exp3" 2 114 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 494 26 1
"3102" "exp3" 2 115 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 564 43 1
"3102" "exp3" 2 116 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 726 19 1
"3102" "exp3" 2 117 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 507 28 1
"3102" "exp3" 2 118 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 584 30 1
"3102" "exp3" 2 119 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1441 13 1
"3102" "exp3" 2 120 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2413 0 0
"3102" "exp3" 2 121 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1424 13 1
"3102" "exp3" 2 122 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 759 31 1
"3102" "exp3" 2 123 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 631 36 1
"3102" "exp3" 2 124 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 725 0 0
"3102" "exp3" 2 125 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1193 32 1
"3102" "exp3" 2 126 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 2706 0 0
"3102" "exp3" 2 127 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1001 17 1
"3102" "exp3" 2 128 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 555 22 1
"3102" "exp3" 2 129 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 688 38 1
"3102" "exp3" 2 130 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1766 0 0
"3102" "exp3" 2 131 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 827 33 1
"3102" "exp3" 2 132 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1340 0 0
"3102" "exp3" 1 1 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1685 25 1
"3102" "exp3" 1 2 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 2216 0 0
"3102" "exp3" 1 3 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1360 12 1
"3102" "exp3" 1 4 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 886 18 1
"3102" "exp3" 1 5 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 904 0 0
"3102" "exp3" 1 6 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2386 43 1
"3102" "exp3" 1 7 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1466 24 1
"3102" "exp3" 1 8 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 3404 34 1
"3102" "exp3" 1 9 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1569 0 0
"3102" "exp3" 1 10 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 1388 0 0
"3102" "exp3" 1 11 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1710 25 1
"3102" "exp3" 1 12 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 2758 29 1
"3102" "exp3" 1 13 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1352 0 0
"3102" "exp3" 1 14 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 937 20 1
"3102" "exp3" 1 15 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 2882 60 1
"3102" "exp3" 1 16 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1168 32 1
"3102" "exp3" 1 17 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1513 0 0
"3102" "exp3" 1 18 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1076 20 1
"3102" "exp3" 1 19 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1007 32 1
"3102" "exp3" 1 20 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 2233 87 1
"3102" "exp3" 1 21 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1675 45 1
"3102" "exp3" 1 22 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1434 28 1
"3102" "exp3" 1 23 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1483 72 1
"3102" "exp3" 1 24 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 2060 0 0
"3102" "exp3" 1 25 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1275 41 1
"3102" "exp3" 1 26 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1597 49 1
"3102" "exp3" 1 27 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 2217 0 0
"3102" "exp3" 1 28 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1815 46 1
"3102" "exp3" 1 29 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1161 15 1
"3102" "exp3" 1 30 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2518 16 1
"3102" "exp3" 1 31 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1848 27 1
"3102" "exp3" 1 32 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2041 0 0
"3102" "exp3" 1 33 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1025 13 1
"3102" "exp3" 1 34 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1275 47 1
"3102" "exp3" 1 35 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1076 23 1
"3102" "exp3" 1 36 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1598 22 1
"3102" "exp3" 1 37 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1976 23 1
"3102" "exp3" 1 38 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 812 19 1
"3102" "exp3" 1 39 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1360 0 0
"3102" "exp3" 1 40 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1784 0 0
"3102" "exp3" 1 41 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 2889 61 1
"3102" "exp3" 1 42 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1190 18 1
"3102" "exp3" 1 43 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1470 95 1
"3102" "exp3" 1 44 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1863 17 1
"3102" "exp3" 1 45 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1029 24 1
"3102" "exp3" 1 46 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1642 0 0
"3102" "exp3" 1 47 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1372 0 0
"3102" "exp3" 1 48 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1659 0 0
"3102" "exp3" 1 49 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 4129 64 1
"3102" "exp3" 1 50 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 985 23 1
"3102" "exp3" 1 51 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1009 33 1
"3102" "exp3" 1 52 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 763 27 1
"3102" "exp3" 1 53 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 718 17 1
"3102" "exp3" 1 54 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 991 0 0
"3102" "exp3" 1 55 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1085 16 1
"3102" "exp3" 1 56 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 954 19 1
"3102" "exp3" 1 57 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 768 31 1
"3102" "exp3" 1 58 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1387 0 0
"3102" "exp3" 1 59 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 2031 27 1
"3102" "exp3" 1 60 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1134 21 1
"3102" "exp3" 1 61 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 2563 0 0
"3102" "exp3" 1 62 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 969 0 0
"3102" "exp3" 1 63 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 2673 10 1
"3102" "exp3" 1 64 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 899 14 1
"3102" "exp3" 1 65 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 710 19 1
"3102" "exp3" 1 66 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1169 37 1
"3102" "exp3" 1 67 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1299 11 1
"3102" "exp3" 1 68 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1066 31 1
"3102" "exp3" 1 69 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1610 26 1
"3102" "exp3" 1 70 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 5042 76 1
"3102" "exp3" 1 71 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1100 13 1
"3102" "exp3" 1 72 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1003 0 0
"3102" "exp3" 1 73 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 682 25 1
"3102" "exp3" 1 74 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 934 97 1
"3102" "exp3" 1 75 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 2061 27 1
"3102" "exp3" 1 76 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 867 0 0
"3102" "exp3" 1 77 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 905 35 1
"3102" "exp3" 1 78 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 811 24 1
"3102" "exp3" 1 79 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1073 0 0
"3102" "exp3" 1 80 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 835 29 1
"3102" "exp3" 1 81 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 971 17 1
"3102" "exp3" 1 82 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1310 33 1
"3102" "exp3" 1 83 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 919 22 1
"3102" "exp3" 1 84 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2118 41 1
"3102" "exp3" 1 85 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1419 0 0
"3102" "exp3" 1 86 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1857 0 0
"3102" "exp3" 1 87 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 724 0 0
"3102" "exp3" 1 88 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1034 0 0
"3102" "exp3" 1 89 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1016 0 0
"3102" "exp3" 1 90 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1450 38 1
"3102" "exp3" 1 91 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1259 18 1
"3102" "exp3" 1 92 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1058 11 1
"3102" "exp3" 1 93 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 2969 71 1
"3102" "exp3" 1 94 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1473 0 0
"3102" "exp3" 1 95 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2247 0 0
"3102" "exp3" 1 96 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1122 36 1
"3102" "exp3" 1 97 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1002 0 0
"3102" "exp3" 1 98 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1497 35 1
"3102" "exp3" 1 99 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2460 48 1
"3102" "exp3" 1 100 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1268 31 1
"3102" "exp3" 1 101 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 799 12 1
"3102" "exp3" 1 102 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1912 0 0
"3102" "exp3" 1 103 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1275 22 1
"3102" "exp3" 1 104 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1210 10 1
"3102" "exp3" 1 105 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 4229 17 1
"3102" "exp3" 1 106 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 2360 0 0
"3102" "exp3" 1 107 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 999 22 1
"3102" "exp3" 1 108 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2071 43 1
"3102" "exp3" 1 109 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1408 0 0
"3102" "exp3" 1 110 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1531 29 1
"3102" "exp3" 1 111 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 3137 0 0
"3102" "exp3" 1 112 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 2080 25 1
"3102" "exp3" 1 113 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 3068 0 0
"3102" "exp3" 1 114 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 698 15 1
"3102" "exp3" 1 115 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1497 15 1
"3102" "exp3" 1 116 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 991 0 0
"3102" "exp3" 1 117 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1225 0 0
"3102" "exp3" 1 118 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1835 0 0
"3102" "exp3" 1 119 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1857 0 0
"3102" "exp3" 1 120 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1079 40 1
"3102" "exp3" 1 121 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 943 28 1
"3102" "exp3" 1 122 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1321 42 1
"3102" "exp3" 1 123 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1040 0 0
"3102" "exp3" 1 124 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 665 0 0
"3102" "exp3" 1 125 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1109 0 0
"3102" "exp3" 1 126 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 833 0 0
"3102" "exp3" 1 127 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1508 0 0
"3102" "exp3" 1 128 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1199 21 1
"3102" "exp3" 1 129 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1076 30 1
"3102" "exp3" 1 130 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1183 0 0
"3102" "exp3" 1 131 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 905 0 0
"3102" "exp3" 1 132 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1012 34 1
"3102" "exp3" 2 1 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1899 0 0
"3102" "exp3" 2 2 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1482 11 1
"3102" "exp3" 2 3 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 957 14 1
"3102" "exp3" 2 4 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 992 0 0
"3102" "exp3" 2 5 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 712 0 0
"3102" "exp3" 2 6 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1197 42 1
"3102" "exp3" 2 7 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 2468 17 1
"3102" "exp3" 2 8 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 740 27 1
"3102" "exp3" 2 9 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 768 0 0
"3102" "exp3" 2 10 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1395 37 1
"3102" "exp3" 2 11 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 2109 22 1
"3102" "exp3" 2 12 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1061 29 1
"3102" "exp3" 2 13 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1987 24 1
"3102" "exp3" 2 14 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 886 34 1
"3102" "exp3" 2 15 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1040 0 0
"3102" "exp3" 2 16 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 814 22 1
"3102" "exp3" 2 17 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 4350 0 0
"3102" "exp3" 2 18 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 869 21 1
"3102" "exp3" 2 19 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1269 25 1
"3102" "exp3" 2 20 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1108 15 1
"3102" "exp3" 2 21 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 888 91 1
"3102" "exp3" 2 22 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1089 0 0
"3102" "exp3" 2 23 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1194 28 1
"3102" "exp3" 2 24 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 780 0 0
"3102" "exp3" 2 25 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 681 32 1
"3102" "exp3" 2 26 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 770 0 0
"3102" "exp3" 2 27 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2367 46 1
"3102" "exp3" 2 28 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 874 12 1
"3102" "exp3" 2 29 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2964 0 0
"3102" "exp3" 2 30 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 4005 0 0
"3102" "exp3" 2 31 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 4036 33 1
"3102" "exp3" 2 32 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1252 38 1
"3102" "exp3" 2 33 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1651 29 1
"3102" "exp3" 2 34 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1331 0 0
"3102" "exp3" 2 35 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 874 36 1
"3102" "exp3" 2 36 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 743 26 1
"3102" "exp3" 2 37 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 612 35 1
"3102" "exp3" 2 38 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1398 23 1
"3102" "exp3" 2 39 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 819 0 0
"3102" "exp3" 2 40 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 3209 61 1
"3102" "exp3" 2 41 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 687 33 1
"3102" "exp3" 2 42 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1896 65 1
"3102" "exp3" 2 43 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1368 0 0
"3102" "exp3" 2 44 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 884 0 0
"3102" "exp3" 2 45 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 677 21 1
"3102" "exp3" 2 46 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 641 37 1
"3102" "exp3" 2 47 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 577 28 1
"3102" "exp3" 2 48 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 958 0 0
"3102" "exp3" 2 49 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 768 28 1
"3102" "exp3" 2 50 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 3229 0 0
"3102" "exp3" 2 51 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1352 45 1
"3102" "exp3" 2 52 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 2026 11 1
"3102" "exp3" 2 53 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 729 18 1
"3102" "exp3" 2 54 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1708 30 1
"3102" "exp3" 2 55 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1804 35 1
"3102" "exp3" 2 56 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 862 30 1
"3102" "exp3" 2 57 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 2695 60 1
"3102" "exp3" 2 58 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 950 0 0
"3102" "exp3" 2 59 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 995 17 1
"3102" "exp3" 2 60 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 603 34 1
"3102" "exp3" 2 61 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 784 10 1
"3102" "exp3" 2 62 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2081 0 0
"3102" "exp3" 2 63 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2295 66 1
"3102" "exp3" 2 64 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 820 0 0
"3102" "exp3" 2 65 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1106 24 1
"3102" "exp3" 2 66 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 657 18 1
"3102" "exp3" 2 67 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1653 0 0
"3102" "exp3" 2 68 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 771 18 1
"3102" "exp3" 2 69 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 874 0 0
"3102" "exp3" 2 70 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2027 0 0
"3102" "exp3" 2 71 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1140 95 1
"3102" "exp3" 2 72 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 949 0 0
"3102" "exp3" 2 73 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1081 14 1
"3102" "exp3" 2 74 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 637 20 1
"3102" "exp3" 2 75 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1140 10 1
"3102" "exp3" 2 76 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2462 0 0
"3102" "exp3" 2 77 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 4373 13 1
"3102" "exp3" 2 78 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 910 24 1
"3102" "exp3" 2 79 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 653 19 1
"3102" "exp3" 2 80 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 842 31 1
"3102" "exp3" 2 81 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1661 74 1
"3102" "exp3" 2 82 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2099 0 0
"3102" "exp3" 2 83 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 968 0 0
"3102" "exp3" 2 84 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 2506 0 0
"3102" "exp3" 2 85 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1002 19 1
"3102" "exp3" 2 86 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 848 26 1
"3102" "exp3" 2 87 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 948 93 1
"3102" "exp3" 2 88 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 974 25 1
"3102" "exp3" 2 89 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1560 36 1
"3102" "exp3" 2 90 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 885 25 1
"3102" "exp3" 2 91 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1191 0 0
"3102" "exp3" 2 92 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 906 0 0
"3102" "exp3" 2 93 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1305 42 1
"3102" "exp3" 2 94 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1183 0 0
"3102" "exp3" 2 95 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1621 0 0
"3102" "exp3" 2 96 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1019 0 0
"3102" "exp3" 2 97 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1094 13 1
"3102" "exp3" 2 98 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 3751 26 1
"3102" "exp3" 2 99 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1511 44 1
"3102" "exp3" 2 100 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 858 19 1
"3102" "exp3" 2 101 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1309 41 1
"3102" "exp3" 2 102 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 3759 0 0
"3102" "exp3" 2 103 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 3727 0 0
"3102" "exp3" 2 104 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 967 47 1
"3102" "exp3" 2 105 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 2603 71 1
"3102" "exp3" 2 106 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 825 21 1
"3102" "exp3" 2 107 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 737 24 1
"3102" "exp3" 2 108 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 973 39 1
"3102" "exp3" 2 109 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1951 17 1
"3102" "exp3" 2 110 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1403 0 0
"3102" "exp3" 2 111 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 907 20 1
"3102" "exp3" 2 112 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 855 16 1
"3102" "exp3" 2 113 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 706 21 1
"3102" "exp3" 2 114 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2308 0 0
"3102" "exp3" 2 115 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 734 14 1
"3102" "exp3" 2 116 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 771 92 1
"3102" "exp3" 2 117 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1358 27 1
"3102" "exp3" 2 118 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 545 18 1
"3102" "exp3" 2 119 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 599 19 1
"3102" "exp3" 2 120 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 618 23 1
"3102" "exp3" 2 121 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 713 25 1
"3102" "exp3" 2 122 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1618 48 1
"3102" "exp3" 2 123 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 2199 36 1
"3102" "exp3" 2 124 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1599 0 0
"3102" "exp3" 2 125 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 967 0 0
"3102" "exp3" 2 126 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 7698 15 1
"3102" "exp3" 2 127 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 2726 0 0
"3102" "exp3" 2 128 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1428 16 1
"3102" "exp3" 2 129 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1373 15 1
"3102" "exp3" 2 130 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 972 93 1
"3102" "exp3" 2 131 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 2587 0 0
"3102" "exp3" 2 132 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1068 12 1
"3103" "exp3" 1 1 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 554 0 0
"3103" "exp3" 1 2 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 595 15 1
"3103" "exp3" 1 3 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 544 0 0
"3103" "exp3" 1 4 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 519 1 1
"3103" "exp3" 1 5 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 502 0 0
"3103" "exp3" 1 6 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 394 21 1
"3103" "exp3" 1 7 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 579 31 1
"3103" "exp3" 1 8 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 478 0 0
"3103" "exp3" 1 9 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 416 0 0
"3103" "exp3" 1 10 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 482 0 0
"3103" "exp3" 1 11 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 437 34 1
"3103" "exp3" 1 12 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 486 33 1
"3103" "exp3" 1 13 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 410 9 1
"3103" "exp3" 1 14 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 321 0 0
"3103" "exp3" 1 15 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 494 23 1
"3103" "exp3" 1 16 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 410 17 1
"3103" "exp3" 1 17 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 544 18 1
"3103" "exp3" 1 18 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 513 20 1
"3103" "exp3" 1 19 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 585 4 1
"3103" "exp3" 1 20 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 754 23 1
"3103" "exp3" 1 21 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 891 0 0
"3103" "exp3" 1 22 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 508 0 0
"3103" "exp3" 1 23 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 506 19 1
"3103" "exp3" 1 24 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 537 0 0
"3103" "exp3" 1 25 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 610 28 1
"3103" "exp3" 1 26 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 509 13 1
"3103" "exp3" 1 27 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 646 15 1
"3103" "exp3" 1 28 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 532 25 1
"3103" "exp3" 1 29 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 413 0 0
"3103" "exp3" 1 30 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 507 21 1
"3103" "exp3" 1 31 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 468 0 0
"3103" "exp3" 1 32 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 553 31 1
"3103" "exp3" 1 33 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 573 0 0
"3103" "exp3" 1 34 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 413 25 1
"3103" "exp3" 1 35 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 634 28 1
"3103" "exp3" 1 36 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1772 0 0
"3103" "exp3" 1 37 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 956 35 1
"3103" "exp3" 1 38 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 675 0 0
"3103" "exp3" 1 39 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1249 0 0
"3103" "exp3" 1 40 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1150 40 1
"3103" "exp3" 1 41 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 650 25 1
"3103" "exp3" 1 42 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 741 23 1
"3103" "exp3" 1 43 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 815 14 1
"3103" "exp3" 1 44 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 753 17 1
"3103" "exp3" 1 45 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 803 32 1
"3103" "exp3" 1 46 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 969 34 1
"3103" "exp3" 1 47 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 657 11 1
"3103" "exp3" 1 48 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 596 0 0
"3103" "exp3" 1 49 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1000 32 1
"3103" "exp3" 1 50 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 758 11 1
"3103" "exp3" 1 51 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 887 14 1
"3103" "exp3" 1 52 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 682 0 0
"3103" "exp3" 1 53 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 676 36 1
"3103" "exp3" 1 54 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 517 0 0
"3103" "exp3" 1 55 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 561 5 1
"3103" "exp3" 1 56 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 529 35 1
"3103" "exp3" 1 57 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 658 0 0
"3103" "exp3" 1 58 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 491 31 1
"3103" "exp3" 1 59 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 626 0 0
"3103" "exp3" 1 60 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 501 18 1
"3103" "exp3" 1 61 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 606 6 1
"3103" "exp3" 1 62 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 592 0 0
"3103" "exp3" 1 63 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 674 33 1
"3103" "exp3" 1 64 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 643 27 1
"3103" "exp3" 1 65 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 676 39 1
"3103" "exp3" 1 66 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 476 29 1
"3103" "exp3" 1 67 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 378 47 1
"3103" "exp3" 1 68 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 592 0 0
"3103" "exp3" 1 69 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 659 0 0
"3103" "exp3" 1 70 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 569 36 1
"3103" "exp3" 1 71 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 671 29 1
"3103" "exp3" 1 72 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 485 16 1
"3103" "exp3" 1 73 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 486 44 1
"3103" "exp3" 1 74 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 752 27 1
"3103" "exp3" 1 75 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 662 15 1
"3103" "exp3" 1 76 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 433 0 0
"3103" "exp3" 1 77 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 614 12 1
"3103" "exp3" 1 78 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 810 28 1
"3103" "exp3" 1 79 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 580 7 1
"3103" "exp3" 1 80 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 630 0 0
"3103" "exp3" 1 81 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 441 20 1
"3103" "exp3" 1 82 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 650 48 1
"3103" "exp3" 1 83 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 620 26 1
"3103" "exp3" 1 84 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 535 8 1
"3103" "exp3" 1 85 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 483 14 1
"3103" "exp3" 1 86 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 737 22 1
"3103" "exp3" 1 87 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 756 0 0
"3103" "exp3" 1 88 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 732 0 0
"3103" "exp3" 1 89 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 821 8 1
"3103" "exp3" 1 90 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 622 0 0
"3103" "exp3" 1 91 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 838 33 1
"3103" "exp3" 1 92 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 618 3 1
"3103" "exp3" 1 93 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 794 2 1
"3103" "exp3" 1 94 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1486 36 1
"3103" "exp3" 1 95 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1361 19 1
"3103" "exp3" 1 96 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1056 37 1
"3103" "exp3" 1 97 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 740 32 1
"3103" "exp3" 1 98 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 2938 0 0
"3103" "exp3" 1 99 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1481 19 1
"3103" "exp3" 1 100 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 951 22 1
"3103" "exp3" 1 101 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 819 24 1
"3103" "exp3" 1 102 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1102 39 1
"3103" "exp3" 1 103 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 994 0 0
"3103" "exp3" 1 104 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 970 0 0
"3103" "exp3" 1 105 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 686 26 1
"3103" "exp3" 1 106 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 786 10 1
"3103" "exp3" 1 107 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1003 21 1
"3103" "exp3" 1 108 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1003 30 1
"3103" "exp3" 1 109 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 719 22 1
"3103" "exp3" 1 110 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 675 0 0
"3103" "exp3" 1 111 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 650 13 1
"3103" "exp3" 1 112 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1174 0 0
"3103" "exp3" 1 113 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 834 49 1
"3103" "exp3" 1 114 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 945 18 1
"3103" "exp3" 1 115 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1401 0 0
"3103" "exp3" 1 116 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1095 42 1
"3103" "exp3" 1 117 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 807 27 1
"3103" "exp3" 1 118 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1357 6 1
"3103" "exp3" 1 119 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1447 0 0
"3103" "exp3" 1 120 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1046 16 1
"3103" "exp3" 1 121 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1752 0 0
"3103" "exp3" 1 122 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 810 43 1
"3103" "exp3" 1 123 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 711 24 1
"3103" "exp3" 1 124 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 976 26 1
"3103" "exp3" 1 125 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 949 0 0
"3103" "exp3" 1 126 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 909 38 1
"3103" "exp3" 1 127 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 849 16 1
"3103" "exp3" 1 128 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 882 0 0
"3103" "exp3" 1 129 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1883 0 0
"3103" "exp3" 1 130 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 824 19 1
"3103" "exp3" 1 131 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1153 20 1
"3103" "exp3" 1 132 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1900 13 1
"3103" "exp3" 2 1 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 631 21 1
"3103" "exp3" 2 2 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 688 18 1
"3103" "exp3" 2 3 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1359 0 0
"3103" "exp3" 2 4 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1736 14 1
"3103" "exp3" 2 5 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2415 0 0
"3103" "exp3" 2 6 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1145 16 1
"3103" "exp3" 2 7 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1267 95 1
"3103" "exp3" 2 8 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1657 23 1
"3103" "exp3" 2 9 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 960 32 1
"3103" "exp3" 2 10 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1219 35 1
"3103" "exp3" 2 11 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 936 31 1
"3103" "exp3" 2 12 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 686 30 1
"3103" "exp3" 2 13 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 722 19 1
"3103" "exp3" 2 14 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1296 0 0
"3103" "exp3" 2 15 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 780 27 1
"3103" "exp3" 2 16 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 680 0 0
"3103" "exp3" 2 17 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 969 0 0
"3103" "exp3" 2 18 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 833 0 0
"3103" "exp3" 2 19 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1094 0 0
"3103" "exp3" 2 20 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1160 20 1
"3103" "exp3" 2 21 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1128 23 1
"3103" "exp3" 2 22 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 805 0 0
"3103" "exp3" 2 23 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 575 17 1
"3103" "exp3" 2 24 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1044 0 0
"3103" "exp3" 2 25 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 822 0 0
"3103" "exp3" 2 26 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2440 97 1
"3103" "exp3" 2 27 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1114 15 1
"3103" "exp3" 2 28 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 828 25 1
"3103" "exp3" 2 29 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1080 49 1
"3103" "exp3" 2 30 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1325 10 1
"3103" "exp3" 2 31 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 681 0 0
"3103" "exp3" 2 32 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1370 26 1
"3103" "exp3" 2 33 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 797 0 0
"3103" "exp3" 2 34 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 941 33 1
"3103" "exp3" 2 35 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1191 0 0
"3103" "exp3" 2 36 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1086 35 1
"3103" "exp3" 2 37 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1437 0 0
"3103" "exp3" 2 38 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1049 24 1
"3103" "exp3" 2 39 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 822 21 1
"3103" "exp3" 2 40 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 939 0 0
"3103" "exp3" 2 41 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1166 0 0
"3103" "exp3" 2 42 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 868 0 0
"3103" "exp3" 2 43 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1545 14 1
"3103" "exp3" 2 44 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 839 9 1
"3103" "exp3" 2 45 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1117 41 1
"3103" "exp3" 2 46 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1433 0 0
"3103" "exp3" 2 47 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1543 0 0
"3103" "exp3" 2 48 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1327 37 1
"3103" "exp3" 2 49 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1552 0 0
"3103" "exp3" 2 50 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1005 0 0
"3103" "exp3" 2 51 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1761 29 1
"3103" "exp3" 2 52 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 958 20 1
"3103" "exp3" 2 53 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 999 18 1
"3103" "exp3" 2 54 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1352 22 1
"3103" "exp3" 2 55 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1207 30 1
"3103" "exp3" 2 56 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1192 0 0
"3103" "exp3" 2 57 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1769 19 1
"3103" "exp3" 2 58 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1212 38 1
"3103" "exp3" 2 59 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 836 21 1
"3103" "exp3" 2 60 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 910 0 0
"3103" "exp3" 2 61 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1438 44 1
"3103" "exp3" 2 62 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1252 26 1
"3103" "exp3" 2 63 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 893 23 1
"3103" "exp3" 2 64 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 738 0 0
"3103" "exp3" 2 65 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 704 39 1
"3103" "exp3" 2 66 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 673 36 1
"3103" "exp3" 2 67 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 873 22 1
"3103" "exp3" 2 68 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 610 18 1
"3103" "exp3" 2 69 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1232 0 0
"3103" "exp3" 2 70 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 3365 17 1
"3103" "exp3" 2 71 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1442 0 0
"3103" "exp3" 2 72 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 744 0 0
"3103" "exp3" 2 73 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 577 29 1
"3103" "exp3" 2 74 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 567 30 1
"3103" "exp3" 2 75 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 485 16 1
"3103" "exp3" 2 76 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 644 0 0
"3103" "exp3" 2 77 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 605 19 1
"3103" "exp3" 2 78 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 630 6 1
"3103" "exp3" 2 79 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 985 37 1
"3103" "exp3" 2 80 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 750 0 0
"3103" "exp3" 2 81 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1019 0 0
"3103" "exp3" 2 82 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1439 32 1
"3103" "exp3" 2 83 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 957 32 1
"3103" "exp3" 2 84 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 673 22 1
"3103" "exp3" 2 85 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 602 42 1
"3103" "exp3" 2 86 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 785 0 0
"3103" "exp3" 2 87 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 799 37 1
"3103" "exp3" 2 88 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 741 0 0
"3103" "exp3" 2 89 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 878 0 0
"3103" "exp3" 2 90 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1225 26 1
"3103" "exp3" 2 91 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 788 34 1
"3103" "exp3" 2 92 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 877 0 0
"3103" "exp3" 2 93 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 966 0 0
"3103" "exp3" 2 94 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 3786 0 0
"3103" "exp3" 2 95 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 859 11 1
"3103" "exp3" 2 96 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1705 0 0
"3103" "exp3" 2 97 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 648 25 1
"3103" "exp3" 2 98 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 699 34 1
"3103" "exp3" 2 99 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 847 27 1
"3103" "exp3" 2 100 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 837 44 1
"3103" "exp3" 2 101 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1990 31 1
"3103" "exp3" 2 102 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 718 45 1
"3103" "exp3" 2 103 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 755 0 0
"3103" "exp3" 2 104 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 824 18 1
"3103" "exp3" 2 105 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 634 0 0
"3103" "exp3" 2 106 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3180 0 0
"3103" "exp3" 2 107 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 733 17 1
"3103" "exp3" 2 108 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1557 25 1
"3103" "exp3" 2 109 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 904 41 1
"3103" "exp3" 2 110 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1997 0 0
"3103" "exp3" 2 111 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1046 28 1
"3103" "exp3" 2 112 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 656 20 1
"3103" "exp3" 2 113 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1044 0 0
"3103" "exp3" 2 114 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2222 96 1
"3103" "exp3" 2 115 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1598 21 1
"3103" "exp3" 2 116 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1974 13 1
"3103" "exp3" 2 117 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 726 0 0
"3103" "exp3" 2 118 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 951 13 1
"3103" "exp3" 2 119 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1114 43 1
"3103" "exp3" 2 120 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 484 0 0
"3103" "exp3" 2 121 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 500 20 1
"3103" "exp3" 2 122 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 469 40 1
"3103" "exp3" 2 123 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 802 0 0
"3103" "exp3" 2 124 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 577 27 1
"3103" "exp3" 2 125 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 765 48 1
"3103" "exp3" 2 126 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 843 0 0
"3103" "exp3" 2 127 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 786 0 0
"3103" "exp3" 2 128 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 745 29 1
"3103" "exp3" 2 129 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 877 15 1
"3103" "exp3" 2 130 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 923 12 1
"3103" "exp3" 2 131 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 862 0 0
"3103" "exp3" 2 132 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 760 11 1
"3103" "exp3" 1 1 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 587 0 0
"3103" "exp3" 1 2 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 622 0 0
"3103" "exp3" 1 3 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 2127 6 1
"3103" "exp3" 1 4 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 751 14 1
"3103" "exp3" 1 5 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1081 0 0
"3103" "exp3" 1 6 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 622 13 1
"3103" "exp3" 1 7 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 2396 3 1
"3103" "exp3" 1 8 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1119 28 1
"3103" "exp3" 1 9 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 686 0 0
"3103" "exp3" 1 10 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1090 1 1
"3103" "exp3" 1 11 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1124 43 1
"3103" "exp3" 1 12 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1235 0 0
"3103" "exp3" 1 13 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 2330 33 1
"3103" "exp3" 1 14 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 956 17 1
"3103" "exp3" 1 15 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 793 19 1
"3103" "exp3" 1 16 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 740 32 1
"3103" "exp3" 1 17 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 604 49 1
"3103" "exp3" 1 18 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 984 0 0
"3103" "exp3" 1 19 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 906 23 1
"3103" "exp3" 1 20 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 887 38 1
"3103" "exp3" 1 21 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 796 39 1
"3103" "exp3" 1 22 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1098 28 1
"3103" "exp3" 1 23 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 640 0 0
"3103" "exp3" 1 24 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 778 25 1
"3103" "exp3" 1 25 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 833 13 1
"3103" "exp3" 1 26 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 710 0 0
"3103" "exp3" 1 27 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 637 12 1
"3103" "exp3" 1 28 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1624 0 0
"3103" "exp3" 1 29 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 584 24 1
"3103" "exp3" 1 30 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 551 32 1
"3103" "exp3" 1 31 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 709 26 1
"3103" "exp3" 1 32 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 799 22 1
"3103" "exp3" 1 33 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 678 9 1
"3103" "exp3" 1 34 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1269 22 1
"3103" "exp3" 1 35 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 707 28 1
"3103" "exp3" 1 36 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 912 0 0
"3103" "exp3" 1 37 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 540 16 1
"3103" "exp3" 1 38 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 705 0 0
"3103" "exp3" 1 39 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 639 44 1
"3103" "exp3" 1 40 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 577 21 1
"3103" "exp3" 1 41 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 564 30 1
"3103" "exp3" 1 42 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 780 33 1
"3103" "exp3" 1 43 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 557 6 1
"3103" "exp3" 1 44 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 650 21 1
"3103" "exp3" 1 45 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 617 0 0
"3103" "exp3" 1 46 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 578 19 1
"3103" "exp3" 1 47 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 976 7 1
"3103" "exp3" 1 48 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 559 5 1
"3103" "exp3" 1 49 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 808 0 0
"3103" "exp3" 1 50 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 688 0 0
"3103" "exp3" 1 51 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 550 42 1
"3103" "exp3" 1 52 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 584 10 1
"3103" "exp3" 1 53 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 523 24 1
"3103" "exp3" 1 54 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 430 25 1
"3103" "exp3" 1 55 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 531 18 1
"3103" "exp3" 1 56 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 683 0 0
"3103" "exp3" 1 57 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 630 36 1
"3103" "exp3" 1 58 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 497 4 1
"3103" "exp3" 1 59 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 802 43 1
"3103" "exp3" 1 60 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 845 48 1
"3103" "exp3" 1 61 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 926 26 1
"3103" "exp3" 1 62 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 864 17 1
"3103" "exp3" 1 63 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 779 18 1
"3103" "exp3" 1 64 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 922 22 1
"3103" "exp3" 1 65 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 877 15 1
"3103" "exp3" 1 66 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 647 30 1
"3103" "exp3" 1 67 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 527 20 1
"3103" "exp3" 1 68 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 540 0 0
"3103" "exp3" 1 69 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 771 2 1
"3103" "exp3" 1 70 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 850 0 0
"3103" "exp3" 1 71 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 495 29 1
"3103" "exp3" 1 72 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 812 0 0
"3103" "exp3" 1 73 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 601 29 1
"3103" "exp3" 1 74 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 757 19 1
"3103" "exp3" 1 75 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 646 38 1
"3103" "exp3" 1 76 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 582 45 1
"3103" "exp3" 1 77 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 663 15 1
"3103" "exp3" 1 78 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 755 0 0
"3103" "exp3" 1 79 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 582 0 0
"3103" "exp3" 1 80 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 599 41 1
"3103" "exp3" 1 81 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1035 0 0
"3103" "exp3" 1 82 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 763 31 1
"3103" "exp3" 1 83 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 558 0 0
"3103" "exp3" 1 84 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 741 0 0
"3103" "exp3" 1 85 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 950 35 1
"3103" "exp3" 1 86 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 622 30 1
"3103" "exp3" 1 87 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 691 12 1
"3103" "exp3" 1 88 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 662 19 1
"3103" "exp3" 1 89 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 623 26 1
"3103" "exp3" 1 90 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 597 14 1
"3103" "exp3" 1 91 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 599 8 1
"3103" "exp3" 1 92 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 592 29 1
"3103" "exp3" 1 93 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 615 14 1
"3103" "exp3" 1 94 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 442 0 0
"3103" "exp3" 1 95 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 690 18 1
"3103" "exp3" 1 96 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 830 45 1
"3103" "exp3" 1 97 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 438 0 0
"3103" "exp3" 1 98 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 690 0 0
"3103" "exp3" 1 99 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 482 0 0
"3103" "exp3" 1 100 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 601 16 1
"3103" "exp3" 1 101 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 567 23 1
"3103" "exp3" 1 102 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 545 41 1
"3103" "exp3" 1 103 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 700 0 0
"3103" "exp3" 1 104 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 527 27 1
"3103" "exp3" 1 105 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 599 0 0
"3103" "exp3" 1 106 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 759 39 1
"3103" "exp3" 1 107 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 725 0 0
"3103" "exp3" 1 108 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 564 0 0
"3103" "exp3" 1 109 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 696 24 1
"3103" "exp3" 1 110 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 653 27 1
"3103" "exp3" 1 111 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 587 24 1
"3103" "exp3" 1 112 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 586 8 1
"3103" "exp3" 1 113 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 516 0 0
"3103" "exp3" 1 114 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 749 35 1
"3103" "exp3" 1 115 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 651 34 1
"3103" "exp3" 1 116 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 700 0 0
"3103" "exp3" 1 117 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 639 0 0
"3103" "exp3" 1 118 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 648 0 0
"3103" "exp3" 1 119 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 559 11 1
"3103" "exp3" 1 120 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 535 40 1
"3103" "exp3" 1 121 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 672 34 1
"3103" "exp3" 1 122 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 638 17 1
"3103" "exp3" 1 123 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 486 20 1
"3103" "exp3" 1 124 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 618 15 1
"3103" "exp3" 1 125 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1203 0 0
"3103" "exp3" 1 126 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 644 11 1
"3103" "exp3" 1 127 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 487 7 1
"3103" "exp3" 1 128 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 576 21 1
"3103" "exp3" 1 129 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 820 0 0
"3103" "exp3" 1 130 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 628 22 1
"3103" "exp3" 1 131 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 882 23 1
"3103" "exp3" 1 132 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 754 42 1
"3103" "exp3" 2 1 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 726 20 1
"3103" "exp3" 2 2 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 513 22 1
"3103" "exp3" 2 3 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 512 4 1
"3103" "exp3" 2 4 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1188 0 0
"3103" "exp3" 2 5 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 921 13 1
"3103" "exp3" 2 6 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 616 7 1
"3103" "exp3" 2 7 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 681 19 1
"3103" "exp3" 2 8 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 625 25 1
"3103" "exp3" 2 9 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 622 0 0
"3103" "exp3" 2 10 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 614 0 0
"3103" "exp3" 2 11 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 553 0 0
"3103" "exp3" 2 12 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 628 26 1
"3103" "exp3" 2 13 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 557 17 1
"3103" "exp3" 2 14 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 602 6 1
"3103" "exp3" 2 15 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 651 24 1
"3103" "exp3" 2 16 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 767 0 0
"3103" "exp3" 2 17 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 587 18 1
"3103" "exp3" 2 18 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 601 20 1
"3103" "exp3" 2 19 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 569 28 1
"3103" "exp3" 2 20 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1103 47 1
"3103" "exp3" 2 21 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 750 23 1
"3103" "exp3" 2 22 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 824 0 0
"3103" "exp3" 2 23 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 718 28 1
"3103" "exp3" 2 24 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 588 31 1
"3103" "exp3" 2 25 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 658 27 1
"3103" "exp3" 2 26 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1441 24 1
"3103" "exp3" 2 27 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 603 0 0
"3103" "exp3" 2 28 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 415 27 1
"3103" "exp3" 2 29 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 630 8 1
"3103" "exp3" 2 30 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 622 32 1
"3103" "exp3" 2 31 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 893 0 0
"3103" "exp3" 2 32 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 452 0 0
"3103" "exp3" 2 33 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 639 24 1
"3103" "exp3" 2 34 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 584 0 0
"3103" "exp3" 2 35 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 651 14 1
"3103" "exp3" 2 36 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 973 0 0
"3103" "exp3" 2 37 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 534 18 1
"3103" "exp3" 2 38 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1031 0 0
"3103" "exp3" 2 39 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 525 0 0
"3103" "exp3" 2 40 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 570 2 1
"3103" "exp3" 2 41 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 622 25 1
"3103" "exp3" 2 42 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 673 43 1
"3103" "exp3" 2 43 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 696 14 1
"3103" "exp3" 2 44 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 834 45 1
"3103" "exp3" 2 45 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 573 29 1
"3103" "exp3" 2 46 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 532 31 1
"3103" "exp3" 2 47 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 800 49 1
"3103" "exp3" 2 48 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 634 38 1
"3103" "exp3" 2 49 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 918 26 1
"3103" "exp3" 2 50 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 715 34 1
"3103" "exp3" 2 51 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 594 19 1
"3103" "exp3" 2 52 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 835 30 1
"3103" "exp3" 2 53 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 817 5 1
"3103" "exp3" 2 54 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 681 11 1
"3103" "exp3" 2 55 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 760 36 1
"3103" "exp3" 2 56 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 648 10 1
"3103" "exp3" 2 57 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 500 31 1
"3103" "exp3" 2 58 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 596 12 1
"3103" "exp3" 2 59 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 782 15 1
"3103" "exp3" 2 60 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 675 0 0
"3103" "exp3" 2 61 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 619 11 1
"3103" "exp3" 2 62 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 523 20 1
"3103" "exp3" 2 63 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 514 16 1
"3103" "exp3" 2 64 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 586 13 1
"3103" "exp3" 2 65 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 703 27 1
"3103" "exp3" 2 66 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 442 17 1
"3103" "exp3" 2 67 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 615 1 1
"3103" "exp3" 2 68 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 948 0 0
"3103" "exp3" 2 69 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 637 0 0
"3103" "exp3" 2 70 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 558 21 1
"3103" "exp3" 2 71 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 632 37 1
"3103" "exp3" 2 72 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 773 33 1
"3103" "exp3" 2 73 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 629 27 1
"3103" "exp3" 2 74 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 730 0 0
"3103" "exp3" 2 75 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 594 9 1
"3103" "exp3" 2 76 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 505 17 1
"3103" "exp3" 2 77 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 495 22 1
"3103" "exp3" 2 78 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 511 7 1
"3103" "exp3" 2 79 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 521 41 1
"3103" "exp3" 2 80 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 771 6 1
"3103" "exp3" 2 81 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 462 0 0
"3103" "exp3" 2 82 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 798 32 1
"3103" "exp3" 2 83 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 641 0 0
"3103" "exp3" 2 84 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1077 35 1
"3103" "exp3" 2 85 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 578 41 1
"3103" "exp3" 2 86 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 731 34 1
"3103" "exp3" 2 87 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 446 10 1
"3103" "exp3" 2 88 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 741 35 1
"3103" "exp3" 2 89 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 804 0 0
"3103" "exp3" 2 90 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 560 26 1
"3103" "exp3" 2 91 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 885 32 1
"3103" "exp3" 2 92 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 627 0 0
"3103" "exp3" 2 93 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 596 9 1
"3103" "exp3" 2 94 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 685 23 1
"3103" "exp3" 2 95 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 572 0 0
"3103" "exp3" 2 96 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 420 18 1
"3103" "exp3" 2 97 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 545 8 1
"3103" "exp3" 2 98 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 704 19 1
"3103" "exp3" 2 99 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 537 17 1
"3103" "exp3" 2 100 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 492 36 1
"3103" "exp3" 2 101 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 454 0 0
"3103" "exp3" 2 102 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 822 44 1
"3103" "exp3" 2 103 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 494 0 0
"3103" "exp3" 2 104 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 495 31 1
"3103" "exp3" 2 105 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 515 16 1
"3103" "exp3" 2 106 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 437 39 1
"3103" "exp3" 2 107 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 446 23 1
"3103" "exp3" 2 108 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 497 0 0
"3103" "exp3" 2 109 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 471 0 0
"3103" "exp3" 2 110 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 555 0 0
"3103" "exp3" 2 111 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 426 21 1
"3103" "exp3" 2 112 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 504 0 0
"3103" "exp3" 2 113 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 584 0 0
"3103" "exp3" 2 114 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 602 29 1
"3103" "exp3" 2 115 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 711 0 0
"3103" "exp3" 2 116 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 640 15 1
"3103" "exp3" 2 117 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 505 0 0
"3103" "exp3" 2 118 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 584 0 0
"3103" "exp3" 2 119 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 995 25 1
"3103" "exp3" 2 120 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 680 25 1
"3103" "exp3" 2 121 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1001 43 1
"3103" "exp3" 2 122 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 593 37 1
"3103" "exp3" 2 123 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 694 12 1
"3103" "exp3" 2 124 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 613 15 1
"3103" "exp3" 2 125 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 798 20 1
"3103" "exp3" 2 126 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 921 0 0
"3103" "exp3" 2 127 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 635 14 1
"3103" "exp3" 2 128 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 690 0 0
"3103" "exp3" 2 129 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 556 22 1
"3103" "exp3" 2 130 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 587 36 1
"3103" "exp3" 2 131 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 570 0 0
"3103" "exp3" 2 132 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 630 0 0
"3103" "exp3" 1 1 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 573 36 1
"3103" "exp3" 1 2 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 334 46 1
"3103" "exp3" 1 3 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 420 29 1
"3103" "exp3" 1 4 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 495 9 1
"3103" "exp3" 1 5 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 412 32 1
"3103" "exp3" 1 6 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 407 15 1
"3103" "exp3" 1 7 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 532 0 0
"3103" "exp3" 1 8 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 384 38 1
"3103" "exp3" 1 9 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 407 57 1
"3103" "exp3" 1 10 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 395 30 1
"3103" "exp3" 1 11 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 386 1 1
"3103" "exp3" 1 12 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 441 0 0
"3103" "exp3" 1 13 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 489 10 1
"3103" "exp3" 1 14 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 419 20 1
"3103" "exp3" 1 15 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 359 33 1
"3103" "exp3" 1 16 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 401 0 0
"3103" "exp3" 1 17 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 315 48 1
"3103" "exp3" 1 18 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 419 21 1
"3103" "exp3" 1 19 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 393 15 1
"3103" "exp3" 1 20 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 425 3 1
"3103" "exp3" 1 21 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 386 55 1
"3103" "exp3" 1 22 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 454 18 1
"3103" "exp3" 1 23 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 439 7 1
"3103" "exp3" 1 24 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 384 25 1
"3103" "exp3" 1 25 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 442 0 0
"3103" "exp3" 1 26 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 370 0 0
"3103" "exp3" 1 27 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 372 28 1
"3103" "exp3" 1 28 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 363 24 1
"3103" "exp3" 1 29 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 554 34 1
"3103" "exp3" 1 30 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 401 21 1
"3103" "exp3" 1 31 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 416 5 1
"3103" "exp3" 1 32 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 393 20 1
"3103" "exp3" 1 33 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 508 24 1
"3103" "exp3" 1 34 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 578 0 0
"3103" "exp3" 1 35 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 519 0 0
"3103" "exp3" 1 36 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 421 38 1
"3103" "exp3" 1 37 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 426 4 1
"3103" "exp3" 1 38 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 396 25 1
"3103" "exp3" 1 39 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 388 0 0
"3103" "exp3" 1 40 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 514 0 0
"3103" "exp3" 1 41 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 420 17 1
"3103" "exp3" 1 42 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 368 27 1
"3103" "exp3" 1 43 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 418 0 0
"3103" "exp3" 1 44 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 375 6 1
"3103" "exp3" 1 45 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 360 14 1
"3103" "exp3" 1 46 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 440 0 0
"3103" "exp3" 1 47 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 378 0 0
"3103" "exp3" 1 48 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 772 0 0
"3103" "exp3" 1 49 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 412 0 0
"3103" "exp3" 1 50 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 302 19 1
"3103" "exp3" 1 51 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 352 5 1
"3103" "exp3" 1 52 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 524 0 0
"3103" "exp3" 1 53 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 503 32 1
"3103" "exp3" 1 54 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 488 17 1
"3103" "exp3" 1 55 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 499 31 1
"3103" "exp3" 1 56 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 332 0 0
"3103" "exp3" 1 57 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 489 26 1
"3103" "exp3" 1 58 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 432 0 0
"3103" "exp3" 1 59 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 312 0 0
"3103" "exp3" 1 60 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 354 0 0
"3103" "exp3" 1 61 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 382 28 1
"3103" "exp3" 1 62 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 465 0 0
"3103" "exp3" 1 63 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 480 17 1
"3103" "exp3" 1 64 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 392 0 0
"3103" "exp3" 1 65 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 516 23 1
"3103" "exp3" 1 66 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 535 32 1
"3103" "exp3" 1 67 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 326 10 1
"3103" "exp3" 1 68 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 399 30 1
"3103" "exp3" 1 69 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 351 31 1
"3103" "exp3" 1 70 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 296 51 1
"3103" "exp3" 1 71 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 451 0 0
"3103" "exp3" 1 72 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 425 0 0
"3103" "exp3" 1 73 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 512 17 1
"3103" "exp3" 1 74 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 444 13 1
"3103" "exp3" 1 75 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 472 0 0
"3103" "exp3" 1 76 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 408 0 0
"3103" "exp3" 1 77 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 504 33 1
"3103" "exp3" 1 78 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 469 0 0
"3103" "exp3" 1 79 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 706 0 0
"3103" "exp3" 1 80 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 687 23 1
"3103" "exp3" 1 81 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 419 24 1
"3103" "exp3" 1 82 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 425 24 1
"3103" "exp3" 1 83 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 513 0 0
"3103" "exp3" 1 84 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 489 22 1
"3103" "exp3" 1 85 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 424 14 1
"3103" "exp3" 1 86 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 304 15 1
"3103" "exp3" 1 87 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 568 29 1
"3103" "exp3" 1 88 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 546 0 0
"3103" "exp3" 1 89 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 447 0 0
"3103" "exp3" 1 90 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 530 0 0
"3103" "exp3" 1 91 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 337 22 1
"3103" "exp3" 1 92 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 596 0 0
"3103" "exp3" 1 93 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 438 28 1
"3103" "exp3" 1 94 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 456 36 1
"3103" "exp3" 1 95 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 459 20 1
"3103" "exp3" 1 96 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 439 0 0
"3103" "exp3" 1 97 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 417 30 1
"3103" "exp3" 1 98 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 437 8 1
"3103" "exp3" 1 99 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 377 29 1
"3103" "exp3" 1 100 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 368 11 1
"3103" "exp3" 1 101 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 452 0 0
"3103" "exp3" 1 102 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 575 0 0
"3103" "exp3" 1 103 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 550 6 1
"3103" "exp3" 1 104 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 469 0 0
"3103" "exp3" 1 105 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 483 31 1
"3103" "exp3" 1 106 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 386 0 0
"3103" "exp3" 1 107 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 474 34 1
"3103" "exp3" 1 108 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 557 26 1
"3103" "exp3" 1 109 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 436 26 1
"3103" "exp3" 1 110 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 431 0 0
"3103" "exp3" 1 111 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 550 7 1
"3103" "exp3" 1 112 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 395 18 1
"3103" "exp3" 1 113 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 566 0 0
"3103" "exp3" 1 114 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 608 32 1
"3103" "exp3" 1 115 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 476 9 1
"3103" "exp3" 1 116 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 440 16 1
"3103" "exp3" 1 117 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 458 23 1
"3103" "exp3" 1 118 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 473 20 1
"3103" "exp3" 1 119 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 671 12 1
"3103" "exp3" 1 120 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 487 12 1
"3103" "exp3" 1 121 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 559 13 1
"3103" "exp3" 1 122 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 417 0 0
"3103" "exp3" 1 123 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 344 0 0
"3103" "exp3" 1 124 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 424 27 1
"3103" "exp3" 1 125 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 402 25 1
"3103" "exp3" 1 126 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 373 21 1
"3103" "exp3" 1 127 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 465 0 0
"3103" "exp3" 1 128 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 386 2 1
"3103" "exp3" 1 129 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 453 0 0
"3103" "exp3" 1 130 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 421 35 1
"3103" "exp3" 1 131 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 421 16 1
"3103" "exp3" 1 132 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 421 44 1
"3103" "exp3" 2 1 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 537 30 1
"3103" "exp3" 2 2 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 349 15 1
"3103" "exp3" 2 3 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 396 40 1
"3103" "exp3" 2 4 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 390 9 1
"3103" "exp3" 2 5 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 315 13 1
"3103" "exp3" 2 6 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 429 31 1
"3103" "exp3" 2 7 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 513 33 1
"3103" "exp3" 2 8 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 382 21 1
"3103" "exp3" 2 9 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 341 30 1
"3103" "exp3" 2 10 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 392 2 1
"3103" "exp3" 2 11 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 362 6 1
"3103" "exp3" 2 12 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 421 29 1
"3103" "exp3" 2 13 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 507 19 1
"3103" "exp3" 2 14 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 992 0 0
"3103" "exp3" 2 15 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 407 16 1
"3103" "exp3" 2 16 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 482 5 1
"3103" "exp3" 2 17 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 509 0 0
"3103" "exp3" 2 18 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 369 25 1
"3103" "exp3" 2 19 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 430 8 1
"3103" "exp3" 2 20 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 457 0 0
"3103" "exp3" 2 21 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 512 35 1
"3103" "exp3" 2 22 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 359 34 1
"3103" "exp3" 2 23 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 439 20 1
"3103" "exp3" 2 24 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 506 26 1
"3103" "exp3" 2 25 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 374 37 1
"3103" "exp3" 2 26 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 315 5 1
"3103" "exp3" 2 27 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 354 22 1
"3103" "exp3" 2 28 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 389 24 1
"3103" "exp3" 2 29 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 394 12 1
"3103" "exp3" 2 30 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 361 48 1
"3103" "exp3" 2 31 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 558 10 1
"3103" "exp3" 2 32 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 371 9 1
"3103" "exp3" 2 33 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 528 0 0
"3103" "exp3" 2 34 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 802 0 0
"3103" "exp3" 2 35 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 421 25 1
"3103" "exp3" 2 36 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 561 27 1
"3103" "exp3" 2 37 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 343 13 1
"3103" "exp3" 2 38 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 529 0 0
"3103" "exp3" 2 39 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 349 0 0
"3103" "exp3" 2 40 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 293 24 1
"3103" "exp3" 2 41 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 263 0 0
"3103" "exp3" 2 42 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 225 0 0
"3103" "exp3" 2 43 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 359 7 1
"3103" "exp3" 2 44 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 361 28 1
"3103" "exp3" 2 45 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 422 26 1
"3103" "exp3" 2 46 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 407 26 1
"3103" "exp3" 2 47 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 374 36 1
"3103" "exp3" 2 48 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 310 0 0
"3103" "exp3" 2 49 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 387 16 1
"3103" "exp3" 2 50 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 564 0 0
"3103" "exp3" 2 51 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 528 19 1
"3103" "exp3" 2 52 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 576 46 1
"3103" "exp3" 2 53 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 465 7 1
"3103" "exp3" 2 54 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 448 40 1
"3103" "exp3" 2 55 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 481 3 1
"3103" "exp3" 2 56 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 627 18 1
"3103" "exp3" 2 57 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 318 11 1
"3103" "exp3" 2 58 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 355 0 0
"3103" "exp3" 2 59 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 513 49 1
"3103" "exp3" 2 60 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 523 23 1
"3103" "exp3" 2 61 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 490 0 0
"3103" "exp3" 2 62 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 470 34 1
"3103" "exp3" 2 63 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 392 37 1
"3103" "exp3" 2 64 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 511 14 1
"3103" "exp3" 2 65 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 433 27 1
"3103" "exp3" 2 66 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 485 0 0
"3103" "exp3" 2 67 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 321 0 0
"3103" "exp3" 2 68 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 394 17 1
"3103" "exp3" 2 69 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 404 38 1
"3103" "exp3" 2 70 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 534 19 1
"3103" "exp3" 2 71 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 349 17 1
"3103" "exp3" 2 72 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 445 0 0
"3103" "exp3" 2 73 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 435 13 1
"3103" "exp3" 2 74 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 533 10 1
"3103" "exp3" 2 75 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 437 42 1
"3103" "exp3" 2 76 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 488 37 1
"3103" "exp3" 2 77 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 391 36 1
"3103" "exp3" 2 78 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 420 20 1
"3103" "exp3" 2 79 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 419 25 1
"3103" "exp3" 2 80 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 395 14 1
"3103" "exp3" 2 81 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 444 0 0
"3103" "exp3" 2 82 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 307 44 1
"3103" "exp3" 2 83 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 395 30 1
"3103" "exp3" 2 84 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 298 18 1
"3103" "exp3" 2 85 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 475 38 1
"3103" "exp3" 2 86 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 362 28 1
"3103" "exp3" 2 87 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 552 42 1
"3103" "exp3" 2 88 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 449 0 0
"3103" "exp3" 2 89 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 354 12 1
"3103" "exp3" 2 90 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 482 43 1
"3103" "exp3" 2 91 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 390 27 1
"3103" "exp3" 2 92 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 487 20 1
"3103" "exp3" 2 93 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 454 25 1
"3103" "exp3" 2 94 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 414 26 1
"3103" "exp3" 2 95 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 394 1 1
"3103" "exp3" 2 96 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 490 0 0
"3103" "exp3" 2 97 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 328 18 1
"3103" "exp3" 2 98 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 472 17 1
"3103" "exp3" 2 99 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 396 27 1
"3103" "exp3" 2 100 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 465 43 1
"3103" "exp3" 2 101 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 309 0 0
"3103" "exp3" 2 102 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 452 32 1
"3103" "exp3" 2 103 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 594 29 1
"3103" "exp3" 2 104 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 385 0 0
"3103" "exp3" 2 105 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 345 6 1
"3103" "exp3" 2 106 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 395 0 0
"3103" "exp3" 2 107 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 584 0 0
"3103" "exp3" 2 108 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 388 33 1
"3103" "exp3" 2 109 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 311 17 1
"3103" "exp3" 2 110 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 367 18 1
"3103" "exp3" 2 111 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 366 36 1
"3103" "exp3" 2 112 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 550 44 1
"3103" "exp3" 2 113 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 297 23 1
"3103" "exp3" 2 114 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 415 0 0
"3103" "exp3" 2 115 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 448 0 0
"3103" "exp3" 2 116 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 386 24 1
"3103" "exp3" 2 117 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 342 28 1
"3103" "exp3" 2 118 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 504 0 0
"3103" "exp3" 2 119 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 432 0 0
"3103" "exp3" 2 120 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 387 4 1
"3103" "exp3" 2 121 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 356 21 1
"3103" "exp3" 2 122 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 488 8 1
"3103" "exp3" 2 123 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 308 24 1
"3103" "exp3" 2 124 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 356 16 1
"3103" "exp3" 2 125 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 387 32 1
"3103" "exp3" 2 126 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 349 0 0
"3103" "exp3" 2 127 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 386 0 0
"3103" "exp3" 2 128 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 497 22 1
"3103" "exp3" 2 129 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 621 32 1
"3103" "exp3" 2 130 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 360 0 0
"3103" "exp3" 2 131 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 518 14 1
"3103" "exp3" 2 132 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 382 30 1
"3103" "exp3" 1 1 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 540 0 0
"3103" "exp3" 1 2 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 551 2 1
"3103" "exp3" 1 3 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 339 22 1
"3103" "exp3" 1 4 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 363 16 1
"3103" "exp3" 1 5 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 409 0 0
"3103" "exp3" 1 6 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 256 30 1
"3103" "exp3" 1 7 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 344 0 0
"3103" "exp3" 1 8 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 429 23 1
"3103" "exp3" 1 9 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 439 4 1
"3103" "exp3" 1 10 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 391 32 1
"3103" "exp3" 1 11 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 343 41 1
"3103" "exp3" 1 12 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 305 31 1
"3103" "exp3" 1 13 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 357 13 1
"3103" "exp3" 1 14 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 402 31 1
"3103" "exp3" 1 15 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 388 44 1
"3103" "exp3" 1 16 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 446 28 1
"3103" "exp3" 1 17 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 475 9 1
"3103" "exp3" 1 18 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 365 0 0
"3103" "exp3" 1 19 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 515 0 0
"3103" "exp3" 1 20 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 394 31 1
"3103" "exp3" 1 21 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 505 5 1
"3103" "exp3" 1 22 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 615 0 0
"3103" "exp3" 1 23 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 475 9 1
"3103" "exp3" 1 24 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 548 44 1
"3103" "exp3" 1 25 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 410 17 1
"3103" "exp3" 1 26 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 361 35 1
"3103" "exp3" 1 27 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 548 14 1
"3103" "exp3" 1 28 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 491 30 1
"3103" "exp3" 1 29 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 477 23 1
"3103" "exp3" 1 30 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 385 23 1
"3103" "exp3" 1 31 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 532 24 1
"3103" "exp3" 1 32 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 587 25 1
"3103" "exp3" 1 33 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 431 0 0
"3103" "exp3" 1 34 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 387 0 0
"3103" "exp3" 1 35 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 349 0 0
"3103" "exp3" 1 36 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 400 0 0
"3103" "exp3" 1 37 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 402 20 1
"3103" "exp3" 1 38 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 399 38 1
"3103" "exp3" 1 39 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 397 18 1
"3103" "exp3" 1 40 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 470 37 1
"3103" "exp3" 1 41 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 330 0 0
"3103" "exp3" 1 42 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 385 8 1
"3103" "exp3" 1 43 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 389 0 0
"3103" "exp3" 1 44 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 394 32 1
"3103" "exp3" 1 45 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 402 0 0
"3103" "exp3" 1 46 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 415 0 0
"3103" "exp3" 1 47 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 339 15 1
"3103" "exp3" 1 48 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 486 20 1
"3103" "exp3" 1 49 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 542 46 1
"3103" "exp3" 1 50 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 451 0 0
"3103" "exp3" 1 51 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 390 33 1
"3103" "exp3" 1 52 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 667 43 1
"3103" "exp3" 1 53 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 321 8 1
"3103" "exp3" 1 54 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 382 12 1
"3103" "exp3" 1 55 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 704 36 1
"3103" "exp3" 1 56 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 337 0 0
"3103" "exp3" 1 57 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 450 18 1
"3103" "exp3" 1 58 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 438 0 0
"3103" "exp3" 1 59 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 512 18 1
"3103" "exp3" 1 60 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 330 14 1
"3103" "exp3" 1 61 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 429 34 1
"3103" "exp3" 1 62 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 362 29 1
"3103" "exp3" 1 63 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 327 15 1
"3103" "exp3" 1 64 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 326 0 0
"3103" "exp3" 1 65 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 328 21 1
"3103" "exp3" 1 66 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 307 10 1
"3103" "exp3" 1 67 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 306 0 0
"3103" "exp3" 1 68 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 599 0 0
"3103" "exp3" 1 69 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 552 0 0
"3103" "exp3" 1 70 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 423 38 1
"3103" "exp3" 1 71 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 364 7 1
"3103" "exp3" 1 72 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 357 0 0
"3103" "exp3" 1 73 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 361 28 1
"3103" "exp3" 1 74 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 358 29 1
"3103" "exp3" 1 75 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 320 7 1
"3103" "exp3" 1 76 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 363 33 1
"3103" "exp3" 1 77 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 381 30 1
"3103" "exp3" 1 78 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 375 18 1
"3103" "exp3" 1 79 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 343 5 1
"3103" "exp3" 1 80 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 522 17 1
"3103" "exp3" 1 81 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 384 37 1
"3103" "exp3" 1 82 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 371 27 1
"3103" "exp3" 1 83 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 373 11 1
"3103" "exp3" 1 84 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 258 0 0
"3103" "exp3" 1 85 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 380 39 1
"3103" "exp3" 1 86 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 397 0 0
"3103" "exp3" 1 87 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 346 0 0
"3103" "exp3" 1 88 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 398 0 0
"3103" "exp3" 1 89 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 315 30 1
"3103" "exp3" 1 90 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 354 17 1
"3103" "exp3" 1 91 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 362 29 1
"3103" "exp3" 1 92 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 407 0 0
"3103" "exp3" 1 93 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 369 0 0
"3103" "exp3" 1 94 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 446 34 1
"3103" "exp3" 1 95 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 394 17 1
"3103" "exp3" 1 96 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 457 20 1
"3103" "exp3" 1 97 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 465 28 1
"3103" "exp3" 1 98 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 360 24 1
"3103" "exp3" 1 99 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 367 27 1
"3103" "exp3" 1 100 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 404 0 0
"3103" "exp3" 1 101 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 373 24 1
"3103" "exp3" 1 102 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 379 6 1
"3103" "exp3" 1 103 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 325 43 1
"3103" "exp3" 1 104 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 349 26 1
"3103" "exp3" 1 105 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 345 19 1
"3103" "exp3" 1 106 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 329 0 0
"3103" "exp3" 1 107 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 412 26 1
"3103" "exp3" 1 108 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 360 6 1
"3103" "exp3" 1 109 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 523 13 1
"3103" "exp3" 1 110 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 373 20 1
"3103" "exp3" 1 111 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 546 19 1
"3103" "exp3" 1 112 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 385 0 0
"3103" "exp3" 1 113 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 360 11 1
"3103" "exp3" 1 114 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 337 25 1
"3103" "exp3" 1 115 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 361 25 1
"3103" "exp3" 1 116 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 443 0 0
"3103" "exp3" 1 117 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 324 33 1
"3103" "exp3" 1 118 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 348 29 1
"3103" "exp3" 1 119 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 346 22 1
"3103" "exp3" 1 120 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 313 25 1
"3103" "exp3" 1 121 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 334 0 0
"3103" "exp3" 1 122 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 384 33 1
"3103" "exp3" 1 123 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 324 15 1
"3103" "exp3" 1 124 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 435 0 0
"3103" "exp3" 1 125 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 340 0 0
"3103" "exp3" 1 126 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 506 0 0
"3103" "exp3" 1 127 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 390 35 1
"3103" "exp3" 1 128 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 296 0 0
"3103" "exp3" 1 129 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 368 16 1
"3103" "exp3" 1 130 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 325 13 1
"3103" "exp3" 1 131 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 348 0 0
"3103" "exp3" 1 132 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 403 3 1
"3103" "exp3" 2 1 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 354 22 1
"3103" "exp3" 2 2 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 354 24 1
"3103" "exp3" 2 3 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 322 15 1
"3103" "exp3" 2 4 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 370 14 1
"3103" "exp3" 2 5 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 366 14 1
"3103" "exp3" 2 6 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 312 23 1
"3103" "exp3" 2 7 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 529 16 1
"3103" "exp3" 2 8 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 653 5 1
"3103" "exp3" 2 9 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 404 35 1
"3103" "exp3" 2 10 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 357 28 1
"3103" "exp3" 2 11 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 454 29 1
"3103" "exp3" 2 12 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 360 11 1
"3103" "exp3" 2 13 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 362 22 1
"3103" "exp3" 2 14 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 348 10 1
"3103" "exp3" 2 15 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 445 0 0
"3103" "exp3" 2 16 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 460 11 1
"3103" "exp3" 2 17 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 594 31 1
"3103" "exp3" 2 18 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 374 18 1
"3103" "exp3" 2 19 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 417 40 1
"3103" "exp3" 2 20 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 459 0 0
"3103" "exp3" 2 21 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 433 17 1
"3103" "exp3" 2 22 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 495 29 1
"3103" "exp3" 2 23 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 365 0 0
"3103" "exp3" 2 24 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 424 30 1
"3103" "exp3" 2 25 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 348 23 1
"3103" "exp3" 2 26 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 426 24 1
"3103" "exp3" 2 27 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 421 12 1
"3103" "exp3" 2 28 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 448 0 0
"3103" "exp3" 2 29 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 435 29 1
"3103" "exp3" 2 30 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 359 44 1
"3103" "exp3" 2 31 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 340 17 1
"3103" "exp3" 2 32 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 428 34 1
"3103" "exp3" 2 33 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 406 41 1
"3103" "exp3" 2 34 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 455 0 0
"3103" "exp3" 2 35 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 630 24 1
"3103" "exp3" 2 36 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 397 23 1
"3103" "exp3" 2 37 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 562 45 1
"3103" "exp3" 2 38 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 467 42 1
"3103" "exp3" 2 39 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 387 46 1
"3103" "exp3" 2 40 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 381 0 0
"3103" "exp3" 2 41 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 372 31 1
"3103" "exp3" 2 42 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 493 31 1
"3103" "exp3" 2 43 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 399 17 1
"3103" "exp3" 2 44 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 352 0 0
"3103" "exp3" 2 45 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 482 15 1
"3103" "exp3" 2 46 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 431 0 0
"3103" "exp3" 2 47 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 334 0 0
"3103" "exp3" 2 48 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 370 42 1
"3103" "exp3" 2 49 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 485 0 0
"3103" "exp3" 2 50 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 481 0 0
"3103" "exp3" 2 51 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 429 4 1
"3103" "exp3" 2 52 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 531 2 1
"3103" "exp3" 2 53 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 485 18 1
"3103" "exp3" 2 54 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 380 37 1
"3103" "exp3" 2 55 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 584 0 0
"3103" "exp3" 2 56 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 546 26 1
"3103" "exp3" 2 57 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 518 44 1
"3103" "exp3" 2 58 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 469 6 1
"3103" "exp3" 2 59 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 545 0 0
"3103" "exp3" 2 60 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 506 27 1
"3103" "exp3" 2 61 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 515 39 1
"3103" "exp3" 2 62 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 362 47 1
"3103" "exp3" 2 63 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 388 0 0
"3103" "exp3" 2 64 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 581 21 1
"3103" "exp3" 2 65 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 326 8 1
"3103" "exp3" 2 66 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 381 19 1
"3103" "exp3" 2 67 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 368 28 1
"3103" "exp3" 2 68 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 538 14 1
"3103" "exp3" 2 69 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 441 27 1
"3103" "exp3" 2 70 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 407 0 0
"3103" "exp3" 2 71 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 377 26 1
"3103" "exp3" 2 72 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 314 6 1
"3103" "exp3" 2 73 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 504 28 1
"3103" "exp3" 2 74 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 429 25 1
"3103" "exp3" 2 75 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 333 23 1
"3103" "exp3" 2 76 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 346 12 1
"3103" "exp3" 2 77 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 388 21 1
"3103" "exp3" 2 78 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 268 10 1
"3103" "exp3" 2 79 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 434 0 0
"3103" "exp3" 2 80 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 367 33 1
"3103" "exp3" 2 81 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 417 16 1
"3103" "exp3" 2 82 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 352 0 0
"3103" "exp3" 2 83 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 387 45 1
"3103" "exp3" 2 84 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 323 24 1
"3103" "exp3" 2 85 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 353 1 1
"3103" "exp3" 2 86 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 391 7 1
"3103" "exp3" 2 87 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 647 33 1
"3103" "exp3" 2 88 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 428 19 1
"3103" "exp3" 2 89 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 359 20 1
"3103" "exp3" 2 90 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 308 21 1
"3103" "exp3" 2 91 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 358 0 0
"3103" "exp3" 2 92 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 358 16 1
"3103" "exp3" 2 93 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 336 0 0
"3103" "exp3" 2 94 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 316 0 0
"3103" "exp3" 2 95 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 536 0 0
"3103" "exp3" 2 96 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 351 13 1
"3103" "exp3" 2 97 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 334 9 1
"3103" "exp3" 2 98 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 455 29 1
"3103" "exp3" 2 99 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 357 0 0
"3103" "exp3" 2 100 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 307 20 1
"3103" "exp3" 2 101 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 373 32 1
"3103" "exp3" 2 102 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 351 0 0
"3103" "exp3" 2 103 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 381 32 1
"3103" "exp3" 2 104 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 371 22 1
"3103" "exp3" 2 105 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 339 7 1
"3103" "exp3" 2 106 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 301 36 1
"3103" "exp3" 2 107 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 488 31 1
"3103" "exp3" 2 108 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 336 0 0
"3103" "exp3" 2 109 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 317 20 1
"3103" "exp3" 2 110 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 492 38 1
"3103" "exp3" 2 111 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 366 5 1
"3103" "exp3" 2 112 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 559 37 1
"3103" "exp3" 2 113 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 478 26 1
"3103" "exp3" 2 114 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 336 3 1
"3103" "exp3" 2 115 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 353 15 1
"3103" "exp3" 2 116 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 296 8 1
"3103" "exp3" 2 117 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 346 22 1
"3103" "exp3" 2 118 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 320 0 0
"3103" "exp3" 2 119 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 340 0 0
"3103" "exp3" 2 120 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 379 32 1
"3103" "exp3" 2 121 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 310 0 0
"3103" "exp3" 2 122 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 393 30 1
"3103" "exp3" 2 123 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 389 28 1
"3103" "exp3" 2 124 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 436 32 1
"3103" "exp3" 2 125 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 362 19 1
"3103" "exp3" 2 126 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 303 25 1
"3103" "exp3" 2 127 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 500 0 0
"3103" "exp3" 2 128 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 348 33 1
"3103" "exp3" 2 129 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 396 37 1
"3103" "exp3" 2 130 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 352 0 0
"3103" "exp3" 2 131 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 455 13 1
"3103" "exp3" 2 132 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 326 18 1
"3104" "exp3" 1 1 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 660 45 1
"3104" "exp3" 1 2 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 928 5 1
"3104" "exp3" 1 3 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 707 19 1
"3104" "exp3" 1 4 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 707 30 1
"3104" "exp3" 1 5 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1183 25 1
"3104" "exp3" 1 6 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 883 20 1
"3104" "exp3" 1 7 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1081 32 1
"3104" "exp3" 1 8 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 976 40 1
"3104" "exp3" 1 9 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 887 0 0
"3104" "exp3" 1 10 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1209 0 0
"3104" "exp3" 1 11 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1382 22 1
"3104" "exp3" 1 12 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 950 24 1
"3104" "exp3" 1 13 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 921 12 1
"3104" "exp3" 1 14 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1164 29 1
"3104" "exp3" 1 15 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 897 20 1
"3104" "exp3" 1 16 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1428 26 1
"3104" "exp3" 1 17 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1215 0 0
"3104" "exp3" 1 18 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 764 9 1
"3104" "exp3" 1 19 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1183 44 1
"3104" "exp3" 1 20 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 838 0 0
"3104" "exp3" 1 21 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1377 19 1
"3104" "exp3" 1 22 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1208 0 0
"3104" "exp3" 1 23 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1339 0 0
"3104" "exp3" 1 24 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1060 31 1
"3104" "exp3" 1 25 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1068 0 0
"3104" "exp3" 1 26 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 912 0 0
"3104" "exp3" 1 27 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1880 0 0
"3104" "exp3" 1 28 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1471 7 1
"3104" "exp3" 1 29 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 989 24 1
"3104" "exp3" 1 30 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1007 21 1
"3104" "exp3" 1 31 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 985 0 0
"3104" "exp3" 1 32 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1078 37 1
"3104" "exp3" 1 33 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1065 34 1
"3104" "exp3" 1 34 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 1342 6 1
"3104" "exp3" 1 35 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 949 0 0
"3104" "exp3" 1 36 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1442 17 1
"3104" "exp3" 1 37 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1017 0 0
"3104" "exp3" 1 38 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 1406 0 0
"3104" "exp3" 1 39 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 864 32 1
"3104" "exp3" 1 40 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 969 0 0
"3104" "exp3" 1 41 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 849 17 1
"3104" "exp3" 1 42 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 1109 8 1
"3104" "exp3" 1 43 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1024 20 1
"3104" "exp3" 1 44 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1037 40 1
"3104" "exp3" 1 45 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1436 18 1
"3104" "exp3" 1 46 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1184 20 1
"3104" "exp3" 1 47 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1863 0 0
"3104" "exp3" 1 48 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1536 4 1
"3104" "exp3" 1 49 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 2371 0 0
"3104" "exp3" 1 50 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 772 14 1
"3104" "exp3" 1 51 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1205 11 1
"3104" "exp3" 1 52 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1411 0 0
"3104" "exp3" 1 53 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1269 23 1
"3104" "exp3" 1 54 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1096 18 1
"3104" "exp3" 1 55 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1813 0 0
"3104" "exp3" 1 56 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 799 0 0
"3104" "exp3" 1 57 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1166 0 0
"3104" "exp3" 1 58 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 775 14 1
"3104" "exp3" 1 59 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 889 10 1
"3104" "exp3" 1 60 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 1865 0 0
"3104" "exp3" 1 61 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 896 33 1
"3104" "exp3" 1 62 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1058 53 1
"3104" "exp3" 1 63 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 573 25 1
"3104" "exp3" 1 64 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1739 34 1
"3104" "exp3" 1 65 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 792 0 0
"3104" "exp3" 1 66 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 774 31 1
"3104" "exp3" 1 67 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 999 0 0
"3104" "exp3" 1 68 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1275 37 1
"3104" "exp3" 1 69 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1364 30 1
"3104" "exp3" 1 70 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 1445 56 1
"3104" "exp3" 1 71 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1155 38 1
"3104" "exp3" 1 72 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 617 16 1
"3104" "exp3" 1 73 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1145 42 1
"3104" "exp3" 1 74 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 779 30 1
"3104" "exp3" 1 75 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 820 14 1
"3104" "exp3" 1 76 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1559 35 1
"3104" "exp3" 1 77 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1458 31 1
"3104" "exp3" 1 78 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2923 0 0
"3104" "exp3" 1 79 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1163 36 1
"3104" "exp3" 1 80 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1054 28 1
"3104" "exp3" 1 81 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 898 0 0
"3104" "exp3" 1 82 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1128 0 0
"3104" "exp3" 1 83 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1164 12 1
"3104" "exp3" 1 84 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 869 0 0
"3104" "exp3" 1 85 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 818 17 1
"3104" "exp3" 1 86 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 722 13 1
"3104" "exp3" 1 87 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1312 29 1
"3104" "exp3" 1 88 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1570 69 1
"3104" "exp3" 1 89 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 711 15 1
"3104" "exp3" 1 90 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 811 36 1
"3104" "exp3" 1 91 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 665 27 1
"3104" "exp3" 1 92 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 541 0 0
"3104" "exp3" 1 93 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 564 29 1
"3104" "exp3" 1 94 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1087 0 0
"3104" "exp3" 1 95 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 810 0 0
"3104" "exp3" 1 96 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 716 43 1
"3104" "exp3" 1 97 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 406 3 1
"3104" "exp3" 1 98 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 1044 61 1
"3104" "exp3" 1 99 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 903 0 0
"3104" "exp3" 1 100 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 443 0 0
"3104" "exp3" 1 101 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 578 0 0
"3104" "exp3" 1 102 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 606 23 1
"3104" "exp3" 1 103 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 808 68 1
"3104" "exp3" 1 104 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 593 21 1
"3104" "exp3" 1 105 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1387 67 1
"3104" "exp3" 1 106 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 750 22 1
"3104" "exp3" 1 107 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 842 0 0
"3104" "exp3" 1 108 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1226 0 0
"3104" "exp3" 1 109 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 900 41 1
"3104" "exp3" 1 110 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1140 48 1
"3104" "exp3" 1 111 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 805 0 0
"3104" "exp3" 1 112 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1050 23 1
"3104" "exp3" 1 113 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 684 25 1
"3104" "exp3" 1 114 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 871 0 0
"3104" "exp3" 1 115 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 708 0 0
"3104" "exp3" 1 116 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 620 24 1
"3104" "exp3" 1 117 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 566 1 1
"3104" "exp3" 1 118 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1072 15 1
"3104" "exp3" 1 119 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1218 19 1
"3104" "exp3" 1 120 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 874 23 1
"3104" "exp3" 1 121 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 837 26 1
"3104" "exp3" 1 122 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1025 7 1
"3104" "exp3" 1 123 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1120 30 1
"3104" "exp3" 1 124 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1137 28 1
"3104" "exp3" 1 125 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 833 0 0
"3104" "exp3" 1 126 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 500 13 1
"3104" "exp3" 1 127 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 564 19 1
"3104" "exp3" 1 128 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 930 0 0
"3104" "exp3" 1 129 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 839 2 1
"3104" "exp3" 1 130 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 948 37 1
"3104" "exp3" 1 131 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 843 25 1
"3104" "exp3" 1 132 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 677 16 1
"3104" "exp3" 2 1 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 977 0 0
"3104" "exp3" 2 2 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 679 0 0
"3104" "exp3" 2 3 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 645 43 1
"3104" "exp3" 2 4 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 594 42 1
"3104" "exp3" 2 5 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 539 0 0
"3104" "exp3" 2 6 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 567 12 1
"3104" "exp3" 2 7 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 686 22 1
"3104" "exp3" 2 8 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 663 18 1
"3104" "exp3" 2 9 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 714 29 1
"3104" "exp3" 2 10 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 678 18 1
"3104" "exp3" 2 11 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 826 0 0
"3104" "exp3" 2 12 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 546 33 1
"3104" "exp3" 2 13 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 534 14 1
"3104" "exp3" 2 14 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 800 13 1
"3104" "exp3" 2 15 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 620 30 1
"3104" "exp3" 2 16 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 613 0 0
"3104" "exp3" 2 17 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 842 0 0
"3104" "exp3" 2 18 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1178 0 0
"3104" "exp3" 2 19 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 648 25 1
"3104" "exp3" 2 20 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 959 19 1
"3104" "exp3" 2 21 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1081 20 1
"3104" "exp3" 2 22 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1626 35 1
"3104" "exp3" 2 23 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1176 0 0
"3104" "exp3" 2 24 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1255 26 1
"3104" "exp3" 2 25 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1608 33 1
"3104" "exp3" 2 26 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1436 38 1
"3104" "exp3" 2 27 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1642 0 0
"3104" "exp3" 2 28 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1738 0 0
"3104" "exp3" 2 29 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1194 0 0
"3104" "exp3" 2 30 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1835 0 0
"3104" "exp3" 2 31 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1124 0 0
"3104" "exp3" 2 32 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1105 0 0
"3104" "exp3" 2 33 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 821 44 1
"3104" "exp3" 2 34 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1038 49 1
"3104" "exp3" 2 35 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1161 18 1
"3104" "exp3" 2 36 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1181 28 1
"3104" "exp3" 2 37 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2463 0 0
"3104" "exp3" 2 38 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 896 0 0
"3104" "exp3" 2 39 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1568 0 0
"3104" "exp3" 2 40 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 890 0 0
"3104" "exp3" 2 41 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1133 23 1
"3104" "exp3" 2 42 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1047 28 1
"3104" "exp3" 2 43 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1228 22 1
"3104" "exp3" 2 44 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1282 22 1
"3104" "exp3" 2 45 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1445 0 0
"3104" "exp3" 2 46 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 843 0 0
"3104" "exp3" 2 47 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 768 34 1
"3104" "exp3" 2 48 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 919 30 1
"3104" "exp3" 2 49 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1471 0 0
"3104" "exp3" 2 50 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1110 31 1
"3104" "exp3" 2 51 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 601 23 1
"3104" "exp3" 2 52 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1106 31 1
"3104" "exp3" 2 53 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 666 23 1
"3104" "exp3" 2 54 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 768 10 1
"3104" "exp3" 2 55 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 531 17 1
"3104" "exp3" 2 56 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 783 17 1
"3104" "exp3" 2 57 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 586 4 1
"3104" "exp3" 2 58 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 740 44 1
"3104" "exp3" 2 59 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 621 0 0
"3104" "exp3" 2 60 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 629 20 1
"3104" "exp3" 2 61 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 871 14 1
"3104" "exp3" 2 62 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 724 0 0
"3104" "exp3" 2 63 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 767 0 0
"3104" "exp3" 2 64 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 1149 0 0
"3104" "exp3" 2 65 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 631 0 0
"3104" "exp3" 2 66 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 990 36 1
"3104" "exp3" 2 67 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1171 35 1
"3104" "exp3" 2 68 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1019 24 1
"3104" "exp3" 2 69 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 869 43 1
"3104" "exp3" 2 70 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 1105 5 1
"3104" "exp3" 2 71 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 610 36 1
"3104" "exp3" 2 72 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 699 20 1
"3104" "exp3" 2 73 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1189 0 0
"3104" "exp3" 2 74 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1657 29 1
"3104" "exp3" 2 75 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 723 41 1
"3104" "exp3" 2 76 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 807 0 0
"3104" "exp3" 2 77 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 808 0 0
"3104" "exp3" 2 78 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 812 0 0
"3104" "exp3" 2 79 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 570 6 1
"3104" "exp3" 2 80 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 927 0 0
"3104" "exp3" 2 81 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 668 26 1
"3104" "exp3" 2 82 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 797 0 0
"3104" "exp3" 2 83 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 752 34 1
"3104" "exp3" 2 84 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 914 47 1
"3104" "exp3" 2 85 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 774 0 0
"3104" "exp3" 2 86 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1268 0 0
"3104" "exp3" 2 87 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 795 26 1
"3104" "exp3" 2 88 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1327 21 1
"3104" "exp3" 2 89 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 944 0 0
"3104" "exp3" 2 90 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1483 0 0
"3104" "exp3" 2 91 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1278 15 1
"3104" "exp3" 2 92 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1074 38 1
"3104" "exp3" 2 93 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 865 0 0
"3104" "exp3" 2 94 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 724 0 0
"3104" "exp3" 2 95 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1484 0 0
"3104" "exp3" 2 96 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 2727 24 1
"3104" "exp3" 2 97 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 731 0 0
"3104" "exp3" 2 98 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 570 29 1
"3104" "exp3" 2 99 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1304 0 0
"3104" "exp3" 2 100 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 1530 81 1
"3104" "exp3" 2 101 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 828 19 1
"3104" "exp3" 2 102 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1667 0 0
"3104" "exp3" 2 103 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1139 25 1
"3104" "exp3" 2 104 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 593 8 1
"3104" "exp3" 2 105 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1580 0 0
"3104" "exp3" 2 106 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1044 0 0
"3104" "exp3" 2 107 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1053 12 1
"3104" "exp3" 2 108 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1756 21 1
"3104" "exp3" 2 109 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 554 0 0
"3104" "exp3" 2 110 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 780 40 1
"3104" "exp3" 2 111 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 602 27 1
"3104" "exp3" 2 112 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 800 0 0
"3104" "exp3" 2 113 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 2059 0 0
"3104" "exp3" 2 114 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1305 24 1
"3104" "exp3" 2 115 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 798 0 0
"3104" "exp3" 2 116 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 660 30 1
"3104" "exp3" 2 117 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 552 30 1
"3104" "exp3" 2 118 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 792 0 0
"3104" "exp3" 2 119 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 609 35 1
"3104" "exp3" 2 120 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 604 13 1
"3104" "exp3" 2 121 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 793 0 0
"3104" "exp3" 2 122 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 985 31 1
"3104" "exp3" 2 123 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 647 11 1
"3104" "exp3" 2 124 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1039 21 1
"3104" "exp3" 2 125 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 562 28 1
"3104" "exp3" 2 126 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1491 17 1
"3104" "exp3" 2 127 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2239 37 1
"3104" "exp3" 2 128 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1206 23 1
"3104" "exp3" 2 129 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 858 0 0
"3104" "exp3" 2 130 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 712 0 0
"3104" "exp3" 2 131 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1060 0 0
"3104" "exp3" 2 132 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 995 9 1
"3104" "exp3" 1 1 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 828 18 1
"3104" "exp3" 1 2 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 831 1 1
"3104" "exp3" 1 3 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 855 0 0
"3104" "exp3" 1 4 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 868 40 1
"3104" "exp3" 1 5 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 780 16 1
"3104" "exp3" 1 6 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 1330 82 1
"3104" "exp3" 1 7 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1190 0 0
"3104" "exp3" 1 8 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 845 36 1
"3104" "exp3" 1 9 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 732 34 1
"3104" "exp3" 1 10 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1098 41 1
"3104" "exp3" 1 11 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 631 30 1
"3104" "exp3" 1 12 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1240 0 0
"3104" "exp3" 1 13 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 1510 63 1
"3104" "exp3" 1 14 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1075 0 0
"3104" "exp3" 1 15 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 778 19 1
"3104" "exp3" 1 16 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 736 18 1
"3104" "exp3" 1 17 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 752 14 1
"3104" "exp3" 1 18 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 829 0 0
"3104" "exp3" 1 19 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1190 0 0
"3104" "exp3" 1 20 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1585 30 1
"3104" "exp3" 1 21 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 828 21 1
"3104" "exp3" 1 22 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1028 0 0
"3104" "exp3" 1 23 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1481 26 1
"3104" "exp3" 1 24 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1151 0 0
"3104" "exp3" 1 25 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 4291 13 1
"3104" "exp3" 1 26 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1506 35 1
"3104" "exp3" 1 27 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2343 0 0
"3104" "exp3" 1 28 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 1324 82 1
"3104" "exp3" 1 29 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1573 28 1
"3104" "exp3" 1 30 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1175 0 0
"3104" "exp3" 1 31 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1438 0 0
"3104" "exp3" 1 32 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1075 44 1
"3104" "exp3" 1 33 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 1194 0 0
"3104" "exp3" 1 34 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1120 0 0
"3104" "exp3" 1 35 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 743 33 1
"3104" "exp3" 1 36 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 541 27 1
"3104" "exp3" 1 37 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 622 0 0
"3104" "exp3" 1 38 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1010 41 1
"3104" "exp3" 1 39 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 746 38 1
"3104" "exp3" 1 40 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1773 0 0
"3104" "exp3" 1 41 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1626 40 1
"3104" "exp3" 1 42 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 609 0 0
"3104" "exp3" 1 43 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1122 26 1
"3104" "exp3" 1 44 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 694 13 1
"3104" "exp3" 1 45 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1968 0 0
"3104" "exp3" 1 46 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1478 0 0
"3104" "exp3" 1 47 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1625 17 1
"3104" "exp3" 1 48 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1924 27 1
"3104" "exp3" 1 49 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1946 0 0
"3104" "exp3" 1 50 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 1225 0 0
"3104" "exp3" 1 51 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 1670 0 0
"3104" "exp3" 1 52 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 699 22 1
"3104" "exp3" 1 53 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 689 19 1
"3104" "exp3" 1 54 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 803 30 1
"3104" "exp3" 1 55 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 764 45 1
"3104" "exp3" 1 56 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 851 0 0
"3104" "exp3" 1 57 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1653 35 1
"3104" "exp3" 1 58 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1016 22 1
"3104" "exp3" 1 59 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1270 6 1
"3104" "exp3" 1 60 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 754 0 0
"3104" "exp3" 1 61 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1519 0 0
"3104" "exp3" 1 62 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 951 0 0
"3104" "exp3" 1 63 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1003 33 1
"3104" "exp3" 1 64 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1150 24 1
"3104" "exp3" 1 65 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1185 0 0
"3104" "exp3" 1 66 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1126 0 0
"3104" "exp3" 1 67 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 933 25 1
"3104" "exp3" 1 68 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 853 61 1
"3104" "exp3" 1 69 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1043 83 1
"3104" "exp3" 1 70 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1256 0 0
"3104" "exp3" 1 71 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 714 20 1
"3104" "exp3" 1 72 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 886 0 0
"3104" "exp3" 1 73 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 574 19 1
"3104" "exp3" 1 74 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 622 68 1
"3104" "exp3" 1 75 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 756 17 1
"3104" "exp3" 1 76 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 892 24 1
"3104" "exp3" 1 77 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1148 11 1
"3104" "exp3" 1 78 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1102 0 0
"3104" "exp3" 1 79 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 706 24 1
"3104" "exp3" 1 80 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 566 0 0
"3104" "exp3" 1 81 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 687 0 0
"3104" "exp3" 1 82 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 782 31 1
"3104" "exp3" 1 83 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1031 33 1
"3104" "exp3" 1 84 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 689 32 1
"3104" "exp3" 1 85 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 882 0 0
"3104" "exp3" 1 86 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1469 0 0
"3104" "exp3" 1 87 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 776 14 1
"3104" "exp3" 1 88 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 643 0 0
"3104" "exp3" 1 89 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 916 22 1
"3104" "exp3" 1 90 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 973 0 0
"3104" "exp3" 1 91 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1160 0 0
"3104" "exp3" 1 92 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1384 0 0
"3104" "exp3" 1 93 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 639 0 0
"3104" "exp3" 1 94 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 731 25 1
"3104" "exp3" 1 95 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1164 0 0
"3104" "exp3" 1 96 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1278 0 0
"3104" "exp3" 1 97 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 940 47 1
"3104" "exp3" 1 98 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1077 29 1
"3104" "exp3" 1 99 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 906 0 0
"3104" "exp3" 1 100 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 676 15 1
"3104" "exp3" 1 101 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 822 46 1
"3104" "exp3" 1 102 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 3234 28 1
"3104" "exp3" 1 103 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1198 28 1
"3104" "exp3" 1 104 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 752 45 1
"3104" "exp3" 1 105 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 696 66 1
"3104" "exp3" 1 106 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 595 39 1
"3104" "exp3" 1 107 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1065 8 1
"3104" "exp3" 1 108 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 979 30 1
"3104" "exp3" 1 109 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1477 14 1
"3104" "exp3" 1 110 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1870 0 0
"3104" "exp3" 1 111 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1018 0 0
"3104" "exp3" 1 112 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 822 32 1
"3104" "exp3" 1 113 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 604 10 1
"3104" "exp3" 1 114 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1940 12 1
"3104" "exp3" 1 115 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 783 0 0
"3104" "exp3" 1 116 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1007 22 1
"3104" "exp3" 1 117 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1050 0 0
"3104" "exp3" 1 118 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 2189 0 0
"3104" "exp3" 1 119 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1367 28 1
"3104" "exp3" 1 120 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1274 23 1
"3104" "exp3" 1 121 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1094 34 1
"3104" "exp3" 1 122 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1131 29 1
"3104" "exp3" 1 123 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1201 0 0
"3104" "exp3" 1 124 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1404 24 1
"3104" "exp3" 1 125 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 863 35 1
"3104" "exp3" 1 126 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 711 43 1
"3104" "exp3" 1 127 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1146 20 1
"3104" "exp3" 1 128 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 684 0 0
"3104" "exp3" 1 129 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 800 42 1
"3104" "exp3" 1 130 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 996 33 1
"3104" "exp3" 1 131 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 939 29 1
"3104" "exp3" 1 132 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 783 88 1
"3104" "exp3" 2 1 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 840 40 1
"3104" "exp3" 2 2 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1304 0 0
"3104" "exp3" 2 3 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1306 11 1
"3104" "exp3" 2 4 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 886 73 1
"3104" "exp3" 2 5 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 836 0 0
"3104" "exp3" 2 6 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 827 23 1
"3104" "exp3" 2 7 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 968 41 1
"3104" "exp3" 2 8 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 703 0 0
"3104" "exp3" 2 9 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 659 36 1
"3104" "exp3" 2 10 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1324 18 1
"3104" "exp3" 2 11 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 980 28 1
"3104" "exp3" 2 12 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 898 0 0
"3104" "exp3" 2 13 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 832 0 0
"3104" "exp3" 2 14 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 864 47 1
"3104" "exp3" 2 15 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1032 15 1
"3104" "exp3" 2 16 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1250 0 0
"3104" "exp3" 2 17 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 796 30 1
"3104" "exp3" 2 18 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1452 14 1
"3104" "exp3" 2 19 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 857 0 0
"3104" "exp3" 2 20 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1230 34 1
"3104" "exp3" 2 21 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 920 16 1
"3104" "exp3" 2 22 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 994 17 1
"3104" "exp3" 2 23 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 756 26 1
"3104" "exp3" 2 24 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 855 23 1
"3104" "exp3" 2 25 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1210 0 0
"3104" "exp3" 2 26 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 859 0 0
"3104" "exp3" 2 27 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1569 0 0
"3104" "exp3" 2 28 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1124 43 1
"3104" "exp3" 2 29 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1952 0 0
"3104" "exp3" 2 30 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1225 32 1
"3104" "exp3" 2 31 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 600 27 1
"3104" "exp3" 2 32 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1452 22 1
"3104" "exp3" 2 33 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1166 28 1
"3104" "exp3" 2 34 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1408 0 0
"3104" "exp3" 2 35 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1601 21 1
"3104" "exp3" 2 36 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 657 22 1
"3104" "exp3" 2 37 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1138 0 0
"3104" "exp3" 2 38 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 985 28 1
"3104" "exp3" 2 39 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1053 29 1
"3104" "exp3" 2 40 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1012 36 1
"3104" "exp3" 2 41 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 803 37 1
"3104" "exp3" 2 42 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 771 0 0
"3104" "exp3" 2 43 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 894 31 1
"3104" "exp3" 2 44 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1092 99 1
"3104" "exp3" 2 45 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1642 39 1
"3104" "exp3" 2 46 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 842 26 1
"3104" "exp3" 2 47 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 976 0 0
"3104" "exp3" 2 48 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 678 33 1
"3104" "exp3" 2 49 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1085 0 0
"3104" "exp3" 2 50 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 934 26 1
"3104" "exp3" 2 51 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 643 0 0
"3104" "exp3" 2 52 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 902 0 0
"3104" "exp3" 2 53 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 2297 55 1
"3104" "exp3" 2 54 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1313 38 1
"3104" "exp3" 2 55 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 908 25 1
"3104" "exp3" 2 56 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1677 0 0
"3104" "exp3" 2 57 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 973 20 1
"3104" "exp3" 2 58 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1039 21 1
"3104" "exp3" 2 59 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 918 0 0
"3104" "exp3" 2 60 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1065 0 0
"3104" "exp3" 2 61 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 958 59 1
"3104" "exp3" 2 62 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 883 19 1
"3104" "exp3" 2 63 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1168 15 1
"3104" "exp3" 2 64 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 859 23 1
"3104" "exp3" 2 65 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 886 0 0
"3104" "exp3" 2 66 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1031 37 1
"3104" "exp3" 2 67 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 827 0 0
"3104" "exp3" 2 68 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1242 0 0
"3104" "exp3" 2 69 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1590 34 1
"3104" "exp3" 2 70 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 718 0 0
"3104" "exp3" 2 71 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 834 0 0
"3104" "exp3" 2 72 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 756 44 1
"3104" "exp3" 2 73 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 852 0 0
"3104" "exp3" 2 74 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1100 15 1
"3104" "exp3" 2 75 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1150 0 0
"3104" "exp3" 2 76 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 844 0 0
"3104" "exp3" 2 77 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1483 0 0
"3104" "exp3" 2 78 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1121 20 1
"3104" "exp3" 2 79 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 941 0 0
"3104" "exp3" 2 80 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1574 0 0
"3104" "exp3" 2 81 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 601 42 1
"3104" "exp3" 2 82 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1467 17 1
"3104" "exp3" 2 83 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 603 28 1
"3104" "exp3" 2 84 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 639 17 1
"3104" "exp3" 2 85 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 948 29 1
"3104" "exp3" 2 86 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 708 0 0
"3104" "exp3" 2 87 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 743 33 1
"3104" "exp3" 2 88 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 896 35 1
"3104" "exp3" 2 89 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 626 32 1
"3104" "exp3" 2 90 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 520 0 0
"3104" "exp3" 2 91 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 703 49 1
"3104" "exp3" 2 92 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 472 0 0
"3104" "exp3" 2 93 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 549 14 1
"3104" "exp3" 2 94 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 981 12 1
"3104" "exp3" 2 95 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1119 0 0
"3104" "exp3" 2 96 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 544 33 1
"3104" "exp3" 2 97 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 528 32 1
"3104" "exp3" 2 98 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 634 10 1
"3104" "exp3" 2 99 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1184 0 0
"3104" "exp3" 2 100 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 982 24 1
"3104" "exp3" 2 101 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 606 13 1
"3104" "exp3" 2 102 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 547 0 0
"3104" "exp3" 2 103 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 877 35 1
"3104" "exp3" 2 104 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 577 0 0
"3104" "exp3" 2 105 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 990 90 1
"3104" "exp3" 2 106 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 518 0 0
"3104" "exp3" 2 107 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1638 0 0
"3104" "exp3" 2 108 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1076 0 0
"3104" "exp3" 2 109 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1512 0 0
"3104" "exp3" 2 110 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 952 30 1
"3104" "exp3" 2 111 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 657 29 1
"3104" "exp3" 2 112 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1008 13 1
"3104" "exp3" 2 113 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 755 22 1
"3104" "exp3" 2 114 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 769 25 1
"3104" "exp3" 2 115 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 655 35 1
"3104" "exp3" 2 116 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 772 24 1
"3104" "exp3" 2 117 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 538 21 1
"3104" "exp3" 2 118 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 588 18 1
"3104" "exp3" 2 119 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 520 11 1
"3104" "exp3" 2 120 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 585 25 1
"3104" "exp3" 2 121 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 599 20 1
"3104" "exp3" 2 122 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 706 44 1
"3104" "exp3" 2 123 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1055 0 0
"3104" "exp3" 2 124 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 424 23 1
"3104" "exp3" 2 125 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 646 37 1
"3104" "exp3" 2 126 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 861 27 1
"3104" "exp3" 2 127 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 966 8 1
"3104" "exp3" 2 128 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 904 18 1
"3104" "exp3" 2 129 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 578 0 0
"3104" "exp3" 2 130 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 539 18 1
"3104" "exp3" 2 131 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1093 30 1
"3104" "exp3" 2 132 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 685 0 0
"3104" "exp3" 1 1 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 621 37 1
"3104" "exp3" 1 2 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 678 0 0
"3104" "exp3" 1 3 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 500 17 1
"3104" "exp3" 1 4 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 916 19 1
"3104" "exp3" 1 5 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 691 33 1
"3104" "exp3" 1 6 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 604 0 0
"3104" "exp3" 1 7 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 602 47 1
"3104" "exp3" 1 8 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 806 28 1
"3104" "exp3" 1 9 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 947 30 1
"3104" "exp3" 1 10 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 971 0 0
"3104" "exp3" 1 11 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 955 29 1
"3104" "exp3" 1 12 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1389 25 1
"3104" "exp3" 1 13 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 732 33 1
"3104" "exp3" 1 14 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 796 27 1
"3104" "exp3" 1 15 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 784 14 1
"3104" "exp3" 1 16 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1107 0 0
"3104" "exp3" 1 17 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1538 17 1
"3104" "exp3" 1 18 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1235 0 0
"3104" "exp3" 1 19 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 658 0 0
"3104" "exp3" 1 20 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 686 41 1
"3104" "exp3" 1 21 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 916 5 1
"3104" "exp3" 1 22 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1252 16 1
"3104" "exp3" 1 23 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 581 33 1
"3104" "exp3" 1 24 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 865 31 1
"3104" "exp3" 1 25 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1094 18 1
"3104" "exp3" 1 26 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 516 13 1
"3104" "exp3" 1 27 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 587 24 1
"3104" "exp3" 1 28 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 572 0 0
"3104" "exp3" 1 29 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 616 26 1
"3104" "exp3" 1 30 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 874 43 1
"3104" "exp3" 1 31 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 839 0 0
"3104" "exp3" 1 32 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 621 15 1
"3104" "exp3" 1 33 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1011 0 0
"3104" "exp3" 1 34 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1284 0 0
"3104" "exp3" 1 35 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1056 15 1
"3104" "exp3" 1 36 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2992 14 1
"3104" "exp3" 1 37 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 947 19 1
"3104" "exp3" 1 38 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 886 34 1
"3104" "exp3" 1 39 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1356 37 1
"3104" "exp3" 1 40 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 1513 6 1
"3104" "exp3" 1 41 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 926 0 0
"3104" "exp3" 1 42 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1000 0 0
"3104" "exp3" 1 43 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1081 0 0
"3104" "exp3" 1 44 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 725 23 1
"3104" "exp3" 1 45 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1140 18 1
"3104" "exp3" 1 46 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 930 0 0
"3104" "exp3" 1 47 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 727 31 1
"3104" "exp3" 1 48 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 680 21 1
"3104" "exp3" 1 49 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 739 44 1
"3104" "exp3" 1 50 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 508 0 0
"3104" "exp3" 1 51 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 480 4 1
"3104" "exp3" 1 52 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1651 0 0
"3104" "exp3" 1 53 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 867 30 1
"3104" "exp3" 1 54 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 582 38 1
"3104" "exp3" 1 55 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 567 48 1
"3104" "exp3" 1 56 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1135 14 1
"3104" "exp3" 1 57 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1068 0 0
"3104" "exp3" 1 58 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 793 41 1
"3104" "exp3" 1 59 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1055 0 0
"3104" "exp3" 1 60 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1173 39 1
"3104" "exp3" 1 61 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1181 13 1
"3104" "exp3" 1 62 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1974 0 0
"3104" "exp3" 1 63 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1749 20 1
"3104" "exp3" 1 64 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1029 0 0
"3104" "exp3" 1 65 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1314 20 1
"3104" "exp3" 1 66 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 632 0 0
"3104" "exp3" 1 67 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 918 25 1
"3104" "exp3" 1 68 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2016 0 0
"3104" "exp3" 1 69 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1368 15 1
"3104" "exp3" 1 70 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1077 21 1
"3104" "exp3" 1 71 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 684 37 1
"3104" "exp3" 1 72 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 536 0 0
"3104" "exp3" 1 73 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 604 5 1
"3104" "exp3" 1 74 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 616 22 1
"3104" "exp3" 1 75 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 812 43 1
"3104" "exp3" 1 76 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1242 8 1
"3104" "exp3" 1 77 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 924 27 1
"3104" "exp3" 1 78 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 716 0 0
"3104" "exp3" 1 79 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1284 13 1
"3104" "exp3" 1 80 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 552 19 1
"3104" "exp3" 1 81 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 721 0 0
"3104" "exp3" 1 82 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 746 36 1
"3104" "exp3" 1 83 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 999 25 1
"3104" "exp3" 1 84 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 710 28 1
"3104" "exp3" 1 85 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 503 23 1
"3104" "exp3" 1 86 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 686 49 1
"3104" "exp3" 1 87 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 578 38 1
"3104" "exp3" 1 88 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 621 30 1
"3104" "exp3" 1 89 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 778 21 1
"3104" "exp3" 1 90 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 530 9 1
"3104" "exp3" 1 91 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 635 0 0
"3104" "exp3" 1 92 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 780 16 1
"3104" "exp3" 1 93 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1232 18 1
"3104" "exp3" 1 94 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1573 10 1
"3104" "exp3" 1 95 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 495 9 1
"3104" "exp3" 1 96 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 862 27 1
"3104" "exp3" 1 97 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 679 28 1
"3104" "exp3" 1 98 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1422 11 1
"3104" "exp3" 1 99 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 526 32 1
"3104" "exp3" 1 100 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 712 0 0
"3104" "exp3" 1 101 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 762 36 1
"3104" "exp3" 1 102 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 944 12 1
"3104" "exp3" 1 103 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 515 0 0
"3104" "exp3" 1 104 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 452 7 1
"3104" "exp3" 1 105 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1239 40 1
"3104" "exp3" 1 106 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 639 29 1
"3104" "exp3" 1 107 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 776 29 1
"3104" "exp3" 1 108 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 582 0 0
"3104" "exp3" 1 109 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 559 0 0
"3104" "exp3" 1 110 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 637 23 1
"3104" "exp3" 1 111 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 886 8 1
"3104" "exp3" 1 112 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 608 22 1
"3104" "exp3" 1 113 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 568 0 0
"3104" "exp3" 1 114 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 593 30 1
"3104" "exp3" 1 115 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 412 26 1
"3104" "exp3" 1 116 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 473 6 1
"3104" "exp3" 1 117 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 382 11 1
"3104" "exp3" 1 118 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 429 0 0
"3104" "exp3" 1 119 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 473 10 1
"3104" "exp3" 1 120 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 686 0 0
"3104" "exp3" 1 121 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 476 26 1
"3104" "exp3" 1 122 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 646 44 1
"3104" "exp3" 1 123 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 461 32 1
"3104" "exp3" 1 124 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 804 0 0
"3104" "exp3" 1 125 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 519 0 0
"3104" "exp3" 1 126 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 566 0 0
"3104" "exp3" 1 127 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 500 2 1
"3104" "exp3" 1 128 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 848 0 0
"3104" "exp3" 1 129 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 677 0 0
"3104" "exp3" 1 130 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 857 17 1
"3104" "exp3" 1 131 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 700 19 1
"3104" "exp3" 1 132 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 829 36 1
"3104" "exp3" 2 1 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 926 17 1
"3104" "exp3" 2 2 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 747 16 1
"3104" "exp3" 2 3 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 415 16 1
"3104" "exp3" 2 4 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 519 23 1
"3104" "exp3" 2 5 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 504 39 1
"3104" "exp3" 2 6 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 538 13 1
"3104" "exp3" 2 7 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 408 30 1
"3104" "exp3" 2 8 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 972 31 1
"3104" "exp3" 2 9 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 519 46 1
"3104" "exp3" 2 10 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 406 27 1
"3104" "exp3" 2 11 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 577 28 1
"3104" "exp3" 2 12 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 693 15 1
"3104" "exp3" 2 13 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 700 23 1
"3104" "exp3" 2 14 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1184 0 0
"3104" "exp3" 2 15 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 541 18 1
"3104" "exp3" 2 16 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 521 11 1
"3104" "exp3" 2 17 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 680 0 0
"3104" "exp3" 2 18 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 419 0 0
"3104" "exp3" 2 19 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 444 23 1
"3104" "exp3" 2 20 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 589 0 0
"3104" "exp3" 2 21 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 484 25 1
"3104" "exp3" 2 22 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 462 17 1
"3104" "exp3" 2 23 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 637 0 0
"3104" "exp3" 2 24 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 559 28 1
"3104" "exp3" 2 25 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 458 14 1
"3104" "exp3" 2 26 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 703 7 1
"3104" "exp3" 2 27 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 707 0 0
"3104" "exp3" 2 28 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 534 0 0
"3104" "exp3" 2 29 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 650 0 0
"3104" "exp3" 2 30 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 485 41 1
"3104" "exp3" 2 31 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1181 0 0
"3104" "exp3" 2 32 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 508 0 0
"3104" "exp3" 2 33 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 577 29 1
"3104" "exp3" 2 34 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 583 39 1
"3104" "exp3" 2 35 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 758 0 0
"3104" "exp3" 2 36 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 564 0 0
"3104" "exp3" 2 37 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 615 0 0
"3104" "exp3" 2 38 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 817 29 1
"3104" "exp3" 2 39 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 849 36 1
"3104" "exp3" 2 40 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 987 32 1
"3104" "exp3" 2 41 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 1357 0 0
"3104" "exp3" 2 42 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 809 23 1
"3104" "exp3" 2 43 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 962 0 0
"3104" "exp3" 2 44 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1016 44 1
"3104" "exp3" 2 45 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 2602 12 1
"3104" "exp3" 2 46 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1728 0 0
"3104" "exp3" 2 47 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 645 0 0
"3104" "exp3" 2 48 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 741 20 1
"3104" "exp3" 2 49 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1315 37 1
"3104" "exp3" 2 50 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 506 40 1
"3104" "exp3" 2 51 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1287 0 0
"3104" "exp3" 2 52 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 1574 7 1
"3104" "exp3" 2 53 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1059 0 0
"3104" "exp3" 2 54 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2610 95 1
"3104" "exp3" 2 55 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1670 0 0
"3104" "exp3" 2 56 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 874 12 1
"3104" "exp3" 2 57 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1450 19 1
"3104" "exp3" 2 58 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 851 43 1
"3104" "exp3" 2 59 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 477 0 0
"3104" "exp3" 2 60 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 386 1 1
"3104" "exp3" 2 61 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1207 25 1
"3104" "exp3" 2 62 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 814 49 1
"3104" "exp3" 2 63 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 564 0 0
"3104" "exp3" 2 64 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 696 0 0
"3104" "exp3" 2 65 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 499 0 0
"3104" "exp3" 2 66 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 652 11 1
"3104" "exp3" 2 67 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1160 20 1
"3104" "exp3" 2 68 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1003 0 0
"3104" "exp3" 2 69 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 655 6 1
"3104" "exp3" 2 70 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 824 0 0
"3104" "exp3" 2 71 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 946 31 1
"3104" "exp3" 2 72 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 787 0 0
"3104" "exp3" 2 73 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 801 32 1
"3104" "exp3" 2 74 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 595 0 0
"3104" "exp3" 2 75 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 595 0 0
"3104" "exp3" 2 76 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 540 10 1
"3104" "exp3" 2 77 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 580 33 1
"3104" "exp3" 2 78 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 731 0 0
"3104" "exp3" 2 79 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 939 18 1
"3104" "exp3" 2 80 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 531 26 1
"3104" "exp3" 2 81 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 485 22 1
"3104" "exp3" 2 82 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 546 27 1
"3104" "exp3" 2 83 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 566 29 1
"3104" "exp3" 2 84 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1183 24 1
"3104" "exp3" 2 85 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 651 15 1
"3104" "exp3" 2 86 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 558 26 1
"3104" "exp3" 2 87 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1096 0 0
"3104" "exp3" 2 88 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 638 19 1
"3104" "exp3" 2 89 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 891 0 0
"3104" "exp3" 2 90 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 980 19 1
"3104" "exp3" 2 91 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 775 18 1
"3104" "exp3" 2 92 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 512 35 1
"3104" "exp3" 2 93 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 587 0 0
"3104" "exp3" 2 94 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 470 0 0
"3104" "exp3" 2 95 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1030 0 0
"3104" "exp3" 2 96 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 444 24 1
"3104" "exp3" 2 97 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1191 9 1
"3104" "exp3" 2 98 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 625 0 0
"3104" "exp3" 2 99 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 952 17 1
"3104" "exp3" 2 100 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 875 0 0
"3104" "exp3" 2 101 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 475 18 1
"3104" "exp3" 2 102 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 543 17 1
"3104" "exp3" 2 103 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 633 15 1
"3104" "exp3" 2 104 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 576 0 0
"3104" "exp3" 2 105 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 828 21 1
"3104" "exp3" 2 106 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 582 43 1
"3104" "exp3" 2 107 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 770 22 1
"3104" "exp3" 2 108 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 560 30 1
"3104" "exp3" 2 109 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 519 26 1
"3104" "exp3" 2 110 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 595 8 1
"3104" "exp3" 2 111 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 460 0 0
"3104" "exp3" 2 112 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 606 41 1
"3104" "exp3" 2 113 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 627 0 0
"3104" "exp3" 2 114 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 832 34 1
"3104" "exp3" 2 115 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 619 21 1
"3104" "exp3" 2 116 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 855 0 0
"3104" "exp3" 2 117 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 614 21 1
"3104" "exp3" 2 118 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 928 0 0
"3104" "exp3" 2 119 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 518 8 1
"3104" "exp3" 2 120 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 704 14 1
"3104" "exp3" 2 121 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 571 36 1
"3104" "exp3" 2 122 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1107 0 0
"3104" "exp3" 2 123 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 614 33 1
"3104" "exp3" 2 124 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 543 24 1
"3104" "exp3" 2 125 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 998 30 1
"3104" "exp3" 2 126 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 497 38 1
"3104" "exp3" 2 127 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 593 32 1
"3104" "exp3" 2 128 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 562 28 1
"3104" "exp3" 2 129 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 533 0 0
"3104" "exp3" 2 130 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1087 0 0
"3104" "exp3" 2 131 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 615 0 0
"3104" "exp3" 2 132 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 577 0 0
"3104" "exp3" 1 1 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1971 0 0
"3104" "exp3" 1 2 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 774 9 1
"3104" "exp3" 1 3 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 574 31 1
"3104" "exp3" 1 4 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1032 43 1
"3104" "exp3" 1 5 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1563 31 1
"3104" "exp3" 1 6 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 990 0 0
"3104" "exp3" 1 7 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 1291 7 1
"3104" "exp3" 1 8 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1772 34 1
"3104" "exp3" 1 9 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1002 6 1
"3104" "exp3" 1 10 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1415 0 0
"3104" "exp3" 1 11 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1364 0 0
"3104" "exp3" 1 12 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 741 0 0
"3104" "exp3" 1 13 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 993 11 1
"3104" "exp3" 1 14 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 439 0 0
"3104" "exp3" 1 15 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 478 0 0
"3104" "exp3" 1 16 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 754 32 1
"3104" "exp3" 1 17 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 601 0 0
"3104" "exp3" 1 18 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 739 29 1
"3104" "exp3" 1 19 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 606 39 1
"3104" "exp3" 1 20 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 561 22 1
"3104" "exp3" 1 21 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 453 38 1
"3104" "exp3" 1 22 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1671 96 1
"3104" "exp3" 1 23 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1454 0 0
"3104" "exp3" 1 24 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2223 47 1
"3104" "exp3" 1 25 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1948 0 0
"3104" "exp3" 1 26 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1283 0 0
"3104" "exp3" 1 27 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1961 0 0
"3104" "exp3" 1 28 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1108 0 0
"3104" "exp3" 1 29 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 2485 13 1
"3104" "exp3" 1 30 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1137 41 1
"3104" "exp3" 1 31 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 545 0 0
"3104" "exp3" 1 32 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 830 16 1
"3104" "exp3" 1 33 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 940 30 1
"3104" "exp3" 1 34 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1133 27 1
"3104" "exp3" 1 35 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 665 17 1
"3104" "exp3" 1 36 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1167 33 1
"3104" "exp3" 1 37 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 636 25 1
"3104" "exp3" 1 38 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 636 0 0
"3104" "exp3" 1 39 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1097 23 1
"3104" "exp3" 1 40 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1035 45 1
"3104" "exp3" 1 41 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 648 20 1
"3104" "exp3" 1 42 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 693 35 1
"3104" "exp3" 1 43 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 581 28 1
"3104" "exp3" 1 44 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1014 31 1
"3104" "exp3" 1 45 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 852 27 1
"3104" "exp3" 1 46 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1239 19 1
"3104" "exp3" 1 47 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1014 0 0
"3104" "exp3" 1 48 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 791 26 1
"3104" "exp3" 1 49 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1316 0 0
"3104" "exp3" 1 50 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1373 0 0
"3104" "exp3" 1 51 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1016 0 0
"3104" "exp3" 1 52 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 903 12 1
"3104" "exp3" 1 53 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 959 0 0
"3104" "exp3" 1 54 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 740 16 1
"3104" "exp3" 1 55 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 745 0 0
"3104" "exp3" 1 56 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1095 41 1
"3104" "exp3" 1 57 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1076 0 0
"3104" "exp3" 1 58 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 1210 0 0
"3104" "exp3" 1 59 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1470 0 0
"3104" "exp3" 1 60 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 871 24 1
"3104" "exp3" 1 61 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 631 11 1
"3104" "exp3" 1 62 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 860 19 1
"3104" "exp3" 1 63 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 511 15 1
"3104" "exp3" 1 64 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 526 15 1
"3104" "exp3" 1 65 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 846 8 1
"3104" "exp3" 1 66 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 612 21 1
"3104" "exp3" 1 67 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 4235 17 1
"3104" "exp3" 1 68 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 2017 0 0
"3104" "exp3" 1 69 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1733 80 1
"3104" "exp3" 1 70 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 726 0 0
"3104" "exp3" 1 71 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1352 0 0
"3104" "exp3" 1 72 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 690 22 1
"3104" "exp3" 1 73 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 568 36 1
"3104" "exp3" 1 74 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 802 45 1
"3104" "exp3" 1 75 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 624 21 1
"3104" "exp3" 1 76 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1478 0 0
"3104" "exp3" 1 77 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 1156 0 0
"3104" "exp3" 1 78 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1552 10 1
"3104" "exp3" 1 79 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 804 19 1
"3104" "exp3" 1 80 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1883 30 1
"3104" "exp3" 1 81 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1002 14 1
"3104" "exp3" 1 82 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 901 22 1
"3104" "exp3" 1 83 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 1141 17 1
"3104" "exp3" 1 84 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 530 5 1
"3104" "exp3" 1 85 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 752 23 1
"3104" "exp3" 1 86 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 523 27 1
"3104" "exp3" 1 87 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 917 0 0
"3104" "exp3" 1 88 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 548 29 1
"3104" "exp3" 1 89 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1033 34 1
"3104" "exp3" 1 90 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 534 20 1
"3104" "exp3" 1 91 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 805 15 1
"3104" "exp3" 1 92 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 616 34 1
"3104" "exp3" 1 93 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 988 32 1
"3104" "exp3" 1 94 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1598 9 1
"3104" "exp3" 1 95 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1256 43 1
"3104" "exp3" 1 96 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1054 24 1
"3104" "exp3" 1 97 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1068 10 1
"3104" "exp3" 1 98 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1181 0 0
"3104" "exp3" 1 99 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1135 35 1
"3104" "exp3" 1 100 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1149 36 1
"3104" "exp3" 1 101 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1423 17 1
"3104" "exp3" 1 102 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 2327 0 0
"3104" "exp3" 1 103 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1030 14 1
"3104" "exp3" 1 104 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1059 26 1
"3104" "exp3" 1 105 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1137 13 1
"3104" "exp3" 1 106 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 2006 0 0
"3104" "exp3" 1 107 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 2566 26 1
"3104" "exp3" 1 108 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 747 28 1
"3104" "exp3" 1 109 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 911 52 1
"3104" "exp3" 1 110 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1173 12 1
"3104" "exp3" 1 111 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 582 0 0
"3104" "exp3" 1 112 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 668 18 1
"3104" "exp3" 1 113 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 781 23 1
"3104" "exp3" 1 114 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 939 33 1
"3104" "exp3" 1 115 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1142 37 1
"3104" "exp3" 1 116 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 627 23 1
"3104" "exp3" 1 117 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 599 30 1
"3104" "exp3" 1 118 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 597 20 1
"3104" "exp3" 1 119 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1174 33 1
"3104" "exp3" 1 120 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 660 22 1
"3104" "exp3" 1 121 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 560 38 1
"3104" "exp3" 1 122 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 738 35 1
"3104" "exp3" 1 123 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 899 0 0
"3104" "exp3" 1 124 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1485 30 1
"3104" "exp3" 1 125 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 782 0 0
"3104" "exp3" 1 126 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 681 18 1
"3104" "exp3" 1 127 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1919 28 1
"3104" "exp3" 1 128 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 637 25 1
"3104" "exp3" 1 129 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1340 36 1
"3104" "exp3" 1 130 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 861 18 1
"3104" "exp3" 1 131 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1283 0 0
"3104" "exp3" 1 132 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 959 24 1
"3104" "exp3" 2 1 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 906 30 1
"3104" "exp3" 2 2 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 685 14 1
"3104" "exp3" 2 3 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 650 32 1
"3104" "exp3" 2 4 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 570 45 1
"3104" "exp3" 2 5 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 731 0 0
"3104" "exp3" 2 6 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1178 7 1
"3104" "exp3" 2 7 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 563 9 1
"3104" "exp3" 2 8 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 788 0 0
"3104" "exp3" 2 9 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1376 0 0
"3104" "exp3" 2 10 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1450 38 1
"3104" "exp3" 2 11 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 752 0 0
"3104" "exp3" 2 12 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 810 0 0
"3104" "exp3" 2 13 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1035 32 1
"3104" "exp3" 2 14 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 888 21 1
"3104" "exp3" 2 15 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 889 8 1
"3104" "exp3" 2 16 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 643 22 1
"3104" "exp3" 2 17 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 809 43 1
"3104" "exp3" 2 18 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 850 0 0
"3104" "exp3" 2 19 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 599 30 1
"3104" "exp3" 2 20 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 966 0 0
"3104" "exp3" 2 21 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 715 0 0
"3104" "exp3" 2 22 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1179 0 0
"3104" "exp3" 2 23 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 816 29 1
"3104" "exp3" 2 24 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 796 21 1
"3104" "exp3" 2 25 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1672 0 0
"3104" "exp3" 2 26 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 968 0 0
"3104" "exp3" 2 27 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 645 26 1
"3104" "exp3" 2 28 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1528 56 1
"3104" "exp3" 2 29 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1105 0 0
"3104" "exp3" 2 30 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 898 0 0
"3104" "exp3" 2 31 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1019 0 0
"3104" "exp3" 2 32 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 748 22 1
"3104" "exp3" 2 33 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 989 0 0
"3104" "exp3" 2 34 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 714 32 1
"3104" "exp3" 2 35 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 613 24 1
"3104" "exp3" 2 36 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 620 0 0
"3104" "exp3" 2 37 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 645 12 1
"3104" "exp3" 2 38 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 789 0 0
"3104" "exp3" 2 39 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 801 35 1
"3104" "exp3" 2 40 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 642 24 1
"3104" "exp3" 2 41 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 672 33 1
"3104" "exp3" 2 42 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 550 12 1
"3104" "exp3" 2 43 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 663 0 0
"3104" "exp3" 2 44 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 520 0 0
"3104" "exp3" 2 45 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 883 0 0
"3104" "exp3" 2 46 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1579 11 1
"3104" "exp3" 2 47 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 817 27 1
"3104" "exp3" 2 48 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 472 14 1
"3104" "exp3" 2 49 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 662 0 0
"3104" "exp3" 2 50 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1063 10 1
"3104" "exp3" 2 51 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 639 0 0
"3104" "exp3" 2 52 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 880 17 1
"3104" "exp3" 2 53 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 888 0 0
"3104" "exp3" 2 54 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 548 19 1
"3104" "exp3" 2 55 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 698 28 1
"3104" "exp3" 2 56 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1352 37 1
"3104" "exp3" 2 57 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 632 0 0
"3104" "exp3" 2 58 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 827 0 0
"3104" "exp3" 2 59 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 552 0 0
"3104" "exp3" 2 60 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 428 29 1
"3104" "exp3" 2 61 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 585 30 1
"3104" "exp3" 2 62 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 517 0 0
"3104" "exp3" 2 63 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 526 20 1
"3104" "exp3" 2 64 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 544 0 0
"3104" "exp3" 2 65 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 746 0 0
"3104" "exp3" 2 66 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 521 0 0
"3104" "exp3" 2 67 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 722 28 1
"3104" "exp3" 2 68 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 413 0 0
"3104" "exp3" 2 69 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 2303 0 0
"3104" "exp3" 2 70 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1815 19 1
"3104" "exp3" 2 71 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 862 31 1
"3104" "exp3" 2 72 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 833 15 1
"3104" "exp3" 2 73 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 983 0 0
"3104" "exp3" 2 74 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 929 0 0
"3104" "exp3" 2 75 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 647 25 1
"3104" "exp3" 2 76 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 867 48 1
"3104" "exp3" 2 77 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 569 7 1
"3104" "exp3" 2 78 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 723 18 1
"3104" "exp3" 2 79 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 839 0 0
"3104" "exp3" 2 80 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 457 42 1
"3104" "exp3" 2 81 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 550 24 1
"3104" "exp3" 2 82 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 736 41 1
"3104" "exp3" 2 83 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 591 13 1
"3104" "exp3" 2 84 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1066 0 0
"3104" "exp3" 2 85 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1071 23 1
"3104" "exp3" 2 86 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 817 0 0
"3104" "exp3" 2 87 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 771 23 1
"3104" "exp3" 2 88 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1304 6 1
"3104" "exp3" 2 89 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 860 0 0
"3104" "exp3" 2 90 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 744 35 1
"3104" "exp3" 2 91 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 601 0 0
"3104" "exp3" 2 92 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 957 0 0
"3104" "exp3" 2 93 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 950 29 1
"3104" "exp3" 2 94 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 691 9 1
"3104" "exp3" 2 95 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 564 16 1
"3104" "exp3" 2 96 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 574 25 1
"3104" "exp3" 2 97 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 596 22 1
"3104" "exp3" 2 98 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 618 43 1
"3104" "exp3" 2 99 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 621 36 1
"3104" "exp3" 2 100 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 558 23 1
"3104" "exp3" 2 101 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 523 2 1
"3104" "exp3" 2 102 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 948 0 0
"3104" "exp3" 2 103 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1218 0 0
"3104" "exp3" 2 104 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1087 8 1
"3104" "exp3" 2 105 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 664 27 1
"3104" "exp3" 2 106 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 929 20 1
"3104" "exp3" 2 107 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1121 44 1
"3104" "exp3" 2 108 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1263 20 1
"3104" "exp3" 2 109 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1040 11 1
"3104" "exp3" 2 110 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1154 28 1
"3104" "exp3" 2 111 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 591 19 1
"3104" "exp3" 2 112 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 629 13 1
"3104" "exp3" 2 113 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1313 39 1
"3104" "exp3" 2 114 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1048 32 1
"3104" "exp3" 2 115 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 625 0 0
"3104" "exp3" 2 116 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1094 33 1
"3104" "exp3" 2 117 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 735 29 1
"3104" "exp3" 2 118 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 2560 18 1
"3104" "exp3" 2 119 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 722 22 1
"3104" "exp3" 2 120 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1316 0 0
"3104" "exp3" 2 121 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 755 0 0
"3104" "exp3" 2 122 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 895 0 0
"3104" "exp3" 2 123 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 856 0 0
"3104" "exp3" 2 124 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 634 24 1
"3104" "exp3" 2 125 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 659 69 1
"3104" "exp3" 2 126 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 821 33 1
"3104" "exp3" 2 127 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 652 0 0
"3104" "exp3" 2 128 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 709 15 1
"3104" "exp3" 2 129 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 885 34 1
"3104" "exp3" 2 130 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 2245 0 0
"3104" "exp3" 2 131 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 704 18 1
"3104" "exp3" 2 132 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1774 34 1
"3107" "exp3" 1 1 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 742 17 1
"3107" "exp3" 1 2 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 684 30 1
"3107" "exp3" 1 3 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 499 11 1
"3107" "exp3" 1 4 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 513 37 1
"3107" "exp3" 1 5 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1136 10 1
"3107" "exp3" 1 6 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 602 26 1
"3107" "exp3" 1 7 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1150 0 0
"3107" "exp3" 1 8 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 705 12 1
"3107" "exp3" 1 9 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 870 0 0
"3107" "exp3" 1 10 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 584 0 0
"3107" "exp3" 1 11 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 961 0 0
"3107" "exp3" 1 12 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1223 55 1
"3107" "exp3" 1 13 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 603 18 1
"3107" "exp3" 1 14 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 2247 0 0
"3107" "exp3" 1 15 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 914 19 1
"3107" "exp3" 1 16 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1798 28 1
"3107" "exp3" 1 17 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 726 19 1
"3107" "exp3" 1 18 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 559 24 1
"3107" "exp3" 1 19 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 991 0 0
"3107" "exp3" 1 20 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 2020 0 0
"3107" "exp3" 1 21 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 586 11 1
"3107" "exp3" 1 22 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 541 8 1
"3107" "exp3" 1 23 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 534 0 0
"3107" "exp3" 1 24 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 867 22 1
"3107" "exp3" 1 25 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 580 14 1
"3107" "exp3" 1 26 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 554 28 1
"3107" "exp3" 1 27 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 399 9 1
"3107" "exp3" 1 28 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1075 13 1
"3107" "exp3" 1 29 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 947 0 0
"3107" "exp3" 1 30 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 424 26 1
"3107" "exp3" 1 31 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1063 41 1
"3107" "exp3" 1 32 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 471 15 1
"3107" "exp3" 1 33 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1008 25 1
"3107" "exp3" 1 34 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 501 0 0
"3107" "exp3" 1 35 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 535 31 1
"3107" "exp3" 1 36 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 696 21 1
"3107" "exp3" 1 37 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 548 25 1
"3107" "exp3" 1 38 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 491 49 1
"3107" "exp3" 1 39 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1108 0 0
"3107" "exp3" 1 40 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 529 34 1
"3107" "exp3" 1 41 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 515 0 0
"3107" "exp3" 1 42 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 462 13 1
"3107" "exp3" 1 43 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1544 82 1
"3107" "exp3" 1 44 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1321 0 0
"3107" "exp3" 1 45 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 506 27 1
"3107" "exp3" 1 46 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1103 30 1
"3107" "exp3" 1 47 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 604 20 1
"3107" "exp3" 1 48 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 490 0 0
"3107" "exp3" 1 49 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 800 28 1
"3107" "exp3" 1 50 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 493 32 1
"3107" "exp3" 1 51 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 1759 0 0
"3107" "exp3" 1 52 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1241 29 1
"3107" "exp3" 1 53 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 576 25 1
"3107" "exp3" 1 54 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 559 18 1
"3107" "exp3" 1 55 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1281 93 1
"3107" "exp3" 1 56 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1143 32 1
"3107" "exp3" 1 57 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 700 0 0
"3107" "exp3" 1 58 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1604 0 0
"3107" "exp3" 1 59 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 764 27 1
"3107" "exp3" 1 60 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 680 0 0
"3107" "exp3" 1 61 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 503 16 1
"3107" "exp3" 1 62 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1630 0 0
"3107" "exp3" 1 63 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1019 34 1
"3107" "exp3" 1 64 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1067 0 0
"3107" "exp3" 1 65 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 686 42 1
"3107" "exp3" 1 66 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1080 43 1
"3107" "exp3" 1 67 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1181 43 1
"3107" "exp3" 1 68 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 1095 9 1
"3107" "exp3" 1 69 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 499 0 0
"3107" "exp3" 1 70 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1687 55 1
"3107" "exp3" 1 71 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 602 24 1
"3107" "exp3" 1 72 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 697 17 1
"3107" "exp3" 1 73 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1080 38 1
"3107" "exp3" 1 74 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 891 35 1
"3107" "exp3" 1 75 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 833 0 0
"3107" "exp3" 1 76 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 2942 35 1
"3107" "exp3" 1 77 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2991 0 0
"3107" "exp3" 1 78 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1791 0 0
"3107" "exp3" 1 79 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1764 41 1
"3107" "exp3" 1 80 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1865 0 0
"3107" "exp3" 1 81 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 777 21 1
"3107" "exp3" 1 82 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 614 0 0
"3107" "exp3" 1 83 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 744 29 1
"3107" "exp3" 1 84 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1628 31 1
"3107" "exp3" 1 85 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 774 18 1
"3107" "exp3" 1 86 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 597 20 1
"3107" "exp3" 1 87 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1414 6 1
"3107" "exp3" 1 88 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 756 0 0
"3107" "exp3" 1 89 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 823 21 1
"3107" "exp3" 1 90 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 4296 29 1
"3107" "exp3" 1 91 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 664 37 1
"3107" "exp3" 1 92 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 945 0 0
"3107" "exp3" 1 93 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 597 0 0
"3107" "exp3" 1 94 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 849 0 0
"3107" "exp3" 1 95 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1717 0 0
"3107" "exp3" 1 96 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 535 40 1
"3107" "exp3" 1 97 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 570 44 1
"3107" "exp3" 1 98 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 550 24 1
"3107" "exp3" 1 99 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 531 19 1
"3107" "exp3" 1 100 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 558 22 1
"3107" "exp3" 1 101 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 2078 80 1
"3107" "exp3" 1 102 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1316 0 0
"3107" "exp3" 1 103 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 2562 0 0
"3107" "exp3" 1 104 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 786 20 1
"3107" "exp3" 1 105 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 893 19 1
"3107" "exp3" 1 106 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1184 23 1
"3107" "exp3" 1 107 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 635 0 0
"3107" "exp3" 1 108 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1723 0 0
"3107" "exp3" 1 109 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1520 0 0
"3107" "exp3" 1 110 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1063 32 1
"3107" "exp3" 1 111 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1076 28 1
"3107" "exp3" 1 112 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1384 24 1
"3107" "exp3" 1 113 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 584 16 1
"3107" "exp3" 1 114 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 501 0 0
"3107" "exp3" 1 115 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 564 17 1
"3107" "exp3" 1 116 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 621 15 1
"3107" "exp3" 1 117 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1156 0 0
"3107" "exp3" 1 118 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 2008 31 1
"3107" "exp3" 1 119 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 705 22 1
"3107" "exp3" 1 120 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1250 36 1
"3107" "exp3" 1 121 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 828 33 1
"3107" "exp3" 1 122 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 485 36 1
"3107" "exp3" 1 123 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 487 14 1
"3107" "exp3" 1 124 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 886 0 0
"3107" "exp3" 1 125 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 468 33 1
"3107" "exp3" 1 126 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 2045 0 0
"3107" "exp3" 1 127 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 575 0 0
"3107" "exp3" 1 128 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1158 15 1
"3107" "exp3" 1 129 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 503 10 1
"3107" "exp3" 1 130 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 513 40 1
"3107" "exp3" 1 131 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 679 14 1
"3107" "exp3" 1 132 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 541 23 1
"3107" "exp3" 2 1 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 508 37 1
"3107" "exp3" 2 2 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 270 0 0
"3107" "exp3" 2 3 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 295 4 1
"3107" "exp3" 2 4 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 564 22 1
"3107" "exp3" 2 5 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 696 0 0
"3107" "exp3" 2 6 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 395 0 0
"3107" "exp3" 2 7 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 399 5 1
"3107" "exp3" 2 8 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1117 0 0
"3107" "exp3" 2 9 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 893 20 1
"3107" "exp3" 2 10 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 527 7 1
"3107" "exp3" 2 11 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 422 22 1
"3107" "exp3" 2 12 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1525 48 1
"3107" "exp3" 2 13 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 531 47 1
"3107" "exp3" 2 14 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 575 27 1
"3107" "exp3" 2 15 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1170 12 1
"3107" "exp3" 2 16 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1137 35 1
"3107" "exp3" 2 17 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1626 43 1
"3107" "exp3" 2 18 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1685 19 1
"3107" "exp3" 2 19 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 890 15 1
"3107" "exp3" 2 20 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 985 0 0
"3107" "exp3" 2 21 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1052 21 1
"3107" "exp3" 2 22 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 813 29 1
"3107" "exp3" 2 23 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1178 0 0
"3107" "exp3" 2 24 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1337 0 0
"3107" "exp3" 2 25 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 552 43 1
"3107" "exp3" 2 26 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1621 25 1
"3107" "exp3" 2 27 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 925 28 1
"3107" "exp3" 2 28 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 649 0 0
"3107" "exp3" 2 29 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1624 68 1
"3107" "exp3" 2 30 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 529 0 0
"3107" "exp3" 2 31 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 522 24 1
"3107" "exp3" 2 32 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 508 28 1
"3107" "exp3" 2 33 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1134 0 0
"3107" "exp3" 2 34 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 427 30 1
"3107" "exp3" 2 35 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 104 0 0
"3107" "exp3" 2 36 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1047 17 1
"3107" "exp3" 2 37 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 552 20 1
"3107" "exp3" 2 38 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 499 37 1
"3107" "exp3" 2 39 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 551 21 1
"3107" "exp3" 2 40 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 360 0 0
"3107" "exp3" 2 41 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 474 25 1
"3107" "exp3" 2 42 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 489 0 0
"3107" "exp3" 2 43 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 302 0 0
"3107" "exp3" 2 44 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 896 0 0
"3107" "exp3" 2 45 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 464 6 1
"3107" "exp3" 2 46 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 428 27 1
"3107" "exp3" 2 47 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 350 19 1
"3107" "exp3" 2 48 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 405 8 1
"3107" "exp3" 2 49 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 544 17 1
"3107" "exp3" 2 50 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 791 0 0
"3107" "exp3" 2 51 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 928 0 0
"3107" "exp3" 2 52 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 518 18 1
"3107" "exp3" 2 53 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 856 39 1
"3107" "exp3" 2 54 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1019 0 0
"3107" "exp3" 2 55 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 468 21 1
"3107" "exp3" 2 56 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 583 45 1
"3107" "exp3" 2 57 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 489 11 1
"3107" "exp3" 2 58 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 465 0 0
"3107" "exp3" 2 59 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 532 23 1
"3107" "exp3" 2 60 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 450 0 0
"3107" "exp3" 2 61 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 812 59 1
"3107" "exp3" 2 62 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 484 0 0
"3107" "exp3" 2 63 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 832 32 1
"3107" "exp3" 2 64 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 532 56 1
"3107" "exp3" 2 65 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 576 19 1
"3107" "exp3" 2 66 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 706 0 0
"3107" "exp3" 2 67 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 494 16 1
"3107" "exp3" 2 68 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 551 11 1
"3107" "exp3" 2 69 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1216 0 0
"3107" "exp3" 2 70 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 504 32 1
"3107" "exp3" 2 71 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 816 0 0
"3107" "exp3" 2 72 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 540 42 1
"3107" "exp3" 2 73 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 951 18 1
"3107" "exp3" 2 74 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 413 0 0
"3107" "exp3" 2 75 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 449 14 1
"3107" "exp3" 2 76 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1086 0 0
"3107" "exp3" 2 77 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 458 0 0
"3107" "exp3" 2 78 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 786 0 0
"3107" "exp3" 2 79 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1261 69 1
"3107" "exp3" 2 80 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 452 17 1
"3107" "exp3" 2 81 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 475 18 1
"3107" "exp3" 2 82 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 855 14 1
"3107" "exp3" 2 83 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 527 0 0
"3107" "exp3" 2 84 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1434 37 1
"3107" "exp3" 2 85 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 528 8 1
"3107" "exp3" 2 86 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 780 0 0
"3107" "exp3" 2 87 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 769 0 0
"3107" "exp3" 2 88 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 770 36 1
"3107" "exp3" 2 89 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 489 0 0
"3107" "exp3" 2 90 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 576 26 1
"3107" "exp3" 2 91 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 453 21 1
"3107" "exp3" 2 92 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 561 0 0
"3107" "exp3" 2 93 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 681 0 0
"3107" "exp3" 2 94 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1047 0 0
"3107" "exp3" 2 95 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 509 15 1
"3107" "exp3" 2 96 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 835 24 1
"3107" "exp3" 2 97 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 724 0 0
"3107" "exp3" 2 98 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 387 2 1
"3107" "exp3" 2 99 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 841 0 0
"3107" "exp3" 2 100 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 742 28 1
"3107" "exp3" 2 101 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 689 39 1
"3107" "exp3" 2 102 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 436 35 1
"3107" "exp3" 2 103 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1378 67 1
"3107" "exp3" 2 104 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 795 26 1
"3107" "exp3" 2 105 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 582 41 1
"3107" "exp3" 2 106 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1466 24 1
"3107" "exp3" 2 107 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 692 0 0
"3107" "exp3" 2 108 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 547 25 1
"3107" "exp3" 2 109 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1448 0 0
"3107" "exp3" 2 110 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1593 13 1
"3107" "exp3" 2 111 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1896 15 1
"3107" "exp3" 2 112 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 921 55 1
"3107" "exp3" 2 113 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 866 33 1
"3107" "exp3" 2 114 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1050 34 1
"3107" "exp3" 2 115 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1079 26 1
"3107" "exp3" 2 116 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1002 14 1
"3107" "exp3" 2 117 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 852 0 0
"3107" "exp3" 2 118 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 970 0 0
"3107" "exp3" 2 119 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 599 0 0
"3107" "exp3" 2 120 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1005 0 0
"3107" "exp3" 2 121 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1878 28 1
"3107" "exp3" 2 122 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 818 0 0
"3107" "exp3" 2 123 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 414 24 1
"3107" "exp3" 2 124 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 432 40 1
"3107" "exp3" 2 125 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 500 12 1
"3107" "exp3" 2 126 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 588 20 1
"3107" "exp3" 2 127 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 498 20 1
"3107" "exp3" 2 128 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 597 36 1
"3107" "exp3" 2 129 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 700 0 0
"3107" "exp3" 2 130 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 615 0 0
"3107" "exp3" 2 131 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 517 31 1
"3107" "exp3" 2 132 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 1833 0 0
"3107" "exp3" 1 1 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 912 36 1
"3107" "exp3" 1 2 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1180 29 1
"3107" "exp3" 1 3 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 612 0 0
"3107" "exp3" 1 4 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1079 0 0
"3107" "exp3" 1 5 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 840 13 1
"3107" "exp3" 1 6 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1363 27 1
"3107" "exp3" 1 7 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1335 0 0
"3107" "exp3" 1 8 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 1843 75 1
"3107" "exp3" 1 9 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 624 30 1
"3107" "exp3" 1 10 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1527 0 0
"3107" "exp3" 1 11 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1056 24 1
"3107" "exp3" 1 12 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 839 22 1
"3107" "exp3" 1 13 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 1118 0 0
"3107" "exp3" 1 14 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 2068 0 0
"3107" "exp3" 1 15 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 2200 0 0
"3107" "exp3" 1 16 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 1205 0 0
"3107" "exp3" 1 17 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1036 0 0
"3107" "exp3" 1 18 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1015 41 1
"3107" "exp3" 1 19 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1283 5 1
"3107" "exp3" 1 20 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1615 18 1
"3107" "exp3" 1 21 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 1150 0 0
"3107" "exp3" 1 22 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 749 0 0
"3107" "exp3" 1 23 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1525 19 1
"3107" "exp3" 1 24 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1042 0 0
"3107" "exp3" 1 25 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 880 1 1
"3107" "exp3" 1 26 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 1928 5 1
"3107" "exp3" 1 27 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1224 0 0
"3107" "exp3" 1 28 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1081 0 0
"3107" "exp3" 1 29 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1022 0 0
"3107" "exp3" 1 30 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 747 3 1
"3107" "exp3" 1 31 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1686 0 0
"3107" "exp3" 1 32 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1467 94 1
"3107" "exp3" 1 33 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1045 0 0
"3107" "exp3" 1 34 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2253 0 0
"3107" "exp3" 1 35 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1141 0 0
"3107" "exp3" 1 36 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1215 0 0
"3107" "exp3" 1 37 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1108 0 0
"3107" "exp3" 1 38 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 775 0 0
"3107" "exp3" 1 39 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1162 0 0
"3107" "exp3" 1 40 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1333 19 1
"3107" "exp3" 1 41 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 573 8 1
"3107" "exp3" 1 42 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1155 16 1
"3107" "exp3" 1 43 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 2440 0 0
"3107" "exp3" 1 44 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 2338 7 1
"3107" "exp3" 1 45 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1294 23 1
"3107" "exp3" 1 46 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1775 0 0
"3107" "exp3" 1 47 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1555 24 1
"3107" "exp3" 1 48 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1132 33 1
"3107" "exp3" 1 49 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 1882 68 1
"3107" "exp3" 1 50 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 1331 0 0
"3107" "exp3" 1 51 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1999 22 1
"3107" "exp3" 1 52 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 699 21 1
"3107" "exp3" 1 53 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1383 0 0
"3107" "exp3" 1 54 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 811 68 1
"3107" "exp3" 1 55 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 1579 58 1
"3107" "exp3" 1 56 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 989 9 1
"3107" "exp3" 1 57 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 639 21 1
"3107" "exp3" 1 58 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 2318 0 0
"3107" "exp3" 1 59 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 990 0 0
"3107" "exp3" 1 60 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 1131 0 0
"3107" "exp3" 1 61 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 759 0 0
"3107" "exp3" 1 62 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 988 0 0
"3107" "exp3" 1 63 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 657 0 0
"3107" "exp3" 1 64 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 774 0 0
"3107" "exp3" 1 65 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 1067 63 1
"3107" "exp3" 1 66 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 1008 0 0
"3107" "exp3" 1 67 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 991 57 1
"3107" "exp3" 1 68 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 775 18 1
"3107" "exp3" 1 69 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1066 0 0
"3107" "exp3" 1 70 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 949 0 0
"3107" "exp3" 1 71 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 964 0 0
"3107" "exp3" 1 72 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 919 80 1
"3107" "exp3" 1 73 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 1485 0 0
"3107" "exp3" 1 74 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1926 0 0
"3107" "exp3" 1 75 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 702 0 0
"3107" "exp3" 1 76 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1075 0 0
"3107" "exp3" 1 77 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1452 54 1
"3107" "exp3" 1 78 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 932 0 0
"3107" "exp3" 1 79 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1353 21 1
"3107" "exp3" 1 80 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 866 0 0
"3107" "exp3" 1 81 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 1138 55 1
"3107" "exp3" 1 82 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 2751 0 0
"3107" "exp3" 1 83 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 3150 13 1
"3107" "exp3" 1 84 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2629 30 1
"3107" "exp3" 1 85 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 880 31 1
"3107" "exp3" 1 86 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1272 20 1
"3107" "exp3" 1 87 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 938 0 0
"3107" "exp3" 1 88 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 2021 67 1
"3107" "exp3" 1 89 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 3083 12 1
"3107" "exp3" 1 90 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 1760 0 0
"3107" "exp3" 1 91 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1628 15 1
"3107" "exp3" 1 92 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1841 0 0
"3107" "exp3" 1 93 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 827 17 1
"3107" "exp3" 1 94 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 2713 0 0
"3107" "exp3" 1 95 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 2647 0 0
"3107" "exp3" 1 96 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1329 0 0
"3107" "exp3" 1 97 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 844 0 0
"3107" "exp3" 1 98 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1123 0 0
"3107" "exp3" 1 99 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1295 0 0
"3107" "exp3" 1 100 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 533 13 1
"3107" "exp3" 1 101 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 609 0 0
"3107" "exp3" 1 102 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 622 45 1
"3107" "exp3" 1 103 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 474 37 1
"3107" "exp3" 1 104 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 459 61 1
"3107" "exp3" 1 105 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 937 26 1
"3107" "exp3" 1 106 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 465 17 1
"3107" "exp3" 1 107 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 801 0 0
"3107" "exp3" 1 108 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 627 14 1
"3107" "exp3" 1 109 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 680 30 1
"3107" "exp3" 1 110 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 470 24 1
"3107" "exp3" 1 111 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 814 30 1
"3107" "exp3" 1 112 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 505 75 1
"3107" "exp3" 1 113 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1073 29 1
"3107" "exp3" 1 114 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 813 34 1
"3107" "exp3" 1 115 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 586 0 0
"3107" "exp3" 1 116 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 608 31 1
"3107" "exp3" 1 117 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 620 0 0
"3107" "exp3" 1 118 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 840 20 1
"3107" "exp3" 1 119 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 542 9 1
"3107" "exp3" 1 120 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 471 56 1
"3107" "exp3" 1 121 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 794 41 1
"3107" "exp3" 1 122 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 665 12 1
"3107" "exp3" 1 123 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 654 20 1
"3107" "exp3" 1 124 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 867 44 1
"3107" "exp3" 1 125 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1003 0 0
"3107" "exp3" 1 126 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 775 39 1
"3107" "exp3" 1 127 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 701 0 0
"3107" "exp3" 1 128 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 676 0 0
"3107" "exp3" 1 129 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1062 31 1
"3107" "exp3" 1 130 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 826 0 0
"3107" "exp3" 1 131 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 808 0 0
"3107" "exp3" 1 132 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 771 0 0
"3107" "exp3" 2 1 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 661 0 0
"3107" "exp3" 2 2 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 605 22 1
"3107" "exp3" 2 3 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 668 39 1
"3107" "exp3" 2 4 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 624 0 0
"3107" "exp3" 2 5 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1367 0 0
"3107" "exp3" 2 6 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 626 0 0
"3107" "exp3" 2 7 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 649 41 1
"3107" "exp3" 2 8 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 654 21 1
"3107" "exp3" 2 9 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 600 37 1
"3107" "exp3" 2 10 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 735 40 1
"3107" "exp3" 2 11 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 669 29 1
"3107" "exp3" 2 12 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 857 4 1
"3107" "exp3" 2 13 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 508 13 1
"3107" "exp3" 2 14 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 584 38 1
"3107" "exp3" 2 15 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 609 33 1
"3107" "exp3" 2 16 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 621 28 1
"3107" "exp3" 2 17 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 807 71 1
"3107" "exp3" 2 18 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 695 15 1
"3107" "exp3" 2 19 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 579 0 0
"3107" "exp3" 2 20 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 540 0 0
"3107" "exp3" 2 21 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1518 36 1
"3107" "exp3" 2 22 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 493 25 1
"3107" "exp3" 2 23 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 546 0 0
"3107" "exp3" 2 24 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 704 44 1
"3107" "exp3" 2 25 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 705 47 1
"3107" "exp3" 2 26 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 566 1 1
"3107" "exp3" 2 27 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 600 40 1
"3107" "exp3" 2 28 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 531 17 1
"3107" "exp3" 2 29 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 541 0 0
"3107" "exp3" 2 30 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 494 30 1
"3107" "exp3" 2 31 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 477 0 0
"3107" "exp3" 2 32 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 409 0 0
"3107" "exp3" 2 33 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 374 0 0
"3107" "exp3" 2 34 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 525 29 1
"3107" "exp3" 2 35 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 736 28 1
"3107" "exp3" 2 36 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 536 84 1
"3107" "exp3" 2 37 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 522 5 1
"3107" "exp3" 2 38 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 730 24 1
"3107" "exp3" 2 39 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 603 14 1
"3107" "exp3" 2 40 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 532 18 1
"3107" "exp3" 2 41 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 788 9 1
"3107" "exp3" 2 42 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 856 0 0
"3107" "exp3" 2 43 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 591 23 1
"3107" "exp3" 2 44 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 659 39 1
"3107" "exp3" 2 45 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 959 31 1
"3107" "exp3" 2 46 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 626 9 1
"3107" "exp3" 2 47 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 514 17 1
"3107" "exp3" 2 48 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1165 0 0
"3107" "exp3" 2 49 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 547 0 0
"3107" "exp3" 2 50 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 628 0 0
"3107" "exp3" 2 51 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 863 23 1
"3107" "exp3" 2 52 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 749 0 0
"3107" "exp3" 2 53 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 589 30 1
"3107" "exp3" 2 54 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1102 0 0
"3107" "exp3" 2 55 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 626 0 0
"3107" "exp3" 2 56 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 731 54 1
"3107" "exp3" 2 57 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 511 85 1
"3107" "exp3" 2 58 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 529 0 0
"3107" "exp3" 2 59 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 486 0 0
"3107" "exp3" 2 60 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 529 19 1
"3107" "exp3" 2 61 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 514 26 1
"3107" "exp3" 2 62 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 555 20 1
"3107" "exp3" 2 63 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 519 22 1
"3107" "exp3" 2 64 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 623 21 1
"3107" "exp3" 2 65 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 627 13 1
"3107" "exp3" 2 66 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 581 0 0
"3107" "exp3" 2 67 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 626 0 0
"3107" "exp3" 2 68 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 525 0 0
"3107" "exp3" 2 69 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 443 0 0
"3107" "exp3" 2 70 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 402 6 1
"3107" "exp3" 2 71 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 612 13 1
"3107" "exp3" 2 72 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 601 27 1
"3107" "exp3" 2 73 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 441 18 1
"3107" "exp3" 2 74 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 552 35 1
"3107" "exp3" 2 75 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 481 83 1
"3107" "exp3" 2 76 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 493 10 1
"3107" "exp3" 2 77 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 623 25 1
"3107" "exp3" 2 78 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 408 0 0
"3107" "exp3" 2 79 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 516 3 1
"3107" "exp3" 2 80 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 636 0 0
"3107" "exp3" 2 81 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 464 24 1
"3107" "exp3" 2 82 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 608 0 0
"3107" "exp3" 2 83 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 561 80 1
"3107" "exp3" 2 84 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 689 19 1
"3107" "exp3" 2 85 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 605 30 1
"3107" "exp3" 2 86 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 459 0 0
"3107" "exp3" 2 87 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 753 41 1
"3107" "exp3" 2 88 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 553 45 1
"3107" "exp3" 2 89 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 573 37 1
"3107" "exp3" 2 90 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 661 0 0
"3107" "exp3" 2 91 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 483 42 1
"3107" "exp3" 2 92 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 618 0 0
"3107" "exp3" 2 93 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 491 18 1
"3107" "exp3" 2 94 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 509 17 1
"3107" "exp3" 2 95 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 477 0 0
"3107" "exp3" 2 96 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 372 0 0
"3107" "exp3" 2 97 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 582 5 1
"3107" "exp3" 2 98 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 561 0 0
"3107" "exp3" 2 99 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 384 24 1
"3107" "exp3" 2 100 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 396 65 1
"3107" "exp3" 2 101 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 655 25 1
"3107" "exp3" 2 102 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 672 25 1
"3107" "exp3" 2 103 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 647 21 1
"3107" "exp3" 2 104 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 391 7 1
"3107" "exp3" 2 105 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 414 81 1
"3107" "exp3" 2 106 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 503 10 1
"3107" "exp3" 2 107 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 598 15 1
"3107" "exp3" 2 108 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1069 0 0
"3107" "exp3" 2 109 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 546 21 1
"3107" "exp3" 2 110 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 689 0 0
"3107" "exp3" 2 111 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 519 35 1
"3107" "exp3" 2 112 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 604 6 1
"3107" "exp3" 2 113 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 542 44 1
"3107" "exp3" 2 114 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 698 36 1
"3107" "exp3" 2 115 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 510 12 1
"3107" "exp3" 2 116 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 556 0 0
"3107" "exp3" 2 117 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 719 20 1
"3107" "exp3" 2 118 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 392 28 1
"3107" "exp3" 2 119 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 625 27 1
"3107" "exp3" 2 120 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 515 0 0
"3107" "exp3" 2 121 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 429 0 0
"3107" "exp3" 2 122 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 378 0 0
"3107" "exp3" 2 123 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 576 2 1
"3107" "exp3" 2 124 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 616 37 1
"3107" "exp3" 2 125 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 598 11 1
"3107" "exp3" 2 126 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 626 16 1
"3107" "exp3" 2 127 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 628 43 1
"3107" "exp3" 2 128 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 588 29 1
"3107" "exp3" 2 129 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 470 0 0
"3107" "exp3" 2 130 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 338 0 0
"3107" "exp3" 2 131 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 778 0 0
"3107" "exp3" 2 132 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 745 34 1
"3107" "exp3" 1 1 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 503 0 0
"3107" "exp3" 1 2 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 391 0 0
"3107" "exp3" 1 3 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 379 0 0
"3107" "exp3" 1 4 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 352 0 0
"3107" "exp3" 1 5 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 368 0 0
"3107" "exp3" 1 6 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 352 29 1
"3107" "exp3" 1 7 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 442 0 0
"3107" "exp3" 1 8 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 290 0 0
"3107" "exp3" 1 9 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 249 34 1
"3107" "exp3" 1 10 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 345 0 0
"3107" "exp3" 1 11 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 383 15 1
"3107" "exp3" 1 12 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 257 71 1
"3107" "exp3" 1 13 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 264 0 0
"3107" "exp3" 1 14 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 344 0 0
"3107" "exp3" 1 15 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 485 0 0
"3107" "exp3" 1 16 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 376 64 1
"3107" "exp3" 1 17 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 475 0 0
"3107" "exp3" 1 18 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 370 0 0
"3107" "exp3" 1 19 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 426 0 0
"3107" "exp3" 1 20 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 593 0 0
"3107" "exp3" 1 21 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 437 0 0
"3107" "exp3" 1 22 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 447 90 1
"3107" "exp3" 1 23 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 355 67 1
"3107" "exp3" 1 24 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 538 0 0
"3107" "exp3" 1 25 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 344 0 0
"3107" "exp3" 1 26 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 336 0 0
"3107" "exp3" 1 27 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 499 0 0
"3107" "exp3" 1 28 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 554 0 0
"3107" "exp3" 1 29 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 564 0 0
"3107" "exp3" 1 30 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 517 33 1
"3107" "exp3" 1 31 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 288 41 1
"3107" "exp3" 1 32 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 493 73 1
"3107" "exp3" 1 33 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 442 0 0
"3107" "exp3" 1 34 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 323 0 0
"3107" "exp3" 1 35 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 423 77 1
"3107" "exp3" 1 36 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 750 62 1
"3107" "exp3" 1 37 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 329 0 0
"3107" "exp3" 1 38 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 464 70 1
"3107" "exp3" 1 39 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 372 76 1
"3107" "exp3" 1 40 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 392 0 0
"3107" "exp3" 1 41 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 383 0 0
"3107" "exp3" 1 42 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1428 47 1
"3107" "exp3" 1 43 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 789 30 1
"3107" "exp3" 1 44 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 649 0 0
"3107" "exp3" 1 45 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 442 0 0
"3107" "exp3" 1 46 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 589 45 1
"3107" "exp3" 1 47 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 521 0 0
"3107" "exp3" 1 48 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1651 0 0
"3107" "exp3" 1 49 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 623 0 0
"3107" "exp3" 1 50 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 468 0 0
"3107" "exp3" 1 51 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 454 68 1
"3107" "exp3" 1 52 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 398 0 0
"3107" "exp3" 1 53 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 234 0 0
"3107" "exp3" 1 54 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 288 22 1
"3107" "exp3" 1 55 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 254 68 1
"3107" "exp3" 1 56 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 307 0 0
"3107" "exp3" 1 57 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 448 38 1
"3107" "exp3" 1 58 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 509 0 0
"3107" "exp3" 1 59 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 427 37 1
"3107" "exp3" 1 60 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 650 25 1
"3107" "exp3" 1 61 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 456 27 1
"3107" "exp3" 1 62 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 376 61 1
"3107" "exp3" 1 63 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 740 0 0
"3107" "exp3" 1 64 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 322 20 1
"3107" "exp3" 1 65 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 644 0 0
"3107" "exp3" 1 66 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 396 23 1
"3107" "exp3" 1 67 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 297 0 0
"3107" "exp3" 1 68 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 467 0 0
"3107" "exp3" 1 69 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 282 25 1
"3107" "exp3" 1 70 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 306 0 0
"3107" "exp3" 1 71 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 230 42 1
"3107" "exp3" 1 72 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 275 11 1
"3107" "exp3" 1 73 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 252 17 1
"3107" "exp3" 1 74 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 276 0 0
"3107" "exp3" 1 75 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 255 0 0
"3107" "exp3" 1 76 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 450 0 0
"3107" "exp3" 1 77 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 248 0 0
"3107" "exp3" 1 78 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 197 0 0
"3107" "exp3" 1 79 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 625 0 0
"3107" "exp3" 1 80 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 341 27 1
"3107" "exp3" 1 81 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 620 0 0
"3107" "exp3" 1 82 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 423 0 0
"3107" "exp3" 1 83 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 621 0 0
"3107" "exp3" 1 84 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 552 0 0
"3107" "exp3" 1 85 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 385 0 0
"3107" "exp3" 1 86 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 607 0 0
"3107" "exp3" 1 87 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 266 67 1
"3107" "exp3" 1 88 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 304 40 1
"3107" "exp3" 1 89 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 328 0 0
"3107" "exp3" 1 90 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 274 7 1
"3107" "exp3" 1 91 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 333 0 0
"3107" "exp3" 1 92 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 458 3 1
"3107" "exp3" 1 93 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 321 0 0
"3107" "exp3" 1 94 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 369 37 1
"3107" "exp3" 1 95 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 388 0 0
"3107" "exp3" 1 96 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 251 0 0
"3107" "exp3" 1 97 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 425 8 1
"3107" "exp3" 1 98 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 357 19 1
"3107" "exp3" 1 99 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 371 21 1
"3107" "exp3" 1 100 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 428 26 1
"3107" "exp3" 1 101 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 251 23 1
"3107" "exp3" 1 102 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 603 82 1
"3107" "exp3" 1 103 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 330 0 0
"3107" "exp3" 1 104 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 421 0 0
"3107" "exp3" 1 105 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 286 0 0
"3107" "exp3" 1 106 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 468 83 1
"3107" "exp3" 1 107 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 578 28 1
"3107" "exp3" 1 108 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 599 40 1
"3107" "exp3" 1 109 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 553 0 0
"3107" "exp3" 1 110 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 819 0 0
"3107" "exp3" 1 111 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 502 0 0
"3107" "exp3" 1 112 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 432 0 0
"3107" "exp3" 1 113 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 548 0 0
"3107" "exp3" 1 114 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1041 0 0
"3107" "exp3" 1 115 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 487 0 0
"3107" "exp3" 1 116 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 925 0 0
"3107" "exp3" 1 117 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 584 0 0
"3107" "exp3" 1 118 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 672 0 0
"3107" "exp3" 1 119 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 438 31 1
"3107" "exp3" 1 120 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 596 0 0
"3107" "exp3" 1 121 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 412 0 0
"3107" "exp3" 1 122 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 366 16 1
"3107" "exp3" 1 123 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 917 34 1
"3107" "exp3" 1 124 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 758 45 1
"3107" "exp3" 1 125 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1358 17 1
"3107" "exp3" 1 126 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 669 0 0
"3107" "exp3" 1 127 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 429 0 0
"3107" "exp3" 1 128 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 418 0 0
"3107" "exp3" 1 129 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 350 25 1
"3107" "exp3" 1 130 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 415 0 0
"3107" "exp3" 1 131 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 553 0 0
"3107" "exp3" 1 132 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 765 0 0
"3107" "exp3" 2 1 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 189 63 1
"3107" "exp3" 2 2 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 451 0 0
"3107" "exp3" 2 3 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 418 0 0
"3107" "exp3" 2 4 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 257 12 1
"3107" "exp3" 2 5 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 257 0 0
"3107" "exp3" 2 6 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 395 0 0
"3107" "exp3" 2 7 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 506 85 1
"3107" "exp3" 2 8 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 372 0 0
"3107" "exp3" 2 9 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 412 66 1
"3107" "exp3" 2 10 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 294 0 0
"3107" "exp3" 2 11 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 424 0 0
"3107" "exp3" 2 12 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 297 0 0
"3107" "exp3" 2 13 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 227 20 1
"3107" "exp3" 2 14 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 238 0 0
"3107" "exp3" 2 15 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 250 0 0
"3107" "exp3" 2 16 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 39 0 0
"3107" "exp3" 2 17 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 508 0 0
"3107" "exp3" 2 18 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 237 0 0
"3107" "exp3" 2 19 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 262 11 1
"3107" "exp3" 2 20 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 434 17 1
"3107" "exp3" 2 21 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 398 0 0
"3107" "exp3" 2 22 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 512 79 1
"3107" "exp3" 2 23 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 268 0 0
"3107" "exp3" 2 24 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 335 0 0
"3107" "exp3" 2 25 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 488 79 1
"3107" "exp3" 2 26 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 505 0 0
"3107" "exp3" 2 27 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 317 0 0
"3107" "exp3" 2 28 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 424 0 0
"3107" "exp3" 2 29 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 313 14 1
"3107" "exp3" 2 30 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 459 0 0
"3107" "exp3" 2 31 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 453 0 0
"3107" "exp3" 2 32 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 524 0 0
"3107" "exp3" 2 33 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 2990 0 0
"3107" "exp3" 2 34 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 520 0 0
"3107" "exp3" 2 35 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 457 0 0
"3107" "exp3" 2 36 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 499 73 1
"3107" "exp3" 2 37 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 396 65 1
"3107" "exp3" 2 38 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 536 33 1
"3107" "exp3" 2 39 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 559 36 1
"3107" "exp3" 2 40 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 440 13 1
"3107" "exp3" 2 41 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 616 18 1
"3107" "exp3" 2 42 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 524 19 1
"3107" "exp3" 2 43 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 469 49 1
"3107" "exp3" 2 44 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 618 30 1
"3107" "exp3" 2 45 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 741 0 0
"3107" "exp3" 2 46 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 804 7 1
"3107" "exp3" 2 47 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 658 79 1
"3107" "exp3" 2 48 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 472 0 0
"3107" "exp3" 2 49 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 621 44 1
"3107" "exp3" 2 50 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 591 92 1
"3107" "exp3" 2 51 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 643 0 0
"3107" "exp3" 2 52 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 640 69 1
"3107" "exp3" 2 53 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 496 0 0
"3107" "exp3" 2 54 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 564 0 0
"3107" "exp3" 2 55 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 480 47 1
"3107" "exp3" 2 56 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 946 65 1
"3107" "exp3" 2 57 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 478 0 0
"3107" "exp3" 2 58 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 491 0 0
"3107" "exp3" 2 59 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 376 81 1
"3107" "exp3" 2 60 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 404 90 1
"3107" "exp3" 2 61 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 493 0 0
"3107" "exp3" 2 62 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 627 48 1
"3107" "exp3" 2 63 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 271 30 1
"3107" "exp3" 2 64 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 225 0 0
"3107" "exp3" 2 65 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 482 0 0
"3107" "exp3" 2 66 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 661 41 1
"3107" "exp3" 2 67 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 672 0 0
"3107" "exp3" 2 68 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 432 0 0
"3107" "exp3" 2 69 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 256 24 1
"3107" "exp3" 2 70 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 609 37 1
"3107" "exp3" 2 71 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 389 0 0
"3107" "exp3" 2 72 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 364 0 0
"3107" "exp3" 2 73 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 684 34 1
"3107" "exp3" 2 74 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 740 16 1
"3107" "exp3" 2 75 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 536 33 1
"3107" "exp3" 2 76 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 781 25 1
"3107" "exp3" 2 77 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 540 24 1
"3107" "exp3" 2 78 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 458 16 1
"3107" "exp3" 2 79 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 487 26 1
"3107" "exp3" 2 80 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 472 45 1
"3107" "exp3" 2 81 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 559 16 1
"3107" "exp3" 2 82 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 786 0 0
"3107" "exp3" 2 83 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 742 15 1
"3107" "exp3" 2 84 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 618 0 0
"3107" "exp3" 2 85 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 558 0 0
"3107" "exp3" 2 86 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 755 18 1
"3107" "exp3" 2 87 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 694 18 1
"3107" "exp3" 2 88 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 923 0 0
"3107" "exp3" 2 89 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1396 7 1
"3107" "exp3" 2 90 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 594 0 0
"3107" "exp3" 2 91 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1544 0 0
"3107" "exp3" 2 92 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 686 22 1
"3107" "exp3" 2 93 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 854 35 1
"3107" "exp3" 2 94 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 854 0 0
"3107" "exp3" 2 95 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 831 60 1
"3107" "exp3" 2 96 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 570 86 1
"3107" "exp3" 2 97 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 668 81 1
"3107" "exp3" 2 98 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 545 36 1
"3107" "exp3" 2 99 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 2088 0 0
"3107" "exp3" 2 100 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 628 0 0
"3107" "exp3" 2 101 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 607 72 1
"3107" "exp3" 2 102 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 413 0 0
"3107" "exp3" 2 103 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 244 0 0
"3107" "exp3" 2 104 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 460 32 1
"3107" "exp3" 2 105 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 789 20 1
"3107" "exp3" 2 106 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 867 0 0
"3107" "exp3" 2 107 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 609 27 1
"3107" "exp3" 2 108 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 501 28 1
"3107" "exp3" 2 109 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 798 0 0
"3107" "exp3" 2 110 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 415 0 0
"3107" "exp3" 2 111 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 449 0 0
"3107" "exp3" 2 112 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 544 0 0
"3107" "exp3" 2 113 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 549 0 0
"3107" "exp3" 2 114 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 327 0 0
"3107" "exp3" 2 115 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 540 25 1
"3107" "exp3" 2 116 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 576 17 1
"3107" "exp3" 2 117 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 662 0 0
"3107" "exp3" 2 118 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 547 15 1
"3107" "exp3" 2 119 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 934 0 0
"3107" "exp3" 2 120 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 824 29 1
"3107" "exp3" 2 121 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 592 0 0
"3107" "exp3" 2 122 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 806 0 0
"3107" "exp3" 2 123 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 594 32 1
"3107" "exp3" 2 124 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 402 23 1
"3107" "exp3" 2 125 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 572 20 1
"3107" "exp3" 2 126 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 710 17 1
"3107" "exp3" 2 127 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 565 29 1
"3107" "exp3" 2 128 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 403 0 0
"3107" "exp3" 2 129 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 405 0 0
"3107" "exp3" 2 130 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 558 0 0
"3107" "exp3" 2 131 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 608 39 1
"3107" "exp3" 2 132 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 815 0 0
"3107" "exp3" 1 1 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 483 34 1
"3107" "exp3" 1 2 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 440 26 1
"3107" "exp3" 1 3 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 375 0 0
"3107" "exp3" 1 4 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 366 59 1
"3107" "exp3" 1 5 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 344 18 1
"3107" "exp3" 1 6 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 520 11 1
"3107" "exp3" 1 7 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 440 12 1
"3107" "exp3" 1 8 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 329 17 1
"3107" "exp3" 1 9 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 464 42 1
"3107" "exp3" 1 10 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 491 0 0
"3107" "exp3" 1 11 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 417 6 1
"3107" "exp3" 1 12 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 427 33 1
"3107" "exp3" 1 13 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 501 0 0
"3107" "exp3" 1 14 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 482 5 1
"3107" "exp3" 1 15 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 426 32 1
"3107" "exp3" 1 16 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 367 38 1
"3107" "exp3" 1 17 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 402 20 1
"3107" "exp3" 1 18 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 366 0 0
"3107" "exp3" 1 19 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 270 0 0
"3107" "exp3" 1 20 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 564 44 1
"3107" "exp3" 1 21 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 446 24 1
"3107" "exp3" 1 22 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 429 2 1
"3107" "exp3" 1 23 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 334 0 0
"3107" "exp3" 1 24 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 652 23 1
"3107" "exp3" 1 25 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 450 0 0
"3107" "exp3" 1 26 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 369 0 0
"3107" "exp3" 1 27 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 572 0 0
"3107" "exp3" 1 28 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 518 6 1
"3107" "exp3" 1 29 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 354 1 1
"3107" "exp3" 1 30 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 318 0 0
"3107" "exp3" 1 31 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 347 37 1
"3107" "exp3" 1 32 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 416 0 0
"3107" "exp3" 1 33 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 502 9 1
"3107" "exp3" 1 34 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 381 68 1
"3107" "exp3" 1 35 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 418 31 1
"3107" "exp3" 1 36 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 356 0 0
"3107" "exp3" 1 37 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 362 55 1
"3107" "exp3" 1 38 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 340 0 0
"3107" "exp3" 1 39 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 273 0 0
"3107" "exp3" 1 40 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 374 27 1
"3107" "exp3" 1 41 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 547 22 1
"3107" "exp3" 1 42 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 386 4 1
"3107" "exp3" 1 43 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 458 0 0
"3107" "exp3" 1 44 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 492 5 1
"3107" "exp3" 1 45 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 424 0 0
"3107" "exp3" 1 46 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 433 35 1
"3107" "exp3" 1 47 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 427 32 1
"3107" "exp3" 1 48 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 442 37 1
"3107" "exp3" 1 49 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 527 0 0
"3107" "exp3" 1 50 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 505 22 1
"3107" "exp3" 1 51 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 489 14 1
"3107" "exp3" 1 52 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 544 19 1
"3107" "exp3" 1 53 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 389 14 1
"3107" "exp3" 1 54 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 892 0 0
"3107" "exp3" 1 55 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 488 20 1
"3107" "exp3" 1 56 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 400 0 0
"3107" "exp3" 1 57 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 471 28 1
"3107" "exp3" 1 58 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 594 26 1
"3107" "exp3" 1 59 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 488 8 1
"3107" "exp3" 1 60 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 472 10 1
"3107" "exp3" 1 61 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 440 15 1
"3107" "exp3" 1 62 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 984 19 1
"3107" "exp3" 1 63 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 356 0 0
"3107" "exp3" 1 64 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 372 36 1
"3107" "exp3" 1 65 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 459 0 0
"3107" "exp3" 1 66 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 498 0 0
"3107" "exp3" 1 67 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 379 20 1
"3107" "exp3" 1 68 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 424 30 1
"3107" "exp3" 1 69 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 507 23 1
"3107" "exp3" 1 70 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 373 0 0
"3107" "exp3" 1 71 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 519 0 0
"3107" "exp3" 1 72 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 496 19 1
"3107" "exp3" 1 73 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 436 16 1
"3107" "exp3" 1 74 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 548 0 0
"3107" "exp3" 1 75 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 400 31 1
"3107" "exp3" 1 76 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 467 0 0
"3107" "exp3" 1 77 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 429 27 1
"3107" "exp3" 1 78 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 516 22 1
"3107" "exp3" 1 79 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 473 0 0
"3107" "exp3" 1 80 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 467 16 1
"3107" "exp3" 1 81 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 321 26 1
"3107" "exp3" 1 82 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 490 67 1
"3107" "exp3" 1 83 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 276 53 1
"3107" "exp3" 1 84 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 264 35 1
"3107" "exp3" 1 85 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 410 18 1
"3107" "exp3" 1 86 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 337 14 1
"3107" "exp3" 1 87 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 399 28 1
"3107" "exp3" 1 88 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 245 24 1
"3107" "exp3" 1 89 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 478 20 1
"3107" "exp3" 1 90 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 463 30 1
"3107" "exp3" 1 91 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 259 12 1
"3107" "exp3" 1 92 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 508 44 1
"3107" "exp3" 1 93 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 453 22 1
"3107" "exp3" 1 94 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 828 29 1
"3107" "exp3" 1 95 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 399 17 1
"3107" "exp3" 1 96 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 440 0 0
"3107" "exp3" 1 97 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 475 0 0
"3107" "exp3" 1 98 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 304 11 1
"3107" "exp3" 1 99 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 452 24 1
"3107" "exp3" 1 100 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 369 0 0
"3107" "exp3" 1 101 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 469 7 1
"3107" "exp3" 1 102 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 381 31 1
"3107" "exp3" 1 103 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 443 39 1
"3107" "exp3" 1 104 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 415 10 1
"3107" "exp3" 1 105 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 379 24 1
"3107" "exp3" 1 106 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 330 7 1
"3107" "exp3" 1 107 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 292 15 1
"3107" "exp3" 1 108 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 315 34 1
"3107" "exp3" 1 109 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 566 16 1
"3107" "exp3" 1 110 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 253 0 0
"3107" "exp3" 1 111 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 327 0 0
"3107" "exp3" 1 112 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 215 13 1
"3107" "exp3" 1 113 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 418 33 1
"3107" "exp3" 1 114 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 350 0 0
"3107" "exp3" 1 115 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 844 0 0
"3107" "exp3" 1 116 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 292 0 0
"3107" "exp3" 1 117 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 435 29 1
"3107" "exp3" 1 118 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 912 36 1
"3107" "exp3" 1 119 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 362 0 0
"3107" "exp3" 1 120 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 461 9 1
"3107" "exp3" 1 121 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 373 25 1
"3107" "exp3" 1 122 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 441 13 1
"3107" "exp3" 1 123 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 348 3 1
"3107" "exp3" 1 124 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 400 8 1
"3107" "exp3" 1 125 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 392 0 0
"3107" "exp3" 1 126 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 449 0 0
"3107" "exp3" 1 127 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 312 23 1
"3107" "exp3" 1 128 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 356 0 0
"3107" "exp3" 1 129 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 337 36 1
"3107" "exp3" 1 130 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 438 21 1
"3107" "exp3" 1 131 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 290 0 0
"3107" "exp3" 1 132 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 413 17 1
"3107" "exp3" 2 1 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 274 0 0
"3107" "exp3" 2 2 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 291 0 0
"3107" "exp3" 2 3 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 290 0 0
"3107" "exp3" 2 4 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 193 77 1
"3107" "exp3" 2 5 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 309 19 1
"3107" "exp3" 2 6 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 405 23 1
"3107" "exp3" 2 7 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 431 43 1
"3107" "exp3" 2 8 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 359 63 1
"3107" "exp3" 2 9 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 281 0 0
"3107" "exp3" 2 10 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 264 7 1
"3107" "exp3" 2 11 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 347 0 0
"3107" "exp3" 2 12 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 330 20 1
"3107" "exp3" 2 13 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 442 13 1
"3107" "exp3" 2 14 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 364 0 0
"3107" "exp3" 2 15 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 358 17 1
"3107" "exp3" 2 16 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 494 40 1
"3107" "exp3" 2 17 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 400 0 0
"3107" "exp3" 2 18 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 308 0 0
"3107" "exp3" 2 19 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 447 0 0
"3107" "exp3" 2 20 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 324 27 1
"3107" "exp3" 2 21 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 542 5 1
"3107" "exp3" 2 22 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 305 25 1
"3107" "exp3" 2 23 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 706 0 0
"3107" "exp3" 2 24 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 489 0 0
"3107" "exp3" 2 25 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 563 26 1
"3107" "exp3" 2 26 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 334 0 0
"3107" "exp3" 2 27 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 483 0 0
"3107" "exp3" 2 28 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 655 14 1
"3107" "exp3" 2 29 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 386 0 0
"3107" "exp3" 2 30 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 510 0 0
"3107" "exp3" 2 31 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 526 21 1
"3107" "exp3" 2 32 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 427 44 1
"3107" "exp3" 2 33 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 514 0 0
"3107" "exp3" 2 34 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 121 0 0
"3107" "exp3" 2 35 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 295 18 1
"3107" "exp3" 2 36 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 391 27 1
"3107" "exp3" 2 37 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 367 0 0
"3107" "exp3" 2 38 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 350 0 0
"3107" "exp3" 2 39 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 190 0 0
"3107" "exp3" 2 40 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 321 0 0
"3107" "exp3" 2 41 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 399 0 0
"3107" "exp3" 2 42 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 454 34 1
"3107" "exp3" 2 43 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 221 0 0
"3107" "exp3" 2 44 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 422 47 1
"3107" "exp3" 2 45 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 302 22 1
"3107" "exp3" 2 46 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 261 23 1
"3107" "exp3" 2 47 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 410 25 1
"3107" "exp3" 2 48 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 259 0 0
"3107" "exp3" 2 49 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 641 0 0
"3107" "exp3" 2 50 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 566 48 1
"3107" "exp3" 2 51 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 450 0 0
"3107" "exp3" 2 52 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 249 0 0
"3107" "exp3" 2 53 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 476 19 1
"3107" "exp3" 2 54 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 446 19 1
"3107" "exp3" 2 55 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 326 35 1
"3107" "exp3" 2 56 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 250 0 0
"3107" "exp3" 2 57 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 336 2 1
"3107" "exp3" 2 58 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 391 38 1
"3107" "exp3" 2 59 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 275 4 1
"3107" "exp3" 2 60 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 389 41 1
"3107" "exp3" 2 61 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 375 39 1
"3107" "exp3" 2 62 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 265 0 0
"3107" "exp3" 2 63 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 270 13 1
"3107" "exp3" 2 64 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 253 15 1
"3107" "exp3" 2 65 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 374 0 0
"3107" "exp3" 2 66 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 240 0 0
"3107" "exp3" 2 67 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 856 45 1
"3107" "exp3" 2 68 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 40 0 0
"3107" "exp3" 2 69 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 16 0 0
"3107" "exp3" 2 70 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 610 38 1
"3107" "exp3" 2 71 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 229 36 1
"3107" "exp3" 2 72 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 304 0 0
"3107" "exp3" 2 73 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 425 71 1
"3107" "exp3" 2 74 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 404 26 1
"3107" "exp3" 2 75 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 273 0 0
"3107" "exp3" 2 76 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 142 45 1
"3107" "exp3" 2 77 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 275 28 1
"3107" "exp3" 2 78 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 460 37 1
"3107" "exp3" 2 79 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 339 1 1
"3107" "exp3" 2 80 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 342 0 0
"3107" "exp3" 2 81 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 301 6 1
"3107" "exp3" 2 82 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 366 90 1
"3107" "exp3" 2 83 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 558 0 0
"3107" "exp3" 2 84 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 285 0 0
"3107" "exp3" 2 85 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 467 0 0
"3107" "exp3" 2 86 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 282 41 1
"3107" "exp3" 2 87 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 298 31 1
"3107" "exp3" 2 88 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 254 15 1
"3107" "exp3" 2 89 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 783 15 1
"3107" "exp3" 2 90 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 381 8 1
"3107" "exp3" 2 91 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 469 42 1
"3107" "exp3" 2 92 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 335 6 1
"3107" "exp3" 2 93 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 631 0 0
"3107" "exp3" 2 94 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 462 0 0
"3107" "exp3" 2 95 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 307 44 1
"3107" "exp3" 2 96 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 192 0 0
"3107" "exp3" 2 97 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 435 25 1
"3107" "exp3" 2 98 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 431 0 0
"3107" "exp3" 2 99 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 806 30 1
"3107" "exp3" 2 100 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 490 65 1
"3107" "exp3" 2 101 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 439 26 1
"3107" "exp3" 2 102 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 441 31 1
"3107" "exp3" 2 103 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 311 0 0
"3107" "exp3" 2 104 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 250 0 0
"3107" "exp3" 2 105 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 388 18 1
"3107" "exp3" 2 106 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 320 32 1
"3107" "exp3" 2 107 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 421 30 1
"3107" "exp3" 2 108 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 358 27 1
"3107" "exp3" 2 109 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 374 22 1
"3107" "exp3" 2 110 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 415 9 1
"3107" "exp3" 2 111 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 359 30 1
"3107" "exp3" 2 112 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 472 30 1
"3107" "exp3" 2 113 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 289 71 1
"3107" "exp3" 2 114 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 469 25 1
"3107" "exp3" 2 115 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 314 0 0
"3107" "exp3" 2 116 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 627 17 1
"3107" "exp3" 2 117 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 735 0 0
"3107" "exp3" 2 118 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 493 20 1
"3107" "exp3" 2 119 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 549 12 1
"3107" "exp3" 2 120 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 450 24 1
"3107" "exp3" 2 121 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 238 66 1
"3107" "exp3" 2 122 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 633 17 1
"3107" "exp3" 2 123 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 493 24 1
"3107" "exp3" 2 124 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 1687 3 1
"3107" "exp3" 2 125 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 671 0 0
"3107" "exp3" 2 126 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 327 26 1
"3107" "exp3" 2 127 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 621 34 1
"3107" "exp3" 2 128 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 339 31 1
"3107" "exp3" 2 129 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 407 33 1
"3107" "exp3" 2 130 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 499 24 1
"3107" "exp3" 2 131 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 674 28 1
"3107" "exp3" 2 132 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 328 16 1
"3108" "exp3" 1 1 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1017 25 1
"3108" "exp3" 1 2 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 768 8 1
"3108" "exp3" 1 3 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 1259 0 0
"3108" "exp3" 1 4 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 799 5 1
"3108" "exp3" 1 5 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1375 72 1
"3108" "exp3" 1 6 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 2888 73 1
"3108" "exp3" 1 7 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1947 63 1
"3108" "exp3" 1 8 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1074 29 1
"3108" "exp3" 1 9 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 842 12 1
"3108" "exp3" 1 10 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1045 0 0
"3108" "exp3" 1 11 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 773 1 1
"3108" "exp3" 1 12 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 3346 41 1
"3108" "exp3" 1 13 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1741 0 0
"3108" "exp3" 1 14 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1489 0 0
"3108" "exp3" 1 15 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 3109 0 0
"3108" "exp3" 1 16 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1935 0 0
"3108" "exp3" 1 17 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 907 34 1
"3108" "exp3" 1 18 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 1307 3 1
"3108" "exp3" 1 19 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1608 35 1
"3108" "exp3" 1 20 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 832 16 1
"3108" "exp3" 1 21 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1913 48 1
"3108" "exp3" 1 22 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1700 17 1
"3108" "exp3" 1 23 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1635 38 1
"3108" "exp3" 1 24 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1269 16 1
"3108" "exp3" 1 25 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2425 39 1
"3108" "exp3" 1 26 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1979 42 1
"3108" "exp3" 1 27 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 2294 71 1
"3108" "exp3" 1 28 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1847 21 1
"3108" "exp3" 1 29 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 782 7 1
"3108" "exp3" 1 30 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 2014 21 1
"3108" "exp3" 1 31 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 2234 0 0
"3108" "exp3" 1 32 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1562 8 1
"3108" "exp3" 1 33 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1770 40 1
"3108" "exp3" 1 34 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1708 0 0
"3108" "exp3" 1 35 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1129 23 1
"3108" "exp3" 1 36 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 854 18 1
"3108" "exp3" 1 37 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 926 7 1
"3108" "exp3" 1 38 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1829 32 1
"3108" "exp3" 1 39 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 865 14 1
"3108" "exp3" 1 40 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1457 13 1
"3108" "exp3" 1 41 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 976 38 1
"3108" "exp3" 1 42 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1309 20 1
"3108" "exp3" 1 43 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 761 26 1
"3108" "exp3" 1 44 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1612 23 1
"3108" "exp3" 1 45 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 2680 14 1
"3108" "exp3" 1 46 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1512 30 1
"3108" "exp3" 1 47 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1568 22 1
"3108" "exp3" 1 48 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1116 28 1
"3108" "exp3" 1 49 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1755 0 0
"3108" "exp3" 1 50 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1499 28 1
"3108" "exp3" 1 51 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1676 67 1
"3108" "exp3" 1 52 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1160 31 1
"3108" "exp3" 1 53 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1058 16 1
"3108" "exp3" 1 54 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1565 21 1
"3108" "exp3" 1 55 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 3639 0 0
"3108" "exp3" 1 56 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1136 0 0
"3108" "exp3" 1 57 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1898 17 1
"3108" "exp3" 1 58 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1720 0 0
"3108" "exp3" 1 59 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 4810 51 1
"3108" "exp3" 1 60 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1501 0 0
"3108" "exp3" 1 61 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 2960 22 1
"3108" "exp3" 1 62 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1923 31 1
"3108" "exp3" 1 63 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1322 9 1
"3108" "exp3" 1 64 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 2743 15 1
"3108" "exp3" 1 65 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 1360 5 1
"3108" "exp3" 1 66 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1707 0 0
"3108" "exp3" 1 67 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1749 0 0
"3108" "exp3" 1 68 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1628 0 0
"3108" "exp3" 1 69 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 2294 0 0
"3108" "exp3" 1 70 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1738 41 1
"3108" "exp3" 1 71 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1591 0 0
"3108" "exp3" 1 72 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1634 36 1
"3108" "exp3" 1 73 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1417 24 1
"3108" "exp3" 1 74 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 1367 6 1
"3108" "exp3" 1 75 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 2383 26 1
"3108" "exp3" 1 76 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 2863 44 1
"3108" "exp3" 1 77 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1895 21 1
"3108" "exp3" 1 78 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2812 44 1
"3108" "exp3" 1 79 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1134 20 1
"3108" "exp3" 1 80 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 2128 76 1
"3108" "exp3" 1 81 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1235 34 1
"3108" "exp3" 1 82 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1394 13 1
"3108" "exp3" 1 83 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1285 17 1
"3108" "exp3" 1 84 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2380 0 0
"3108" "exp3" 1 85 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1360 29 1
"3108" "exp3" 1 86 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1403 0 0
"3108" "exp3" 1 87 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1672 28 1
"3108" "exp3" 1 88 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1225 15 1
"3108" "exp3" 1 89 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 997 19 1
"3108" "exp3" 1 90 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 3450 20 1
"3108" "exp3" 1 91 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1463 10 1
"3108" "exp3" 1 92 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 2360 40 1
"3108" "exp3" 1 93 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1697 0 0
"3108" "exp3" 1 94 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 2128 26 1
"3108" "exp3" 1 95 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1141 24 1
"3108" "exp3" 1 96 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1217 27 1
"3108" "exp3" 1 97 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1305 0 0
"3108" "exp3" 1 98 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1218 0 0
"3108" "exp3" 1 99 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1060 0 0
"3108" "exp3" 1 100 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 984 32 1
"3108" "exp3" 1 101 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 763 22 1
"3108" "exp3" 1 102 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 907 23 1
"3108" "exp3" 1 103 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1930 0 0
"3108" "exp3" 1 104 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1904 0 0
"3108" "exp3" 1 105 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1396 33 1
"3108" "exp3" 1 106 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 880 11 1
"3108" "exp3" 1 107 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1609 0 0
"3108" "exp3" 1 108 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1340 24 1
"3108" "exp3" 1 109 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 1054 9 1
"3108" "exp3" 1 110 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 3445 12 1
"3108" "exp3" 1 111 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 2567 35 1
"3108" "exp3" 1 112 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1582 37 1
"3108" "exp3" 1 113 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1100 18 1
"3108" "exp3" 1 114 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 2184 26 1
"3108" "exp3" 1 115 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1962 0 0
"3108" "exp3" 1 116 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 3836 0 0
"3108" "exp3" 1 117 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1392 20 1
"3108" "exp3" 1 118 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 946 19 1
"3108" "exp3" 1 119 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1168 0 0
"3108" "exp3" 1 120 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 2500 22 1
"3108" "exp3" 1 121 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 860 17 1
"3108" "exp3" 1 122 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 2459 33 1
"3108" "exp3" 1 123 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1303 10 1
"3108" "exp3" 1 124 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 2381 14 1
"3108" "exp3" 1 125 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 2001 0 0
"3108" "exp3" 1 126 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1323 30 1
"3108" "exp3" 1 127 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1745 0 0
"3108" "exp3" 1 128 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2163 0 0
"3108" "exp3" 1 129 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1213 37 1
"3108" "exp3" 1 130 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1347 33 1
"3108" "exp3" 1 131 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 3319 18 1
"3108" "exp3" 1 132 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 2639 0 0
"3108" "exp3" 2 1 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 2130 0 0
"3108" "exp3" 2 2 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 3320 0 0
"3108" "exp3" 2 3 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1212 18 1
"3108" "exp3" 2 4 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1170 24 1
"3108" "exp3" 2 5 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1897 41 1
"3108" "exp3" 2 6 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 927 28 1
"3108" "exp3" 2 7 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 2098 26 1
"3108" "exp3" 2 8 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 971 6 1
"3108" "exp3" 2 9 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1655 19 1
"3108" "exp3" 2 10 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1097 0 0
"3108" "exp3" 2 11 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1080 0 0
"3108" "exp3" 2 12 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1425 0 0
"3108" "exp3" 2 13 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 2288 29 1
"3108" "exp3" 2 14 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2139 0 0
"3108" "exp3" 2 15 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 995 32 1
"3108" "exp3" 2 16 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1553 32 1
"3108" "exp3" 2 17 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 810 17 1
"3108" "exp3" 2 18 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 912 9 1
"3108" "exp3" 2 19 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1237 20 1
"3108" "exp3" 2 20 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1759 70 1
"3108" "exp3" 2 21 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1569 36 1
"3108" "exp3" 2 22 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1012 0 0
"3108" "exp3" 2 23 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1026 21 1
"3108" "exp3" 2 24 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1034 0 0
"3108" "exp3" 2 25 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 2278 23 1
"3108" "exp3" 2 26 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1472 37 1
"3108" "exp3" 2 27 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1244 40 1
"3108" "exp3" 2 28 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 954 18 1
"3108" "exp3" 2 29 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 2219 32 1
"3108" "exp3" 2 30 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1683 0 0
"3108" "exp3" 2 31 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1147 21 1
"3108" "exp3" 2 32 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1060 25 1
"3108" "exp3" 2 33 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 798 0 0
"3108" "exp3" 2 34 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 982 12 1
"3108" "exp3" 2 35 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 845 26 1
"3108" "exp3" 2 36 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1431 0 0
"3108" "exp3" 2 37 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1233 10 1
"3108" "exp3" 2 38 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1589 0 0
"3108" "exp3" 2 39 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1618 22 1
"3108" "exp3" 2 40 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1246 35 1
"3108" "exp3" 2 41 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1023 0 0
"3108" "exp3" 2 42 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1363 28 1
"3108" "exp3" 2 43 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 871 16 1
"3108" "exp3" 2 44 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1800 33 1
"3108" "exp3" 2 45 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 895 20 1
"3108" "exp3" 2 46 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 2509 9 1
"3108" "exp3" 2 47 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 932 0 0
"3108" "exp3" 2 48 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1300 35 1
"3108" "exp3" 2 49 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 2942 8 1
"3108" "exp3" 2 50 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 2030 22 1
"3108" "exp3" 2 51 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2301 0 0
"3108" "exp3" 2 52 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1582 41 1
"3108" "exp3" 2 53 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 3377 24 1
"3108" "exp3" 2 54 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2005 0 0
"3108" "exp3" 2 55 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1579 0 0
"3108" "exp3" 2 56 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 910 0 0
"3108" "exp3" 2 57 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 2417 36 1
"3108" "exp3" 2 58 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1060 47 1
"3108" "exp3" 2 59 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 2209 12 1
"3108" "exp3" 2 60 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1605 27 1
"3108" "exp3" 2 61 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 2587 33 1
"3108" "exp3" 2 62 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 873 0 0
"3108" "exp3" 2 63 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 4417 6 1
"3108" "exp3" 2 64 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 2886 42 1
"3108" "exp3" 2 65 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1673 0 0
"3108" "exp3" 2 66 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 1709 3 1
"3108" "exp3" 2 67 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1151 0 0
"3108" "exp3" 2 68 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 3801 14 1
"3108" "exp3" 2 69 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1096 10 1
"3108" "exp3" 2 70 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1202 33 1
"3108" "exp3" 2 71 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1425 39 1
"3108" "exp3" 2 72 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 943 0 0
"3108" "exp3" 2 73 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1196 20 1
"3108" "exp3" 2 74 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1203 15 1
"3108" "exp3" 2 75 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1130 31 1
"3108" "exp3" 2 76 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 3312 27 1
"3108" "exp3" 2 77 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1842 39 1
"3108" "exp3" 2 78 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1457 0 0
"3108" "exp3" 2 79 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1137 40 1
"3108" "exp3" 2 80 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1362 38 1
"3108" "exp3" 2 81 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 854 0 0
"3108" "exp3" 2 82 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 799 23 1
"3108" "exp3" 2 83 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1389 44 1
"3108" "exp3" 2 84 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1191 34 1
"3108" "exp3" 2 85 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 950 22 1
"3108" "exp3" 2 86 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 3009 5 1
"3108" "exp3" 2 87 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 2955 49 1
"3108" "exp3" 2 88 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1660 0 0
"3108" "exp3" 2 89 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1016 18 1
"3108" "exp3" 2 90 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 3471 13 1
"3108" "exp3" 2 91 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1601 17 1
"3108" "exp3" 2 92 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 2024 23 1
"3108" "exp3" 2 93 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1147 11 1
"3108" "exp3" 2 94 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 871 15 1
"3108" "exp3" 2 95 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 2335 38 1
"3108" "exp3" 2 96 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1620 43 1
"3108" "exp3" 2 97 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1333 0 0
"3108" "exp3" 2 98 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1155 26 1
"3108" "exp3" 2 99 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1278 0 0
"3108" "exp3" 2 100 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1109 25 1
"3108" "exp3" 2 101 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1655 46 1
"3108" "exp3" 2 102 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1095 0 0
"3108" "exp3" 2 103 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1499 13 1
"3108" "exp3" 2 104 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1633 0 0
"3108" "exp3" 2 105 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1176 30 1
"3108" "exp3" 2 106 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1225 28 1
"3108" "exp3" 2 107 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1212 15 1
"3108" "exp3" 2 108 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 2065 29 1
"3108" "exp3" 2 109 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1347 48 1
"3108" "exp3" 2 110 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1716 0 0
"3108" "exp3" 2 111 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1423 0 0
"3108" "exp3" 2 112 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1738 22 1
"3108" "exp3" 2 113 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 991 0 0
"3108" "exp3" 2 114 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 906 28 1
"3108" "exp3" 2 115 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 2738 0 0
"3108" "exp3" 2 116 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1003 21 1
"3108" "exp3" 2 117 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 809 19 1
"3108" "exp3" 2 118 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 3803 93 1
"3108" "exp3" 2 119 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 844 37 1
"3108" "exp3" 2 120 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 985 0 0
"3108" "exp3" 2 121 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 747 21 1
"3108" "exp3" 2 122 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 1041 0 0
"3108" "exp3" 2 123 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 862 14 1
"3108" "exp3" 2 124 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 3829 32 1
"3108" "exp3" 2 125 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1200 13 1
"3108" "exp3" 2 126 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 1016 18 1
"3108" "exp3" 2 127 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 3104 44 1
"3108" "exp3" 2 128 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 4686 0 0
"3108" "exp3" 2 129 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1275 29 1
"3108" "exp3" 2 130 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 2549 0 0
"3108" "exp3" 2 131 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1801 0 0
"3108" "exp3" 2 132 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 2936 0 0
"3108" "exp3" 1 1 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1725 0 0
"3108" "exp3" 1 2 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1738 39 1
"3108" "exp3" 1 3 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 1268 3 1
"3108" "exp3" 1 4 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 2960 14 1
"3108" "exp3" 1 5 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 2027 31 1
"3108" "exp3" 1 6 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 3169 76 1
"3108" "exp3" 1 7 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1983 24 1
"3108" "exp3" 1 8 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 6444 0 0
"3108" "exp3" 1 9 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 4603 32 1
"3108" "exp3" 1 10 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 2833 17 1
"3108" "exp3" 1 11 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 4802 45 1
"3108" "exp3" 1 12 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 3141 0 0
"3108" "exp3" 1 13 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 4466 38 1
"3108" "exp3" 1 14 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2761 28 1
"3108" "exp3" 1 15 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1556 0 0
"3108" "exp3" 1 16 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2220 40 1
"3108" "exp3" 1 17 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 4430 22 1
"3108" "exp3" 1 18 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 3175 37 1
"3108" "exp3" 1 19 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 5137 24 1
"3108" "exp3" 1 20 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 3524 17 1
"3108" "exp3" 1 21 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2351 0 0
"3108" "exp3" 1 22 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2412 0 0
"3108" "exp3" 1 23 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 4355 25 1
"3108" "exp3" 1 24 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1939 0 0
"3108" "exp3" 1 25 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 2609 0 0
"3108" "exp3" 1 26 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 4841 0 0
"3108" "exp3" 1 27 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1730 23 1
"3108" "exp3" 1 28 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 2255 31 1
"3108" "exp3" 1 29 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2498 31 1
"3108" "exp3" 1 30 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 2487 0 0
"3108" "exp3" 1 31 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 2408 13 1
"3108" "exp3" 1 32 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 3565 27 1
"3108" "exp3" 1 33 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 8635 0 0
"3108" "exp3" 1 34 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 8864 0 0
"3108" "exp3" 1 35 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 4999 36 1
"3108" "exp3" 1 36 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2323 0 0
"3108" "exp3" 1 37 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 2494 0 0
"3108" "exp3" 1 38 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 5170 29 1
"3108" "exp3" 1 39 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 5012 30 1
"3108" "exp3" 1 40 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 5178 20 1
"3108" "exp3" 1 41 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2586 34 1
"3108" "exp3" 1 42 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 3113 38 1
"3108" "exp3" 1 43 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1949 0 0
"3108" "exp3" 1 44 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1447 20 1
"3108" "exp3" 1 45 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 2387 23 1
"3108" "exp3" 1 46 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 3235 17 1
"3108" "exp3" 1 47 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 2850 9 1
"3108" "exp3" 1 48 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2001 0 0
"3108" "exp3" 1 49 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2100 39 1
"3108" "exp3" 1 50 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1855 10 1
"3108" "exp3" 1 51 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2038 37 1
"3108" "exp3" 1 52 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 2278 0 0
"3108" "exp3" 1 53 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2326 0 0
"3108" "exp3" 1 54 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 6187 70 1
"3108" "exp3" 1 55 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 4129 8 1
"3108" "exp3" 1 56 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 3635 35 1
"3108" "exp3" 1 57 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 3266 5 1
"3108" "exp3" 1 58 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 2214 11 1
"3108" "exp3" 1 59 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 3842 9 1
"3108" "exp3" 1 60 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 2426 8 1
"3108" "exp3" 1 61 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 3010 48 1
"3108" "exp3" 1 62 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 4511 17 1
"3108" "exp3" 1 63 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 5003 0 0
"3108" "exp3" 1 64 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1576 22 1
"3108" "exp3" 1 65 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2164 27 1
"3108" "exp3" 1 66 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2018 41 1
"3108" "exp3" 1 67 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 3499 29 1
"3108" "exp3" 1 68 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1987 29 1
"3108" "exp3" 1 69 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 5251 43 1
"3108" "exp3" 1 70 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1218 25 1
"3108" "exp3" 1 71 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1649 22 1
"3108" "exp3" 1 72 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 2709 0 0
"3108" "exp3" 1 73 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3570 0 0
"3108" "exp3" 1 74 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 9055 13 1
"3108" "exp3" 1 75 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 2115 34 1
"3108" "exp3" 1 76 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2325 32 1
"3108" "exp3" 1 77 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 7483 19 1
"3108" "exp3" 1 78 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1523 21 1
"3108" "exp3" 1 79 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 4325 0 0
"3108" "exp3" 1 80 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1995 19 1
"3108" "exp3" 1 81 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1666 34 1
"3108" "exp3" 1 82 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1826 12 1
"3108" "exp3" 1 83 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 4408 7 1
"3108" "exp3" 1 84 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 5087 16 1
"3108" "exp3" 1 85 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 13524 0 0
"3108" "exp3" 1 86 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 6440 0 0
"3108" "exp3" 1 87 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 6541 0 0
"3108" "exp3" 1 88 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 3860 41 1
"3108" "exp3" 1 89 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1999 0 0
"3108" "exp3" 1 90 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 3107 0 0
"3108" "exp3" 1 91 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1821 30 1
"3108" "exp3" 1 92 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 3244 30 1
"3108" "exp3" 1 93 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1619 0 0
"3108" "exp3" 1 94 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1664 0 0
"3108" "exp3" 1 95 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1749 16 1
"3108" "exp3" 1 96 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1491 26 1
"3108" "exp3" 1 97 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1433 22 1
"3108" "exp3" 1 98 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1391 18 1
"3108" "exp3" 1 99 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1558 18 1
"3108" "exp3" 1 100 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1401 19 1
"3108" "exp3" 1 101 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2133 0 0
"3108" "exp3" 1 102 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 2155 18 1
"3108" "exp3" 1 103 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1736 15 1
"3108" "exp3" 1 104 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 4509 27 1
"3108" "exp3" 1 105 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 3197 27 1
"3108" "exp3" 1 106 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1442 20 1
"3108" "exp3" 1 107 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1628 0 0
"3108" "exp3" 1 108 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1647 23 1
"3108" "exp3" 1 109 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 5636 28 1
"3108" "exp3" 1 110 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 2710 0 0
"3108" "exp3" 1 111 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 3248 49 1
"3108" "exp3" 1 112 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1751 0 0
"3108" "exp3" 1 113 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1638 42 1
"3108" "exp3" 1 114 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1744 35 1
"3108" "exp3" 1 115 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1405 0 0
"3108" "exp3" 1 116 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1419 0 0
"3108" "exp3" 1 117 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 3036 10 1
"3108" "exp3" 1 118 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2173 21 1
"3108" "exp3" 1 119 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1317 13 1
"3108" "exp3" 1 120 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1723 0 0
"3108" "exp3" 1 121 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 2707 0 0
"3108" "exp3" 1 122 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1596 15 1
"3108" "exp3" 1 123 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 2559 42 1
"3108" "exp3" 1 124 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 3490 0 0
"3108" "exp3" 1 125 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1579 47 1
"3108" "exp3" 1 126 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1093 32 1
"3108" "exp3" 1 127 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1162 37 1
"3108" "exp3" 1 128 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1048 40 1
"3108" "exp3" 1 129 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1367 26 1
"3108" "exp3" 1 130 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1357 36 1
"3108" "exp3" 1 131 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1221 20 1
"3108" "exp3" 1 132 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1064 26 1
"3108" "exp3" 2 1 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1441 14 1
"3108" "exp3" 2 2 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1499 19 1
"3108" "exp3" 2 3 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1269 36 1
"3108" "exp3" 2 4 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1201 47 1
"3108" "exp3" 2 5 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 939 31 1
"3108" "exp3" 2 6 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 850 0 0
"3108" "exp3" 2 7 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 945 24 1
"3108" "exp3" 2 8 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 832 0 0
"3108" "exp3" 2 9 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 917 13 1
"3108" "exp3" 2 10 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1538 23 1
"3108" "exp3" 2 11 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 983 0 0
"3108" "exp3" 2 12 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1195 22 1
"3108" "exp3" 2 13 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1963 24 1
"3108" "exp3" 2 14 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2137 46 1
"3108" "exp3" 2 15 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 3986 91 1
"3108" "exp3" 2 16 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1489 0 0
"3108" "exp3" 2 17 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 5953 0 0
"3108" "exp3" 2 18 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1172 14 1
"3108" "exp3" 2 19 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1097 27 1
"3108" "exp3" 2 20 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1412 19 1
"3108" "exp3" 2 21 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1117 15 1
"3108" "exp3" 2 22 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1929 31 1
"3108" "exp3" 2 23 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1474 19 1
"3108" "exp3" 2 24 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2062 29 1
"3108" "exp3" 2 25 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 3742 29 1
"3108" "exp3" 2 26 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1269 26 1
"3108" "exp3" 2 27 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2564 26 1
"3108" "exp3" 2 28 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1487 0 0
"3108" "exp3" 2 29 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 4553 44 1
"3108" "exp3" 2 30 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1527 33 1
"3108" "exp3" 2 31 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1445 0 0
"3108" "exp3" 2 32 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1767 38 1
"3108" "exp3" 2 33 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1089 16 1
"3108" "exp3" 2 34 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 5262 0 0
"3108" "exp3" 2 35 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1486 0 0
"3108" "exp3" 2 36 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1353 0 0
"3108" "exp3" 2 37 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1575 25 1
"3108" "exp3" 2 38 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1174 37 1
"3108" "exp3" 2 39 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1470 21 1
"3108" "exp3" 2 40 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 5136 93 1
"3108" "exp3" 2 41 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1972 12 1
"3108" "exp3" 2 42 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1163 49 1
"3108" "exp3" 2 43 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1960 10 1
"3108" "exp3" 2 44 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1798 43 1
"3108" "exp3" 2 45 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1598 18 1
"3108" "exp3" 2 46 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1513 0 0
"3108" "exp3" 2 47 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1476 21 1
"3108" "exp3" 2 48 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1247 24 1
"3108" "exp3" 2 49 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2114 41 1
"3108" "exp3" 2 50 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1657 23 1
"3108" "exp3" 2 51 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 5981 10 1
"3108" "exp3" 2 52 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 2512 0 0
"3108" "exp3" 2 53 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 3837 26 1
"3108" "exp3" 2 54 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 4345 82 1
"3108" "exp3" 2 55 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 2141 28 1
"3108" "exp3" 2 56 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1373 0 0
"3108" "exp3" 2 57 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 3664 0 0
"3108" "exp3" 2 58 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 3048 0 0
"3108" "exp3" 2 59 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1899 0 0
"3108" "exp3" 2 60 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1197 20 1
"3108" "exp3" 2 61 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1180 30 1
"3108" "exp3" 2 62 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 2547 35 1
"3108" "exp3" 2 63 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1318 28 1
"3108" "exp3" 2 64 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1934 0 0
"3108" "exp3" 2 65 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1823 32 1
"3108" "exp3" 2 66 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1588 27 1
"3108" "exp3" 2 67 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1945 43 1
"3108" "exp3" 2 68 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 4091 0 0
"3108" "exp3" 2 69 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 6085 70 1
"3108" "exp3" 2 70 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 2704 7 1
"3108" "exp3" 2 71 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2230 17 1
"3108" "exp3" 2 72 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2357 0 0
"3108" "exp3" 2 73 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 5948 0 0
"3108" "exp3" 2 74 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 2129 34 1
"3108" "exp3" 2 75 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 4999 16 1
"3108" "exp3" 2 76 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1678 42 1
"3108" "exp3" 2 77 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2838 94 1
"3108" "exp3" 2 78 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1186 0 0
"3108" "exp3" 2 79 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1709 0 0
"3108" "exp3" 2 80 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2099 0 0
"3108" "exp3" 2 81 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 3811 96 1
"3108" "exp3" 2 82 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1800 27 1
"3108" "exp3" 2 83 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1950 0 0
"3108" "exp3" 2 84 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1813 0 0
"3108" "exp3" 2 85 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 4062 13 1
"3108" "exp3" 2 86 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 3058 42 1
"3108" "exp3" 2 87 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1558 35 1
"3108" "exp3" 2 88 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2070 97 1
"3108" "exp3" 2 89 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2098 29 1
"3108" "exp3" 2 90 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1958 0 0
"3108" "exp3" 2 91 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 2084 25 1
"3108" "exp3" 2 92 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 3436 31 1
"3108" "exp3" 2 93 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2494 35 1
"3108" "exp3" 2 94 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1707 32 1
"3108" "exp3" 2 95 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 3900 89 1
"3108" "exp3" 2 96 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 6157 0 0
"3108" "exp3" 2 97 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1818 0 0
"3108" "exp3" 2 98 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1718 33 1
"3108" "exp3" 2 99 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 3060 0 0
"3108" "exp3" 2 100 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 3601 18 1
"3108" "exp3" 2 101 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 4737 60 1
"3108" "exp3" 2 102 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1601 22 1
"3108" "exp3" 2 103 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1137 0 0
"3108" "exp3" 2 104 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1997 0 0
"3108" "exp3" 2 105 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 7346 24 1
"3108" "exp3" 2 106 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 2460 67 1
"3108" "exp3" 2 107 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1340 28 1
"3108" "exp3" 2 108 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1196 16 1
"3108" "exp3" 2 109 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1475 0 0
"3108" "exp3" 2 110 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1395 17 1
"3108" "exp3" 2 111 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1601 31 1
"3108" "exp3" 2 112 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1123 21 1
"3108" "exp3" 2 113 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1167 34 1
"3108" "exp3" 2 114 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1326 0 0
"3108" "exp3" 2 115 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2783 0 0
"3108" "exp3" 2 116 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 5655 37 1
"3108" "exp3" 2 117 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1404 0 0
"3108" "exp3" 2 118 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1797 20 1
"3108" "exp3" 2 119 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1273 0 0
"3108" "exp3" 2 120 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 3251 22 1
"3108" "exp3" 2 121 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1276 17 1
"3108" "exp3" 2 122 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 3899 0 0
"3108" "exp3" 2 123 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1401 19 1
"3108" "exp3" 2 124 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 2591 15 1
"3108" "exp3" 2 125 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1350 0 0
"3108" "exp3" 2 126 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 2059 0 0
"3108" "exp3" 2 127 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1663 17 1
"3108" "exp3" 2 128 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1629 14 1
"3108" "exp3" 2 129 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1521 0 0
"3108" "exp3" 2 130 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1499 0 0
"3108" "exp3" 2 131 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1227 45 1
"3108" "exp3" 2 132 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1058 32 1
"3108" "exp3" 1 1 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 3928 5 1
"3108" "exp3" 1 2 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1615 27 1
"3108" "exp3" 1 3 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1116 0 0
"3108" "exp3" 1 4 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1233 38 1
"3108" "exp3" 1 5 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1257 0 0
"3108" "exp3" 1 6 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 2860 28 1
"3108" "exp3" 1 7 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1015 31 1
"3108" "exp3" 1 8 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 890 9 1
"3108" "exp3" 1 9 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 3524 29 1
"3108" "exp3" 1 10 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1359 27 1
"3108" "exp3" 1 11 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2065 17 1
"3108" "exp3" 1 12 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2809 45 1
"3108" "exp3" 1 13 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2708 31 1
"3108" "exp3" 1 14 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 5447 0 0
"3108" "exp3" 1 15 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1924 0 0
"3108" "exp3" 1 16 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 804 37 1
"3108" "exp3" 1 17 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 4296 0 0
"3108" "exp3" 1 18 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1645 22 1
"3108" "exp3" 1 19 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1004 33 1
"3108" "exp3" 1 20 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1062 34 1
"3108" "exp3" 1 21 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1021 34 1
"3108" "exp3" 1 22 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 2074 0 0
"3108" "exp3" 1 23 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1378 19 1
"3108" "exp3" 1 24 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1862 0 0
"3108" "exp3" 1 25 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1901 17 1
"3108" "exp3" 1 26 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1217 24 1
"3108" "exp3" 1 27 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2744 0 0
"3108" "exp3" 1 28 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 3012 18 1
"3108" "exp3" 1 29 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1109 26 1
"3108" "exp3" 1 30 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 9408 14 1
"3108" "exp3" 1 31 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2329 20 1
"3108" "exp3" 1 32 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 2560 0 0
"3108" "exp3" 1 33 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1519 0 0
"3108" "exp3" 1 34 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1993 24 1
"3108" "exp3" 1 35 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1362 29 1
"3108" "exp3" 1 36 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1989 0 0
"3108" "exp3" 1 37 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 3365 18 1
"3108" "exp3" 1 38 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1922 41 1
"3108" "exp3" 1 39 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 2286 0 0
"3108" "exp3" 1 40 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1075 0 0
"3108" "exp3" 1 41 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 975 31 1
"3108" "exp3" 1 42 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 970 24 1
"3108" "exp3" 1 43 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 2305 26 1
"3108" "exp3" 1 44 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 3270 0 0
"3108" "exp3" 1 45 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1775 13 1
"3108" "exp3" 1 46 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 4212 18 1
"3108" "exp3" 1 47 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2989 73 1
"3108" "exp3" 1 48 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 1092 5 1
"3108" "exp3" 1 49 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2379 23 1
"3108" "exp3" 1 50 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 1027 16 1
"3108" "exp3" 1 51 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1679 0 0
"3108" "exp3" 1 52 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1361 17 1
"3108" "exp3" 1 53 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2518 19 1
"3108" "exp3" 1 54 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2645 27 1
"3108" "exp3" 1 55 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1883 0 0
"3108" "exp3" 1 56 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 5531 0 0
"3108" "exp3" 1 57 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1934 22 1
"3108" "exp3" 1 58 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 3277 0 0
"3108" "exp3" 1 59 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1129 19 1
"3108" "exp3" 1 60 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1117 21 1
"3108" "exp3" 1 61 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1832 15 1
"3108" "exp3" 1 62 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 2494 26 1
"3108" "exp3" 1 63 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2606 0 0
"3108" "exp3" 1 64 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 3735 94 1
"3108" "exp3" 1 65 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 2131 92 1
"3108" "exp3" 1 66 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 3466 44 1
"3108" "exp3" 1 67 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1267 32 1
"3108" "exp3" 1 68 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 3385 12 1
"3108" "exp3" 1 69 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 4874 13 1
"3108" "exp3" 1 70 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 3569 47 1
"3108" "exp3" 1 71 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 2135 0 0
"3108" "exp3" 1 72 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 3242 0 0
"3108" "exp3" 1 73 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2845 13 1
"3108" "exp3" 1 74 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1235 35 1
"3108" "exp3" 1 75 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1061 37 1
"3108" "exp3" 1 76 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1509 43 1
"3108" "exp3" 1 77 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 913 22 1
"3108" "exp3" 1 78 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1837 25 1
"3108" "exp3" 1 79 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2245 19 1
"3108" "exp3" 1 80 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 2546 0 0
"3108" "exp3" 1 81 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 3568 0 0
"3108" "exp3" 1 82 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1187 18 1
"3108" "exp3" 1 83 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2331 0 0
"3108" "exp3" 1 84 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 3058 0 0
"3108" "exp3" 1 85 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 3823 0 0
"3108" "exp3" 1 86 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2847 91 1
"3108" "exp3" 1 87 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 3762 0 0
"3108" "exp3" 1 88 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 2011 10 1
"3108" "exp3" 1 89 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 3699 0 0
"3108" "exp3" 1 90 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1451 43 1
"3108" "exp3" 1 91 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1430 24 1
"3108" "exp3" 1 92 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1571 11 1
"3108" "exp3" 1 93 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1442 0 0
"3108" "exp3" 1 94 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1499 0 0
"3108" "exp3" 1 95 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1020 30 1
"3108" "exp3" 1 96 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1888 36 1
"3108" "exp3" 1 97 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 757 39 1
"3108" "exp3" 1 98 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 796 39 1
"3108" "exp3" 1 99 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 709 16 1
"3108" "exp3" 1 100 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 552 20 1
"3108" "exp3" 1 101 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1270 0 0
"3108" "exp3" 1 102 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1629 31 1
"3108" "exp3" 1 103 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 804 23 1
"3108" "exp3" 1 104 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 994 21 1
"3108" "exp3" 1 105 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 687 42 1
"3108" "exp3" 1 106 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 798 0 0
"3108" "exp3" 1 107 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 668 23 1
"3108" "exp3" 1 108 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1567 20 1
"3108" "exp3" 1 109 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1142 38 1
"3108" "exp3" 1 110 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 952 0 0
"3108" "exp3" 1 111 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 897 0 0
"3108" "exp3" 1 112 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 724 26 1
"3108" "exp3" 1 113 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 712 30 1
"3108" "exp3" 1 114 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 760 29 1
"3108" "exp3" 1 115 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 682 45 1
"3108" "exp3" 1 116 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1033 23 1
"3108" "exp3" 1 117 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 840 35 1
"3108" "exp3" 1 118 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 958 35 1
"3108" "exp3" 1 119 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 856 0 0
"3108" "exp3" 1 120 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 3469 40 1
"3108" "exp3" 1 121 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 853 0 0
"3108" "exp3" 1 122 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 992 25 1
"3108" "exp3" 1 123 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1122 0 0
"3108" "exp3" 1 124 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1029 42 1
"3108" "exp3" 1 125 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1285 0 0
"3108" "exp3" 1 126 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1161 14 1
"3108" "exp3" 1 127 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 612 32 1
"3108" "exp3" 1 128 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 528 28 1
"3108" "exp3" 1 129 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 503 0 0
"3108" "exp3" 1 130 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2007 15 1
"3108" "exp3" 1 131 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 811 21 1
"3108" "exp3" 1 132 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 1059 0 0
"3108" "exp3" 2 1 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 1882 6 1
"3108" "exp3" 2 2 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 787 0 0
"3108" "exp3" 2 3 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 841 0 0
"3108" "exp3" 2 4 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 867 39 1
"3108" "exp3" 2 5 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1139 11 1
"3108" "exp3" 2 6 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 784 0 0
"3108" "exp3" 2 7 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 769 33 1
"3108" "exp3" 2 8 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1112 0 0
"3108" "exp3" 2 9 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1047 0 0
"3108" "exp3" 2 10 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1247 9 1
"3108" "exp3" 2 11 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1414 8 1
"3108" "exp3" 2 12 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 976 38 1
"3108" "exp3" 2 13 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 712 17 1
"3108" "exp3" 2 14 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 4540 36 1
"3108" "exp3" 2 15 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1173 38 1
"3108" "exp3" 2 16 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 953 0 0
"3108" "exp3" 2 17 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 765 21 1
"3108" "exp3" 2 18 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 691 0 0
"3108" "exp3" 2 19 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 772 19 1
"3108" "exp3" 2 20 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 780 24 1
"3108" "exp3" 2 21 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1058 25 1
"3108" "exp3" 2 22 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 908 34 1
"3108" "exp3" 2 23 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1241 0 0
"3108" "exp3" 2 24 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1088 18 1
"3108" "exp3" 2 25 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1954 0 0
"3108" "exp3" 2 26 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 965 0 0
"3108" "exp3" 2 27 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 800 20 1
"3108" "exp3" 2 28 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 684 23 1
"3108" "exp3" 2 29 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1123 13 1
"3108" "exp3" 2 30 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 2491 33 1
"3108" "exp3" 2 31 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 900 44 1
"3108" "exp3" 2 32 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 2988 19 1
"3108" "exp3" 2 33 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 868 31 1
"3108" "exp3" 2 34 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 3153 0 0
"3108" "exp3" 2 35 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 811 16 1
"3108" "exp3" 2 36 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1008 24 1
"3108" "exp3" 2 37 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 2223 0 0
"3108" "exp3" 2 38 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1381 41 1
"3108" "exp3" 2 39 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 766 31 1
"3108" "exp3" 2 40 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 879 35 1
"3108" "exp3" 2 41 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 735 32 1
"3108" "exp3" 2 42 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 647 20 1
"3108" "exp3" 2 43 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 697 0 0
"3108" "exp3" 2 44 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 901 46 1
"3108" "exp3" 2 45 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 3936 0 0
"3108" "exp3" 2 46 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 838 26 1
"3108" "exp3" 2 47 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1236 47 1
"3108" "exp3" 2 48 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 662 0 0
"3108" "exp3" 2 49 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 862 14 1
"3108" "exp3" 2 50 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 683 39 1
"3108" "exp3" 2 51 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 714 23 1
"3108" "exp3" 2 52 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 534 0 0
"3108" "exp3" 2 53 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 750 17 1
"3108" "exp3" 2 54 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 652 27 1
"3108" "exp3" 2 55 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 808 42 1
"3108" "exp3" 2 56 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1044 19 1
"3108" "exp3" 2 57 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 652 36 1
"3108" "exp3" 2 58 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 942 0 0
"3108" "exp3" 2 59 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 851 32 1
"3108" "exp3" 2 60 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 4777 0 0
"3108" "exp3" 2 61 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1159 0 0
"3108" "exp3" 2 62 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 3461 20 1
"3108" "exp3" 2 63 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2873 0 0
"3108" "exp3" 2 64 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1339 0 0
"3108" "exp3" 2 65 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2269 13 1
"3108" "exp3" 2 66 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 860 18 1
"3108" "exp3" 2 67 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 2416 9 1
"3108" "exp3" 2 68 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1024 14 1
"3108" "exp3" 2 69 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 834 0 0
"3108" "exp3" 2 70 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 2763 5 1
"3108" "exp3" 2 71 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1006 0 0
"3108" "exp3" 2 72 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 2116 0 0
"3108" "exp3" 2 73 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 986 23 1
"3108" "exp3" 2 74 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1071 29 1
"3108" "exp3" 2 75 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 873 18 1
"3108" "exp3" 2 76 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 692 16 1
"3108" "exp3" 2 77 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 599 29 1
"3108" "exp3" 2 78 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 856 0 0
"3108" "exp3" 2 79 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1089 40 1
"3108" "exp3" 2 80 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1287 0 0
"3108" "exp3" 2 81 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1318 48 1
"3108" "exp3" 2 82 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 963 26 1
"3108" "exp3" 2 83 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1385 18 1
"3108" "exp3" 2 84 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 939 0 0
"3108" "exp3" 2 85 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 905 24 1
"3108" "exp3" 2 86 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 932 10 1
"3108" "exp3" 2 87 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 758 26 1
"3108" "exp3" 2 88 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1075 32 1
"3108" "exp3" 2 89 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 945 0 0
"3108" "exp3" 2 90 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 747 0 0
"3108" "exp3" 2 91 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 758 27 1
"3108" "exp3" 2 92 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 3035 5 1
"3108" "exp3" 2 93 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1205 33 1
"3108" "exp3" 2 94 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 751 0 0
"3108" "exp3" 2 95 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 885 22 1
"3108" "exp3" 2 96 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 856 0 0
"3108" "exp3" 2 97 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1763 43 1
"3108" "exp3" 2 98 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 701 0 0
"3108" "exp3" 2 99 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 552 15 1
"3108" "exp3" 2 100 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 780 0 0
"3108" "exp3" 2 101 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 832 30 1
"3108" "exp3" 2 102 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 571 0 0
"3108" "exp3" 2 103 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 759 28 1
"3108" "exp3" 2 104 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1688 0 0
"3108" "exp3" 2 105 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 963 17 1
"3108" "exp3" 2 106 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 975 0 0
"3108" "exp3" 2 107 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 872 32 1
"3108" "exp3" 2 108 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 627 0 0
"3108" "exp3" 2 109 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 723 0 0
"3108" "exp3" 2 110 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 569 0 0
"3108" "exp3" 2 111 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 793 0 0
"3108" "exp3" 2 112 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 3186 21 1
"3108" "exp3" 2 113 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 753 0 0
"3108" "exp3" 2 114 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 737 23 1
"3108" "exp3" 2 115 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 707 12 1
"3108" "exp3" 2 116 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 804 0 0
"3108" "exp3" 2 117 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 669 0 0
"3108" "exp3" 2 118 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 3278 0 0
"3108" "exp3" 2 119 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1465 15 1
"3108" "exp3" 2 120 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 799 0 0
"3108" "exp3" 2 121 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 812 0 0
"3108" "exp3" 2 122 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 802 21 1
"3108" "exp3" 2 123 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 888 31 1
"3108" "exp3" 2 124 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 2439 4 1
"3108" "exp3" 2 125 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 635 25 1
"3108" "exp3" 2 126 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 599 35 1
"3108" "exp3" 2 127 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 726 22 1
"3108" "exp3" 2 128 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 664 22 1
"3108" "exp3" 2 129 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 980 16 1
"3108" "exp3" 2 130 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 695 28 1
"3108" "exp3" 2 131 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 534 35 1
"3108" "exp3" 2 132 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1023 15 1
"3108" "exp3" 1 1 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 2385 15 1
"3108" "exp3" 1 2 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 2360 35 1
"3108" "exp3" 1 3 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1740 31 1
"3108" "exp3" 1 4 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2281 41 1
"3108" "exp3" 1 5 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1610 22 1
"3108" "exp3" 1 6 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1258 0 0
"3108" "exp3" 1 7 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1206 0 0
"3108" "exp3" 1 8 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1179 0 0
"3108" "exp3" 1 9 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 4167 8 1
"3108" "exp3" 1 10 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 3236 0 0
"3108" "exp3" 1 11 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 4642 0 0
"3108" "exp3" 1 12 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 2004 13 1
"3108" "exp3" 1 13 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 2372 14 1
"3108" "exp3" 1 14 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 5137 32 1
"3108" "exp3" 1 15 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1212 21 1
"3108" "exp3" 1 16 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1062 26 1
"3108" "exp3" 1 17 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1685 21 1
"3108" "exp3" 1 18 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1445 20 1
"3108" "exp3" 1 19 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1007 24 1
"3108" "exp3" 1 20 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1320 49 1
"3108" "exp3" 1 21 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 975 0 0
"3108" "exp3" 1 22 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1197 29 1
"3108" "exp3" 1 23 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1068 29 1
"3108" "exp3" 1 24 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1540 30 1
"3108" "exp3" 1 25 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 2062 12 1
"3108" "exp3" 1 26 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1174 33 1
"3108" "exp3" 1 27 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1897 0 0
"3108" "exp3" 1 28 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1857 0 0
"3108" "exp3" 1 29 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1125 38 1
"3108" "exp3" 1 30 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 887 29 1
"3108" "exp3" 1 31 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 775 8 1
"3108" "exp3" 1 32 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1307 10 1
"3108" "exp3" 1 33 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 2789 32 1
"3108" "exp3" 1 34 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 2420 19 1
"3108" "exp3" 1 35 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1711 22 1
"3108" "exp3" 1 36 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 1940 5 1
"3108" "exp3" 1 37 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 2632 21 1
"3108" "exp3" 1 38 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 3964 0 0
"3108" "exp3" 1 39 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 2661 0 0
"3108" "exp3" 1 40 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 2041 0 0
"3108" "exp3" 1 41 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1066 0 0
"3108" "exp3" 1 42 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1077 9 1
"3108" "exp3" 1 43 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 3466 42 1
"3108" "exp3" 1 44 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1797 23 1
"3108" "exp3" 1 45 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1153 27 1
"3108" "exp3" 1 46 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1795 35 1
"3108" "exp3" 1 47 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1935 48 1
"3108" "exp3" 1 48 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1283 28 1
"3108" "exp3" 1 49 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1706 18 1
"3108" "exp3" 1 50 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1356 43 1
"3108" "exp3" 1 51 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 954 26 1
"3108" "exp3" 1 52 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 771 19 1
"3108" "exp3" 1 53 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 2211 10 1
"3108" "exp3" 1 54 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1404 14 1
"3108" "exp3" 1 55 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 2015 0 0
"3108" "exp3" 1 56 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1313 20 1
"3108" "exp3" 1 57 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1468 45 1
"3108" "exp3" 1 58 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1343 19 1
"3108" "exp3" 1 59 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1630 0 0
"3108" "exp3" 1 60 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 3422 34 1
"3108" "exp3" 1 61 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 983 14 1
"3108" "exp3" 1 62 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1055 44 1
"3108" "exp3" 1 63 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 992 0 0
"3108" "exp3" 1 64 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1364 30 1
"3108" "exp3" 1 65 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1536 0 0
"3108" "exp3" 1 66 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1488 23 1
"3108" "exp3" 1 67 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2142 40 1
"3108" "exp3" 1 68 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 939 30 1
"3108" "exp3" 1 69 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1148 33 1
"3108" "exp3" 1 70 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 866 33 1
"3108" "exp3" 1 71 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1804 20 1
"3108" "exp3" 1 72 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2315 37 1
"3108" "exp3" 1 73 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1218 23 1
"3108" "exp3" 1 74 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1153 36 1
"3108" "exp3" 1 75 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1029 0 0
"3108" "exp3" 1 76 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 926 0 0
"3108" "exp3" 1 77 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1233 25 1
"3108" "exp3" 1 78 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 855 26 1
"3108" "exp3" 1 79 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1072 22 1
"3108" "exp3" 1 80 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 3261 5 1
"3108" "exp3" 1 81 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1355 0 0
"3108" "exp3" 1 82 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1213 0 0
"3108" "exp3" 1 83 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 996 40 1
"3108" "exp3" 1 84 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1754 16 1
"3108" "exp3" 1 85 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1452 15 1
"3108" "exp3" 1 86 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1849 39 1
"3108" "exp3" 1 87 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1149 38 1
"3108" "exp3" 1 88 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1478 20 1
"3108" "exp3" 1 89 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1018 29 1
"3108" "exp3" 1 90 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1367 27 1
"3108" "exp3" 1 91 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1409 0 0
"3108" "exp3" 1 92 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1311 32 1
"3108" "exp3" 1 93 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1037 17 1
"3108" "exp3" 1 94 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 933 18 1
"3108" "exp3" 1 95 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1117 31 1
"3108" "exp3" 1 96 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1052 0 0
"3108" "exp3" 1 97 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1178 34 1
"3108" "exp3" 1 98 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 908 44 1
"3108" "exp3" 1 99 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1020 37 1
"3108" "exp3" 1 100 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 3410 16 1
"3108" "exp3" 1 101 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 973 18 1
"3108" "exp3" 1 102 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 2594 0 0
"3108" "exp3" 1 103 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1734 25 1
"3108" "exp3" 1 104 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 925 25 1
"3108" "exp3" 1 105 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1188 26 1
"3108" "exp3" 1 106 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1014 24 1
"3108" "exp3" 1 107 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 3573 0 0
"3108" "exp3" 1 108 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2997 64 1
"3108" "exp3" 1 109 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 2050 6 1
"3108" "exp3" 1 110 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1592 0 0
"3108" "exp3" 1 111 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1118 11 1
"3108" "exp3" 1 112 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 837 0 0
"3108" "exp3" 1 113 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1092 18 1
"3108" "exp3" 1 114 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 913 28 1
"3108" "exp3" 1 115 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 861 7 1
"3108" "exp3" 1 116 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 991 0 0
"3108" "exp3" 1 117 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2699 0 0
"3108" "exp3" 1 118 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1863 0 0
"3108" "exp3" 1 119 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2022 41 1
"3108" "exp3" 1 120 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1726 27 1
"3108" "exp3" 1 121 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1142 19 1
"3108" "exp3" 1 122 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 4320 0 0
"3108" "exp3" 1 123 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1548 21 1
"3108" "exp3" 1 124 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1423 0 0
"3108" "exp3" 1 125 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1215 47 1
"3108" "exp3" 1 126 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1875 9 1
"3108" "exp3" 1 127 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1795 17 1
"3108" "exp3" 1 128 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2029 46 1
"3108" "exp3" 1 129 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 973 12 1
"3108" "exp3" 1 130 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1262 0 0
"3108" "exp3" 1 131 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 936 35 1
"3108" "exp3" 1 132 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1360 6 1
"3108" "exp3" 2 1 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1444 17 1
"3108" "exp3" 2 2 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 623 28 1
"3108" "exp3" 2 3 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1238 0 0
"3108" "exp3" 2 4 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 676 9 1
"3108" "exp3" 2 5 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 590 30 1
"3108" "exp3" 2 6 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1054 0 0
"3108" "exp3" 2 7 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1224 0 0
"3108" "exp3" 2 8 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 911 0 0
"3108" "exp3" 2 9 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1133 0 0
"3108" "exp3" 2 10 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 980 37 1
"3108" "exp3" 2 11 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1012 12 1
"3108" "exp3" 2 12 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1262 43 1
"3108" "exp3" 2 13 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 927 7 1
"3108" "exp3" 2 14 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 897 25 1
"3108" "exp3" 2 15 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 726 0 0
"3108" "exp3" 2 16 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1095 0 0
"3108" "exp3" 2 17 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 666 23 1
"3108" "exp3" 2 18 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1186 20 1
"3108" "exp3" 2 19 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 783 34 1
"3108" "exp3" 2 20 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 888 12 1
"3108" "exp3" 2 21 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1176 19 1
"3108" "exp3" 2 22 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1010 39 1
"3108" "exp3" 2 23 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 905 30 1
"3108" "exp3" 2 24 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 2086 4 1
"3108" "exp3" 2 25 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2456 0 0
"3108" "exp3" 2 26 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1380 26 1
"3108" "exp3" 2 27 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1096 21 1
"3108" "exp3" 2 28 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 698 31 1
"3108" "exp3" 2 29 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1091 36 1
"3108" "exp3" 2 30 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 2652 1 1
"3108" "exp3" 2 31 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 2271 23 1
"3108" "exp3" 2 32 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1132 42 1
"3108" "exp3" 2 33 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 857 29 1
"3108" "exp3" 2 34 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 945 24 1
"3108" "exp3" 2 35 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 867 23 1
"3108" "exp3" 2 36 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1130 0 0
"3108" "exp3" 2 37 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1073 17 1
"3108" "exp3" 2 38 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 872 0 0
"3108" "exp3" 2 39 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 733 13 1
"3108" "exp3" 2 40 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 747 30 1
"3108" "exp3" 2 41 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 783 8 1
"3108" "exp3" 2 42 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 945 0 0
"3108" "exp3" 2 43 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 825 49 1
"3108" "exp3" 2 44 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1394 35 1
"3108" "exp3" 2 45 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1074 40 1
"3108" "exp3" 2 46 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 2361 6 1
"3108" "exp3" 2 47 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 2756 36 1
"3108" "exp3" 2 48 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1373 19 1
"3108" "exp3" 2 49 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1137 32 1
"3108" "exp3" 2 50 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1117 42 1
"3108" "exp3" 2 51 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 962 16 1
"3108" "exp3" 2 52 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1202 9 1
"3108" "exp3" 2 53 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 3457 0 0
"3108" "exp3" 2 54 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 2265 3 1
"3108" "exp3" 2 55 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1844 53 1
"3108" "exp3" 2 56 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2136 22 1
"3108" "exp3" 2 57 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1812 0 0
"3108" "exp3" 2 58 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1088 19 1
"3108" "exp3" 2 59 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 762 0 0
"3108" "exp3" 2 60 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 936 8 1
"3108" "exp3" 2 61 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 894 0 0
"3108" "exp3" 2 62 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1077 45 1
"3108" "exp3" 2 63 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1217 46 1
"3108" "exp3" 2 64 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 811 0 0
"3108" "exp3" 2 65 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1001 32 1
"3108" "exp3" 2 66 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1110 10 1
"3108" "exp3" 2 67 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1836 29 1
"3108" "exp3" 2 68 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1590 14 1
"3108" "exp3" 2 69 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 863 18 1
"3108" "exp3" 2 70 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1247 0 0
"3108" "exp3" 2 71 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1373 11 1
"3108" "exp3" 2 72 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1574 17 1
"3108" "exp3" 2 73 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 814 28 1
"3108" "exp3" 2 74 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 846 18 1
"3108" "exp3" 2 75 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 800 13 1
"3108" "exp3" 2 76 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1143 0 0
"3108" "exp3" 2 77 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1070 14 1
"3108" "exp3" 2 78 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 697 32 1
"3108" "exp3" 2 79 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1074 0 0
"3108" "exp3" 2 80 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1197 34 1
"3108" "exp3" 2 81 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 983 27 1
"3108" "exp3" 2 82 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 982 22 1
"3108" "exp3" 2 83 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 694 19 1
"3108" "exp3" 2 84 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 3095 5 1
"3108" "exp3" 2 85 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 963 24 1
"3108" "exp3" 2 86 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1085 21 1
"3108" "exp3" 2 87 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1239 22 1
"3108" "exp3" 2 88 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1193 33 1
"3108" "exp3" 2 89 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1225 14 1
"3108" "exp3" 2 90 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 773 20 1
"3108" "exp3" 2 91 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 817 39 1
"3108" "exp3" 2 92 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1045 15 1
"3108" "exp3" 2 93 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1345 0 0
"3108" "exp3" 2 94 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1401 11 1
"3108" "exp3" 2 95 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1096 0 0
"3108" "exp3" 2 96 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 930 25 1
"3108" "exp3" 2 97 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1357 0 0
"3108" "exp3" 2 98 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 3178 44 1
"3108" "exp3" 2 99 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1110 0 0
"3108" "exp3" 2 100 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1093 24 1
"3108" "exp3" 2 101 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 927 29 1
"3108" "exp3" 2 102 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1425 45 1
"3108" "exp3" 2 103 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 848 0 0
"3108" "exp3" 2 104 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 721 22 1
"3108" "exp3" 2 105 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 645 17 1
"3108" "exp3" 2 106 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 696 0 0
"3108" "exp3" 2 107 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 939 25 1
"3108" "exp3" 2 108 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 765 26 1
"3108" "exp3" 2 109 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 837 0 0
"3108" "exp3" 2 110 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 794 26 1
"3108" "exp3" 2 111 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 616 7 1
"3108" "exp3" 2 112 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 728 16 1
"3108" "exp3" 2 113 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 3464 18 1
"3108" "exp3" 2 114 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1395 15 1
"3108" "exp3" 2 115 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 760 20 1
"3108" "exp3" 2 116 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 910 0 0
"3108" "exp3" 2 117 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2350 73 1
"3108" "exp3" 2 118 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 977 0 0
"3108" "exp3" 2 119 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1018 0 0
"3108" "exp3" 2 120 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1702 6 1
"3108" "exp3" 2 121 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 2623 31 1
"3108" "exp3" 2 122 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1517 34 1
"3108" "exp3" 2 123 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1155 10 1
"3108" "exp3" 2 124 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2350 0 0
"3108" "exp3" 2 125 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1029 0 0
"3108" "exp3" 2 126 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2661 40 1
"3108" "exp3" 2 127 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1632 0 0
"3108" "exp3" 2 128 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1287 23 1
"3108" "exp3" 2 129 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 626 27 1
"3108" "exp3" 2 130 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 964 33 1
"3108" "exp3" 2 131 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1435 62 1
"3108" "exp3" 2 132 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1282 0 0
"3109" "exp3" 1 1 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 335 0 0
"3109" "exp3" 1 2 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 521 0 0
"3109" "exp3" 1 3 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 537 22 1
"3109" "exp3" 1 4 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 392 16 1
"3109" "exp3" 1 5 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 507 0 0
"3109" "exp3" 1 6 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 427 9 1
"3109" "exp3" 1 7 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 378 0 0
"3109" "exp3" 1 8 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 372 15 1
"3109" "exp3" 1 9 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 333 11 1
"3109" "exp3" 1 10 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 370 29 1
"3109" "exp3" 1 11 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 428 25 1
"3109" "exp3" 1 12 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 366 29 1
"3109" "exp3" 1 13 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 390 22 1
"3109" "exp3" 1 14 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 346 13 1
"3109" "exp3" 1 15 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 417 0 0
"3109" "exp3" 1 16 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 449 17 1
"3109" "exp3" 1 17 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 310 14 1
"3109" "exp3" 1 18 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 389 20 1
"3109" "exp3" 1 19 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 469 0 0
"3109" "exp3" 1 20 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 562 32 1
"3109" "exp3" 1 21 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 495 49 1
"3109" "exp3" 1 22 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 419 0 0
"3109" "exp3" 1 23 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 357 28 1
"3109" "exp3" 1 24 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 467 0 0
"3109" "exp3" 1 25 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 367 22 1
"3109" "exp3" 1 26 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 352 17 1
"3109" "exp3" 1 27 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 453 25 1
"3109" "exp3" 1 28 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 436 31 1
"3109" "exp3" 1 29 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 371 0 0
"3109" "exp3" 1 30 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 351 34 1
"3109" "exp3" 1 31 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 417 35 1
"3109" "exp3" 1 32 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 419 43 1
"3109" "exp3" 1 33 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 346 0 0
"3109" "exp3" 1 34 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 445 0 0
"3109" "exp3" 1 35 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 428 0 0
"3109" "exp3" 1 36 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 425 25 1
"3109" "exp3" 1 37 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 381 6 1
"3109" "exp3" 1 38 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 416 14 1
"3109" "exp3" 1 39 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 442 0 0
"3109" "exp3" 1 40 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 471 40 1
"3109" "exp3" 1 41 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 573 28 1
"3109" "exp3" 1 42 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 430 25 1
"3109" "exp3" 1 43 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 682 0 0
"3109" "exp3" 1 44 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 593 0 0
"3109" "exp3" 1 45 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 386 21 1
"3109" "exp3" 1 46 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 412 18 1
"3109" "exp3" 1 47 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 358 0 0
"3109" "exp3" 1 48 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 441 2 1
"3109" "exp3" 1 49 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 441 5 1
"3109" "exp3" 1 50 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 475 31 1
"3109" "exp3" 1 51 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 385 0 0
"3109" "exp3" 1 52 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 425 0 0
"3109" "exp3" 1 53 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 443 26 1
"3109" "exp3" 1 54 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 410 0 0
"3109" "exp3" 1 55 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 390 13 1
"3109" "exp3" 1 56 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 479 6 1
"3109" "exp3" 1 57 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 368 24 1
"3109" "exp3" 1 58 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 376 0 0
"3109" "exp3" 1 59 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 466 38 1
"3109" "exp3" 1 60 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 483 26 1
"3109" "exp3" 1 61 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 372 0 0
"3109" "exp3" 1 62 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 366 10 1
"3109" "exp3" 1 63 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 547 18 1
"3109" "exp3" 1 64 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 396 28 1
"3109" "exp3" 1 65 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 450 32 1
"3109" "exp3" 1 66 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 404 30 1
"3109" "exp3" 1 67 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 425 41 1
"3109" "exp3" 1 68 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 493 33 1
"3109" "exp3" 1 69 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 484 0 0
"3109" "exp3" 1 70 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 360 18 1
"3109" "exp3" 1 71 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 364 0 0
"3109" "exp3" 1 72 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 446 5 1
"3109" "exp3" 1 73 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 433 0 0
"3109" "exp3" 1 74 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 409 43 1
"3109" "exp3" 1 75 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 438 37 1
"3109" "exp3" 1 76 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 384 27 1
"3109" "exp3" 1 77 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 413 42 1
"3109" "exp3" 1 78 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 392 7 1
"3109" "exp3" 1 79 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 426 18 1
"3109" "exp3" 1 80 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 357 21 1
"3109" "exp3" 1 81 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 379 26 1
"3109" "exp3" 1 82 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 418 27 1
"3109" "exp3" 1 83 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 408 23 1
"3109" "exp3" 1 84 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 484 0 0
"3109" "exp3" 1 85 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 443 0 0
"3109" "exp3" 1 86 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 367 0 0
"3109" "exp3" 1 87 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 433 29 1
"3109" "exp3" 1 88 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 424 12 1
"3109" "exp3" 1 89 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 352 20 1
"3109" "exp3" 1 90 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 411 23 1
"3109" "exp3" 1 91 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 338 34 1
"3109" "exp3" 1 92 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 422 16 1
"3109" "exp3" 1 93 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 534 37 1
"3109" "exp3" 1 94 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 408 37 1
"3109" "exp3" 1 95 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 402 0 0
"3109" "exp3" 1 96 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 592 39 1
"3109" "exp3" 1 97 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 357 61 1
"3109" "exp3" 1 98 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 432 12 1
"3109" "exp3" 1 99 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 382 19 1
"3109" "exp3" 1 100 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 457 8 1
"3109" "exp3" 1 101 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 587 0 0
"3109" "exp3" 1 102 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 467 0 0
"3109" "exp3" 1 103 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 359 3 1
"3109" "exp3" 1 104 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 407 36 1
"3109" "exp3" 1 105 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 353 19 1
"3109" "exp3" 1 106 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 377 4 1
"3109" "exp3" 1 107 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 441 0 0
"3109" "exp3" 1 108 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 365 45 1
"3109" "exp3" 1 109 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 362 17 1
"3109" "exp3" 1 110 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 344 15 1
"3109" "exp3" 1 111 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 515 40 1
"3109" "exp3" 1 112 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 490 33 1
"3109" "exp3" 1 113 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 406 46 1
"3109" "exp3" 1 114 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 534 44 1
"3109" "exp3" 1 115 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 395 20 1
"3109" "exp3" 1 116 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 424 10 1
"3109" "exp3" 1 117 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 360 9 1
"3109" "exp3" 1 118 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 362 0 0
"3109" "exp3" 1 119 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 366 20 1
"3109" "exp3" 1 120 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 458 30 1
"3109" "exp3" 1 121 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 485 21 1
"3109" "exp3" 1 122 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 407 19 1
"3109" "exp3" 1 123 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 534 47 1
"3109" "exp3" 1 124 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 424 1 1
"3109" "exp3" 1 125 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 430 16 1
"3109" "exp3" 1 126 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 346 21 1
"3109" "exp3" 1 127 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 415 0 0
"3109" "exp3" 1 128 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 419 26 1
"3109" "exp3" 1 129 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 378 22 1
"3109" "exp3" 1 130 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 368 0 0
"3109" "exp3" 1 131 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 390 24 1
"3109" "exp3" 1 132 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 405 0 0
"3109" "exp3" 2 1 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 374 35 1
"3109" "exp3" 2 2 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 390 28 1
"3109" "exp3" 2 3 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 359 16 1
"3109" "exp3" 2 4 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 344 17 1
"3109" "exp3" 2 5 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 409 9 1
"3109" "exp3" 2 6 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 440 39 1
"3109" "exp3" 2 7 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 353 0 0
"3109" "exp3" 2 8 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 435 0 0
"3109" "exp3" 2 9 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 410 18 1
"3109" "exp3" 2 10 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 404 0 0
"3109" "exp3" 2 11 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 431 20 1
"3109" "exp3" 2 12 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 331 18 1
"3109" "exp3" 2 13 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 627 42 1
"3109" "exp3" 2 14 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 390 25 1
"3109" "exp3" 2 15 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 502 25 1
"3109" "exp3" 2 16 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 432 0 0
"3109" "exp3" 2 17 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 545 27 1
"3109" "exp3" 2 18 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 362 22 1
"3109" "exp3" 2 19 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 459 0 0
"3109" "exp3" 2 20 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 468 0 0
"3109" "exp3" 2 21 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 387 23 1
"3109" "exp3" 2 22 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 417 48 1
"3109" "exp3" 2 23 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 517 32 1
"3109" "exp3" 2 24 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 525 0 0
"3109" "exp3" 2 25 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 379 30 1
"3109" "exp3" 2 26 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 431 7 1
"3109" "exp3" 2 27 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 871 0 0
"3109" "exp3" 2 28 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 495 29 1
"3109" "exp3" 2 29 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 420 33 1
"3109" "exp3" 2 30 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 470 10 1
"3109" "exp3" 2 31 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 351 0 0
"3109" "exp3" 2 32 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 477 36 1
"3109" "exp3" 2 33 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 410 11 1
"3109" "exp3" 2 34 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 404 0 0
"3109" "exp3" 2 35 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 390 0 0
"3109" "exp3" 2 36 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 408 5 1
"3109" "exp3" 2 37 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 546 34 1
"3109" "exp3" 2 38 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 494 32 1
"3109" "exp3" 2 39 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 391 1 1
"3109" "exp3" 2 40 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 647 41 1
"3109" "exp3" 2 41 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 540 27 1
"3109" "exp3" 2 42 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 549 10 1
"3109" "exp3" 2 43 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1054 0 0
"3109" "exp3" 2 44 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 987 40 1
"3109" "exp3" 2 45 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1047 0 0
"3109" "exp3" 2 46 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 431 15 1
"3109" "exp3" 2 47 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 699 13 1
"3109" "exp3" 2 48 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 676 4 1
"3109" "exp3" 2 49 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 1392 0 0
"3109" "exp3" 2 50 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 951 11 1
"3109" "exp3" 2 51 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 874 26 1
"3109" "exp3" 2 52 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1010 41 1
"3109" "exp3" 2 53 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 549 0 0
"3109" "exp3" 2 54 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 567 9 1
"3109" "exp3" 2 55 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 740 23 1
"3109" "exp3" 2 56 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 544 33 1
"3109" "exp3" 2 57 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1047 72 1
"3109" "exp3" 2 58 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 607 19 1
"3109" "exp3" 2 59 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 560 0 0
"3109" "exp3" 2 60 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 785 7 1
"3109" "exp3" 2 61 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 687 30 1
"3109" "exp3" 2 62 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 553 22 1
"3109" "exp3" 2 63 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 488 29 1
"3109" "exp3" 2 64 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 573 0 0
"3109" "exp3" 2 65 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 466 37 1
"3109" "exp3" 2 66 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 585 44 1
"3109" "exp3" 2 67 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 557 18 1
"3109" "exp3" 2 68 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 643 0 0
"3109" "exp3" 2 69 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 738 30 1
"3109" "exp3" 2 70 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 568 31 1
"3109" "exp3" 2 71 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 695 19 1
"3109" "exp3" 2 72 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 874 0 0
"3109" "exp3" 2 73 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 669 22 1
"3109" "exp3" 2 74 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 583 2 1
"3109" "exp3" 2 75 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 589 19 1
"3109" "exp3" 2 76 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 971 31 1
"3109" "exp3" 2 77 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 595 0 0
"3109" "exp3" 2 78 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 804 33 1
"3109" "exp3" 2 79 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 690 0 0
"3109" "exp3" 2 80 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 801 0 0
"3109" "exp3" 2 81 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 620 46 1
"3109" "exp3" 2 82 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 947 0 0
"3109" "exp3" 2 83 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 757 0 0
"3109" "exp3" 2 84 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 972 0 0
"3109" "exp3" 2 85 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 688 0 0
"3109" "exp3" 2 86 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 822 0 0
"3109" "exp3" 2 87 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 472 0 0
"3109" "exp3" 2 88 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 562 0 0
"3109" "exp3" 2 89 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 445 57 1
"3109" "exp3" 2 90 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 888 0 0
"3109" "exp3" 2 91 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 915 0 0
"3109" "exp3" 2 92 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 648 0 0
"3109" "exp3" 2 93 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 521 57 1
"3109" "exp3" 2 94 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 955 0 0
"3109" "exp3" 2 95 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 705 0 0
"3109" "exp3" 2 96 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 598 39 1
"3109" "exp3" 2 97 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 687 0 0
"3109" "exp3" 2 98 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 939 63 1
"3109" "exp3" 2 99 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 695 24 1
"3109" "exp3" 2 100 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 978 77 1
"3109" "exp3" 2 101 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 775 0 0
"3109" "exp3" 2 102 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 824 0 0
"3109" "exp3" 2 103 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 862 0 0
"3109" "exp3" 2 104 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 993 0 0
"3109" "exp3" 2 105 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 726 0 0
"3109" "exp3" 2 106 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1519 0 0
"3109" "exp3" 2 107 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 753 62 1
"3109" "exp3" 2 108 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 577 0 0
"3109" "exp3" 2 109 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1017 38 1
"3109" "exp3" 2 110 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 834 0 0
"3109" "exp3" 2 111 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 607 0 0
"3109" "exp3" 2 112 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 636 35 1
"3109" "exp3" 2 113 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 645 20 1
"3109" "exp3" 2 114 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 960 0 0
"3109" "exp3" 2 115 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1006 19 1
"3109" "exp3" 2 116 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 964 65 1
"3109" "exp3" 2 117 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 669 49 1
"3109" "exp3" 2 118 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 908 0 0
"3109" "exp3" 2 119 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 673 0 0
"3109" "exp3" 2 120 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 835 25 1
"3109" "exp3" 2 121 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 687 21 1
"3109" "exp3" 2 122 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 737 0 0
"3109" "exp3" 2 123 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 511 0 0
"3109" "exp3" 2 124 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 606 0 0
"3109" "exp3" 2 125 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1166 42 1
"3109" "exp3" 2 126 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 549 0 0
"3109" "exp3" 2 127 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1026 17 1
"3109" "exp3" 2 128 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 922 0 0
"3109" "exp3" 2 129 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 941 16 1
"3109" "exp3" 2 130 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1259 0 0
"3109" "exp3" 2 131 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1148 18 1
"3109" "exp3" 2 132 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 999 26 1
"3109" "exp3" 1 1 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 573 0 0
"3109" "exp3" 1 2 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 674 18 1
"3109" "exp3" 1 3 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 948 0 0
"3109" "exp3" 1 4 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 411 0 0
"3109" "exp3" 1 5 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 540 7 1
"3109" "exp3" 1 6 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 753 66 1
"3109" "exp3" 1 7 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 848 54 1
"3109" "exp3" 1 8 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 844 7 1
"3109" "exp3" 1 9 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 740 0 0
"3109" "exp3" 1 10 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 802 31 1
"3109" "exp3" 1 11 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 918 0 0
"3109" "exp3" 1 12 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 964 0 0
"3109" "exp3" 1 13 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1967 0 0
"3109" "exp3" 1 14 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 672 20 1
"3109" "exp3" 1 15 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 620 15 1
"3109" "exp3" 1 16 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1089 11 1
"3109" "exp3" 1 17 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1110 25 1
"3109" "exp3" 1 18 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 739 0 0
"3109" "exp3" 1 19 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 892 0 0
"3109" "exp3" 1 20 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 770 36 1
"3109" "exp3" 1 21 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 763 0 0
"3109" "exp3" 1 22 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 857 0 0
"3109" "exp3" 1 23 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 892 0 0
"3109" "exp3" 1 24 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1882 0 0
"3109" "exp3" 1 25 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 651 0 0
"3109" "exp3" 1 26 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 722 0 0
"3109" "exp3" 1 27 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1069 13 1
"3109" "exp3" 1 28 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 767 40 1
"3109" "exp3" 1 29 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 489 29 1
"3109" "exp3" 1 30 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 608 29 1
"3109" "exp3" 1 31 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 568 5 1
"3109" "exp3" 1 32 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1100 43 1
"3109" "exp3" 1 33 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 948 0 0
"3109" "exp3" 1 34 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 716 0 0
"3109" "exp3" 1 35 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1535 15 1
"3109" "exp3" 1 36 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 943 0 0
"3109" "exp3" 1 37 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 835 27 1
"3109" "exp3" 1 38 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 526 16 1
"3109" "exp3" 1 39 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 801 6 1
"3109" "exp3" 1 40 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 559 37 1
"3109" "exp3" 1 41 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 707 38 1
"3109" "exp3" 1 42 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 678 4 1
"3109" "exp3" 1 43 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 890 69 1
"3109" "exp3" 1 44 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1003 30 1
"3109" "exp3" 1 45 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 598 42 1
"3109" "exp3" 1 46 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 720 11 1
"3109" "exp3" 1 47 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 664 0 0
"3109" "exp3" 1 48 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 778 9 1
"3109" "exp3" 1 49 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 638 9 1
"3109" "exp3" 1 50 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 642 35 1
"3109" "exp3" 1 51 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 563 34 1
"3109" "exp3" 1 52 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 563 0 0
"3109" "exp3" 1 53 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 388 28 1
"3109" "exp3" 1 54 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 470 12 1
"3109" "exp3" 1 55 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 537 36 1
"3109" "exp3" 1 56 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 507 0 0
"3109" "exp3" 1 57 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 589 19 1
"3109" "exp3" 1 58 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 508 0 0
"3109" "exp3" 1 59 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 605 25 1
"3109" "exp3" 1 60 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 602 32 1
"3109" "exp3" 1 61 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 552 19 1
"3109" "exp3" 1 62 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 770 39 1
"3109" "exp3" 1 63 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 612 41 1
"3109" "exp3" 1 64 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 633 6 1
"3109" "exp3" 1 65 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 690 32 1
"3109" "exp3" 1 66 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 618 19 1
"3109" "exp3" 1 67 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 542 0 0
"3109" "exp3" 1 68 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 475 38 1
"3109" "exp3" 1 69 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 768 14 1
"3109" "exp3" 1 70 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 785 12 1
"3109" "exp3" 1 71 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 511 23 1
"3109" "exp3" 1 72 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 745 0 0
"3109" "exp3" 1 73 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 557 0 0
"3109" "exp3" 1 74 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 722 15 1
"3109" "exp3" 1 75 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 528 10 1
"3109" "exp3" 1 76 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 574 28 1
"3109" "exp3" 1 77 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 659 0 0
"3109" "exp3" 1 78 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1298 0 0
"3109" "exp3" 1 79 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1438 0 0
"3109" "exp3" 1 80 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 755 25 1
"3109" "exp3" 1 81 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 763 18 1
"3109" "exp3" 1 82 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 576 53 1
"3109" "exp3" 1 83 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 596 0 0
"3109" "exp3" 1 84 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1201 72 1
"3109" "exp3" 1 85 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 762 0 0
"3109" "exp3" 1 86 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 899 73 1
"3109" "exp3" 1 87 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1840 0 0
"3109" "exp3" 1 88 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 582 0 0
"3109" "exp3" 1 89 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 1015 0 0
"3109" "exp3" 1 90 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 860 0 0
"3109" "exp3" 1 91 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 592 17 1
"3109" "exp3" 1 92 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 676 0 0
"3109" "exp3" 1 93 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1234 27 1
"3109" "exp3" 1 94 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 1123 0 0
"3109" "exp3" 1 95 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 676 33 1
"3109" "exp3" 1 96 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 811 13 1
"3109" "exp3" 1 97 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1285 45 1
"3109" "exp3" 1 98 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1289 0 0
"3109" "exp3" 1 99 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1306 10 1
"3109" "exp3" 1 100 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1328 74 1
"3109" "exp3" 1 101 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1356 17 1
"3109" "exp3" 1 102 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1462 0 0
"3109" "exp3" 1 103 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1810 0 0
"3109" "exp3" 1 104 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1142 8 1
"3109" "exp3" 1 105 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 995 59 1
"3109" "exp3" 1 106 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1602 23 1
"3109" "exp3" 1 107 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2509 0 0
"3109" "exp3" 1 108 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1191 17 1
"3109" "exp3" 1 109 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1246 22 1
"3109" "exp3" 1 110 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 957 16 1
"3109" "exp3" 1 111 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 988 21 1
"3109" "exp3" 1 112 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1215 20 1
"3109" "exp3" 1 113 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 1054 2 1
"3109" "exp3" 1 114 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1374 34 1
"3109" "exp3" 1 115 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 927 0 0
"3109" "exp3" 1 116 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1135 18 1
"3109" "exp3" 1 117 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 989 0 0
"3109" "exp3" 1 118 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 768 0 0
"3109" "exp3" 1 119 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 699 3 1
"3109" "exp3" 1 120 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 929 44 1
"3109" "exp3" 1 121 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 643 19 1
"3109" "exp3" 1 122 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 775 21 1
"3109" "exp3" 1 123 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 822 0 0
"3109" "exp3" 1 124 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 974 0 0
"3109" "exp3" 1 125 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 790 60 1
"3109" "exp3" 1 126 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 861 0 0
"3109" "exp3" 1 127 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 925 13 1
"3109" "exp3" 1 128 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1160 0 0
"3109" "exp3" 1 129 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1075 22 1
"3109" "exp3" 1 130 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 695 21 1
"3109" "exp3" 1 131 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 941 14 1
"3109" "exp3" 1 132 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 730 0 0
"3109" "exp3" 2 1 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 747 26 1
"3109" "exp3" 2 2 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 828 16 1
"3109" "exp3" 2 3 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 709 0 0
"3109" "exp3" 2 4 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 684 0 0
"3109" "exp3" 2 5 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 875 33 1
"3109" "exp3" 2 6 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 686 0 0
"3109" "exp3" 2 7 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 982 14 1
"3109" "exp3" 2 8 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 610 31 1
"3109" "exp3" 2 9 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 935 17 1
"3109" "exp3" 2 10 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 612 0 0
"3109" "exp3" 2 11 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 562 0 0
"3109" "exp3" 2 12 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 640 35 1
"3109" "exp3" 2 13 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 601 0 0
"3109" "exp3" 2 14 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 666 5 1
"3109" "exp3" 2 15 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 563 4 1
"3109" "exp3" 2 16 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1183 0 0
"3109" "exp3" 2 17 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 671 0 0
"3109" "exp3" 2 18 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 545 45 1
"3109" "exp3" 2 19 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 824 42 1
"3109" "exp3" 2 20 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1043 13 1
"3109" "exp3" 2 21 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1243 19 1
"3109" "exp3" 2 22 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 870 0 0
"3109" "exp3" 2 23 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 847 3 1
"3109" "exp3" 2 24 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1130 19 1
"3109" "exp3" 2 25 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 819 18 1
"3109" "exp3" 2 26 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1410 17 1
"3109" "exp3" 2 27 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 872 1 1
"3109" "exp3" 2 28 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1320 5 1
"3109" "exp3" 2 29 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 632 0 0
"3109" "exp3" 2 30 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 890 12 1
"3109" "exp3" 2 31 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 842 19 1
"3109" "exp3" 2 32 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 946 31 1
"3109" "exp3" 2 33 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 687 30 1
"3109" "exp3" 2 34 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 979 33 1
"3109" "exp3" 2 35 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 1342 61 1
"3109" "exp3" 2 36 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 879 0 0
"3109" "exp3" 2 37 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1066 0 0
"3109" "exp3" 2 38 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 726 9 1
"3109" "exp3" 2 39 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1128 24 1
"3109" "exp3" 2 40 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 919 73 1
"3109" "exp3" 2 41 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1027 0 0
"3109" "exp3" 2 42 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 719 10 1
"3109" "exp3" 2 43 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 776 12 1
"3109" "exp3" 2 44 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 661 40 1
"3109" "exp3" 2 45 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 959 0 0
"3109" "exp3" 2 46 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 658 7 1
"3109" "exp3" 2 47 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 731 19 1
"3109" "exp3" 2 48 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1314 13 1
"3109" "exp3" 2 49 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 862 77 1
"3109" "exp3" 2 50 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 918 0 0
"3109" "exp3" 2 51 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 952 0 0
"3109" "exp3" 2 52 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 740 68 1
"3109" "exp3" 2 53 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1165 8 1
"3109" "exp3" 2 54 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 988 0 0
"3109" "exp3" 2 55 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 767 27 1
"3109" "exp3" 2 56 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 845 76 1
"3109" "exp3" 2 57 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 845 51 1
"3109" "exp3" 2 58 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 925 26 1
"3109" "exp3" 2 59 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 785 0 0
"3109" "exp3" 2 60 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 656 18 1
"3109" "exp3" 2 61 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 796 0 0
"3109" "exp3" 2 62 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 854 16 1
"3109" "exp3" 2 63 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1021 32 1
"3109" "exp3" 2 64 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 981 20 1
"3109" "exp3" 2 65 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 924 37 1
"3109" "exp3" 2 66 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 1300 0 0
"3109" "exp3" 2 67 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 887 60 1
"3109" "exp3" 2 68 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1477 15 1
"3109" "exp3" 2 69 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 904 39 1
"3109" "exp3" 2 70 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 901 8 1
"3109" "exp3" 2 71 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 755 25 1
"3109" "exp3" 2 72 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 958 71 1
"3109" "exp3" 2 73 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 830 14 1
"3109" "exp3" 2 74 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 638 10 1
"3109" "exp3" 2 75 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 526 13 1
"3109" "exp3" 2 76 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 640 15 1
"3109" "exp3" 2 77 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 900 22 1
"3109" "exp3" 2 78 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1076 22 1
"3109" "exp3" 2 79 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 950 0 0
"3109" "exp3" 2 80 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 910 29 1
"3109" "exp3" 2 81 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 786 0 0
"3109" "exp3" 2 82 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 899 0 0
"3109" "exp3" 2 83 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 934 18 1
"3109" "exp3" 2 84 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 722 0 0
"3109" "exp3" 2 85 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1075 11 1
"3109" "exp3" 2 86 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 836 67 1
"3109" "exp3" 2 87 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 884 2 1
"3109" "exp3" 2 88 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 697 23 1
"3109" "exp3" 2 89 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 843 71 1
"3109" "exp3" 2 90 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 924 0 0
"3109" "exp3" 2 91 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 620 17 1
"3109" "exp3" 2 92 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 766 48 1
"3109" "exp3" 2 93 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 805 0 0
"3109" "exp3" 2 94 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 919 11 1
"3109" "exp3" 2 95 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 654 0 0
"3109" "exp3" 2 96 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1098 29 1
"3109" "exp3" 2 97 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1023 0 0
"3109" "exp3" 2 98 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 970 75 1
"3109" "exp3" 2 99 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 973 24 1
"3109" "exp3" 2 100 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 847 42 1
"3109" "exp3" 2 101 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 946 0 0
"3109" "exp3" 2 102 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1192 20 1
"3109" "exp3" 2 103 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 1221 0 0
"3109" "exp3" 2 104 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 892 66 1
"3109" "exp3" 2 105 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 878 21 1
"3109" "exp3" 2 106 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1136 0 0
"3109" "exp3" 2 107 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1004 30 1
"3109" "exp3" 2 108 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 688 0 0
"3109" "exp3" 2 109 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1073 22 1
"3109" "exp3" 2 110 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1484 0 0
"3109" "exp3" 2 111 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 931 21 1
"3109" "exp3" 2 112 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 837 27 1
"3109" "exp3" 2 113 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 904 7 1
"3109" "exp3" 2 114 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1093 34 1
"3109" "exp3" 2 115 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 952 0 0
"3109" "exp3" 2 116 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 694 9 1
"3109" "exp3" 2 117 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1057 65 1
"3109" "exp3" 2 118 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1273 25 1
"3109" "exp3" 2 119 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 1138 55 1
"3109" "exp3" 2 120 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1319 0 0
"3109" "exp3" 2 121 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 747 0 0
"3109" "exp3" 2 122 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 861 38 1
"3109" "exp3" 2 123 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 804 0 0
"3109" "exp3" 2 124 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 760 0 0
"3109" "exp3" 2 125 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1090 0 0
"3109" "exp3" 2 126 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1249 0 0
"3109" "exp3" 2 127 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 1181 0 0
"3109" "exp3" 2 128 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 905 24 1
"3109" "exp3" 2 129 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 713 14 1
"3109" "exp3" 2 130 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1247 0 0
"3109" "exp3" 2 131 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1817 0 0
"3109" "exp3" 2 132 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 679 6 1
"3109" "exp3" 1 1 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 482 6 1
"3109" "exp3" 1 2 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 547 0 0
"3109" "exp3" 1 3 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 514 19 1
"3109" "exp3" 1 4 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 866 25 1
"3109" "exp3" 1 5 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 594 0 0
"3109" "exp3" 1 6 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 656 44 1
"3109" "exp3" 1 7 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 778 8 1
"3109" "exp3" 1 8 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 611 41 1
"3109" "exp3" 1 9 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1314 0 0
"3109" "exp3" 1 10 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 480 5 1
"3109" "exp3" 1 11 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 668 41 1
"3109" "exp3" 1 12 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 597 0 0
"3109" "exp3" 1 13 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 646 7 1
"3109" "exp3" 1 14 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 672 0 0
"3109" "exp3" 1 15 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 693 16 1
"3109" "exp3" 1 16 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 616 20 1
"3109" "exp3" 1 17 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 596 0 0
"3109" "exp3" 1 18 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 850 0 0
"3109" "exp3" 1 19 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 605 0 0
"3109" "exp3" 1 20 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 753 20 1
"3109" "exp3" 1 21 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 679 14 1
"3109" "exp3" 1 22 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 715 23 1
"3109" "exp3" 1 23 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 771 29 1
"3109" "exp3" 1 24 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1202 4 1
"3109" "exp3" 1 25 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 638 22 1
"3109" "exp3" 1 26 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 819 13 1
"3109" "exp3" 1 27 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 680 0 0
"3109" "exp3" 1 28 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 801 28 1
"3109" "exp3" 1 29 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 837 10 1
"3109" "exp3" 1 30 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 543 3 1
"3109" "exp3" 1 31 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 663 39 1
"3109" "exp3" 1 32 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 749 5 1
"3109" "exp3" 1 33 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 602 18 1
"3109" "exp3" 1 34 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 994 26 1
"3109" "exp3" 1 35 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 756 0 0
"3109" "exp3" 1 36 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1555 18 1
"3109" "exp3" 1 37 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1128 7 1
"3109" "exp3" 1 38 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 765 2 1
"3109" "exp3" 1 39 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 605 10 1
"3109" "exp3" 1 40 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 782 26 1
"3109" "exp3" 1 41 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 695 0 0
"3109" "exp3" 1 42 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 897 30 1
"3109" "exp3" 1 43 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 822 0 0
"3109" "exp3" 1 44 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 938 13 1
"3109" "exp3" 1 45 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 778 8 1
"3109" "exp3" 1 46 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 661 0 0
"3109" "exp3" 1 47 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 681 35 1
"3109" "exp3" 1 48 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 580 42 1
"3109" "exp3" 1 49 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 819 0 0
"3109" "exp3" 1 50 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 988 0 0
"3109" "exp3" 1 51 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 901 32 1
"3109" "exp3" 1 52 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 897 0 0
"3109" "exp3" 1 53 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 668 12 1
"3109" "exp3" 1 54 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 544 19 1
"3109" "exp3" 1 55 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 664 30 1
"3109" "exp3" 1 56 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 583 34 1
"3109" "exp3" 1 57 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 546 0 0
"3109" "exp3" 1 58 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 531 49 1
"3109" "exp3" 1 59 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 650 36 1
"3109" "exp3" 1 60 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 801 0 0
"3109" "exp3" 1 61 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 986 33 1
"3109" "exp3" 1 62 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 698 6 1
"3109" "exp3" 1 63 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1069 0 0
"3109" "exp3" 1 64 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 643 17 1
"3109" "exp3" 1 65 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 664 0 0
"3109" "exp3" 1 66 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 994 43 1
"3109" "exp3" 1 67 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 713 23 1
"3109" "exp3" 1 68 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 677 24 1
"3109" "exp3" 1 69 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 425 24 1
"3109" "exp3" 1 70 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 514 19 1
"3109" "exp3" 1 71 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 602 40 1
"3109" "exp3" 1 72 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 713 35 1
"3109" "exp3" 1 73 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 575 0 0
"3109" "exp3" 1 74 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 686 11 1
"3109" "exp3" 1 75 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 578 0 0
"3109" "exp3" 1 76 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 601 18 1
"3109" "exp3" 1 77 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 657 0 0
"3109" "exp3" 1 78 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 648 0 0
"3109" "exp3" 1 79 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 556 0 0
"3109" "exp3" 1 80 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 652 14 1
"3109" "exp3" 1 81 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 766 38 1
"3109" "exp3" 1 82 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 633 0 0
"3109" "exp3" 1 83 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 498 1 1
"3109" "exp3" 1 84 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 775 0 0
"3109" "exp3" 1 85 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 711 27 1
"3109" "exp3" 1 86 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 775 0 0
"3109" "exp3" 1 87 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 922 35 1
"3109" "exp3" 1 88 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 925 11 1
"3109" "exp3" 1 89 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 757 0 0
"3109" "exp3" 1 90 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1046 53 1
"3109" "exp3" 1 91 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 829 27 1
"3109" "exp3" 1 92 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 741 29 1
"3109" "exp3" 1 93 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 2033 0 0
"3109" "exp3" 1 94 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 935 27 1
"3109" "exp3" 1 95 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 685 16 1
"3109" "exp3" 1 96 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 658 16 1
"3109" "exp3" 1 97 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 974 28 1
"3109" "exp3" 1 98 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1751 0 0
"3109" "exp3" 1 99 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 2447 23 1
"3109" "exp3" 1 100 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 3513 0 0
"3109" "exp3" 1 101 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1913 0 0
"3109" "exp3" 1 102 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 3494 27 1
"3109" "exp3" 1 103 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1099 21 1
"3109" "exp3" 1 104 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 909 24 1
"3109" "exp3" 1 105 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 856 0 0
"3109" "exp3" 1 106 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 891 30 1
"3109" "exp3" 1 107 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1253 36 1
"3109" "exp3" 1 108 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1079 21 1
"3109" "exp3" 1 109 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 739 24 1
"3109" "exp3" 1 110 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 632 14 1
"3109" "exp3" 1 111 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 647 0 0
"3109" "exp3" 1 112 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 734 0 0
"3109" "exp3" 1 113 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 681 0 0
"3109" "exp3" 1 114 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 783 33 1
"3109" "exp3" 1 115 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1228 17 1
"3109" "exp3" 1 116 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 796 43 1
"3109" "exp3" 1 117 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 717 48 1
"3109" "exp3" 1 118 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1121 32 1
"3109" "exp3" 1 119 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 693 21 1
"3109" "exp3" 1 120 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 652 28 1
"3109" "exp3" 1 121 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 594 34 1
"3109" "exp3" 1 122 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 636 9 1
"3109" "exp3" 1 123 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 593 25 1
"3109" "exp3" 1 124 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 509 0 0
"3109" "exp3" 1 125 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 800 31 1
"3109" "exp3" 1 126 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 793 0 0
"3109" "exp3" 1 127 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 583 33 1
"3109" "exp3" 1 128 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 594 22 1
"3109" "exp3" 1 129 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 477 33 1
"3109" "exp3" 1 130 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 577 17 1
"3109" "exp3" 1 131 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 720 0 0
"3109" "exp3" 1 132 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 572 32 1
"3109" "exp3" 2 1 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 505 31 1
"3109" "exp3" 2 2 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 734 0 0
"3109" "exp3" 2 3 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 551 47 1
"3109" "exp3" 2 4 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 610 0 0
"3109" "exp3" 2 5 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 651 11 1
"3109" "exp3" 2 6 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 528 38 1
"3109" "exp3" 2 7 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 543 22 1
"3109" "exp3" 2 8 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 555 23 1
"3109" "exp3" 2 9 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 540 0 0
"3109" "exp3" 2 10 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 602 20 1
"3109" "exp3" 2 11 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 575 44 1
"3109" "exp3" 2 12 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 592 0 0
"3109" "exp3" 2 13 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 680 39 1
"3109" "exp3" 2 14 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 440 7 1
"3109" "exp3" 2 15 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 545 36 1
"3109" "exp3" 2 16 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 640 0 0
"3109" "exp3" 2 17 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 521 0 0
"3109" "exp3" 2 18 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 562 20 1
"3109" "exp3" 2 19 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 684 42 1
"3109" "exp3" 2 20 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 522 16 1
"3109" "exp3" 2 21 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 566 6 1
"3109" "exp3" 2 22 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 546 29 1
"3109" "exp3" 2 23 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 862 0 0
"3109" "exp3" 2 24 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1150 29 1
"3109" "exp3" 2 25 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1260 27 1
"3109" "exp3" 2 26 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 678 35 1
"3109" "exp3" 2 27 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 674 33 1
"3109" "exp3" 2 28 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 777 9 1
"3109" "exp3" 2 29 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1198 20 1
"3109" "exp3" 2 30 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 639 17 1
"3109" "exp3" 2 31 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 744 24 1
"3109" "exp3" 2 32 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2010 30 1
"3109" "exp3" 2 33 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 800 33 1
"3109" "exp3" 2 34 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 603 0 0
"3109" "exp3" 2 35 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 595 43 1
"3109" "exp3" 2 36 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 867 29 1
"3109" "exp3" 2 37 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 544 0 0
"3109" "exp3" 2 38 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 636 24 1
"3109" "exp3" 2 39 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 563 14 1
"3109" "exp3" 2 40 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 776 0 0
"3109" "exp3" 2 41 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 960 26 1
"3109" "exp3" 2 42 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1405 33 1
"3109" "exp3" 2 43 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1252 5 1
"3109" "exp3" 2 44 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 2096 13 1
"3109" "exp3" 2 45 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1349 37 1
"3109" "exp3" 2 46 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1460 26 1
"3109" "exp3" 2 47 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 891 15 1
"3109" "exp3" 2 48 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 862 19 1
"3109" "exp3" 2 49 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 703 3 1
"3109" "exp3" 2 50 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 968 27 1
"3109" "exp3" 2 51 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1063 0 0
"3109" "exp3" 2 52 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 678 30 1
"3109" "exp3" 2 53 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1132 0 0
"3109" "exp3" 2 54 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 650 6 1
"3109" "exp3" 2 55 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 691 19 1
"3109" "exp3" 2 56 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 738 0 0
"3109" "exp3" 2 57 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 871 21 1
"3109" "exp3" 2 58 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 668 31 1
"3109" "exp3" 2 59 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 715 0 0
"3109" "exp3" 2 60 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 547 13 1
"3109" "exp3" 2 61 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 497 40 1
"3109" "exp3" 2 62 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 537 28 1
"3109" "exp3" 2 63 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 554 0 0
"3109" "exp3" 2 64 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 663 49 1
"3109" "exp3" 2 65 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 523 0 0
"3109" "exp3" 2 66 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 909 0 0
"3109" "exp3" 2 67 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 530 17 1
"3109" "exp3" 2 68 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 556 15 1
"3109" "exp3" 2 69 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 531 16 1
"3109" "exp3" 2 70 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 623 0 0
"3109" "exp3" 2 71 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 964 21 1
"3109" "exp3" 2 72 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 617 19 1
"3109" "exp3" 2 73 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 620 0 0
"3109" "exp3" 2 74 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 523 11 1
"3109" "exp3" 2 75 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 538 8 1
"3109" "exp3" 2 76 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 583 26 1
"3109" "exp3" 2 77 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 456 27 1
"3109" "exp3" 2 78 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 696 18 1
"3109" "exp3" 2 79 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 615 27 1
"3109" "exp3" 2 80 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 726 17 1
"3109" "exp3" 2 81 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 895 0 0
"3109" "exp3" 2 82 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 544 2 1
"3109" "exp3" 2 83 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 479 23 1
"3109" "exp3" 2 84 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 483 14 1
"3109" "exp3" 2 85 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 556 0 0
"3109" "exp3" 2 86 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 493 1 1
"3109" "exp3" 2 87 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 504 16 1
"3109" "exp3" 2 88 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 718 19 1
"3109" "exp3" 2 89 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 793 46 1
"3109" "exp3" 2 90 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 653 30 1
"3109" "exp3" 2 91 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 617 23 1
"3109" "exp3" 2 92 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 549 14 1
"3109" "exp3" 2 93 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 521 7 1
"3109" "exp3" 2 94 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 465 18 1
"3109" "exp3" 2 95 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 625 28 1
"3109" "exp3" 2 96 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 555 0 0
"3109" "exp3" 2 97 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 541 0 0
"3109" "exp3" 2 98 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 516 22 1
"3109" "exp3" 2 99 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 629 41 1
"3109" "exp3" 2 100 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 588 18 1
"3109" "exp3" 2 101 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 598 34 1
"3109" "exp3" 2 102 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 541 21 1
"3109" "exp3" 2 103 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 562 0 0
"3109" "exp3" 2 104 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 620 37 1
"3109" "exp3" 2 105 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 484 25 1
"3109" "exp3" 2 106 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 483 13 1
"3109" "exp3" 2 107 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 556 0 0
"3109" "exp3" 2 108 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 648 32 1
"3109" "exp3" 2 109 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 510 10 1
"3109" "exp3" 2 110 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 485 41 1
"3109" "exp3" 2 111 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 572 0 0
"3109" "exp3" 2 112 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 544 22 1
"3109" "exp3" 2 113 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 539 0 0
"3109" "exp3" 2 114 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 603 34 1
"3109" "exp3" 2 115 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 546 25 1
"3109" "exp3" 2 116 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 689 43 1
"3109" "exp3" 2 117 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 623 0 0
"3109" "exp3" 2 118 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 509 0 0
"3109" "exp3" 2 119 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 519 0 0
"3109" "exp3" 2 120 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 568 0 0
"3109" "exp3" 2 121 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 737 32 1
"3109" "exp3" 2 122 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 497 0 0
"3109" "exp3" 2 123 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 653 37 1
"3109" "exp3" 2 124 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 514 10 1
"3109" "exp3" 2 125 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 481 18 1
"3109" "exp3" 2 126 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 421 17 1
"3109" "exp3" 2 127 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 549 30 1
"3109" "exp3" 2 128 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 457 12 1
"3109" "exp3" 2 129 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 517 0 0
"3109" "exp3" 2 130 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 535 0 0
"3109" "exp3" 2 131 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 668 20 1
"3109" "exp3" 2 132 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 477 33 1
"3109" "exp3" 1 1 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 378 31 1
"3109" "exp3" 1 2 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 337 1 1
"3109" "exp3" 1 3 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 514 16 1
"3109" "exp3" 1 4 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 395 0 0
"3109" "exp3" 1 5 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 455 28 1
"3109" "exp3" 1 6 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 510 19 1
"3109" "exp3" 1 7 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 411 22 1
"3109" "exp3" 1 8 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 800 15 1
"3109" "exp3" 1 9 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 527 18 1
"3109" "exp3" 1 10 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 438 11 1
"3109" "exp3" 1 11 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 598 0 0
"3109" "exp3" 1 12 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 455 0 0
"3109" "exp3" 1 13 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 426 0 0
"3109" "exp3" 1 14 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 387 0 0
"3109" "exp3" 1 15 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 598 0 0
"3109" "exp3" 1 16 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 773 0 0
"3109" "exp3" 1 17 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 417 32 1
"3109" "exp3" 1 18 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 536 37 1
"3109" "exp3" 1 19 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 428 0 0
"3109" "exp3" 1 20 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 440 0 0
"3109" "exp3" 1 21 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 418 8 1
"3109" "exp3" 1 22 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 786 0 0
"3109" "exp3" 1 23 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 466 15 1
"3109" "exp3" 1 24 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 767 0 0
"3109" "exp3" 1 25 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 492 25 1
"3109" "exp3" 1 26 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 541 0 0
"3109" "exp3" 1 27 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 503 20 1
"3109" "exp3" 1 28 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 699 0 0
"3109" "exp3" 1 29 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 754 0 0
"3109" "exp3" 1 30 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 392 43 1
"3109" "exp3" 1 31 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 399 16 1
"3109" "exp3" 1 32 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 591 0 0
"3109" "exp3" 1 33 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 857 0 0
"3109" "exp3" 1 34 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 569 17 1
"3109" "exp3" 1 35 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 447 34 1
"3109" "exp3" 1 36 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 494 27 1
"3109" "exp3" 1 37 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 445 44 1
"3109" "exp3" 1 38 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 463 16 1
"3109" "exp3" 1 39 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 339 5 1
"3109" "exp3" 1 40 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 417 17 1
"3109" "exp3" 1 41 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 396 36 1
"3109" "exp3" 1 42 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 408 26 1
"3109" "exp3" 1 43 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 442 2 1
"3109" "exp3" 1 44 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 390 17 1
"3109" "exp3" 1 45 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 427 49 1
"3109" "exp3" 1 46 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 412 29 1
"3109" "exp3" 1 47 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 726 33 1
"3109" "exp3" 1 48 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 316 23 1
"3109" "exp3" 1 49 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 527 28 1
"3109" "exp3" 1 50 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 569 11 1
"3109" "exp3" 1 51 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 432 0 0
"3109" "exp3" 1 52 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 368 25 1
"3109" "exp3" 1 53 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 349 0 0
"3109" "exp3" 1 54 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 631 47 1
"3109" "exp3" 1 55 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 414 33 1
"3109" "exp3" 1 56 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 390 31 1
"3109" "exp3" 1 57 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 447 0 0
"3109" "exp3" 1 58 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 419 37 1
"3109" "exp3" 1 59 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 446 38 1
"3109" "exp3" 1 60 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 498 0 0
"3109" "exp3" 1 61 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 475 22 1
"3109" "exp3" 1 62 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 423 9 1
"3109" "exp3" 1 63 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 948 15 1
"3109" "exp3" 1 64 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 439 19 1
"3109" "exp3" 1 65 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 433 6 1
"3109" "exp3" 1 66 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 370 5 1
"3109" "exp3" 1 67 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 372 9 1
"3109" "exp3" 1 68 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 580 0 0
"3109" "exp3" 1 69 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 416 0 0
"3109" "exp3" 1 70 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 443 32 1
"3109" "exp3" 1 71 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 587 10 1
"3109" "exp3" 1 72 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 430 13 1
"3109" "exp3" 1 73 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 431 22 1
"3109" "exp3" 1 74 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 490 12 1
"3109" "exp3" 1 75 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 504 0 0
"3109" "exp3" 1 76 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 416 30 1
"3109" "exp3" 1 77 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 523 32 1
"3109" "exp3" 1 78 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 514 18 1
"3109" "exp3" 1 79 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 513 13 1
"3109" "exp3" 1 80 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 408 0 0
"3109" "exp3" 1 81 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 463 0 0
"3109" "exp3" 1 82 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 939 21 1
"3109" "exp3" 1 83 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 454 0 0
"3109" "exp3" 1 84 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 2424 24 1
"3109" "exp3" 1 85 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 450 21 1
"3109" "exp3" 1 86 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 664 4 1
"3109" "exp3" 1 87 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 601 0 0
"3109" "exp3" 1 88 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 452 0 0
"3109" "exp3" 1 89 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 390 18 1
"3109" "exp3" 1 90 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 360 0 0
"3109" "exp3" 1 91 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 439 36 1
"3109" "exp3" 1 92 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 412 14 1
"3109" "exp3" 1 93 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 500 0 0
"3109" "exp3" 1 94 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 416 0 0
"3109" "exp3" 1 95 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 372 19 1
"3109" "exp3" 1 96 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 382 24 1
"3109" "exp3" 1 97 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 318 0 0
"3109" "exp3" 1 98 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 465 0 0
"3109" "exp3" 1 99 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 330 3 1
"3109" "exp3" 1 100 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 449 14 1
"3109" "exp3" 1 101 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 346 20 1
"3109" "exp3" 1 102 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 429 13 1
"3109" "exp3" 1 103 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 459 35 1
"3109" "exp3" 1 104 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 367 6 1
"3109" "exp3" 1 105 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 493 26 1
"3109" "exp3" 1 106 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 404 12 1
"3109" "exp3" 1 107 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 389 27 1
"3109" "exp3" 1 108 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 337 0 0
"3109" "exp3" 1 109 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 454 7 1
"3109" "exp3" 1 110 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 509 45 1
"3109" "exp3" 1 111 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 551 26 1
"3109" "exp3" 1 112 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 787 19 1
"3109" "exp3" 1 113 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 403 28 1
"3109" "exp3" 1 114 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 507 0 0
"3109" "exp3" 1 115 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 378 24 1
"3109" "exp3" 1 116 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 596 34 1
"3109" "exp3" 1 117 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 510 25 1
"3109" "exp3" 1 118 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 379 42 1
"3109" "exp3" 1 119 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 387 35 1
"3109" "exp3" 1 120 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 408 0 0
"3109" "exp3" 1 121 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 432 20 1
"3109" "exp3" 1 122 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 389 0 0
"3109" "exp3" 1 123 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 334 36 1
"3109" "exp3" 1 124 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 374 21 1
"3109" "exp3" 1 125 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 419 33 1
"3109" "exp3" 1 126 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 430 14 1
"3109" "exp3" 1 127 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 418 35 1
"3109" "exp3" 1 128 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 412 8 1
"3109" "exp3" 1 129 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 465 27 1
"3109" "exp3" 1 130 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 585 0 0
"3109" "exp3" 1 131 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 410 0 0
"3109" "exp3" 1 132 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 454 24 1
"3109" "exp3" 2 1 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 400 0 0
"3109" "exp3" 2 2 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 362 31 1
"3109" "exp3" 2 3 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 388 34 1
"3109" "exp3" 2 4 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 430 45 1
"3109" "exp3" 2 5 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 330 33 1
"3109" "exp3" 2 6 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 433 49 1
"3109" "exp3" 2 7 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 368 0 0
"3109" "exp3" 2 8 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 364 29 1
"3109" "exp3" 2 9 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 361 33 1
"3109" "exp3" 2 10 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 428 34 1
"3109" "exp3" 2 11 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 337 27 1
"3109" "exp3" 2 12 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 395 42 1
"3109" "exp3" 2 13 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 467 14 1
"3109" "exp3" 2 14 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 391 0 0
"3109" "exp3" 2 15 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 418 0 0
"3109" "exp3" 2 16 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 382 16 1
"3109" "exp3" 2 17 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 434 70 1
"3109" "exp3" 2 18 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 424 15 1
"3109" "exp3" 2 19 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 377 25 1
"3109" "exp3" 2 20 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 430 19 1
"3109" "exp3" 2 21 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 528 0 0
"3109" "exp3" 2 22 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 685 19 1
"3109" "exp3" 2 23 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 460 20 1
"3109" "exp3" 2 24 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 445 0 0
"3109" "exp3" 2 25 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 511 43 1
"3109" "exp3" 2 26 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 441 19 1
"3109" "exp3" 2 27 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 540 43 1
"3109" "exp3" 2 28 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1280 13 1
"3109" "exp3" 2 29 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 577 0 0
"3109" "exp3" 2 30 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 485 20 1
"3109" "exp3" 2 31 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 400 0 0
"3109" "exp3" 2 32 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 424 0 0
"3109" "exp3" 2 33 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 391 22 1
"3109" "exp3" 2 34 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 377 1 1
"3109" "exp3" 2 35 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 399 2 1
"3109" "exp3" 2 36 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 437 6 1
"3109" "exp3" 2 37 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 458 30 1
"3109" "exp3" 2 38 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 506 0 0
"3109" "exp3" 2 39 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 433 21 1
"3109" "exp3" 2 40 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 456 21 1
"3109" "exp3" 2 41 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 418 27 1
"3109" "exp3" 2 42 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 850 0 0
"3109" "exp3" 2 43 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1966 0 0
"3109" "exp3" 2 44 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 885 24 1
"3109" "exp3" 2 45 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1219 0 0
"3109" "exp3" 2 46 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1948 40 1
"3109" "exp3" 2 47 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 954 16 1
"3109" "exp3" 2 48 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 643 20 1
"3109" "exp3" 2 49 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 385 24 1
"3109" "exp3" 2 50 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1004 29 1
"3109" "exp3" 2 51 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 780 32 1
"3109" "exp3" 2 52 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1082 17 1
"3109" "exp3" 2 53 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1033 0 0
"3109" "exp3" 2 54 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 796 67 1
"3109" "exp3" 2 55 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 558 0 0
"3109" "exp3" 2 56 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 568 12 1
"3109" "exp3" 2 57 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 656 22 1
"3109" "exp3" 2 58 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 633 25 1
"3109" "exp3" 2 59 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 834 0 0
"3109" "exp3" 2 60 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 976 22 1
"3109" "exp3" 2 61 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 716 35 1
"3109" "exp3" 2 62 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 727 8 1
"3109" "exp3" 2 63 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 685 11 1
"3109" "exp3" 2 64 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 488 0 0
"3109" "exp3" 2 65 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1214 0 0
"3109" "exp3" 2 66 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 794 18 1
"3109" "exp3" 2 67 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 485 23 1
"3109" "exp3" 2 68 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 397 11 1
"3109" "exp3" 2 69 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 439 9 1
"3109" "exp3" 2 70 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 401 15 1
"3109" "exp3" 2 71 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 600 36 1
"3109" "exp3" 2 72 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 374 16 1
"3109" "exp3" 2 73 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 659 68 1
"3109" "exp3" 2 74 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 623 0 0
"3109" "exp3" 2 75 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 448 25 1
"3109" "exp3" 2 76 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 442 26 1
"3109" "exp3" 2 77 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 406 0 0
"3109" "exp3" 2 78 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 400 33 1
"3109" "exp3" 2 79 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 747 0 0
"3109" "exp3" 2 80 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 504 15 1
"3109" "exp3" 2 81 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 427 42 1
"3109" "exp3" 2 82 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 541 8 1
"3109" "exp3" 2 83 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 626 24 1
"3109" "exp3" 2 84 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 630 17 1
"3109" "exp3" 2 85 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 521 17 1
"3109" "exp3" 2 86 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 547 17 1
"3109" "exp3" 2 87 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 701 0 0
"3109" "exp3" 2 88 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 667 35 1
"3109" "exp3" 2 89 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 464 0 0
"3109" "exp3" 2 90 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 439 22 1
"3109" "exp3" 2 91 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 669 29 1
"3109" "exp3" 2 92 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 627 40 1
"3109" "exp3" 2 93 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 537 44 1
"3109" "exp3" 2 94 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 552 0 0
"3109" "exp3" 2 95 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 493 0 0
"3109" "exp3" 2 96 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 508 41 1
"3109" "exp3" 2 97 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 441 13 1
"3109" "exp3" 2 98 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 390 20 1
"3109" "exp3" 2 99 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 459 0 0
"3109" "exp3" 2 100 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 602 0 0
"3109" "exp3" 2 101 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 472 0 0
"3109" "exp3" 2 102 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 367 0 0
"3109" "exp3" 2 103 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 498 38 1
"3109" "exp3" 2 104 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 417 26 1
"3109" "exp3" 2 105 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 542 19 1
"3109" "exp3" 2 106 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 396 0 0
"3109" "exp3" 2 107 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 498 26 1
"3109" "exp3" 2 108 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 403 0 0
"3109" "exp3" 2 109 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 413 27 1
"3109" "exp3" 2 110 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 609 23 1
"3109" "exp3" 2 111 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 464 7 1
"3109" "exp3" 2 112 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 417 5 1
"3109" "exp3" 2 113 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 1061 54 1
"3109" "exp3" 2 114 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 820 25 1
"3109" "exp3" 2 115 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 443 29 1
"3109" "exp3" 2 116 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 405 28 1
"3109" "exp3" 2 117 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 637 0 0
"3109" "exp3" 2 118 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 536 0 0
"3109" "exp3" 2 119 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 450 7 1
"3109" "exp3" 2 120 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 542 0 0
"3109" "exp3" 2 121 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 630 0 0
"3109" "exp3" 2 122 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 471 0 0
"3109" "exp3" 2 123 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 510 31 1
"3109" "exp3" 2 124 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 426 37 1
"3109" "exp3" 2 125 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 428 4 1
"3109" "exp3" 2 126 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 446 9 1
"3109" "exp3" 2 127 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 412 18 1
"3109" "exp3" 2 128 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 413 21 1
"3109" "exp3" 2 129 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 428 23 1
"3109" "exp3" 2 130 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 384 38 1
"3109" "exp3" 2 131 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 474 26 1
"3109" "exp3" 2 132 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 422 18 1
"3201" "exp3" 1 1 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 3647 15 1
"3201" "exp3" 1 2 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2075 0 0
"3201" "exp3" 1 3 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 2138 43 1
"3201" "exp3" 1 4 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1252 0 0
"3201" "exp3" 1 5 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1535 0 0
"3201" "exp3" 1 6 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 2161 21 1
"3201" "exp3" 1 7 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1119 15 1
"3201" "exp3" 1 8 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1810 0 0
"3201" "exp3" 1 9 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1982 9 1
"3201" "exp3" 1 10 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1124 0 0
"3201" "exp3" 1 11 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1286 32 1
"3201" "exp3" 1 12 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1248 29 1
"3201" "exp3" 1 13 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 3457 47 1
"3201" "exp3" 1 14 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1451 0 0
"3201" "exp3" 1 15 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1308 0 0
"3201" "exp3" 1 16 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 3362 3 1
"3201" "exp3" 1 17 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1277 24 1
"3201" "exp3" 1 18 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1087 15 1
"3201" "exp3" 1 19 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1458 0 0
"3201" "exp3" 1 20 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 898 13 1
"3201" "exp3" 1 21 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1787 39 1
"3201" "exp3" 1 22 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1319 29 1
"3201" "exp3" 1 23 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1161 17 1
"3201" "exp3" 1 24 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1028 0 0
"3201" "exp3" 1 25 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 824 0 0
"3201" "exp3" 1 26 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1683 32 1
"3201" "exp3" 1 27 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1304 0 0
"3201" "exp3" 1 28 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1913 0 0
"3201" "exp3" 1 29 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1064 34 1
"3201" "exp3" 1 30 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 2408 30 1
"3201" "exp3" 1 31 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1116 13 1
"3201" "exp3" 1 32 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1787 38 1
"3201" "exp3" 1 33 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1045 10 1
"3201" "exp3" 1 34 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 938 22 1
"3201" "exp3" 1 35 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 956 17 1
"3201" "exp3" 1 36 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 760 26 1
"3201" "exp3" 1 37 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 992 20 1
"3201" "exp3" 1 38 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1067 35 1
"3201" "exp3" 1 39 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1098 30 1
"3201" "exp3" 1 40 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 718 0 0
"3201" "exp3" 1 41 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 848 11 1
"3201" "exp3" 1 42 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 930 21 1
"3201" "exp3" 1 43 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 826 26 1
"3201" "exp3" 1 44 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 3675 24 1
"3201" "exp3" 1 45 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 794 19 1
"3201" "exp3" 1 46 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 961 0 0
"3201" "exp3" 1 47 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 2717 0 0
"3201" "exp3" 1 48 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1413 0 0
"3201" "exp3" 1 49 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1442 0 0
"3201" "exp3" 1 50 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 2364 0 0
"3201" "exp3" 1 51 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 2361 0 0
"3201" "exp3" 1 52 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 2178 0 0
"3201" "exp3" 1 53 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 850 0 0
"3201" "exp3" 1 54 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1970 0 0
"3201" "exp3" 1 55 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 2148 0 0
"3201" "exp3" 1 56 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 3698 0 0
"3201" "exp3" 1 57 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1262 33 1
"3201" "exp3" 1 58 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1605 0 0
"3201" "exp3" 1 59 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1659 22 1
"3201" "exp3" 1 60 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 2308 59 1
"3201" "exp3" 1 61 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 3923 16 1
"3201" "exp3" 1 62 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1700 99 1
"3201" "exp3" 1 63 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 3449 52 1
"3201" "exp3" 1 64 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1733 0 0
"3201" "exp3" 1 65 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1903 26 1
"3201" "exp3" 1 66 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 2295 0 0
"3201" "exp3" 1 67 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1478 37 1
"3201" "exp3" 1 68 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 2244 25 1
"3201" "exp3" 1 69 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 912 18 1
"3201" "exp3" 1 70 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 690 20 1
"3201" "exp3" 1 71 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1526 44 1
"3201" "exp3" 1 72 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1260 0 0
"3201" "exp3" 1 73 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1413 0 0
"3201" "exp3" 1 74 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1110 89 1
"3201" "exp3" 1 75 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 858 0 0
"3201" "exp3" 1 76 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1359 0 0
"3201" "exp3" 1 77 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1016 0 0
"3201" "exp3" 1 78 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1431 0 0
"3201" "exp3" 1 79 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 4356 31 1
"3201" "exp3" 1 80 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1978 0 0
"3201" "exp3" 1 81 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1620 33 1
"3201" "exp3" 1 82 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1961 0 0
"3201" "exp3" 1 83 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 1683 77 1
"3201" "exp3" 1 84 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 2108 0 0
"3201" "exp3" 1 85 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1953 73 1
"3201" "exp3" 1 86 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 2678 0 0
"3201" "exp3" 1 87 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1359 0 0
"3201" "exp3" 1 88 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1401 25 1
"3201" "exp3" 1 89 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1607 32 1
"3201" "exp3" 1 90 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 2344 0 0
"3201" "exp3" 1 91 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1981 66 1
"3201" "exp3" 1 92 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2236 0 0
"3201" "exp3" 1 93 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1569 0 0
"3201" "exp3" 1 94 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1809 69 1
"3201" "exp3" 1 95 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 4738 0 0
"3201" "exp3" 1 96 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1092 0 0
"3201" "exp3" 1 97 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1506 0 0
"3201" "exp3" 1 98 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1020 0 0
"3201" "exp3" 1 99 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 1104 0 0
"3201" "exp3" 1 100 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 812 0 0
"3201" "exp3" 1 101 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1186 0 0
"3201" "exp3" 1 102 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 1007 0 0
"3201" "exp3" 1 103 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 782 0 0
"3201" "exp3" 1 104 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1112 0 0
"3201" "exp3" 1 105 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 722 0 0
"3201" "exp3" 1 106 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1367 51 1
"3201" "exp3" 1 107 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1074 0 0
"3201" "exp3" 1 108 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 822 0 0
"3201" "exp3" 1 109 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 748 0 0
"3201" "exp3" 1 110 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 949 0 0
"3201" "exp3" 1 111 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 720 86 1
"3201" "exp3" 1 112 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 918 72 1
"3201" "exp3" 1 113 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 867 0 0
"3201" "exp3" 1 114 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 1022 0 0
"3201" "exp3" 1 115 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1291 70 1
"3201" "exp3" 1 116 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 1419 0 0
"3201" "exp3" 1 117 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 769 0 0
"3201" "exp3" 1 118 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1234 0 0
"3201" "exp3" 1 119 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 926 0 0
"3201" "exp3" 1 120 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1234 0 0
"3201" "exp3" 1 121 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 937 0 0
"3201" "exp3" 1 122 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 745 0 0
"3201" "exp3" 1 123 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 962 0 0
"3201" "exp3" 1 124 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 1589 76 1
"3201" "exp3" 1 125 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 1520 59 1
"3201" "exp3" 1 126 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1473 0 0
"3201" "exp3" 1 127 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 946 67 1
"3201" "exp3" 1 128 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 991 0 0
"3201" "exp3" 1 129 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1136 88 1
"3201" "exp3" 1 130 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 1309 63 1
"3201" "exp3" 1 131 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 1766 0 0
"3201" "exp3" 1 132 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1646 0 0
"3201" "exp3" 2 1 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1780 0 0
"3201" "exp3" 2 2 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1061 0 0
"3201" "exp3" 2 3 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 939 87 1
"3201" "exp3" 2 4 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 1438 0 0
"3201" "exp3" 2 5 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 1519 0 0
"3201" "exp3" 2 6 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1004 0 0
"3201" "exp3" 2 7 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1039 0 0
"3201" "exp3" 2 8 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 888 0 0
"3201" "exp3" 2 9 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1026 0 0
"3201" "exp3" 2 10 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1473 0 0
"3201" "exp3" 2 11 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 1266 0 0
"3201" "exp3" 2 12 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 979 0 0
"3201" "exp3" 2 13 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 1336 0 0
"3201" "exp3" 2 14 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 1958 58 1
"3201" "exp3" 2 15 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1061 0 0
"3201" "exp3" 2 16 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1074 0 0
"3201" "exp3" 2 17 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 993 0 0
"3201" "exp3" 2 18 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1252 0 0
"3201" "exp3" 2 19 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 1322 0 0
"3201" "exp3" 2 20 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1168 0 0
"3201" "exp3" 2 21 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 704 0 0
"3201" "exp3" 2 22 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1843 0 0
"3201" "exp3" 2 23 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 1484 0 0
"3201" "exp3" 2 24 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 1287 0 0
"3201" "exp3" 2 25 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 691 82 1
"3201" "exp3" 2 26 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 982 0 0
"3201" "exp3" 2 27 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 848 52 1
"3201" "exp3" 2 28 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 936 0 0
"3201" "exp3" 2 29 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 709 0 0
"3201" "exp3" 2 30 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 946 0 0
"3201" "exp3" 2 31 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 795 0 0
"3201" "exp3" 2 32 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 656 71 1
"3201" "exp3" 2 33 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 755 0 0
"3201" "exp3" 2 34 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 769 0 0
"3201" "exp3" 2 35 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 975 63 1
"3201" "exp3" 2 36 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1500 0 0
"3201" "exp3" 2 37 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1041 0 0
"3201" "exp3" 2 38 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 751 0 0
"3201" "exp3" 2 39 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 1226 0 0
"3201" "exp3" 2 40 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 991 78 1
"3201" "exp3" 2 41 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1213 67 1
"3201" "exp3" 2 42 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 3694 0 0
"3201" "exp3" 2 43 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1382 0 0
"3201" "exp3" 2 44 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 739 84 1
"3201" "exp3" 2 45 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 833 0 0
"3201" "exp3" 2 46 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 804 0 0
"3201" "exp3" 2 47 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1102 0 0
"3201" "exp3" 2 48 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1002 0 0
"3201" "exp3" 2 49 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 937 0 0
"3201" "exp3" 2 50 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 902 56 1
"3201" "exp3" 2 51 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1636 0 0
"3201" "exp3" 2 52 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 3371 0 0
"3201" "exp3" 2 53 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 841 0 0
"3201" "exp3" 2 54 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 767 0 0
"3201" "exp3" 2 55 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1024 0 0
"3201" "exp3" 2 56 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1168 76 1
"3201" "exp3" 2 57 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1008 69 1
"3201" "exp3" 2 58 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 775 67 1
"3201" "exp3" 2 59 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 820 43 1
"3201" "exp3" 2 60 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 2186 60 1
"3201" "exp3" 2 61 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 1423 0 0
"3201" "exp3" 2 62 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 791 79 1
"3201" "exp3" 2 63 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 916 0 0
"3201" "exp3" 2 64 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1007 0 0
"3201" "exp3" 2 65 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1190 0 0
"3201" "exp3" 2 66 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 1957 0 0
"3201" "exp3" 2 67 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1239 0 0
"3201" "exp3" 2 68 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 973 0 0
"3201" "exp3" 2 69 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 678 68 1
"3201" "exp3" 2 70 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 784 0 0
"3201" "exp3" 2 71 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 704 62 1
"3201" "exp3" 2 72 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 832 0 0
"3201" "exp3" 2 73 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 833 95 1
"3201" "exp3" 2 74 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 614 0 0
"3201" "exp3" 2 75 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 831 0 0
"3201" "exp3" 2 76 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 1128 0 0
"3201" "exp3" 2 77 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 775 0 0
"3201" "exp3" 2 78 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 837 0 0
"3201" "exp3" 2 79 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 709 0 0
"3201" "exp3" 2 80 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 642 0 0
"3201" "exp3" 2 81 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 719 0 0
"3201" "exp3" 2 82 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 697 0 0
"3201" "exp3" 2 83 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 801 0 0
"3201" "exp3" 2 84 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 831 0 0
"3201" "exp3" 2 85 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 814 68 1
"3201" "exp3" 2 86 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 918 0 0
"3201" "exp3" 2 87 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 801 0 0
"3201" "exp3" 2 88 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 961 0 0
"3201" "exp3" 2 89 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 939 0 0
"3201" "exp3" 2 90 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1023 0 0
"3201" "exp3" 2 91 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 773 0 0
"3201" "exp3" 2 92 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 712 0 0
"3201" "exp3" 2 93 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 773 0 0
"3201" "exp3" 2 94 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 829 80 1
"3201" "exp3" 2 95 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1038 0 0
"3201" "exp3" 2 96 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 701 0 0
"3201" "exp3" 2 97 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 985 0 0
"3201" "exp3" 2 98 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 787 0 0
"3201" "exp3" 2 99 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 969 54 1
"3201" "exp3" 2 100 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 737 73 1
"3201" "exp3" 2 101 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 740 0 0
"3201" "exp3" 2 102 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 883 0 0
"3201" "exp3" 2 103 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 933 0 0
"3201" "exp3" 2 104 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1094 0 0
"3201" "exp3" 2 105 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 1334 62 1
"3201" "exp3" 2 106 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 1602 0 0
"3201" "exp3" 2 107 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 714 0 0
"3201" "exp3" 2 108 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 954 0 0
"3201" "exp3" 2 109 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 679 0 0
"3201" "exp3" 2 110 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 686 0 0
"3201" "exp3" 2 111 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 807 0 0
"3201" "exp3" 2 112 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 724 0 0
"3201" "exp3" 2 113 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 992 77 1
"3201" "exp3" 2 114 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 797 0 0
"3201" "exp3" 2 115 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1840 0 0
"3201" "exp3" 2 116 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 2222 55 1
"3201" "exp3" 2 117 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 744 0 0
"3201" "exp3" 2 118 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 867 0 0
"3201" "exp3" 2 119 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 859 0 0
"3201" "exp3" 2 120 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1207 0 0
"3201" "exp3" 2 121 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1356 0 0
"3201" "exp3" 2 122 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 942 0 0
"3201" "exp3" 2 123 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 1782 0 0
"3201" "exp3" 2 124 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 1016 0 0
"3201" "exp3" 2 125 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1161 0 0
"3201" "exp3" 2 126 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 2013 0 0
"3201" "exp3" 2 127 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1562 0 0
"3201" "exp3" 2 128 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1826 0 0
"3201" "exp3" 2 129 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1233 0 0
"3201" "exp3" 2 130 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1759 33 1
"3201" "exp3" 2 131 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 759 0 0
"3201" "exp3" 2 132 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1214 0 0
"3201" "exp3" 1 1 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 6465 74 1
"3201" "exp3" 1 2 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 5234 0 0
"3201" "exp3" 1 3 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 3268 99 1
"3201" "exp3" 1 4 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1206 0 0
"3201" "exp3" 1 5 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 1035 0 0
"3201" "exp3" 1 6 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 4656 0 0
"3201" "exp3" 1 7 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 3544 30 1
"3201" "exp3" 1 8 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 2661 24 1
"3201" "exp3" 1 9 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 7552 20 1
"3201" "exp3" 1 10 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 3816 0 0
"3201" "exp3" 1 11 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 4105 23 1
"3201" "exp3" 1 12 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 4500 90 1
"3201" "exp3" 1 13 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2078 0 0
"3201" "exp3" 1 14 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 3415 0 0
"3201" "exp3" 1 15 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 8220 0 0
"3201" "exp3" 1 16 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 4875 0 0
"3201" "exp3" 1 17 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2025 0 0
"3201" "exp3" 1 18 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 4167 0 0
"3201" "exp3" 1 19 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1094 40 1
"3201" "exp3" 1 20 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 2830 0 0
"3201" "exp3" 1 21 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1929 89 1
"3201" "exp3" 1 22 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2252 42 1
"3201" "exp3" 1 23 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2687 27 1
"3201" "exp3" 1 24 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 4143 25 1
"3201" "exp3" 1 25 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1539 69 1
"3201" "exp3" 1 26 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 3651 0 0
"3201" "exp3" 1 27 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1983 0 0
"3201" "exp3" 1 28 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1391 0 0
"3201" "exp3" 1 29 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 3706 0 0
"3201" "exp3" 1 30 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1271 76 1
"3201" "exp3" 1 31 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1186 0 0
"3201" "exp3" 1 32 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 7720 0 0
"3201" "exp3" 1 33 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2249 0 0
"3201" "exp3" 1 34 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1255 0 0
"3201" "exp3" 1 35 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2229 0 0
"3201" "exp3" 1 36 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1619 0 0
"3201" "exp3" 1 37 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1306 0 0
"3201" "exp3" 1 38 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 3152 0 0
"3201" "exp3" 1 39 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 822 0 0
"3201" "exp3" 1 40 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 1563 62 1
"3201" "exp3" 1 41 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 1705 0 0
"3201" "exp3" 1 42 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 2312 0 0
"3201" "exp3" 1 43 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 1351 0 0
"3201" "exp3" 1 44 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 1498 0 0
"3201" "exp3" 1 45 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 952 0 0
"3201" "exp3" 1 46 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 3468 73 1
"3201" "exp3" 1 47 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 1370 56 1
"3201" "exp3" 1 48 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 1353 67 1
"3201" "exp3" 1 49 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1780 0 0
"3201" "exp3" 1 50 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 2210 0 0
"3201" "exp3" 1 51 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 3805 81 1
"3201" "exp3" 1 52 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1635 0 0
"3201" "exp3" 1 53 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 6542 0 0
"3201" "exp3" 1 54 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 1442 0 0
"3201" "exp3" 1 55 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1368 0 0
"3201" "exp3" 1 56 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1330 36 1
"3201" "exp3" 1 57 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1021 72 1
"3201" "exp3" 1 58 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1949 0 0
"3201" "exp3" 1 59 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 2055 0 0
"3201" "exp3" 1 60 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 1411 0 0
"3201" "exp3" 1 61 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1345 0 0
"3201" "exp3" 1 62 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 755 0 0
"3201" "exp3" 1 63 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 638 0 0
"3201" "exp3" 1 64 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 751 0 0
"3201" "exp3" 1 65 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 1377 0 0
"3201" "exp3" 1 66 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1197 61 1
"3201" "exp3" 1 67 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 1092 0 0
"3201" "exp3" 1 68 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 820 0 0
"3201" "exp3" 1 69 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 689 0 0
"3201" "exp3" 1 70 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1018 0 0
"3201" "exp3" 1 71 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 997 0 0
"3201" "exp3" 1 72 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 1397 54 1
"3201" "exp3" 1 73 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 734 0 0
"3201" "exp3" 1 74 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1012 69 1
"3201" "exp3" 1 75 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 528 0 0
"3201" "exp3" 1 76 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 1973 0 0
"3201" "exp3" 1 77 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 1888 57 1
"3201" "exp3" 1 78 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 846 66 1
"3201" "exp3" 1 79 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1052 0 0
"3201" "exp3" 1 80 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1219 80 1
"3201" "exp3" 1 81 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1442 72 1
"3201" "exp3" 1 82 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 1168 0 0
"3201" "exp3" 1 83 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 866 0 0
"3201" "exp3" 1 84 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 1611 0 0
"3201" "exp3" 1 85 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1184 0 0
"3201" "exp3" 1 86 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 735 0 0
"3201" "exp3" 1 87 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 995 69 1
"3201" "exp3" 1 88 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 1072 0 0
"3201" "exp3" 1 89 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 849 70 1
"3201" "exp3" 1 90 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 906 0 0
"3201" "exp3" 1 91 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 1016 0 0
"3201" "exp3" 1 92 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1058 0 0
"3201" "exp3" 1 93 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 763 0 0
"3201" "exp3" 1 94 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1524 0 0
"3201" "exp3" 1 95 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 753 0 0
"3201" "exp3" 1 96 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 788 78 1
"3201" "exp3" 1 97 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 650 66 1
"3201" "exp3" 1 98 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1313 0 0
"3201" "exp3" 1 99 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 4746 0 0
"3201" "exp3" 1 100 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 1040 56 1
"3201" "exp3" 1 101 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 527 0 0
"3201" "exp3" 1 102 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 822 0 0
"3201" "exp3" 1 103 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 932 63 1
"3201" "exp3" 1 104 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 735 0 0
"3201" "exp3" 1 105 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 882 0 0
"3201" "exp3" 1 106 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 1069 0 0
"3201" "exp3" 1 107 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1139 82 1
"3201" "exp3" 1 108 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 722 74 1
"3201" "exp3" 1 109 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 760 0 0
"3201" "exp3" 1 110 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 774 68 1
"3201" "exp3" 1 111 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 762 0 0
"3201" "exp3" 1 112 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 638 0 0
"3201" "exp3" 1 113 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 741 0 0
"3201" "exp3" 1 114 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 507 0 0
"3201" "exp3" 1 115 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 747 0 0
"3201" "exp3" 1 116 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 1979 0 0
"3201" "exp3" 1 117 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 702 0 0
"3201" "exp3" 1 118 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 617 85 1
"3201" "exp3" 1 119 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1052 66 1
"3201" "exp3" 1 120 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 3135 45 1
"3201" "exp3" 1 121 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 601 67 1
"3201" "exp3" 1 122 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 594 0 0
"3201" "exp3" 1 123 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1793 45 1
"3201" "exp3" 1 124 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 754 0 0
"3201" "exp3" 1 125 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1343 0 0
"3201" "exp3" 1 126 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1251 0 0
"3201" "exp3" 1 127 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 1231 0 0
"3201" "exp3" 1 128 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 738 65 1
"3201" "exp3" 1 129 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 681 0 0
"3201" "exp3" 1 130 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 689 0 0
"3201" "exp3" 1 131 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 580 0 0
"3201" "exp3" 1 132 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 570 0 0
"3201" "exp3" 2 1 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 850 0 0
"3201" "exp3" 2 2 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 653 0 0
"3201" "exp3" 2 3 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 689 0 0
"3201" "exp3" 2 4 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 564 0 0
"3201" "exp3" 2 5 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 533 0 0
"3201" "exp3" 2 6 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 550 92 1
"3201" "exp3" 2 7 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 690 0 0
"3201" "exp3" 2 8 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 553 0 0
"3201" "exp3" 2 9 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 619 73 1
"3201" "exp3" 2 10 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 524 74 1
"3201" "exp3" 2 11 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 924 0 0
"3201" "exp3" 2 12 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 667 0 0
"3201" "exp3" 2 13 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 824 0 0
"3201" "exp3" 2 14 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 774 0 0
"3201" "exp3" 2 15 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 666 0 0
"3201" "exp3" 2 16 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 821 0 0
"3201" "exp3" 2 17 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1223 66 1
"3201" "exp3" 2 18 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 685 0 0
"3201" "exp3" 2 19 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 707 0 0
"3201" "exp3" 2 20 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1001 86 1
"3201" "exp3" 2 21 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 601 0 0
"3201" "exp3" 2 22 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 744 81 1
"3201" "exp3" 2 23 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 976 0 0
"3201" "exp3" 2 24 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 614 0 0
"3201" "exp3" 2 25 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 746 0 0
"3201" "exp3" 2 26 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1002 0 0
"3201" "exp3" 2 27 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 769 0 0
"3201" "exp3" 2 28 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 627 87 1
"3201" "exp3" 2 29 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 612 71 1
"3201" "exp3" 2 30 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 743 0 0
"3201" "exp3" 2 31 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1036 86 1
"3201" "exp3" 2 32 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 7398 53 1
"3201" "exp3" 2 33 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1520 0 0
"3201" "exp3" 2 34 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 578 0 0
"3201" "exp3" 2 35 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 759 76 1
"3201" "exp3" 2 36 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 2278 0 0
"3201" "exp3" 2 37 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 720 0 0
"3201" "exp3" 2 38 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 736 0 0
"3201" "exp3" 2 39 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 731 0 0
"3201" "exp3" 2 40 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 1072 0 0
"3201" "exp3" 2 41 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 819 0 0
"3201" "exp3" 2 42 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 729 85 1
"3201" "exp3" 2 43 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 938 0 0
"3201" "exp3" 2 44 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 983 0 0
"3201" "exp3" 2 45 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 601 0 0
"3201" "exp3" 2 46 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 640 0 0
"3201" "exp3" 2 47 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 660 0 0
"3201" "exp3" 2 48 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 896 0 0
"3201" "exp3" 2 49 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 874 80 1
"3201" "exp3" 2 50 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 5411 0 0
"3201" "exp3" 2 51 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 2475 0 0
"3201" "exp3" 2 52 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1672 0 0
"3201" "exp3" 2 53 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 6771 0 0
"3201" "exp3" 2 54 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 988 0 0
"3201" "exp3" 2 55 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2831 23 1
"3201" "exp3" 2 56 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1754 79 1
"3201" "exp3" 2 57 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1164 0 0
"3201" "exp3" 2 58 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 1205 0 0
"3201" "exp3" 2 59 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1540 0 0
"3201" "exp3" 2 60 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1585 0 0
"3201" "exp3" 2 61 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1078 0 0
"3201" "exp3" 2 62 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 765 0 0
"3201" "exp3" 2 63 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 987 0 0
"3201" "exp3" 2 64 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 2043 0 0
"3201" "exp3" 2 65 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 750 0 0
"3201" "exp3" 2 66 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 652 0 0
"3201" "exp3" 2 67 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 1115 0 0
"3201" "exp3" 2 68 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 1172 0 0
"3201" "exp3" 2 69 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 10574 0 0
"3201" "exp3" 2 70 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 859 0 0
"3201" "exp3" 2 71 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 792 0 0
"3201" "exp3" 2 72 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 819 0 0
"3201" "exp3" 2 73 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 667 70 1
"3201" "exp3" 2 74 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 476 64 1
"3201" "exp3" 2 75 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 525 0 0
"3201" "exp3" 2 76 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 739 0 0
"3201" "exp3" 2 77 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 729 73 1
"3201" "exp3" 2 78 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 701 0 0
"3201" "exp3" 2 79 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 1601 56 1
"3201" "exp3" 2 80 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 898 80 1
"3201" "exp3" 2 81 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1722 0 0
"3201" "exp3" 2 82 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 1097 0 0
"3201" "exp3" 2 83 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 791 0 0
"3201" "exp3" 2 84 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 1648 0 0
"3201" "exp3" 2 85 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 1039 85 1
"3201" "exp3" 2 86 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1146 0 0
"3201" "exp3" 2 87 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 881 77 1
"3201" "exp3" 2 88 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1046 0 0
"3201" "exp3" 2 89 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 741 82 1
"3201" "exp3" 2 90 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 835 77 1
"3201" "exp3" 2 91 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1016 0 0
"3201" "exp3" 2 92 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 5051 0 0
"3201" "exp3" 2 93 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 815 0 0
"3201" "exp3" 2 94 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 1598 0 0
"3201" "exp3" 2 95 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 947 0 0
"3201" "exp3" 2 96 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1027 67 1
"3201" "exp3" 2 97 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 672 75 1
"3201" "exp3" 2 98 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 678 0 0
"3201" "exp3" 2 99 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 818 0 0
"3201" "exp3" 2 100 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 651 0 0
"3201" "exp3" 2 101 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 984 60 1
"3201" "exp3" 2 102 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1206 0 0
"3201" "exp3" 2 103 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 6021 0 0
"3201" "exp3" 2 104 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 955 0 0
"3201" "exp3" 2 105 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1244 78 1
"3201" "exp3" 2 106 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 716 0 0
"3201" "exp3" 2 107 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 933 0 0
"3201" "exp3" 2 108 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1306 0 0
"3201" "exp3" 2 109 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 1012 62 1
"3201" "exp3" 2 110 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 1068 0 0
"3201" "exp3" 2 111 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1342 0 0
"3201" "exp3" 2 112 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 2821 0 0
"3201" "exp3" 2 113 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 920 0 0
"3201" "exp3" 2 114 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 735 0 0
"3201" "exp3" 2 115 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1200 0 0
"3201" "exp3" 2 116 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 774 54 1
"3201" "exp3" 2 117 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 919 0 0
"3201" "exp3" 2 118 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 803 0 0
"3201" "exp3" 2 119 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 731 73 1
"3201" "exp3" 2 120 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1945 0 0
"3201" "exp3" 2 121 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 778 84 1
"3201" "exp3" 2 122 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 688 4 1
"3201" "exp3" 2 123 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 709 0 0
"3201" "exp3" 2 124 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 872 0 0
"3201" "exp3" 2 125 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 784 0 0
"3201" "exp3" 2 126 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 880 62 1
"3201" "exp3" 2 127 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 661 91 1
"3201" "exp3" 2 128 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 635 0 0
"3201" "exp3" 2 129 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 819 0 0
"3201" "exp3" 2 130 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 547 0 0
"3201" "exp3" 2 131 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 751 0 0
"3201" "exp3" 2 132 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 1875 77 1
"3201" "exp3" 1 1 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 2470 0 0
"3201" "exp3" 1 2 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1735 76 1
"3201" "exp3" 1 3 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1381 0 0
"3201" "exp3" 1 4 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 957 59 1
"3201" "exp3" 1 5 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1414 0 0
"3201" "exp3" 1 6 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 2565 0 0
"3201" "exp3" 1 7 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1593 77 1
"3201" "exp3" 1 8 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1428 75 1
"3201" "exp3" 1 9 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 946 70 1
"3201" "exp3" 1 10 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 1663 0 0
"3201" "exp3" 1 11 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1092 0 0
"3201" "exp3" 1 12 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1595 0 0
"3201" "exp3" 1 13 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1028 0 0
"3201" "exp3" 1 14 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1465 0 0
"3201" "exp3" 1 15 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 929 0 0
"3201" "exp3" 1 16 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 935 0 0
"3201" "exp3" 1 17 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 993 0 0
"3201" "exp3" 1 18 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 947 0 0
"3201" "exp3" 1 19 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 824 0 0
"3201" "exp3" 1 20 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 952 65 1
"3201" "exp3" 1 21 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 1105 0 0
"3201" "exp3" 1 22 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 930 0 0
"3201" "exp3" 1 23 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 826 94 1
"3201" "exp3" 1 24 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 753 0 0
"3201" "exp3" 1 25 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 994 69 1
"3201" "exp3" 1 26 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 825 0 0
"3201" "exp3" 1 27 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 1271 61 1
"3201" "exp3" 1 28 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 1218 0 0
"3201" "exp3" 1 29 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 914 0 0
"3201" "exp3" 1 30 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 671 0 0
"3201" "exp3" 1 31 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2313 72 1
"3201" "exp3" 1 32 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1417 0 0
"3201" "exp3" 1 33 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 1031 0 0
"3201" "exp3" 1 34 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1033 63 1
"3201" "exp3" 1 35 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 780 0 0
"3201" "exp3" 1 36 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1530 92 1
"3201" "exp3" 1 37 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 663 0 0
"3201" "exp3" 1 38 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 849 0 0
"3201" "exp3" 1 39 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 891 0 0
"3201" "exp3" 1 40 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1436 0 0
"3201" "exp3" 1 41 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 6000 66 1
"3201" "exp3" 1 42 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 791 0 0
"3201" "exp3" 1 43 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 830 0 0
"3201" "exp3" 1 44 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 936 91 1
"3201" "exp3" 1 45 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1285 45 1
"3201" "exp3" 1 46 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 2247 0 0
"3201" "exp3" 1 47 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1360 0 0
"3201" "exp3" 1 48 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1473 97 1
"3201" "exp3" 1 49 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 1265 0 0
"3201" "exp3" 1 50 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 1661 0 0
"3201" "exp3" 1 51 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 833 0 0
"3201" "exp3" 1 52 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1191 0 0
"3201" "exp3" 1 53 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 961 0 0
"3201" "exp3" 1 54 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1040 0 0
"3201" "exp3" 1 55 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 4571 79 1
"3201" "exp3" 1 56 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1679 46 1
"3201" "exp3" 1 57 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1502 0 0
"3201" "exp3" 1 58 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 2411 0 0
"3201" "exp3" 1 59 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2203 0 0
"3201" "exp3" 1 60 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 5989 0 0
"3201" "exp3" 1 61 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 923 0 0
"3201" "exp3" 1 62 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 575 0 0
"3201" "exp3" 1 63 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 600 0 0
"3201" "exp3" 1 64 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 696 0 0
"3201" "exp3" 1 65 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 939 0 0
"3201" "exp3" 1 66 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 800 0 0
"3201" "exp3" 1 67 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1505 82 1
"3201" "exp3" 1 68 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 779 80 1
"3201" "exp3" 1 69 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 848 78 1
"3201" "exp3" 1 70 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 6115 0 0
"3201" "exp3" 1 71 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 1225 56 1
"3201" "exp3" 1 72 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 761 0 0
"3201" "exp3" 1 73 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 818 0 0
"3201" "exp3" 1 74 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1102 0 0
"3201" "exp3" 1 75 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1220 0 0
"3201" "exp3" 1 76 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1077 0 0
"3201" "exp3" 1 77 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 903 75 1
"3201" "exp3" 1 78 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 5078 60 1
"3201" "exp3" 1 79 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 768 0 0
"3201" "exp3" 1 80 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 757 68 1
"3201" "exp3" 1 81 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 914 73 1
"3201" "exp3" 1 82 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 1013 0 0
"3201" "exp3" 1 83 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 823 55 1
"3201" "exp3" 1 84 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 2088 0 0
"3201" "exp3" 1 85 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 650 62 1
"3201" "exp3" 1 86 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 768 0 0
"3201" "exp3" 1 87 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 705 66 1
"3201" "exp3" 1 88 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 661 66 1
"3201" "exp3" 1 89 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 601 0 0
"3201" "exp3" 1 90 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 840 48 1
"3201" "exp3" 1 91 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1109 85 1
"3201" "exp3" 1 92 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 8182 79 1
"3201" "exp3" 1 93 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 669 0 0
"3201" "exp3" 1 94 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 582 0 0
"3201" "exp3" 1 95 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 856 0 0
"3201" "exp3" 1 96 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 686 0 0
"3201" "exp3" 1 97 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1319 0 0
"3201" "exp3" 1 98 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 840 0 0
"3201" "exp3" 1 99 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 8074 56 1
"3201" "exp3" 1 100 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 700 0 0
"3201" "exp3" 1 101 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 661 0 0
"3201" "exp3" 1 102 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 713 0 0
"3201" "exp3" 1 103 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 518 0 0
"3201" "exp3" 1 104 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 524 0 0
"3201" "exp3" 1 105 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 643 0 0
"3201" "exp3" 1 106 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 567 0 0
"3201" "exp3" 1 107 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 504 73 1
"3201" "exp3" 1 108 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 587 64 1
"3201" "exp3" 1 109 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 508 0 0
"3201" "exp3" 1 110 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 629 81 1
"3201" "exp3" 1 111 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 552 68 1
"3201" "exp3" 1 112 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 659 0 0
"3201" "exp3" 1 113 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 585 0 0
"3201" "exp3" 1 114 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 808 83 1
"3201" "exp3" 1 115 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 992 74 1
"3201" "exp3" 1 116 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1197 95 1
"3201" "exp3" 1 117 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 7247 0 0
"3201" "exp3" 1 118 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 602 72 1
"3201" "exp3" 1 119 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 540 0 0
"3201" "exp3" 1 120 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 638 71 1
"3201" "exp3" 1 121 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 679 0 0
"3201" "exp3" 1 122 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 950 78 1
"3201" "exp3" 1 123 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 6740 0 0
"3201" "exp3" 1 124 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1141 0 0
"3201" "exp3" 1 125 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 768 67 1
"3201" "exp3" 1 126 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 549 0 0
"3201" "exp3" 1 127 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 518 0 0
"3201" "exp3" 1 128 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 511 0 0
"3201" "exp3" 1 129 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 485 0 0
"3201" "exp3" 1 130 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 610 0 0
"3201" "exp3" 1 131 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 677 61 1
"3201" "exp3" 1 132 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 753 0 0
"3201" "exp3" 2 1 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 706 0 0
"3201" "exp3" 2 2 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1097 78 1
"3201" "exp3" 2 3 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 766 0 0
"3201" "exp3" 2 4 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 686 87 1
"3201" "exp3" 2 5 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 1058 56 1
"3201" "exp3" 2 6 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 633 0 0
"3201" "exp3" 2 7 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1144 0 0
"3201" "exp3" 2 8 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 656 0 0
"3201" "exp3" 2 9 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 999 0 0
"3201" "exp3" 2 10 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 597 83 1
"3201" "exp3" 2 11 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 654 0 0
"3201" "exp3" 2 12 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 657 0 0
"3201" "exp3" 2 13 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1084 64 1
"3201" "exp3" 2 14 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 590 0 0
"3201" "exp3" 2 15 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 700 0 0
"3201" "exp3" 2 16 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 691 0 0
"3201" "exp3" 2 17 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 631 0 0
"3201" "exp3" 2 18 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 768 64 1
"3201" "exp3" 2 19 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 581 0 0
"3201" "exp3" 2 20 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 548 0 0
"3201" "exp3" 2 21 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 742 0 0
"3201" "exp3" 2 22 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 537 0 0
"3201" "exp3" 2 23 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 472 0 0
"3201" "exp3" 2 24 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 851 0 0
"3201" "exp3" 2 25 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 747 0 0
"3201" "exp3" 2 26 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 676 0 0
"3201" "exp3" 2 27 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 902 0 0
"3201" "exp3" 2 28 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 608 0 0
"3201" "exp3" 2 29 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 614 0 0
"3201" "exp3" 2 30 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 535 0 0
"3201" "exp3" 2 31 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 687 0 0
"3201" "exp3" 2 32 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 659 70 1
"3201" "exp3" 2 33 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 568 0 0
"3201" "exp3" 2 34 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 539 0 0
"3201" "exp3" 2 35 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 476 0 0
"3201" "exp3" 2 36 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 878 0 0
"3201" "exp3" 2 37 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 787 0 0
"3201" "exp3" 2 38 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 602 0 0
"3201" "exp3" 2 39 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 721 0 0
"3201" "exp3" 2 40 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 850 59 1
"3201" "exp3" 2 41 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 636 81 1
"3201" "exp3" 2 42 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 839 0 0
"3201" "exp3" 2 43 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 858 80 1
"3201" "exp3" 2 44 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 589 0 0
"3201" "exp3" 2 45 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 859 0 0
"3201" "exp3" 2 46 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 11459 0 0
"3201" "exp3" 2 47 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 708 57 1
"3201" "exp3" 2 48 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 867 0 0
"3201" "exp3" 2 49 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1302 0 0
"3201" "exp3" 2 50 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1269 0 0
"3201" "exp3" 2 51 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 611 0 0
"3201" "exp3" 2 52 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 670 0 0
"3201" "exp3" 2 53 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 734 0 0
"3201" "exp3" 2 54 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 679 0 0
"3201" "exp3" 2 55 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 10734 73 1
"3201" "exp3" 2 56 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 800 0 0
"3201" "exp3" 2 57 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 6379 79 1
"3201" "exp3" 2 58 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 954 0 0
"3201" "exp3" 2 59 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 618 0 0
"3201" "exp3" 2 60 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 685 0 0
"3201" "exp3" 2 61 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 687 74 1
"3201" "exp3" 2 62 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 587 0 0
"3201" "exp3" 2 63 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 669 0 0
"3201" "exp3" 2 64 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 579 0 0
"3201" "exp3" 2 65 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 726 0 0
"3201" "exp3" 2 66 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 487 0 0
"3201" "exp3" 2 67 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 528 0 0
"3201" "exp3" 2 68 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 691 0 0
"3201" "exp3" 2 69 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1617 0 0
"3201" "exp3" 2 70 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 762 0 0
"3201" "exp3" 2 71 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 590 0 0
"3201" "exp3" 2 72 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 757 65 1
"3201" "exp3" 2 73 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 525 0 0
"3201" "exp3" 2 74 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 871 0 0
"3201" "exp3" 2 75 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 570 0 0
"3201" "exp3" 2 76 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 9391 57 1
"3201" "exp3" 2 77 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 663 0 0
"3201" "exp3" 2 78 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 699 0 0
"3201" "exp3" 2 79 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 572 82 1
"3201" "exp3" 2 80 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 777 62 1
"3201" "exp3" 2 81 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 786 0 0
"3201" "exp3" 2 82 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1440 0 0
"3201" "exp3" 2 83 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 822 0 0
"3201" "exp3" 2 84 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 602 0 0
"3201" "exp3" 2 85 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 648 0 0
"3201" "exp3" 2 86 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1641 0 0
"3201" "exp3" 2 87 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 778 0 0
"3201" "exp3" 2 88 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1879 51 1
"3201" "exp3" 2 89 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 2150 0 0
"3201" "exp3" 2 90 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1018 89 1
"3201" "exp3" 2 91 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 1311 67 1
"3201" "exp3" 2 92 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 682 63 1
"3201" "exp3" 2 93 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 696 0 0
"3201" "exp3" 2 94 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 4018 0 0
"3201" "exp3" 2 95 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 542 0 0
"3201" "exp3" 2 96 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1161 0 0
"3201" "exp3" 2 97 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 758 0 0
"3201" "exp3" 2 98 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 566 0 0
"3201" "exp3" 2 99 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 497 0 0
"3201" "exp3" 2 100 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 805 0 0
"3201" "exp3" 2 101 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1470 0 0
"3201" "exp3" 2 102 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 977 62 1
"3201" "exp3" 2 103 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 3477 78 1
"3201" "exp3" 2 104 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 793 0 0
"3201" "exp3" 2 105 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1069 0 0
"3201" "exp3" 2 106 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 768 0 0
"3201" "exp3" 2 107 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 14659 0 0
"3201" "exp3" 2 108 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 596 0 0
"3201" "exp3" 2 109 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 840 0 0
"3201" "exp3" 2 110 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1099 67 1
"3201" "exp3" 2 111 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 613 96 1
"3201" "exp3" 2 112 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 766 79 1
"3201" "exp3" 2 113 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 655 86 1
"3201" "exp3" 2 114 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 559 0 0
"3201" "exp3" 2 115 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 721 0 0
"3201" "exp3" 2 116 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1179 0 0
"3201" "exp3" 2 117 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 559 90 1
"3201" "exp3" 2 118 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1264 0 0
"3201" "exp3" 2 119 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 613 0 0
"3201" "exp3" 2 120 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 1106 0 0
"3201" "exp3" 2 121 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1013 63 1
"3201" "exp3" 2 122 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 612 0 0
"3201" "exp3" 2 123 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 656 0 0
"3201" "exp3" 2 124 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1272 0 0
"3201" "exp3" 2 125 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 1177 0 0
"3201" "exp3" 2 126 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 710 71 1
"3201" "exp3" 2 127 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 610 0 0
"3201" "exp3" 2 128 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 469 0 0
"3201" "exp3" 2 129 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 613 0 0
"3201" "exp3" 2 130 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 8891 0 0
"3201" "exp3" 2 131 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 1010 0 0
"3201" "exp3" 2 132 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 698 0 0
"3201" "exp3" 1 1 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2223 32 1
"3201" "exp3" 1 2 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 2894 71 1
"3201" "exp3" 1 3 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 5452 3 1
"3201" "exp3" 1 4 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 6084 0 0
"3201" "exp3" 1 5 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1956 49 1
"3201" "exp3" 1 6 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 3426 42 1
"3201" "exp3" 1 7 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 2466 45 1
"3201" "exp3" 1 8 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3204 0 0
"3201" "exp3" 1 9 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 3083 0 0
"3201" "exp3" 1 10 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 8959 0 0
"3201" "exp3" 1 11 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 6644 73 1
"3201" "exp3" 1 12 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 5765 0 0
"3201" "exp3" 1 13 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 4615 0 0
"3201" "exp3" 1 14 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 2925 81 1
"3201" "exp3" 1 15 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 3167 7 1
"3201" "exp3" 1 16 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 2580 62 1
"3201" "exp3" 1 17 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2013 65 1
"3201" "exp3" 1 18 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3084 0 0
"3201" "exp3" 1 19 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 10514 0 0
"3201" "exp3" 1 20 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1314 0 0
"3201" "exp3" 1 21 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 2999 0 0
"3201" "exp3" 1 22 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 4006 0 0
"3201" "exp3" 1 23 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2948 94 1
"3201" "exp3" 1 24 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 2373 67 1
"3201" "exp3" 1 25 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 2220 0 0
"3201" "exp3" 1 26 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 1180 0 0
"3201" "exp3" 1 27 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1302 0 0
"3201" "exp3" 1 28 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2390 0 0
"3201" "exp3" 1 29 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 1375 0 0
"3201" "exp3" 1 30 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 2085 0 0
"3201" "exp3" 1 31 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 832 88 1
"3201" "exp3" 1 32 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1327 0 0
"3201" "exp3" 1 33 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 1152 0 0
"3201" "exp3" 1 34 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 863 0 0
"3201" "exp3" 1 35 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 1173 0 0
"3201" "exp3" 1 36 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 1194 0 0
"3201" "exp3" 1 37 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1014 87 1
"3201" "exp3" 1 38 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 1132 57 1
"3201" "exp3" 1 39 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 832 0 0
"3201" "exp3" 1 40 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 849 91 1
"3201" "exp3" 1 41 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 773 68 1
"3201" "exp3" 1 42 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 768 0 0
"3201" "exp3" 1 43 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 885 0 0
"3201" "exp3" 1 44 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1797 0 0
"3201" "exp3" 1 45 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 698 81 1
"3201" "exp3" 1 46 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 856 74 1
"3201" "exp3" 1 47 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 677 91 1
"3201" "exp3" 1 48 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 6295 0 0
"3201" "exp3" 1 49 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 841 0 0
"3201" "exp3" 1 50 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 783 70 1
"3201" "exp3" 1 51 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 830 0 0
"3201" "exp3" 1 52 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 723 0 0
"3201" "exp3" 1 53 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 889 79 1
"3201" "exp3" 1 54 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1195 0 0
"3201" "exp3" 1 55 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 992 0 0
"3201" "exp3" 1 56 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 714 68 1
"3201" "exp3" 1 57 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 889 0 0
"3201" "exp3" 1 58 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1034 0 0
"3201" "exp3" 1 59 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1007 79 1
"3201" "exp3" 1 60 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 1113 0 0
"3201" "exp3" 1 61 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 1155 0 0
"3201" "exp3" 1 62 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 5933 66 1
"3201" "exp3" 1 63 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 795 0 0
"3201" "exp3" 1 64 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 841 0 0
"3201" "exp3" 1 65 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 964 0 0
"3201" "exp3" 1 66 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 965 0 0
"3201" "exp3" 1 67 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1078 0 0
"3201" "exp3" 1 68 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 887 79 1
"3201" "exp3" 1 69 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 1013 0 0
"3201" "exp3" 1 70 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 1016 0 0
"3201" "exp3" 1 71 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 671 71 1
"3201" "exp3" 1 72 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 4913 73 1
"3201" "exp3" 1 73 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 739 0 0
"3201" "exp3" 1 74 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1465 0 0
"3201" "exp3" 1 75 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 604 0 0
"3201" "exp3" 1 76 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 1373 0 0
"3201" "exp3" 1 77 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 8789 0 0
"3201" "exp3" 1 78 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 892 69 1
"3201" "exp3" 1 79 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1084 73 1
"3201" "exp3" 1 80 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 643 63 1
"3201" "exp3" 1 81 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 788 0 0
"3201" "exp3" 1 82 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1334 0 0
"3201" "exp3" 1 83 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 9528 0 0
"3201" "exp3" 1 84 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 880 73 1
"3201" "exp3" 1 85 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 648 0 0
"3201" "exp3" 1 86 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 731 70 1
"3201" "exp3" 1 87 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 652 0 0
"3201" "exp3" 1 88 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 1301 56 1
"3201" "exp3" 1 89 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 619 0 0
"3201" "exp3" 1 90 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 757 60 1
"3201" "exp3" 1 91 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 799 0 0
"3201" "exp3" 1 92 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 897 0 0
"3201" "exp3" 1 93 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 713 0 0
"3201" "exp3" 1 94 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 735 0 0
"3201" "exp3" 1 95 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 695 0 0
"3201" "exp3" 1 96 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 680 80 1
"3201" "exp3" 1 97 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 811 0 0
"3201" "exp3" 1 98 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 650 0 0
"3201" "exp3" 1 99 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 5752 0 0
"3201" "exp3" 1 100 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 653 86 1
"3201" "exp3" 1 101 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 709 67 1
"3201" "exp3" 1 102 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 774 0 0
"3201" "exp3" 1 103 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 548 0 0
"3201" "exp3" 1 104 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 461 0 0
"3201" "exp3" 1 105 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 582 0 0
"3201" "exp3" 1 106 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 668 66 1
"3201" "exp3" 1 107 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 629 74 1
"3201" "exp3" 1 108 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 752 0 0
"3201" "exp3" 1 109 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 643 0 0
"3201" "exp3" 1 110 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 649 0 0
"3201" "exp3" 1 111 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 787 0 0
"3201" "exp3" 1 112 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 788 0 0
"3201" "exp3" 1 113 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 748 0 0
"3201" "exp3" 1 114 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 954 0 0
"3201" "exp3" 1 115 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 1441 61 1
"3201" "exp3" 1 116 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 6671 69 1
"3201" "exp3" 1 117 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 1027 59 1
"3201" "exp3" 1 118 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 715 0 0
"3201" "exp3" 1 119 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 706 0 0
"3201" "exp3" 1 120 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 677 0 0
"3201" "exp3" 1 121 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1236 0 0
"3201" "exp3" 1 122 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1091 0 0
"3201" "exp3" 1 123 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 1347 0 0
"3201" "exp3" 1 124 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 5787 0 0
"3201" "exp3" 1 125 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 684 0 0
"3201" "exp3" 1 126 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 650 0 0
"3201" "exp3" 1 127 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 717 0 0
"3201" "exp3" 1 128 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 959 0 0
"3201" "exp3" 1 129 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 892 0 0
"3201" "exp3" 1 130 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 9074 0 0
"3201" "exp3" 1 131 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 803 0 0
"3201" "exp3" 1 132 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 1020 0 0
"3201" "exp3" 2 1 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1038 88 1
"3201" "exp3" 2 2 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 608 0 0
"3201" "exp3" 2 3 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 658 39 1
"3201" "exp3" 2 4 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 800 0 0
"3201" "exp3" 2 5 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 1232 61 1
"3201" "exp3" 2 6 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1113 0 0
"3201" "exp3" 2 7 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 3597 0 0
"3201" "exp3" 2 8 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 2866 63 1
"3201" "exp3" 2 9 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 3072 74 1
"3201" "exp3" 2 10 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2504 0 0
"3201" "exp3" 2 11 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 9018 0 0
"3201" "exp3" 2 12 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 989 64 1
"3201" "exp3" 2 13 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 734 0 0
"3201" "exp3" 2 14 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 621 0 0
"3201" "exp3" 2 15 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 751 72 1
"3201" "exp3" 2 16 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 709 74 1
"3201" "exp3" 2 17 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 684 0 0
"3201" "exp3" 2 18 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 837 0 0
"3201" "exp3" 2 19 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 12847 79 1
"3201" "exp3" 2 20 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 726 0 0
"3201" "exp3" 2 21 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 662 0 0
"3201" "exp3" 2 22 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 707 0 0
"3201" "exp3" 2 23 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 790 66 1
"3201" "exp3" 2 24 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 473 67 1
"3201" "exp3" 2 25 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 799 0 0
"3201" "exp3" 2 26 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1135 0 0
"3201" "exp3" 2 27 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 785 0 0
"3201" "exp3" 2 28 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1044 0 0
"3201" "exp3" 2 29 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 746 0 0
"3201" "exp3" 2 30 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 995 0 0
"3201" "exp3" 2 31 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 736 0 0
"3201" "exp3" 2 32 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 13274 55 1
"3201" "exp3" 2 33 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 1209 78 1
"3201" "exp3" 2 34 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1048 0 0
"3201" "exp3" 2 35 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 706 73 1
"3201" "exp3" 2 36 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 842 0 0
"3201" "exp3" 2 37 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 1074 0 0
"3201" "exp3" 2 38 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 8156 0 0
"3201" "exp3" 2 39 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 819 74 1
"3201" "exp3" 2 40 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 667 92 1
"3201" "exp3" 2 41 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 670 0 0
"3201" "exp3" 2 42 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 682 60 1
"3201" "exp3" 2 43 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 869 69 1
"3201" "exp3" 2 44 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1680 0 0
"3201" "exp3" 2 45 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 912 70 1
"3201" "exp3" 2 46 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 592 0 0
"3201" "exp3" 2 47 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 790 0 0
"3201" "exp3" 2 48 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 749 73 1
"3201" "exp3" 2 49 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 586 0 0
"3201" "exp3" 2 50 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 936 55 1
"3201" "exp3" 2 51 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 774 0 0
"3201" "exp3" 2 52 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 4987 0 0
"3201" "exp3" 2 53 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1111 0 0
"3201" "exp3" 2 54 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 7310 0 0
"3201" "exp3" 2 55 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 673 0 0
"3201" "exp3" 2 56 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 677 0 0
"3201" "exp3" 2 57 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 817 63 1
"3201" "exp3" 2 58 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 794 76 1
"3201" "exp3" 2 59 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 7136 65 1
"3201" "exp3" 2 60 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1892 65 1
"3201" "exp3" 2 61 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 831 0 0
"3201" "exp3" 2 62 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 10631 0 0
"3201" "exp3" 2 63 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 1213 0 0
"3201" "exp3" 2 64 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 7993 0 0
"3201" "exp3" 2 65 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 857 0 0
"3201" "exp3" 2 66 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 790 82 1
"3201" "exp3" 2 67 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 753 0 0
"3201" "exp3" 2 68 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 5564 0 0
"3201" "exp3" 2 69 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 968 71 1
"3201" "exp3" 2 70 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 734 0 0
"3201" "exp3" 2 71 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 1543 0 0
"3201" "exp3" 2 72 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 8295 82 1
"3201" "exp3" 2 73 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 645 93 1
"3201" "exp3" 2 74 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 722 0 0
"3201" "exp3" 2 75 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 1515 73 1
"3201" "exp3" 2 76 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 5579 0 0
"3201" "exp3" 2 77 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 836 0 0
"3201" "exp3" 2 78 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 7467 0 0
"3201" "exp3" 2 79 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1104 88 1
"3201" "exp3" 2 80 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1229 68 1
"3201" "exp3" 2 81 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 581 0 0
"3201" "exp3" 2 82 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 935 67 1
"3201" "exp3" 2 83 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 610 78 1
"3201" "exp3" 2 84 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 923 0 0
"3201" "exp3" 2 85 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 2310 0 0
"3201" "exp3" 2 86 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 7126 0 0
"3201" "exp3" 2 87 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 765 0 0
"3201" "exp3" 2 88 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 5574 0 0
"3201" "exp3" 2 89 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 693 0 0
"3201" "exp3" 2 90 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 8102 0 0
"3201" "exp3" 2 91 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 699 70 1
"3201" "exp3" 2 92 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 702 0 0
"3201" "exp3" 2 93 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 647 0 0
"3201" "exp3" 2 94 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 592 0 0
"3201" "exp3" 2 95 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 1473 0 0
"3201" "exp3" 2 96 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1862 0 0
"3201" "exp3" 2 97 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 870 66 1
"3201" "exp3" 2 98 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 792 73 1
"3201" "exp3" 2 99 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 11228 0 0
"3201" "exp3" 2 100 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 677 0 0
"3201" "exp3" 2 101 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 870 0 0
"3201" "exp3" 2 102 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 599 0 0
"3201" "exp3" 2 103 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 664 56 1
"3201" "exp3" 2 104 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 646 69 1
"3201" "exp3" 2 105 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 717 0 0
"3201" "exp3" 2 106 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 633 87 1
"3201" "exp3" 2 107 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 711 0 0
"3201" "exp3" 2 108 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 892 0 0
"3201" "exp3" 2 109 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 554 75 1
"3201" "exp3" 2 110 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 672 0 0
"3201" "exp3" 2 111 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 917 0 0
"3201" "exp3" 2 112 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 639 76 1
"3201" "exp3" 2 113 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 1016 0 0
"3201" "exp3" 2 114 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 6768 56 1
"3201" "exp3" 2 115 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1366 0 0
"3201" "exp3" 2 116 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 1144 0 0
"3201" "exp3" 2 117 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 692 0 0
"3201" "exp3" 2 118 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1421 0 0
"3201" "exp3" 2 119 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 8742 75 1
"3201" "exp3" 2 120 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 640 0 0
"3201" "exp3" 2 121 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 688 0 0
"3201" "exp3" 2 122 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 892 0 0
"3201" "exp3" 2 123 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 658 91 1
"3201" "exp3" 2 124 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1112 0 0
"3201" "exp3" 2 125 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 652 0 0
"3201" "exp3" 2 126 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 795 0 0
"3201" "exp3" 2 127 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 913 79 1
"3201" "exp3" 2 128 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 824 90 1
"3201" "exp3" 2 129 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 746 0 0
"3201" "exp3" 2 130 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 983 0 0
"3201" "exp3" 2 131 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 761 0 0
"3201" "exp3" 2 132 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1001 0 0
"3202" "exp3" 1 1 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 457 38 1
"3202" "exp3" 1 2 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 405 28 1
"3202" "exp3" 1 3 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 476 0 0
"3202" "exp3" 1 4 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 1092 0 0
"3202" "exp3" 1 5 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 595 0 0
"3202" "exp3" 1 6 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 775 13 1
"3202" "exp3" 1 7 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 706 46 1
"3202" "exp3" 1 8 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 865 12 1
"3202" "exp3" 1 9 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 718 25 1
"3202" "exp3" 1 10 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 735 0 0
"3202" "exp3" 1 11 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 629 0 0
"3202" "exp3" 1 12 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 638 8 1
"3202" "exp3" 1 13 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 493 15 1
"3202" "exp3" 1 14 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 890 17 1
"3202" "exp3" 1 15 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 719 0 0
"3202" "exp3" 1 16 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 822 0 0
"3202" "exp3" 1 17 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 894 26 1
"3202" "exp3" 1 18 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 729 23 1
"3202" "exp3" 1 19 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1079 24 1
"3202" "exp3" 1 20 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1135 16 1
"3202" "exp3" 1 21 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 985 20 1
"3202" "exp3" 1 22 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 824 18 1
"3202" "exp3" 1 23 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 793 11 1
"3202" "exp3" 1 24 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1120 0 0
"3202" "exp3" 1 25 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 658 0 0
"3202" "exp3" 1 26 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1415 81 1
"3202" "exp3" 1 27 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 654 42 1
"3202" "exp3" 1 28 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 880 33 1
"3202" "exp3" 1 29 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1161 0 0
"3202" "exp3" 1 30 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1115 24 1
"3202" "exp3" 1 31 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 1165 63 1
"3202" "exp3" 1 32 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1164 71 1
"3202" "exp3" 1 33 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 723 0 0
"3202" "exp3" 1 34 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1047 22 1
"3202" "exp3" 1 35 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 749 0 0
"3202" "exp3" 1 36 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1008 0 0
"3202" "exp3" 1 37 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1858 0 0
"3202" "exp3" 1 38 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1725 41 1
"3202" "exp3" 1 39 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1791 13 1
"3202" "exp3" 1 40 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1286 0 0
"3202" "exp3" 1 41 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1577 0 0
"3202" "exp3" 1 42 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 2408 0 0
"3202" "exp3" 1 43 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1499 0 0
"3202" "exp3" 1 44 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 963 44 1
"3202" "exp3" 1 45 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1191 11 1
"3202" "exp3" 1 46 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1217 33 1
"3202" "exp3" 1 47 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1163 25 1
"3202" "exp3" 1 48 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 940 0 0
"3202" "exp3" 1 49 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1553 0 0
"3202" "exp3" 1 50 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1529 0 0
"3202" "exp3" 1 51 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1894 21 1
"3202" "exp3" 1 52 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1378 72 1
"3202" "exp3" 1 53 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1400 14 1
"3202" "exp3" 1 54 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 830 37 1
"3202" "exp3" 1 55 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1336 14 1
"3202" "exp3" 1 56 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1560 25 1
"3202" "exp3" 1 57 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 4429 5 1
"3202" "exp3" 1 58 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1044 16 1
"3202" "exp3" 1 59 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 2446 0 0
"3202" "exp3" 1 60 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1487 0 0
"3202" "exp3" 1 61 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1516 47 1
"3202" "exp3" 1 62 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1656 0 0
"3202" "exp3" 1 63 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1795 34 1
"3202" "exp3" 1 64 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 2318 0 0
"3202" "exp3" 1 65 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 2083 0 0
"3202" "exp3" 1 66 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 673 20 1
"3202" "exp3" 1 67 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 2042 0 0
"3202" "exp3" 1 68 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 1279 0 0
"3202" "exp3" 1 69 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1094 23 1
"3202" "exp3" 1 70 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1277 36 1
"3202" "exp3" 1 71 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 1993 18 1
"3202" "exp3" 1 72 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 953 22 1
"3202" "exp3" 1 73 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 884 19 1
"3202" "exp3" 1 74 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1509 22 1
"3202" "exp3" 1 75 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 749 23 1
"3202" "exp3" 1 76 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1158 0 0
"3202" "exp3" 1 77 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1809 26 1
"3202" "exp3" 1 78 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 818 26 1
"3202" "exp3" 1 79 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1037 40 1
"3202" "exp3" 1 80 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1138 43 1
"3202" "exp3" 1 81 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 655 40 1
"3202" "exp3" 1 82 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 979 30 1
"3202" "exp3" 1 83 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 797 0 0
"3202" "exp3" 1 84 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 675 27 1
"3202" "exp3" 1 85 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1042 17 1
"3202" "exp3" 1 86 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1595 0 0
"3202" "exp3" 1 87 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1238 10 1
"3202" "exp3" 1 88 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1422 20 1
"3202" "exp3" 1 89 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1833 18 1
"3202" "exp3" 1 90 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 2135 26 1
"3202" "exp3" 1 91 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1438 43 1
"3202" "exp3" 1 92 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 662 21 1
"3202" "exp3" 1 93 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1980 72 1
"3202" "exp3" 1 94 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 668 21 1
"3202" "exp3" 1 95 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1080 19 1
"3202" "exp3" 1 96 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1456 0 0
"3202" "exp3" 1 97 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 2524 16 1
"3202" "exp3" 1 98 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1521 15 1
"3202" "exp3" 1 99 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1113 0 0
"3202" "exp3" 1 100 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 2105 28 1
"3202" "exp3" 1 101 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1106 0 0
"3202" "exp3" 1 102 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1129 31 1
"3202" "exp3" 1 103 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 907 18 1
"3202" "exp3" 1 104 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1210 0 0
"3202" "exp3" 1 105 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 854 0 0
"3202" "exp3" 1 106 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 1425 0 0
"3202" "exp3" 1 107 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 884 0 0
"3202" "exp3" 1 108 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1305 0 0
"3202" "exp3" 1 109 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 1098 0 0
"3202" "exp3" 1 110 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1383 94 1
"3202" "exp3" 1 111 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1183 39 1
"3202" "exp3" 1 112 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1309 0 0
"3202" "exp3" 1 113 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 966 12 1
"3202" "exp3" 1 114 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 3224 31 1
"3202" "exp3" 1 115 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 740 29 1
"3202" "exp3" 1 116 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 761 42 1
"3202" "exp3" 1 117 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1103 0 0
"3202" "exp3" 1 118 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1043 0 0
"3202" "exp3" 1 119 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1419 0 0
"3202" "exp3" 1 120 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 1177 0 0
"3202" "exp3" 1 121 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1587 0 0
"3202" "exp3" 1 122 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 929 0 0
"3202" "exp3" 1 123 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 975 39 1
"3202" "exp3" 1 124 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 899 0 0
"3202" "exp3" 1 125 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 907 0 0
"3202" "exp3" 1 126 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 2874 0 0
"3202" "exp3" 1 127 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 861 25 1
"3202" "exp3" 1 128 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 2096 32 1
"3202" "exp3" 1 129 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1425 64 1
"3202" "exp3" 1 130 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 2116 0 0
"3202" "exp3" 1 131 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1830 0 0
"3202" "exp3" 1 132 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 1634 0 0
"3202" "exp3" 2 1 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 898 0 0
"3202" "exp3" 2 2 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1445 23 1
"3202" "exp3" 2 3 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1335 0 0
"3202" "exp3" 2 4 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1054 0 0
"3202" "exp3" 2 5 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1326 42 1
"3202" "exp3" 2 6 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1708 17 1
"3202" "exp3" 2 7 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1345 0 0
"3202" "exp3" 2 8 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1498 0 0
"3202" "exp3" 2 9 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1419 0 0
"3202" "exp3" 2 10 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1445 74 1
"3202" "exp3" 2 11 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1896 34 1
"3202" "exp3" 2 12 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1161 0 0
"3202" "exp3" 2 13 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1588 79 1
"3202" "exp3" 2 14 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 787 84 1
"3202" "exp3" 2 15 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 771 0 0
"3202" "exp3" 2 16 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 2883 23 1
"3202" "exp3" 2 17 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1552 0 0
"3202" "exp3" 2 18 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 621 53 1
"3202" "exp3" 2 19 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1190 0 0
"3202" "exp3" 2 20 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 1643 0 0
"3202" "exp3" 2 21 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1187 68 1
"3202" "exp3" 2 22 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 853 19 1
"3202" "exp3" 2 23 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1912 69 1
"3202" "exp3" 2 24 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 3767 0 0
"3202" "exp3" 2 25 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 1789 82 1
"3202" "exp3" 2 26 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 997 45 1
"3202" "exp3" 2 27 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 3027 76 1
"3202" "exp3" 2 28 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1436 33 1
"3202" "exp3" 2 29 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 744 0 0
"3202" "exp3" 2 30 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 838 36 1
"3202" "exp3" 2 31 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 993 0 0
"3202" "exp3" 2 32 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1252 26 1
"3202" "exp3" 2 33 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 3310 0 0
"3202" "exp3" 2 34 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1242 35 1
"3202" "exp3" 2 35 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 925 46 1
"3202" "exp3" 2 36 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 1422 64 1
"3202" "exp3" 2 37 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 937 0 0
"3202" "exp3" 2 38 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1769 0 0
"3202" "exp3" 2 39 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1793 0 0
"3202" "exp3" 2 40 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 847 0 0
"3202" "exp3" 2 41 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1428 0 0
"3202" "exp3" 2 42 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 901 0 0
"3202" "exp3" 2 43 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 749 0 0
"3202" "exp3" 2 44 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1081 0 0
"3202" "exp3" 2 45 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1280 59 1
"3202" "exp3" 2 46 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1084 39 1
"3202" "exp3" 2 47 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1038 0 0
"3202" "exp3" 2 48 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 957 0 0
"3202" "exp3" 2 49 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 891 0 0
"3202" "exp3" 2 50 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1117 44 1
"3202" "exp3" 2 51 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1245 30 1
"3202" "exp3" 2 52 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1206 0 0
"3202" "exp3" 2 53 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1333 76 1
"3202" "exp3" 2 54 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1047 15 1
"3202" "exp3" 2 55 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 857 0 0
"3202" "exp3" 2 56 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1159 19 1
"3202" "exp3" 2 57 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2400 29 1
"3202" "exp3" 2 58 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 3325 0 0
"3202" "exp3" 2 59 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1337 0 0
"3202" "exp3" 2 60 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2260 0 0
"3202" "exp3" 2 61 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 1294 0 0
"3202" "exp3" 2 62 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1826 21 1
"3202" "exp3" 2 63 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1725 0 0
"3202" "exp3" 2 64 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 1034 0 0
"3202" "exp3" 2 65 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1073 0 0
"3202" "exp3" 2 66 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1162 42 1
"3202" "exp3" 2 67 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 824 0 0
"3202" "exp3" 2 68 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 209 65 1
"3202" "exp3" 2 69 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 251 5 1
"3202" "exp3" 2 70 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 377 71 1
"3202" "exp3" 2 71 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 164 32 1
"3202" "exp3" 2 72 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 342 29 1
"3202" "exp3" 2 73 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 205 22 1
"3202" "exp3" 2 74 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 215 0 0
"3202" "exp3" 2 75 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 278 21 1
"3202" "exp3" 2 76 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 251 0 0
"3202" "exp3" 2 77 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 198 9 1
"3202" "exp3" 2 78 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 340 44 1
"3202" "exp3" 2 79 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 243 0 0
"3202" "exp3" 2 80 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 203 32 1
"3202" "exp3" 2 81 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 221 0 0
"3202" "exp3" 2 82 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 253 0 0
"3202" "exp3" 2 83 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 460 0 0
"3202" "exp3" 2 84 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 788 0 0
"3202" "exp3" 2 85 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 262 0 0
"3202" "exp3" 2 86 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 188 61 1
"3202" "exp3" 2 87 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 272 0 0
"3202" "exp3" 2 88 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 190 3 1
"3202" "exp3" 2 89 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 473 27 1
"3202" "exp3" 2 90 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 468 0 0
"3202" "exp3" 2 91 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 196 0 0
"3202" "exp3" 2 92 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 483 10 1
"3202" "exp3" 2 93 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 210 28 1
"3202" "exp3" 2 94 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 346 0 0
"3202" "exp3" 2 95 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 202 0 0
"3202" "exp3" 2 96 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 216 18 1
"3202" "exp3" 2 97 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 460 24 1
"3202" "exp3" 2 98 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 199 0 0
"3202" "exp3" 2 99 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 186 0 0
"3202" "exp3" 2 100 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 384 81 1
"3202" "exp3" 2 101 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 246 0 0
"3202" "exp3" 2 102 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 189 57 1
"3202" "exp3" 2 103 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 246 32 1
"3202" "exp3" 2 104 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 229 80 1
"3202" "exp3" 2 105 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 218 0 0
"3202" "exp3" 2 106 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 246 0 0
"3202" "exp3" 2 107 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 234 0 0
"3202" "exp3" 2 108 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 389 0 0
"3202" "exp3" 2 109 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 408 93 1
"3202" "exp3" 2 110 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 327 0 0
"3202" "exp3" 2 111 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 228 23 1
"3202" "exp3" 2 112 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 259 0 0
"3202" "exp3" 2 113 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 319 0 0
"3202" "exp3" 2 114 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 417 0 0
"3202" "exp3" 2 115 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 232 78 1
"3202" "exp3" 2 116 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 424 65 1
"3202" "exp3" 2 117 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 575 0 0
"3202" "exp3" 2 118 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 333 0 0
"3202" "exp3" 2 119 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 500 17 1
"3202" "exp3" 2 120 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 513 0 0
"3202" "exp3" 2 121 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 379 0 0
"3202" "exp3" 2 122 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 406 67 1
"3202" "exp3" 2 123 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 716 0 0
"3202" "exp3" 2 124 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 538 0 0
"3202" "exp3" 2 125 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 386 0 0
"3202" "exp3" 2 126 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 368 22 1
"3202" "exp3" 2 127 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 507 28 1
"3202" "exp3" 2 128 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 223 0 0
"3202" "exp3" 2 129 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 197 0 0
"3202" "exp3" 2 130 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 245 64 1
"3202" "exp3" 2 131 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 8 0 0
"3202" "exp3" 2 132 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 198 16 1
"3202" "exp3" 1 1 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 182 24 1
"3202" "exp3" 1 2 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 408 16 1
"3202" "exp3" 1 3 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 435 21 1
"3202" "exp3" 1 4 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 347 34 1
"3202" "exp3" 1 5 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 211 81 1
"3202" "exp3" 1 6 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 646 30 1
"3202" "exp3" 1 7 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 225 0 0
"3202" "exp3" 1 8 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 234 0 0
"3202" "exp3" 1 9 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 213 10 1
"3202" "exp3" 1 10 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 196 24 1
"3202" "exp3" 1 11 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 427 29 1
"3202" "exp3" 1 12 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 384 0 0
"3202" "exp3" 1 13 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 621 35 1
"3202" "exp3" 1 14 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 326 0 0
"3202" "exp3" 1 15 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 203 0 0
"3202" "exp3" 1 16 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 297 0 0
"3202" "exp3" 1 17 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 271 0 0
"3202" "exp3" 1 18 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 217 0 0
"3202" "exp3" 1 19 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 311 19 1
"3202" "exp3" 1 20 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 241 79 1
"3202" "exp3" 1 21 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 247 0 0
"3202" "exp3" 1 22 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 206 60 1
"3202" "exp3" 1 23 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 185 0 0
"3202" "exp3" 1 24 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 439 0 0
"3202" "exp3" 1 25 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 203 42 1
"3202" "exp3" 1 26 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 198 45 1
"3202" "exp3" 1 27 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 203 75 1
"3202" "exp3" 1 28 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 294 0 0
"3202" "exp3" 1 29 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 203 0 0
"3202" "exp3" 1 30 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 206 0 0
"3202" "exp3" 1 31 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 391 0 0
"3202" "exp3" 1 32 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 245 0 0
"3202" "exp3" 1 33 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 257 0 0
"3202" "exp3" 1 34 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 195 0 0
"3202" "exp3" 1 35 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 261 0 0
"3202" "exp3" 1 36 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 243 18 1
"3202" "exp3" 1 37 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 356 17 1
"3202" "exp3" 1 38 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 197 0 0
"3202" "exp3" 1 39 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 265 46 1
"3202" "exp3" 1 40 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 207 0 0
"3202" "exp3" 1 41 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 268 0 0
"3202" "exp3" 1 42 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 393 0 0
"3202" "exp3" 1 43 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 272 51 1
"3202" "exp3" 1 44 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 381 68 1
"3202" "exp3" 1 45 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 333 0 0
"3202" "exp3" 1 46 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 308 0 0
"3202" "exp3" 1 47 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 198 38 1
"3202" "exp3" 1 48 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 351 0 0
"3202" "exp3" 1 49 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 246 42 1
"3202" "exp3" 1 50 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 214 0 0
"3202" "exp3" 1 51 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 522 0 0
"3202" "exp3" 1 52 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 388 0 0
"3202" "exp3" 1 53 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 361 0 0
"3202" "exp3" 1 54 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 634 0 0
"3202" "exp3" 1 55 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 471 0 0
"3202" "exp3" 1 56 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 526 0 0
"3202" "exp3" 1 57 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 396 0 0
"3202" "exp3" 1 58 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 209 17 1
"3202" "exp3" 1 59 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 49 36 1
"3202" "exp3" 1 60 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 188 0 0
"3202" "exp3" 1 61 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 213 3 1
"3202" "exp3" 1 62 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 392 6 1
"3202" "exp3" 1 63 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 37 0 0
"3202" "exp3" 1 64 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 257 74 1
"3202" "exp3" 1 65 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 148 21 1
"3202" "exp3" 1 66 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 174 11 1
"3202" "exp3" 1 67 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 188 38 1
"3202" "exp3" 1 68 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 185 0 0
"3202" "exp3" 1 69 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 229 0 0
"3202" "exp3" 1 70 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 719 23 1
"3202" "exp3" 1 71 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 248 22 1
"3202" "exp3" 1 72 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 224 56 1
"3202" "exp3" 1 73 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 222 91 1
"3202" "exp3" 1 74 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 160 15 1
"3202" "exp3" 1 75 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 163 56 1
"3202" "exp3" 1 76 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 313 66 1
"3202" "exp3" 1 77 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 223 12 1
"3202" "exp3" 1 78 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 585 0 0
"3202" "exp3" 1 79 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 259 0 0
"3202" "exp3" 1 80 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 195 15 1
"3202" "exp3" 1 81 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 240 0 0
"3202" "exp3" 1 82 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 264 33 1
"3202" "exp3" 1 83 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 433 25 1
"3202" "exp3" 1 84 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 435 0 0
"3202" "exp3" 1 85 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 82 0 0
"3202" "exp3" 1 86 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 200 33 1
"3202" "exp3" 1 87 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 168 0 0
"3202" "exp3" 1 88 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 171 19 1
"3202" "exp3" 1 89 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 322 0 0
"3202" "exp3" 1 90 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 561 0 0
"3202" "exp3" 1 91 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 166 0 0
"3202" "exp3" 1 92 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 221 0 0
"3202" "exp3" 1 93 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 81 14 1
"3202" "exp3" 1 94 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 261 64 1
"3202" "exp3" 1 95 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 472 13 1
"3202" "exp3" 1 96 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 257 0 0
"3202" "exp3" 1 97 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 271 9 1
"3202" "exp3" 1 98 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 204 0 0
"3202" "exp3" 1 99 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 521 4 1
"3202" "exp3" 1 100 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 625 0 0
"3202" "exp3" 1 101 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 276 0 0
"3202" "exp3" 1 102 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 503 0 0
"3202" "exp3" 1 103 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 319 25 1
"3202" "exp3" 1 104 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 284 0 0
"3202" "exp3" 1 105 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 359 0 0
"3202" "exp3" 1 106 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 235 0 0
"3202" "exp3" 1 107 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 278 85 1
"3202" "exp3" 1 108 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 701 61 1
"3202" "exp3" 1 109 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 480 37 1
"3202" "exp3" 1 110 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 639 0 0
"3202" "exp3" 1 111 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 539 6 1
"3202" "exp3" 1 112 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 643 0 0
"3202" "exp3" 1 113 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 516 0 0
"3202" "exp3" 1 114 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 361 53 1
"3202" "exp3" 1 115 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 387 33 1
"3202" "exp3" 1 116 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 557 0 0
"3202" "exp3" 1 117 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 203 34 1
"3202" "exp3" 1 118 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 281 0 0
"3202" "exp3" 1 119 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 458 20 1
"3202" "exp3" 1 120 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 213 33 1
"3202" "exp3" 1 121 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 321 82 1
"3202" "exp3" 1 122 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 285 78 1
"3202" "exp3" 1 123 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 567 0 0
"3202" "exp3" 1 124 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 289 37 1
"3202" "exp3" 1 125 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 236 0 0
"3202" "exp3" 1 126 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 282 23 1
"3202" "exp3" 1 127 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 250 0 0
"3202" "exp3" 1 128 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 342 59 1
"3202" "exp3" 1 129 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 285 0 0
"3202" "exp3" 1 130 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 308 0 0
"3202" "exp3" 1 131 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 206 0 0
"3202" "exp3" 1 132 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 374 71 1
"3202" "exp3" 2 1 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1557 0 0
"3202" "exp3" 2 2 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 280 41 1
"3202" "exp3" 2 3 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 427 0 0
"3202" "exp3" 2 4 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 569 0 0
"3202" "exp3" 2 5 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 694 26 1
"3202" "exp3" 2 6 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 410 73 1
"3202" "exp3" 2 7 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 356 0 0
"3202" "exp3" 2 8 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 212 0 0
"3202" "exp3" 2 9 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 239 0 0
"3202" "exp3" 2 10 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 195 93 1
"3202" "exp3" 2 11 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 166 0 0
"3202" "exp3" 2 12 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 241 32 1
"3202" "exp3" 2 13 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 233 10 1
"3202" "exp3" 2 14 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 359 0 0
"3202" "exp3" 2 15 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 137 0 0
"3202" "exp3" 2 16 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 322 19 1
"3202" "exp3" 2 17 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 347 63 1
"3202" "exp3" 2 18 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 5345 0 0
"3202" "exp3" 2 19 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 283 0 0
"3202" "exp3" 2 20 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 151 0 0
"3202" "exp3" 2 21 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 638 0 0
"3202" "exp3" 2 22 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 262 0 0
"3202" "exp3" 2 23 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 447 0 0
"3202" "exp3" 2 24 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 740 0 0
"3202" "exp3" 2 25 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 473 22 1
"3202" "exp3" 2 26 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 472 39 1
"3202" "exp3" 2 27 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 298 85 1
"3202" "exp3" 2 28 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 244 45 1
"3202" "exp3" 2 29 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 306 0 0
"3202" "exp3" 2 30 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 92 0 0
"3202" "exp3" 2 31 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 241 0 0
"3202" "exp3" 2 32 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 211 7 1
"3202" "exp3" 2 33 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 224 0 0
"3202" "exp3" 2 34 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 275 65 1
"3202" "exp3" 2 35 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 222 5 1
"3202" "exp3" 2 36 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 260 20 1
"3202" "exp3" 2 37 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 229 0 0
"3202" "exp3" 2 38 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 275 66 1
"3202" "exp3" 2 39 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 203 11 1
"3202" "exp3" 2 40 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 292 0 0
"3202" "exp3" 2 41 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 199 69 1
"3202" "exp3" 2 42 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 243 0 0
"3202" "exp3" 2 43 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 250 47 1
"3202" "exp3" 2 44 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 271 0 0
"3202" "exp3" 2 45 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 207 24 1
"3202" "exp3" 2 46 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 194 76 1
"3202" "exp3" 2 47 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 298 84 1
"3202" "exp3" 2 48 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 500 0 0
"3202" "exp3" 2 49 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 422 96 1
"3202" "exp3" 2 50 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 488 72 1
"3202" "exp3" 2 51 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 372 30 1
"3202" "exp3" 2 52 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 306 0 0
"3202" "exp3" 2 53 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 977 33 1
"3202" "exp3" 2 54 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 574 68 1
"3202" "exp3" 2 55 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1123 23 1
"3202" "exp3" 2 56 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 511 45 1
"3202" "exp3" 2 57 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 309 21 1
"3202" "exp3" 2 58 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 315 18 1
"3202" "exp3" 2 59 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 490 0 0
"3202" "exp3" 2 60 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 626 82 1
"3202" "exp3" 2 61 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 424 0 0
"3202" "exp3" 2 62 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 563 0 0
"3202" "exp3" 2 63 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 515 68 1
"3202" "exp3" 2 64 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 558 0 0
"3202" "exp3" 2 65 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 575 0 0
"3202" "exp3" 2 66 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 642 69 1
"3202" "exp3" 2 67 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 651 0 0
"3202" "exp3" 2 68 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 514 0 0
"3202" "exp3" 2 69 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1034 0 0
"3202" "exp3" 2 70 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 650 0 0
"3202" "exp3" 2 71 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1099 37 1
"3202" "exp3" 2 72 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1824 0 0
"3202" "exp3" 2 73 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 791 0 0
"3202" "exp3" 2 74 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 421 0 0
"3202" "exp3" 2 75 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 467 0 0
"3202" "exp3" 2 76 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1511 0 0
"3202" "exp3" 2 77 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 473 0 0
"3202" "exp3" 2 78 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 806 0 0
"3202" "exp3" 2 79 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1073 31 1
"3202" "exp3" 2 80 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 744 0 0
"3202" "exp3" 2 81 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 1052 3 1
"3202" "exp3" 2 82 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 793 0 0
"3202" "exp3" 2 83 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 591 0 0
"3202" "exp3" 2 84 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 469 0 0
"3202" "exp3" 2 85 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 522 0 0
"3202" "exp3" 2 86 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 215 0 0
"3202" "exp3" 2 87 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 245 0 0
"3202" "exp3" 2 88 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 199 0 0
"3202" "exp3" 2 89 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 221 39 1
"3202" "exp3" 2 90 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 148 72 1
"3202" "exp3" 2 91 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 185 0 0
"3202" "exp3" 2 92 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 263 42 1
"3202" "exp3" 2 93 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 245 71 1
"3202" "exp3" 2 94 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 263 14 1
"3202" "exp3" 2 95 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 283 35 1
"3202" "exp3" 2 96 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 237 0 0
"3202" "exp3" 2 97 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 266 78 1
"3202" "exp3" 2 98 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 178 0 0
"3202" "exp3" 2 99 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 253 19 1
"3202" "exp3" 2 100 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 787 66 1
"3202" "exp3" 2 101 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1032 0 0
"3202" "exp3" 2 102 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 461 0 0
"3202" "exp3" 2 103 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 431 0 0
"3202" "exp3" 2 104 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 794 40 1
"3202" "exp3" 2 105 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 805 0 0
"3202" "exp3" 2 106 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1058 17 1
"3202" "exp3" 2 107 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 977 0 0
"3202" "exp3" 2 108 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 833 82 1
"3202" "exp3" 2 109 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 631 18 1
"3202" "exp3" 2 110 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 404 25 1
"3202" "exp3" 2 111 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 468 67 1
"3202" "exp3" 2 112 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 513 0 0
"3202" "exp3" 2 113 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 411 0 0
"3202" "exp3" 2 114 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 864 0 0
"3202" "exp3" 2 115 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 731 31 1
"3202" "exp3" 2 116 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 221 0 0
"3202" "exp3" 2 117 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 403 0 0
"3202" "exp3" 2 118 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 205 62 1
"3202" "exp3" 2 119 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 319 62 1
"3202" "exp3" 2 120 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 786 0 0
"3202" "exp3" 2 121 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 608 63 1
"3202" "exp3" 2 122 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 695 0 0
"3202" "exp3" 2 123 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 796 0 0
"3202" "exp3" 2 124 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 656 0 0
"3202" "exp3" 2 125 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 649 0 0
"3202" "exp3" 2 126 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 695 0 0
"3202" "exp3" 2 127 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 675 0 0
"3202" "exp3" 2 128 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 444 0 0
"3202" "exp3" 2 129 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 828 0 0
"3202" "exp3" 2 130 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 937 0 0
"3202" "exp3" 2 131 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 582 70 1
"3202" "exp3" 2 132 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 849 0 0
"3202" "exp3" 1 1 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 313 0 0
"3202" "exp3" 1 2 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 235 0 0
"3202" "exp3" 1 3 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 463 0 0
"3202" "exp3" 1 4 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 575 0 0
"3202" "exp3" 1 5 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 813 0 0
"3202" "exp3" 1 6 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 596 0 0
"3202" "exp3" 1 7 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 750 0 0
"3202" "exp3" 1 8 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 335 0 0
"3202" "exp3" 1 9 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 608 24 1
"3202" "exp3" 1 10 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 879 0 0
"3202" "exp3" 1 11 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 892 0 0
"3202" "exp3" 1 12 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 954 92 1
"3202" "exp3" 1 13 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 705 0 0
"3202" "exp3" 1 14 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 537 74 1
"3202" "exp3" 1 15 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 584 0 0
"3202" "exp3" 1 16 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1322 44 1
"3202" "exp3" 1 17 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2171 0 0
"3202" "exp3" 1 18 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 1687 55 1
"3202" "exp3" 1 19 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1428 23 1
"3202" "exp3" 1 20 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 2053 0 0
"3202" "exp3" 1 21 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1696 0 0
"3202" "exp3" 1 22 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 1127 0 0
"3202" "exp3" 1 23 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1353 68 1
"3202" "exp3" 1 24 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 915 15 1
"3202" "exp3" 1 25 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 737 0 0
"3202" "exp3" 1 26 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1482 83 1
"3202" "exp3" 1 27 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 1134 77 1
"3202" "exp3" 1 28 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1202 0 0
"3202" "exp3" 1 29 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 588 69 1
"3202" "exp3" 1 30 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 501 0 0
"3202" "exp3" 1 31 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 238 0 0
"3202" "exp3" 1 32 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 248 0 0
"3202" "exp3" 1 33 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 352 0 0
"3202" "exp3" 1 34 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 288 52 1
"3202" "exp3" 1 35 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 397 22 1
"3202" "exp3" 1 36 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 474 67 1
"3202" "exp3" 1 37 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 262 46 1
"3202" "exp3" 1 38 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 216 14 1
"3202" "exp3" 1 39 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1170 81 1
"3202" "exp3" 1 40 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 1423 0 0
"3202" "exp3" 1 41 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1059 0 0
"3202" "exp3" 1 42 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1047 0 0
"3202" "exp3" 1 43 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1068 76 1
"3202" "exp3" 1 44 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 998 0 0
"3202" "exp3" 1 45 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 701 26 1
"3202" "exp3" 1 46 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1886 0 0
"3202" "exp3" 1 47 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 463 29 1
"3202" "exp3" 1 48 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 923 9 1
"3202" "exp3" 1 49 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1227 0 0
"3202" "exp3" 1 50 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 940 19 1
"3202" "exp3" 1 51 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1124 40 1
"3202" "exp3" 1 52 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 189 43 1
"3202" "exp3" 1 53 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 243 0 0
"3202" "exp3" 1 54 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 181 25 1
"3202" "exp3" 1 55 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 191 56 1
"3202" "exp3" 1 56 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 389 0 0
"3202" "exp3" 1 57 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 215 34 1
"3202" "exp3" 1 58 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 682 20 1
"3202" "exp3" 1 59 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 398 73 1
"3202" "exp3" 1 60 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 278 0 0
"3202" "exp3" 1 61 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 346 35 1
"3202" "exp3" 1 62 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 266 18 1
"3202" "exp3" 1 63 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 194 6 1
"3202" "exp3" 1 64 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 545 18 1
"3202" "exp3" 1 65 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 506 0 0
"3202" "exp3" 1 66 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 356 23 1
"3202" "exp3" 1 67 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 353 0 0
"3202" "exp3" 1 68 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 549 32 1
"3202" "exp3" 1 69 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1147 25 1
"3202" "exp3" 1 70 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 601 28 1
"3202" "exp3" 1 71 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 237 6 1
"3202" "exp3" 1 72 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 194 8 1
"3202" "exp3" 1 73 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 202 0 0
"3202" "exp3" 1 74 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 177 0 0
"3202" "exp3" 1 75 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 247 0 0
"3202" "exp3" 1 76 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 202 0 0
"3202" "exp3" 1 77 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 330 0 0
"3202" "exp3" 1 78 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 403 0 0
"3202" "exp3" 1 79 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 258 38 1
"3202" "exp3" 1 80 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 183 42 1
"3202" "exp3" 1 81 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 250 0 0
"3202" "exp3" 1 82 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 245 0 0
"3202" "exp3" 1 83 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 87 15 1
"3202" "exp3" 1 84 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 232 34 1
"3202" "exp3" 1 85 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 275 81 1
"3202" "exp3" 1 86 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 276 23 1
"3202" "exp3" 1 87 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 381 0 0
"3202" "exp3" 1 88 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 19 0 0
"3202" "exp3" 1 89 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 170 31 1
"3202" "exp3" 1 90 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 138 28 1
"3202" "exp3" 1 91 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 706 0 0
"3202" "exp3" 1 92 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2353 0 0
"3202" "exp3" 1 93 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 761 0 0
"3202" "exp3" 1 94 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 602 0 0
"3202" "exp3" 1 95 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 603 0 0
"3202" "exp3" 1 96 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 1200 0 0
"3202" "exp3" 1 97 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 864 0 0
"3202" "exp3" 1 98 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 881 18 1
"3202" "exp3" 1 99 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 814 9 1
"3202" "exp3" 1 100 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 633 0 0
"3202" "exp3" 1 101 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 1095 63 1
"3202" "exp3" 1 102 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2923 0 0
"3202" "exp3" 1 103 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 811 0 0
"3202" "exp3" 1 104 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 356 75 1
"3202" "exp3" 1 105 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 358 32 1
"3202" "exp3" 1 106 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 69 59 1
"3202" "exp3" 1 107 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 639 42 1
"3202" "exp3" 1 108 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 387 79 1
"3202" "exp3" 1 109 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 779 0 0
"3202" "exp3" 1 110 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 226 0 0
"3202" "exp3" 1 111 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 387 0 0
"3202" "exp3" 1 112 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 238 0 0
"3202" "exp3" 1 113 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 212 0 0
"3202" "exp3" 1 114 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 175 0 0
"3202" "exp3" 1 115 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 442 90 1
"3202" "exp3" 1 116 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1063 0 0
"3202" "exp3" 1 117 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 866 0 0
"3202" "exp3" 1 118 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 744 0 0
"3202" "exp3" 1 119 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 572 36 1
"3202" "exp3" 1 120 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 277 0 0
"3202" "exp3" 1 121 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 810 0 0
"3202" "exp3" 1 122 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 969 0 0
"3202" "exp3" 1 123 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 497 96 1
"3202" "exp3" 1 124 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 604 0 0
"3202" "exp3" 1 125 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 175 33 1
"3202" "exp3" 1 126 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 391 0 0
"3202" "exp3" 1 127 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 647 0 0
"3202" "exp3" 1 128 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 691 87 1
"3202" "exp3" 1 129 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 647 0 0
"3202" "exp3" 1 130 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 824 0 0
"3202" "exp3" 1 131 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 532 0 0
"3202" "exp3" 1 132 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1134 0 0
"3202" "exp3" 2 1 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 333 71 1
"3202" "exp3" 2 2 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 242 8 1
"3202" "exp3" 2 3 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 933 0 0
"3202" "exp3" 2 4 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 3173 33 1
"3202" "exp3" 2 5 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 3297 0 0
"3202" "exp3" 2 6 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 2758 0 0
"3202" "exp3" 2 7 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 3649 0 0
"3202" "exp3" 2 8 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 3660 0 0
"3202" "exp3" 2 9 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1537 0 0
"3202" "exp3" 2 10 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1872 0 0
"3202" "exp3" 2 11 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 4238 36 1
"3202" "exp3" 2 12 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 2066 77 1
"3202" "exp3" 2 13 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 3325 0 0
"3202" "exp3" 2 14 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1248 14 1
"3202" "exp3" 2 15 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 2234 26 1
"3202" "exp3" 2 16 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 3744 0 0
"3202" "exp3" 2 17 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 3641 14 1
"3202" "exp3" 2 18 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2193 0 0
"3202" "exp3" 2 19 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 2346 22 1
"3202" "exp3" 2 20 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 2100 66 1
"3202" "exp3" 2 21 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 2237 0 0
"3202" "exp3" 2 22 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2556 0 0
"3202" "exp3" 2 23 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1907 6 1
"3202" "exp3" 2 24 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 4292 59 1
"3202" "exp3" 2 25 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 3266 0 0
"3202" "exp3" 2 26 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1976 35 1
"3202" "exp3" 2 27 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 565 0 0
"3202" "exp3" 2 28 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1650 0 0
"3202" "exp3" 2 29 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 3304 24 1
"3202" "exp3" 2 30 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 690 45 1
"3202" "exp3" 2 31 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 2466 21 1
"3202" "exp3" 2 32 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 2473 26 1
"3202" "exp3" 2 33 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1483 0 0
"3202" "exp3" 2 34 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 2576 0 0
"3202" "exp3" 2 35 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 2914 0 0
"3202" "exp3" 2 36 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 2102 0 0
"3202" "exp3" 2 37 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 931 12 1
"3202" "exp3" 2 38 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 838 44 1
"3202" "exp3" 2 39 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 514 13 1
"3202" "exp3" 2 40 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 581 12 1
"3202" "exp3" 2 41 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 428 32 1
"3202" "exp3" 2 42 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 546 0 0
"3202" "exp3" 2 43 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 347 15 1
"3202" "exp3" 2 44 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 631 0 0
"3202" "exp3" 2 45 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 1066 0 0
"3202" "exp3" 2 46 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 644 0 0
"3202" "exp3" 2 47 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 404 0 0
"3202" "exp3" 2 48 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 204 10 1
"3202" "exp3" 2 49 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 218 70 1
"3202" "exp3" 2 50 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 122 19 1
"3202" "exp3" 2 51 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 748 0 0
"3202" "exp3" 2 52 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 896 0 0
"3202" "exp3" 2 53 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1407 0 0
"3202" "exp3" 2 54 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 601 0 0
"3202" "exp3" 2 55 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 662 63 1
"3202" "exp3" 2 56 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 803 0 0
"3202" "exp3" 2 57 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 726 0 0
"3202" "exp3" 2 58 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 993 0 0
"3202" "exp3" 2 59 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 664 54 1
"3202" "exp3" 2 60 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 768 35 1
"3202" "exp3" 2 61 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 2485 13 1
"3202" "exp3" 2 62 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 1568 57 1
"3202" "exp3" 2 63 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 659 0 0
"3202" "exp3" 2 64 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 673 0 0
"3202" "exp3" 2 65 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 808 0 0
"3202" "exp3" 2 66 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 945 72 1
"3202" "exp3" 2 67 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 762 0 0
"3202" "exp3" 2 68 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1243 0 0
"3202" "exp3" 2 69 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 655 78 1
"3202" "exp3" 2 70 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 751 0 0
"3202" "exp3" 2 71 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 957 0 0
"3202" "exp3" 2 72 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 1235 0 0
"3202" "exp3" 2 73 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 2098 19 1
"3202" "exp3" 2 74 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1592 0 0
"3202" "exp3" 2 75 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1377 0 0
"3202" "exp3" 2 76 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 1375 82 1
"3202" "exp3" 2 77 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1853 17 1
"3202" "exp3" 2 78 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1456 0 0
"3202" "exp3" 2 79 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 3803 26 1
"3202" "exp3" 2 80 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1334 5 1
"3202" "exp3" 2 81 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 559 0 0
"3202" "exp3" 2 82 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 982 0 0
"3202" "exp3" 2 83 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 822 0 0
"3202" "exp3" 2 84 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 753 5 1
"3202" "exp3" 2 85 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1450 30 1
"3202" "exp3" 2 86 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 413 0 0
"3202" "exp3" 2 87 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 728 0 0
"3202" "exp3" 2 88 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 483 68 1
"3202" "exp3" 2 89 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 723 0 0
"3202" "exp3" 2 90 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 505 0 0
"3202" "exp3" 2 91 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 668 0 0
"3202" "exp3" 2 92 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 420 0 0
"3202" "exp3" 2 93 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 784 0 0
"3202" "exp3" 2 94 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 593 0 0
"3202" "exp3" 2 95 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 883 0 0
"3202" "exp3" 2 96 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 628 0 0
"3202" "exp3" 2 97 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 734 0 0
"3202" "exp3" 2 98 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 571 0 0
"3202" "exp3" 2 99 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 364 17 1
"3202" "exp3" 2 100 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 624 0 0
"3202" "exp3" 2 101 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 754 75 1
"3202" "exp3" 2 102 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 884 0 0
"3202" "exp3" 2 103 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 594 0 0
"3202" "exp3" 2 104 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 978 0 0
"3202" "exp3" 2 105 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1068 29 1
"3202" "exp3" 2 106 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 311 31 1
"3202" "exp3" 2 107 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 272 28 1
"3202" "exp3" 2 108 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 494 0 0
"3202" "exp3" 2 109 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 517 66 1
"3202" "exp3" 2 110 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 900 0 0
"3202" "exp3" 2 111 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 797 0 0
"3202" "exp3" 2 112 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 865 0 0
"3202" "exp3" 2 113 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 740 0 0
"3202" "exp3" 2 114 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 610 0 0
"3202" "exp3" 2 115 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 788 0 0
"3202" "exp3" 2 116 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 1114 0 0
"3202" "exp3" 2 117 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 775 0 0
"3202" "exp3" 2 118 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 597 0 0
"3202" "exp3" 2 119 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 646 0 0
"3202" "exp3" 2 120 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 1842 72 1
"3202" "exp3" 2 121 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 651 0 0
"3202" "exp3" 2 122 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 961 0 0
"3202" "exp3" 2 123 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 1020 0 0
"3202" "exp3" 2 124 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 777 0 0
"3202" "exp3" 2 125 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 239 0 0
"3202" "exp3" 2 126 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 353 0 0
"3202" "exp3" 2 127 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 346 0 0
"3202" "exp3" 2 128 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 124 0 0
"3202" "exp3" 2 129 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 260 25 1
"3202" "exp3" 2 130 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 272 0 0
"3202" "exp3" 2 131 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 573 60 1
"3202" "exp3" 2 132 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 1245 51 1
"3202" "exp3" 1 1 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 435 0 0
"3202" "exp3" 1 2 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 919 20 1
"3202" "exp3" 1 3 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1661 32 1
"3202" "exp3" 1 4 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1806 0 0
"3202" "exp3" 1 5 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2075 43 1
"3202" "exp3" 1 6 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 5202 0 0
"3202" "exp3" 1 7 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 902 0 0
"3202" "exp3" 1 8 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1379 22 1
"3202" "exp3" 1 9 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1033 27 1
"3202" "exp3" 1 10 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 2081 6 1
"3202" "exp3" 1 11 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 876 1 1
"3202" "exp3" 1 12 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 911 0 0
"3202" "exp3" 1 13 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 643 0 0
"3202" "exp3" 1 14 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 244 48 1
"3202" "exp3" 1 15 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 727 0 0
"3202" "exp3" 1 16 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 416 0 0
"3202" "exp3" 1 17 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 212 0 0
"3202" "exp3" 1 18 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 356 30 1
"3202" "exp3" 1 19 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 612 26 1
"3202" "exp3" 1 20 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 512 35 1
"3202" "exp3" 1 21 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 2565 0 0
"3202" "exp3" 1 22 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1960 28 1
"3202" "exp3" 1 23 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 292 0 0
"3202" "exp3" 1 24 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2658 0 0
"3202" "exp3" 1 25 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 723 0 0
"3202" "exp3" 1 26 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 460 0 0
"3202" "exp3" 1 27 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1090 5 1
"3202" "exp3" 1 28 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 637 30 1
"3202" "exp3" 1 29 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 726 21 1
"3202" "exp3" 1 30 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 764 10 1
"3202" "exp3" 1 31 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1267 0 0
"3202" "exp3" 1 32 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2075 37 1
"3202" "exp3" 1 33 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1748 0 0
"3202" "exp3" 1 34 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 916 15 1
"3202" "exp3" 1 35 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 1946 0 0
"3202" "exp3" 1 36 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1723 59 1
"3202" "exp3" 1 37 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 630 15 1
"3202" "exp3" 1 38 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 712 41 1
"3202" "exp3" 1 39 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1786 0 0
"3202" "exp3" 1 40 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1338 0 0
"3202" "exp3" 1 41 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 2008 56 1
"3202" "exp3" 1 42 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1292 0 0
"3202" "exp3" 1 43 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 472 0 0
"3202" "exp3" 1 44 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 234 72 1
"3202" "exp3" 1 45 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 299 0 0
"3202" "exp3" 1 46 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1082 7 1
"3202" "exp3" 1 47 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1571 31 1
"3202" "exp3" 1 48 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 917 0 0
"3202" "exp3" 1 49 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 559 0 0
"3202" "exp3" 1 50 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 175 20 1
"3202" "exp3" 1 51 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 547 34 1
"3202" "exp3" 1 52 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 559 58 1
"3202" "exp3" 1 53 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1667 0 0
"3202" "exp3" 1 54 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 919 0 0
"3202" "exp3" 1 55 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 399 0 0
"3202" "exp3" 1 56 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 665 67 1
"3202" "exp3" 1 57 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 2083 20 1
"3202" "exp3" 1 58 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1433 0 0
"3202" "exp3" 1 59 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 498 0 0
"3202" "exp3" 1 60 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 793 55 1
"3202" "exp3" 1 61 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1044 0 0
"3202" "exp3" 1 62 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 414 0 0
"3202" "exp3" 1 63 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 724 0 0
"3202" "exp3" 1 64 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 362 0 0
"3202" "exp3" 1 65 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 674 0 0
"3202" "exp3" 1 66 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 345 0 0
"3202" "exp3" 1 67 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 452 28 1
"3202" "exp3" 1 68 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 563 0 0
"3202" "exp3" 1 69 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1068 88 1
"3202" "exp3" 1 70 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 604 0 0
"3202" "exp3" 1 71 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 967 0 0
"3202" "exp3" 1 72 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 609 34 1
"3202" "exp3" 1 73 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 810 67 1
"3202" "exp3" 1 74 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 749 0 0
"3202" "exp3" 1 75 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 985 23 1
"3202" "exp3" 1 76 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 763 0 0
"3202" "exp3" 1 77 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1690 19 1
"3202" "exp3" 1 78 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1383 76 1
"3202" "exp3" 1 79 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1710 0 0
"3202" "exp3" 1 80 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 899 16 1
"3202" "exp3" 1 81 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 745 0 0
"3202" "exp3" 1 82 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1378 47 1
"3202" "exp3" 1 83 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1995 44 1
"3202" "exp3" 1 84 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 2249 0 0
"3202" "exp3" 1 85 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 5161 25 1
"3202" "exp3" 1 86 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 453 67 1
"3202" "exp3" 1 87 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 2672 0 0
"3202" "exp3" 1 88 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1262 9 1
"3202" "exp3" 1 89 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1639 12 1
"3202" "exp3" 1 90 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 649 35 1
"3202" "exp3" 1 91 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1385 42 1
"3202" "exp3" 1 92 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 762 0 0
"3202" "exp3" 1 93 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 625 0 0
"3202" "exp3" 1 94 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 860 61 1
"3202" "exp3" 1 95 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 485 0 0
"3202" "exp3" 1 96 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 520 0 0
"3202" "exp3" 1 97 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 306 0 0
"3202" "exp3" 1 98 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 491 38 1
"3202" "exp3" 1 99 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 926 36 1
"3202" "exp3" 1 100 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 218 0 0
"3202" "exp3" 1 101 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 530 0 0
"3202" "exp3" 1 102 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 209 92 1
"3202" "exp3" 1 103 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 644 0 0
"3202" "exp3" 1 104 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 512 0 0
"3202" "exp3" 1 105 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 447 0 0
"3202" "exp3" 1 106 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 851 40 1
"3202" "exp3" 1 107 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 640 0 0
"3202" "exp3" 1 108 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 439 0 0
"3202" "exp3" 1 109 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 403 16 1
"3202" "exp3" 1 110 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 912 0 0
"3202" "exp3" 1 111 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1544 4 1
"3202" "exp3" 1 112 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1125 0 0
"3202" "exp3" 1 113 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1316 62 1
"3202" "exp3" 1 114 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1237 14 1
"3202" "exp3" 1 115 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 817 34 1
"3202" "exp3" 1 116 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 397 24 1
"3202" "exp3" 1 117 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 836 11 1
"3202" "exp3" 1 118 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 854 27 1
"3202" "exp3" 1 119 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 614 36 1
"3202" "exp3" 1 120 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 453 0 0
"3202" "exp3" 1 121 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 658 19 1
"3202" "exp3" 1 122 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 692 0 0
"3202" "exp3" 1 123 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1113 6 1
"3202" "exp3" 1 124 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 918 0 0
"3202" "exp3" 1 125 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1308 0 0
"3202" "exp3" 1 126 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 403 0 0
"3202" "exp3" 1 127 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 824 0 0
"3202" "exp3" 1 128 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 646 0 0
"3202" "exp3" 1 129 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 1848 0 0
"3202" "exp3" 1 130 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 337 22 1
"3202" "exp3" 1 131 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 750 0 0
"3202" "exp3" 1 132 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 249 0 0
"3202" "exp3" 2 1 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1097 0 0
"3202" "exp3" 2 2 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 350 0 0
"3202" "exp3" 2 3 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 547 30 1
"3202" "exp3" 2 4 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 962 0 0
"3202" "exp3" 2 5 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 218 0 0
"3202" "exp3" 2 6 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 861 19 1
"3202" "exp3" 2 7 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 582 0 0
"3202" "exp3" 2 8 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 377 28 1
"3202" "exp3" 2 9 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1084 0 0
"3202" "exp3" 2 10 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 723 25 1
"3202" "exp3" 2 11 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1126 38 1
"3202" "exp3" 2 12 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 336 23 1
"3202" "exp3" 2 13 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 218 0 0
"3202" "exp3" 2 14 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 341 0 0
"3202" "exp3" 2 15 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1415 0 0
"3202" "exp3" 2 16 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1017 44 1
"3202" "exp3" 2 17 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 482 22 1
"3202" "exp3" 2 18 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1020 43 1
"3202" "exp3" 2 19 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 595 0 0
"3202" "exp3" 2 20 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1032 0 0
"3202" "exp3" 2 21 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 879 0 0
"3202" "exp3" 2 22 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1173 63 1
"3202" "exp3" 2 23 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1662 79 1
"3202" "exp3" 2 24 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1164 0 0
"3202" "exp3" 2 25 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 546 0 0
"3202" "exp3" 2 26 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 840 0 0
"3202" "exp3" 2 27 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1020 27 1
"3202" "exp3" 2 28 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 1882 0 0
"3202" "exp3" 2 29 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1638 31 1
"3202" "exp3" 2 30 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1548 0 0
"3202" "exp3" 2 31 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 960 0 0
"3202" "exp3" 2 32 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1103 10 1
"3202" "exp3" 2 33 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1252 0 0
"3202" "exp3" 2 34 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 486 0 0
"3202" "exp3" 2 35 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1222 47 1
"3202" "exp3" 2 36 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 871 27 1
"3202" "exp3" 2 37 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1121 28 1
"3202" "exp3" 2 38 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 921 0 0
"3202" "exp3" 2 39 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 454 64 1
"3202" "exp3" 2 40 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 722 0 0
"3202" "exp3" 2 41 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 202 79 1
"3202" "exp3" 2 42 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 647 13 1
"3202" "exp3" 2 43 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 437 17 1
"3202" "exp3" 2 44 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 614 68 1
"3202" "exp3" 2 45 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 500 0 0
"3202" "exp3" 2 46 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 946 31 1
"3202" "exp3" 2 47 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 975 0 0
"3202" "exp3" 2 48 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 532 0 0
"3202" "exp3" 2 49 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 789 0 0
"3202" "exp3" 2 50 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1116 70 1
"3202" "exp3" 2 51 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1049 0 0
"3202" "exp3" 2 52 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1095 17 1
"3202" "exp3" 2 53 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1027 23 1
"3202" "exp3" 2 54 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 828 0 0
"3202" "exp3" 2 55 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 2539 0 0
"3202" "exp3" 2 56 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 913 69 1
"3202" "exp3" 2 57 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1025 0 0
"3202" "exp3" 2 58 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1872 0 0
"3202" "exp3" 2 59 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 1135 5 1
"3202" "exp3" 2 60 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 604 22 1
"3202" "exp3" 2 61 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 1838 0 0
"3202" "exp3" 2 62 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1408 0 0
"3202" "exp3" 2 63 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1212 0 0
"3202" "exp3" 2 64 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1042 8 1
"3202" "exp3" 2 65 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1156 0 0
"3202" "exp3" 2 66 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1161 0 0
"3202" "exp3" 2 67 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 507 0 0
"3202" "exp3" 2 68 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 336 72 1
"3202" "exp3" 2 69 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 162 0 0
"3202" "exp3" 2 70 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 32 0 0
"3202" "exp3" 2 71 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1675 0 0
"3202" "exp3" 2 72 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1052 0 0
"3202" "exp3" 2 73 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 584 71 1
"3202" "exp3" 2 74 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 671 0 0
"3202" "exp3" 2 75 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 605 63 1
"3202" "exp3" 2 76 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 667 26 1
"3202" "exp3" 2 77 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 706 81 1
"3202" "exp3" 2 78 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1153 0 0
"3202" "exp3" 2 79 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 824 0 0
"3202" "exp3" 2 80 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 713 25 1
"3202" "exp3" 2 81 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 852 21 1
"3202" "exp3" 2 82 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 820 16 1
"3202" "exp3" 2 83 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 575 0 0
"3202" "exp3" 2 84 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 533 0 0
"3202" "exp3" 2 85 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 402 0 0
"3202" "exp3" 2 86 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 832 0 0
"3202" "exp3" 2 87 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 2045 45 1
"3202" "exp3" 2 88 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 854 0 0
"3202" "exp3" 2 89 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1926 84 1
"3202" "exp3" 2 90 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 618 0 0
"3202" "exp3" 2 91 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 932 0 0
"3202" "exp3" 2 92 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1043 52 1
"3202" "exp3" 2 93 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 986 32 1
"3202" "exp3" 2 94 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 423 16 1
"3202" "exp3" 2 95 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 664 14 1
"3202" "exp3" 2 96 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 771 13 1
"3202" "exp3" 2 97 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 453 6 1
"3202" "exp3" 2 98 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 620 67 1
"3202" "exp3" 2 99 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 738 0 0
"3202" "exp3" 2 100 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 328 0 0
"3202" "exp3" 2 101 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 765 37 1
"3202" "exp3" 2 102 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 378 0 0
"3202" "exp3" 2 103 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 229 11 1
"3202" "exp3" 2 104 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 707 29 1
"3202" "exp3" 2 105 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 636 24 1
"3202" "exp3" 2 106 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 484 0 0
"3202" "exp3" 2 107 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 842 0 0
"3202" "exp3" 2 108 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 448 0 0
"3202" "exp3" 2 109 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 305 0 0
"3202" "exp3" 2 110 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 1277 0 0
"3202" "exp3" 2 111 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 272 0 0
"3202" "exp3" 2 112 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 487 0 0
"3202" "exp3" 2 113 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2466 73 1
"3202" "exp3" 2 114 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 764 1 1
"3202" "exp3" 2 115 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 794 0 0
"3202" "exp3" 2 116 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 260 6 1
"3202" "exp3" 2 117 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 463 0 0
"3202" "exp3" 2 118 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 571 71 1
"3202" "exp3" 2 119 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 627 0 0
"3202" "exp3" 2 120 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 226 20 1
"3202" "exp3" 2 121 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 615 0 0
"3202" "exp3" 2 122 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 641 0 0
"3202" "exp3" 2 123 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 835 0 0
"3202" "exp3" 2 124 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 857 0 0
"3202" "exp3" 2 125 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 430 0 0
"3202" "exp3" 2 126 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 703 54 1
"3202" "exp3" 2 127 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 885 68 1
"3202" "exp3" 2 128 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 691 81 1
"3202" "exp3" 2 129 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 922 0 0
"3202" "exp3" 2 130 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 708 26 1
"3202" "exp3" 2 131 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 643 0 0
"3202" "exp3" 2 132 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 991 49 1
"3203" "exp3" 1 1 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 651 35 1
"3203" "exp3" 1 2 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 780 15 1
"3203" "exp3" 1 3 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 781 24 1
"3203" "exp3" 1 4 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 654 31 1
"3203" "exp3" 1 5 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 608 38 1
"3203" "exp3" 1 6 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 766 23 1
"3203" "exp3" 1 7 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 534 24 1
"3203" "exp3" 1 8 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 554 21 1
"3203" "exp3" 1 9 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1457 28 1
"3203" "exp3" 1 10 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 843 39 1
"3203" "exp3" 1 11 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 696 11 1
"3203" "exp3" 1 12 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 776 0 0
"3203" "exp3" 1 13 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 607 16 1
"3203" "exp3" 1 14 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 804 36 1
"3203" "exp3" 1 15 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 809 0 0
"3203" "exp3" 1 16 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 652 0 0
"3203" "exp3" 1 17 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1507 25 1
"3203" "exp3" 1 18 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 513 18 1
"3203" "exp3" 1 19 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 602 0 0
"3203" "exp3" 1 20 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 662 0 0
"3203" "exp3" 1 21 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 485 0 0
"3203" "exp3" 1 22 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 693 21 1
"3203" "exp3" 1 23 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 464 17 1
"3203" "exp3" 1 24 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 637 26 1
"3203" "exp3" 1 25 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 729 48 1
"3203" "exp3" 1 26 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 584 5 1
"3203" "exp3" 1 27 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1018 36 1
"3203" "exp3" 1 28 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 550 0 0
"3203" "exp3" 1 29 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 869 44 1
"3203" "exp3" 1 30 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 597 26 1
"3203" "exp3" 1 31 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 505 20 1
"3203" "exp3" 1 32 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 878 0 0
"3203" "exp3" 1 33 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 398 22 1
"3203" "exp3" 1 34 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 884 32 1
"3203" "exp3" 1 35 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 763 33 1
"3203" "exp3" 1 36 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 630 24 1
"3203" "exp3" 1 37 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 615 23 1
"3203" "exp3" 1 38 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 498 32 1
"3203" "exp3" 1 39 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 658 0 0
"3203" "exp3" 1 40 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 671 19 1
"3203" "exp3" 1 41 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 736 0 0
"3203" "exp3" 1 42 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 483 35 1
"3203" "exp3" 1 43 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 490 0 0
"3203" "exp3" 1 44 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 686 40 1
"3203" "exp3" 1 45 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 996 23 1
"3203" "exp3" 1 46 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 799 20 1
"3203" "exp3" 1 47 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 464 39 1
"3203" "exp3" 1 48 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 462 19 1
"3203" "exp3" 1 49 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 554 13 1
"3203" "exp3" 1 50 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1050 40 1
"3203" "exp3" 1 51 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1039 29 1
"3203" "exp3" 1 52 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 706 0 0
"3203" "exp3" 1 53 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 506 35 1
"3203" "exp3" 1 54 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1198 27 1
"3203" "exp3" 1 55 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 966 34 1
"3203" "exp3" 1 56 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 671 0 0
"3203" "exp3" 1 57 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 663 0 0
"3203" "exp3" 1 58 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 779 29 1
"3203" "exp3" 1 59 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 546 30 1
"3203" "exp3" 1 60 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 871 21 1
"3203" "exp3" 1 61 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 450 37 1
"3203" "exp3" 1 62 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 524 21 1
"3203" "exp3" 1 63 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 460 28 1
"3203" "exp3" 1 64 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 832 26 1
"3203" "exp3" 1 65 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 669 0 0
"3203" "exp3" 1 66 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 908 1 1
"3203" "exp3" 1 67 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1176 15 1
"3203" "exp3" 1 68 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 580 29 1
"3203" "exp3" 1 69 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 947 67 1
"3203" "exp3" 1 70 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1044 6 1
"3203" "exp3" 1 71 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 707 0 0
"3203" "exp3" 1 72 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 802 42 1
"3203" "exp3" 1 73 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 557 17 1
"3203" "exp3" 1 74 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 550 12 1
"3203" "exp3" 1 75 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 493 3 1
"3203" "exp3" 1 76 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 681 18 1
"3203" "exp3" 1 77 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 929 0 0
"3203" "exp3" 1 78 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 846 67 1
"3203" "exp3" 1 79 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 821 28 1
"3203" "exp3" 1 80 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 756 0 0
"3203" "exp3" 1 81 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 554 20 1
"3203" "exp3" 1 82 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 584 0 0
"3203" "exp3" 1 83 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 789 43 1
"3203" "exp3" 1 84 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 652 8 1
"3203" "exp3" 1 85 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 519 19 1
"3203" "exp3" 1 86 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 536 0 0
"3203" "exp3" 1 87 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 638 9 1
"3203" "exp3" 1 88 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 479 10 1
"3203" "exp3" 1 89 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 515 0 0
"3203" "exp3" 1 90 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 397 31 1
"3203" "exp3" 1 91 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 611 22 1
"3203" "exp3" 1 92 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 650 54 1
"3203" "exp3" 1 93 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 593 20 1
"3203" "exp3" 1 94 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 568 16 1
"3203" "exp3" 1 95 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 690 0 0
"3203" "exp3" 1 96 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 544 0 0
"3203" "exp3" 1 97 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 500 30 1
"3203" "exp3" 1 98 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 376 27 1
"3203" "exp3" 1 99 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 568 45 1
"3203" "exp3" 1 100 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 758 18 1
"3203" "exp3" 1 101 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 558 30 1
"3203" "exp3" 1 102 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 544 0 0
"3203" "exp3" 1 103 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 434 74 1
"3203" "exp3" 1 104 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1071 10 1
"3203" "exp3" 1 105 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 514 25 1
"3203" "exp3" 1 106 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 572 12 1
"3203" "exp3" 1 107 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 488 0 0
"3203" "exp3" 1 108 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 421 15 1
"3203" "exp3" 1 109 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 880 13 1
"3203" "exp3" 1 110 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 531 14 1
"3203" "exp3" 1 111 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 594 0 0
"3203" "exp3" 1 112 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 497 17 1
"3203" "exp3" 1 113 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 673 32 1
"3203" "exp3" 1 114 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 690 0 0
"3203" "exp3" 1 115 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 692 34 1
"3203" "exp3" 1 116 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 686 37 1
"3203" "exp3" 1 117 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 726 0 0
"3203" "exp3" 1 118 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 528 2 1
"3203" "exp3" 1 119 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 491 9 1
"3203" "exp3" 1 120 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 440 0 0
"3203" "exp3" 1 121 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 762 8 1
"3203" "exp3" 1 122 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 509 0 0
"3203" "exp3" 1 123 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 901 34 1
"3203" "exp3" 1 124 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 560 17 1
"3203" "exp3" 1 125 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 687 0 0
"3203" "exp3" 1 126 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 573 0 0
"3203" "exp3" 1 127 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 734 0 0
"3203" "exp3" 1 128 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 469 27 1
"3203" "exp3" 1 129 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 660 0 0
"3203" "exp3" 1 130 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 729 0 0
"3203" "exp3" 1 131 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1536 0 0
"3203" "exp3" 1 132 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 956 16 1
"3203" "exp3" 2 1 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 769 34 1
"3203" "exp3" 2 2 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 359 10 1
"3203" "exp3" 2 3 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 615 67 1
"3203" "exp3" 2 4 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 621 0 0
"3203" "exp3" 2 5 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 796 0 0
"3203" "exp3" 2 6 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 538 7 1
"3203" "exp3" 2 7 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 719 12 1
"3203" "exp3" 2 8 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1013 0 0
"3203" "exp3" 2 9 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 693 0 0
"3203" "exp3" 2 10 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 566 30 1
"3203" "exp3" 2 11 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 723 0 0
"3203" "exp3" 2 12 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 600 39 1
"3203" "exp3" 2 13 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 448 44 1
"3203" "exp3" 2 14 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 653 85 1
"3203" "exp3" 2 15 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 871 0 0
"3203" "exp3" 2 16 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 577 0 0
"3203" "exp3" 2 17 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 726 12 1
"3203" "exp3" 2 18 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 705 32 1
"3203" "exp3" 2 19 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 939 34 1
"3203" "exp3" 2 20 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 606 0 0
"3203" "exp3" 2 21 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 949 27 1
"3203" "exp3" 2 22 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 553 39 1
"3203" "exp3" 2 23 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 623 0 0
"3203" "exp3" 2 24 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 804 48 1
"3203" "exp3" 2 25 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 787 13 1
"3203" "exp3" 2 26 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 681 30 1
"3203" "exp3" 2 27 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 784 0 0
"3203" "exp3" 2 28 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 539 4 1
"3203" "exp3" 2 29 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 530 25 1
"3203" "exp3" 2 30 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 739 27 1
"3203" "exp3" 2 31 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 503 24 1
"3203" "exp3" 2 32 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 538 43 1
"3203" "exp3" 2 33 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 488 24 1
"3203" "exp3" 2 34 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 741 7 1
"3203" "exp3" 2 35 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 604 0 0
"3203" "exp3" 2 36 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1361 0 0
"3203" "exp3" 2 37 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 625 18 1
"3203" "exp3" 2 38 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 439 11 1
"3203" "exp3" 2 39 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 509 0 0
"3203" "exp3" 2 40 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 450 0 0
"3203" "exp3" 2 41 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1026 14 1
"3203" "exp3" 2 42 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1721 0 0
"3203" "exp3" 2 43 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 584 0 0
"3203" "exp3" 2 44 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1193 30 1
"3203" "exp3" 2 45 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1151 21 1
"3203" "exp3" 2 46 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 780 3 1
"3203" "exp3" 2 47 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 679 31 1
"3203" "exp3" 2 48 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 570 0 0
"3203" "exp3" 2 49 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 777 41 1
"3203" "exp3" 2 50 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 696 0 0
"3203" "exp3" 2 51 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 672 22 1
"3203" "exp3" 2 52 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 541 17 1
"3203" "exp3" 2 53 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 655 19 1
"3203" "exp3" 2 54 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 509 37 1
"3203" "exp3" 2 55 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 681 19 1
"3203" "exp3" 2 56 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 865 0 0
"3203" "exp3" 2 57 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 722 0 0
"3203" "exp3" 2 58 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 778 0 0
"3203" "exp3" 2 59 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 930 10 1
"3203" "exp3" 2 60 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 668 17 1
"3203" "exp3" 2 61 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 788 5 1
"3203" "exp3" 2 62 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 520 29 1
"3203" "exp3" 2 63 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 524 44 1
"3203" "exp3" 2 64 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 563 24 1
"3203" "exp3" 2 65 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 661 27 1
"3203" "exp3" 2 66 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 586 1 1
"3203" "exp3" 2 67 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 739 30 1
"3203" "exp3" 2 68 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 653 0 0
"3203" "exp3" 2 69 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 696 28 1
"3203" "exp3" 2 70 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 788 35 1
"3203" "exp3" 2 71 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 635 6 1
"3203" "exp3" 2 72 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 712 31 1
"3203" "exp3" 2 73 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 942 35 1
"3203" "exp3" 2 74 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 603 26 1
"3203" "exp3" 2 75 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 563 0 0
"3203" "exp3" 2 76 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 504 13 1
"3203" "exp3" 2 77 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 519 9 1
"3203" "exp3" 2 78 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 979 0 0
"3203" "exp3" 2 79 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 602 21 1
"3203" "exp3" 2 80 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 759 0 0
"3203" "exp3" 2 81 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 617 0 0
"3203" "exp3" 2 82 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 934 28 1
"3203" "exp3" 2 83 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 553 14 1
"3203" "exp3" 2 84 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 776 0 0
"3203" "exp3" 2 85 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 700 0 0
"3203" "exp3" 2 86 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 489 8 1
"3203" "exp3" 2 87 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 513 18 1
"3203" "exp3" 2 88 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 555 6 1
"3203" "exp3" 2 89 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 636 20 1
"3203" "exp3" 2 90 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 423 18 1
"3203" "exp3" 2 91 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 838 0 0
"3203" "exp3" 2 92 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 484 29 1
"3203" "exp3" 2 93 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 793 36 1
"3203" "exp3" 2 94 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 805 33 1
"3203" "exp3" 2 95 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 653 24 1
"3203" "exp3" 2 96 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 512 28 1
"3203" "exp3" 2 97 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 593 0 0
"3203" "exp3" 2 98 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 542 32 1
"3203" "exp3" 2 99 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 692 0 0
"3203" "exp3" 2 100 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 559 23 1
"3203" "exp3" 2 101 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 514 0 0
"3203" "exp3" 2 102 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 509 16 1
"3203" "exp3" 2 103 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 976 42 1
"3203" "exp3" 2 104 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 474 5 1
"3203" "exp3" 2 105 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 733 38 1
"3203" "exp3" 2 106 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 737 15 1
"3203" "exp3" 2 107 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 575 21 1
"3203" "exp3" 2 108 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 478 19 1
"3203" "exp3" 2 109 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 509 0 0
"3203" "exp3" 2 110 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 933 0 0
"3203" "exp3" 2 111 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 786 23 1
"3203" "exp3" 2 112 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 616 8 1
"3203" "exp3" 2 113 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 423 0 0
"3203" "exp3" 2 114 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 834 41 1
"3203" "exp3" 2 115 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 485 0 0
"3203" "exp3" 2 116 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 654 16 1
"3203" "exp3" 2 117 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 428 0 0
"3203" "exp3" 2 118 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 355 0 0
"3203" "exp3" 2 119 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 481 0 0
"3203" "exp3" 2 120 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 694 31 1
"3203" "exp3" 2 121 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 910 0 0
"3203" "exp3" 2 122 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 530 18 1
"3203" "exp3" 2 123 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 795 0 0
"3203" "exp3" 2 124 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 817 0 0
"3203" "exp3" 2 125 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 462 11 1
"3203" "exp3" 2 126 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 718 22 1
"3203" "exp3" 2 127 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 478 20 1
"3203" "exp3" 2 128 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 545 16 1
"3203" "exp3" 2 129 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 515 17 1
"3203" "exp3" 2 130 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 471 69 1
"3203" "exp3" 2 131 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 560 17 1
"3203" "exp3" 2 132 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 498 33 1
"3203" "exp3" 1 1 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 467 33 1
"3203" "exp3" 1 2 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 412 44 1
"3203" "exp3" 1 3 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 358 0 0
"3203" "exp3" 1 4 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 393 16 1
"3203" "exp3" 1 5 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 387 40 1
"3203" "exp3" 1 6 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 403 20 1
"3203" "exp3" 1 7 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 396 0 0
"3203" "exp3" 1 8 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 374 27 1
"3203" "exp3" 1 9 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 352 18 1
"3203" "exp3" 1 10 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 375 0 0
"3203" "exp3" 1 11 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 316 22 1
"3203" "exp3" 1 12 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 511 27 1
"3203" "exp3" 1 13 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 654 0 0
"3203" "exp3" 1 14 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 485 35 1
"3203" "exp3" 1 15 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 495 28 1
"3203" "exp3" 1 16 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 450 36 1
"3203" "exp3" 1 17 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 565 0 0
"3203" "exp3" 1 18 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 364 0 0
"3203" "exp3" 1 19 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 396 38 1
"3203" "exp3" 1 20 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 389 0 0
"3203" "exp3" 1 21 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 389 0 0
"3203" "exp3" 1 22 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 402 29 1
"3203" "exp3" 1 23 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 342 7 1
"3203" "exp3" 1 24 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 572 9 1
"3203" "exp3" 1 25 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 999 0 0
"3203" "exp3" 1 26 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 511 31 1
"3203" "exp3" 1 27 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 557 47 1
"3203" "exp3" 1 28 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 516 25 1
"3203" "exp3" 1 29 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 421 25 1
"3203" "exp3" 1 30 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 559 13 1
"3203" "exp3" 1 31 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 388 32 1
"3203" "exp3" 1 32 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 398 0 0
"3203" "exp3" 1 33 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 372 25 1
"3203" "exp3" 1 34 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 351 43 1
"3203" "exp3" 1 35 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 365 41 1
"3203" "exp3" 1 36 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 340 24 1
"3203" "exp3" 1 37 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 349 6 1
"3203" "exp3" 1 38 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 501 34 1
"3203" "exp3" 1 39 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 373 10 1
"3203" "exp3" 1 40 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 848 0 0
"3203" "exp3" 1 41 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 464 26 1
"3203" "exp3" 1 42 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 427 20 1
"3203" "exp3" 1 43 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 485 0 0
"3203" "exp3" 1 44 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 371 30 1
"3203" "exp3" 1 45 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 521 36 1
"3203" "exp3" 1 46 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 362 42 1
"3203" "exp3" 1 47 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 516 0 0
"3203" "exp3" 1 48 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 419 17 1
"3203" "exp3" 1 49 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 544 32 1
"3203" "exp3" 1 50 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 423 9 1
"3203" "exp3" 1 51 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 478 16 1
"3203" "exp3" 1 52 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 336 8 1
"3203" "exp3" 1 53 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 694 5 1
"3203" "exp3" 1 54 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 655 0 0
"3203" "exp3" 1 55 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 537 26 1
"3203" "exp3" 1 56 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 358 0 0
"3203" "exp3" 1 57 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 355 24 1
"3203" "exp3" 1 58 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 425 6 1
"3203" "exp3" 1 59 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 656 21 1
"3203" "exp3" 1 60 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 431 24 1
"3203" "exp3" 1 61 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 362 39 1
"3203" "exp3" 1 62 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 658 12 1
"3203" "exp3" 1 63 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 689 0 0
"3203" "exp3" 1 64 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 381 5 1
"3203" "exp3" 1 65 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 359 17 1
"3203" "exp3" 1 66 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 558 30 1
"3203" "exp3" 1 67 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 366 0 0
"3203" "exp3" 1 68 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 397 33 1
"3203" "exp3" 1 69 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 283 33 1
"3203" "exp3" 1 70 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 475 0 0
"3203" "exp3" 1 71 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 409 0 0
"3203" "exp3" 1 72 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 407 12 1
"3203" "exp3" 1 73 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 271 15 1
"3203" "exp3" 1 74 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 388 15 1
"3203" "exp3" 1 75 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 397 22 1
"3203" "exp3" 1 76 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 595 21 1
"3203" "exp3" 1 77 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 385 27 1
"3203" "exp3" 1 78 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 444 0 0
"3203" "exp3" 1 79 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 448 29 1
"3203" "exp3" 1 80 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 499 17 1
"3203" "exp3" 1 81 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 347 0 0
"3203" "exp3" 1 82 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 317 23 1
"3203" "exp3" 1 83 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 371 29 1
"3203" "exp3" 1 84 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 464 0 0
"3203" "exp3" 1 85 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 387 0 0
"3203" "exp3" 1 86 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 1064 3 1
"3203" "exp3" 1 87 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 480 13 1
"3203" "exp3" 1 88 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 392 4 1
"3203" "exp3" 1 89 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 394 23 1
"3203" "exp3" 1 90 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 573 31 1
"3203" "exp3" 1 91 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 420 1 1
"3203" "exp3" 1 92 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 579 0 0
"3203" "exp3" 1 93 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 372 29 1
"3203" "exp3" 1 94 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 403 0 0
"3203" "exp3" 1 95 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 542 0 0
"3203" "exp3" 1 96 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 419 41 1
"3203" "exp3" 1 97 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 447 0 0
"3203" "exp3" 1 98 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 461 30 1
"3203" "exp3" 1 99 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 716 22 1
"3203" "exp3" 1 100 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 354 0 0
"3203" "exp3" 1 101 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 399 11 1
"3203" "exp3" 1 102 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 431 45 1
"3203" "exp3" 1 103 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 515 7 1
"3203" "exp3" 1 104 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 312 8 1
"3203" "exp3" 1 105 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 322 31 1
"3203" "exp3" 1 106 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 567 0 0
"3203" "exp3" 1 107 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 475 10 1
"3203" "exp3" 1 108 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 445 21 1
"3203" "exp3" 1 109 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 346 19 1
"3203" "exp3" 1 110 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 415 0 0
"3203" "exp3" 1 111 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 713 30 1
"3203" "exp3" 1 112 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 621 20 1
"3203" "exp3" 1 113 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 488 23 1
"3203" "exp3" 1 114 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 541 19 1
"3203" "exp3" 1 115 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 567 26 1
"3203" "exp3" 1 116 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 365 0 0
"3203" "exp3" 1 117 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 458 36 1
"3203" "exp3" 1 118 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 375 14 1
"3203" "exp3" 1 119 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 443 37 1
"3203" "exp3" 1 120 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 199 58 1
"3203" "exp3" 1 121 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 410 39 1
"3203" "exp3" 1 122 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 729 0 0
"3203" "exp3" 1 123 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 717 34 1
"3203" "exp3" 1 124 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 426 0 0
"3203" "exp3" 1 125 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 425 0 0
"3203" "exp3" 1 126 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 602 40 1
"3203" "exp3" 1 127 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 348 37 1
"3203" "exp3" 1 128 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 475 14 1
"3203" "exp3" 1 129 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 422 2 1
"3203" "exp3" 1 130 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 390 0 0
"3203" "exp3" 1 131 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 422 0 0
"3203" "exp3" 1 132 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 317 0 0
"3203" "exp3" 2 1 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 535 13 1
"3203" "exp3" 2 2 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 331 21 1
"3203" "exp3" 2 3 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 258 0 0
"3203" "exp3" 2 4 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 485 15 1
"3203" "exp3" 2 5 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 399 9 1
"3203" "exp3" 2 6 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 367 27 1
"3203" "exp3" 2 7 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 454 45 1
"3203" "exp3" 2 8 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 312 0 0
"3203" "exp3" 2 9 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 482 46 1
"3203" "exp3" 2 10 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 302 2 1
"3203" "exp3" 2 11 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 306 0 0
"3203" "exp3" 2 12 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 354 0 0
"3203" "exp3" 2 13 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 450 22 1
"3203" "exp3" 2 14 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 550 0 0
"3203" "exp3" 2 15 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 733 44 1
"3203" "exp3" 2 16 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 625 0 0
"3203" "exp3" 2 17 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 488 33 1
"3203" "exp3" 2 18 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 327 13 1
"3203" "exp3" 2 19 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 335 1 1
"3203" "exp3" 2 20 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 524 29 1
"3203" "exp3" 2 21 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 823 5 1
"3203" "exp3" 2 22 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 456 21 1
"3203" "exp3" 2 23 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 410 26 1
"3203" "exp3" 2 24 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 380 0 0
"3203" "exp3" 2 25 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 452 0 0
"3203" "exp3" 2 26 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 598 0 0
"3203" "exp3" 2 27 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 448 13 1
"3203" "exp3" 2 28 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 367 33 1
"3203" "exp3" 2 29 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 597 31 1
"3203" "exp3" 2 30 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 413 17 1
"3203" "exp3" 2 31 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 430 28 1
"3203" "exp3" 2 32 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 488 0 0
"3203" "exp3" 2 33 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 444 0 0
"3203" "exp3" 2 34 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 388 30 1
"3203" "exp3" 2 35 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 345 21 1
"3203" "exp3" 2 36 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 363 16 1
"3203" "exp3" 2 37 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 363 0 0
"3203" "exp3" 2 38 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 793 40 1
"3203" "exp3" 2 39 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 338 36 1
"3203" "exp3" 2 40 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 371 0 0
"3203" "exp3" 2 41 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 573 32 1
"3203" "exp3" 2 42 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 405 33 1
"3203" "exp3" 2 43 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 441 18 1
"3203" "exp3" 2 44 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 325 7 1
"3203" "exp3" 2 45 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 366 30 1
"3203" "exp3" 2 46 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 318 0 0
"3203" "exp3" 2 47 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 358 23 1
"3203" "exp3" 2 48 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 332 36 1
"3203" "exp3" 2 49 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 364 8 1
"3203" "exp3" 2 50 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 547 15 1
"3203" "exp3" 2 51 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 250 0 0
"3203" "exp3" 2 52 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 401 35 1
"3203" "exp3" 2 53 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 438 36 1
"3203" "exp3" 2 54 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 354 12 1
"3203" "exp3" 2 55 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 376 15 1
"3203" "exp3" 2 56 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 415 18 1
"3203" "exp3" 2 57 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 297 11 1
"3203" "exp3" 2 58 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 505 35 1
"3203" "exp3" 2 59 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 601 38 1
"3203" "exp3" 2 60 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 362 48 1
"3203" "exp3" 2 61 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 410 24 1
"3203" "exp3" 2 62 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 495 0 0
"3203" "exp3" 2 63 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 470 0 0
"3203" "exp3" 2 64 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 682 0 0
"3203" "exp3" 2 65 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 429 14 1
"3203" "exp3" 2 66 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 369 39 1
"3203" "exp3" 2 67 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 482 42 1
"3203" "exp3" 2 68 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 436 0 0
"3203" "exp3" 2 69 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 457 21 1
"3203" "exp3" 2 70 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 724 0 0
"3203" "exp3" 2 71 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 375 0 0
"3203" "exp3" 2 72 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 323 5 1
"3203" "exp3" 2 73 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 510 0 0
"3203" "exp3" 2 74 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 404 25 1
"3203" "exp3" 2 75 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 636 47 1
"3203" "exp3" 2 76 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 357 7 1
"3203" "exp3" 2 77 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 461 23 1
"3203" "exp3" 2 78 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 447 0 0
"3203" "exp3" 2 79 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 364 26 1
"3203" "exp3" 2 80 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 366 0 0
"3203" "exp3" 2 81 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 532 9 1
"3203" "exp3" 2 82 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 546 0 0
"3203" "exp3" 2 83 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 337 26 1
"3203" "exp3" 2 84 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 378 20 1
"3203" "exp3" 2 85 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 299 0 0
"3203" "exp3" 2 86 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 520 44 1
"3203" "exp3" 2 87 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 361 0 0
"3203" "exp3" 2 88 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 367 17 1
"3203" "exp3" 2 89 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 371 16 1
"3203" "exp3" 2 90 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 446 28 1
"3203" "exp3" 2 91 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 256 29 1
"3203" "exp3" 2 92 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 258 18 1
"3203" "exp3" 2 93 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 336 11 1
"3203" "exp3" 2 94 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 402 0 0
"3203" "exp3" 2 95 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 224 0 0
"3203" "exp3" 2 96 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 323 0 0
"3203" "exp3" 2 97 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 367 20 1
"3203" "exp3" 2 98 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 368 0 0
"3203" "exp3" 2 99 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 376 34 1
"3203" "exp3" 2 100 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 370 12 1
"3203" "exp3" 2 101 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 388 0 0
"3203" "exp3" 2 102 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 462 14 1
"3203" "exp3" 2 103 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 400 19 1
"3203" "exp3" 2 104 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 346 16 1
"3203" "exp3" 2 105 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 375 27 1
"3203" "exp3" 2 106 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 359 19 1
"3203" "exp3" 2 107 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 377 25 1
"3203" "exp3" 2 108 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 590 30 1
"3203" "exp3" 2 109 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 392 0 0
"3203" "exp3" 2 110 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 371 29 1
"3203" "exp3" 2 111 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 387 0 0
"3203" "exp3" 2 112 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 352 23 1
"3203" "exp3" 2 113 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 389 45 1
"3203" "exp3" 2 114 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 364 32 1
"3203" "exp3" 2 115 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 580 31 1
"3203" "exp3" 2 116 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 344 19 1
"3203" "exp3" 2 117 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 333 0 0
"3203" "exp3" 2 118 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 316 37 1
"3203" "exp3" 2 119 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 506 25 1
"3203" "exp3" 2 120 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 294 43 1
"3203" "exp3" 2 121 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 381 40 1
"3203" "exp3" 2 122 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 452 20 1
"3203" "exp3" 2 123 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 640 25 1
"3203" "exp3" 2 124 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 287 22 1
"3203" "exp3" 2 125 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 356 24 1
"3203" "exp3" 2 126 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 486 28 1
"3203" "exp3" 2 127 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 273 0 0
"3203" "exp3" 2 128 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 368 31 1
"3203" "exp3" 2 129 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 399 0 0
"3203" "exp3" 2 130 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 612 6 1
"3203" "exp3" 2 131 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 279 0 0
"3203" "exp3" 2 132 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 325 8 1
"3203" "exp3" 1 1 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 536 31 1
"3203" "exp3" 1 2 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 550 33 1
"3203" "exp3" 1 3 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 378 15 1
"3203" "exp3" 1 4 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 569 29 1
"3203" "exp3" 1 5 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 418 11 1
"3203" "exp3" 1 6 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 666 27 1
"3203" "exp3" 1 7 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 590 26 1
"3203" "exp3" 1 8 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 527 0 0
"3203" "exp3" 1 9 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 457 13 1
"3203" "exp3" 1 10 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 447 10 1
"3203" "exp3" 1 11 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 476 16 1
"3203" "exp3" 1 12 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 545 29 1
"3203" "exp3" 1 13 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 473 30 1
"3203" "exp3" 1 14 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 487 0 0
"3203" "exp3" 1 15 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 443 18 1
"3203" "exp3" 1 16 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 440 30 1
"3203" "exp3" 1 17 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 469 33 1
"3203" "exp3" 1 18 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 402 37 1
"3203" "exp3" 1 19 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 693 15 1
"3203" "exp3" 1 20 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 732 7 1
"3203" "exp3" 1 21 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 403 17 1
"3203" "exp3" 1 22 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 722 49 1
"3203" "exp3" 1 23 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 526 6 1
"3203" "exp3" 1 24 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 658 17 1
"3203" "exp3" 1 25 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 465 24 1
"3203" "exp3" 1 26 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 653 0 0
"3203" "exp3" 1 27 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 614 20 1
"3203" "exp3" 1 28 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 774 0 0
"3203" "exp3" 1 29 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 754 1 1
"3203" "exp3" 1 30 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 812 25 1
"3203" "exp3" 1 31 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 463 34 1
"3203" "exp3" 1 32 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 826 16 1
"3203" "exp3" 1 33 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 922 0 0
"3203" "exp3" 1 34 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 946 41 1
"3203" "exp3" 1 35 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1176 19 1
"3203" "exp3" 1 36 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1396 33 1
"3203" "exp3" 1 37 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 690 22 1
"3203" "exp3" 1 38 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1166 13 1
"3203" "exp3" 1 39 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1091 39 1
"3203" "exp3" 1 40 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 671 43 1
"3203" "exp3" 1 41 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 669 28 1
"3203" "exp3" 1 42 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 661 0 0
"3203" "exp3" 1 43 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1039 38 1
"3203" "exp3" 1 44 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 622 0 0
"3203" "exp3" 1 45 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 935 24 1
"3203" "exp3" 1 46 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 739 6 1
"3203" "exp3" 1 47 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1962 0 0
"3203" "exp3" 1 48 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1072 32 1
"3203" "exp3" 1 49 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 723 21 1
"3203" "exp3" 1 50 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 695 32 1
"3203" "exp3" 1 51 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 515 5 1
"3203" "exp3" 1 52 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1057 0 0
"3203" "exp3" 1 53 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 724 41 1
"3203" "exp3" 1 54 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 439 2 1
"3203" "exp3" 1 55 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 718 25 1
"3203" "exp3" 1 56 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1115 8 1
"3203" "exp3" 1 57 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 633 23 1
"3203" "exp3" 1 58 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 664 0 0
"3203" "exp3" 1 59 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 790 35 1
"3203" "exp3" 1 60 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 815 40 1
"3203" "exp3" 1 61 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 503 22 1
"3203" "exp3" 1 62 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 477 19 1
"3203" "exp3" 1 63 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 708 25 1
"3203" "exp3" 1 64 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 926 0 0
"3203" "exp3" 1 65 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 813 8 1
"3203" "exp3" 1 66 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1881 0 0
"3203" "exp3" 1 67 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 516 24 1
"3203" "exp3" 1 68 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 677 4 1
"3203" "exp3" 1 69 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 992 9 1
"3203" "exp3" 1 70 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 587 28 1
"3203" "exp3" 1 71 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 533 18 1
"3203" "exp3" 1 72 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 606 22 1
"3203" "exp3" 1 73 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 512 5 1
"3203" "exp3" 1 74 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 765 47 1
"3203" "exp3" 1 75 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 590 32 1
"3203" "exp3" 1 76 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 517 31 1
"3203" "exp3" 1 77 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 639 0 0
"3203" "exp3" 1 78 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 776 29 1
"3203" "exp3" 1 79 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 567 0 0
"3203" "exp3" 1 80 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 525 0 0
"3203" "exp3" 1 81 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 588 27 1
"3203" "exp3" 1 82 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 434 34 1
"3203" "exp3" 1 83 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 649 22 1
"3203" "exp3" 1 84 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 444 27 1
"3203" "exp3" 1 85 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 561 21 1
"3203" "exp3" 1 86 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 732 34 1
"3203" "exp3" 1 87 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 318 0 0
"3203" "exp3" 1 88 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 513 21 1
"3203" "exp3" 1 89 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 998 18 1
"3203" "exp3" 1 90 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 488 46 1
"3203" "exp3" 1 91 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 507 0 0
"3203" "exp3" 1 92 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 482 0 0
"3203" "exp3" 1 93 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 537 0 0
"3203" "exp3" 1 94 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 801 28 1
"3203" "exp3" 1 95 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 417 17 1
"3203" "exp3" 1 96 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 545 19 1
"3203" "exp3" 1 97 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 561 29 1
"3203" "exp3" 1 98 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 655 0 0
"3203" "exp3" 1 99 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 477 44 1
"3203" "exp3" 1 100 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 524 0 0
"3203" "exp3" 1 101 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 919 27 1
"3203" "exp3" 1 102 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 836 20 1
"3203" "exp3" 1 103 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 762 15 1
"3203" "exp3" 1 104 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 487 9 1
"3203" "exp3" 1 105 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 950 45 1
"3203" "exp3" 1 106 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 506 0 0
"3203" "exp3" 1 107 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 471 13 1
"3203" "exp3" 1 108 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 516 14 1
"3203" "exp3" 1 109 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 484 0 0
"3203" "exp3" 1 110 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 532 0 0
"3203" "exp3" 1 111 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 495 23 1
"3203" "exp3" 1 112 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 775 0 0
"3203" "exp3" 1 113 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 870 0 0
"3203" "exp3" 1 114 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 548 10 1
"3203" "exp3" 1 115 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 456 0 0
"3203" "exp3" 1 116 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 528 23 1
"3203" "exp3" 1 117 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 526 16 1
"3203" "exp3" 1 118 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 736 36 1
"3203" "exp3" 1 119 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 425 17 1
"3203" "exp3" 1 120 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 565 31 1
"3203" "exp3" 1 121 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 519 32 1
"3203" "exp3" 1 122 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 721 12 1
"3203" "exp3" 1 123 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 743 42 1
"3203" "exp3" 1 124 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 682 0 0
"3203" "exp3" 1 125 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 501 37 1
"3203" "exp3" 1 126 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 383 0 0
"3203" "exp3" 1 127 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 411 26 1
"3203" "exp3" 1 128 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 635 21 1
"3203" "exp3" 1 129 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 517 3 1
"3203" "exp3" 1 130 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 971 14 1
"3203" "exp3" 1 131 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 827 11 1
"3203" "exp3" 1 132 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 843 42 1
"3203" "exp3" 2 1 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 557 0 0
"3203" "exp3" 2 2 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 299 19 1
"3203" "exp3" 2 3 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 630 19 1
"3203" "exp3" 2 4 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 412 0 0
"3203" "exp3" 2 5 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 571 28 1
"3203" "exp3" 2 6 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 477 0 0
"3203" "exp3" 2 7 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 375 18 1
"3203" "exp3" 2 8 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 435 13 1
"3203" "exp3" 2 9 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 445 8 1
"3203" "exp3" 2 10 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 478 16 1
"3203" "exp3" 2 11 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 751 0 0
"3203" "exp3" 2 12 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 663 0 0
"3203" "exp3" 2 13 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 432 0 0
"3203" "exp3" 2 14 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 427 9 1
"3203" "exp3" 2 15 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 549 0 0
"3203" "exp3" 2 16 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 470 32 1
"3203" "exp3" 2 17 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 436 21 1
"3203" "exp3" 2 18 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 532 16 1
"3203" "exp3" 2 19 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 505 23 1
"3203" "exp3" 2 20 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 466 20 1
"3203" "exp3" 2 21 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 559 23 1
"3203" "exp3" 2 22 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 452 24 1
"3203" "exp3" 2 23 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 508 45 1
"3203" "exp3" 2 24 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 524 71 1
"3203" "exp3" 2 25 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 640 37 1
"3203" "exp3" 2 26 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 396 7 1
"3203" "exp3" 2 27 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 444 0 0
"3203" "exp3" 2 28 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 683 13 1
"3203" "exp3" 2 29 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 796 27 1
"3203" "exp3" 2 30 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 756 35 1
"3203" "exp3" 2 31 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 790 20 1
"3203" "exp3" 2 32 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 468 0 0
"3203" "exp3" 2 33 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 491 18 1
"3203" "exp3" 2 34 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 405 15 1
"3203" "exp3" 2 35 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 519 24 1
"3203" "exp3" 2 36 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 505 0 0
"3203" "exp3" 2 37 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 507 39 1
"3203" "exp3" 2 38 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 450 43 1
"3203" "exp3" 2 39 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 569 36 1
"3203" "exp3" 2 40 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 437 33 1
"3203" "exp3" 2 41 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 518 16 1
"3203" "exp3" 2 42 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 503 0 0
"3203" "exp3" 2 43 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 575 0 0
"3203" "exp3" 2 44 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 864 42 1
"3203" "exp3" 2 45 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 547 32 1
"3203" "exp3" 2 46 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 467 1 1
"3203" "exp3" 2 47 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 838 39 1
"3203" "exp3" 2 48 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 880 15 1
"3203" "exp3" 2 49 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1298 33 1
"3203" "exp3" 2 50 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 709 38 1
"3203" "exp3" 2 51 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 439 19 1
"3203" "exp3" 2 52 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 768 0 0
"3203" "exp3" 2 53 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 861 30 1
"3203" "exp3" 2 54 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 539 54 1
"3203" "exp3" 2 55 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 538 31 1
"3203" "exp3" 2 56 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 646 0 0
"3203" "exp3" 2 57 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 662 73 1
"3203" "exp3" 2 58 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1557 25 1
"3203" "exp3" 2 59 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 458 26 1
"3203" "exp3" 2 60 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 606 24 1
"3203" "exp3" 2 61 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 473 29 1
"3203" "exp3" 2 62 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 707 21 1
"3203" "exp3" 2 63 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 557 0 0
"3203" "exp3" 2 64 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 526 25 1
"3203" "exp3" 2 65 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 571 28 1
"3203" "exp3" 2 66 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1105 0 0
"3203" "exp3" 2 67 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 928 31 1
"3203" "exp3" 2 68 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1220 18 1
"3203" "exp3" 2 69 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 947 25 1
"3203" "exp3" 2 70 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 746 0 0
"3203" "exp3" 2 71 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 546 44 1
"3203" "exp3" 2 72 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 570 12 1
"3203" "exp3" 2 73 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1004 0 0
"3203" "exp3" 2 74 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 468 21 1
"3203" "exp3" 2 75 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 513 14 1
"3203" "exp3" 2 76 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 932 28 1
"3203" "exp3" 2 77 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 583 0 0
"3203" "exp3" 2 78 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 578 6 1
"3203" "exp3" 2 79 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 500 17 1
"3203" "exp3" 2 80 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 518 0 0
"3203" "exp3" 2 81 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 444 29 1
"3203" "exp3" 2 82 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 409 4 1
"3203" "exp3" 2 83 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 500 0 0
"3203" "exp3" 2 84 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 485 0 0
"3203" "exp3" 2 85 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 455 0 0
"3203" "exp3" 2 86 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 761 0 0
"3203" "exp3" 2 87 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 481 23 1
"3203" "exp3" 2 88 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 487 34 1
"3203" "exp3" 2 89 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 480 26 1
"3203" "exp3" 2 90 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 526 0 0
"3203" "exp3" 2 91 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 437 22 1
"3203" "exp3" 2 92 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 644 41 1
"3203" "exp3" 2 93 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 458 13 1
"3203" "exp3" 2 94 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 492 8 1
"3203" "exp3" 2 95 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 469 5 1
"3203" "exp3" 2 96 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 606 27 1
"3203" "exp3" 2 97 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 1463 3 1
"3203" "exp3" 2 98 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 677 33 1
"3203" "exp3" 2 99 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 583 6 1
"3203" "exp3" 2 100 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1027 11 1
"3203" "exp3" 2 101 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 912 32 1
"3203" "exp3" 2 102 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 683 22 1
"3203" "exp3" 2 103 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 762 36 1
"3203" "exp3" 2 104 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 730 0 0
"3203" "exp3" 2 105 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1112 20 1
"3203" "exp3" 2 106 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1188 0 0
"3203" "exp3" 2 107 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1614 0 0
"3203" "exp3" 2 108 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 815 34 1
"3203" "exp3" 2 109 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 644 22 1
"3203" "exp3" 2 110 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 982 0 0
"3203" "exp3" 2 111 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 941 45 1
"3203" "exp3" 2 112 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 602 17 1
"3203" "exp3" 2 113 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 651 21 1
"3203" "exp3" 2 114 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 575 0 0
"3203" "exp3" 2 115 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 567 32 1
"3203" "exp3" 2 116 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 740 14 1
"3203" "exp3" 2 117 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 581 0 0
"3203" "exp3" 2 118 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 913 0 0
"3203" "exp3" 2 119 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 555 10 1
"3203" "exp3" 2 120 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 565 30 1
"3203" "exp3" 2 121 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 537 10 1
"3203" "exp3" 2 122 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 833 19 1
"3203" "exp3" 2 123 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 818 37 1
"3203" "exp3" 2 124 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 914 34 1
"3203" "exp3" 2 125 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 583 28 1
"3203" "exp3" 2 126 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 579 48 1
"3203" "exp3" 2 127 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 680 0 0
"3203" "exp3" 2 128 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1082 44 1
"3203" "exp3" 2 129 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 590 0 0
"3203" "exp3" 2 130 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 680 35 1
"3203" "exp3" 2 131 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 503 0 0
"3203" "exp3" 2 132 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 452 27 1
"3203" "exp3" 1 1 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 353 41 1
"3203" "exp3" 1 2 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 401 39 1
"3203" "exp3" 1 3 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 380 28 1
"3203" "exp3" 1 4 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 357 18 1
"3203" "exp3" 1 5 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 330 10 1
"3203" "exp3" 1 6 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 445 35 1
"3203" "exp3" 1 7 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 341 27 1
"3203" "exp3" 1 8 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 499 31 1
"3203" "exp3" 1 9 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 496 0 0
"3203" "exp3" 1 10 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 363 0 0
"3203" "exp3" 1 11 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 719 32 1
"3203" "exp3" 1 12 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 380 0 0
"3203" "exp3" 1 13 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 701 8 1
"3203" "exp3" 1 14 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 398 14 1
"3203" "exp3" 1 15 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 303 27 1
"3203" "exp3" 1 16 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 358 0 0
"3203" "exp3" 1 17 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 307 29 1
"3203" "exp3" 1 18 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 312 19 1
"3203" "exp3" 1 19 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 259 32 1
"3203" "exp3" 1 20 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 607 25 1
"3203" "exp3" 1 21 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 344 23 1
"3203" "exp3" 1 22 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 423 18 1
"3203" "exp3" 1 23 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 471 37 1
"3203" "exp3" 1 24 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 412 17 1
"3203" "exp3" 1 25 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 361 22 1
"3203" "exp3" 1 26 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 369 8 1
"3203" "exp3" 1 27 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 534 0 0
"3203" "exp3" 1 28 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 371 20 1
"3203" "exp3" 1 29 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 458 28 1
"3203" "exp3" 1 30 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 313 34 1
"3203" "exp3" 1 31 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 318 0 0
"3203" "exp3" 1 32 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 364 0 0
"3203" "exp3" 1 33 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 351 25 1
"3203" "exp3" 1 34 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 375 5 1
"3203" "exp3" 1 35 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 460 0 0
"3203" "exp3" 1 36 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 561 15 1
"3203" "exp3" 1 37 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 373 23 1
"3203" "exp3" 1 38 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 594 33 1
"3203" "exp3" 1 39 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 304 0 0
"3203" "exp3" 1 40 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 395 28 1
"3203" "exp3" 1 41 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 397 15 1
"3203" "exp3" 1 42 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 490 0 0
"3203" "exp3" 1 43 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 517 41 1
"3203" "exp3" 1 44 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 536 16 1
"3203" "exp3" 1 45 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1124 0 0
"3203" "exp3" 1 46 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 515 0 0
"3203" "exp3" 1 47 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 546 21 1
"3203" "exp3" 1 48 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 449 26 1
"3203" "exp3" 1 49 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 479 19 1
"3203" "exp3" 1 50 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 347 26 1
"3203" "exp3" 1 51 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 437 17 1
"3203" "exp3" 1 52 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 494 22 1
"3203" "exp3" 1 53 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 585 18 1
"3203" "exp3" 1 54 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 545 13 1
"3203" "exp3" 1 55 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 329 42 1
"3203" "exp3" 1 56 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 299 45 1
"3203" "exp3" 1 57 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 369 26 1
"3203" "exp3" 1 58 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 421 5 1
"3203" "exp3" 1 59 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 495 0 0
"3203" "exp3" 1 60 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 609 12 1
"3203" "exp3" 1 61 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 368 32 1
"3203" "exp3" 1 62 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 339 21 1
"3203" "exp3" 1 63 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 353 0 0
"3203" "exp3" 1 64 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 427 28 1
"3203" "exp3" 1 65 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 467 0 0
"3203" "exp3" 1 66 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 450 47 1
"3203" "exp3" 1 67 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 376 0 0
"3203" "exp3" 1 68 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 272 79 1
"3203" "exp3" 1 69 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 446 34 1
"3203" "exp3" 1 70 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 387 21 1
"3203" "exp3" 1 71 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 646 25 1
"3203" "exp3" 1 72 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 367 0 0
"3203" "exp3" 1 73 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 353 0 0
"3203" "exp3" 1 74 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 366 20 1
"3203" "exp3" 1 75 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 345 19 1
"3203" "exp3" 1 76 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 395 30 1
"3203" "exp3" 1 77 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 501 0 0
"3203" "exp3" 1 78 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 394 15 1
"3203" "exp3" 1 79 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 380 7 1
"3203" "exp3" 1 80 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 441 0 0
"3203" "exp3" 1 81 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 331 20 1
"3203" "exp3" 1 82 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 333 22 1
"3203" "exp3" 1 83 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 343 23 1
"3203" "exp3" 1 84 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 337 18 1
"3203" "exp3" 1 85 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 336 0 0
"3203" "exp3" 1 86 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 453 27 1
"3203" "exp3" 1 87 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 284 35 1
"3203" "exp3" 1 88 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 281 14 1
"3203" "exp3" 1 89 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 473 13 1
"3203" "exp3" 1 90 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 346 40 1
"3203" "exp3" 1 91 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 289 29 1
"3203" "exp3" 1 92 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 396 67 1
"3203" "exp3" 1 93 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 383 0 0
"3203" "exp3" 1 94 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 350 33 1
"3203" "exp3" 1 95 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 337 0 0
"3203" "exp3" 1 96 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 414 6 1
"3203" "exp3" 1 97 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 408 27 1
"3203" "exp3" 1 98 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 384 6 1
"3203" "exp3" 1 99 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 452 0 0
"3203" "exp3" 1 100 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 352 24 1
"3203" "exp3" 1 101 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 398 0 0
"3203" "exp3" 1 102 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 555 0 0
"3203" "exp3" 1 103 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 452 0 0
"3203" "exp3" 1 104 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 382 3 1
"3203" "exp3" 1 105 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 481 23 1
"3203" "exp3" 1 106 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 439 0 0
"3203" "exp3" 1 107 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 489 0 0
"3203" "exp3" 1 108 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 390 31 1
"3203" "exp3" 1 109 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 449 17 1
"3203" "exp3" 1 110 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 420 0 0
"3203" "exp3" 1 111 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 391 24 1
"3203" "exp3" 1 112 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 436 4 1
"3203" "exp3" 1 113 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 482 19 1
"3203" "exp3" 1 114 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 431 2 1
"3203" "exp3" 1 115 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 371 24 1
"3203" "exp3" 1 116 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 405 12 1
"3203" "exp3" 1 117 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 376 17 1
"3203" "exp3" 1 118 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 357 0 0
"3203" "exp3" 1 119 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 473 0 0
"3203" "exp3" 1 120 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 592 35 1
"3203" "exp3" 1 121 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 347 0 0
"3203" "exp3" 1 122 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 400 0 0
"3203" "exp3" 1 123 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 405 16 1
"3203" "exp3" 1 124 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 488 0 0
"3203" "exp3" 1 125 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 486 26 1
"3203" "exp3" 1 126 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 357 0 0
"3203" "exp3" 1 127 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 388 7 1
"3203" "exp3" 1 128 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 395 1 1
"3203" "exp3" 1 129 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 390 9 1
"3203" "exp3" 1 130 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 452 0 0
"3203" "exp3" 1 131 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 502 43 1
"3203" "exp3" 1 132 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 480 0 0
"3203" "exp3" 2 1 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 392 29 1
"3203" "exp3" 2 2 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 304 14 1
"3203" "exp3" 2 3 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 422 0 0
"3203" "exp3" 2 4 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 355 0 0
"3203" "exp3" 2 5 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 363 31 1
"3203" "exp3" 2 6 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 378 11 1
"3203" "exp3" 2 7 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 378 19 1
"3203" "exp3" 2 8 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 481 45 1
"3203" "exp3" 2 9 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 413 30 1
"3203" "exp3" 2 10 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 299 21 1
"3203" "exp3" 2 11 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 323 15 1
"3203" "exp3" 2 12 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 515 38 1
"3203" "exp3" 2 13 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 362 1 1
"3203" "exp3" 2 14 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 517 21 1
"3203" "exp3" 2 15 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 428 44 1
"3203" "exp3" 2 16 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 405 32 1
"3203" "exp3" 2 17 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 377 5 1
"3203" "exp3" 2 18 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 288 6 1
"3203" "exp3" 2 19 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 605 29 1
"3203" "exp3" 2 20 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 361 17 1
"3203" "exp3" 2 21 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 320 23 1
"3203" "exp3" 2 22 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 409 8 1
"3203" "exp3" 2 23 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 304 22 1
"3203" "exp3" 2 24 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 394 2 1
"3203" "exp3" 2 25 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 384 14 1
"3203" "exp3" 2 26 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 339 27 1
"3203" "exp3" 2 27 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 264 20 1
"3203" "exp3" 2 28 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 292 16 1
"3203" "exp3" 2 29 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 553 25 1
"3203" "exp3" 2 30 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 400 32 1
"3203" "exp3" 2 31 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 504 16 1
"3203" "exp3" 2 32 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 389 0 0
"3203" "exp3" 2 33 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 252 30 1
"3203" "exp3" 2 34 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 340 21 1
"3203" "exp3" 2 35 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 389 3 1
"3203" "exp3" 2 36 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 319 0 0
"3203" "exp3" 2 37 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 509 75 1
"3203" "exp3" 2 38 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 447 20 1
"3203" "exp3" 2 39 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 556 24 1
"3203" "exp3" 2 40 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 368 0 0
"3203" "exp3" 2 41 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 283 29 1
"3203" "exp3" 2 42 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 404 0 0
"3203" "exp3" 2 43 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 545 18 1
"3203" "exp3" 2 44 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 357 15 1
"3203" "exp3" 2 45 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 493 21 1
"3203" "exp3" 2 46 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 382 25 1
"3203" "exp3" 2 47 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 780 18 1
"3203" "exp3" 2 48 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1570 36 1
"3203" "exp3" 2 49 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 464 17 1
"3203" "exp3" 2 50 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 592 33 1
"3203" "exp3" 2 51 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 460 0 0
"3203" "exp3" 2 52 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 332 19 1
"3203" "exp3" 2 53 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 296 28 1
"3203" "exp3" 2 54 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 264 0 0
"3203" "exp3" 2 55 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 515 36 1
"3203" "exp3" 2 56 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 363 20 1
"3203" "exp3" 2 57 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 583 47 1
"3203" "exp3" 2 58 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 370 22 1
"3203" "exp3" 2 59 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 339 0 0
"3203" "exp3" 2 60 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 458 0 0
"3203" "exp3" 2 61 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 306 12 1
"3203" "exp3" 2 62 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 362 30 1
"3203" "exp3" 2 63 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 374 4 1
"3203" "exp3" 2 64 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 559 19 1
"3203" "exp3" 2 65 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 366 39 1
"3203" "exp3" 2 66 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 330 18 1
"3203" "exp3" 2 67 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 517 34 1
"3203" "exp3" 2 68 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 438 45 1
"3203" "exp3" 2 69 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 372 0 0
"3203" "exp3" 2 70 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 382 0 0
"3203" "exp3" 2 71 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 336 0 0
"3203" "exp3" 2 72 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 362 0 0
"3203" "exp3" 2 73 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 761 24 1
"3203" "exp3" 2 74 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 308 26 1
"3203" "exp3" 2 75 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 937 0 0
"3203" "exp3" 2 76 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 595 23 1
"3203" "exp3" 2 77 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 410 0 0
"3203" "exp3" 2 78 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 407 32 1
"3203" "exp3" 2 79 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 442 5 1
"3203" "exp3" 2 80 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 406 0 0
"3203" "exp3" 2 81 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 439 0 0
"3203" "exp3" 2 82 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 551 15 1
"3203" "exp3" 2 83 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 358 23 1
"3203" "exp3" 2 84 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 718 0 0
"3203" "exp3" 2 85 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 576 23 1
"3203" "exp3" 2 86 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 439 0 0
"3203" "exp3" 2 87 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 498 34 1
"3203" "exp3" 2 88 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 352 0 0
"3203" "exp3" 2 89 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 579 18 1
"3203" "exp3" 2 90 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 495 35 1
"3203" "exp3" 2 91 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 402 6 1
"3203" "exp3" 2 92 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 572 20 1
"3203" "exp3" 2 93 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 478 7 1
"3203" "exp3" 2 94 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 448 0 0
"3203" "exp3" 2 95 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 476 7 1
"3203" "exp3" 2 96 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 550 16 1
"3203" "exp3" 2 97 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 650 27 1
"3203" "exp3" 2 98 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 388 0 0
"3203" "exp3" 2 99 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 349 0 0
"3203" "exp3" 2 100 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 268 0 0
"3203" "exp3" 2 101 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 266 0 0
"3203" "exp3" 2 102 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 540 10 1
"3203" "exp3" 2 103 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 362 28 1
"3203" "exp3" 2 104 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 313 13 1
"3203" "exp3" 2 105 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 402 35 1
"3203" "exp3" 2 106 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 367 22 1
"3203" "exp3" 2 107 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 308 26 1
"3203" "exp3" 2 108 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 384 13 1
"3203" "exp3" 2 109 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 416 32 1
"3203" "exp3" 2 110 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 327 19 1
"3203" "exp3" 2 111 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 581 10 1
"3203" "exp3" 2 112 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 383 9 1
"3203" "exp3" 2 113 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 448 43 1
"3203" "exp3" 2 114 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 482 0 0
"3203" "exp3" 2 115 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 449 33 1
"3203" "exp3" 2 116 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 389 48 1
"3203" "exp3" 2 117 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 625 44 1
"3203" "exp3" 2 118 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 680 17 1
"3203" "exp3" 2 119 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 481 0 0
"3203" "exp3" 2 120 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 338 65 1
"3203" "exp3" 2 121 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 519 0 0
"3203" "exp3" 2 122 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 430 0 0
"3203" "exp3" 2 123 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 635 8 1
"3203" "exp3" 2 124 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 549 0 0
"3203" "exp3" 2 125 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 582 0 0
"3203" "exp3" 2 126 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 655 13 1
"3203" "exp3" 2 127 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 580 26 1
"3203" "exp3" 2 128 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 656 24 1
"3203" "exp3" 2 129 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 417 27 1
"3203" "exp3" 2 130 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 505 0 0
"3203" "exp3" 2 131 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 564 37 1
"3203" "exp3" 2 132 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 431 31 1
"3204" "exp3" 1 1 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 507 39 1
"3204" "exp3" 1 2 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 627 8 1
"3204" "exp3" 1 3 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 715 61 1
"3204" "exp3" 1 4 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 985 19 1
"3204" "exp3" 1 5 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 799 64 1
"3204" "exp3" 1 6 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 830 15 1
"3204" "exp3" 1 7 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 773 0 0
"3204" "exp3" 1 8 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 901 56 1
"3204" "exp3" 1 9 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 810 17 1
"3204" "exp3" 1 10 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 918 0 0
"3204" "exp3" 1 11 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1274 20 1
"3204" "exp3" 1 12 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 1112 0 0
"3204" "exp3" 1 13 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 909 12 1
"3204" "exp3" 1 14 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 889 10 1
"3204" "exp3" 1 15 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 710 0 0
"3204" "exp3" 1 16 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 817 0 0
"3204" "exp3" 1 17 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 956 54 1
"3204" "exp3" 1 18 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 838 34 1
"3204" "exp3" 1 19 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 838 0 0
"3204" "exp3" 1 20 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1140 20 1
"3204" "exp3" 1 21 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 841 26 1
"3204" "exp3" 1 22 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1085 62 1
"3204" "exp3" 1 23 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 742 5 1
"3204" "exp3" 1 24 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 930 0 0
"3204" "exp3" 1 25 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 762 32 1
"3204" "exp3" 1 26 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1100 0 0
"3204" "exp3" 1 27 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 802 0 0
"3204" "exp3" 1 28 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 906 3 1
"3204" "exp3" 1 29 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1011 83 1
"3204" "exp3" 1 30 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 979 53 1
"3204" "exp3" 1 31 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1073 73 1
"3204" "exp3" 1 32 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 795 9 1
"3204" "exp3" 1 33 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 814 23 1
"3204" "exp3" 1 34 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 751 31 1
"3204" "exp3" 1 35 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 841 41 1
"3204" "exp3" 1 36 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 834 0 0
"3204" "exp3" 1 37 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1770 0 0
"3204" "exp3" 1 38 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1121 0 0
"3204" "exp3" 1 39 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 725 0 0
"3204" "exp3" 1 40 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1209 73 1
"3204" "exp3" 1 41 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1059 0 0
"3204" "exp3" 1 42 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1002 79 1
"3204" "exp3" 1 43 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 1739 55 1
"3204" "exp3" 1 44 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1838 17 1
"3204" "exp3" 1 45 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1192 0 0
"3204" "exp3" 1 46 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1648 21 1
"3204" "exp3" 1 47 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1272 0 0
"3204" "exp3" 1 48 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1286 75 1
"3204" "exp3" 1 49 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1581 18 1
"3204" "exp3" 1 50 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1263 0 0
"3204" "exp3" 1 51 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 2107 0 0
"3204" "exp3" 1 52 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1208 15 1
"3204" "exp3" 1 53 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 2339 63 1
"3204" "exp3" 1 54 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1229 43 1
"3204" "exp3" 1 55 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1514 14 1
"3204" "exp3" 1 56 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 1156 0 0
"3204" "exp3" 1 57 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1054 0 0
"3204" "exp3" 1 58 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 1055 0 0
"3204" "exp3" 1 59 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1781 16 1
"3204" "exp3" 1 60 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1621 0 0
"3204" "exp3" 1 61 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1329 0 0
"3204" "exp3" 1 62 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1482 29 1
"3204" "exp3" 1 63 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1807 27 1
"3204" "exp3" 1 64 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1754 34 1
"3204" "exp3" 1 65 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1992 24 1
"3204" "exp3" 1 66 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 1851 0 0
"3204" "exp3" 1 67 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1402 22 1
"3204" "exp3" 1 68 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1547 13 1
"3204" "exp3" 1 69 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 2412 5 1
"3204" "exp3" 1 70 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 1553 0 0
"3204" "exp3" 1 71 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 2422 0 0
"3204" "exp3" 1 72 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1553 0 0
"3204" "exp3" 1 73 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 1942 0 0
"3204" "exp3" 1 74 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1570 19 1
"3204" "exp3" 1 75 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1543 0 0
"3204" "exp3" 1 76 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1386 0 0
"3204" "exp3" 1 77 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1497 28 1
"3204" "exp3" 1 78 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 2547 0 0
"3204" "exp3" 1 79 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 1815 0 0
"3204" "exp3" 1 80 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 2566 25 1
"3204" "exp3" 1 81 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1208 0 0
"3204" "exp3" 1 82 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1181 0 0
"3204" "exp3" 1 83 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1169 1 1
"3204" "exp3" 1 84 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1740 0 0
"3204" "exp3" 1 85 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1624 0 0
"3204" "exp3" 1 86 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1558 7 1
"3204" "exp3" 1 87 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2811 43 1
"3204" "exp3" 1 88 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1556 0 0
"3204" "exp3" 1 89 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1854 33 1
"3204" "exp3" 1 90 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 2215 0 0
"3204" "exp3" 1 91 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1383 21 1
"3204" "exp3" 1 92 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1680 26 1
"3204" "exp3" 1 93 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1786 0 0
"3204" "exp3" 1 94 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1976 16 1
"3204" "exp3" 1 95 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1071 0 0
"3204" "exp3" 1 96 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1325 0 0
"3204" "exp3" 1 97 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1180 10 1
"3204" "exp3" 1 98 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 2239 0 0
"3204" "exp3" 1 99 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 2278 0 0
"3204" "exp3" 1 100 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1481 28 1
"3204" "exp3" 1 101 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 2894 0 0
"3204" "exp3" 1 102 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1612 11 1
"3204" "exp3" 1 103 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 2323 0 0
"3204" "exp3" 1 104 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2143 45 1
"3204" "exp3" 1 105 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1121 6 1
"3204" "exp3" 1 106 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 1398 69 1
"3204" "exp3" 1 107 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1425 78 1
"3204" "exp3" 1 108 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1474 27 1
"3204" "exp3" 1 109 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1588 0 0
"3204" "exp3" 1 110 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1507 19 1
"3204" "exp3" 1 111 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 2046 63 1
"3204" "exp3" 1 112 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1781 29 1
"3204" "exp3" 1 113 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1389 0 0
"3204" "exp3" 1 114 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1702 24 1
"3204" "exp3" 1 115 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 2853 37 1
"3204" "exp3" 1 116 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1817 24 1
"3204" "exp3" 1 117 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1566 32 1
"3204" "exp3" 1 118 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1272 24 1
"3204" "exp3" 1 119 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1321 22 1
"3204" "exp3" 1 120 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1229 52 1
"3204" "exp3" 1 121 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1464 60 1
"3204" "exp3" 1 122 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1585 9 1
"3204" "exp3" 1 123 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2097 72 1
"3204" "exp3" 1 124 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1007 0 0
"3204" "exp3" 1 125 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1869 74 1
"3204" "exp3" 1 126 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 2071 0 0
"3204" "exp3" 1 127 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1767 35 1
"3204" "exp3" 1 128 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1051 21 1
"3204" "exp3" 1 129 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1032 20 1
"3204" "exp3" 1 130 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1652 66 1
"3204" "exp3" 1 131 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1039 19 1
"3204" "exp3" 1 132 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1673 0 0
"3204" "exp3" 2 1 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1373 0 0
"3204" "exp3" 2 2 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 999 29 1
"3204" "exp3" 2 3 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 931 37 1
"3204" "exp3" 2 4 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1145 0 0
"3204" "exp3" 2 5 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1339 59 1
"3204" "exp3" 2 6 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1126 0 0
"3204" "exp3" 2 7 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 991 33 1
"3204" "exp3" 2 8 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 916 23 1
"3204" "exp3" 2 9 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1719 67 1
"3204" "exp3" 2 10 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1177 0 0
"3204" "exp3" 2 11 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1005 20 1
"3204" "exp3" 2 12 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1138 6 1
"3204" "exp3" 2 13 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1012 15 1
"3204" "exp3" 2 14 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1411 0 0
"3204" "exp3" 2 15 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1420 33 1
"3204" "exp3" 2 16 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1831 0 0
"3204" "exp3" 2 17 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1423 18 1
"3204" "exp3" 2 18 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1067 23 1
"3204" "exp3" 2 19 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1628 71 1
"3204" "exp3" 2 20 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1428 27 1
"3204" "exp3" 2 21 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1340 39 1
"3204" "exp3" 2 22 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1923 60 1
"3204" "exp3" 2 23 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1156 4 1
"3204" "exp3" 2 24 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1247 16 1
"3204" "exp3" 2 25 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1614 30 1
"3204" "exp3" 2 26 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1453 0 0
"3204" "exp3" 2 27 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1732 44 1
"3204" "exp3" 2 28 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1255 1 1
"3204" "exp3" 2 29 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 1608 0 0
"3204" "exp3" 2 30 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1560 21 1
"3204" "exp3" 2 31 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1216 19 1
"3204" "exp3" 2 32 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1438 10 1
"3204" "exp3" 2 33 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1308 32 1
"3204" "exp3" 2 34 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1547 19 1
"3204" "exp3" 2 35 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1339 18 1
"3204" "exp3" 2 36 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1183 0 0
"3204" "exp3" 2 37 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 955 0 0
"3204" "exp3" 2 38 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1040 11 1
"3204" "exp3" 2 39 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1189 0 0
"3204" "exp3" 2 40 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 949 23 1
"3204" "exp3" 2 41 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1279 24 1
"3204" "exp3" 2 42 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1262 0 0
"3204" "exp3" 2 43 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1288 0 0
"3204" "exp3" 2 44 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1120 36 1
"3204" "exp3" 2 45 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1803 0 0
"3204" "exp3" 2 46 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1403 0 0
"3204" "exp3" 2 47 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 965 6 1
"3204" "exp3" 2 48 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1002 0 0
"3204" "exp3" 2 49 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1006 0 0
"3204" "exp3" 2 50 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1260 0 0
"3204" "exp3" 2 51 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 930 22 1
"3204" "exp3" 2 52 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 933 32 1
"3204" "exp3" 2 53 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1368 24 1
"3204" "exp3" 2 54 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1352 35 1
"3204" "exp3" 2 55 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1054 0 0
"3204" "exp3" 2 56 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1331 0 0
"3204" "exp3" 2 57 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 943 18 1
"3204" "exp3" 2 58 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1169 25 1
"3204" "exp3" 2 59 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1294 23 1
"3204" "exp3" 2 60 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1165 28 1
"3204" "exp3" 2 61 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1104 20 1
"3204" "exp3" 2 62 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 1366 0 0
"3204" "exp3" 2 63 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1423 30 1
"3204" "exp3" 2 64 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1408 0 0
"3204" "exp3" 2 65 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 900 0 0
"3204" "exp3" 2 66 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 922 22 1
"3204" "exp3" 2 67 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 1185 0 0
"3204" "exp3" 2 68 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1337 0 0
"3204" "exp3" 2 69 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 837 5 1
"3204" "exp3" 2 70 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 786 8 1
"3204" "exp3" 2 71 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 921 0 0
"3204" "exp3" 2 72 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 904 0 0
"3204" "exp3" 2 73 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 793 17 1
"3204" "exp3" 2 74 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 1394 58 1
"3204" "exp3" 2 75 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1255 35 1
"3204" "exp3" 2 76 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 888 43 1
"3204" "exp3" 2 77 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 965 10 1
"3204" "exp3" 2 78 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 679 31 1
"3204" "exp3" 2 79 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 843 26 1
"3204" "exp3" 2 80 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 858 40 1
"3204" "exp3" 2 81 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1251 0 0
"3204" "exp3" 2 82 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 795 15 1
"3204" "exp3" 2 83 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 873 12 1
"3204" "exp3" 2 84 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1339 0 0
"3204" "exp3" 2 85 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1551 66 1
"3204" "exp3" 2 86 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 773 9 1
"3204" "exp3" 2 87 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1305 26 1
"3204" "exp3" 2 88 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1130 45 1
"3204" "exp3" 2 89 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 840 17 1
"3204" "exp3" 2 90 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 915 19 1
"3204" "exp3" 2 91 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 945 28 1
"3204" "exp3" 2 92 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 910 0 0
"3204" "exp3" 2 93 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1098 31 1
"3204" "exp3" 2 94 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1087 0 0
"3204" "exp3" 2 95 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 1082 54 1
"3204" "exp3" 2 96 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 1201 2 1
"3204" "exp3" 2 97 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1037 0 0
"3204" "exp3" 2 98 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1048 26 1
"3204" "exp3" 2 99 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 738 38 1
"3204" "exp3" 2 100 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 968 5 1
"3204" "exp3" 2 101 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 941 13 1
"3204" "exp3" 2 102 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 873 19 1
"3204" "exp3" 2 103 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 880 0 0
"3204" "exp3" 2 104 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 942 3 1
"3204" "exp3" 2 105 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 819 13 1
"3204" "exp3" 2 106 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 808 31 1
"3204" "exp3" 2 107 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 937 17 1
"3204" "exp3" 2 108 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1339 0 0
"3204" "exp3" 2 109 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1164 30 1
"3204" "exp3" 2 110 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 735 32 1
"3204" "exp3" 2 111 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 832 11 1
"3204" "exp3" 2 112 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 792 0 0
"3204" "exp3" 2 113 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 982 26 1
"3204" "exp3" 2 114 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 1141 0 0
"3204" "exp3" 2 115 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1194 72 1
"3204" "exp3" 2 116 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1073 25 1
"3204" "exp3" 2 117 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 751 13 1
"3204" "exp3" 2 118 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 565 0 0
"3204" "exp3" 2 119 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 950 0 0
"3204" "exp3" 2 120 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 997 41 1
"3204" "exp3" 2 121 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1604 35 1
"3204" "exp3" 2 122 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 898 0 0
"3204" "exp3" 2 123 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 985 52 1
"3204" "exp3" 2 124 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 854 0 0
"3204" "exp3" 2 125 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1014 36 1
"3204" "exp3" 2 126 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2100 37 1
"3204" "exp3" 2 127 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1048 43 1
"3204" "exp3" 2 128 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1125 0 0
"3204" "exp3" 2 129 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 708 7 1
"3204" "exp3" 2 130 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1397 0 0
"3204" "exp3" 2 131 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1138 33 1
"3204" "exp3" 2 132 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1002 15 1
"3204" "exp3" 1 1 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 845 0 0
"3204" "exp3" 1 2 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 944 0 0
"3204" "exp3" 1 3 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1073 21 1
"3204" "exp3" 1 4 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 979 0 0
"3204" "exp3" 1 5 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 1106 0 0
"3204" "exp3" 1 6 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 897 0 0
"3204" "exp3" 1 7 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 896 73 1
"3204" "exp3" 1 8 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1219 22 1
"3204" "exp3" 1 9 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1055 36 1
"3204" "exp3" 1 10 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1039 47 1
"3204" "exp3" 1 11 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1466 68 1
"3204" "exp3" 1 12 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1083 23 1
"3204" "exp3" 1 13 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1656 28 1
"3204" "exp3" 1 14 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 1414 0 0
"3204" "exp3" 1 15 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1107 0 0
"3204" "exp3" 1 16 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 788 0 0
"3204" "exp3" 1 17 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 1029 0 0
"3204" "exp3" 1 18 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1097 10 1
"3204" "exp3" 1 19 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1051 0 0
"3204" "exp3" 1 20 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1268 0 0
"3204" "exp3" 1 21 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1141 67 1
"3204" "exp3" 1 22 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1223 0 0
"3204" "exp3" 1 23 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 996 0 0
"3204" "exp3" 1 24 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 937 0 0
"3204" "exp3" 1 25 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 891 0 0
"3204" "exp3" 1 26 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1099 0 0
"3204" "exp3" 1 27 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1274 31 1
"3204" "exp3" 1 28 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 935 0 0
"3204" "exp3" 1 29 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 998 29 1
"3204" "exp3" 1 30 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 864 25 1
"3204" "exp3" 1 31 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 768 0 0
"3204" "exp3" 1 32 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 842 31 1
"3204" "exp3" 1 33 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1112 0 0
"3204" "exp3" 1 34 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1011 18 1
"3204" "exp3" 1 35 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 987 0 0
"3204" "exp3" 1 36 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 752 74 1
"3204" "exp3" 1 37 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 912 0 0
"3204" "exp3" 1 38 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1025 30 1
"3204" "exp3" 1 39 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 850 0 0
"3204" "exp3" 1 40 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 770 0 0
"3204" "exp3" 1 41 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1008 48 1
"3204" "exp3" 1 42 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 879 19 1
"3204" "exp3" 1 43 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 868 0 0
"3204" "exp3" 1 44 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 1351 0 0
"3204" "exp3" 1 45 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1085 0 0
"3204" "exp3" 1 46 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 681 0 0
"3204" "exp3" 1 47 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 722 0 0
"3204" "exp3" 1 48 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1152 0 0
"3204" "exp3" 1 49 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 891 24 1
"3204" "exp3" 1 50 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 903 0 0
"3204" "exp3" 1 51 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 1535 0 0
"3204" "exp3" 1 52 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1133 0 0
"3204" "exp3" 1 53 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 855 0 0
"3204" "exp3" 1 54 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 986 0 0
"3204" "exp3" 1 55 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1016 35 1
"3204" "exp3" 1 56 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1121 0 0
"3204" "exp3" 1 57 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 890 0 0
"3204" "exp3" 1 58 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 908 30 1
"3204" "exp3" 1 59 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1044 38 1
"3204" "exp3" 1 60 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 790 0 0
"3204" "exp3" 1 61 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 877 0 0
"3204" "exp3" 1 62 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 735 32 1
"3204" "exp3" 1 63 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 806 0 0
"3204" "exp3" 1 64 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 658 0 0
"3204" "exp3" 1 65 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1057 0 0
"3204" "exp3" 1 66 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 939 0 0
"3204" "exp3" 1 67 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 863 37 1
"3204" "exp3" 1 68 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 939 0 0
"3204" "exp3" 1 69 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 867 45 1
"3204" "exp3" 1 70 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 634 0 0
"3204" "exp3" 1 71 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1125 42 1
"3204" "exp3" 1 72 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 683 43 1
"3204" "exp3" 1 73 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1060 0 0
"3204" "exp3" 1 74 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 686 0 0
"3204" "exp3" 1 75 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 695 87 1
"3204" "exp3" 1 76 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 735 0 0
"3204" "exp3" 1 77 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 803 0 0
"3204" "exp3" 1 78 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1071 0 0
"3204" "exp3" 1 79 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1082 44 1
"3204" "exp3" 1 80 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 762 28 1
"3204" "exp3" 1 81 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 835 0 0
"3204" "exp3" 1 82 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1451 24 1
"3204" "exp3" 1 83 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 928 0 0
"3204" "exp3" 1 84 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1149 32 1
"3204" "exp3" 1 85 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1001 46 1
"3204" "exp3" 1 86 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1013 30 1
"3204" "exp3" 1 87 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 729 80 1
"3204" "exp3" 1 88 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 663 88 1
"3204" "exp3" 1 89 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 899 41 1
"3204" "exp3" 1 90 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 852 0 0
"3204" "exp3" 1 91 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 697 2 1
"3204" "exp3" 1 92 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 909 25 1
"3204" "exp3" 1 93 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 696 0 0
"3204" "exp3" 1 94 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 796 0 0
"3204" "exp3" 1 95 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 849 0 0
"3204" "exp3" 1 96 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 731 0 0
"3204" "exp3" 1 97 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1238 0 0
"3204" "exp3" 1 98 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 838 0 0
"3204" "exp3" 1 99 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 886 84 1
"3204" "exp3" 1 100 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 780 0 0
"3204" "exp3" 1 101 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 1217 0 0
"3204" "exp3" 1 102 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 797 0 0
"3204" "exp3" 1 103 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 880 33 1
"3204" "exp3" 1 104 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 869 0 0
"3204" "exp3" 1 105 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1133 0 0
"3204" "exp3" 1 106 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 912 0 0
"3204" "exp3" 1 107 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 816 0 0
"3204" "exp3" 1 108 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 827 38 1
"3204" "exp3" 1 109 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 755 0 0
"3204" "exp3" 1 110 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 943 0 0
"3204" "exp3" 1 111 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 843 0 0
"3204" "exp3" 1 112 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 948 82 1
"3204" "exp3" 1 113 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1018 0 0
"3204" "exp3" 1 114 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 752 0 0
"3204" "exp3" 1 115 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 875 0 0
"3204" "exp3" 1 116 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 744 49 1
"3204" "exp3" 1 117 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1180 0 0
"3204" "exp3" 1 118 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 671 0 0
"3204" "exp3" 1 119 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 944 0 0
"3204" "exp3" 1 120 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 688 0 0
"3204" "exp3" 1 121 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 665 84 1
"3204" "exp3" 1 122 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 840 0 0
"3204" "exp3" 1 123 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 804 0 0
"3204" "exp3" 1 124 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 821 0 0
"3204" "exp3" 1 125 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 707 0 0
"3204" "exp3" 1 126 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 751 0 0
"3204" "exp3" 1 127 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 793 71 1
"3204" "exp3" 1 128 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 838 0 0
"3204" "exp3" 1 129 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1209 0 0
"3204" "exp3" 1 130 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 722 0 0
"3204" "exp3" 1 131 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 995 78 1
"3204" "exp3" 1 132 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 864 0 0
"3204" "exp3" 2 1 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 823 71 1
"3204" "exp3" 2 2 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 738 0 0
"3204" "exp3" 2 3 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 770 0 0
"3204" "exp3" 2 4 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 982 0 0
"3204" "exp3" 2 5 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 899 0 0
"3204" "exp3" 2 6 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 641 0 0
"3204" "exp3" 2 7 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 794 0 0
"3204" "exp3" 2 8 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 706 0 0
"3204" "exp3" 2 9 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 882 0 0
"3204" "exp3" 2 10 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 645 91 1
"3204" "exp3" 2 11 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 758 0 0
"3204" "exp3" 2 12 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 879 33 1
"3204" "exp3" 2 13 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 866 93 1
"3204" "exp3" 2 14 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 912 35 1
"3204" "exp3" 2 15 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 891 0 0
"3204" "exp3" 2 16 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 888 0 0
"3204" "exp3" 2 17 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1021 39 1
"3204" "exp3" 2 18 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 896 0 0
"3204" "exp3" 2 19 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 927 72 1
"3204" "exp3" 2 20 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 733 0 0
"3204" "exp3" 2 21 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 870 0 0
"3204" "exp3" 2 22 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 750 0 0
"3204" "exp3" 2 23 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 991 0 0
"3204" "exp3" 2 24 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 840 0 0
"3204" "exp3" 2 25 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 677 0 0
"3204" "exp3" 2 26 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 681 0 0
"3204" "exp3" 2 27 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 683 0 0
"3204" "exp3" 2 28 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 766 65 1
"3204" "exp3" 2 29 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 576 0 0
"3204" "exp3" 2 30 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 550 0 0
"3204" "exp3" 2 31 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 689 0 0
"3204" "exp3" 2 32 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1054 32 1
"3204" "exp3" 2 33 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 690 0 0
"3204" "exp3" 2 34 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 575 0 0
"3204" "exp3" 2 35 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 682 78 1
"3204" "exp3" 2 36 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 629 0 0
"3204" "exp3" 2 37 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 710 0 0
"3204" "exp3" 2 38 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 613 0 0
"3204" "exp3" 2 39 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1062 0 0
"3204" "exp3" 2 40 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1127 41 1
"3204" "exp3" 2 41 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 663 0 0
"3204" "exp3" 2 42 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 599 0 0
"3204" "exp3" 2 43 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 697 0 0
"3204" "exp3" 2 44 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 668 49 1
"3204" "exp3" 2 45 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 821 34 1
"3204" "exp3" 2 46 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 679 0 0
"3204" "exp3" 2 47 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 832 0 0
"3204" "exp3" 2 48 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 618 48 1
"3204" "exp3" 2 49 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 711 74 1
"3204" "exp3" 2 50 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 522 0 0
"3204" "exp3" 2 51 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 628 0 0
"3204" "exp3" 2 52 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 703 0 0
"3204" "exp3" 2 53 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 722 55 1
"3204" "exp3" 2 54 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 606 0 0
"3204" "exp3" 2 55 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 661 0 0
"3204" "exp3" 2 56 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 691 46 1
"3204" "exp3" 2 57 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 700 0 0
"3204" "exp3" 2 58 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 588 0 0
"3204" "exp3" 2 59 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 527 0 0
"3204" "exp3" 2 60 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1076 73 1
"3204" "exp3" 2 61 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 660 0 0
"3204" "exp3" 2 62 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 722 69 1
"3204" "exp3" 2 63 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 734 0 0
"3204" "exp3" 2 64 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 730 0 0
"3204" "exp3" 2 65 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 709 32 1
"3204" "exp3" 2 66 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 761 0 0
"3204" "exp3" 2 67 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 565 0 0
"3204" "exp3" 2 68 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 587 0 0
"3204" "exp3" 2 69 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 909 0 0
"3204" "exp3" 2 70 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 572 0 0
"3204" "exp3" 2 71 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 579 0 0
"3204" "exp3" 2 72 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 590 0 0
"3204" "exp3" 2 73 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 723 0 0
"3204" "exp3" 2 74 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 564 0 0
"3204" "exp3" 2 75 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 719 0 0
"3204" "exp3" 2 76 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 870 0 0
"3204" "exp3" 2 77 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 855 0 0
"3204" "exp3" 2 78 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 843 0 0
"3204" "exp3" 2 79 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 902 0 0
"3204" "exp3" 2 80 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 761 0 0
"3204" "exp3" 2 81 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 836 0 0
"3204" "exp3" 2 82 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 649 0 0
"3204" "exp3" 2 83 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 747 0 0
"3204" "exp3" 2 84 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 747 32 1
"3204" "exp3" 2 85 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 999 0 0
"3204" "exp3" 2 86 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 687 84 1
"3204" "exp3" 2 87 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 728 0 0
"3204" "exp3" 2 88 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 705 0 0
"3204" "exp3" 2 89 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 767 0 0
"3204" "exp3" 2 90 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 720 0 0
"3204" "exp3" 2 91 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 824 0 0
"3204" "exp3" 2 92 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 980 0 0
"3204" "exp3" 2 93 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 702 40 1
"3204" "exp3" 2 94 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 612 0 0
"3204" "exp3" 2 95 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 618 0 0
"3204" "exp3" 2 96 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 730 44 1
"3204" "exp3" 2 97 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 841 79 1
"3204" "exp3" 2 98 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 792 0 0
"3204" "exp3" 2 99 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1121 86 1
"3204" "exp3" 2 100 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 751 0 0
"3204" "exp3" 2 101 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 659 83 1
"3204" "exp3" 2 102 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 515 0 0
"3204" "exp3" 2 103 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 517 0 0
"3204" "exp3" 2 104 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 949 0 0
"3204" "exp3" 2 105 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 763 64 1
"3204" "exp3" 2 106 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 627 0 0
"3204" "exp3" 2 107 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 571 0 0
"3204" "exp3" 2 108 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1110 0 0
"3204" "exp3" 2 109 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 956 0 0
"3204" "exp3" 2 110 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 816 0 0
"3204" "exp3" 2 111 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 665 85 1
"3204" "exp3" 2 112 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 664 0 0
"3204" "exp3" 2 113 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 794 0 0
"3204" "exp3" 2 114 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 594 0 0
"3204" "exp3" 2 115 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 630 0 0
"3204" "exp3" 2 116 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1212 43 1
"3204" "exp3" 2 117 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 813 0 0
"3204" "exp3" 2 118 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 695 0 0
"3204" "exp3" 2 119 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 602 0 0
"3204" "exp3" 2 120 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 590 0 0
"3204" "exp3" 2 121 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 794 0 0
"3204" "exp3" 2 122 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 832 35 1
"3204" "exp3" 2 123 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 723 0 0
"3204" "exp3" 2 124 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 658 89 1
"3204" "exp3" 2 125 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 742 67 1
"3204" "exp3" 2 126 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 739 0 0
"3204" "exp3" 2 127 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 804 68 1
"3204" "exp3" 2 128 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 821 0 0
"3204" "exp3" 2 129 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 699 0 0
"3204" "exp3" 2 130 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1028 0 0
"3204" "exp3" 2 131 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 923 0 0
"3204" "exp3" 2 132 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 759 15 1
"3204" "exp3" 1 1 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 652 0 0
"3204" "exp3" 1 2 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 756 0 0
"3204" "exp3" 1 3 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1068 40 1
"3204" "exp3" 1 4 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 822 0 0
"3204" "exp3" 1 5 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 963 3 1
"3204" "exp3" 1 6 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 984 15 1
"3204" "exp3" 1 7 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 514 10 1
"3204" "exp3" 1 8 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1072 66 1
"3204" "exp3" 1 9 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 821 0 0
"3204" "exp3" 1 10 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 729 15 1
"3204" "exp3" 1 11 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 848 29 1
"3204" "exp3" 1 12 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 666 0 0
"3204" "exp3" 1 13 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1102 0 0
"3204" "exp3" 1 14 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 987 38 1
"3204" "exp3" 1 15 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1096 27 1
"3204" "exp3" 1 16 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 919 22 1
"3204" "exp3" 1 17 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1010 0 0
"3204" "exp3" 1 18 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 820 22 1
"3204" "exp3" 1 19 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 692 13 1
"3204" "exp3" 1 20 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1214 0 0
"3204" "exp3" 1 21 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 602 28 1
"3204" "exp3" 1 22 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 638 28 1
"3204" "exp3" 1 23 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 690 24 1
"3204" "exp3" 1 24 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1878 0 0
"3204" "exp3" 1 25 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 835 8 1
"3204" "exp3" 1 26 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 651 0 0
"3204" "exp3" 1 27 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 696 21 1
"3204" "exp3" 1 28 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 1138 0 0
"3204" "exp3" 1 29 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 905 0 0
"3204" "exp3" 1 30 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 817 0 0
"3204" "exp3" 1 31 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 820 24 1
"3204" "exp3" 1 32 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 695 9 1
"3204" "exp3" 1 33 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 705 0 0
"3204" "exp3" 1 34 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 892 0 0
"3204" "exp3" 1 35 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1033 45 1
"3204" "exp3" 1 36 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 667 33 1
"3204" "exp3" 1 37 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1015 59 1
"3204" "exp3" 1 38 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 766 0 0
"3204" "exp3" 1 39 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1006 46 1
"3204" "exp3" 1 40 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1386 19 1
"3204" "exp3" 1 41 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 641 25 1
"3204" "exp3" 1 42 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 760 0 0
"3204" "exp3" 1 43 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 706 24 1
"3204" "exp3" 1 44 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 568 37 1
"3204" "exp3" 1 45 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 763 0 0
"3204" "exp3" 1 46 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 748 0 0
"3204" "exp3" 1 47 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 946 9 1
"3204" "exp3" 1 48 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 645 18 1
"3204" "exp3" 1 49 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 633 29 1
"3204" "exp3" 1 50 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 778 0 0
"3204" "exp3" 1 51 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 565 27 1
"3204" "exp3" 1 52 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 732 21 1
"3204" "exp3" 1 53 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 685 0 0
"3204" "exp3" 1 54 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 955 34 1
"3204" "exp3" 1 55 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1052 21 1
"3204" "exp3" 1 56 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 918 0 0
"3204" "exp3" 1 57 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 704 7 1
"3204" "exp3" 1 58 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 919 36 1
"3204" "exp3" 1 59 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 750 27 1
"3204" "exp3" 1 60 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 686 0 0
"3204" "exp3" 1 61 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1156 24 1
"3204" "exp3" 1 62 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 869 14 1
"3204" "exp3" 1 63 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 635 33 1
"3204" "exp3" 1 64 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 664 19 1
"3204" "exp3" 1 65 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 999 13 1
"3204" "exp3" 1 66 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 643 0 0
"3204" "exp3" 1 67 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 665 20 1
"3204" "exp3" 1 68 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 1341 53 1
"3204" "exp3" 1 69 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 832 0 0
"3204" "exp3" 1 70 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 784 0 0
"3204" "exp3" 1 71 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 881 25 1
"3204" "exp3" 1 72 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 816 0 0
"3204" "exp3" 1 73 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 887 0 0
"3204" "exp3" 1 74 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 1213 58 1
"3204" "exp3" 1 75 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 635 22 1
"3204" "exp3" 1 76 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 561 6 1
"3204" "exp3" 1 77 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 469 26 1
"3204" "exp3" 1 78 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 616 11 1
"3204" "exp3" 1 79 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 652 11 1
"3204" "exp3" 1 80 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 560 0 0
"3204" "exp3" 1 81 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1082 75 1
"3204" "exp3" 1 82 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 652 0 0
"3204" "exp3" 1 83 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 549 23 1
"3204" "exp3" 1 84 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 435 0 0
"3204" "exp3" 1 85 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 405 18 1
"3204" "exp3" 1 86 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 529 32 1
"3204" "exp3" 1 87 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 606 0 0
"3204" "exp3" 1 88 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 568 17 1
"3204" "exp3" 1 89 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 783 0 0
"3204" "exp3" 1 90 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 646 21 1
"3204" "exp3" 1 91 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 492 0 0
"3204" "exp3" 1 92 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 469 0 0
"3204" "exp3" 1 93 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1034 18 1
"3204" "exp3" 1 94 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 609 30 1
"3204" "exp3" 1 95 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 491 0 0
"3204" "exp3" 1 96 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 701 0 0
"3204" "exp3" 1 97 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 852 35 1
"3204" "exp3" 1 98 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 489 0 0
"3204" "exp3" 1 99 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 574 30 1
"3204" "exp3" 1 100 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 797 2 1
"3204" "exp3" 1 101 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 630 13 1
"3204" "exp3" 1 102 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 564 18 1
"3204" "exp3" 1 103 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 512 15 1
"3204" "exp3" 1 104 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 636 0 0
"3204" "exp3" 1 105 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 546 7 1
"3204" "exp3" 1 106 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 627 28 1
"3204" "exp3" 1 107 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 462 42 1
"3204" "exp3" 1 108 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 675 14 1
"3204" "exp3" 1 109 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 560 0 0
"3204" "exp3" 1 110 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 1379 1 1
"3204" "exp3" 1 111 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1434 77 1
"3204" "exp3" 1 112 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 822 43 1
"3204" "exp3" 1 113 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 820 0 0
"3204" "exp3" 1 114 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 774 0 0
"3204" "exp3" 1 115 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 561 4 1
"3204" "exp3" 1 116 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 581 10 1
"3204" "exp3" 1 117 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1039 19 1
"3204" "exp3" 1 118 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 745 26 1
"3204" "exp3" 1 119 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 828 0 0
"3204" "exp3" 1 120 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 794 0 0
"3204" "exp3" 1 121 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1498 33 1
"3204" "exp3" 1 122 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1163 12 1
"3204" "exp3" 1 123 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 712 0 0
"3204" "exp3" 1 124 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 742 35 1
"3204" "exp3" 1 125 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 545 16 1
"3204" "exp3" 1 126 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 650 0 0
"3204" "exp3" 1 127 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 707 27 1
"3204" "exp3" 1 128 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 543 25 1
"3204" "exp3" 1 129 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 611 0 0
"3204" "exp3" 1 130 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 553 31 1
"3204" "exp3" 1 131 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 591 17 1
"3204" "exp3" 1 132 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 569 0 0
"3204" "exp3" 2 1 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 825 0 0
"3204" "exp3" 2 2 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 510 0 0
"3204" "exp3" 2 3 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 551 23 1
"3204" "exp3" 2 4 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 426 20 1
"3204" "exp3" 2 5 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 492 35 1
"3204" "exp3" 2 6 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 552 41 1
"3204" "exp3" 2 7 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 649 24 1
"3204" "exp3" 2 8 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 502 7 1
"3204" "exp3" 2 9 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 531 34 1
"3204" "exp3" 2 10 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 441 0 0
"3204" "exp3" 2 11 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 872 6 1
"3204" "exp3" 2 12 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 502 0 0
"3204" "exp3" 2 13 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 509 21 1
"3204" "exp3" 2 14 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 564 42 1
"3204" "exp3" 2 15 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 590 11 1
"3204" "exp3" 2 16 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 420 0 0
"3204" "exp3" 2 17 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 556 30 1
"3204" "exp3" 2 18 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 717 0 0
"3204" "exp3" 2 19 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1119 0 0
"3204" "exp3" 2 20 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 859 9 1
"3204" "exp3" 2 21 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 655 24 1
"3204" "exp3" 2 22 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 443 29 1
"3204" "exp3" 2 23 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 439 16 1
"3204" "exp3" 2 24 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 435 32 1
"3204" "exp3" 2 25 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 432 24 1
"3204" "exp3" 2 26 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 585 4 1
"3204" "exp3" 2 27 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 455 0 0
"3204" "exp3" 2 28 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 546 5 1
"3204" "exp3" 2 29 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 556 26 1
"3204" "exp3" 2 30 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 656 10 1
"3204" "exp3" 2 31 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 501 0 0
"3204" "exp3" 2 32 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 542 0 0
"3204" "exp3" 2 33 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 536 13 1
"3204" "exp3" 2 34 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 589 0 0
"3204" "exp3" 2 35 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 1110 0 0
"3204" "exp3" 2 36 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 798 0 0
"3204" "exp3" 2 37 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 636 8 1
"3204" "exp3" 2 38 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 469 31 1
"3204" "exp3" 2 39 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 565 31 1
"3204" "exp3" 2 40 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 664 22 1
"3204" "exp3" 2 41 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 553 0 0
"3204" "exp3" 2 42 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 453 0 0
"3204" "exp3" 2 43 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 511 0 0
"3204" "exp3" 2 44 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 537 0 0
"3204" "exp3" 2 45 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 468 10 1
"3204" "exp3" 2 46 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 401 0 0
"3204" "exp3" 2 47 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 782 43 1
"3204" "exp3" 2 48 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 765 0 0
"3204" "exp3" 2 49 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 786 0 0
"3204" "exp3" 2 50 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 989 0 0
"3204" "exp3" 2 51 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 530 64 1
"3204" "exp3" 2 52 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 678 21 1
"3204" "exp3" 2 53 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 736 0 0
"3204" "exp3" 2 54 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 670 22 1
"3204" "exp3" 2 55 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 566 41 1
"3204" "exp3" 2 56 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 472 29 1
"3204" "exp3" 2 57 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 900 25 1
"3204" "exp3" 2 58 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 532 36 1
"3204" "exp3" 2 59 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 459 0 0
"3204" "exp3" 2 60 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 431 43 1
"3204" "exp3" 2 61 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 556 94 1
"3204" "exp3" 2 62 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 581 23 1
"3204" "exp3" 2 63 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 689 0 0
"3204" "exp3" 2 64 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 786 24 1
"3204" "exp3" 2 65 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 481 18 1
"3204" "exp3" 2 66 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 658 52 1
"3204" "exp3" 2 67 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 591 15 1
"3204" "exp3" 2 68 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 593 19 1
"3204" "exp3" 2 69 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 543 33 1
"3204" "exp3" 2 70 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1022 44 1
"3204" "exp3" 2 71 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 466 33 1
"3204" "exp3" 2 72 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 537 36 1
"3204" "exp3" 2 73 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 429 15 1
"3204" "exp3" 2 74 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 461 19 1
"3204" "exp3" 2 75 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 498 39 1
"3204" "exp3" 2 76 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 550 27 1
"3204" "exp3" 2 77 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 422 0 0
"3204" "exp3" 2 78 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 463 27 1
"3204" "exp3" 2 79 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 532 0 0
"3204" "exp3" 2 80 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 456 7 1
"3204" "exp3" 2 81 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 394 23 1
"3204" "exp3" 2 82 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 449 0 0
"3204" "exp3" 2 83 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 486 30 1
"3204" "exp3" 2 84 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 647 17 1
"3204" "exp3" 2 85 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 503 0 0
"3204" "exp3" 2 86 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 466 0 0
"3204" "exp3" 2 87 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 463 39 1
"3204" "exp3" 2 88 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 497 3 1
"3204" "exp3" 2 89 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 488 0 0
"3204" "exp3" 2 90 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 577 17 1
"3204" "exp3" 2 91 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 662 0 0
"3204" "exp3" 2 92 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 575 0 0
"3204" "exp3" 2 93 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 643 0 0
"3204" "exp3" 2 94 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 476 8 1
"3204" "exp3" 2 95 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 700 0 0
"3204" "exp3" 2 96 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 527 0 0
"3204" "exp3" 2 97 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 511 20 1
"3204" "exp3" 2 98 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 476 17 1
"3204" "exp3" 2 99 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 801 0 0
"3204" "exp3" 2 100 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 598 25 1
"3204" "exp3" 2 101 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 656 40 1
"3204" "exp3" 2 102 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 444 13 1
"3204" "exp3" 2 103 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 571 27 1
"3204" "exp3" 2 104 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 426 14 1
"3204" "exp3" 2 105 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 487 5 1
"3204" "exp3" 2 106 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 549 28 1
"3204" "exp3" 2 107 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 493 18 1
"3204" "exp3" 2 108 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 519 84 1
"3204" "exp3" 2 109 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 597 21 1
"3204" "exp3" 2 110 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 653 33 1
"3204" "exp3" 2 111 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 691 2 1
"3204" "exp3" 2 112 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 376 0 0
"3204" "exp3" 2 113 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 632 22 1
"3204" "exp3" 2 114 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 572 0 0
"3204" "exp3" 2 115 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 498 0 0
"3204" "exp3" 2 116 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 538 19 1
"3204" "exp3" 2 117 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 678 0 0
"3204" "exp3" 2 118 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 668 1 1
"3204" "exp3" 2 119 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 991 31 1
"3204" "exp3" 2 120 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 647 14 1
"3204" "exp3" 2 121 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 1091 53 1
"3204" "exp3" 2 122 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1064 0 0
"3204" "exp3" 2 123 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1077 0 0
"3204" "exp3" 2 124 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 756 88 1
"3204" "exp3" 2 125 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 813 0 0
"3204" "exp3" 2 126 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1115 25 1
"3204" "exp3" 2 127 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1027 0 0
"3204" "exp3" 2 128 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 656 0 0
"3204" "exp3" 2 129 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1047 0 0
"3204" "exp3" 2 130 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 605 0 0
"3204" "exp3" 2 131 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 699 20 1
"3204" "exp3" 2 132 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 526 42 1
"3204" "exp3" 1 1 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 769 23 1
"3204" "exp3" 1 2 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 503 28 1
"3204" "exp3" 1 3 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 751 7 1
"3204" "exp3" 1 4 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 880 0 0
"3204" "exp3" 1 5 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 550 10 1
"3204" "exp3" 1 6 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 567 22 1
"3204" "exp3" 1 7 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 668 0 0
"3204" "exp3" 1 8 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 501 1 1
"3204" "exp3" 1 9 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 648 0 0
"3204" "exp3" 1 10 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 523 33 1
"3204" "exp3" 1 11 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 648 11 1
"3204" "exp3" 1 12 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 655 14 1
"3204" "exp3" 1 13 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 672 43 1
"3204" "exp3" 1 14 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 626 25 1
"3204" "exp3" 1 15 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 640 39 1
"3204" "exp3" 1 16 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 607 55 1
"3204" "exp3" 1 17 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 958 29 1
"3204" "exp3" 1 18 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 573 15 1
"3204" "exp3" 1 19 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 654 12 1
"3204" "exp3" 1 20 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 717 21 1
"3204" "exp3" 1 21 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 883 0 0
"3204" "exp3" 1 22 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 515 5 1
"3204" "exp3" 1 23 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 930 26 1
"3204" "exp3" 1 24 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 812 68 1
"3204" "exp3" 1 25 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 867 20 1
"3204" "exp3" 1 26 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 615 7 1
"3204" "exp3" 1 27 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 800 34 1
"3204" "exp3" 1 28 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 663 34 1
"3204" "exp3" 1 29 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 836 0 0
"3204" "exp3" 1 30 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 781 25 1
"3204" "exp3" 1 31 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 645 38 1
"3204" "exp3" 1 32 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 678 14 1
"3204" "exp3" 1 33 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 679 0 0
"3204" "exp3" 1 34 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 672 18 1
"3204" "exp3" 1 35 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 581 42 1
"3204" "exp3" 1 36 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 761 32 1
"3204" "exp3" 1 37 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 649 21 1
"3204" "exp3" 1 38 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 675 0 0
"3204" "exp3" 1 39 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 601 24 1
"3204" "exp3" 1 40 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 569 20 1
"3204" "exp3" 1 41 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 808 40 1
"3204" "exp3" 1 42 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 554 0 0
"3204" "exp3" 1 43 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 682 32 1
"3204" "exp3" 1 44 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 516 0 0
"3204" "exp3" 1 45 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 867 13 1
"3204" "exp3" 1 46 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 850 31 1
"3204" "exp3" 1 47 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 710 28 1
"3204" "exp3" 1 48 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 598 35 1
"3204" "exp3" 1 49 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1058 38 1
"3204" "exp3" 1 50 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 961 0 0
"3204" "exp3" 1 51 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 523 18 1
"3204" "exp3" 1 52 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 712 0 0
"3204" "exp3" 1 53 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 643 33 1
"3204" "exp3" 1 54 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 869 59 1
"3204" "exp3" 1 55 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 746 0 0
"3204" "exp3" 1 56 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 711 0 0
"3204" "exp3" 1 57 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 741 3 1
"3204" "exp3" 1 58 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 769 0 0
"3204" "exp3" 1 59 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 578 54 1
"3204" "exp3" 1 60 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 660 0 0
"3204" "exp3" 1 61 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 654 16 1
"3204" "exp3" 1 62 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 808 28 1
"3204" "exp3" 1 63 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 506 13 1
"3204" "exp3" 1 64 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 419 16 1
"3204" "exp3" 1 65 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 579 0 0
"3204" "exp3" 1 66 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 600 26 1
"3204" "exp3" 1 67 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 534 10 1
"3204" "exp3" 1 68 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 555 28 1
"3204" "exp3" 1 69 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 545 0 0
"3204" "exp3" 1 70 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 500 18 1
"3204" "exp3" 1 71 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 727 0 0
"3204" "exp3" 1 72 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 634 14 1
"3204" "exp3" 1 73 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 509 19 1
"3204" "exp3" 1 74 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 513 0 0
"3204" "exp3" 1 75 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 627 56 1
"3204" "exp3" 1 76 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 560 21 1
"3204" "exp3" 1 77 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 671 35 1
"3204" "exp3" 1 78 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 532 20 1
"3204" "exp3" 1 79 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 699 25 1
"3204" "exp3" 1 80 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 513 17 1
"3204" "exp3" 1 81 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 524 0 0
"3204" "exp3" 1 82 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 458 18 1
"3204" "exp3" 1 83 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 476 2 1
"3204" "exp3" 1 84 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 457 17 1
"3204" "exp3" 1 85 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 526 0 0
"3204" "exp3" 1 86 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 579 11 1
"3204" "exp3" 1 87 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 683 0 0
"3204" "exp3" 1 88 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 556 0 0
"3204" "exp3" 1 89 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 654 0 0
"3204" "exp3" 1 90 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 722 19 1
"3204" "exp3" 1 91 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 814 24 1
"3204" "exp3" 1 92 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 486 5 1
"3204" "exp3" 1 93 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 498 12 1
"3204" "exp3" 1 94 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 528 31 1
"3204" "exp3" 1 95 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 535 0 0
"3204" "exp3" 1 96 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 576 22 1
"3204" "exp3" 1 97 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 596 30 1
"3204" "exp3" 1 98 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 632 36 1
"3204" "exp3" 1 99 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 620 0 0
"3204" "exp3" 1 100 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 543 16 1
"3204" "exp3" 1 101 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 539 0 0
"3204" "exp3" 1 102 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 698 36 1
"3204" "exp3" 1 103 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 633 19 1
"3204" "exp3" 1 104 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 628 17 1
"3204" "exp3" 1 105 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 498 40 1
"3204" "exp3" 1 106 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 743 0 0
"3204" "exp3" 1 107 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 749 49 1
"3204" "exp3" 1 108 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 773 6 1
"3204" "exp3" 1 109 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 558 15 1
"3204" "exp3" 1 110 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 883 29 1
"3204" "exp3" 1 111 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1020 0 0
"3204" "exp3" 1 112 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 800 30 1
"3204" "exp3" 1 113 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 622 0 0
"3204" "exp3" 1 114 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 663 21 1
"3204" "exp3" 1 115 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 695 0 0
"3204" "exp3" 1 116 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 750 0 0
"3204" "exp3" 1 117 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1038 69 1
"3204" "exp3" 1 118 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 504 8 1
"3204" "exp3" 1 119 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 554 9 1
"3204" "exp3" 1 120 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 478 37 1
"3204" "exp3" 1 121 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 541 0 0
"3204" "exp3" 1 122 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 716 8 1
"3204" "exp3" 1 123 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 505 25 1
"3204" "exp3" 1 124 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 763 37 1
"3204" "exp3" 1 125 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 593 29 1
"3204" "exp3" 1 126 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 440 13 1
"3204" "exp3" 1 127 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 578 27 1
"3204" "exp3" 1 128 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 523 0 0
"3204" "exp3" 1 129 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 989 15 1
"3204" "exp3" 1 130 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 584 0 0
"3204" "exp3" 1 131 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 484 42 1
"3204" "exp3" 1 132 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1059 41 1
"3204" "exp3" 2 1 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 991 0 0
"3204" "exp3" 2 2 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 598 38 1
"3204" "exp3" 2 3 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 531 20 1
"3204" "exp3" 2 4 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 456 7 1
"3204" "exp3" 2 5 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 650 20 1
"3204" "exp3" 2 6 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 514 0 0
"3204" "exp3" 2 7 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 555 0 0
"3204" "exp3" 2 8 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1087 42 1
"3204" "exp3" 2 9 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 812 0 0
"3204" "exp3" 2 10 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 569 19 1
"3204" "exp3" 2 11 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 636 9 1
"3204" "exp3" 2 12 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 616 0 0
"3204" "exp3" 2 13 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 593 0 0
"3204" "exp3" 2 14 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 702 0 0
"3204" "exp3" 2 15 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 583 21 1
"3204" "exp3" 2 16 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 567 27 1
"3204" "exp3" 2 17 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 718 29 1
"3204" "exp3" 2 18 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 520 33 1
"3204" "exp3" 2 19 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 868 70 1
"3204" "exp3" 2 20 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 769 6 1
"3204" "exp3" 2 21 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 567 0 0
"3204" "exp3" 2 22 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 551 8 1
"3204" "exp3" 2 23 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 572 31 1
"3204" "exp3" 2 24 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 570 40 1
"3204" "exp3" 2 25 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 790 0 0
"3204" "exp3" 2 26 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 781 0 0
"3204" "exp3" 2 27 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 534 0 0
"3204" "exp3" 2 28 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 665 0 0
"3204" "exp3" 2 29 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 949 66 1
"3204" "exp3" 2 30 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 822 16 1
"3204" "exp3" 2 31 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 612 0 0
"3204" "exp3" 2 32 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 714 5 1
"3204" "exp3" 2 33 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 652 15 1
"3204" "exp3" 2 34 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 568 23 1
"3204" "exp3" 2 35 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 767 0 0
"3204" "exp3" 2 36 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 520 18 1
"3204" "exp3" 2 37 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 508 24 1
"3204" "exp3" 2 38 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 491 7 1
"3204" "exp3" 2 39 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 603 8 1
"3204" "exp3" 2 40 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 507 22 1
"3204" "exp3" 2 41 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 587 13 1
"3204" "exp3" 2 42 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 623 64 1
"3204" "exp3" 2 43 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 545 32 1
"3204" "exp3" 2 44 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 506 9 1
"3204" "exp3" 2 45 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 808 70 1
"3204" "exp3" 2 46 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 710 28 1
"3204" "exp3" 2 47 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 670 54 1
"3204" "exp3" 2 48 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 821 5 1
"3204" "exp3" 2 49 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 674 0 0
"3204" "exp3" 2 50 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 456 30 1
"3204" "exp3" 2 51 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 473 36 1
"3204" "exp3" 2 52 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 742 33 1
"3204" "exp3" 2 53 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 449 19 1
"3204" "exp3" 2 54 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 661 0 0
"3204" "exp3" 2 55 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 609 31 1
"3204" "exp3" 2 56 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 722 0 0
"3204" "exp3" 2 57 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 563 27 1
"3204" "exp3" 2 58 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 528 0 0
"3204" "exp3" 2 59 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 618 31 1
"3204" "exp3" 2 60 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 637 0 0
"3204" "exp3" 2 61 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 582 14 1
"3204" "exp3" 2 62 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 692 26 1
"3204" "exp3" 2 63 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 547 3 1
"3204" "exp3" 2 64 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 539 42 1
"3204" "exp3" 2 65 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 590 29 1
"3204" "exp3" 2 66 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 668 0 0
"3204" "exp3" 2 67 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 630 31 1
"3204" "exp3" 2 68 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 1012 0 0
"3204" "exp3" 2 69 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 612 14 1
"3204" "exp3" 2 70 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 634 24 1
"3204" "exp3" 2 71 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 809 0 0
"3204" "exp3" 2 72 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 529 16 1
"3204" "exp3" 2 73 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 683 0 0
"3204" "exp3" 2 74 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 740 0 0
"3204" "exp3" 2 75 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 543 27 1
"3204" "exp3" 2 76 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 616 37 1
"3204" "exp3" 2 77 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 885 0 0
"3204" "exp3" 2 78 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 429 17 1
"3204" "exp3" 2 79 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 470 20 1
"3204" "exp3" 2 80 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 678 21 1
"3204" "exp3" 2 81 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 612 32 1
"3204" "exp3" 2 82 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 794 0 0
"3204" "exp3" 2 83 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 668 1 1
"3204" "exp3" 2 84 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 563 13 1
"3204" "exp3" 2 85 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 575 47 1
"3204" "exp3" 2 86 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 678 6 1
"3204" "exp3" 2 87 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 944 33 1
"3204" "exp3" 2 88 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 622 0 0
"3204" "exp3" 2 89 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 748 29 1
"3204" "exp3" 2 90 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 773 25 1
"3204" "exp3" 2 91 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 730 0 0
"3204" "exp3" 2 92 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 878 0 0
"3204" "exp3" 2 93 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 665 26 1
"3204" "exp3" 2 94 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 668 19 1
"3204" "exp3" 2 95 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 577 11 1
"3204" "exp3" 2 96 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 591 0 0
"3204" "exp3" 2 97 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 774 45 1
"3204" "exp3" 2 98 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 526 10 1
"3204" "exp3" 2 99 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 683 26 1
"3204" "exp3" 2 100 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 839 0 0
"3204" "exp3" 2 101 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1024 11 1
"3204" "exp3" 2 102 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 935 12 1
"3204" "exp3" 2 103 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 991 64 1
"3204" "exp3" 2 104 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 665 18 1
"3204" "exp3" 2 105 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 623 19 1
"3204" "exp3" 2 106 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 851 0 0
"3204" "exp3" 2 107 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 563 30 1
"3204" "exp3" 2 108 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 803 0 0
"3204" "exp3" 2 109 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 550 0 0
"3204" "exp3" 2 110 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 582 0 0
"3204" "exp3" 2 111 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 664 4 1
"3204" "exp3" 2 112 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 657 29 1
"3204" "exp3" 2 113 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 813 35 1
"3204" "exp3" 2 114 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1201 33 1
"3204" "exp3" 2 115 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1354 0 0
"3204" "exp3" 2 116 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 596 17 1
"3204" "exp3" 2 117 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 983 0 0
"3204" "exp3" 2 118 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 605 16 1
"3204" "exp3" 2 119 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 512 60 1
"3204" "exp3" 2 120 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 685 0 0
"3204" "exp3" 2 121 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 538 13 1
"3204" "exp3" 2 122 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 518 21 1
"3204" "exp3" 2 123 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 520 0 0
"3204" "exp3" 2 124 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 601 10 1
"3204" "exp3" 2 125 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 698 0 0
"3204" "exp3" 2 126 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 502 25 1
"3204" "exp3" 2 127 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 650 12 1
"3204" "exp3" 2 128 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 546 17 1
"3204" "exp3" 2 129 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 770 0 0
"3204" "exp3" 2 130 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 614 14 1
"3204" "exp3" 2 131 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 709 78 1
"3204" "exp3" 2 132 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 536 20 1
"3205" "exp3" 1 1 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1295 34 1
"3205" "exp3" 1 2 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1179 0 0
"3205" "exp3" 1 3 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 2972 10 1
"3205" "exp3" 1 4 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1973 0 0
"3205" "exp3" 1 5 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1553 36 1
"3205" "exp3" 1 6 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1178 0 0
"3205" "exp3" 1 7 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1436 17 1
"3205" "exp3" 1 8 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1567 9 1
"3205" "exp3" 1 9 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1162 0 0
"3205" "exp3" 1 10 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 913 23 1
"3205" "exp3" 1 11 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1329 13 1
"3205" "exp3" 1 12 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1029 45 1
"3205" "exp3" 1 13 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1575 0 0
"3205" "exp3" 1 14 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2324 22 1
"3205" "exp3" 1 15 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1678 0 0
"3205" "exp3" 1 16 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1251 0 0
"3205" "exp3" 1 17 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 2004 7 1
"3205" "exp3" 1 18 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1149 28 1
"3205" "exp3" 1 19 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 910 25 1
"3205" "exp3" 1 20 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 827 13 1
"3205" "exp3" 1 21 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1750 0 0
"3205" "exp3" 1 22 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 2107 38 1
"3205" "exp3" 1 23 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1044 32 1
"3205" "exp3" 1 24 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1025 24 1
"3205" "exp3" 1 25 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1366 18 1
"3205" "exp3" 1 26 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1178 0 0
"3205" "exp3" 1 27 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 1827 5 1
"3205" "exp3" 1 28 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1423 47 1
"3205" "exp3" 1 29 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1773 83 1
"3205" "exp3" 1 30 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1103 19 1
"3205" "exp3" 1 31 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1164 46 1
"3205" "exp3" 1 32 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 911 21 1
"3205" "exp3" 1 33 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1084 0 0
"3205" "exp3" 1 34 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 859 21 1
"3205" "exp3" 1 35 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 875 39 1
"3205" "exp3" 1 36 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 962 0 0
"3205" "exp3" 1 37 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 762 31 1
"3205" "exp3" 1 38 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 819 17 1
"3205" "exp3" 1 39 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1024 20 1
"3205" "exp3" 1 40 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1026 15 1
"3205" "exp3" 1 41 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 3794 0 0
"3205" "exp3" 1 42 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 928 0 0
"3205" "exp3" 1 43 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 662 20 1
"3205" "exp3" 1 44 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1958 8 1
"3205" "exp3" 1 45 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 2151 29 1
"3205" "exp3" 1 46 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1266 12 1
"3205" "exp3" 1 47 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 3035 14 1
"3205" "exp3" 1 48 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1392 0 0
"3205" "exp3" 1 49 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 2241 22 1
"3205" "exp3" 1 50 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2604 40 1
"3205" "exp3" 1 51 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1789 38 1
"3205" "exp3" 1 52 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 2758 36 1
"3205" "exp3" 1 53 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1703 0 0
"3205" "exp3" 1 54 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2203 0 0
"3205" "exp3" 1 55 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2787 37 1
"3205" "exp3" 1 56 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1129 81 1
"3205" "exp3" 1 57 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 2025 18 1
"3205" "exp3" 1 58 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1579 32 1
"3205" "exp3" 1 59 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 758 6 1
"3205" "exp3" 1 60 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1141 30 1
"3205" "exp3" 1 61 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 3314 0 0
"3205" "exp3" 1 62 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 4962 0 0
"3205" "exp3" 1 63 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 3626 41 1
"3205" "exp3" 1 64 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2612 0 0
"3205" "exp3" 1 65 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 3302 40 1
"3205" "exp3" 1 66 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1287 27 1
"3205" "exp3" 1 67 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1302 28 1
"3205" "exp3" 1 68 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 2124 19 1
"3205" "exp3" 1 69 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1626 0 0
"3205" "exp3" 1 70 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 4542 0 0
"3205" "exp3" 1 71 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1173 26 1
"3205" "exp3" 1 72 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 904 0 0
"3205" "exp3" 1 73 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 961 28 1
"3205" "exp3" 1 74 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 760 25 1
"3205" "exp3" 1 75 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 3678 4 1
"3205" "exp3" 1 76 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1990 0 0
"3205" "exp3" 1 77 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2326 43 1
"3205" "exp3" 1 78 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 2280 14 1
"3205" "exp3" 1 79 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 4498 12 1
"3205" "exp3" 1 80 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 835 33 1
"3205" "exp3" 1 81 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1037 33 1
"3205" "exp3" 1 82 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 912 26 1
"3205" "exp3" 1 83 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1465 0 0
"3205" "exp3" 1 84 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1711 16 1
"3205" "exp3" 1 85 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 841 19 1
"3205" "exp3" 1 86 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1505 24 1
"3205" "exp3" 1 87 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1773 30 1
"3205" "exp3" 1 88 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 815 0 0
"3205" "exp3" 1 89 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1312 33 1
"3205" "exp3" 1 90 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1577 37 1
"3205" "exp3" 1 91 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1863 5 1
"3205" "exp3" 1 92 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1576 27 1
"3205" "exp3" 1 93 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 971 31 1
"3205" "exp3" 1 94 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 864 0 0
"3205" "exp3" 1 95 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 793 27 1
"3205" "exp3" 1 96 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2789 14 1
"3205" "exp3" 1 97 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1757 26 1
"3205" "exp3" 1 98 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1265 11 1
"3205" "exp3" 1 99 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2154 0 0
"3205" "exp3" 1 100 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1152 32 1
"3205" "exp3" 1 101 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 855 0 0
"3205" "exp3" 1 102 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 3425 32 1
"3205" "exp3" 1 103 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1457 0 0
"3205" "exp3" 1 104 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 3083 18 1
"3205" "exp3" 1 105 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 2360 35 1
"3205" "exp3" 1 106 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1383 17 1
"3205" "exp3" 1 107 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 727 43 1
"3205" "exp3" 1 108 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 822 35 1
"3205" "exp3" 1 109 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 2348 0 0
"3205" "exp3" 1 110 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1891 0 0
"3205" "exp3" 1 111 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 2336 0 0
"3205" "exp3" 1 112 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 2159 36 1
"3205" "exp3" 1 113 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 823 0 0
"3205" "exp3" 1 114 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 2527 26 1
"3205" "exp3" 1 115 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 2104 0 0
"3205" "exp3" 1 116 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2934 35 1
"3205" "exp3" 1 117 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1495 23 1
"3205" "exp3" 1 118 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 922 44 1
"3205" "exp3" 1 119 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 3882 22 1
"3205" "exp3" 1 120 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 879 33 1
"3205" "exp3" 1 121 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 953 30 1
"3205" "exp3" 1 122 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 4812 13 1
"3205" "exp3" 1 123 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1983 0 0
"3205" "exp3" 1 124 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1251 29 1
"3205" "exp3" 1 125 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2398 45 1
"3205" "exp3" 1 126 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1192 20 1
"3205" "exp3" 1 127 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 3842 0 0
"3205" "exp3" 1 128 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 4627 0 0
"3205" "exp3" 1 129 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 3084 0 0
"3205" "exp3" 1 130 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 5077 0 0
"3205" "exp3" 1 131 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1889 0 0
"3205" "exp3" 1 132 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 3496 44 1
"3205" "exp3" 2 1 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1407 21 1
"3205" "exp3" 2 2 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 891 0 0
"3205" "exp3" 2 3 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 873 31 1
"3205" "exp3" 2 4 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 2711 0 0
"3205" "exp3" 2 5 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 3584 27 1
"3205" "exp3" 2 6 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1352 28 1
"3205" "exp3" 2 7 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1739 14 1
"3205" "exp3" 2 8 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1090 33 1
"3205" "exp3" 2 9 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 790 25 1
"3205" "exp3" 2 10 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1160 22 1
"3205" "exp3" 2 11 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 6149 0 0
"3205" "exp3" 2 12 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1957 26 1
"3205" "exp3" 2 13 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1355 32 1
"3205" "exp3" 2 14 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1147 32 1
"3205" "exp3" 2 15 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 2783 36 1
"3205" "exp3" 2 16 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 698 37 1
"3205" "exp3" 2 17 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 2209 31 1
"3205" "exp3" 2 18 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 777 0 0
"3205" "exp3" 2 19 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3881 0 0
"3205" "exp3" 2 20 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 4429 30 1
"3205" "exp3" 2 21 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 777 0 0
"3205" "exp3" 2 22 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 2406 0 0
"3205" "exp3" 2 23 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 2848 93 1
"3205" "exp3" 2 24 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 2640 0 0
"3205" "exp3" 2 25 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 2628 33 1
"3205" "exp3" 2 26 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 2777 18 1
"3205" "exp3" 2 27 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2624 49 1
"3205" "exp3" 2 28 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1686 0 0
"3205" "exp3" 2 29 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1390 17 1
"3205" "exp3" 2 30 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1541 30 1
"3205" "exp3" 2 31 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1125 0 0
"3205" "exp3" 2 32 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1092 29 1
"3205" "exp3" 2 33 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 773 26 1
"3205" "exp3" 2 34 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1126 20 1
"3205" "exp3" 2 35 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 3512 9 1
"3205" "exp3" 2 36 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 3280 13 1
"3205" "exp3" 2 37 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1135 0 0
"3205" "exp3" 2 38 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1321 17 1
"3205" "exp3" 2 39 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1876 42 1
"3205" "exp3" 2 40 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1443 0 0
"3205" "exp3" 2 41 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1649 0 0
"3205" "exp3" 2 42 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 939 0 0
"3205" "exp3" 2 43 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 4293 0 0
"3205" "exp3" 2 44 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 873 0 0
"3205" "exp3" 2 45 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 2455 0 0
"3205" "exp3" 2 46 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1476 39 1
"3205" "exp3" 2 47 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 711 17 1
"3205" "exp3" 2 48 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1116 35 1
"3205" "exp3" 2 49 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1390 0 0
"3205" "exp3" 2 50 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 3495 0 0
"3205" "exp3" 2 51 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2176 35 1
"3205" "exp3" 2 52 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 4854 0 0
"3205" "exp3" 2 53 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 2833 19 1
"3205" "exp3" 2 54 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1332 23 1
"3205" "exp3" 2 55 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 954 19 1
"3205" "exp3" 2 56 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 3581 12 1
"3205" "exp3" 2 57 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 794 15 1
"3205" "exp3" 2 58 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 974 22 1
"3205" "exp3" 2 59 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2531 14 1
"3205" "exp3" 2 60 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 3775 0 0
"3205" "exp3" 2 61 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 5213 0 0
"3205" "exp3" 2 62 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 2610 33 1
"3205" "exp3" 2 63 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 3562 12 1
"3205" "exp3" 2 64 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 781 38 1
"3205" "exp3" 2 65 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1132 24 1
"3205" "exp3" 2 66 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1251 25 1
"3205" "exp3" 2 67 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1285 0 0
"3205" "exp3" 2 68 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 947 0 0
"3205" "exp3" 2 69 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 960 34 1
"3205" "exp3" 2 70 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 6342 0 0
"3205" "exp3" 2 71 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 2335 25 1
"3205" "exp3" 2 72 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1186 28 1
"3205" "exp3" 2 73 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 769 41 1
"3205" "exp3" 2 74 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 675 8 1
"3205" "exp3" 2 75 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 879 45 1
"3205" "exp3" 2 76 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1183 24 1
"3205" "exp3" 2 77 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 2165 0 0
"3205" "exp3" 2 78 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 2909 0 0
"3205" "exp3" 2 79 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 3178 27 1
"3205" "exp3" 2 80 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 7022 0 0
"3205" "exp3" 2 81 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 2723 0 0
"3205" "exp3" 2 82 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 7969 0 0
"3205" "exp3" 2 83 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 3619 18 1
"3205" "exp3" 2 84 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1249 0 0
"3205" "exp3" 2 85 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 861 18 1
"3205" "exp3" 2 86 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1094 21 1
"3205" "exp3" 2 87 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1453 0 0
"3205" "exp3" 2 88 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1363 15 1
"3205" "exp3" 2 89 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 2139 0 0
"3205" "exp3" 2 90 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1211 38 1
"3205" "exp3" 2 91 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1195 20 1
"3205" "exp3" 2 92 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 6746 0 0
"3205" "exp3" 2 93 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 3135 77 1
"3205" "exp3" 2 94 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 2094 0 0
"3205" "exp3" 2 95 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1383 24 1
"3205" "exp3" 2 96 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1772 27 1
"3205" "exp3" 2 97 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1045 13 1
"3205" "exp3" 2 98 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 943 44 1
"3205" "exp3" 2 99 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1066 16 1
"3205" "exp3" 2 100 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 893 34 1
"3205" "exp3" 2 101 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 736 0 0
"3205" "exp3" 2 102 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1209 8 1
"3205" "exp3" 2 103 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 890 17 1
"3205" "exp3" 2 104 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 975 47 1
"3205" "exp3" 2 105 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1135 16 1
"3205" "exp3" 2 106 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1267 45 1
"3205" "exp3" 2 107 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1090 21 1
"3205" "exp3" 2 108 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 879 15 1
"3205" "exp3" 2 109 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 959 30 1
"3205" "exp3" 2 110 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 912 22 1
"3205" "exp3" 2 111 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 779 23 1
"3205" "exp3" 2 112 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1363 0 0
"3205" "exp3" 2 113 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1223 30 1
"3205" "exp3" 2 114 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 2945 34 1
"3205" "exp3" 2 115 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1100 26 1
"3205" "exp3" 2 116 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 898 0 0
"3205" "exp3" 2 117 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 828 37 1
"3205" "exp3" 2 118 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1055 16 1
"3205" "exp3" 2 119 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1049 0 0
"3205" "exp3" 2 120 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 882 0 0
"3205" "exp3" 2 121 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1065 23 1
"3205" "exp3" 2 122 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1014 21 1
"3205" "exp3" 2 123 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 934 29 1
"3205" "exp3" 2 124 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1201 37 1
"3205" "exp3" 2 125 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 912 0 0
"3205" "exp3" 2 126 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1045 29 1
"3205" "exp3" 2 127 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1473 28 1
"3205" "exp3" 2 128 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 871 19 1
"3205" "exp3" 2 129 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 789 25 1
"3205" "exp3" 2 130 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 757 43 1
"3205" "exp3" 2 131 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 707 26 1
"3205" "exp3" 2 132 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 682 0 0
"3205" "exp3" 1 1 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 759 15 1
"3205" "exp3" 1 2 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 904 40 1
"3205" "exp3" 1 3 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 951 24 1
"3205" "exp3" 1 4 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1482 0 0
"3205" "exp3" 1 5 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1200 41 1
"3205" "exp3" 1 6 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1407 0 0
"3205" "exp3" 1 7 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1950 0 0
"3205" "exp3" 1 8 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1342 25 1
"3205" "exp3" 1 9 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 2925 25 1
"3205" "exp3" 1 10 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1826 38 1
"3205" "exp3" 1 11 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 945 26 1
"3205" "exp3" 1 12 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 982 18 1
"3205" "exp3" 1 13 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 3178 22 1
"3205" "exp3" 1 14 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1163 18 1
"3205" "exp3" 1 15 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 765 16 1
"3205" "exp3" 1 16 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1564 18 1
"3205" "exp3" 1 17 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1686 15 1
"3205" "exp3" 1 18 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1339 20 1
"3205" "exp3" 1 19 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1050 37 1
"3205" "exp3" 1 20 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 3284 14 1
"3205" "exp3" 1 21 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 3002 39 1
"3205" "exp3" 1 22 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 903 43 1
"3205" "exp3" 1 23 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 721 42 1
"3205" "exp3" 1 24 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 788 17 1
"3205" "exp3" 1 25 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1034 23 1
"3205" "exp3" 1 26 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 4487 0 0
"3205" "exp3" 1 27 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 3011 0 0
"3205" "exp3" 1 28 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1856 36 1
"3205" "exp3" 1 29 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1692 17 1
"3205" "exp3" 1 30 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1255 17 1
"3205" "exp3" 1 31 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1257 0 0
"3205" "exp3" 1 32 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 813 31 1
"3205" "exp3" 1 33 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 913 34 1
"3205" "exp3" 1 34 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1140 26 1
"3205" "exp3" 1 35 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 782 37 1
"3205" "exp3" 1 36 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1996 20 1
"3205" "exp3" 1 37 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 611 22 1
"3205" "exp3" 1 38 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1303 0 0
"3205" "exp3" 1 39 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1596 19 1
"3205" "exp3" 1 40 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 962 27 1
"3205" "exp3" 1 41 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 624 13 1
"3205" "exp3" 1 42 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 896 27 1
"3205" "exp3" 1 43 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 944 42 1
"3205" "exp3" 1 44 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1403 0 0
"3205" "exp3" 1 45 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 925 26 1
"3205" "exp3" 1 46 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 751 38 1
"3205" "exp3" 1 47 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1237 13 1
"3205" "exp3" 1 48 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1451 29 1
"3205" "exp3" 1 49 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1253 22 1
"3205" "exp3" 1 50 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 3758 28 1
"3205" "exp3" 1 51 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 7073 65 1
"3205" "exp3" 1 52 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 3400 43 1
"3205" "exp3" 1 53 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 11521 0 0
"3205" "exp3" 1 54 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1282 0 0
"3205" "exp3" 1 55 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 2600 19 1
"3205" "exp3" 1 56 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 950 0 0
"3205" "exp3" 1 57 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1739 20 1
"3205" "exp3" 1 58 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1493 10 1
"3205" "exp3" 1 59 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1223 24 1
"3205" "exp3" 1 60 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 965 44 1
"3205" "exp3" 1 61 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1256 31 1
"3205" "exp3" 1 62 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1122 23 1
"3205" "exp3" 1 63 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 3156 0 0
"3205" "exp3" 1 64 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 2282 16 1
"3205" "exp3" 1 65 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 2624 28 1
"3205" "exp3" 1 66 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 4427 0 0
"3205" "exp3" 1 67 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2528 0 0
"3205" "exp3" 1 68 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 7021 0 0
"3205" "exp3" 1 69 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1441 27 1
"3205" "exp3" 1 70 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 780 19 1
"3205" "exp3" 1 71 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1777 49 1
"3205" "exp3" 1 72 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1098 32 1
"3205" "exp3" 1 73 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 915 0 0
"3205" "exp3" 1 74 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1096 12 1
"3205" "exp3" 1 75 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 3130 9 1
"3205" "exp3" 1 76 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 761 0 0
"3205" "exp3" 1 77 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 7639 0 0
"3205" "exp3" 1 78 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2577 0 0
"3205" "exp3" 1 79 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1635 21 1
"3205" "exp3" 1 80 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1651 0 0
"3205" "exp3" 1 81 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 3350 24 1
"3205" "exp3" 1 82 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 4398 94 1
"3205" "exp3" 1 83 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1268 44 1
"3205" "exp3" 1 84 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2114 0 0
"3205" "exp3" 1 85 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 3619 45 1
"3205" "exp3" 1 86 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1405 15 1
"3205" "exp3" 1 87 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2316 21 1
"3205" "exp3" 1 88 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 5868 0 0
"3205" "exp3" 1 89 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 795 19 1
"3205" "exp3" 1 90 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 873 34 1
"3205" "exp3" 1 91 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 979 0 0
"3205" "exp3" 1 92 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 830 0 0
"3205" "exp3" 1 93 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 898 18 1
"3205" "exp3" 1 94 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1613 0 0
"3205" "exp3" 1 95 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1510 45 1
"3205" "exp3" 1 96 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 964 14 1
"3205" "exp3" 1 97 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 779 28 1
"3205" "exp3" 1 98 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 646 21 1
"3205" "exp3" 1 99 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1431 29 1
"3205" "exp3" 1 100 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1191 0 0
"3205" "exp3" 1 101 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1103 36 1
"3205" "exp3" 1 102 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 967 0 0
"3205" "exp3" 1 103 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1199 0 0
"3205" "exp3" 1 104 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1152 47 1
"3205" "exp3" 1 105 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 801 30 1
"3205" "exp3" 1 106 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 911 0 0
"3205" "exp3" 1 107 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 3204 17 1
"3205" "exp3" 1 108 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1525 22 1
"3205" "exp3" 1 109 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 933 24 1
"3205" "exp3" 1 110 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1047 20 1
"3205" "exp3" 1 111 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1106 29 1
"3205" "exp3" 1 112 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 677 0 0
"3205" "exp3" 1 113 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 5744 93 1
"3205" "exp3" 1 114 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 4986 0 0
"3205" "exp3" 1 115 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 946 26 1
"3205" "exp3" 1 116 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3122 0 0
"3205" "exp3" 1 117 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2671 16 1
"3205" "exp3" 1 118 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 936 0 0
"3205" "exp3" 1 119 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1802 10 1
"3205" "exp3" 1 120 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 854 30 1
"3205" "exp3" 1 121 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 496 14 1
"3205" "exp3" 1 122 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1623 0 0
"3205" "exp3" 1 123 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1380 0 0
"3205" "exp3" 1 124 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2030 37 1
"3205" "exp3" 1 125 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 844 25 1
"3205" "exp3" 1 126 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1226 0 0
"3205" "exp3" 1 127 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 746 33 1
"3205" "exp3" 1 128 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1693 7 1
"3205" "exp3" 1 129 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1700 12 1
"3205" "exp3" 1 130 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1124 23 1
"3205" "exp3" 1 131 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 5625 0 0
"3205" "exp3" 1 132 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 949 0 0
"3205" "exp3" 2 1 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 754 25 1
"3205" "exp3" 2 2 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2677 94 1
"3205" "exp3" 2 3 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 501 36 1
"3205" "exp3" 2 4 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 573 20 1
"3205" "exp3" 2 5 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 758 18 1
"3205" "exp3" 2 6 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 913 38 1
"3205" "exp3" 2 7 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1663 18 1
"3205" "exp3" 2 8 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 604 0 0
"3205" "exp3" 2 9 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 907 22 1
"3205" "exp3" 2 10 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 587 21 1
"3205" "exp3" 2 11 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 952 0 0
"3205" "exp3" 2 12 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1034 0 0
"3205" "exp3" 2 13 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1788 13 1
"3205" "exp3" 2 14 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1626 0 0
"3205" "exp3" 2 15 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 727 0 0
"3205" "exp3" 2 16 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 826 36 1
"3205" "exp3" 2 17 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1000 25 1
"3205" "exp3" 2 18 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 828 0 0
"3205" "exp3" 2 19 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 665 16 1
"3205" "exp3" 2 20 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 756 17 1
"3205" "exp3" 2 21 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1488 0 0
"3205" "exp3" 2 22 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 845 49 1
"3205" "exp3" 2 23 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1506 9 1
"3205" "exp3" 2 24 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 955 23 1
"3205" "exp3" 2 25 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1569 10 1
"3205" "exp3" 2 26 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1261 47 1
"3205" "exp3" 2 27 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 782 0 0
"3205" "exp3" 2 28 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1035 11 1
"3205" "exp3" 2 29 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 996 25 1
"3205" "exp3" 2 30 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1044 43 1
"3205" "exp3" 2 31 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 627 32 1
"3205" "exp3" 2 32 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 2449 0 0
"3205" "exp3" 2 33 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 848 34 1
"3205" "exp3" 2 34 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 720 36 1
"3205" "exp3" 2 35 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 660 0 0
"3205" "exp3" 2 36 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 763 29 1
"3205" "exp3" 2 37 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 739 20 1
"3205" "exp3" 2 38 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 758 28 1
"3205" "exp3" 2 39 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 886 39 1
"3205" "exp3" 2 40 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 766 22 1
"3205" "exp3" 2 41 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1150 0 0
"3205" "exp3" 2 42 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 790 44 1
"3205" "exp3" 2 43 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 774 24 1
"3205" "exp3" 2 44 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 850 19 1
"3205" "exp3" 2 45 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 677 0 0
"3205" "exp3" 2 46 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 815 30 1
"3205" "exp3" 2 47 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 2051 7 1
"3205" "exp3" 2 48 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1156 0 0
"3205" "exp3" 2 49 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 811 3 1
"3205" "exp3" 2 50 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1371 31 1
"3205" "exp3" 2 51 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 818 42 1
"3205" "exp3" 2 52 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 627 31 1
"3205" "exp3" 2 53 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 706 0 0
"3205" "exp3" 2 54 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 857 20 1
"3205" "exp3" 2 55 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 896 0 0
"3205" "exp3" 2 56 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 636 21 1
"3205" "exp3" 2 57 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 765 0 0
"3205" "exp3" 2 58 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 730 26 1
"3205" "exp3" 2 59 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 840 35 1
"3205" "exp3" 2 60 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1136 45 1
"3205" "exp3" 2 61 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 631 33 1
"3205" "exp3" 2 62 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 718 12 1
"3205" "exp3" 2 63 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 922 43 1
"3205" "exp3" 2 64 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 876 18 1
"3205" "exp3" 2 65 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 695 0 0
"3205" "exp3" 2 66 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 739 9 1
"3205" "exp3" 2 67 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 992 37 1
"3205" "exp3" 2 68 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 842 18 1
"3205" "exp3" 2 69 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 890 13 1
"3205" "exp3" 2 70 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 970 0 0
"3205" "exp3" 2 71 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 758 37 1
"3205" "exp3" 2 72 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 757 24 1
"3205" "exp3" 2 73 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 732 35 1
"3205" "exp3" 2 74 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 603 0 0
"3205" "exp3" 2 75 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 559 39 1
"3205" "exp3" 2 76 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 915 0 0
"3205" "exp3" 2 77 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2056 95 1
"3205" "exp3" 2 78 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1331 0 0
"3205" "exp3" 2 79 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 799 29 1
"3205" "exp3" 2 80 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1807 30 1
"3205" "exp3" 2 81 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1756 0 0
"3205" "exp3" 2 82 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 785 15 1
"3205" "exp3" 2 83 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1067 28 1
"3205" "exp3" 2 84 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1995 41 1
"3205" "exp3" 2 85 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1535 32 1
"3205" "exp3" 2 86 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1080 33 1
"3205" "exp3" 2 87 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 977 23 1
"3205" "exp3" 2 88 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 526 23 1
"3205" "exp3" 2 89 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 832 26 1
"3205" "exp3" 2 90 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 941 0 0
"3205" "exp3" 2 91 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 586 27 1
"3205" "exp3" 2 92 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 755 34 1
"3205" "exp3" 2 93 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 599 44 1
"3205" "exp3" 2 94 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 547 23 1
"3205" "exp3" 2 95 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 607 19 1
"3205" "exp3" 2 96 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 591 15 1
"3205" "exp3" 2 97 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 705 20 1
"3205" "exp3" 2 98 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 749 0 0
"3205" "exp3" 2 99 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 910 28 1
"3205" "exp3" 2 100 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 521 17 1
"3205" "exp3" 2 101 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 822 30 1
"3205" "exp3" 2 102 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 890 16 1
"3205" "exp3" 2 103 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1040 40 1
"3205" "exp3" 2 104 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 541 0 0
"3205" "exp3" 2 105 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 451 22 1
"3205" "exp3" 2 106 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2120 0 0
"3205" "exp3" 2 107 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 782 19 1
"3205" "exp3" 2 108 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1602 0 0
"3205" "exp3" 2 109 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1236 26 1
"3205" "exp3" 2 110 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1584 17 1
"3205" "exp3" 2 111 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 2251 0 0
"3205" "exp3" 2 112 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1534 0 0
"3205" "exp3" 2 113 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1877 14 1
"3205" "exp3" 2 114 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1434 17 1
"3205" "exp3" 2 115 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 778 0 0
"3205" "exp3" 2 116 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 787 16 1
"3205" "exp3" 2 117 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1014 0 0
"3205" "exp3" 2 118 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1219 7 1
"3205" "exp3" 2 119 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1776 34 1
"3205" "exp3" 2 120 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1034 33 1
"3205" "exp3" 2 121 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 2821 0 0
"3205" "exp3" 2 122 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 2206 31 1
"3205" "exp3" 2 123 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1910 19 1
"3205" "exp3" 2 124 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2010 0 0
"3205" "exp3" 2 125 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 2174 24 1
"3205" "exp3" 2 126 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2499 0 0
"3205" "exp3" 2 127 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 2181 0 0
"3205" "exp3" 2 128 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1036 0 0
"3205" "exp3" 2 129 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 808 46 1
"3205" "exp3" 2 130 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 911 28 1
"3205" "exp3" 2 131 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 994 45 1
"3205" "exp3" 2 132 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1949 15 1
"3205" "exp3" 1 1 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 570 29 1
"3205" "exp3" 1 2 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 468 23 1
"3205" "exp3" 1 3 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 441 0 0
"3205" "exp3" 1 4 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 842 30 1
"3205" "exp3" 1 5 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 542 32 1
"3205" "exp3" 1 6 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 470 20 1
"3205" "exp3" 1 7 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 851 47 1
"3205" "exp3" 1 8 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 716 12 1
"3205" "exp3" 1 9 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 669 0 0
"3205" "exp3" 1 10 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1892 9 1
"3205" "exp3" 1 11 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 496 11 1
"3205" "exp3" 1 12 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1188 27 1
"3205" "exp3" 1 13 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 445 42 1
"3205" "exp3" 1 14 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 386 0 0
"3205" "exp3" 1 15 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 476 0 0
"3205" "exp3" 1 16 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 859 0 0
"3205" "exp3" 1 17 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 525 35 1
"3205" "exp3" 1 18 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 684 30 1
"3205" "exp3" 1 19 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 907 36 1
"3205" "exp3" 1 20 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 629 0 0
"3205" "exp3" 1 21 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 751 0 0
"3205" "exp3" 1 22 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 845 0 0
"3205" "exp3" 1 23 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 828 16 1
"3205" "exp3" 1 24 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 703 24 1
"3205" "exp3" 1 25 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 712 16 1
"3205" "exp3" 1 26 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 579 0 0
"3205" "exp3" 1 27 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1299 24 1
"3205" "exp3" 1 28 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 4322 10 1
"3205" "exp3" 1 29 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 4985 8 1
"3205" "exp3" 1 30 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1181 0 0
"3205" "exp3" 1 31 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 479 38 1
"3205" "exp3" 1 32 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 544 29 1
"3205" "exp3" 1 33 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 774 0 0
"3205" "exp3" 1 34 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 425 5 1
"3205" "exp3" 1 35 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 695 17 1
"3205" "exp3" 1 36 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 554 17 1
"3205" "exp3" 1 37 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 531 0 0
"3205" "exp3" 1 38 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 962 15 1
"3205" "exp3" 1 39 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 705 22 1
"3205" "exp3" 1 40 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 810 13 1
"3205" "exp3" 1 41 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 514 0 0
"3205" "exp3" 1 42 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 593 21 1
"3205" "exp3" 1 43 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 527 22 1
"3205" "exp3" 1 44 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 520 0 0
"3205" "exp3" 1 45 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 705 13 1
"3205" "exp3" 1 46 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 485 0 0
"3205" "exp3" 1 47 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 836 0 0
"3205" "exp3" 1 48 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 527 0 0
"3205" "exp3" 1 49 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 752 21 1
"3205" "exp3" 1 50 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 710 0 0
"3205" "exp3" 1 51 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 624 31 1
"3205" "exp3" 1 52 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 617 29 1
"3205" "exp3" 1 53 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 787 0 0
"3205" "exp3" 1 54 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 7467 0 0
"3205" "exp3" 1 55 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 7050 0 0
"3205" "exp3" 1 56 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1724 35 1
"3205" "exp3" 1 57 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 4289 0 0
"3205" "exp3" 1 58 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1444 12 1
"3205" "exp3" 1 59 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 871 0 0
"3205" "exp3" 1 60 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 722 18 1
"3205" "exp3" 1 61 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1310 11 1
"3205" "exp3" 1 62 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 886 19 1
"3205" "exp3" 1 63 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 737 0 0
"3205" "exp3" 1 64 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 587 33 1
"3205" "exp3" 1 65 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 636 27 1
"3205" "exp3" 1 66 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 539 23 1
"3205" "exp3" 1 67 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 604 32 1
"3205" "exp3" 1 68 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1262 0 0
"3205" "exp3" 1 69 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1223 0 0
"3205" "exp3" 1 70 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1716 6 1
"3205" "exp3" 1 71 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 606 0 0
"3205" "exp3" 1 72 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 517 0 0
"3205" "exp3" 1 73 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1890 0 0
"3205" "exp3" 1 74 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 1833 6 1
"3205" "exp3" 1 75 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 600 26 1
"3205" "exp3" 1 76 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 604 28 1
"3205" "exp3" 1 77 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 875 0 0
"3205" "exp3" 1 78 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1984 14 1
"3205" "exp3" 1 79 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1220 49 1
"3205" "exp3" 1 80 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 629 0 0
"3205" "exp3" 1 81 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 722 14 1
"3205" "exp3" 1 82 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 653 35 1
"3205" "exp3" 1 83 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 672 18 1
"3205" "exp3" 1 84 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 568 16 1
"3205" "exp3" 1 85 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 591 19 1
"3205" "exp3" 1 86 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 496 24 1
"3205" "exp3" 1 87 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1060 96 1
"3205" "exp3" 1 88 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1264 30 1
"3205" "exp3" 1 89 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 620 34 1
"3205" "exp3" 1 90 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 729 25 1
"3205" "exp3" 1 91 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 557 31 1
"3205" "exp3" 1 92 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 559 0 0
"3205" "exp3" 1 93 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 606 40 1
"3205" "exp3" 1 94 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 554 36 1
"3205" "exp3" 1 95 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1383 0 0
"3205" "exp3" 1 96 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 1864 7 1
"3205" "exp3" 1 97 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1138 21 1
"3205" "exp3" 1 98 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 724 38 1
"3205" "exp3" 1 99 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 875 26 1
"3205" "exp3" 1 100 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 672 22 1
"3205" "exp3" 1 101 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 510 30 1
"3205" "exp3" 1 102 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1647 8 1
"3205" "exp3" 1 103 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 558 25 1
"3205" "exp3" 1 104 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1296 23 1
"3205" "exp3" 1 105 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 832 44 1
"3205" "exp3" 1 106 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 666 20 1
"3205" "exp3" 1 107 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 579 0 0
"3205" "exp3" 1 108 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 598 36 1
"3205" "exp3" 1 109 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 702 20 1
"3205" "exp3" 1 110 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 681 26 1
"3205" "exp3" 1 111 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 766 31 1
"3205" "exp3" 1 112 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 616 15 1
"3205" "exp3" 1 113 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 722 0 0
"3205" "exp3" 1 114 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 424 43 1
"3205" "exp3" 1 115 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 666 21 1
"3205" "exp3" 1 116 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 504 0 0
"3205" "exp3" 1 117 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 527 27 1
"3205" "exp3" 1 118 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 703 0 0
"3205" "exp3" 1 119 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 827 0 0
"3205" "exp3" 1 120 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 617 32 1
"3205" "exp3" 1 121 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1397 43 1
"3205" "exp3" 1 122 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 621 39 1
"3205" "exp3" 1 123 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 580 40 1
"3205" "exp3" 1 124 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 772 17 1
"3205" "exp3" 1 125 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 698 0 0
"3205" "exp3" 1 126 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 537 10 1
"3205" "exp3" 1 127 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 632 22 1
"3205" "exp3" 1 128 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 897 44 1
"3205" "exp3" 1 129 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1001 0 0
"3205" "exp3" 1 130 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1171 13 1
"3205" "exp3" 1 131 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 2389 28 1
"3205" "exp3" 1 132 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1630 0 0
"3205" "exp3" 2 1 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 976 0 0
"3205" "exp3" 2 2 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 839 7 1
"3205" "exp3" 2 3 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 806 48 1
"3205" "exp3" 2 4 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 979 0 0
"3205" "exp3" 2 5 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 964 24 1
"3205" "exp3" 2 6 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1278 45 1
"3205" "exp3" 2 7 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 716 28 1
"3205" "exp3" 2 8 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1056 0 0
"3205" "exp3" 2 9 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1205 0 0
"3205" "exp3" 2 10 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 516 0 0
"3205" "exp3" 2 11 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 561 0 0
"3205" "exp3" 2 12 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 917 10 1
"3205" "exp3" 2 13 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 544 32 1
"3205" "exp3" 2 14 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 556 30 1
"3205" "exp3" 2 15 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 515 42 1
"3205" "exp3" 2 16 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 685 19 1
"3205" "exp3" 2 17 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1243 29 1
"3205" "exp3" 2 18 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 664 23 1
"3205" "exp3" 2 19 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 937 33 1
"3205" "exp3" 2 20 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 625 38 1
"3205" "exp3" 2 21 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 553 34 1
"3205" "exp3" 2 22 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 685 0 0
"3205" "exp3" 2 23 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 914 14 1
"3205" "exp3" 2 24 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 809 46 1
"3205" "exp3" 2 25 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 671 17 1
"3205" "exp3" 2 26 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 530 11 1
"3205" "exp3" 2 27 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 475 7 1
"3205" "exp3" 2 28 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 939 0 0
"3205" "exp3" 2 29 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 558 0 0
"3205" "exp3" 2 30 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 563 23 1
"3205" "exp3" 2 31 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 726 0 0
"3205" "exp3" 2 32 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 596 6 1
"3205" "exp3" 2 33 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1391 17 1
"3205" "exp3" 2 34 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 979 31 1
"3205" "exp3" 2 35 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 608 15 1
"3205" "exp3" 2 36 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 497 12 1
"3205" "exp3" 2 37 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 493 33 1
"3205" "exp3" 2 38 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 765 0 0
"3205" "exp3" 2 39 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 945 0 0
"3205" "exp3" 2 40 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 2350 6 1
"3205" "exp3" 2 41 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1058 0 0
"3205" "exp3" 2 42 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 528 22 1
"3205" "exp3" 2 43 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 549 16 1
"3205" "exp3" 2 44 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 900 0 0
"3205" "exp3" 2 45 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 5190 37 1
"3205" "exp3" 2 46 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 2853 27 1
"3205" "exp3" 2 47 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 964 0 0
"3205" "exp3" 2 48 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1038 0 0
"3205" "exp3" 2 49 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 787 0 0
"3205" "exp3" 2 50 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 636 0 0
"3205" "exp3" 2 51 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 986 0 0
"3205" "exp3" 2 52 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 519 42 1
"3205" "exp3" 2 53 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 433 28 1
"3205" "exp3" 2 54 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 550 28 1
"3205" "exp3" 2 55 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 700 24 1
"3205" "exp3" 2 56 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 643 22 1
"3205" "exp3" 2 57 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 519 23 1
"3205" "exp3" 2 58 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 469 36 1
"3205" "exp3" 2 59 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 568 35 1
"3205" "exp3" 2 60 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 535 13 1
"3205" "exp3" 2 61 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 472 20 1
"3205" "exp3" 2 62 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 441 30 1
"3205" "exp3" 2 63 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 468 27 1
"3205" "exp3" 2 64 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 598 47 1
"3205" "exp3" 2 65 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 455 43 1
"3205" "exp3" 2 66 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 644 0 0
"3205" "exp3" 2 67 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 816 9 1
"3205" "exp3" 2 68 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 483 30 1
"3205" "exp3" 2 69 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 587 32 1
"3205" "exp3" 2 70 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 595 0 0
"3205" "exp3" 2 71 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1582 0 0
"3205" "exp3" 2 72 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 739 49 1
"3205" "exp3" 2 73 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 819 18 1
"3205" "exp3" 2 74 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 608 19 1
"3205" "exp3" 2 75 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 649 45 1
"3205" "exp3" 2 76 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 451 32 1
"3205" "exp3" 2 77 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 668 0 0
"3205" "exp3" 2 78 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 483 18 1
"3205" "exp3" 2 79 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 474 36 1
"3205" "exp3" 2 80 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 543 13 1
"3205" "exp3" 2 81 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 759 14 1
"3205" "exp3" 2 82 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1298 95 1
"3205" "exp3" 2 83 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 894 0 0
"3205" "exp3" 2 84 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1059 12 1
"3205" "exp3" 2 85 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 714 19 1
"3205" "exp3" 2 86 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 516 0 0
"3205" "exp3" 2 87 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 491 28 1
"3205" "exp3" 2 88 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 516 0 0
"3205" "exp3" 2 89 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 542 0 0
"3205" "exp3" 2 90 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 439 10 1
"3205" "exp3" 2 91 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 464 43 1
"3205" "exp3" 2 92 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 891 26 1
"3205" "exp3" 2 93 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 479 24 1
"3205" "exp3" 2 94 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 434 27 1
"3205" "exp3" 2 95 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 450 0 0
"3205" "exp3" 2 96 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 430 26 1
"3205" "exp3" 2 97 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 498 25 1
"3205" "exp3" 2 98 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 470 40 1
"3205" "exp3" 2 99 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 442 0 0
"3205" "exp3" 2 100 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 3210 0 0
"3205" "exp3" 2 101 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 965 29 1
"3205" "exp3" 2 102 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1294 14 1
"3205" "exp3" 2 103 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1221 0 0
"3205" "exp3" 2 104 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 2463 25 1
"3205" "exp3" 2 105 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 2117 11 1
"3205" "exp3" 2 106 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 905 0 0
"3205" "exp3" 2 107 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 937 0 0
"3205" "exp3" 2 108 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 2120 0 0
"3205" "exp3" 2 109 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1146 0 0
"3205" "exp3" 2 110 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 7721 92 1
"3205" "exp3" 2 111 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1378 0 0
"3205" "exp3" 2 112 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 957 20 1
"3205" "exp3" 2 113 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1693 13 1
"3205" "exp3" 2 114 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 784 20 1
"3205" "exp3" 2 115 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 1370 18 1
"3205" "exp3" 2 116 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1248 35 1
"3205" "exp3" 2 117 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 3166 0 0
"3205" "exp3" 2 118 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1575 0 0
"3205" "exp3" 2 119 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 760 38 1
"3205" "exp3" 2 120 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 583 20 1
"3205" "exp3" 2 121 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 730 26 1
"3205" "exp3" 2 122 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 585 34 1
"3205" "exp3" 2 123 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 755 33 1
"3205" "exp3" 2 124 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 523 17 1
"3205" "exp3" 2 125 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 975 0 0
"3205" "exp3" 2 126 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1585 18 1
"3205" "exp3" 2 127 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 826 25 1
"3205" "exp3" 2 128 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 610 37 1
"3205" "exp3" 2 129 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1121 0 0
"3205" "exp3" 2 130 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 867 0 0
"3205" "exp3" 2 131 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 558 15 1
"3205" "exp3" 2 132 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 525 21 1
"3205" "exp3" 1 1 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 861 27 1
"3205" "exp3" 1 2 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 563 0 0
"3205" "exp3" 1 3 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 761 0 0
"3205" "exp3" 1 4 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 831 24 1
"3205" "exp3" 1 5 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 767 0 0
"3205" "exp3" 1 6 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 602 20 1
"3205" "exp3" 1 7 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 934 33 1
"3205" "exp3" 1 8 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 603 9 1
"3205" "exp3" 1 9 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 586 30 1
"3205" "exp3" 1 10 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 422 18 1
"3205" "exp3" 1 11 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 613 33 1
"3205" "exp3" 1 12 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 862 8 1
"3205" "exp3" 1 13 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 710 38 1
"3205" "exp3" 1 14 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 693 37 1
"3205" "exp3" 1 15 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 628 20 1
"3205" "exp3" 1 16 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 463 26 1
"3205" "exp3" 1 17 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 629 28 1
"3205" "exp3" 1 18 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 441 31 1
"3205" "exp3" 1 19 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 867 31 1
"3205" "exp3" 1 20 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1752 0 0
"3205" "exp3" 1 21 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 677 14 1
"3205" "exp3" 1 22 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 467 28 1
"3205" "exp3" 1 23 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 503 21 1
"3205" "exp3" 1 24 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 403 19 1
"3205" "exp3" 1 25 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 584 23 1
"3205" "exp3" 1 26 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 564 10 1
"3205" "exp3" 1 27 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 891 35 1
"3205" "exp3" 1 28 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 508 18 1
"3205" "exp3" 1 29 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 851 26 1
"3205" "exp3" 1 30 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 406 35 1
"3205" "exp3" 1 31 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 471 28 1
"3205" "exp3" 1 32 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 630 0 0
"3205" "exp3" 1 33 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 438 11 1
"3205" "exp3" 1 34 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 747 46 1
"3205" "exp3" 1 35 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1308 0 0
"3205" "exp3" 1 36 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 640 29 1
"3205" "exp3" 1 37 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 700 0 0
"3205" "exp3" 1 38 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1763 0 0
"3205" "exp3" 1 39 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 5530 8 1
"3205" "exp3" 1 40 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 2530 0 0
"3205" "exp3" 1 41 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 5311 6 1
"3205" "exp3" 1 42 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1495 30 1
"3205" "exp3" 1 43 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 619 12 1
"3205" "exp3" 1 44 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 835 26 1
"3205" "exp3" 1 45 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 723 7 1
"3205" "exp3" 1 46 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1207 45 1
"3205" "exp3" 1 47 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 735 0 0
"3205" "exp3" 1 48 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 427 0 0
"3205" "exp3" 1 49 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 650 22 1
"3205" "exp3" 1 50 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 590 40 1
"3205" "exp3" 1 51 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 533 12 1
"3205" "exp3" 1 52 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 4913 13 1
"3205" "exp3" 1 53 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 769 16 1
"3205" "exp3" 1 54 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 524 15 1
"3205" "exp3" 1 55 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 804 0 0
"3205" "exp3" 1 56 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 854 45 1
"3205" "exp3" 1 57 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 789 0 0
"3205" "exp3" 1 58 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 830 18 1
"3205" "exp3" 1 59 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 578 43 1
"3205" "exp3" 1 60 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 491 0 0
"3205" "exp3" 1 61 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 559 39 1
"3205" "exp3" 1 62 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 7652 0 0
"3205" "exp3" 1 63 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1853 20 1
"3205" "exp3" 1 64 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 777 24 1
"3205" "exp3" 1 65 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 718 22 1
"3205" "exp3" 1 66 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1057 0 0
"3205" "exp3" 1 67 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 608 19 1
"3205" "exp3" 1 68 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 626 17 1
"3205" "exp3" 1 69 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 472 9 1
"3205" "exp3" 1 70 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 454 17 1
"3205" "exp3" 1 71 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 597 1 1
"3205" "exp3" 1 72 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 764 35 1
"3205" "exp3" 1 73 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 875 36 1
"3205" "exp3" 1 74 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 601 0 0
"3205" "exp3" 1 75 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 912 6 1
"3205" "exp3" 1 76 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 666 32 1
"3205" "exp3" 1 77 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 650 30 1
"3205" "exp3" 1 78 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 657 22 1
"3205" "exp3" 1 79 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 515 16 1
"3205" "exp3" 1 80 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 508 34 1
"3205" "exp3" 1 81 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 625 17 1
"3205" "exp3" 1 82 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 575 43 1
"3205" "exp3" 1 83 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 656 38 1
"3205" "exp3" 1 84 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1015 49 1
"3205" "exp3" 1 85 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1139 21 1
"3205" "exp3" 1 86 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 485 0 0
"3205" "exp3" 1 87 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 887 13 1
"3205" "exp3" 1 88 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 756 44 1
"3205" "exp3" 1 89 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 567 39 1
"3205" "exp3" 1 90 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 598 0 0
"3205" "exp3" 1 91 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 433 27 1
"3205" "exp3" 1 92 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 457 0 0
"3205" "exp3" 1 93 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 409 22 1
"3205" "exp3" 1 94 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 415 0 0
"3205" "exp3" 1 95 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 431 42 1
"3205" "exp3" 1 96 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 535 0 0
"3205" "exp3" 1 97 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 694 7 1
"3205" "exp3" 1 98 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 514 26 1
"3205" "exp3" 1 99 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 620 23 1
"3205" "exp3" 1 100 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 403 13 1
"3205" "exp3" 1 101 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 716 47 1
"3205" "exp3" 1 102 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1062 14 1
"3205" "exp3" 1 103 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1693 11 1
"3205" "exp3" 1 104 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 463 33 1
"3205" "exp3" 1 105 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 489 17 1
"3205" "exp3" 1 106 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 650 3 1
"3205" "exp3" 1 107 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 567 25 1
"3205" "exp3" 1 108 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 743 0 0
"3205" "exp3" 1 109 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 670 21 1
"3205" "exp3" 1 110 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 864 48 1
"3205" "exp3" 1 111 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 622 0 0
"3205" "exp3" 1 112 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 671 18 1
"3205" "exp3" 1 113 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1808 28 1
"3205" "exp3" 1 114 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 610 36 1
"3205" "exp3" 1 115 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 976 32 1
"3205" "exp3" 1 116 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 995 34 1
"3205" "exp3" 1 117 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 621 40 1
"3205" "exp3" 1 118 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 645 24 1
"3205" "exp3" 1 119 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 851 37 1
"3205" "exp3" 1 120 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 479 0 0
"3205" "exp3" 1 121 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 652 31 1
"3205" "exp3" 1 122 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 1369 0 0
"3205" "exp3" 1 123 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 443 0 0
"3205" "exp3" 1 124 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 794 0 0
"3205" "exp3" 1 125 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 516 0 0
"3205" "exp3" 1 126 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1270 31 1
"3205" "exp3" 1 127 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 621 21 1
"3205" "exp3" 1 128 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 571 0 0
"3205" "exp3" 1 129 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 489 25 1
"3205" "exp3" 1 130 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 621 0 0
"3205" "exp3" 1 131 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 622 23 1
"3205" "exp3" 1 132 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 752 29 1
"3205" "exp3" 2 1 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 776 5 1
"3205" "exp3" 2 2 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 562 0 0
"3205" "exp3" 2 3 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 553 0 0
"3205" "exp3" 2 4 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1583 0 0
"3205" "exp3" 2 5 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 663 20 1
"3205" "exp3" 2 6 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1113 22 1
"3205" "exp3" 2 7 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 662 0 0
"3205" "exp3" 2 8 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 708 0 0
"3205" "exp3" 2 9 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1024 0 0
"3205" "exp3" 2 10 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 506 0 0
"3205" "exp3" 2 11 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 542 43 1
"3205" "exp3" 2 12 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 647 18 1
"3205" "exp3" 2 13 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 772 6 1
"3205" "exp3" 2 14 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1702 0 0
"3205" "exp3" 2 15 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 756 41 1
"3205" "exp3" 2 16 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 835 36 1
"3205" "exp3" 2 17 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1524 0 0
"3205" "exp3" 2 18 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2025 43 1
"3205" "exp3" 2 19 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 2789 19 1
"3205" "exp3" 2 20 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1403 13 1
"3205" "exp3" 2 21 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1177 31 1
"3205" "exp3" 2 22 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 811 40 1
"3205" "exp3" 2 23 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 636 42 1
"3205" "exp3" 2 24 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 596 19 1
"3205" "exp3" 2 25 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 542 29 1
"3205" "exp3" 2 26 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 504 10 1
"3205" "exp3" 2 27 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 546 38 1
"3205" "exp3" 2 28 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 502 0 0
"3205" "exp3" 2 29 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 511 0 0
"3205" "exp3" 2 30 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 2963 15 1
"3205" "exp3" 2 31 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 601 29 1
"3205" "exp3" 2 32 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 836 20 1
"3205" "exp3" 2 33 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1223 33 1
"3205" "exp3" 2 34 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 622 21 1
"3205" "exp3" 2 35 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 840 0 0
"3205" "exp3" 2 36 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1265 24 1
"3205" "exp3" 2 37 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1338 25 1
"3205" "exp3" 2 38 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 689 17 1
"3205" "exp3" 2 39 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 2191 8 1
"3205" "exp3" 2 40 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 644 0 0
"3205" "exp3" 2 41 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 568 35 1
"3205" "exp3" 2 42 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1597 0 0
"3205" "exp3" 2 43 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1515 18 1
"3205" "exp3" 2 44 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 859 39 1
"3205" "exp3" 2 45 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 531 16 1
"3205" "exp3" 2 46 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2986 0 0
"3205" "exp3" 2 47 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 858 32 1
"3205" "exp3" 2 48 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 578 0 0
"3205" "exp3" 2 49 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 3805 7 1
"3205" "exp3" 2 50 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 855 23 1
"3205" "exp3" 2 51 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 678 34 1
"3205" "exp3" 2 52 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1255 19 1
"3205" "exp3" 2 53 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 648 35 1
"3205" "exp3" 2 54 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 609 21 1
"3205" "exp3" 2 55 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 618 27 1
"3205" "exp3" 2 56 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2294 17 1
"3205" "exp3" 2 57 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1184 38 1
"3205" "exp3" 2 58 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 826 0 0
"3205" "exp3" 2 59 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 848 25 1
"3205" "exp3" 2 60 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 803 31 1
"3205" "exp3" 2 61 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2623 0 0
"3205" "exp3" 2 62 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 632 24 1
"3205" "exp3" 2 63 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 2898 9 1
"3205" "exp3" 2 64 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 893 0 0
"3205" "exp3" 2 65 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 633 33 1
"3205" "exp3" 2 66 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 560 16 1
"3205" "exp3" 2 67 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 683 0 0
"3205" "exp3" 2 68 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2168 13 1
"3205" "exp3" 2 69 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 958 17 1
"3205" "exp3" 2 70 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 595 11 1
"3205" "exp3" 2 71 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 882 31 1
"3205" "exp3" 2 72 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 533 0 0
"3205" "exp3" 2 73 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1090 23 1
"3205" "exp3" 2 74 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 890 44 1
"3205" "exp3" 2 75 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 538 22 1
"3205" "exp3" 2 76 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1263 0 0
"3205" "exp3" 2 77 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 906 40 1
"3205" "exp3" 2 78 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 633 28 1
"3205" "exp3" 2 79 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 917 0 0
"3205" "exp3" 2 80 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 577 18 1
"3205" "exp3" 2 81 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1488 9 1
"3205" "exp3" 2 82 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 894 11 1
"3205" "exp3" 2 83 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 888 35 1
"3205" "exp3" 2 84 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 512 39 1
"3205" "exp3" 2 85 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1559 0 0
"3205" "exp3" 2 86 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 882 17 1
"3205" "exp3" 2 87 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 555 0 0
"3205" "exp3" 2 88 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1195 24 1
"3205" "exp3" 2 89 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 586 21 1
"3205" "exp3" 2 90 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 598 29 1
"3205" "exp3" 2 91 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 3574 0 0
"3205" "exp3" 2 92 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 534 25 1
"3205" "exp3" 2 93 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1253 18 1
"3205" "exp3" 2 94 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 663 24 1
"3205" "exp3" 2 95 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 630 12 1
"3205" "exp3" 2 96 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 937 27 1
"3205" "exp3" 2 97 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 862 26 1
"3205" "exp3" 2 98 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 987 14 1
"3205" "exp3" 2 99 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 727 0 0
"3205" "exp3" 2 100 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 643 37 1
"3205" "exp3" 2 101 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 4920 67 1
"3205" "exp3" 2 102 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1290 25 1
"3205" "exp3" 2 103 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2343 0 0
"3205" "exp3" 2 104 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1074 26 1
"3205" "exp3" 2 105 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 636 0 0
"3205" "exp3" 2 106 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 606 0 0
"3205" "exp3" 2 107 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1202 0 0
"3205" "exp3" 2 108 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 675 28 1
"3205" "exp3" 2 109 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 964 19 1
"3205" "exp3" 2 110 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 791 28 1
"3205" "exp3" 2 111 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 897 0 0
"3205" "exp3" 2 112 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1143 16 1
"3205" "exp3" 2 113 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 771 26 1
"3205" "exp3" 2 114 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 728 45 1
"3205" "exp3" 2 115 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 573 0 0
"3205" "exp3" 2 116 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 481 0 0
"3205" "exp3" 2 117 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 683 36 1
"3205" "exp3" 2 118 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 549 41 1
"3205" "exp3" 2 119 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 687 30 1
"3205" "exp3" 2 120 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2452 14 1
"3205" "exp3" 2 121 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 805 45 1
"3205" "exp3" 2 122 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 637 15 1
"3205" "exp3" 2 123 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 590 0 0
"3205" "exp3" 2 124 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1242 20 1
"3205" "exp3" 2 125 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1728 0 0
"3205" "exp3" 2 126 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 699 0 0
"3205" "exp3" 2 127 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1040 31 1
"3205" "exp3" 2 128 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 463 22 1
"3205" "exp3" 2 129 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1952 0 0
"3205" "exp3" 2 130 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 832 23 1
"3205" "exp3" 2 131 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1899 0 0
"3205" "exp3" 2 132 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1507 0 0
"3207" "exp3" 1 1 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 528 0 0
"3207" "exp3" 1 2 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 928 12 1
"3207" "exp3" 1 3 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 926 0 0
"3207" "exp3" 1 4 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 619 39 1
"3207" "exp3" 1 5 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 689 0 0
"3207" "exp3" 1 6 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1022 0 0
"3207" "exp3" 1 7 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1576 0 0
"3207" "exp3" 1 8 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1447 5 1
"3207" "exp3" 1 9 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1604 31 1
"3207" "exp3" 1 10 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1501 73 1
"3207" "exp3" 1 11 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1777 36 1
"3207" "exp3" 1 12 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1513 0 0
"3207" "exp3" 1 13 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1417 0 0
"3207" "exp3" 1 14 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1452 14 1
"3207" "exp3" 1 15 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 2989 0 0
"3207" "exp3" 1 16 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 2625 0 0
"3207" "exp3" 1 17 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1799 0 0
"3207" "exp3" 1 18 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 3465 0 0
"3207" "exp3" 1 19 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1535 49 1
"3207" "exp3" 1 20 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2109 0 0
"3207" "exp3" 1 21 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1892 0 0
"3207" "exp3" 1 22 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1739 0 0
"3207" "exp3" 1 23 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1790 0 0
"3207" "exp3" 1 24 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1945 0 0
"3207" "exp3" 1 25 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 874 0 0
"3207" "exp3" 1 26 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1746 0 0
"3207" "exp3" 1 27 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 1157 0 0
"3207" "exp3" 1 28 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 783 0 0
"3207" "exp3" 1 29 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1746 77 1
"3207" "exp3" 1 30 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 2357 0 0
"3207" "exp3" 1 31 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 807 0 0
"3207" "exp3" 1 32 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 546 0 0
"3207" "exp3" 1 33 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 488 0 0
"3207" "exp3" 1 34 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 783 0 0
"3207" "exp3" 1 35 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1495 34 1
"3207" "exp3" 1 36 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1499 38 1
"3207" "exp3" 1 37 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 2669 0 0
"3207" "exp3" 1 38 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1018 72 1
"3207" "exp3" 1 39 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1226 75 1
"3207" "exp3" 1 40 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1447 0 0
"3207" "exp3" 1 41 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 2653 0 0
"3207" "exp3" 1 42 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 755 0 0
"3207" "exp3" 1 43 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 911 0 0
"3207" "exp3" 1 44 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1716 37 1
"3207" "exp3" 1 45 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1671 0 0
"3207" "exp3" 1 46 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 2189 0 0
"3207" "exp3" 1 47 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 974 0 0
"3207" "exp3" 1 48 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2214 78 1
"3207" "exp3" 1 49 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1308 41 1
"3207" "exp3" 1 50 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1562 81 1
"3207" "exp3" 1 51 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 2175 0 0
"3207" "exp3" 1 52 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1140 0 0
"3207" "exp3" 1 53 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 744 84 1
"3207" "exp3" 1 54 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1582 0 0
"3207" "exp3" 1 55 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1905 0 0
"3207" "exp3" 1 56 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 2093 0 0
"3207" "exp3" 1 57 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 914 0 0
"3207" "exp3" 1 58 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1461 0 0
"3207" "exp3" 1 59 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 1282 3 1
"3207" "exp3" 1 60 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 2958 0 0
"3207" "exp3" 1 61 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 2742 63 1
"3207" "exp3" 1 62 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 3048 32 1
"3207" "exp3" 1 63 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 2032 19 1
"3207" "exp3" 1 64 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1300 0 0
"3207" "exp3" 1 65 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 944 0 0
"3207" "exp3" 1 66 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 2544 0 0
"3207" "exp3" 1 67 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1765 43 1
"3207" "exp3" 1 68 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 2148 0 0
"3207" "exp3" 1 69 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 2175 0 0
"3207" "exp3" 1 70 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1889 0 0
"3207" "exp3" 1 71 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 2546 0 0
"3207" "exp3" 1 72 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 3087 78 1
"3207" "exp3" 1 73 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 2396 0 0
"3207" "exp3" 1 74 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 2339 0 0
"3207" "exp3" 1 75 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 2013 0 0
"3207" "exp3" 1 76 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 1362 72 1
"3207" "exp3" 1 77 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1992 86 1
"3207" "exp3" 1 78 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1233 0 0
"3207" "exp3" 1 79 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 818 44 1
"3207" "exp3" 1 80 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1919 0 0
"3207" "exp3" 1 81 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 3173 0 0
"3207" "exp3" 1 82 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1246 0 0
"3207" "exp3" 1 83 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 1002 0 0
"3207" "exp3" 1 84 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 780 0 0
"3207" "exp3" 1 85 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 749 70 1
"3207" "exp3" 1 86 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1486 0 0
"3207" "exp3" 1 87 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 535 76 1
"3207" "exp3" 1 88 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1406 42 1
"3207" "exp3" 1 89 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 3754 52 1
"3207" "exp3" 1 90 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 2169 0 0
"3207" "exp3" 1 91 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 2791 21 1
"3207" "exp3" 1 92 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 2450 0 0
"3207" "exp3" 1 93 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1100 0 0
"3207" "exp3" 1 94 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 2211 0 0
"3207" "exp3" 1 95 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2639 44 1
"3207" "exp3" 1 96 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1741 0 0
"3207" "exp3" 1 97 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 5903 0 0
"3207" "exp3" 1 98 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 3496 35 1
"3207" "exp3" 1 99 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 2766 0 0
"3207" "exp3" 1 100 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 1518 0 0
"3207" "exp3" 1 101 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1036 0 0
"3207" "exp3" 1 102 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 489 0 0
"3207" "exp3" 1 103 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 603 0 0
"3207" "exp3" 1 104 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 675 0 0
"3207" "exp3" 1 105 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 690 0 0
"3207" "exp3" 1 106 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 854 0 0
"3207" "exp3" 1 107 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1628 0 0
"3207" "exp3" 1 108 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 823 0 0
"3207" "exp3" 1 109 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 1483 0 0
"3207" "exp3" 1 110 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1198 0 0
"3207" "exp3" 1 111 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 527 0 0
"3207" "exp3" 1 112 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1258 0 0
"3207" "exp3" 1 113 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 435 0 0
"3207" "exp3" 1 114 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 487 0 0
"3207" "exp3" 1 115 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1603 45 1
"3207" "exp3" 1 116 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1565 0 0
"3207" "exp3" 1 117 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 602 0 0
"3207" "exp3" 1 118 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 550 0 0
"3207" "exp3" 1 119 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 674 0 0
"3207" "exp3" 1 120 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1178 0 0
"3207" "exp3" 1 121 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 524 0 0
"3207" "exp3" 1 122 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 485 65 1
"3207" "exp3" 1 123 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 508 0 0
"3207" "exp3" 1 124 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 5307 41 1
"3207" "exp3" 1 125 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 982 71 1
"3207" "exp3" 1 126 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2166 40 1
"3207" "exp3" 1 127 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1267 91 1
"3207" "exp3" 1 128 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 4802 0 0
"3207" "exp3" 1 129 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 2315 0 0
"3207" "exp3" 1 130 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 728 0 0
"3207" "exp3" 1 131 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 536 81 1
"3207" "exp3" 1 132 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 807 0 0
"3207" "exp3" 2 1 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 975 94 1
"3207" "exp3" 2 2 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 1157 0 0
"3207" "exp3" 2 3 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1602 0 0
"3207" "exp3" 2 4 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1031 77 1
"3207" "exp3" 2 5 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 680 0 0
"3207" "exp3" 2 6 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 584 93 1
"3207" "exp3" 2 7 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 569 0 0
"3207" "exp3" 2 8 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1425 43 1
"3207" "exp3" 2 9 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2445 44 1
"3207" "exp3" 2 10 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1260 45 1
"3207" "exp3" 2 11 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 3149 36 1
"3207" "exp3" 2 12 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 925 0 0
"3207" "exp3" 2 13 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 810 0 0
"3207" "exp3" 2 14 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1392 38 1
"3207" "exp3" 2 15 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1019 37 1
"3207" "exp3" 2 16 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 2353 30 1
"3207" "exp3" 2 17 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1118 92 1
"3207" "exp3" 2 18 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1771 40 1
"3207" "exp3" 2 19 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1623 0 0
"3207" "exp3" 2 20 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 873 0 0
"3207" "exp3" 2 21 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 559 0 0
"3207" "exp3" 2 22 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 493 0 0
"3207" "exp3" 2 23 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1790 47 1
"3207" "exp3" 2 24 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1387 0 0
"3207" "exp3" 2 25 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1170 62 1
"3207" "exp3" 2 26 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 805 0 0
"3207" "exp3" 2 27 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 771 82 1
"3207" "exp3" 2 28 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1292 0 0
"3207" "exp3" 2 29 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1495 0 0
"3207" "exp3" 2 30 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 631 0 0
"3207" "exp3" 2 31 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 874 0 0
"3207" "exp3" 2 32 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 575 0 0
"3207" "exp3" 2 33 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1661 0 0
"3207" "exp3" 2 34 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 533 0 0
"3207" "exp3" 2 35 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 636 0 0
"3207" "exp3" 2 36 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 830 0 0
"3207" "exp3" 2 37 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 620 0 0
"3207" "exp3" 2 38 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1389 72 1
"3207" "exp3" 2 39 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 796 0 0
"3207" "exp3" 2 40 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 828 0 0
"3207" "exp3" 2 41 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 2030 67 1
"3207" "exp3" 2 42 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 674 68 1
"3207" "exp3" 2 43 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1147 0 0
"3207" "exp3" 2 44 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 2522 67 1
"3207" "exp3" 2 45 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 553 0 0
"3207" "exp3" 2 46 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 469 0 0
"3207" "exp3" 2 47 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 526 0 0
"3207" "exp3" 2 48 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 551 0 0
"3207" "exp3" 2 49 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 809 73 1
"3207" "exp3" 2 50 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 551 0 0
"3207" "exp3" 2 51 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 960 0 0
"3207" "exp3" 2 52 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1162 0 0
"3207" "exp3" 2 53 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 595 0 0
"3207" "exp3" 2 54 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1400 0 0
"3207" "exp3" 2 55 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1017 0 0
"3207" "exp3" 2 56 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 841 0 0
"3207" "exp3" 2 57 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1466 43 1
"3207" "exp3" 2 58 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1180 88 1
"3207" "exp3" 2 59 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 785 0 0
"3207" "exp3" 2 60 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 446 0 0
"3207" "exp3" 2 61 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 562 0 0
"3207" "exp3" 2 62 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1375 0 0
"3207" "exp3" 2 63 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 618 0 0
"3207" "exp3" 2 64 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 495 0 0
"3207" "exp3" 2 65 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1684 0 0
"3207" "exp3" 2 66 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 955 0 0
"3207" "exp3" 2 67 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 1073 0 0
"3207" "exp3" 2 68 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1147 0 0
"3207" "exp3" 2 69 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 546 71 1
"3207" "exp3" 2 70 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 457 0 0
"3207" "exp3" 2 71 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 568 0 0
"3207" "exp3" 2 72 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 482 0 0
"3207" "exp3" 2 73 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1353 0 0
"3207" "exp3" 2 74 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 969 0 0
"3207" "exp3" 2 75 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 529 0 0
"3207" "exp3" 2 76 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1815 42 1
"3207" "exp3" 2 77 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1525 0 0
"3207" "exp3" 2 78 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 677 0 0
"3207" "exp3" 2 79 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 884 0 0
"3207" "exp3" 2 80 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 670 0 0
"3207" "exp3" 2 81 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1388 44 1
"3207" "exp3" 2 82 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 807 69 1
"3207" "exp3" 2 83 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 838 0 0
"3207" "exp3" 2 84 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 996 0 0
"3207" "exp3" 2 85 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 803 0 0
"3207" "exp3" 2 86 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 486 0 0
"3207" "exp3" 2 87 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 579 0 0
"3207" "exp3" 2 88 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 516 69 1
"3207" "exp3" 2 89 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 624 0 0
"3207" "exp3" 2 90 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 575 0 0
"3207" "exp3" 2 91 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 478 0 0
"3207" "exp3" 2 92 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 436 0 0
"3207" "exp3" 2 93 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 721 0 0
"3207" "exp3" 2 94 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 471 0 0
"3207" "exp3" 2 95 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 492 0 0
"3207" "exp3" 2 96 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 467 0 0
"3207" "exp3" 2 97 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 483 0 0
"3207" "exp3" 2 98 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 533 0 0
"3207" "exp3" 2 99 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1243 41 1
"3207" "exp3" 2 100 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1016 45 1
"3207" "exp3" 2 101 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 2201 0 0
"3207" "exp3" 2 102 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1159 0 0
"3207" "exp3" 2 103 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1320 0 0
"3207" "exp3" 2 104 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1653 0 0
"3207" "exp3" 2 105 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 716 0 0
"3207" "exp3" 2 106 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 464 0 0
"3207" "exp3" 2 107 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 897 72 1
"3207" "exp3" 2 108 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 846 65 1
"3207" "exp3" 2 109 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 896 0 0
"3207" "exp3" 2 110 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 632 0 0
"3207" "exp3" 2 111 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 587 0 0
"3207" "exp3" 2 112 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 683 0 0
"3207" "exp3" 2 113 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 847 0 0
"3207" "exp3" 2 114 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 529 0 0
"3207" "exp3" 2 115 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 649 0 0
"3207" "exp3" 2 116 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 672 85 1
"3207" "exp3" 2 117 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 699 0 0
"3207" "exp3" 2 118 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 1166 0 0
"3207" "exp3" 2 119 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 810 0 0
"3207" "exp3" 2 120 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 656 0 0
"3207" "exp3" 2 121 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1679 64 1
"3207" "exp3" 2 122 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 651 0 0
"3207" "exp3" 2 123 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1298 0 0
"3207" "exp3" 2 124 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 752 75 1
"3207" "exp3" 2 125 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1070 0 0
"3207" "exp3" 2 126 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 592 0 0
"3207" "exp3" 2 127 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 637 81 1
"3207" "exp3" 2 128 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 939 0 0
"3207" "exp3" 2 129 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 603 0 0
"3207" "exp3" 2 130 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 506 0 0
"3207" "exp3" 2 131 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 676 0 0
"3207" "exp3" 2 132 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 565 0 0
"3207" "exp3" 1 1 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 2760 0 0
"3207" "exp3" 1 2 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1736 33 1
"3207" "exp3" 1 3 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 3151 13 1
"3207" "exp3" 1 4 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1744 37 1
"3207" "exp3" 1 5 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 910 0 0
"3207" "exp3" 1 6 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1483 12 1
"3207" "exp3" 1 7 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1472 0 0
"3207" "exp3" 1 8 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1195 0 0
"3207" "exp3" 1 9 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 3541 31 1
"3207" "exp3" 1 10 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1945 28 1
"3207" "exp3" 1 11 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 962 30 1
"3207" "exp3" 1 12 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 3774 68 1
"3207" "exp3" 1 13 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 5168 49 1
"3207" "exp3" 1 14 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 3172 0 0
"3207" "exp3" 1 15 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 4190 31 1
"3207" "exp3" 1 16 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1362 0 0
"3207" "exp3" 1 17 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2562 0 0
"3207" "exp3" 1 18 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 3673 0 0
"3207" "exp3" 1 19 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 5200 33 1
"3207" "exp3" 1 20 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 5039 35 1
"3207" "exp3" 1 21 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2068 39 1
"3207" "exp3" 1 22 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1856 27 1
"3207" "exp3" 1 23 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 2903 0 0
"3207" "exp3" 1 24 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1697 0 0
"3207" "exp3" 1 25 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1961 0 0
"3207" "exp3" 1 26 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 10354 0 0
"3207" "exp3" 1 27 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 4110 0 0
"3207" "exp3" 1 28 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1814 0 0
"3207" "exp3" 1 29 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2177 40 1
"3207" "exp3" 1 30 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 6025 0 0
"3207" "exp3" 1 31 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 855 0 0
"3207" "exp3" 1 32 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 868 0 0
"3207" "exp3" 1 33 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1115 0 0
"3207" "exp3" 1 34 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 661 0 0
"3207" "exp3" 1 35 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1017 0 0
"3207" "exp3" 1 36 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 1546 0 0
"3207" "exp3" 1 37 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 940 0 0
"3207" "exp3" 1 38 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1622 0 0
"3207" "exp3" 1 39 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 848 0 0
"3207" "exp3" 1 40 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 1858 0 0
"3207" "exp3" 1 41 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1948 0 0
"3207" "exp3" 1 42 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1910 0 0
"3207" "exp3" 1 43 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 2287 0 0
"3207" "exp3" 1 44 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1293 0 0
"3207" "exp3" 1 45 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1597 0 0
"3207" "exp3" 1 46 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 3211 76 1
"3207" "exp3" 1 47 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 875 64 1
"3207" "exp3" 1 48 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1787 0 0
"3207" "exp3" 1 49 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 2468 71 1
"3207" "exp3" 1 50 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1139 71 1
"3207" "exp3" 1 51 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1423 83 1
"3207" "exp3" 1 52 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1552 0 0
"3207" "exp3" 1 53 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 3881 18 1
"3207" "exp3" 1 54 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1165 36 1
"3207" "exp3" 1 55 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 998 0 0
"3207" "exp3" 1 56 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1601 0 0
"3207" "exp3" 1 57 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 3003 0 0
"3207" "exp3" 1 58 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 1092 0 0
"3207" "exp3" 1 59 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2923 0 0
"3207" "exp3" 1 60 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1356 0 0
"3207" "exp3" 1 61 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 3834 42 1
"3207" "exp3" 1 62 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1325 0 0
"3207" "exp3" 1 63 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 3619 0 0
"3207" "exp3" 1 64 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 4610 0 0
"3207" "exp3" 1 65 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1266 26 1
"3207" "exp3" 1 66 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2492 23 1
"3207" "exp3" 1 67 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 5479 0 0
"3207" "exp3" 1 68 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1402 0 0
"3207" "exp3" 1 69 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1088 0 0
"3207" "exp3" 1 70 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 3578 0 0
"3207" "exp3" 1 71 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1354 0 0
"3207" "exp3" 1 72 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1230 85 1
"3207" "exp3" 1 73 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 978 0 0
"3207" "exp3" 1 74 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1899 48 1
"3207" "exp3" 1 75 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 3106 0 0
"3207" "exp3" 1 76 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1229 0 0
"3207" "exp3" 1 77 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 2548 0 0
"3207" "exp3" 1 78 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1953 81 1
"3207" "exp3" 1 79 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 5308 0 0
"3207" "exp3" 1 80 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 1670 78 1
"3207" "exp3" 1 81 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 1687 81 1
"3207" "exp3" 1 82 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 3632 23 1
"3207" "exp3" 1 83 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 2107 0 0
"3207" "exp3" 1 84 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1502 0 0
"3207" "exp3" 1 85 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 7813 0 0
"3207" "exp3" 1 86 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 3380 0 0
"3207" "exp3" 1 87 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 2304 0 0
"3207" "exp3" 1 88 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 3415 0 0
"3207" "exp3" 1 89 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 3757 0 0
"3207" "exp3" 1 90 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1510 92 1
"3207" "exp3" 1 91 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2868 0 0
"3207" "exp3" 1 92 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1472 0 0
"3207" "exp3" 1 93 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 787 0 0
"3207" "exp3" 1 94 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 3985 0 0
"3207" "exp3" 1 95 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1778 0 0
"3207" "exp3" 1 96 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 3190 33 1
"3207" "exp3" 1 97 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 1883 0 0
"3207" "exp3" 1 98 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1959 28 1
"3207" "exp3" 1 99 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1338 26 1
"3207" "exp3" 1 100 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1382 31 1
"3207" "exp3" 1 101 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1722 28 1
"3207" "exp3" 1 102 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1125 30 1
"3207" "exp3" 1 103 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 2997 0 0
"3207" "exp3" 1 104 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 1670 0 0
"3207" "exp3" 1 105 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1527 0 0
"3207" "exp3" 1 106 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 5457 25 1
"3207" "exp3" 1 107 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2912 46 1
"3207" "exp3" 1 108 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1497 24 1
"3207" "exp3" 1 109 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1367 37 1
"3207" "exp3" 1 110 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 2552 32 1
"3207" "exp3" 1 111 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 3376 40 1
"3207" "exp3" 1 112 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 963 93 1
"3207" "exp3" 1 113 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2385 44 1
"3207" "exp3" 1 114 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1771 0 0
"3207" "exp3" 1 115 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 1221 0 0
"3207" "exp3" 1 116 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1619 34 1
"3207" "exp3" 1 117 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1968 0 0
"3207" "exp3" 1 118 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 1031 0 0
"3207" "exp3" 1 119 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 1178 0 0
"3207" "exp3" 1 120 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 1009 0 0
"3207" "exp3" 1 121 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 3140 0 0
"3207" "exp3" 1 122 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 1878 0 0
"3207" "exp3" 1 123 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1072 0 0
"3207" "exp3" 1 124 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 4446 43 1
"3207" "exp3" 1 125 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 3472 30 1
"3207" "exp3" 1 126 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 152 45 1
"3207" "exp3" 1 127 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2663 0 0
"3207" "exp3" 1 128 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1296 30 1
"3207" "exp3" 1 129 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1848 0 0
"3207" "exp3" 1 130 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1065 31 1
"3207" "exp3" 1 131 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1381 35 1
"3207" "exp3" 1 132 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 1917 0 0
"3207" "exp3" 2 1 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 1576 66 1
"3207" "exp3" 2 2 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2623 0 0
"3207" "exp3" 2 3 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 896 47 1
"3207" "exp3" 2 4 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1022 0 0
"3207" "exp3" 2 5 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1299 0 0
"3207" "exp3" 2 6 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 900 0 0
"3207" "exp3" 2 7 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 2749 0 0
"3207" "exp3" 2 8 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1786 0 0
"3207" "exp3" 2 9 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 781 0 0
"3207" "exp3" 2 10 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1808 0 0
"3207" "exp3" 2 11 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1303 26 1
"3207" "exp3" 2 12 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1512 21 1
"3207" "exp3" 2 13 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1310 0 0
"3207" "exp3" 2 14 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1032 28 1
"3207" "exp3" 2 15 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1641 35 1
"3207" "exp3" 2 16 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 2542 86 1
"3207" "exp3" 2 17 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1632 0 0
"3207" "exp3" 2 18 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1869 0 0
"3207" "exp3" 2 19 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 1861 0 0
"3207" "exp3" 2 20 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1454 0 0
"3207" "exp3" 2 21 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 5020 0 0
"3207" "exp3" 2 22 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 1837 0 0
"3207" "exp3" 2 23 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1612 0 0
"3207" "exp3" 2 24 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 4164 65 1
"3207" "exp3" 2 25 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 848 0 0
"3207" "exp3" 2 26 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 922 0 0
"3207" "exp3" 2 27 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 854 0 0
"3207" "exp3" 2 28 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1468 0 0
"3207" "exp3" 2 29 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 1711 62 1
"3207" "exp3" 2 30 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 951 0 0
"3207" "exp3" 2 31 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 775 0 0
"3207" "exp3" 2 32 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 936 0 0
"3207" "exp3" 2 33 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 939 71 1
"3207" "exp3" 2 34 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1572 0 0
"3207" "exp3" 2 35 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1633 0 0
"3207" "exp3" 2 36 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 789 35 1
"3207" "exp3" 2 37 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1275 0 0
"3207" "exp3" 2 38 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 901 0 0
"3207" "exp3" 2 39 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 999 0 0
"3207" "exp3" 2 40 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1649 0 0
"3207" "exp3" 2 41 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 684 0 0
"3207" "exp3" 2 42 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1303 0 0
"3207" "exp3" 2 43 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1065 69 1
"3207" "exp3" 2 44 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 895 0 0
"3207" "exp3" 2 45 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1991 68 1
"3207" "exp3" 2 46 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1121 0 0
"3207" "exp3" 2 47 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1291 41 1
"3207" "exp3" 2 48 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1252 32 1
"3207" "exp3" 2 49 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 902 1 1
"3207" "exp3" 2 50 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 1713 81 1
"3207" "exp3" 2 51 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 1896 0 0
"3207" "exp3" 2 52 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 822 0 0
"3207" "exp3" 2 53 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 473 0 0
"3207" "exp3" 2 54 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1281 0 0
"3207" "exp3" 2 55 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1298 0 0
"3207" "exp3" 2 56 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 534 0 0
"3207" "exp3" 2 57 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 989 0 0
"3207" "exp3" 2 58 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1147 0 0
"3207" "exp3" 2 59 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 709 0 0
"3207" "exp3" 2 60 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 1065 0 0
"3207" "exp3" 2 61 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 531 0 0
"3207" "exp3" 2 62 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1401 0 0
"3207" "exp3" 2 63 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1853 43 1
"3207" "exp3" 2 64 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 3321 0 0
"3207" "exp3" 2 65 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1802 0 0
"3207" "exp3" 2 66 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1121 0 0
"3207" "exp3" 2 67 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 3198 0 0
"3207" "exp3" 2 68 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 1361 0 0
"3207" "exp3" 2 69 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 1925 0 0
"3207" "exp3" 2 70 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2129 45 1
"3207" "exp3" 2 71 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 1275 78 1
"3207" "exp3" 2 72 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 2567 0 0
"3207" "exp3" 2 73 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 2262 0 0
"3207" "exp3" 2 74 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1979 29 1
"3207" "exp3" 2 75 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1068 0 0
"3207" "exp3" 2 76 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1232 0 0
"3207" "exp3" 2 77 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1433 0 0
"3207" "exp3" 2 78 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1556 0 0
"3207" "exp3" 2 79 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1413 0 0
"3207" "exp3" 2 80 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2181 79 1
"3207" "exp3" 2 81 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 648 0 0
"3207" "exp3" 2 82 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 541 81 1
"3207" "exp3" 2 83 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 941 42 1
"3207" "exp3" 2 84 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1623 0 0
"3207" "exp3" 2 85 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1017 0 0
"3207" "exp3" 2 86 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 780 0 0
"3207" "exp3" 2 87 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 1205 0 0
"3207" "exp3" 2 88 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 927 0 0
"3207" "exp3" 2 89 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 1125 0 0
"3207" "exp3" 2 90 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 500 0 0
"3207" "exp3" 2 91 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 556 0 0
"3207" "exp3" 2 92 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1519 41 1
"3207" "exp3" 2 93 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1192 33 1
"3207" "exp3" 2 94 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 2388 0 0
"3207" "exp3" 2 95 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 2577 0 0
"3207" "exp3" 2 96 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 4728 0 0
"3207" "exp3" 2 97 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1450 0 0
"3207" "exp3" 2 98 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 1333 0 0
"3207" "exp3" 2 99 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 644 0 0
"3207" "exp3" 2 100 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1082 49 1
"3207" "exp3" 2 101 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 924 45 1
"3207" "exp3" 2 102 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1037 0 0
"3207" "exp3" 2 103 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 550 0 0
"3207" "exp3" 2 104 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 594 95 1
"3207" "exp3" 2 105 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 689 0 0
"3207" "exp3" 2 106 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 535 0 0
"3207" "exp3" 2 107 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1221 36 1
"3207" "exp3" 2 108 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 972 0 0
"3207" "exp3" 2 109 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 995 0 0
"3207" "exp3" 2 110 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 571 74 1
"3207" "exp3" 2 111 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 515 0 0
"3207" "exp3" 2 112 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 695 0 0
"3207" "exp3" 2 113 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 579 0 0
"3207" "exp3" 2 114 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 762 0 0
"3207" "exp3" 2 115 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1364 0 0
"3207" "exp3" 2 116 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1919 0 0
"3207" "exp3" 2 117 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 828 0 0
"3207" "exp3" 2 118 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 539 0 0
"3207" "exp3" 2 119 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 484 0 0
"3207" "exp3" 2 120 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1191 34 1
"3207" "exp3" 2 121 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 777 0 0
"3207" "exp3" 2 122 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1109 0 0
"3207" "exp3" 2 123 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 653 62 1
"3207" "exp3" 2 124 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 716 0 0
"3207" "exp3" 2 125 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 752 0 0
"3207" "exp3" 2 126 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1552 0 0
"3207" "exp3" 2 127 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 750 0 0
"3207" "exp3" 2 128 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 2816 0 0
"3207" "exp3" 2 129 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 848 4 1
"3207" "exp3" 2 130 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 656 0 0
"3207" "exp3" 2 131 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1516 0 0
"3207" "exp3" 2 132 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 1330 0 0
"3207" "exp3" 1 1 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 693 0 0
"3207" "exp3" 1 2 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 512 29 1
"3207" "exp3" 1 3 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 402 0 0
"3207" "exp3" 1 4 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 636 78 1
"3207" "exp3" 1 5 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 360 22 1
"3207" "exp3" 1 6 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 830 19 1
"3207" "exp3" 1 7 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 915 8 1
"3207" "exp3" 1 8 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 270 0 0
"3207" "exp3" 1 9 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 309 0 0
"3207" "exp3" 1 10 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 806 77 1
"3207" "exp3" 1 11 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 470 81 1
"3207" "exp3" 1 12 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 544 75 1
"3207" "exp3" 1 13 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 696 88 1
"3207" "exp3" 1 14 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 446 0 0
"3207" "exp3" 1 15 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1412 26 1
"3207" "exp3" 1 16 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1946 18 1
"3207" "exp3" 1 17 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 638 0 0
"3207" "exp3" 1 18 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 1244 9 1
"3207" "exp3" 1 19 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 1260 0 0
"3207" "exp3" 1 20 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 868 0 0
"3207" "exp3" 1 21 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2141 0 0
"3207" "exp3" 1 22 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 2903 0 0
"3207" "exp3" 1 23 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 1016 0 0
"3207" "exp3" 1 24 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 865 0 0
"3207" "exp3" 1 25 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1375 0 0
"3207" "exp3" 1 26 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 843 0 0
"3207" "exp3" 1 27 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 1352 0 0
"3207" "exp3" 1 28 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1827 0 0
"3207" "exp3" 1 29 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 1045 71 1
"3207" "exp3" 1 30 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 2162 26 1
"3207" "exp3" 1 31 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 1344 0 0
"3207" "exp3" 1 32 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1396 0 0
"3207" "exp3" 1 33 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1928 0 0
"3207" "exp3" 1 34 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 678 0 0
"3207" "exp3" 1 35 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 863 67 1
"3207" "exp3" 1 36 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1221 15 1
"3207" "exp3" 1 37 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 753 0 0
"3207" "exp3" 1 38 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 732 0 0
"3207" "exp3" 1 39 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 486 0 0
"3207" "exp3" 1 40 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 877 0 0
"3207" "exp3" 1 41 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 732 0 0
"3207" "exp3" 1 42 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 817 36 1
"3207" "exp3" 1 43 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1004 10 1
"3207" "exp3" 1 44 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 464 0 0
"3207" "exp3" 1 45 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 824 26 1
"3207" "exp3" 1 46 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 640 19 1
"3207" "exp3" 1 47 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 500 6 1
"3207" "exp3" 1 48 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 453 0 0
"3207" "exp3" 1 49 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 465 0 0
"3207" "exp3" 1 50 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 498 0 0
"3207" "exp3" 1 51 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 320 0 0
"3207" "exp3" 1 52 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1008 34 1
"3207" "exp3" 1 53 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1363 34 1
"3207" "exp3" 1 54 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 801 33 1
"3207" "exp3" 1 55 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 658 18 1
"3207" "exp3" 1 56 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1081 21 1
"3207" "exp3" 1 57 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 706 0 0
"3207" "exp3" 1 58 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1467 27 1
"3207" "exp3" 1 59 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 796 14 1
"3207" "exp3" 1 60 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 744 7 1
"3207" "exp3" 1 61 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1476 0 0
"3207" "exp3" 1 62 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 938 41 1
"3207" "exp3" 1 63 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 733 29 1
"3207" "exp3" 1 64 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 981 27 1
"3207" "exp3" 1 65 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 863 17 1
"3207" "exp3" 1 66 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1069 21 1
"3207" "exp3" 1 67 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 700 13 1
"3207" "exp3" 1 68 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 2116 0 0
"3207" "exp3" 1 69 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1117 0 0
"3207" "exp3" 1 70 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 806 0 0
"3207" "exp3" 1 71 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1070 0 0
"3207" "exp3" 1 72 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1239 0 0
"3207" "exp3" 1 73 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 643 0 0
"3207" "exp3" 1 74 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 832 30 1
"3207" "exp3" 1 75 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 710 30 1
"3207" "exp3" 1 76 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 712 0 0
"3207" "exp3" 1 77 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 1320 0 0
"3207" "exp3" 1 78 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 840 42 1
"3207" "exp3" 1 79 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 947 0 0
"3207" "exp3" 1 80 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 852 0 0
"3207" "exp3" 1 81 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 858 6 1
"3207" "exp3" 1 82 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1301 43 1
"3207" "exp3" 1 83 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1513 0 0
"3207" "exp3" 1 84 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 582 30 1
"3207" "exp3" 1 85 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 551 17 1
"3207" "exp3" 1 86 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 592 2 1
"3207" "exp3" 1 87 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1001 0 0
"3207" "exp3" 1 88 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 1636 0 0
"3207" "exp3" 1 89 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1185 20 1
"3207" "exp3" 1 90 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1541 0 0
"3207" "exp3" 1 91 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 2163 18 1
"3207" "exp3" 1 92 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 702 22 1
"3207" "exp3" 1 93 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1229 28 1
"3207" "exp3" 1 94 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1542 0 0
"3207" "exp3" 1 95 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 3005 0 0
"3207" "exp3" 1 96 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 3808 0 0
"3207" "exp3" 1 97 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1655 24 1
"3207" "exp3" 1 98 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 961 4 1
"3207" "exp3" 1 99 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1080 39 1
"3207" "exp3" 1 100 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1254 0 0
"3207" "exp3" 1 101 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1313 0 0
"3207" "exp3" 1 102 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 963 17 1
"3207" "exp3" 1 103 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1082 35 1
"3207" "exp3" 1 104 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 400 39 1
"3207" "exp3" 1 105 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 882 34 1
"3207" "exp3" 1 106 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 632 14 1
"3207" "exp3" 1 107 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 956 0 0
"3207" "exp3" 1 108 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 510 1 1
"3207" "exp3" 1 109 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 779 0 0
"3207" "exp3" 1 110 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 876 0 0
"3207" "exp3" 1 111 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 977 0 0
"3207" "exp3" 1 112 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 932 0 0
"3207" "exp3" 1 113 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 2117 65 1
"3207" "exp3" 1 114 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1189 0 0
"3207" "exp3" 1 115 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 587 16 1
"3207" "exp3" 1 116 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2148 0 0
"3207" "exp3" 1 117 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 580 38 1
"3207" "exp3" 1 118 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 844 25 1
"3207" "exp3" 1 119 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 2794 0 0
"3207" "exp3" 1 120 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1133 20 1
"3207" "exp3" 1 121 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 1876 0 0
"3207" "exp3" 1 122 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 894 13 1
"3207" "exp3" 1 123 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1019 45 1
"3207" "exp3" 1 124 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 805 21 1
"3207" "exp3" 1 125 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 1898 0 0
"3207" "exp3" 1 126 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 782 17 1
"3207" "exp3" 1 127 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 912 13 1
"3207" "exp3" 1 128 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1107 24 1
"3207" "exp3" 1 129 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 893 28 1
"3207" "exp3" 1 130 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1470 0 0
"3207" "exp3" 1 131 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 795 9 1
"3207" "exp3" 1 132 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 975 20 1
"3207" "exp3" 2 1 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 955 8 1
"3207" "exp3" 2 2 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 788 65 1
"3207" "exp3" 2 3 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 608 21 1
"3207" "exp3" 2 4 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1241 0 0
"3207" "exp3" 2 5 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1199 0 0
"3207" "exp3" 2 6 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1156 0 0
"3207" "exp3" 2 7 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 1192 60 1
"3207" "exp3" 2 8 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2116 0 0
"3207" "exp3" 2 9 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1670 0 0
"3207" "exp3" 2 10 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1763 29 1
"3207" "exp3" 2 11 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 588 10 1
"3207" "exp3" 2 12 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2198 38 1
"3207" "exp3" 2 13 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 3322 0 0
"3207" "exp3" 2 14 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 5568 0 0
"3207" "exp3" 2 15 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 624 0 0
"3207" "exp3" 2 16 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 438 2 1
"3207" "exp3" 2 17 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 664 3 1
"3207" "exp3" 2 18 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 747 19 1
"3207" "exp3" 2 19 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 894 17 1
"3207" "exp3" 2 20 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 614 0 0
"3207" "exp3" 2 21 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 921 0 0
"3207" "exp3" 2 22 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 627 16 1
"3207" "exp3" 2 23 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 361 27 1
"3207" "exp3" 2 24 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 888 0 0
"3207" "exp3" 2 25 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 867 0 0
"3207" "exp3" 2 26 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 6249 28 1
"3207" "exp3" 2 27 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 3281 15 1
"3207" "exp3" 2 28 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 4327 34 1
"3207" "exp3" 2 29 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 657 0 0
"3207" "exp3" 2 30 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 922 33 1
"3207" "exp3" 2 31 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 952 0 0
"3207" "exp3" 2 32 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 652 30 1
"3207" "exp3" 2 33 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 746 13 1
"3207" "exp3" 2 34 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 888 30 1
"3207" "exp3" 2 35 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 1019 0 0
"3207" "exp3" 2 36 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1056 0 0
"3207" "exp3" 2 37 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1160 23 1
"3207" "exp3" 2 38 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 703 31 1
"3207" "exp3" 2 39 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 1766 70 1
"3207" "exp3" 2 40 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1518 70 1
"3207" "exp3" 2 41 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2257 17 1
"3207" "exp3" 2 42 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 3364 14 1
"3207" "exp3" 2 43 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 730 12 1
"3207" "exp3" 2 44 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1254 42 1
"3207" "exp3" 2 45 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 2285 18 1
"3207" "exp3" 2 46 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2762 34 1
"3207" "exp3" 2 47 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 4149 0 0
"3207" "exp3" 2 48 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1506 85 1
"3207" "exp3" 2 49 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 330 39 1
"3207" "exp3" 2 50 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 304 0 0
"3207" "exp3" 2 51 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 368 21 1
"3207" "exp3" 2 52 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 474 0 0
"3207" "exp3" 2 53 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 697 0 0
"3207" "exp3" 2 54 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 708 0 0
"3207" "exp3" 2 55 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 828 18 1
"3207" "exp3" 2 56 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 672 28 1
"3207" "exp3" 2 57 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 256 0 0
"3207" "exp3" 2 58 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 226 0 0
"3207" "exp3" 2 59 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 223 35 1
"3207" "exp3" 2 60 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 243 45 1
"3207" "exp3" 2 61 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 353 0 0
"3207" "exp3" 2 62 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 507 0 0
"3207" "exp3" 2 63 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 921 49 1
"3207" "exp3" 2 64 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 689 68 1
"3207" "exp3" 2 65 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 556 7 1
"3207" "exp3" 2 66 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1056 0 0
"3207" "exp3" 2 67 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 1380 0 0
"3207" "exp3" 2 68 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 887 0 0
"3207" "exp3" 2 69 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 589 0 0
"3207" "exp3" 2 70 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 185 0 0
"3207" "exp3" 2 71 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 172 7 1
"3207" "exp3" 2 72 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 335 45 1
"3207" "exp3" 2 73 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 417 0 0
"3207" "exp3" 2 74 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 713 0 0
"3207" "exp3" 2 75 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 560 24 1
"3207" "exp3" 2 76 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1280 0 0
"3207" "exp3" 2 77 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 694 0 0
"3207" "exp3" 2 78 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1924 21 1
"3207" "exp3" 2 79 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1147 18 1
"3207" "exp3" 2 80 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1020 0 0
"3207" "exp3" 2 81 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 27 44 1
"3207" "exp3" 2 82 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 256 41 1
"3207" "exp3" 2 83 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 225 25 1
"3207" "exp3" 2 84 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 225 0 0
"3207" "exp3" 2 85 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 179 31 1
"3207" "exp3" 2 86 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1611 48 1
"3207" "exp3" 2 87 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 89 0 0
"3207" "exp3" 2 88 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 308 14 1
"3207" "exp3" 2 89 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 82 0 0
"3207" "exp3" 2 90 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 515 56 1
"3207" "exp3" 2 91 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 225 0 0
"3207" "exp3" 2 92 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 191 94 1
"3207" "exp3" 2 93 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 42 0 0
"3207" "exp3" 2 94 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 166 0 0
"3207" "exp3" 2 95 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 81 59 1
"3207" "exp3" 2 96 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 374 0 0
"3207" "exp3" 2 97 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 265 1 1
"3207" "exp3" 2 98 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 630 27 1
"3207" "exp3" 2 99 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 351 20 1
"3207" "exp3" 2 100 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 879 0 0
"3207" "exp3" 2 101 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 602 8 1
"3207" "exp3" 2 102 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 597 0 0
"3207" "exp3" 2 103 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 712 0 0
"3207" "exp3" 2 104 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 484 13 1
"3207" "exp3" 2 105 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 695 0 0
"3207" "exp3" 2 106 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 590 0 0
"3207" "exp3" 2 107 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 767 0 0
"3207" "exp3" 2 108 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 497 73 1
"3207" "exp3" 2 109 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 407 22 1
"3207" "exp3" 2 110 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 359 0 0
"3207" "exp3" 2 111 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 438 0 0
"3207" "exp3" 2 112 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 678 18 1
"3207" "exp3" 2 113 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 345 29 1
"3207" "exp3" 2 114 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 578 25 1
"3207" "exp3" 2 115 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 434 0 0
"3207" "exp3" 2 116 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 217 32 1
"3207" "exp3" 2 117 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 514 20 1
"3207" "exp3" 2 118 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 516 0 0
"3207" "exp3" 2 119 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 210 0 0
"3207" "exp3" 2 120 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 552 16 1
"3207" "exp3" 2 121 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 292 0 0
"3207" "exp3" 2 122 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 622 64 1
"3207" "exp3" 2 123 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 79 26 1
"3207" "exp3" 2 124 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 63 0 0
"3207" "exp3" 2 125 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 422 75 1
"3207" "exp3" 2 126 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 37 0 0
"3207" "exp3" 2 127 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 169 17 1
"3207" "exp3" 2 128 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 416 0 0
"3207" "exp3" 2 129 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 742 32 1
"3207" "exp3" 2 130 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 180 26 1
"3207" "exp3" 2 131 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 445 0 0
"3207" "exp3" 2 132 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 348 38 1
"3207" "exp3" 1 1 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 534 0 0
"3207" "exp3" 1 2 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 416 34 1
"3207" "exp3" 1 3 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 379 33 1
"3207" "exp3" 1 4 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 381 33 1
"3207" "exp3" 1 5 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 396 0 0
"3207" "exp3" 1 6 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 593 23 1
"3207" "exp3" 1 7 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 399 37 1
"3207" "exp3" 1 8 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 366 25 1
"3207" "exp3" 1 9 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 418 37 1
"3207" "exp3" 1 10 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 390 15 1
"3207" "exp3" 1 11 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 371 23 1
"3207" "exp3" 1 12 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 341 26 1
"3207" "exp3" 1 13 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 434 0 0
"3207" "exp3" 1 14 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 410 21 1
"3207" "exp3" 1 15 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 395 0 0
"3207" "exp3" 1 16 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 435 20 1
"3207" "exp3" 1 17 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 313 24 1
"3207" "exp3" 1 18 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 415 48 1
"3207" "exp3" 1 19 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 416 31 1
"3207" "exp3" 1 20 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 333 40 1
"3207" "exp3" 1 21 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 263 0 0
"3207" "exp3" 1 22 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 341 11 1
"3207" "exp3" 1 23 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 319 26 1
"3207" "exp3" 1 24 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 343 0 0
"3207" "exp3" 1 25 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 431 35 1
"3207" "exp3" 1 26 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 409 40 1
"3207" "exp3" 1 27 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 386 1 1
"3207" "exp3" 1 28 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 386 38 1
"3207" "exp3" 1 29 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 410 0 0
"3207" "exp3" 1 30 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 358 0 0
"3207" "exp3" 1 31 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 363 8 1
"3207" "exp3" 1 32 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 536 17 1
"3207" "exp3" 1 33 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 389 0 0
"3207" "exp3" 1 34 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 394 0 0
"3207" "exp3" 1 35 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 521 22 1
"3207" "exp3" 1 36 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 409 0 0
"3207" "exp3" 1 37 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 376 34 1
"3207" "exp3" 1 38 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 535 21 1
"3207" "exp3" 1 39 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 429 0 0
"3207" "exp3" 1 40 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 391 26 1
"3207" "exp3" 1 41 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 375 28 1
"3207" "exp3" 1 42 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 424 0 0
"3207" "exp3" 1 43 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 434 27 1
"3207" "exp3" 1 44 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 389 24 1
"3207" "exp3" 1 45 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 436 0 0
"3207" "exp3" 1 46 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 259 29 1
"3207" "exp3" 1 47 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 332 0 0
"3207" "exp3" 1 48 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 321 7 1
"3207" "exp3" 1 49 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 336 13 1
"3207" "exp3" 1 50 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 452 0 0
"3207" "exp3" 1 51 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 408 22 1
"3207" "exp3" 1 52 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 323 41 1
"3207" "exp3" 1 53 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 396 0 0
"3207" "exp3" 1 54 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 235 89 1
"3207" "exp3" 1 55 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 565 42 1
"3207" "exp3" 1 56 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 431 0 0
"3207" "exp3" 1 57 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 380 0 0
"3207" "exp3" 1 58 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 398 0 0
"3207" "exp3" 1 59 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 434 0 0
"3207" "exp3" 1 60 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 437 22 1
"3207" "exp3" 1 61 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 452 6 1
"3207" "exp3" 1 62 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 381 35 1
"3207" "exp3" 1 63 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 416 15 1
"3207" "exp3" 1 64 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 480 14 1
"3207" "exp3" 1 65 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 468 0 0
"3207" "exp3" 1 66 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 423 0 0
"3207" "exp3" 1 67 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 430 18 1
"3207" "exp3" 1 68 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 462 0 0
"3207" "exp3" 1 69 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 427 29 1
"3207" "exp3" 1 70 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 458 33 1
"3207" "exp3" 1 71 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 414 34 1
"3207" "exp3" 1 72 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 450 19 1
"3207" "exp3" 1 73 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 575 6 1
"3207" "exp3" 1 74 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 485 31 1
"3207" "exp3" 1 75 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 407 27 1
"3207" "exp3" 1 76 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 414 43 1
"3207" "exp3" 1 77 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 483 14 1
"3207" "exp3" 1 78 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 367 9 1
"3207" "exp3" 1 79 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 453 36 1
"3207" "exp3" 1 80 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 385 16 1
"3207" "exp3" 1 81 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 309 3 1
"3207" "exp3" 1 82 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 514 0 0
"3207" "exp3" 1 83 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 385 23 1
"3207" "exp3" 1 84 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 538 10 1
"3207" "exp3" 1 85 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 450 17 1
"3207" "exp3" 1 86 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 607 0 0
"3207" "exp3" 1 87 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 371 5 1
"3207" "exp3" 1 88 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 360 20 1
"3207" "exp3" 1 89 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 337 2 1
"3207" "exp3" 1 90 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 338 42 1
"3207" "exp3" 1 91 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 349 0 0
"3207" "exp3" 1 92 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 486 4 1
"3207" "exp3" 1 93 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 636 0 0
"3207" "exp3" 1 94 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 578 37 1
"3207" "exp3" 1 95 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 362 14 1
"3207" "exp3" 1 96 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 392 0 0
"3207" "exp3" 1 97 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 535 0 0
"3207" "exp3" 1 98 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 550 0 0
"3207" "exp3" 1 99 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 391 8 1
"3207" "exp3" 1 100 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 537 10 1
"3207" "exp3" 1 101 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 552 24 1
"3207" "exp3" 1 102 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 653 0 0
"3207" "exp3" 1 103 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 658 0 0
"3207" "exp3" 1 104 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 550 0 0
"3207" "exp3" 1 105 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 492 0 0
"3207" "exp3" 1 106 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 524 7 1
"3207" "exp3" 1 107 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 523 44 1
"3207" "exp3" 1 108 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 602 19 1
"3207" "exp3" 1 109 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 523 12 1
"3207" "exp3" 1 110 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 408 0 0
"3207" "exp3" 1 111 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 374 18 1
"3207" "exp3" 1 112 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 547 16 1
"3207" "exp3" 1 113 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 306 0 0
"3207" "exp3" 1 114 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 568 27 1
"3207" "exp3" 1 115 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 390 29 1
"3207" "exp3" 1 116 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 320 29 1
"3207" "exp3" 1 117 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 400 33 1
"3207" "exp3" 1 118 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 434 45 1
"3207" "exp3" 1 119 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 265 28 1
"3207" "exp3" 1 120 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 417 0 0
"3207" "exp3" 1 121 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 359 35 1
"3207" "exp3" 1 122 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 411 0 0
"3207" "exp3" 1 123 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 390 38 1
"3207" "exp3" 1 124 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 419 26 1
"3207" "exp3" 1 125 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 298 18 1
"3207" "exp3" 1 126 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 446 13 1
"3207" "exp3" 1 127 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 408 0 0
"3207" "exp3" 1 128 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 408 49 1
"3207" "exp3" 1 129 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 405 46 1
"3207" "exp3" 1 130 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 408 0 0
"3207" "exp3" 1 131 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 383 17 1
"3207" "exp3" 1 132 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 554 25 1
"3207" "exp3" 2 1 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 430 18 1
"3207" "exp3" 2 2 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 316 27 1
"3207" "exp3" 2 3 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 319 32 1
"3207" "exp3" 2 4 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 175 40 1
"3207" "exp3" 2 5 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 416 0 0
"3207" "exp3" 2 6 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 326 5 1
"3207" "exp3" 2 7 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 324 31 1
"3207" "exp3" 2 8 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 375 12 1
"3207" "exp3" 2 9 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 286 13 1
"3207" "exp3" 2 10 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 449 32 1
"3207" "exp3" 2 11 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 333 24 1
"3207" "exp3" 2 12 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 362 10 1
"3207" "exp3" 2 13 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 510 22 1
"3207" "exp3" 2 14 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 338 32 1
"3207" "exp3" 2 15 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 487 36 1
"3207" "exp3" 2 16 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 389 30 1
"3207" "exp3" 2 17 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 316 15 1
"3207" "exp3" 2 18 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 367 0 0
"3207" "exp3" 2 19 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 266 38 1
"3207" "exp3" 2 20 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 293 0 0
"3207" "exp3" 2 21 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 313 0 0
"3207" "exp3" 2 22 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 468 17 1
"3207" "exp3" 2 23 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 211 0 0
"3207" "exp3" 2 24 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 367 42 1
"3207" "exp3" 2 25 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 343 0 0
"3207" "exp3" 2 26 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 450 25 1
"3207" "exp3" 2 27 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 316 24 1
"3207" "exp3" 2 28 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 464 34 1
"3207" "exp3" 2 29 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 369 0 0
"3207" "exp3" 2 30 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 313 0 0
"3207" "exp3" 2 31 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 405 19 1
"3207" "exp3" 2 32 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 471 31 1
"3207" "exp3" 2 33 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 503 0 0
"3207" "exp3" 2 34 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 351 36 1
"3207" "exp3" 2 35 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 217 0 0
"3207" "exp3" 2 36 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 271 0 0
"3207" "exp3" 2 37 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 207 34 1
"3207" "exp3" 2 38 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 345 45 1
"3207" "exp3" 2 39 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 287 0 0
"3207" "exp3" 2 40 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 244 48 1
"3207" "exp3" 2 41 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 287 0 0
"3207" "exp3" 2 42 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 393 30 1
"3207" "exp3" 2 43 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 388 20 1
"3207" "exp3" 2 44 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 227 0 0
"3207" "exp3" 2 45 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 269 23 1
"3207" "exp3" 2 46 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 446 0 0
"3207" "exp3" 2 47 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 350 19 1
"3207" "exp3" 2 48 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 556 0 0
"3207" "exp3" 2 49 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 215 30 1
"3207" "exp3" 2 50 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 381 25 1
"3207" "exp3" 2 51 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 686 33 1
"3207" "exp3" 2 52 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 320 35 1
"3207" "exp3" 2 53 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 286 0 0
"3207" "exp3" 2 54 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 231 14 1
"3207" "exp3" 2 55 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 196 39 1
"3207" "exp3" 2 56 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 346 0 0
"3207" "exp3" 2 57 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 804 63 1
"3207" "exp3" 2 58 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 241 23 1
"3207" "exp3" 2 59 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 89 27 1
"3207" "exp3" 2 60 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 358 23 1
"3207" "exp3" 2 61 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 326 0 0
"3207" "exp3" 2 62 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 211 9 1
"3207" "exp3" 2 63 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 249 57 1
"3207" "exp3" 2 64 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 253 0 0
"3207" "exp3" 2 65 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 257 0 0
"3207" "exp3" 2 66 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 587 0 0
"3207" "exp3" 2 67 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 194 0 0
"3207" "exp3" 2 68 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 283 41 1
"3207" "exp3" 2 69 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 250 32 1
"3207" "exp3" 2 70 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 288 29 1
"3207" "exp3" 2 71 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 784 6 1
"3207" "exp3" 2 72 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 253 5 1
"3207" "exp3" 2 73 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 338 9 1
"3207" "exp3" 2 74 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 458 0 0
"3207" "exp3" 2 75 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 297 0 0
"3207" "exp3" 2 76 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 202 0 0
"3207" "exp3" 2 77 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 383 71 1
"3207" "exp3" 2 78 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 530 6 1
"3207" "exp3" 2 79 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 177 79 1
"3207" "exp3" 2 80 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 97 1 1
"3207" "exp3" 2 81 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 49 54 1
"3207" "exp3" 2 82 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 259 38 1
"3207" "exp3" 2 83 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 244 17 1
"3207" "exp3" 2 84 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 377 7 1
"3207" "exp3" 2 85 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 146 0 0
"3207" "exp3" 2 86 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 340 0 0
"3207" "exp3" 2 87 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 473 34 1
"3207" "exp3" 2 88 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 470 7 1
"3207" "exp3" 2 89 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 939 44 1
"3207" "exp3" 2 90 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 480 0 0
"3207" "exp3" 2 91 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 519 22 1
"3207" "exp3" 2 92 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 428 0 0
"3207" "exp3" 2 93 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 461 22 1
"3207" "exp3" 2 94 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 509 0 0
"3207" "exp3" 2 95 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 822 33 1
"3207" "exp3" 2 96 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 431 25 1
"3207" "exp3" 2 97 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 528 13 1
"3207" "exp3" 2 98 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1106 0 0
"3207" "exp3" 2 99 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 396 11 1
"3207" "exp3" 2 100 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 576 96 1
"3207" "exp3" 2 101 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 459 0 0
"3207" "exp3" 2 102 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 507 0 0
"3207" "exp3" 2 103 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 544 0 0
"3207" "exp3" 2 104 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 479 71 1
"3207" "exp3" 2 105 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 550 0 0
"3207" "exp3" 2 106 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 435 16 1
"3207" "exp3" 2 107 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1213 44 1
"3207" "exp3" 2 108 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 706 21 1
"3207" "exp3" 2 109 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 576 0 0
"3207" "exp3" 2 110 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1514 0 0
"3207" "exp3" 2 111 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 487 22 1
"3207" "exp3" 2 112 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 470 15 1
"3207" "exp3" 2 113 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 373 18 1
"3207" "exp3" 2 114 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 914 86 1
"3207" "exp3" 2 115 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 525 0 0
"3207" "exp3" 2 116 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 532 12 1
"3207" "exp3" 2 117 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 366 2 1
"3207" "exp3" 2 118 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 962 0 0
"3207" "exp3" 2 119 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 910 0 0
"3207" "exp3" 2 120 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 416 0 0
"3207" "exp3" 2 121 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1242 17 1
"3207" "exp3" 2 122 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 433 30 1
"3207" "exp3" 2 123 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 468 14 1
"3207" "exp3" 2 124 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 532 29 1
"3207" "exp3" 2 125 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 494 27 1
"3207" "exp3" 2 126 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 492 0 0
"3207" "exp3" 2 127 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 409 17 1
"3207" "exp3" 2 128 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 453 37 1
"3207" "exp3" 2 129 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 415 0 0
"3207" "exp3" 2 130 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 480 39 1
"3207" "exp3" 2 131 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 417 10 1
"3207" "exp3" 2 132 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 598 0 0
"3208" "exp3" 1 1 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 2253 22 1
"3208" "exp3" 1 2 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 3085 15 1
"3208" "exp3" 1 3 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 5170 33 1
"3208" "exp3" 1 4 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 3363 20 1
"3208" "exp3" 1 5 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 4298 0 0
"3208" "exp3" 1 6 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 2742 0 0
"3208" "exp3" 1 7 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 4347 29 1
"3208" "exp3" 1 8 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 5025 26 1
"3208" "exp3" 1 9 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 5841 0 0
"3208" "exp3" 1 10 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 2061 6 1
"3208" "exp3" 1 11 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 4112 0 0
"3208" "exp3" 1 12 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 12381 0 0
"3208" "exp3" 1 13 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1776 34 1
"3208" "exp3" 1 14 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 4279 0 0
"3208" "exp3" 1 15 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 2470 17 1
"3208" "exp3" 1 16 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1660 27 1
"3208" "exp3" 1 17 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 11315 0 0
"3208" "exp3" 1 18 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3018 0 0
"3208" "exp3" 1 19 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 3636 0 0
"3208" "exp3" 1 20 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 3735 0 0
"3208" "exp3" 1 21 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 3050 19 1
"3208" "exp3" 1 22 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 6647 40 1
"3208" "exp3" 1 23 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2848 21 1
"3208" "exp3" 1 24 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 4838 19 1
"3208" "exp3" 1 25 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 7896 0 0
"3208" "exp3" 1 26 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 4921 66 1
"3208" "exp3" 1 27 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 2366 23 1
"3208" "exp3" 1 28 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 2085 20 1
"3208" "exp3" 1 29 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 8688 41 1
"3208" "exp3" 1 30 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 10157 15 1
"3208" "exp3" 1 31 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2304 0 0
"3208" "exp3" 1 32 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2251 0 0
"3208" "exp3" 1 33 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 5676 22 1
"3208" "exp3" 1 34 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 3542 24 1
"3208" "exp3" 1 35 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 3888 0 0
"3208" "exp3" 1 36 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 3922 0 0
"3208" "exp3" 1 37 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1939 31 1
"3208" "exp3" 1 38 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 5388 0 0
"3208" "exp3" 1 39 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 2782 17 1
"3208" "exp3" 1 40 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 3449 72 1
"3208" "exp3" 1 41 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 4561 63 1
"3208" "exp3" 1 42 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1538 0 0
"3208" "exp3" 1 43 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 2716 18 1
"3208" "exp3" 1 44 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1589 27 1
"3208" "exp3" 1 45 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 6732 0 0
"3208" "exp3" 1 46 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 2229 32 1
"3208" "exp3" 1 47 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 2156 12 1
"3208" "exp3" 1 48 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1970 8 1
"3208" "exp3" 1 49 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1589 44 1
"3208" "exp3" 1 50 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1743 22 1
"3208" "exp3" 1 51 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1905 0 0
"3208" "exp3" 1 52 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 2539 29 1
"3208" "exp3" 1 53 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 2394 0 0
"3208" "exp3" 1 54 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 5973 9 1
"3208" "exp3" 1 55 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 5718 0 0
"3208" "exp3" 1 56 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 2487 0 0
"3208" "exp3" 1 57 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 3791 0 0
"3208" "exp3" 1 58 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 4783 10 1
"3208" "exp3" 1 59 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 3136 25 1
"3208" "exp3" 1 60 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 5056 0 0
"3208" "exp3" 1 61 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1625 32 1
"3208" "exp3" 1 62 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 2380 30 1
"3208" "exp3" 1 63 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 2706 16 1
"3208" "exp3" 1 64 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 2322 54 1
"3208" "exp3" 1 65 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1999 45 1
"3208" "exp3" 1 66 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 3795 90 1
"3208" "exp3" 1 67 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 4849 0 0
"3208" "exp3" 1 68 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 3910 31 1
"3208" "exp3" 1 69 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 3117 0 0
"3208" "exp3" 1 70 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2281 37 1
"3208" "exp3" 1 71 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 4021 9 1
"3208" "exp3" 1 72 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 2384 20 1
"3208" "exp3" 1 73 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 2218 14 1
"3208" "exp3" 1 74 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1099 30 1
"3208" "exp3" 1 75 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1905 0 0
"3208" "exp3" 1 76 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1303 15 1
"3208" "exp3" 1 77 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 4355 5 1
"3208" "exp3" 1 78 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 8769 29 1
"3208" "exp3" 1 79 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 2016 0 0
"3208" "exp3" 1 80 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 6600 0 0
"3208" "exp3" 1 81 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 4702 23 1
"3208" "exp3" 1 82 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 3367 67 1
"3208" "exp3" 1 83 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 6057 18 1
"3208" "exp3" 1 84 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1129 14 1
"3208" "exp3" 1 85 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1421 12 1
"3208" "exp3" 1 86 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 2731 98 1
"3208" "exp3" 1 87 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2846 42 1
"3208" "exp3" 1 88 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 961 0 0
"3208" "exp3" 1 89 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1041 0 0
"3208" "exp3" 1 90 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 2323 24 1
"3208" "exp3" 1 91 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1853 0 0
"3208" "exp3" 1 92 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 3866 0 0
"3208" "exp3" 1 93 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 2232 13 1
"3208" "exp3" 1 94 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1381 35 1
"3208" "exp3" 1 95 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1633 24 1
"3208" "exp3" 1 96 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1878 14 1
"3208" "exp3" 1 97 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 2426 23 1
"3208" "exp3" 1 98 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2419 0 0
"3208" "exp3" 1 99 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1822 0 0
"3208" "exp3" 1 100 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 3405 18 1
"3208" "exp3" 1 101 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1651 20 1
"3208" "exp3" 1 102 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1499 41 1
"3208" "exp3" 1 103 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1273 0 0
"3208" "exp3" 1 104 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 2200 26 1
"3208" "exp3" 1 105 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 2331 21 1
"3208" "exp3" 1 106 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3997 0 0
"3208" "exp3" 1 107 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2767 0 0
"3208" "exp3" 1 108 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 4859 0 0
"3208" "exp3" 1 109 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 2949 0 0
"3208" "exp3" 1 110 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 1463 56 1
"3208" "exp3" 1 111 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 2424 8 1
"3208" "exp3" 1 112 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1019 26 1
"3208" "exp3" 1 113 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2413 40 1
"3208" "exp3" 1 114 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 3353 87 1
"3208" "exp3" 1 115 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 981 0 0
"3208" "exp3" 1 116 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1535 32 1
"3208" "exp3" 1 117 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 3979 0 0
"3208" "exp3" 1 118 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1414 26 1
"3208" "exp3" 1 119 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 5023 0 0
"3208" "exp3" 1 120 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1586 25 1
"3208" "exp3" 1 121 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1568 45 1
"3208" "exp3" 1 122 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1174 19 1
"3208" "exp3" 1 123 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 930 22 1
"3208" "exp3" 1 124 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 2421 0 0
"3208" "exp3" 1 125 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 981 36 1
"3208" "exp3" 1 126 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 913 29 1
"3208" "exp3" 1 127 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1564 0 0
"3208" "exp3" 1 128 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 2026 0 0
"3208" "exp3" 1 129 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1520 36 1
"3208" "exp3" 1 130 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1773 16 1
"3208" "exp3" 1 131 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2411 49 1
"3208" "exp3" 1 132 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 2574 0 0
"3208" "exp3" 2 1 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2508 0 0
"3208" "exp3" 2 2 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1598 38 1
"3208" "exp3" 2 3 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1016 20 1
"3208" "exp3" 2 4 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 2238 29 1
"3208" "exp3" 2 5 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1806 24 1
"3208" "exp3" 2 6 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2900 0 0
"3208" "exp3" 2 7 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 3086 0 0
"3208" "exp3" 2 8 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 2301 0 0
"3208" "exp3" 2 9 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1725 18 1
"3208" "exp3" 2 10 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1206 38 1
"3208" "exp3" 2 11 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1582 0 0
"3208" "exp3" 2 12 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1095 43 1
"3208" "exp3" 2 13 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1025 20 1
"3208" "exp3" 2 14 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 3648 0 0
"3208" "exp3" 2 15 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1492 43 1
"3208" "exp3" 2 16 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 2523 0 0
"3208" "exp3" 2 17 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1404 45 1
"3208" "exp3" 2 18 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1292 19 1
"3208" "exp3" 2 19 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1049 36 1
"3208" "exp3" 2 20 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1738 18 1
"3208" "exp3" 2 21 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 4095 20 1
"3208" "exp3" 2 22 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1169 0 0
"3208" "exp3" 2 23 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 902 6 1
"3208" "exp3" 2 24 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1455 17 1
"3208" "exp3" 2 25 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 954 0 0
"3208" "exp3" 2 26 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 964 33 1
"3208" "exp3" 2 27 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 2006 10 1
"3208" "exp3" 2 28 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1309 0 0
"3208" "exp3" 2 29 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1315 65 1
"3208" "exp3" 2 30 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1497 0 0
"3208" "exp3" 2 31 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 991 27 1
"3208" "exp3" 2 32 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 874 28 1
"3208" "exp3" 2 33 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 746 25 1
"3208" "exp3" 2 34 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1267 0 0
"3208" "exp3" 2 35 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 2412 0 0
"3208" "exp3" 2 36 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 2136 29 1
"3208" "exp3" 2 37 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1561 15 1
"3208" "exp3" 2 38 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1748 0 0
"3208" "exp3" 2 39 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1029 27 1
"3208" "exp3" 2 40 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 963 0 0
"3208" "exp3" 2 41 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 874 42 1
"3208" "exp3" 2 42 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 4264 21 1
"3208" "exp3" 2 43 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2067 41 1
"3208" "exp3" 2 44 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1995 26 1
"3208" "exp3" 2 45 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 4018 9 1
"3208" "exp3" 2 46 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1748 14 1
"3208" "exp3" 2 47 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1445 0 0
"3208" "exp3" 2 48 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1506 17 1
"3208" "exp3" 2 49 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 2968 33 1
"3208" "exp3" 2 50 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 3186 0 0
"3208" "exp3" 2 51 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1602 21 1
"3208" "exp3" 2 52 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 2074 5 1
"3208" "exp3" 2 53 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1791 17 1
"3208" "exp3" 2 54 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 2857 7 1
"3208" "exp3" 2 55 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 3293 0 0
"3208" "exp3" 2 56 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1514 10 1
"3208" "exp3" 2 57 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 6152 0 0
"3208" "exp3" 2 58 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 3367 0 0
"3208" "exp3" 2 59 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2163 0 0
"3208" "exp3" 2 60 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2541 0 0
"3208" "exp3" 2 61 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1781 0 0
"3208" "exp3" 2 62 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 3638 0 0
"3208" "exp3" 2 63 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1401 22 1
"3208" "exp3" 2 64 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1684 45 1
"3208" "exp3" 2 65 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1359 44 1
"3208" "exp3" 2 66 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 3635 27 1
"3208" "exp3" 2 67 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1446 23 1
"3208" "exp3" 2 68 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2431 34 1
"3208" "exp3" 2 69 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1400 25 1
"3208" "exp3" 2 70 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1749 14 1
"3208" "exp3" 2 71 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1495 49 1
"3208" "exp3" 2 72 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 2770 0 0
"3208" "exp3" 2 73 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1195 18 1
"3208" "exp3" 2 74 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 844 13 1
"3208" "exp3" 2 75 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1229 29 1
"3208" "exp3" 2 76 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 880 21 1
"3208" "exp3" 2 77 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 939 0 0
"3208" "exp3" 2 78 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1109 0 0
"3208" "exp3" 2 79 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 3935 13 1
"3208" "exp3" 2 80 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1621 0 0
"3208" "exp3" 2 81 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1761 0 0
"3208" "exp3" 2 82 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1446 23 1
"3208" "exp3" 2 83 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 2951 91 1
"3208" "exp3" 2 84 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1331 14 1
"3208" "exp3" 2 85 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 3617 12 1
"3208" "exp3" 2 86 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 3176 31 1
"3208" "exp3" 2 87 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 633 37 1
"3208" "exp3" 2 88 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 902 18 1
"3208" "exp3" 2 89 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1096 21 1
"3208" "exp3" 2 90 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1040 0 0
"3208" "exp3" 2 91 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1215 32 1
"3208" "exp3" 2 92 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 881 16 1
"3208" "exp3" 2 93 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 890 1 1
"3208" "exp3" 2 94 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1577 36 1
"3208" "exp3" 2 95 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1023 30 1
"3208" "exp3" 2 96 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1137 11 1
"3208" "exp3" 2 97 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1317 8 1
"3208" "exp3" 2 98 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1557 0 0
"3208" "exp3" 2 99 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 824 0 0
"3208" "exp3" 2 100 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1701 0 0
"3208" "exp3" 2 101 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 815 32 1
"3208" "exp3" 2 102 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1168 12 1
"3208" "exp3" 2 103 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1742 0 0
"3208" "exp3" 2 104 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1663 0 0
"3208" "exp3" 2 105 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1171 0 0
"3208" "exp3" 2 106 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 919 19 1
"3208" "exp3" 2 107 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 8597 15 1
"3208" "exp3" 2 108 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 4589 0 0
"3208" "exp3" 2 109 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1270 20 1
"3208" "exp3" 2 110 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 994 0 0
"3208" "exp3" 2 111 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 852 0 0
"3208" "exp3" 2 112 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1561 0 0
"3208" "exp3" 2 113 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 3825 0 0
"3208" "exp3" 2 114 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 820 26 1
"3208" "exp3" 2 115 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2656 40 1
"3208" "exp3" 2 116 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1128 32 1
"3208" "exp3" 2 117 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1032 19 1
"3208" "exp3" 2 118 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1189 35 1
"3208" "exp3" 2 119 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 2041 0 0
"3208" "exp3" 2 120 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 769 22 1
"3208" "exp3" 2 121 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 4037 0 0
"3208" "exp3" 2 122 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1165 24 1
"3208" "exp3" 2 123 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1635 11 1
"3208" "exp3" 2 124 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1119 0 0
"3208" "exp3" 2 125 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1195 28 1
"3208" "exp3" 2 126 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 2501 0 0
"3208" "exp3" 2 127 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1042 28 1
"3208" "exp3" 2 128 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 3050 24 1
"3208" "exp3" 2 129 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 5801 0 0
"3208" "exp3" 2 130 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2316 39 1
"3208" "exp3" 2 131 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 9745 30 1
"3208" "exp3" 2 132 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 951 29 1
"3208" "exp3" 1 1 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 2328 0 0
"3208" "exp3" 1 2 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 1223 2 1
"3208" "exp3" 1 3 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 4212 0 0
"3208" "exp3" 1 4 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2137 0 0
"3208" "exp3" 1 5 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1585 28 1
"3208" "exp3" 1 6 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1418 24 1
"3208" "exp3" 1 7 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 2852 34 1
"3208" "exp3" 1 8 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1071 0 0
"3208" "exp3" 1 9 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1174 17 1
"3208" "exp3" 1 10 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1050 20 1
"3208" "exp3" 1 11 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1611 0 0
"3208" "exp3" 1 12 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1270 0 0
"3208" "exp3" 1 13 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 3205 27 1
"3208" "exp3" 1 14 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1884 33 1
"3208" "exp3" 1 15 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 565 0 0
"3208" "exp3" 1 16 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 885 30 1
"3208" "exp3" 1 17 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 704 0 0
"3208" "exp3" 1 18 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1935 23 1
"3208" "exp3" 1 19 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 884 39 1
"3208" "exp3" 1 20 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1840 36 1
"3208" "exp3" 1 21 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1451 34 1
"3208" "exp3" 1 22 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 811 29 1
"3208" "exp3" 1 23 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1023 14 1
"3208" "exp3" 1 24 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1413 43 1
"3208" "exp3" 1 25 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 836 18 1
"3208" "exp3" 1 26 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 900 0 0
"3208" "exp3" 1 27 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 850 32 1
"3208" "exp3" 1 28 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1382 22 1
"3208" "exp3" 1 29 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 4652 91 1
"3208" "exp3" 1 30 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1141 15 1
"3208" "exp3" 1 31 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2118 25 1
"3208" "exp3" 1 32 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 980 0 0
"3208" "exp3" 1 33 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1079 17 1
"3208" "exp3" 1 34 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 903 37 1
"3208" "exp3" 1 35 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1849 0 0
"3208" "exp3" 1 36 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 3809 0 0
"3208" "exp3" 1 37 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1701 44 1
"3208" "exp3" 1 38 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1357 18 1
"3208" "exp3" 1 39 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1006 41 1
"3208" "exp3" 1 40 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 594 28 1
"3208" "exp3" 1 41 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1078 27 1
"3208" "exp3" 1 42 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1470 15 1
"3208" "exp3" 1 43 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 745 0 0
"3208" "exp3" 1 44 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 796 0 0
"3208" "exp3" 1 45 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1895 18 1
"3208" "exp3" 1 46 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1621 0 0
"3208" "exp3" 1 47 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1433 42 1
"3208" "exp3" 1 48 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 970 22 1
"3208" "exp3" 1 49 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 832 25 1
"3208" "exp3" 1 50 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1178 20 1
"3208" "exp3" 1 51 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2407 0 0
"3208" "exp3" 1 52 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1680 9 1
"3208" "exp3" 1 53 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 881 43 1
"3208" "exp3" 1 54 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1569 0 0
"3208" "exp3" 1 55 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1487 0 0
"3208" "exp3" 1 56 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 684 25 1
"3208" "exp3" 1 57 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 2560 0 0
"3208" "exp3" 1 58 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1642 28 1
"3208" "exp3" 1 59 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 465 12 1
"3208" "exp3" 1 60 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1107 0 0
"3208" "exp3" 1 61 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 597 0 0
"3208" "exp3" 1 62 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 661 36 1
"3208" "exp3" 1 63 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 588 26 1
"3208" "exp3" 1 64 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2141 47 1
"3208" "exp3" 1 65 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 1302 0 0
"3208" "exp3" 1 66 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1199 31 1
"3208" "exp3" 1 67 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1266 25 1
"3208" "exp3" 1 68 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 702 0 0
"3208" "exp3" 1 69 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 657 20 1
"3208" "exp3" 1 70 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2511 31 1
"3208" "exp3" 1 71 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 7873 12 1
"3208" "exp3" 1 72 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2545 0 0
"3208" "exp3" 1 73 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1898 30 1
"3208" "exp3" 1 74 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 667 4 1
"3208" "exp3" 1 75 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2055 38 1
"3208" "exp3" 1 76 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 687 33 1
"3208" "exp3" 1 77 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 3568 39 1
"3208" "exp3" 1 78 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 880 27 1
"3208" "exp3" 1 79 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1280 0 0
"3208" "exp3" 1 80 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1195 32 1
"3208" "exp3" 1 81 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 770 28 1
"3208" "exp3" 1 82 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1028 0 0
"3208" "exp3" 1 83 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1369 0 0
"3208" "exp3" 1 84 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 759 31 1
"3208" "exp3" 1 85 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 946 0 0
"3208" "exp3" 1 86 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2749 14 1
"3208" "exp3" 1 87 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1286 29 1
"3208" "exp3" 1 88 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1377 45 1
"3208" "exp3" 1 89 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2332 95 1
"3208" "exp3" 1 90 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 3543 17 1
"3208" "exp3" 1 91 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 799 21 1
"3208" "exp3" 1 92 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 735 19 1
"3208" "exp3" 1 93 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1178 24 1
"3208" "exp3" 1 94 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1119 18 1
"3208" "exp3" 1 95 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1468 26 1
"3208" "exp3" 1 96 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 700 24 1
"3208" "exp3" 1 97 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 4479 0 0
"3208" "exp3" 1 98 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1234 0 0
"3208" "exp3" 1 99 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 838 29 1
"3208" "exp3" 1 100 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1102 95 1
"3208" "exp3" 1 101 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1297 0 0
"3208" "exp3" 1 102 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1162 13 1
"3208" "exp3" 1 103 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 510 32 1
"3208" "exp3" 1 104 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1031 19 1
"3208" "exp3" 1 105 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 933 31 1
"3208" "exp3" 1 106 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1074 21 1
"3208" "exp3" 1 107 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 4924 10 1
"3208" "exp3" 1 108 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 737 16 1
"3208" "exp3" 1 109 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 701 16 1
"3208" "exp3" 1 110 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 816 11 1
"3208" "exp3" 1 111 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 616 42 1
"3208" "exp3" 1 112 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1023 37 1
"3208" "exp3" 1 113 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1731 35 1
"3208" "exp3" 1 114 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1461 35 1
"3208" "exp3" 1 115 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1739 0 0
"3208" "exp3" 1 116 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1320 0 0
"3208" "exp3" 1 117 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 965 13 1
"3208" "exp3" 1 118 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 681 34 1
"3208" "exp3" 1 119 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 754 22 1
"3208" "exp3" 1 120 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 748 36 1
"3208" "exp3" 1 121 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 750 19 1
"3208" "exp3" 1 122 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1041 26 1
"3208" "exp3" 1 123 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 746 23 1
"3208" "exp3" 1 124 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 744 0 0
"3208" "exp3" 1 125 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 691 24 1
"3208" "exp3" 1 126 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 861 0 0
"3208" "exp3" 1 127 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1399 0 0
"3208" "exp3" 1 128 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1109 14 1
"3208" "exp3" 1 129 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 530 21 1
"3208" "exp3" 1 130 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 625 0 0
"3208" "exp3" 1 131 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1446 0 0
"3208" "exp3" 1 132 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 876 40 1
"3208" "exp3" 2 1 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 4448 0 0
"3208" "exp3" 2 2 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 764 34 1
"3208" "exp3" 2 3 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1313 38 1
"3208" "exp3" 2 4 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1124 43 1
"3208" "exp3" 2 5 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 618 0 0
"3208" "exp3" 2 6 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 798 0 0
"3208" "exp3" 2 7 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 849 0 0
"3208" "exp3" 2 8 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 703 41 1
"3208" "exp3" 2 9 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1088 21 1
"3208" "exp3" 2 10 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 947 28 1
"3208" "exp3" 2 11 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 904 0 0
"3208" "exp3" 2 12 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 851 19 1
"3208" "exp3" 2 13 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 980 32 1
"3208" "exp3" 2 14 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 663 33 1
"3208" "exp3" 2 15 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 671 0 0
"3208" "exp3" 2 16 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1197 33 1
"3208" "exp3" 2 17 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1821 0 0
"3208" "exp3" 2 18 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1483 22 1
"3208" "exp3" 2 19 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 636 30 1
"3208" "exp3" 2 20 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1050 18 1
"3208" "exp3" 2 21 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 529 16 1
"3208" "exp3" 2 22 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 877 13 1
"3208" "exp3" 2 23 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1135 0 0
"3208" "exp3" 2 24 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1277 0 0
"3208" "exp3" 2 25 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1551 36 1
"3208" "exp3" 2 26 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 679 0 0
"3208" "exp3" 2 27 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 853 24 1
"3208" "exp3" 2 28 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 469 30 1
"3208" "exp3" 2 29 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 524 35 1
"3208" "exp3" 2 30 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 604 31 1
"3208" "exp3" 2 31 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 758 30 1
"3208" "exp3" 2 32 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 2163 0 0
"3208" "exp3" 2 33 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 982 46 1
"3208" "exp3" 2 34 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 3091 0 0
"3208" "exp3" 2 35 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2070 15 1
"3208" "exp3" 2 36 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 727 0 0
"3208" "exp3" 2 37 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1595 0 0
"3208" "exp3" 2 38 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 2803 37 1
"3208" "exp3" 2 39 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 520 25 1
"3208" "exp3" 2 40 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 419 42 1
"3208" "exp3" 2 41 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 397 21 1
"3208" "exp3" 2 42 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 4602 0 0
"3208" "exp3" 2 43 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 901 21 1
"3208" "exp3" 2 44 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 957 40 1
"3208" "exp3" 2 45 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 596 0 0
"3208" "exp3" 2 46 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 769 45 1
"3208" "exp3" 2 47 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 853 10 1
"3208" "exp3" 2 48 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 4306 11 1
"3208" "exp3" 2 49 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 732 28 1
"3208" "exp3" 2 50 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 707 22 1
"3208" "exp3" 2 51 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 555 27 1
"3208" "exp3" 2 52 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 3356 0 0
"3208" "exp3" 2 53 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1189 24 1
"3208" "exp3" 2 54 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 530 16 1
"3208" "exp3" 2 55 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 436 33 1
"3208" "exp3" 2 56 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 600 10 1
"3208" "exp3" 2 57 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 692 19 1
"3208" "exp3" 2 58 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1381 13 1
"3208" "exp3" 2 59 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 1345 0 0
"3208" "exp3" 2 60 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1467 0 0
"3208" "exp3" 2 61 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 754 0 0
"3208" "exp3" 2 62 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 880 0 0
"3208" "exp3" 2 63 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 827 30 1
"3208" "exp3" 2 64 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 529 36 1
"3208" "exp3" 2 65 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 555 23 1
"3208" "exp3" 2 66 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1309 0 0
"3208" "exp3" 2 67 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1815 0 0
"3208" "exp3" 2 68 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1534 0 0
"3208" "exp3" 2 69 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 577 0 0
"3208" "exp3" 2 70 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 499 0 0
"3208" "exp3" 2 71 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 573 18 1
"3208" "exp3" 2 72 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1876 22 1
"3208" "exp3" 2 73 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1129 0 0
"3208" "exp3" 2 74 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 947 0 0
"3208" "exp3" 2 75 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 525 3 1
"3208" "exp3" 2 76 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 1205 0 0
"3208" "exp3" 2 77 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 787 39 1
"3208" "exp3" 2 78 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 509 0 0
"3208" "exp3" 2 79 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 577 27 1
"3208" "exp3" 2 80 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 787 20 1
"3208" "exp3" 2 81 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1100 38 1
"3208" "exp3" 2 82 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 798 0 0
"3208" "exp3" 2 83 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1190 0 0
"3208" "exp3" 2 84 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 823 0 0
"3208" "exp3" 2 85 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 638 37 1
"3208" "exp3" 2 86 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 818 0 0
"3208" "exp3" 2 87 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 384 32 1
"3208" "exp3" 2 88 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 438 52 1
"3208" "exp3" 2 89 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 779 26 1
"3208" "exp3" 2 90 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1262 0 0
"3208" "exp3" 2 91 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 1421 0 0
"3208" "exp3" 2 92 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1213 29 1
"3208" "exp3" 2 93 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 585 34 1
"3208" "exp3" 2 94 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1131 13 1
"3208" "exp3" 2 95 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 496 12 1
"3208" "exp3" 2 96 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 708 0 0
"3208" "exp3" 2 97 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 811 24 1
"3208" "exp3" 2 98 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1609 0 0
"3208" "exp3" 2 99 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1686 26 1
"3208" "exp3" 2 100 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1650 44 1
"3208" "exp3" 2 101 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 3482 0 0
"3208" "exp3" 2 102 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 754 17 1
"3208" "exp3" 2 103 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1104 98 1
"3208" "exp3" 2 104 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 943 14 1
"3208" "exp3" 2 105 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 548 23 1
"3208" "exp3" 2 106 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 632 0 0
"3208" "exp3" 2 107 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 726 39 1
"3208" "exp3" 2 108 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 575 0 0
"3208" "exp3" 2 109 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 783 0 0
"3208" "exp3" 2 110 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 733 20 1
"3208" "exp3" 2 111 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 776 0 0
"3208" "exp3" 2 112 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 549 25 1
"3208" "exp3" 2 113 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 620 23 1
"3208" "exp3" 2 114 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 773 41 1
"3208" "exp3" 2 115 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 6569 0 0
"3208" "exp3" 2 116 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1424 0 0
"3208" "exp3" 2 117 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 501 11 1
"3208" "exp3" 2 118 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 599 20 1
"3208" "exp3" 2 119 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 431 9 1
"3208" "exp3" 2 120 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 546 15 1
"3208" "exp3" 2 121 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 591 27 1
"3208" "exp3" 2 122 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 475 0 0
"3208" "exp3" 2 123 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1072 35 1
"3208" "exp3" 2 124 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1546 0 0
"3208" "exp3" 2 125 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1148 28 1
"3208" "exp3" 2 126 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 652 0 0
"3208" "exp3" 2 127 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1315 25 1
"3208" "exp3" 2 128 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 742 0 0
"3208" "exp3" 2 129 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1024 14 1
"3208" "exp3" 2 130 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 943 17 1
"3208" "exp3" 2 131 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1164 0 0
"3208" "exp3" 2 132 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1052 31 1
"3208" "exp3" 1 1 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 761 7 1
"3208" "exp3" 1 2 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 471 0 0
"3208" "exp3" 1 3 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 900 0 0
"3208" "exp3" 1 4 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 680 30 1
"3208" "exp3" 1 5 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 438 2 1
"3208" "exp3" 1 6 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 485 49 1
"3208" "exp3" 1 7 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 432 3 1
"3208" "exp3" 1 8 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 344 12 1
"3208" "exp3" 1 9 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 356 0 0
"3208" "exp3" 1 10 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 446 33 1
"3208" "exp3" 1 11 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 627 28 1
"3208" "exp3" 1 12 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 517 42 1
"3208" "exp3" 1 13 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 561 25 1
"3208" "exp3" 1 14 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 455 0 0
"3208" "exp3" 1 15 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 509 36 1
"3208" "exp3" 1 16 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 452 22 1
"3208" "exp3" 1 17 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 561 37 1
"3208" "exp3" 1 18 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 397 14 1
"3208" "exp3" 1 19 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 708 39 1
"3208" "exp3" 1 20 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1490 26 1
"3208" "exp3" 1 21 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 574 18 1
"3208" "exp3" 1 22 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 3175 0 0
"3208" "exp3" 1 23 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 971 32 1
"3208" "exp3" 1 24 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 800 27 1
"3208" "exp3" 1 25 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1324 20 1
"3208" "exp3" 1 26 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 511 16 1
"3208" "exp3" 1 27 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 380 25 1
"3208" "exp3" 1 28 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 697 34 1
"3208" "exp3" 1 29 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 530 38 1
"3208" "exp3" 1 30 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 455 12 1
"3208" "exp3" 1 31 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 417 21 1
"3208" "exp3" 1 32 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 630 20 1
"3208" "exp3" 1 33 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 561 19 1
"3208" "exp3" 1 34 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2960 0 0
"3208" "exp3" 1 35 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 3078 0 0
"3208" "exp3" 1 36 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1015 30 1
"3208" "exp3" 1 37 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 938 10 1
"3208" "exp3" 1 38 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 568 8 1
"3208" "exp3" 1 39 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 2472 16 1
"3208" "exp3" 1 40 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 896 0 0
"3208" "exp3" 1 41 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 1367 61 1
"3208" "exp3" 1 42 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 614 34 1
"3208" "exp3" 1 43 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1570 48 1
"3208" "exp3" 1 44 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1230 21 1
"3208" "exp3" 1 45 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 552 27 1
"3208" "exp3" 1 46 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 424 35 1
"3208" "exp3" 1 47 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 586 0 0
"3208" "exp3" 1 48 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1341 18 1
"3208" "exp3" 1 49 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 403 22 1
"3208" "exp3" 1 50 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 574 19 1
"3208" "exp3" 1 51 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 804 13 1
"3208" "exp3" 1 52 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 540 43 1
"3208" "exp3" 1 53 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 614 17 1
"3208" "exp3" 1 54 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 549 0 0
"3208" "exp3" 1 55 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 940 46 1
"3208" "exp3" 1 56 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1220 32 1
"3208" "exp3" 1 57 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 830 21 1
"3208" "exp3" 1 58 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1719 18 1
"3208" "exp3" 1 59 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1611 79 1
"3208" "exp3" 1 60 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 629 0 0
"3208" "exp3" 1 61 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 692 26 1
"3208" "exp3" 1 62 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 463 37 1
"3208" "exp3" 1 63 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 681 24 1
"3208" "exp3" 1 64 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 607 0 0
"3208" "exp3" 1 65 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 595 7 1
"3208" "exp3" 1 66 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 2323 41 1
"3208" "exp3" 1 67 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 749 33 1
"3208" "exp3" 1 68 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 894 14 1
"3208" "exp3" 1 69 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 545 0 0
"3208" "exp3" 1 70 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 528 33 1
"3208" "exp3" 1 71 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 703 36 1
"3208" "exp3" 1 72 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 509 10 1
"3208" "exp3" 1 73 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 529 0 0
"3208" "exp3" 1 74 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 637 28 1
"3208" "exp3" 1 75 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 564 0 0
"3208" "exp3" 1 76 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 513 19 1
"3208" "exp3" 1 77 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 527 6 1
"3208" "exp3" 1 78 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 574 33 1
"3208" "exp3" 1 79 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 934 30 1
"3208" "exp3" 1 80 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 689 0 0
"3208" "exp3" 1 81 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 1076 59 1
"3208" "exp3" 1 82 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 2209 0 0
"3208" "exp3" 1 83 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 641 4 1
"3208" "exp3" 1 84 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1043 18 1
"3208" "exp3" 1 85 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1716 58 1
"3208" "exp3" 1 86 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1200 17 1
"3208" "exp3" 1 87 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 2890 0 0
"3208" "exp3" 1 88 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1867 11 1
"3208" "exp3" 1 89 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1893 0 0
"3208" "exp3" 1 90 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1175 27 1
"3208" "exp3" 1 91 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 406 20 1
"3208" "exp3" 1 92 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 494 22 1
"3208" "exp3" 1 93 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 599 0 0
"3208" "exp3" 1 94 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1367 0 0
"3208" "exp3" 1 95 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1440 0 0
"3208" "exp3" 1 96 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 764 31 1
"3208" "exp3" 1 97 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 617 13 1
"3208" "exp3" 1 98 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 747 0 0
"3208" "exp3" 1 99 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 807 0 0
"3208" "exp3" 1 100 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 699 70 1
"3208" "exp3" 1 101 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 871 29 1
"3208" "exp3" 1 102 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 559 0 0
"3208" "exp3" 1 103 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 560 0 0
"3208" "exp3" 1 104 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2855 17 1
"3208" "exp3" 1 105 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 892 26 1
"3208" "exp3" 1 106 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 3004 0 0
"3208" "exp3" 1 107 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1124 40 1
"3208" "exp3" 1 108 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1538 34 1
"3208" "exp3" 1 109 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1003 36 1
"3208" "exp3" 1 110 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1872 19 1
"3208" "exp3" 1 111 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1478 25 1
"3208" "exp3" 1 112 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 2604 0 0
"3208" "exp3" 1 113 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1706 29 1
"3208" "exp3" 1 114 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 555 23 1
"3208" "exp3" 1 115 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1264 38 1
"3208" "exp3" 1 116 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 3585 0 0
"3208" "exp3" 1 117 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 727 13 1
"3208" "exp3" 1 118 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 2856 0 0
"3208" "exp3" 1 119 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1339 11 1
"3208" "exp3" 1 120 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1722 0 0
"3208" "exp3" 1 121 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 902 29 1
"3208" "exp3" 1 122 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 653 0 0
"3208" "exp3" 1 123 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 580 29 1
"3208" "exp3" 1 124 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 958 20 1
"3208" "exp3" 1 125 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 507 24 1
"3208" "exp3" 1 126 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 461 23 1
"3208" "exp3" 1 127 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1012 22 1
"3208" "exp3" 1 128 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 684 25 1
"3208" "exp3" 1 129 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1635 45 1
"3208" "exp3" 1 130 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 602 23 1
"3208" "exp3" 1 131 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 656 23 1
"3208" "exp3" 1 132 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 740 35 1
"3208" "exp3" 2 1 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 2582 0 0
"3208" "exp3" 2 2 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 793 23 1
"3208" "exp3" 2 3 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 983 13 1
"3208" "exp3" 2 4 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1816 0 0
"3208" "exp3" 2 5 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1005 0 0
"3208" "exp3" 2 6 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 659 2 1
"3208" "exp3" 2 7 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 500 30 1
"3208" "exp3" 2 8 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 691 31 1
"3208" "exp3" 2 9 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 772 26 1
"3208" "exp3" 2 10 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 474 22 1
"3208" "exp3" 2 11 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 790 30 1
"3208" "exp3" 2 12 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 515 24 1
"3208" "exp3" 2 13 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 680 38 1
"3208" "exp3" 2 14 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 964 32 1
"3208" "exp3" 2 15 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1014 14 1
"3208" "exp3" 2 16 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 942 0 0
"3208" "exp3" 2 17 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 603 23 1
"3208" "exp3" 2 18 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 681 0 0
"3208" "exp3" 2 19 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 604 16 1
"3208" "exp3" 2 20 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 983 25 1
"3208" "exp3" 2 21 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 633 41 1
"3208" "exp3" 2 22 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 673 28 1
"3208" "exp3" 2 23 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 952 40 1
"3208" "exp3" 2 24 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1072 26 1
"3208" "exp3" 2 25 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1994 0 0
"3208" "exp3" 2 26 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1675 0 0
"3208" "exp3" 2 27 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 602 27 1
"3208" "exp3" 2 28 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 4075 0 0
"3208" "exp3" 2 29 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 602 29 1
"3208" "exp3" 2 30 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1082 32 1
"3208" "exp3" 2 31 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 655 19 1
"3208" "exp3" 2 32 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 616 15 1
"3208" "exp3" 2 33 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1083 15 1
"3208" "exp3" 2 34 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 644 0 0
"3208" "exp3" 2 35 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 563 10 1
"3208" "exp3" 2 36 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 697 0 0
"3208" "exp3" 2 37 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 850 49 1
"3208" "exp3" 2 38 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 733 18 1
"3208" "exp3" 2 39 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 549 45 1
"3208" "exp3" 2 40 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 694 0 0
"3208" "exp3" 2 41 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 427 14 1
"3208" "exp3" 2 42 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 495 0 0
"3208" "exp3" 2 43 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 2924 0 0
"3208" "exp3" 2 44 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1175 19 1
"3208" "exp3" 2 45 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 628 18 1
"3208" "exp3" 2 46 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 488 17 1
"3208" "exp3" 2 47 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 516 15 1
"3208" "exp3" 2 48 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 612 29 1
"3208" "exp3" 2 49 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 581 0 0
"3208" "exp3" 2 50 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 626 30 1
"3208" "exp3" 2 51 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1031 23 1
"3208" "exp3" 2 52 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 932 32 1
"3208" "exp3" 2 53 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 751 34 1
"3208" "exp3" 2 54 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1269 26 1
"3208" "exp3" 2 55 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 700 28 1
"3208" "exp3" 2 56 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 632 41 1
"3208" "exp3" 2 57 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 632 7 1
"3208" "exp3" 2 58 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 526 20 1
"3208" "exp3" 2 59 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 837 21 1
"3208" "exp3" 2 60 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 1534 0 0
"3208" "exp3" 2 61 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 628 17 1
"3208" "exp3" 2 62 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 608 31 1
"3208" "exp3" 2 63 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2753 0 0
"3208" "exp3" 2 64 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 4833 0 0
"3208" "exp3" 2 65 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 617 32 1
"3208" "exp3" 2 66 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 650 43 1
"3208" "exp3" 2 67 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 539 24 1
"3208" "exp3" 2 68 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 520 11 1
"3208" "exp3" 2 69 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 788 33 1
"3208" "exp3" 2 70 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 555 0 0
"3208" "exp3" 2 71 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 590 0 0
"3208" "exp3" 2 72 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1174 0 0
"3208" "exp3" 2 73 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 615 40 1
"3208" "exp3" 2 74 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 483 30 1
"3208" "exp3" 2 75 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 435 0 0
"3208" "exp3" 2 76 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 511 29 1
"3208" "exp3" 2 77 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 476 0 0
"3208" "exp3" 2 78 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 523 25 1
"3208" "exp3" 2 79 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 689 0 0
"3208" "exp3" 2 80 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 324 0 0
"3208" "exp3" 2 81 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 406 0 0
"3208" "exp3" 2 82 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 641 22 1
"3208" "exp3" 2 83 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 797 0 0
"3208" "exp3" 2 84 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 517 23 1
"3208" "exp3" 2 85 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 500 19 1
"3208" "exp3" 2 86 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1717 26 1
"3208" "exp3" 2 87 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 756 31 1
"3208" "exp3" 2 88 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1538 16 1
"3208" "exp3" 2 89 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 748 24 1
"3208" "exp3" 2 90 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1265 0 0
"3208" "exp3" 2 91 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 599 22 1
"3208" "exp3" 2 92 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 659 35 1
"3208" "exp3" 2 93 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 640 0 0
"3208" "exp3" 2 94 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 525 0 0
"3208" "exp3" 2 95 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1125 0 0
"3208" "exp3" 2 96 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 442 38 1
"3208" "exp3" 2 97 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 631 0 0
"3208" "exp3" 2 98 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 638 0 0
"3208" "exp3" 2 99 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 484 6 1
"3208" "exp3" 2 100 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 751 3 1
"3208" "exp3" 2 101 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1332 13 1
"3208" "exp3" 2 102 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 757 17 1
"3208" "exp3" 2 103 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 3286 0 0
"3208" "exp3" 2 104 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1236 0 0
"3208" "exp3" 2 105 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 992 36 1
"3208" "exp3" 2 106 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 997 11 1
"3208" "exp3" 2 107 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 876 18 1
"3208" "exp3" 2 108 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 572 12 1
"3208" "exp3" 2 109 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 727 17 1
"3208" "exp3" 2 110 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1507 36 1
"3208" "exp3" 2 111 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 592 43 1
"3208" "exp3" 2 112 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 593 42 1
"3208" "exp3" 2 113 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 508 42 1
"3208" "exp3" 2 114 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 730 27 1
"3208" "exp3" 2 115 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1117 44 1
"3208" "exp3" 2 116 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 721 19 1
"3208" "exp3" 2 117 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 1087 0 0
"3208" "exp3" 2 118 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 635 39 1
"3208" "exp3" 2 119 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 922 0 0
"3208" "exp3" 2 120 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 522 25 1
"3208" "exp3" 2 121 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 637 0 0
"3208" "exp3" 2 122 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 524 8 1
"3208" "exp3" 2 123 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1354 16 1
"3208" "exp3" 2 124 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1873 0 0
"3208" "exp3" 2 125 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 699 35 1
"3208" "exp3" 2 126 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 790 35 1
"3208" "exp3" 2 127 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 712 29 1
"3208" "exp3" 2 128 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 706 44 1
"3208" "exp3" 2 129 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 621 20 1
"3208" "exp3" 2 130 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 723 14 1
"3208" "exp3" 2 131 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 705 12 1
"3208" "exp3" 2 132 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 877 46 1
"3208" "exp3" 1 1 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 910 23 1
"3208" "exp3" 1 2 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 885 43 1
"3208" "exp3" 1 3 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 2161 10 1
"3208" "exp3" 1 4 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1063 15 1
"3208" "exp3" 1 5 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1227 24 1
"3208" "exp3" 1 6 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1371 13 1
"3208" "exp3" 1 7 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 876 0 0
"3208" "exp3" 1 8 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2030 0 0
"3208" "exp3" 1 9 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 1112 0 0
"3208" "exp3" 1 10 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 3457 0 0
"3208" "exp3" 1 11 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2040 0 0
"3208" "exp3" 1 12 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2160 92 1
"3208" "exp3" 1 13 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1685 42 1
"3208" "exp3" 1 14 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1099 13 1
"3208" "exp3" 1 15 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1795 38 1
"3208" "exp3" 1 16 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1866 0 0
"3208" "exp3" 1 17 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1480 21 1
"3208" "exp3" 1 18 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 3441 33 1
"3208" "exp3" 1 19 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1442 0 0
"3208" "exp3" 1 20 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1408 30 1
"3208" "exp3" 1 21 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1438 24 1
"3208" "exp3" 1 22 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1200 26 1
"3208" "exp3" 1 23 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 933 15 1
"3208" "exp3" 1 24 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1314 18 1
"3208" "exp3" 1 25 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1174 0 0
"3208" "exp3" 1 26 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 786 0 0
"3208" "exp3" 1 27 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1083 0 0
"3208" "exp3" 1 28 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1919 14 1
"3208" "exp3" 1 29 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2677 0 0
"3208" "exp3" 1 30 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1502 0 0
"3208" "exp3" 1 31 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1022 48 1
"3208" "exp3" 1 32 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1259 0 0
"3208" "exp3" 1 33 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1081 9 1
"3208" "exp3" 1 34 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 2040 32 1
"3208" "exp3" 1 35 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1201 16 1
"3208" "exp3" 1 36 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1082 37 1
"3208" "exp3" 1 37 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1977 39 1
"3208" "exp3" 1 38 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 2884 35 1
"3208" "exp3" 1 39 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1193 28 1
"3208" "exp3" 1 40 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1819 19 1
"3208" "exp3" 1 41 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 961 33 1
"3208" "exp3" 1 42 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1335 7 1
"3208" "exp3" 1 43 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1131 49 1
"3208" "exp3" 1 44 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 855 23 1
"3208" "exp3" 1 45 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1141 12 1
"3208" "exp3" 1 46 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1364 17 1
"3208" "exp3" 1 47 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1003 32 1
"3208" "exp3" 1 48 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1536 29 1
"3208" "exp3" 1 49 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1157 37 1
"3208" "exp3" 1 50 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1103 20 1
"3208" "exp3" 1 51 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 954 25 1
"3208" "exp3" 1 52 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1080 0 0
"3208" "exp3" 1 53 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1767 12 1
"3208" "exp3" 1 54 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 975 13 1
"3208" "exp3" 1 55 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 2212 14 1
"3208" "exp3" 1 56 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1081 0 0
"3208" "exp3" 1 57 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2075 47 1
"3208" "exp3" 1 58 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2297 0 0
"3208" "exp3" 1 59 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1458 0 0
"3208" "exp3" 1 60 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 866 20 1
"3208" "exp3" 1 61 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 906 0 0
"3208" "exp3" 1 62 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 961 24 1
"3208" "exp3" 1 63 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1027 23 1
"3208" "exp3" 1 64 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1086 0 0
"3208" "exp3" 1 65 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 936 31 1
"3208" "exp3" 1 66 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 899 31 1
"3208" "exp3" 1 67 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1482 27 1
"3208" "exp3" 1 68 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1066 25 1
"3208" "exp3" 1 69 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1260 16 1
"3208" "exp3" 1 70 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1069 21 1
"3208" "exp3" 1 71 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1585 35 1
"3208" "exp3" 1 72 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1789 0 0
"3208" "exp3" 1 73 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1855 11 1
"3208" "exp3" 1 74 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1373 34 1
"3208" "exp3" 1 75 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 806 0 0
"3208" "exp3" 1 76 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1152 29 1
"3208" "exp3" 1 77 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 4799 94 1
"3208" "exp3" 1 78 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2578 46 1
"3208" "exp3" 1 79 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 925 28 1
"3208" "exp3" 1 80 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1132 0 0
"3208" "exp3" 1 81 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 854 18 1
"3208" "exp3" 1 82 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 977 19 1
"3208" "exp3" 1 83 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 838 34 1
"3208" "exp3" 1 84 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1438 91 1
"3208" "exp3" 1 85 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1046 23 1
"3208" "exp3" 1 86 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 953 43 1
"3208" "exp3" 1 87 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1229 0 0
"3208" "exp3" 1 88 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1507 22 1
"3208" "exp3" 1 89 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1240 0 0
"3208" "exp3" 1 90 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1174 40 1
"3208" "exp3" 1 91 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 794 0 0
"3208" "exp3" 1 92 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1519 17 1
"3208" "exp3" 1 93 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1717 0 0
"3208" "exp3" 1 94 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1110 42 1
"3208" "exp3" 1 95 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1868 0 0
"3208" "exp3" 1 96 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1032 0 0
"3208" "exp3" 1 97 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 944 35 1
"3208" "exp3" 1 98 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 940 0 0
"3208" "exp3" 1 99 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 848 0 0
"3208" "exp3" 1 100 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1600 0 0
"3208" "exp3" 1 101 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2205 33 1
"3208" "exp3" 1 102 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1125 0 0
"3208" "exp3" 1 103 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1320 0 0
"3208" "exp3" 1 104 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1113 36 1
"3208" "exp3" 1 105 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 970 44 1
"3208" "exp3" 1 106 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 662 4 1
"3208" "exp3" 1 107 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1276 0 0
"3208" "exp3" 1 108 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 951 40 1
"3208" "exp3" 1 109 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 905 28 1
"3208" "exp3" 1 110 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1089 0 0
"3208" "exp3" 1 111 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 982 0 0
"3208" "exp3" 1 112 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 859 29 1
"3208" "exp3" 1 113 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1171 30 1
"3208" "exp3" 1 114 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1183 0 0
"3208" "exp3" 1 115 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1147 17 1
"3208" "exp3" 1 116 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1176 0 0
"3208" "exp3" 1 117 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1055 21 1
"3208" "exp3" 1 118 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1085 21 1
"3208" "exp3" 1 119 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1271 19 1
"3208" "exp3" 1 120 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 905 30 1
"3208" "exp3" 1 121 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1206 0 0
"3208" "exp3" 1 122 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1301 14 1
"3208" "exp3" 1 123 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1276 44 1
"3208" "exp3" 1 124 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1226 19 1
"3208" "exp3" 1 125 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1856 29 1
"3208" "exp3" 1 126 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 2041 18 1
"3208" "exp3" 1 127 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 818 22 1
"3208" "exp3" 1 128 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 709 27 1
"3208" "exp3" 1 129 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 844 25 1
"3208" "exp3" 1 130 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1090 15 1
"3208" "exp3" 1 131 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 758 20 1
"3208" "exp3" 1 132 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 980 36 1
"3208" "exp3" 2 1 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1372 23 1
"3208" "exp3" 2 2 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1319 14 1
"3208" "exp3" 2 3 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1165 0 0
"3208" "exp3" 2 4 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1792 29 1
"3208" "exp3" 2 5 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1617 33 1
"3208" "exp3" 2 6 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 962 23 1
"3208" "exp3" 2 7 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1545 0 0
"3208" "exp3" 2 8 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 4032 0 0
"3208" "exp3" 2 9 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1141 16 1
"3208" "exp3" 2 10 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 727 44 1
"3208" "exp3" 2 11 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1952 0 0
"3208" "exp3" 2 12 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 897 11 1
"3208" "exp3" 2 13 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 989 0 0
"3208" "exp3" 2 14 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 736 5 1
"3208" "exp3" 2 15 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1297 33 1
"3208" "exp3" 2 16 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1231 19 1
"3208" "exp3" 2 17 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1012 19 1
"3208" "exp3" 2 18 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 980 0 0
"3208" "exp3" 2 19 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 825 0 0
"3208" "exp3" 2 20 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1080 41 1
"3208" "exp3" 2 21 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1583 13 1
"3208" "exp3" 2 22 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 3844 0 0
"3208" "exp3" 2 23 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 2327 17 1
"3208" "exp3" 2 24 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 876 17 1
"3208" "exp3" 2 25 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 897 0 0
"3208" "exp3" 2 26 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1039 0 0
"3208" "exp3" 2 27 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1322 15 1
"3208" "exp3" 2 28 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1157 43 1
"3208" "exp3" 2 29 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 3186 0 0
"3208" "exp3" 2 30 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1374 0 0
"3208" "exp3" 2 31 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1156 0 0
"3208" "exp3" 2 32 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1190 18 1
"3208" "exp3" 2 33 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1027 26 1
"3208" "exp3" 2 34 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 824 0 0
"3208" "exp3" 2 35 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2080 43 1
"3208" "exp3" 2 36 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1121 34 1
"3208" "exp3" 2 37 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 717 0 0
"3208" "exp3" 2 38 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1251 14 1
"3208" "exp3" 2 39 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1320 0 0
"3208" "exp3" 2 40 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 793 12 1
"3208" "exp3" 2 41 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1144 45 1
"3208" "exp3" 2 42 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1002 36 1
"3208" "exp3" 2 43 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 874 0 0
"3208" "exp3" 2 44 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1307 21 1
"3208" "exp3" 2 45 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1398 0 0
"3208" "exp3" 2 46 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1351 20 1
"3208" "exp3" 2 47 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1385 30 1
"3208" "exp3" 2 48 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1293 42 1
"3208" "exp3" 2 49 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1896 26 1
"3208" "exp3" 2 50 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1383 0 0
"3208" "exp3" 2 51 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 2771 12 1
"3208" "exp3" 2 52 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1465 0 0
"3208" "exp3" 2 53 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1484 0 0
"3208" "exp3" 2 54 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 949 0 0
"3208" "exp3" 2 55 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1201 0 0
"3208" "exp3" 2 56 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2135 27 1
"3208" "exp3" 2 57 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2498 38 1
"3208" "exp3" 2 58 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1050 0 0
"3208" "exp3" 2 59 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 72 0 0
"3208" "exp3" 2 60 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 2545 0 0
"3208" "exp3" 2 61 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1024 0 0
"3208" "exp3" 2 62 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 971 0 0
"3208" "exp3" 2 63 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1219 0 0
"3208" "exp3" 2 64 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 993 0 0
"3208" "exp3" 2 65 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1977 17 1
"3208" "exp3" 2 66 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1024 47 1
"3208" "exp3" 2 67 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 949 14 1
"3208" "exp3" 2 68 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1255 30 1
"3208" "exp3" 2 69 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 3099 0 0
"3208" "exp3" 2 70 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 924 31 1
"3208" "exp3" 2 71 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1669 16 1
"3208" "exp3" 2 72 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1749 29 1
"3208" "exp3" 2 73 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1534 41 1
"3208" "exp3" 2 74 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 916 31 1
"3208" "exp3" 2 75 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 786 19 1
"3208" "exp3" 2 76 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 853 0 0
"3208" "exp3" 2 77 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1486 18 1
"3208" "exp3" 2 78 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1900 33 1
"3208" "exp3" 2 79 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2224 37 1
"3208" "exp3" 2 80 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 910 28 1
"3208" "exp3" 2 81 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 4246 0 0
"3208" "exp3" 2 82 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 741 24 1
"3208" "exp3" 2 83 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 950 27 1
"3208" "exp3" 2 84 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1645 29 1
"3208" "exp3" 2 85 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1324 0 0
"3208" "exp3" 2 86 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1157 0 0
"3208" "exp3" 2 87 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1832 0 0
"3208" "exp3" 2 88 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 830 0 0
"3208" "exp3" 2 89 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1131 34 1
"3208" "exp3" 2 90 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1241 26 1
"3208" "exp3" 2 91 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1328 34 1
"3208" "exp3" 2 92 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1104 25 1
"3208" "exp3" 2 93 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1250 0 0
"3208" "exp3" 2 94 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1228 31 1
"3208" "exp3" 2 95 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1101 25 1
"3208" "exp3" 2 96 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1191 22 1
"3208" "exp3" 2 97 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1173 0 0
"3208" "exp3" 2 98 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1230 20 1
"3208" "exp3" 2 99 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2373 13 1
"3208" "exp3" 2 100 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1454 22 1
"3208" "exp3" 2 101 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1333 10 1
"3208" "exp3" 2 102 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1413 21 1
"3208" "exp3" 2 103 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1641 23 1
"3208" "exp3" 2 104 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1224 35 1
"3208" "exp3" 2 105 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1141 29 1
"3208" "exp3" 2 106 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1192 21 1
"3208" "exp3" 2 107 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1105 20 1
"3208" "exp3" 2 108 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1084 24 1
"3208" "exp3" 2 109 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 629 6 1
"3208" "exp3" 2 110 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 2670 23 1
"3208" "exp3" 2 111 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 983 15 1
"3208" "exp3" 2 112 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1492 13 1
"3208" "exp3" 2 113 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 983 33 1
"3208" "exp3" 2 114 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1322 15 1
"3208" "exp3" 2 115 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1740 0 0
"3208" "exp3" 2 116 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1305 0 0
"3208" "exp3" 2 117 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 810 0 0
"3208" "exp3" 2 118 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1094 0 0
"3208" "exp3" 2 119 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 946 11 1
"3208" "exp3" 2 120 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2098 17 1
"3208" "exp3" 2 121 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1952 22 1
"3208" "exp3" 2 122 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1178 0 0
"3208" "exp3" 2 123 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1081 37 1
"3208" "exp3" 2 124 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1187 26 1
"3208" "exp3" 2 125 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 772 28 1
"3208" "exp3" 2 126 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1261 0 0
"3208" "exp3" 2 127 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2890 0 0
"3208" "exp3" 2 128 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1558 0 0
"3208" "exp3" 2 129 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 980 0 0
"3208" "exp3" 2 130 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1009 16 1
"3208" "exp3" 2 131 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1685 0 0
"3208" "exp3" 2 132 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1226 18 1
"3209" "exp3" 1 1 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 392 0 0
"3209" "exp3" 1 2 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 736 18 1
"3209" "exp3" 1 3 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 523 0 0
"3209" "exp3" 1 4 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 488 0 0
"3209" "exp3" 1 5 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 499 8 1
"3209" "exp3" 1 6 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 428 0 0
"3209" "exp3" 1 7 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 547 0 0
"3209" "exp3" 1 8 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 644 16 1
"3209" "exp3" 1 9 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 602 77 1
"3209" "exp3" 1 10 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 540 48 1
"3209" "exp3" 1 11 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 473 27 1
"3209" "exp3" 1 12 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 427 21 1
"3209" "exp3" 1 13 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 496 76 1
"3209" "exp3" 1 14 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 410 0 0
"3209" "exp3" 1 15 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 411 0 0
"3209" "exp3" 1 16 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 461 0 0
"3209" "exp3" 1 17 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 318 0 0
"3209" "exp3" 1 18 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 585 18 1
"3209" "exp3" 1 19 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 437 3 1
"3209" "exp3" 1 20 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 601 14 1
"3209" "exp3" 1 21 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 414 0 0
"3209" "exp3" 1 22 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 465 0 0
"3209" "exp3" 1 23 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 643 0 0
"3209" "exp3" 1 24 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 434 0 0
"3209" "exp3" 1 25 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 480 17 1
"3209" "exp3" 1 26 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 584 20 1
"3209" "exp3" 1 27 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 546 0 0
"3209" "exp3" 1 28 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 866 28 1
"3209" "exp3" 1 29 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 426 0 0
"3209" "exp3" 1 30 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 409 0 0
"3209" "exp3" 1 31 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 412 43 1
"3209" "exp3" 1 32 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 562 31 1
"3209" "exp3" 1 33 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 505 12 1
"3209" "exp3" 1 34 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1109 46 1
"3209" "exp3" 1 35 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 466 0 0
"3209" "exp3" 1 36 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 369 0 0
"3209" "exp3" 1 37 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 477 0 0
"3209" "exp3" 1 38 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 434 41 1
"3209" "exp3" 1 39 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 543 23 1
"3209" "exp3" 1 40 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 461 17 1
"3209" "exp3" 1 41 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 451 35 1
"3209" "exp3" 1 42 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 1057 0 0
"3209" "exp3" 1 43 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 437 66 1
"3209" "exp3" 1 44 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 393 0 0
"3209" "exp3" 1 45 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 453 10 1
"3209" "exp3" 1 46 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 448 31 1
"3209" "exp3" 1 47 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 621 25 1
"3209" "exp3" 1 48 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 422 35 1
"3209" "exp3" 1 49 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 922 66 1
"3209" "exp3" 1 50 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 804 0 0
"3209" "exp3" 1 51 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 429 37 1
"3209" "exp3" 1 52 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 522 27 1
"3209" "exp3" 1 53 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 479 0 0
"3209" "exp3" 1 54 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 590 39 1
"3209" "exp3" 1 55 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 487 13 1
"3209" "exp3" 1 56 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 486 26 1
"3209" "exp3" 1 57 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 688 0 0
"3209" "exp3" 1 58 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 577 0 0
"3209" "exp3" 1 59 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 557 0 0
"3209" "exp3" 1 60 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 544 24 1
"3209" "exp3" 1 61 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 414 6 1
"3209" "exp3" 1 62 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 792 58 1
"3209" "exp3" 1 63 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 678 0 0
"3209" "exp3" 1 64 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 720 87 1
"3209" "exp3" 1 65 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 638 21 1
"3209" "exp3" 1 66 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 492 0 0
"3209" "exp3" 1 67 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 522 26 1
"3209" "exp3" 1 68 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 402 78 1
"3209" "exp3" 1 69 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 437 0 0
"3209" "exp3" 1 70 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 447 0 0
"3209" "exp3" 1 71 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 405 0 0
"3209" "exp3" 1 72 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 944 0 0
"3209" "exp3" 1 73 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 530 0 0
"3209" "exp3" 1 74 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 727 0 0
"3209" "exp3" 1 75 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 351 0 0
"3209" "exp3" 1 76 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 822 28 1
"3209" "exp3" 1 77 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 418 0 0
"3209" "exp3" 1 78 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 665 0 0
"3209" "exp3" 1 79 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 424 58 1
"3209" "exp3" 1 80 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 525 19 1
"3209" "exp3" 1 81 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 642 1 1
"3209" "exp3" 1 82 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 771 0 0
"3209" "exp3" 1 83 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 794 36 1
"3209" "exp3" 1 84 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 640 0 0
"3209" "exp3" 1 85 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 527 40 1
"3209" "exp3" 1 86 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 524 0 0
"3209" "exp3" 1 87 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 819 0 0
"3209" "exp3" 1 88 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 795 0 0
"3209" "exp3" 1 89 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 673 34 1
"3209" "exp3" 1 90 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 812 72 1
"3209" "exp3" 1 91 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 403 0 0
"3209" "exp3" 1 92 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 681 62 1
"3209" "exp3" 1 93 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 704 31 1
"3209" "exp3" 1 94 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 680 82 1
"3209" "exp3" 1 95 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 583 0 0
"3209" "exp3" 1 96 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 576 0 0
"3209" "exp3" 1 97 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1385 0 0
"3209" "exp3" 1 98 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 693 33 1
"3209" "exp3" 1 99 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 536 29 1
"3209" "exp3" 1 100 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 575 30 1
"3209" "exp3" 1 101 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 1011 0 0
"3209" "exp3" 1 102 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 855 70 1
"3209" "exp3" 1 103 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 917 0 0
"3209" "exp3" 1 104 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 1323 7 1
"3209" "exp3" 1 105 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1287 0 0
"3209" "exp3" 1 106 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 766 0 0
"3209" "exp3" 1 107 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 803 0 0
"3209" "exp3" 1 108 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 481 63 1
"3209" "exp3" 1 109 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 529 0 0
"3209" "exp3" 1 110 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 775 0 0
"3209" "exp3" 1 111 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 521 91 1
"3209" "exp3" 1 112 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 565 81 1
"3209" "exp3" 1 113 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 551 49 1
"3209" "exp3" 1 114 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1126 20 1
"3209" "exp3" 1 115 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1146 47 1
"3209" "exp3" 1 116 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 942 0 0
"3209" "exp3" 1 117 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 489 0 0
"3209" "exp3" 1 118 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 608 6 1
"3209" "exp3" 1 119 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 353 0 0
"3209" "exp3" 1 120 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 424 0 0
"3209" "exp3" 1 121 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 760 22 1
"3209" "exp3" 1 122 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 692 29 1
"3209" "exp3" 1 123 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 604 23 1
"3209" "exp3" 1 124 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 560 0 0
"3209" "exp3" 1 125 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 412 33 1
"3209" "exp3" 1 126 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 473 19 1
"3209" "exp3" 1 127 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 634 0 0
"3209" "exp3" 1 128 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 474 0 0
"3209" "exp3" 1 129 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 495 0 0
"3209" "exp3" 1 130 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 526 43 1
"3209" "exp3" 1 131 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 1079 0 0
"3209" "exp3" 1 132 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 452 0 0
"3209" "exp3" 2 1 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 450 0 0
"3209" "exp3" 2 2 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 391 0 0
"3209" "exp3" 2 3 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 501 13 1
"3209" "exp3" 2 4 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 571 0 0
"3209" "exp3" 2 5 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 522 27 1
"3209" "exp3" 2 6 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 447 0 0
"3209" "exp3" 2 7 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 534 59 1
"3209" "exp3" 2 8 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 454 0 0
"3209" "exp3" 2 9 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 451 74 1
"3209" "exp3" 2 10 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 510 0 0
"3209" "exp3" 2 11 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 448 0 0
"3209" "exp3" 2 12 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 431 0 0
"3209" "exp3" 2 13 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 315 0 0
"3209" "exp3" 2 14 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 515 0 0
"3209" "exp3" 2 15 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 388 0 0
"3209" "exp3" 2 16 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 320 0 0
"3209" "exp3" 2 17 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 485 72 1
"3209" "exp3" 2 18 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 402 0 0
"3209" "exp3" 2 19 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 486 0 0
"3209" "exp3" 2 20 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 645 0 0
"3209" "exp3" 2 21 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 361 0 0
"3209" "exp3" 2 22 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 353 70 1
"3209" "exp3" 2 23 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 500 0 0
"3209" "exp3" 2 24 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 448 0 0
"3209" "exp3" 2 25 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 509 70 1
"3209" "exp3" 2 26 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 900 43 1
"3209" "exp3" 2 27 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1004 20 1
"3209" "exp3" 2 28 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 422 13 1
"3209" "exp3" 2 29 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 464 83 1
"3209" "exp3" 2 30 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 562 0 0
"3209" "exp3" 2 31 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 673 8 1
"3209" "exp3" 2 32 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 768 94 1
"3209" "exp3" 2 33 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 838 14 1
"3209" "exp3" 2 34 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 533 0 0
"3209" "exp3" 2 35 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 402 0 0
"3209" "exp3" 2 36 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 708 0 0
"3209" "exp3" 2 37 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 507 0 0
"3209" "exp3" 2 38 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 498 0 0
"3209" "exp3" 2 39 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 661 3 1
"3209" "exp3" 2 40 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 607 33 1
"3209" "exp3" 2 41 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1034 0 0
"3209" "exp3" 2 42 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 888 44 1
"3209" "exp3" 2 43 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 827 0 0
"3209" "exp3" 2 44 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 799 58 1
"3209" "exp3" 2 45 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 948 5 1
"3209" "exp3" 2 46 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 481 0 0
"3209" "exp3" 2 47 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 862 0 0
"3209" "exp3" 2 48 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 782 0 0
"3209" "exp3" 2 49 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 662 17 1
"3209" "exp3" 2 50 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 441 64 1
"3209" "exp3" 2 51 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 732 1 1
"3209" "exp3" 2 52 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 338 0 0
"3209" "exp3" 2 53 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 688 16 1
"3209" "exp3" 2 54 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 518 45 1
"3209" "exp3" 2 55 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 480 0 0
"3209" "exp3" 2 56 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 386 0 0
"3209" "exp3" 2 57 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 475 0 0
"3209" "exp3" 2 58 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 937 18 1
"3209" "exp3" 2 59 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1039 33 1
"3209" "exp3" 2 60 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 820 21 1
"3209" "exp3" 2 61 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 541 0 0
"3209" "exp3" 2 62 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 849 12 1
"3209" "exp3" 2 63 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 692 0 0
"3209" "exp3" 2 64 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 431 26 1
"3209" "exp3" 2 65 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 598 34 1
"3209" "exp3" 2 66 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 476 0 0
"3209" "exp3" 2 67 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 558 30 1
"3209" "exp3" 2 68 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 397 28 1
"3209" "exp3" 2 69 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 585 82 1
"3209" "exp3" 2 70 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 495 59 1
"3209" "exp3" 2 71 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 580 0 0
"3209" "exp3" 2 72 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 462 69 1
"3209" "exp3" 2 73 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 609 0 0
"3209" "exp3" 2 74 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1152 0 0
"3209" "exp3" 2 75 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 461 0 0
"3209" "exp3" 2 76 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 393 0 0
"3209" "exp3" 2 77 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 571 24 1
"3209" "exp3" 2 78 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 703 0 0
"3209" "exp3" 2 79 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 536 27 1
"3209" "exp3" 2 80 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 653 38 1
"3209" "exp3" 2 81 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 539 20 1
"3209" "exp3" 2 82 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 495 12 1
"3209" "exp3" 2 83 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 412 0 0
"3209" "exp3" 2 84 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 393 31 1
"3209" "exp3" 2 85 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 395 19 1
"3209" "exp3" 2 86 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 458 0 0
"3209" "exp3" 2 87 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 337 28 1
"3209" "exp3" 2 88 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 292 29 1
"3209" "exp3" 2 89 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 493 0 0
"3209" "exp3" 2 90 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 484 47 1
"3209" "exp3" 2 91 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 522 23 1
"3209" "exp3" 2 92 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 510 11 1
"3209" "exp3" 2 93 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 503 0 0
"3209" "exp3" 2 94 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 813 37 1
"3209" "exp3" 2 95 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 762 0 0
"3209" "exp3" 2 96 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 760 7 1
"3209" "exp3" 2 97 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 430 0 0
"3209" "exp3" 2 98 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 480 75 1
"3209" "exp3" 2 99 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 578 0 0
"3209" "exp3" 2 100 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 487 5 1
"3209" "exp3" 2 101 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 571 0 0
"3209" "exp3" 2 102 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 420 75 1
"3209" "exp3" 2 103 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 539 21 1
"3209" "exp3" 2 104 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 618 4 1
"3209" "exp3" 2 105 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1219 10 1
"3209" "exp3" 2 106 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 508 9 1
"3209" "exp3" 2 107 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1012 0 0
"3209" "exp3" 2 108 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 449 42 1
"3209" "exp3" 2 109 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 472 6 1
"3209" "exp3" 2 110 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 514 8 1
"3209" "exp3" 2 111 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 587 22 1
"3209" "exp3" 2 112 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 505 26 1
"3209" "exp3" 2 113 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 690 28 1
"3209" "exp3" 2 114 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 642 0 0
"3209" "exp3" 2 115 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 588 13 1
"3209" "exp3" 2 116 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 720 11 1
"3209" "exp3" 2 117 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 362 0 0
"3209" "exp3" 2 118 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 429 0 0
"3209" "exp3" 2 119 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 414 24 1
"3209" "exp3" 2 120 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 586 36 1
"3209" "exp3" 2 121 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 644 79 1
"3209" "exp3" 2 122 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 595 19 1
"3209" "exp3" 2 123 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 485 32 1
"3209" "exp3" 2 124 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 521 0 0
"3209" "exp3" 2 125 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 313 16 1
"3209" "exp3" 2 126 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 668 0 0
"3209" "exp3" 2 127 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 668 0 0
"3209" "exp3" 2 128 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1024 29 1
"3209" "exp3" 2 129 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 555 15 1
"3209" "exp3" 2 130 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 903 19 1
"3209" "exp3" 2 131 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 685 7 1
"3209" "exp3" 2 132 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 854 0 0
"3209" "exp3" 1 1 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 954 0 0
"3209" "exp3" 1 2 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1085 0 0
"3209" "exp3" 1 3 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 435 38 1
"3209" "exp3" 1 4 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 681 37 1
"3209" "exp3" 1 5 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 395 30 1
"3209" "exp3" 1 6 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 639 31 1
"3209" "exp3" 1 7 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 755 0 0
"3209" "exp3" 1 8 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 806 19 1
"3209" "exp3" 1 9 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 908 75 1
"3209" "exp3" 1 10 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 753 29 1
"3209" "exp3" 1 11 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 437 35 1
"3209" "exp3" 1 12 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 623 0 0
"3209" "exp3" 1 13 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 559 18 1
"3209" "exp3" 1 14 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 544 0 0
"3209" "exp3" 1 15 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1284 60 1
"3209" "exp3" 1 16 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 874 10 1
"3209" "exp3" 1 17 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 749 0 0
"3209" "exp3" 1 18 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1534 14 1
"3209" "exp3" 1 19 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 566 0 0
"3209" "exp3" 1 20 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 1186 0 0
"3209" "exp3" 1 21 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 827 23 1
"3209" "exp3" 1 22 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 692 4 1
"3209" "exp3" 1 23 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 783 0 0
"3209" "exp3" 1 24 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 789 0 0
"3209" "exp3" 1 25 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 635 17 1
"3209" "exp3" 1 26 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 751 0 0
"3209" "exp3" 1 27 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 661 29 1
"3209" "exp3" 1 28 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 856 0 0
"3209" "exp3" 1 29 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 779 0 0
"3209" "exp3" 1 30 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1036 85 1
"3209" "exp3" 1 31 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1225 0 0
"3209" "exp3" 1 32 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 992 0 0
"3209" "exp3" 1 33 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 647 44 1
"3209" "exp3" 1 34 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 761 5 1
"3209" "exp3" 1 35 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 916 0 0
"3209" "exp3" 1 36 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 803 63 1
"3209" "exp3" 1 37 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1089 29 1
"3209" "exp3" 1 38 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 491 16 1
"3209" "exp3" 1 39 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 666 26 1
"3209" "exp3" 1 40 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 552 6 1
"3209" "exp3" 1 41 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 511 45 1
"3209" "exp3" 1 42 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 939 28 1
"3209" "exp3" 1 43 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 662 28 1
"3209" "exp3" 1 44 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1105 0 0
"3209" "exp3" 1 45 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 750 30 1
"3209" "exp3" 1 46 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 864 21 1
"3209" "exp3" 1 47 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 861 0 0
"3209" "exp3" 1 48 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 611 29 1
"3209" "exp3" 1 49 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 559 0 0
"3209" "exp3" 1 50 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 681 3 1
"3209" "exp3" 1 51 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 700 9 1
"3209" "exp3" 1 52 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 1241 58 1
"3209" "exp3" 1 53 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1179 0 0
"3209" "exp3" 1 54 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 1332 0 0
"3209" "exp3" 1 55 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 799 0 0
"3209" "exp3" 1 56 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1382 0 0
"3209" "exp3" 1 57 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1224 17 1
"3209" "exp3" 1 58 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1130 0 0
"3209" "exp3" 1 59 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 758 0 0
"3209" "exp3" 1 60 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 747 25 1
"3209" "exp3" 1 61 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 907 23 1
"3209" "exp3" 1 62 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 502 0 0
"3209" "exp3" 1 63 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1128 0 0
"3209" "exp3" 1 64 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 538 67 1
"3209" "exp3" 1 65 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 632 5 1
"3209" "exp3" 1 66 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 1083 0 0
"3209" "exp3" 1 67 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1182 0 0
"3209" "exp3" 1 68 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 695 0 0
"3209" "exp3" 1 69 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 719 0 0
"3209" "exp3" 1 70 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 572 24 1
"3209" "exp3" 1 71 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1214 42 1
"3209" "exp3" 1 72 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 826 24 1
"3209" "exp3" 1 73 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 696 0 0
"3209" "exp3" 1 74 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 942 0 0
"3209" "exp3" 1 75 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 594 16 1
"3209" "exp3" 1 76 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 489 10 1
"3209" "exp3" 1 77 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 799 0 0
"3209" "exp3" 1 78 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 727 25 1
"3209" "exp3" 1 79 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 782 34 1
"3209" "exp3" 1 80 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 722 11 1
"3209" "exp3" 1 81 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 659 13 1
"3209" "exp3" 1 82 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 609 20 1
"3209" "exp3" 1 83 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 649 0 0
"3209" "exp3" 1 84 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 360 59 1
"3209" "exp3" 1 85 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 545 53 1
"3209" "exp3" 1 86 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 802 0 0
"3209" "exp3" 1 87 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 669 22 1
"3209" "exp3" 1 88 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 770 0 0
"3209" "exp3" 1 89 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 715 0 0
"3209" "exp3" 1 90 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 605 0 0
"3209" "exp3" 1 91 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 448 0 0
"3209" "exp3" 1 92 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 701 72 1
"3209" "exp3" 1 93 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 528 0 0
"3209" "exp3" 1 94 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 577 0 0
"3209" "exp3" 1 95 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 367 0 0
"3209" "exp3" 1 96 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 542 92 1
"3209" "exp3" 1 97 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 425 0 0
"3209" "exp3" 1 98 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 619 32 1
"3209" "exp3" 1 99 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 284 0 0
"3209" "exp3" 1 100 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 407 22 1
"3209" "exp3" 1 101 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 305 35 1
"3209" "exp3" 1 102 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 519 67 1
"3209" "exp3" 1 103 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 369 0 0
"3209" "exp3" 1 104 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 400 15 1
"3209" "exp3" 1 105 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 680 19 1
"3209" "exp3" 1 106 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 511 46 1
"3209" "exp3" 1 107 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 633 18 1
"3209" "exp3" 1 108 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 482 0 0
"3209" "exp3" 1 109 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 438 19 1
"3209" "exp3" 1 110 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 464 0 0
"3209" "exp3" 1 111 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 712 0 0
"3209" "exp3" 1 112 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 802 18 1
"3209" "exp3" 1 113 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 555 18 1
"3209" "exp3" 1 114 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 772 0 0
"3209" "exp3" 1 115 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 484 13 1
"3209" "exp3" 1 116 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 409 40 1
"3209" "exp3" 1 117 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 705 30 1
"3209" "exp3" 1 118 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 607 48 1
"3209" "exp3" 1 119 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 566 31 1
"3209" "exp3" 1 120 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 343 0 0
"3209" "exp3" 1 121 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 466 0 0
"3209" "exp3" 1 122 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 561 0 0
"3209" "exp3" 1 123 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 574 0 0
"3209" "exp3" 1 124 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 428 79 1
"3209" "exp3" 1 125 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 379 0 0
"3209" "exp3" 1 126 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 466 0 0
"3209" "exp3" 1 127 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 793 0 0
"3209" "exp3" 1 128 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 540 7 1
"3209" "exp3" 1 129 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 357 0 0
"3209" "exp3" 1 130 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1000 85 1
"3209" "exp3" 1 131 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 554 67 1
"3209" "exp3" 1 132 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 642 0 0
"3209" "exp3" 2 1 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 545 0 0
"3209" "exp3" 2 2 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 493 55 1
"3209" "exp3" 2 3 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 524 39 1
"3209" "exp3" 2 4 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 518 27 1
"3209" "exp3" 2 5 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 686 0 0
"3209" "exp3" 2 6 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 463 19 1
"3209" "exp3" 2 7 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 529 0 0
"3209" "exp3" 2 8 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 436 0 0
"3209" "exp3" 2 9 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 457 0 0
"3209" "exp3" 2 10 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 560 0 0
"3209" "exp3" 2 11 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 376 26 1
"3209" "exp3" 2 12 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 548 0 0
"3209" "exp3" 2 13 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 318 17 1
"3209" "exp3" 2 14 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 397 0 0
"3209" "exp3" 2 15 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 616 30 1
"3209" "exp3" 2 16 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 485 0 0
"3209" "exp3" 2 17 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 631 29 1
"3209" "exp3" 2 18 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 459 13 1
"3209" "exp3" 2 19 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 506 28 1
"3209" "exp3" 2 20 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 437 0 0
"3209" "exp3" 2 21 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 415 19 1
"3209" "exp3" 2 22 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 513 65 1
"3209" "exp3" 2 23 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 357 0 0
"3209" "exp3" 2 24 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 295 36 1
"3209" "exp3" 2 25 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 457 93 1
"3209" "exp3" 2 26 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 617 0 0
"3209" "exp3" 2 27 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1135 0 0
"3209" "exp3" 2 28 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 422 0 0
"3209" "exp3" 2 29 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 384 17 1
"3209" "exp3" 2 30 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 538 28 1
"3209" "exp3" 2 31 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 659 0 0
"3209" "exp3" 2 32 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 314 0 0
"3209" "exp3" 2 33 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 479 82 1
"3209" "exp3" 2 34 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 654 23 1
"3209" "exp3" 2 35 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 468 17 1
"3209" "exp3" 2 36 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 670 28 1
"3209" "exp3" 2 37 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 463 0 0
"3209" "exp3" 2 38 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 358 0 0
"3209" "exp3" 2 39 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 537 0 0
"3209" "exp3" 2 40 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 344 14 1
"3209" "exp3" 2 41 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 440 0 0
"3209" "exp3" 2 42 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 556 0 0
"3209" "exp3" 2 43 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 464 14 1
"3209" "exp3" 2 44 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 332 76 1
"3209" "exp3" 2 45 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 475 33 1
"3209" "exp3" 2 46 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 303 21 1
"3209" "exp3" 2 47 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 383 15 1
"3209" "exp3" 2 48 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 601 92 1
"3209" "exp3" 2 49 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1034 0 0
"3209" "exp3" 2 50 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 650 0 0
"3209" "exp3" 2 51 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 385 0 0
"3209" "exp3" 2 52 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 327 20 1
"3209" "exp3" 2 53 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 411 27 1
"3209" "exp3" 2 54 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 522 26 1
"3209" "exp3" 2 55 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 433 25 1
"3209" "exp3" 2 56 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 399 18 1
"3209" "exp3" 2 57 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 712 0 0
"3209" "exp3" 2 58 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 598 0 0
"3209" "exp3" 2 59 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 617 29 1
"3209" "exp3" 2 60 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 960 0 0
"3209" "exp3" 2 61 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 416 45 1
"3209" "exp3" 2 62 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 413 22 1
"3209" "exp3" 2 63 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 428 0 0
"3209" "exp3" 2 64 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 587 0 0
"3209" "exp3" 2 65 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 413 21 1
"3209" "exp3" 2 66 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 412 0 0
"3209" "exp3" 2 67 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 702 0 0
"3209" "exp3" 2 68 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 385 24 1
"3209" "exp3" 2 69 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 616 0 0
"3209" "exp3" 2 70 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 465 0 0
"3209" "exp3" 2 71 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 812 69 1
"3209" "exp3" 2 72 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1180 40 1
"3209" "exp3" 2 73 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 790 0 0
"3209" "exp3" 2 74 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1044 0 0
"3209" "exp3" 2 75 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 575 23 1
"3209" "exp3" 2 76 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 619 0 0
"3209" "exp3" 2 77 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 748 37 1
"3209" "exp3" 2 78 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 697 0 0
"3209" "exp3" 2 79 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 653 34 1
"3209" "exp3" 2 80 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 526 70 1
"3209" "exp3" 2 81 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 833 31 1
"3209" "exp3" 2 82 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 689 33 1
"3209" "exp3" 2 83 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 651 0 0
"3209" "exp3" 2 84 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 628 9 1
"3209" "exp3" 2 85 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 694 13 1
"3209" "exp3" 2 86 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 666 26 1
"3209" "exp3" 2 87 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 740 0 0
"3209" "exp3" 2 88 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 612 66 1
"3209" "exp3" 2 89 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 672 58 1
"3209" "exp3" 2 90 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 932 0 0
"3209" "exp3" 2 91 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 590 40 1
"3209" "exp3" 2 92 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 591 0 0
"3209" "exp3" 2 93 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 467 0 0
"3209" "exp3" 2 94 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 637 13 1
"3209" "exp3" 2 95 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 668 64 1
"3209" "exp3" 2 96 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 472 0 0
"3209" "exp3" 2 97 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 700 0 0
"3209" "exp3" 2 98 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 479 0 0
"3209" "exp3" 2 99 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 430 0 0
"3209" "exp3" 2 100 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 469 59 1
"3209" "exp3" 2 101 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 557 0 0
"3209" "exp3" 2 102 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 828 31 1
"3209" "exp3" 2 103 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1049 94 1
"3209" "exp3" 2 104 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 483 75 1
"3209" "exp3" 2 105 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 411 0 0
"3209" "exp3" 2 106 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 516 0 0
"3209" "exp3" 2 107 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 704 0 0
"3209" "exp3" 2 108 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 592 0 0
"3209" "exp3" 2 109 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 576 12 1
"3209" "exp3" 2 110 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 732 0 0
"3209" "exp3" 2 111 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 752 10 1
"3209" "exp3" 2 112 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 875 0 0
"3209" "exp3" 2 113 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 939 0 0
"3209" "exp3" 2 114 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 654 85 1
"3209" "exp3" 2 115 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 503 0 0
"3209" "exp3" 2 116 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 520 0 0
"3209" "exp3" 2 117 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 645 90 1
"3209" "exp3" 2 118 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 628 0 0
"3209" "exp3" 2 119 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 472 0 0
"3209" "exp3" 2 120 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 813 0 0
"3209" "exp3" 2 121 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 1229 0 0
"3209" "exp3" 2 122 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 933 0 0
"3209" "exp3" 2 123 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 575 0 0
"3209" "exp3" 2 124 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 490 0 0
"3209" "exp3" 2 125 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 457 66 1
"3209" "exp3" 2 126 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 545 0 0
"3209" "exp3" 2 127 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 779 0 0
"3209" "exp3" 2 128 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 566 22 1
"3209" "exp3" 2 129 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 571 0 0
"3209" "exp3" 2 130 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 535 48 1
"3209" "exp3" 2 131 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 648 36 1
"3209" "exp3" 2 132 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 596 0 0
"3209" "exp3" 1 1 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 664 0 0
"3209" "exp3" 1 2 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 495 0 0
"3209" "exp3" 1 3 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 345 0 0
"3209" "exp3" 1 4 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 358 0 0
"3209" "exp3" 1 5 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 338 66 1
"3209" "exp3" 1 6 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 531 74 1
"3209" "exp3" 1 7 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 391 0 0
"3209" "exp3" 1 8 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 467 38 1
"3209" "exp3" 1 9 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 371 91 1
"3209" "exp3" 1 10 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 462 38 1
"3209" "exp3" 1 11 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 378 0 0
"3209" "exp3" 1 12 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 401 16 1
"3209" "exp3" 1 13 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 388 75 1
"3209" "exp3" 1 14 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 545 0 0
"3209" "exp3" 1 15 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 310 0 0
"3209" "exp3" 1 16 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 348 0 0
"3209" "exp3" 1 17 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 326 0 0
"3209" "exp3" 1 18 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 496 25 1
"3209" "exp3" 1 19 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 591 20 1
"3209" "exp3" 1 20 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 325 0 0
"3209" "exp3" 1 21 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 349 0 0
"3209" "exp3" 1 22 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 403 26 1
"3209" "exp3" 1 23 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 295 20 1
"3209" "exp3" 1 24 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 386 0 0
"3209" "exp3" 1 25 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 644 0 0
"3209" "exp3" 1 26 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 539 0 0
"3209" "exp3" 1 27 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 507 0 0
"3209" "exp3" 1 28 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 982 0 0
"3209" "exp3" 1 29 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 891 0 0
"3209" "exp3" 1 30 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1097 72 1
"3209" "exp3" 1 31 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 732 0 0
"3209" "exp3" 1 32 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 758 17 1
"3209" "exp3" 1 33 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 838 0 0
"3209" "exp3" 1 34 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 682 0 0
"3209" "exp3" 1 35 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 448 3 1
"3209" "exp3" 1 36 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1902 0 0
"3209" "exp3" 1 37 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 561 0 0
"3209" "exp3" 1 38 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 438 0 0
"3209" "exp3" 1 39 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 403 66 1
"3209" "exp3" 1 40 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1000 32 1
"3209" "exp3" 1 41 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 866 0 0
"3209" "exp3" 1 42 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 494 0 0
"3209" "exp3" 1 43 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 653 15 1
"3209" "exp3" 1 44 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 705 0 0
"3209" "exp3" 1 45 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 335 0 0
"3209" "exp3" 1 46 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 365 0 0
"3209" "exp3" 1 47 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 570 0 0
"3209" "exp3" 1 48 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 428 0 0
"3209" "exp3" 1 49 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 293 0 0
"3209" "exp3" 1 50 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 263 44 1
"3209" "exp3" 1 51 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 617 67 1
"3209" "exp3" 1 52 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 446 0 0
"3209" "exp3" 1 53 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 287 79 1
"3209" "exp3" 1 54 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 331 18 1
"3209" "exp3" 1 55 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 832 0 0
"3209" "exp3" 1 56 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 454 0 0
"3209" "exp3" 1 57 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 612 0 0
"3209" "exp3" 1 58 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 664 0 0
"3209" "exp3" 1 59 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 549 0 0
"3209" "exp3" 1 60 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 655 0 0
"3209" "exp3" 1 61 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 564 0 0
"3209" "exp3" 1 62 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 571 0 0
"3209" "exp3" 1 63 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 358 23 1
"3209" "exp3" 1 64 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 571 0 0
"3209" "exp3" 1 65 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 560 58 1
"3209" "exp3" 1 66 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 401 0 0
"3209" "exp3" 1 67 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 299 32 1
"3209" "exp3" 1 68 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 215 16 1
"3209" "exp3" 1 69 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 418 45 1
"3209" "exp3" 1 70 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 354 60 1
"3209" "exp3" 1 71 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 387 0 0
"3209" "exp3" 1 72 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 362 81 1
"3209" "exp3" 1 73 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 422 0 0
"3209" "exp3" 1 74 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 719 28 1
"3209" "exp3" 1 75 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 695 0 0
"3209" "exp3" 1 76 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 402 0 0
"3209" "exp3" 1 77 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 364 0 0
"3209" "exp3" 1 78 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 358 27 1
"3209" "exp3" 1 79 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 489 0 0
"3209" "exp3" 1 80 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 277 76 1
"3209" "exp3" 1 81 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 350 0 0
"3209" "exp3" 1 82 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 338 0 0
"3209" "exp3" 1 83 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 366 31 1
"3209" "exp3" 1 84 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 368 0 0
"3209" "exp3" 1 85 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 342 0 0
"3209" "exp3" 1 86 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 299 0 0
"3209" "exp3" 1 87 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 32 0 0
"3209" "exp3" 1 88 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 429 0 0
"3209" "exp3" 1 89 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 632 57 1
"3209" "exp3" 1 90 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 567 0 0
"3209" "exp3" 1 91 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 788 58 1
"3209" "exp3" 1 92 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 560 65 1
"3209" "exp3" 1 93 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 536 39 1
"3209" "exp3" 1 94 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1044 40 1
"3209" "exp3" 1 95 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 665 32 1
"3209" "exp3" 1 96 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 576 17 1
"3209" "exp3" 1 97 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 438 0 0
"3209" "exp3" 1 98 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 387 8 1
"3209" "exp3" 1 99 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 914 0 0
"3209" "exp3" 1 100 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 538 0 0
"3209" "exp3" 1 101 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 542 0 0
"3209" "exp3" 1 102 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 786 36 1
"3209" "exp3" 1 103 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 529 91 1
"3209" "exp3" 1 104 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1250 0 0
"3209" "exp3" 1 105 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 903 0 0
"3209" "exp3" 1 106 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 964 12 1
"3209" "exp3" 1 107 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1271 19 1
"3209" "exp3" 1 108 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 843 14 1
"3209" "exp3" 1 109 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 523 27 1
"3209" "exp3" 1 110 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 710 63 1
"3209" "exp3" 1 111 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1210 0 0
"3209" "exp3" 1 112 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 858 22 1
"3209" "exp3" 1 113 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 748 35 1
"3209" "exp3" 1 114 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 975 0 0
"3209" "exp3" 1 115 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 563 0 0
"3209" "exp3" 1 116 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 826 81 1
"3209" "exp3" 1 117 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 795 0 0
"3209" "exp3" 1 118 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1582 0 0
"3209" "exp3" 1 119 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1361 0 0
"3209" "exp3" 1 120 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 735 87 1
"3209" "exp3" 1 121 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 603 0 0
"3209" "exp3" 1 122 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 749 0 0
"3209" "exp3" 1 123 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1292 0 0
"3209" "exp3" 1 124 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 655 0 0
"3209" "exp3" 1 125 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 718 0 0
"3209" "exp3" 1 126 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 986 45 1
"3209" "exp3" 1 127 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1042 23 1
"3209" "exp3" 1 128 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1319 0 0
"3209" "exp3" 1 129 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1283 0 0
"3209" "exp3" 1 130 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 609 76 1
"3209" "exp3" 1 131 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 620 67 1
"3209" "exp3" 1 132 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 530 0 0
"3209" "exp3" 2 1 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1368 8 1
"3209" "exp3" 2 2 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 666 0 0
"3209" "exp3" 2 3 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 804 0 0
"3209" "exp3" 2 4 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 524 0 0
"3209" "exp3" 2 5 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 561 0 0
"3209" "exp3" 2 6 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 942 43 1
"3209" "exp3" 2 7 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1542 36 1
"3209" "exp3" 2 8 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 600 75 1
"3209" "exp3" 2 9 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 495 0 0
"3209" "exp3" 2 10 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 678 0 0
"3209" "exp3" 2 11 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 884 0 0
"3209" "exp3" 2 12 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 695 0 0
"3209" "exp3" 2 13 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 973 0 0
"3209" "exp3" 2 14 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 885 72 1
"3209" "exp3" 2 15 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 783 0 0
"3209" "exp3" 2 16 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1194 0 0
"3209" "exp3" 2 17 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 503 0 0
"3209" "exp3" 2 18 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 576 0 0
"3209" "exp3" 2 19 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 531 0 0
"3209" "exp3" 2 20 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 427 40 1
"3209" "exp3" 2 21 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 618 0 0
"3209" "exp3" 2 22 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 362 18 1
"3209" "exp3" 2 23 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1327 29 1
"3209" "exp3" 2 24 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1412 0 0
"3209" "exp3" 2 25 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 922 70 1
"3209" "exp3" 2 26 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 457 0 0
"3209" "exp3" 2 27 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 653 0 0
"3209" "exp3" 2 28 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 526 18 1
"3209" "exp3" 2 29 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 936 0 0
"3209" "exp3" 2 30 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 648 0 0
"3209" "exp3" 2 31 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1043 0 0
"3209" "exp3" 2 32 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 1003 71 1
"3209" "exp3" 2 33 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 507 0 0
"3209" "exp3" 2 34 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 487 0 0
"3209" "exp3" 2 35 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 788 0 0
"3209" "exp3" 2 36 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 779 85 1
"3209" "exp3" 2 37 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 776 83 1
"3209" "exp3" 2 38 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 569 83 1
"3209" "exp3" 2 39 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 878 0 0
"3209" "exp3" 2 40 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 513 67 1
"3209" "exp3" 2 41 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 487 0 0
"3209" "exp3" 2 42 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 552 77 1
"3209" "exp3" 2 43 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 455 0 0
"3209" "exp3" 2 44 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 456 0 0
"3209" "exp3" 2 45 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 533 79 1
"3209" "exp3" 2 46 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 495 0 0
"3209" "exp3" 2 47 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 492 62 1
"3209" "exp3" 2 48 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 509 0 0
"3209" "exp3" 2 49 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 651 13 1
"3209" "exp3" 2 50 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 885 0 0
"3209" "exp3" 2 51 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 543 0 0
"3209" "exp3" 2 52 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 456 0 0
"3209" "exp3" 2 53 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1165 0 0
"3209" "exp3" 2 54 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 919 9 1
"3209" "exp3" 2 55 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 562 44 1
"3209" "exp3" 2 56 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 530 0 0
"3209" "exp3" 2 57 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 519 21 1
"3209" "exp3" 2 58 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 537 67 1
"3209" "exp3" 2 59 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 579 73 1
"3209" "exp3" 2 60 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1337 0 0
"3209" "exp3" 2 61 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1066 0 0
"3209" "exp3" 2 62 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 708 21 1
"3209" "exp3" 2 63 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 899 78 1
"3209" "exp3" 2 64 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 629 0 0
"3209" "exp3" 2 65 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 777 0 0
"3209" "exp3" 2 66 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 751 69 1
"3209" "exp3" 2 67 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 781 0 0
"3209" "exp3" 2 68 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 666 0 0
"3209" "exp3" 2 69 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 590 92 1
"3209" "exp3" 2 70 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 535 0 0
"3209" "exp3" 2 71 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 585 47 1
"3209" "exp3" 2 72 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 671 0 0
"3209" "exp3" 2 73 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1099 0 0
"3209" "exp3" 2 74 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 631 25 1
"3209" "exp3" 2 75 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 611 5 1
"3209" "exp3" 2 76 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 983 0 0
"3209" "exp3" 2 77 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1126 93 1
"3209" "exp3" 2 78 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1430 0 0
"3209" "exp3" 2 79 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1258 0 0
"3209" "exp3" 2 80 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 865 0 0
"3209" "exp3" 2 81 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 413 0 0
"3209" "exp3" 2 82 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 570 0 0
"3209" "exp3" 2 83 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 572 0 0
"3209" "exp3" 2 84 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 460 20 1
"3209" "exp3" 2 85 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 374 0 0
"3209" "exp3" 2 86 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 472 14 1
"3209" "exp3" 2 87 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 399 0 0
"3209" "exp3" 2 88 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 281 0 0
"3209" "exp3" 2 89 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 347 37 1
"3209" "exp3" 2 90 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 650 30 1
"3209" "exp3" 2 91 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 623 0 0
"3209" "exp3" 2 92 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 418 0 0
"3209" "exp3" 2 93 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 489 0 0
"3209" "exp3" 2 94 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 354 89 1
"3209" "exp3" 2 95 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 416 0 0
"3209" "exp3" 2 96 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 442 0 0
"3209" "exp3" 2 97 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 540 0 0
"3209" "exp3" 2 98 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 317 30 1
"3209" "exp3" 2 99 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 491 0 0
"3209" "exp3" 2 100 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 407 0 0
"3209" "exp3" 2 101 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 538 0 0
"3209" "exp3" 2 102 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 401 0 0
"3209" "exp3" 2 103 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 448 32 1
"3209" "exp3" 2 104 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 849 0 0
"3209" "exp3" 2 105 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 602 0 0
"3209" "exp3" 2 106 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 328 0 0
"3209" "exp3" 2 107 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 478 0 0
"3209" "exp3" 2 108 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 400 55 1
"3209" "exp3" 2 109 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 363 44 1
"3209" "exp3" 2 110 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 306 0 0
"3209" "exp3" 2 111 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 614 0 0
"3209" "exp3" 2 112 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 392 0 0
"3209" "exp3" 2 113 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 425 0 0
"3209" "exp3" 2 114 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 529 0 0
"3209" "exp3" 2 115 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 481 0 0
"3209" "exp3" 2 116 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 439 0 0
"3209" "exp3" 2 117 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 468 88 1
"3209" "exp3" 2 118 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 616 0 0
"3209" "exp3" 2 119 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 939 19 1
"3209" "exp3" 2 120 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 622 0 0
"3209" "exp3" 2 121 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 421 76 1
"3209" "exp3" 2 122 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 453 0 0
"3209" "exp3" 2 123 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 804 0 0
"3209" "exp3" 2 124 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1111 35 1
"3209" "exp3" 2 125 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 639 0 0
"3209" "exp3" 2 126 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 937 0 0
"3209" "exp3" 2 127 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 537 0 0
"3209" "exp3" 2 128 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 529 0 0
"3209" "exp3" 2 129 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1177 49 1
"3209" "exp3" 2 130 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 533 0 0
"3209" "exp3" 2 131 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 967 0 0
"3209" "exp3" 2 132 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 711 0 0
"3209" "exp3" 1 1 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 463 26 1
"3209" "exp3" 1 2 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 729 2 1
"3209" "exp3" 1 3 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 757 0 0
"3209" "exp3" 1 4 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 570 13 1
"3209" "exp3" 1 5 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 697 81 1
"3209" "exp3" 1 6 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 564 69 1
"3209" "exp3" 1 7 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 442 0 0
"3209" "exp3" 1 8 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 486 0 0
"3209" "exp3" 1 9 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 314 52 1
"3209" "exp3" 1 10 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 352 0 0
"3209" "exp3" 1 11 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 322 23 1
"3209" "exp3" 1 12 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 418 0 0
"3209" "exp3" 1 13 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 759 0 0
"3209" "exp3" 1 14 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 531 0 0
"3209" "exp3" 1 15 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 403 14 1
"3209" "exp3" 1 16 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 352 0 0
"3209" "exp3" 1 17 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 480 0 0
"3209" "exp3" 1 18 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 731 0 0
"3209" "exp3" 1 19 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 396 42 1
"3209" "exp3" 1 20 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 382 0 0
"3209" "exp3" 1 21 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 838 16 1
"3209" "exp3" 1 22 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 288 83 1
"3209" "exp3" 1 23 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 266 15 1
"3209" "exp3" 1 24 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 880 30 1
"3209" "exp3" 1 25 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 581 0 0
"3209" "exp3" 1 26 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 323 0 0
"3209" "exp3" 1 27 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 440 41 1
"3209" "exp3" 1 28 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 423 10 1
"3209" "exp3" 1 29 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 334 33 1
"3209" "exp3" 1 30 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 616 0 0
"3209" "exp3" 1 31 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 594 71 1
"3209" "exp3" 1 32 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 502 5 1
"3209" "exp3" 1 33 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 541 0 0
"3209" "exp3" 1 34 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 472 0 0
"3209" "exp3" 1 35 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 383 0 0
"3209" "exp3" 1 36 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 526 82 1
"3209" "exp3" 1 37 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 553 26 1
"3209" "exp3" 1 38 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 678 0 0
"3209" "exp3" 1 39 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 550 27 1
"3209" "exp3" 1 40 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 711 0 0
"3209" "exp3" 1 41 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 566 0 0
"3209" "exp3" 1 42 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 619 65 1
"3209" "exp3" 1 43 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 559 78 1
"3209" "exp3" 1 44 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 546 0 0
"3209" "exp3" 1 45 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 575 29 1
"3209" "exp3" 1 46 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 381 0 0
"3209" "exp3" 1 47 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 530 39 1
"3209" "exp3" 1 48 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 618 0 0
"3209" "exp3" 1 49 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 336 38 1
"3209" "exp3" 1 50 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 376 0 0
"3209" "exp3" 1 51 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 265 0 0
"3209" "exp3" 1 52 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 153 0 0
"3209" "exp3" 1 53 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 302 0 0
"3209" "exp3" 1 54 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 390 61 1
"3209" "exp3" 1 55 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 318 0 0
"3209" "exp3" 1 56 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 313 0 0
"3209" "exp3" 1 57 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 222 0 0
"3209" "exp3" 1 58 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 537 0 0
"3209" "exp3" 1 59 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 668 0 0
"3209" "exp3" 1 60 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 488 94 1
"3209" "exp3" 1 61 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 581 28 1
"3209" "exp3" 1 62 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 373 74 1
"3209" "exp3" 1 63 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 497 44 1
"3209" "exp3" 1 64 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 654 88 1
"3209" "exp3" 1 65 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 414 0 0
"3209" "exp3" 1 66 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 295 0 0
"3209" "exp3" 1 67 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 276 0 0
"3209" "exp3" 1 68 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 367 5 1
"3209" "exp3" 1 69 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 500 0 0
"3209" "exp3" 1 70 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 313 0 0
"3209" "exp3" 1 71 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 337 13 1
"3209" "exp3" 1 72 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 273 0 0
"3209" "exp3" 1 73 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 367 36 1
"3209" "exp3" 1 74 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 313 0 0
"3209" "exp3" 1 75 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 399 53 1
"3209" "exp3" 1 76 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 319 0 0
"3209" "exp3" 1 77 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 380 36 1
"3209" "exp3" 1 78 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 610 34 1
"3209" "exp3" 1 79 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 662 0 0
"3209" "exp3" 1 80 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 511 0 0
"3209" "exp3" 1 81 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 380 0 0
"3209" "exp3" 1 82 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 400 0 0
"3209" "exp3" 1 83 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 441 0 0
"3209" "exp3" 1 84 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 456 0 0
"3209" "exp3" 1 85 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 720 0 0
"3209" "exp3" 1 86 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 517 72 1
"3209" "exp3" 1 87 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 563 0 0
"3209" "exp3" 1 88 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 630 87 1
"3209" "exp3" 1 89 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 549 0 0
"3209" "exp3" 1 90 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 648 92 1
"3209" "exp3" 1 91 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 500 88 1
"3209" "exp3" 1 92 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 636 0 0
"3209" "exp3" 1 93 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 639 76 1
"3209" "exp3" 1 94 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 846 21 1
"3209" "exp3" 1 95 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 467 0 0
"3209" "exp3" 1 96 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 499 0 0
"3209" "exp3" 1 97 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 571 0 0
"3209" "exp3" 1 98 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 385 34 1
"3209" "exp3" 1 99 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 457 0 0
"3209" "exp3" 1 100 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 405 91 1
"3209" "exp3" 1 101 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 335 0 0
"3209" "exp3" 1 102 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 391 0 0
"3209" "exp3" 1 103 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 321 29 1
"3209" "exp3" 1 104 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 446 24 1
"3209" "exp3" 1 105 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 361 0 0
"3209" "exp3" 1 106 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 511 0 0
"3209" "exp3" 1 107 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 451 69 1
"3209" "exp3" 1 108 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 347 0 0
"3209" "exp3" 1 109 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 589 0 0
"3209" "exp3" 1 110 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 543 0 0
"3209" "exp3" 1 111 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 736 0 0
"3209" "exp3" 1 112 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 758 79 1
"3209" "exp3" 1 113 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 579 80 1
"3209" "exp3" 1 114 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 754 0 0
"3209" "exp3" 1 115 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 673 0 0
"3209" "exp3" 1 116 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 647 35 1
"3209" "exp3" 1 117 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 602 25 1
"3209" "exp3" 1 118 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 659 0 0
"3209" "exp3" 1 119 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 790 28 1
"3209" "exp3" 1 120 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 704 73 1
"3209" "exp3" 1 121 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 839 0 0
"3209" "exp3" 1 122 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 489 77 1
"3209" "exp3" 1 123 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 551 19 1
"3209" "exp3" 1 124 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 523 0 0
"3209" "exp3" 1 125 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 653 57 1
"3209" "exp3" 1 126 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 651 43 1
"3209" "exp3" 1 127 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 626 21 1
"3209" "exp3" 1 128 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 846 0 0
"3209" "exp3" 1 129 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 504 32 1
"3209" "exp3" 1 130 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 924 82 1
"3209" "exp3" 1 131 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 774 0 0
"3209" "exp3" 1 132 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 518 30 1
"3209" "exp3" 2 1 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 611 0 0
"3209" "exp3" 2 2 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 477 43 1
"3209" "exp3" 2 3 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 490 0 0
"3209" "exp3" 2 4 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 384 80 1
"3209" "exp3" 2 5 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1135 0 0
"3209" "exp3" 2 6 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 716 32 1
"3209" "exp3" 2 7 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 870 33 1
"3209" "exp3" 2 8 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 546 0 0
"3209" "exp3" 2 9 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 606 76 1
"3209" "exp3" 2 10 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 815 34 1
"3209" "exp3" 2 11 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 837 0 0
"3209" "exp3" 2 12 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 824 80 1
"3209" "exp3" 2 13 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 963 32 1
"3209" "exp3" 2 14 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1212 0 0
"3209" "exp3" 2 15 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 953 0 0
"3209" "exp3" 2 16 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 861 0 0
"3209" "exp3" 2 17 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 486 85 1
"3209" "exp3" 2 18 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 541 0 0
"3209" "exp3" 2 19 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 742 0 0
"3209" "exp3" 2 20 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 582 79 1
"3209" "exp3" 2 21 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 552 0 0
"3209" "exp3" 2 22 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 679 0 0
"3209" "exp3" 2 23 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 569 0 0
"3209" "exp3" 2 24 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1138 0 0
"3209" "exp3" 2 25 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 897 0 0
"3209" "exp3" 2 26 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 529 38 1
"3209" "exp3" 2 27 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 554 0 0
"3209" "exp3" 2 28 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 552 0 0
"3209" "exp3" 2 29 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 732 71 1
"3209" "exp3" 2 30 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 552 76 1
"3209" "exp3" 2 31 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 589 0 0
"3209" "exp3" 2 32 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 551 0 0
"3209" "exp3" 2 33 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 788 0 0
"3209" "exp3" 2 34 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 801 27 1
"3209" "exp3" 2 35 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1264 44 1
"3209" "exp3" 2 36 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 601 35 1
"3209" "exp3" 2 37 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 881 32 1
"3209" "exp3" 2 38 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 797 0 0
"3209" "exp3" 2 39 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 597 0 0
"3209" "exp3" 2 40 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 522 0 0
"3209" "exp3" 2 41 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 484 0 0
"3209" "exp3" 2 42 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 788 47 1
"3209" "exp3" 2 43 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 798 17 1
"3209" "exp3" 2 44 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 698 0 0
"3209" "exp3" 2 45 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 574 0 0
"3209" "exp3" 2 46 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 506 22 1
"3209" "exp3" 2 47 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 459 0 0
"3209" "exp3" 2 48 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1149 0 0
"3209" "exp3" 2 49 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 924 0 0
"3209" "exp3" 2 50 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 732 33 1
"3209" "exp3" 2 51 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 586 0 0
"3209" "exp3" 2 52 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 563 0 0
"3209" "exp3" 2 53 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 834 0 0
"3209" "exp3" 2 54 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 867 0 0
"3209" "exp3" 2 55 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 1137 67 1
"3209" "exp3" 2 56 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 1087 0 0
"3209" "exp3" 2 57 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 620 24 1
"3209" "exp3" 2 58 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 631 0 0
"3209" "exp3" 2 59 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 620 0 0
"3209" "exp3" 2 60 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 575 36 1
"3209" "exp3" 2 61 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 606 0 0
"3209" "exp3" 2 62 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 1219 0 0
"3209" "exp3" 2 63 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 775 0 0
"3209" "exp3" 2 64 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 626 63 1
"3209" "exp3" 2 65 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 848 0 0
"3209" "exp3" 2 66 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 588 74 1
"3209" "exp3" 2 67 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 606 29 1
"3209" "exp3" 2 68 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 510 0 0
"3209" "exp3" 2 69 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 992 83 1
"3209" "exp3" 2 70 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 502 35 1
"3209" "exp3" 2 71 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 957 89 1
"3209" "exp3" 2 72 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 659 0 0
"3209" "exp3" 2 73 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 475 18 1
"3209" "exp3" 2 74 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 455 0 0
"3209" "exp3" 2 75 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 421 0 0
"3209" "exp3" 2 76 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 442 0 0
"3209" "exp3" 2 77 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 439 0 0
"3209" "exp3" 2 78 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 958 0 0
"3209" "exp3" 2 79 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 612 19 1
"3209" "exp3" 2 80 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 629 0 0
"3209" "exp3" 2 81 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 324 26 1
"3209" "exp3" 2 82 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 330 0 0
"3209" "exp3" 2 83 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 383 23 1
"3209" "exp3" 2 84 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 540 19 1
"3209" "exp3" 2 85 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 439 0 0
"3209" "exp3" 2 86 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 657 85 1
"3209" "exp3" 2 87 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 525 0 0
"3209" "exp3" 2 88 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 634 39 1
"3209" "exp3" 2 89 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 464 0 0
"3209" "exp3" 2 90 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 438 0 0
"3209" "exp3" 2 91 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 576 0 0
"3209" "exp3" 2 92 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 484 20 1
"3209" "exp3" 2 93 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 599 0 0
"3209" "exp3" 2 94 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 953 0 0
"3209" "exp3" 2 95 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 726 0 0
"3209" "exp3" 2 96 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 706 0 0
"3209" "exp3" 2 97 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 469 0 0
"3209" "exp3" 2 98 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 992 64 1
"3209" "exp3" 2 99 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 630 0 0
"3209" "exp3" 2 100 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 722 0 0
"3209" "exp3" 2 101 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 827 0 0
"3209" "exp3" 2 102 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 649 0 0
"3209" "exp3" 2 103 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 549 0 0
"3209" "exp3" 2 104 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 659 0 0
"3209" "exp3" 2 105 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 511 0 0
"3209" "exp3" 2 106 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 732 16 1
"3209" "exp3" 2 107 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 476 59 1
"3209" "exp3" 2 108 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 741 0 0
"3209" "exp3" 2 109 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 666 0 0
"3209" "exp3" 2 110 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 731 0 0
"3209" "exp3" 2 111 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 892 0 0
"3209" "exp3" 2 112 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 546 0 0
"3209" "exp3" 2 113 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 402 0 0
"3209" "exp3" 2 114 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 386 0 0
"3209" "exp3" 2 115 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 396 42 1
"3209" "exp3" 2 116 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 331 26 1
"3209" "exp3" 2 117 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 556 0 0
"3209" "exp3" 2 118 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 426 84 1
"3209" "exp3" 2 119 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 920 65 1
"3209" "exp3" 2 120 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 350 31 1
"3209" "exp3" 2 121 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 382 0 0
"3209" "exp3" 2 122 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 519 0 0
"3209" "exp3" 2 123 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 603 28 1
"3209" "exp3" 2 124 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 340 8 1
"3209" "exp3" 2 125 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 485 0 0
"3209" "exp3" 2 126 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 385 77 1
"3209" "exp3" 2 127 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 460 34 1
"3209" "exp3" 2 128 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 436 80 1
"3209" "exp3" 2 129 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 518 0 0
"3209" "exp3" 2 130 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 542 27 1
"3209" "exp3" 2 131 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 820 57 1
"3209" "exp3" 2 132 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 620 0 0
"3210" "exp3" 1 1 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 2487 0 0
"3210" "exp3" 1 2 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1113 23 1
"3210" "exp3" 1 3 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1323 12 1
"3210" "exp3" 1 4 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 3195 43 1
"3210" "exp3" 1 5 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2444 0 0
"3210" "exp3" 1 6 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1393 15 1
"3210" "exp3" 1 7 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 2045 0 0
"3210" "exp3" 1 8 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2757 0 0
"3210" "exp3" 1 9 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1173 13 1
"3210" "exp3" 1 10 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2485 0 0
"3210" "exp3" 1 11 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1175 19 1
"3210" "exp3" 1 12 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1094 0 0
"3210" "exp3" 1 13 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2021 40 1
"3210" "exp3" 1 14 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2458 18 1
"3210" "exp3" 1 15 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 775 0 0
"3210" "exp3" 1 16 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1159 17 1
"3210" "exp3" 1 17 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 863 8 1
"3210" "exp3" 1 18 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 663 16 1
"3210" "exp3" 1 19 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 477 0 0
"3210" "exp3" 1 20 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 433 19 1
"3210" "exp3" 1 21 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1477 37 1
"3210" "exp3" 1 22 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2546 31 1
"3210" "exp3" 1 23 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1993 0 0
"3210" "exp3" 1 24 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 701 28 1
"3210" "exp3" 1 25 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1899 9 1
"3210" "exp3" 1 26 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 965 41 1
"3210" "exp3" 1 27 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 2853 24 1
"3210" "exp3" 1 28 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1402 0 0
"3210" "exp3" 1 29 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 2592 0 0
"3210" "exp3" 1 30 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 811 14 1
"3210" "exp3" 1 31 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1185 19 1
"3210" "exp3" 1 32 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 4905 27 1
"3210" "exp3" 1 33 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 773 14 1
"3210" "exp3" 1 34 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 792 1 1
"3210" "exp3" 1 35 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1647 0 0
"3210" "exp3" 1 36 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2428 43 1
"3210" "exp3" 1 37 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1008 0 0
"3210" "exp3" 1 38 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 4792 6 1
"3210" "exp3" 1 39 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 2667 33 1
"3210" "exp3" 1 40 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1092 36 1
"3210" "exp3" 1 41 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 1386 2 1
"3210" "exp3" 1 42 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 985 29 1
"3210" "exp3" 1 43 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 4382 94 1
"3210" "exp3" 1 44 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1742 82 1
"3210" "exp3" 1 45 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1934 42 1
"3210" "exp3" 1 46 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 1265 5 1
"3210" "exp3" 1 47 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1754 22 1
"3210" "exp3" 1 48 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 755 0 0
"3210" "exp3" 1 49 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1716 0 0
"3210" "exp3" 1 50 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 1471 4 1
"3210" "exp3" 1 51 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 585 0 0
"3210" "exp3" 1 52 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 618 11 1
"3210" "exp3" 1 53 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 4659 35 1
"3210" "exp3" 1 54 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 889 35 1
"3210" "exp3" 1 55 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1278 20 1
"3210" "exp3" 1 56 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1557 22 1
"3210" "exp3" 1 57 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1751 32 1
"3210" "exp3" 1 58 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 763 46 1
"3210" "exp3" 1 59 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2994 25 1
"3210" "exp3" 1 60 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 735 24 1
"3210" "exp3" 1 61 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 482 0 0
"3210" "exp3" 1 62 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1241 40 1
"3210" "exp3" 1 63 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 992 31 1
"3210" "exp3" 1 64 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1276 26 1
"3210" "exp3" 1 65 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 891 10 1
"3210" "exp3" 1 66 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1236 49 1
"3210" "exp3" 1 67 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 2173 25 1
"3210" "exp3" 1 68 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1151 20 1
"3210" "exp3" 1 69 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 871 27 1
"3210" "exp3" 1 70 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1417 21 1
"3210" "exp3" 1 71 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 543 29 1
"3210" "exp3" 1 72 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 841 38 1
"3210" "exp3" 1 73 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2259 0 0
"3210" "exp3" 1 74 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 2362 74 1
"3210" "exp3" 1 75 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 934 3 1
"3210" "exp3" 1 76 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1317 36 1
"3210" "exp3" 1 77 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1547 0 0
"3210" "exp3" 1 78 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1025 24 1
"3210" "exp3" 1 79 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1659 0 0
"3210" "exp3" 1 80 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 2558 0 0
"3210" "exp3" 1 81 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 3880 0 0
"3210" "exp3" 1 82 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 966 0 0
"3210" "exp3" 1 83 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1018 44 1
"3210" "exp3" 1 84 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1802 33 1
"3210" "exp3" 1 85 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 876 27 1
"3210" "exp3" 1 86 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1589 16 1
"3210" "exp3" 1 87 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 2316 0 0
"3210" "exp3" 1 88 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 3316 0 0
"3210" "exp3" 1 89 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2642 0 0
"3210" "exp3" 1 90 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1944 27 1
"3210" "exp3" 1 91 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 827 22 1
"3210" "exp3" 1 92 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 7350 16 1
"3210" "exp3" 1 93 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 955 0 0
"3210" "exp3" 1 94 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2430 0 0
"3210" "exp3" 1 95 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 2209 0 0
"3210" "exp3" 1 96 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2239 29 1
"3210" "exp3" 1 97 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 2870 13 1
"3210" "exp3" 1 98 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 2086 0 0
"3210" "exp3" 1 99 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 977 77 1
"3210" "exp3" 1 100 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 489 77 1
"3210" "exp3" 1 101 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1644 0 0
"3210" "exp3" 1 102 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 2257 0 0
"3210" "exp3" 1 103 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 5265 23 1
"3210" "exp3" 1 104 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 2511 30 1
"3210" "exp3" 1 105 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 3033 35 1
"3210" "exp3" 1 106 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 826 15 1
"3210" "exp3" 1 107 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1577 86 1
"3210" "exp3" 1 108 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 3187 82 1
"3210" "exp3" 1 109 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1642 0 0
"3210" "exp3" 1 110 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1368 28 1
"3210" "exp3" 1 111 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1904 80 1
"3210" "exp3" 1 112 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 1231 0 0
"3210" "exp3" 1 113 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 2257 30 1
"3210" "exp3" 1 114 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 2470 32 1
"3210" "exp3" 1 115 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1278 0 0
"3210" "exp3" 1 116 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 2834 37 1
"3210" "exp3" 1 117 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1404 28 1
"3210" "exp3" 1 118 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1092 29 1
"3210" "exp3" 1 119 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 748 47 1
"3210" "exp3" 1 120 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1108 30 1
"3210" "exp3" 1 121 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 569 32 1
"3210" "exp3" 1 122 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 1024 7 1
"3210" "exp3" 1 123 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1460 48 1
"3210" "exp3" 1 124 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 4137 70 1
"3210" "exp3" 1 125 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 3032 0 0
"3210" "exp3" 1 126 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 7343 0 0
"3210" "exp3" 1 127 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1428 21 1
"3210" "exp3" 1 128 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1868 10 1
"3210" "exp3" 1 129 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 1490 75 1
"3210" "exp3" 1 130 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1041 45 1
"3210" "exp3" 1 131 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1153 45 1
"3210" "exp3" 1 132 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 3236 15 1
"3210" "exp3" 2 1 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1932 0 0
"3210" "exp3" 2 2 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 992 18 1
"3210" "exp3" 2 3 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 946 0 0
"3210" "exp3" 2 4 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 717 28 1
"3210" "exp3" 2 5 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1906 0 0
"3210" "exp3" 2 6 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1686 0 0
"3210" "exp3" 2 7 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 1817 0 0
"3210" "exp3" 2 8 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1619 0 0
"3210" "exp3" 2 9 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1187 30 1
"3210" "exp3" 2 10 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1089 0 0
"3210" "exp3" 2 11 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1040 22 1
"3210" "exp3" 2 12 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1079 0 0
"3210" "exp3" 2 13 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1137 21 1
"3210" "exp3" 2 14 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1336 0 0
"3210" "exp3" 2 15 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 1611 0 0
"3210" "exp3" 2 16 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 2215 26 1
"3210" "exp3" 2 17 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 846 45 1
"3210" "exp3" 2 18 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1075 33 1
"3210" "exp3" 2 19 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1341 31 1
"3210" "exp3" 2 20 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2009 0 0
"3210" "exp3" 2 21 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1759 8 1
"3210" "exp3" 2 22 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1108 35 1
"3210" "exp3" 2 23 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1558 0 0
"3210" "exp3" 2 24 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1254 22 1
"3210" "exp3" 2 25 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 2568 29 1
"3210" "exp3" 2 26 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1284 88 1
"3210" "exp3" 2 27 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 3384 0 0
"3210" "exp3" 2 28 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1349 19 1
"3210" "exp3" 2 29 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1070 24 1
"3210" "exp3" 2 30 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 918 0 0
"3210" "exp3" 2 31 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 547 34 1
"3210" "exp3" 2 32 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1903 0 0
"3210" "exp3" 2 33 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1321 0 0
"3210" "exp3" 2 34 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1511 29 1
"3210" "exp3" 2 35 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2905 17 1
"3210" "exp3" 2 36 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1668 0 0
"3210" "exp3" 2 37 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 961 37 1
"3210" "exp3" 2 38 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1790 80 1
"3210" "exp3" 2 39 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1285 24 1
"3210" "exp3" 2 40 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 904 25 1
"3210" "exp3" 2 41 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 585 38 1
"3210" "exp3" 2 42 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 830 27 1
"3210" "exp3" 2 43 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1719 34 1
"3210" "exp3" 2 44 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1518 0 0
"3210" "exp3" 2 45 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1757 28 1
"3210" "exp3" 2 46 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1174 38 1
"3210" "exp3" 2 47 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1120 0 0
"3210" "exp3" 2 48 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1190 43 1
"3210" "exp3" 2 49 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1386 0 0
"3210" "exp3" 2 50 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1762 42 1
"3210" "exp3" 2 51 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 2115 0 0
"3210" "exp3" 2 52 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 982 26 1
"3210" "exp3" 2 53 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1004 0 0
"3210" "exp3" 2 54 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 919 44 1
"3210" "exp3" 2 55 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 3473 0 0
"3210" "exp3" 2 56 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1292 0 0
"3210" "exp3" 2 57 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1298 0 0
"3210" "exp3" 2 58 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1981 27 1
"3210" "exp3" 2 59 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 1705 16 1
"3210" "exp3" 2 60 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1751 28 1
"3210" "exp3" 2 61 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2022 0 0
"3210" "exp3" 2 62 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1503 0 0
"3210" "exp3" 2 63 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2033 25 1
"3210" "exp3" 2 64 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1414 19 1
"3210" "exp3" 2 65 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1803 31 1
"3210" "exp3" 2 66 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1130 27 1
"3210" "exp3" 2 67 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1951 0 0
"3210" "exp3" 2 68 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1765 23 1
"3210" "exp3" 2 69 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 3625 14 1
"3210" "exp3" 2 70 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 939 34 1
"3210" "exp3" 2 71 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 848 26 1
"3210" "exp3" 2 72 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 783 10 1
"3210" "exp3" 2 73 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 773 45 1
"3210" "exp3" 2 74 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 490 13 1
"3210" "exp3" 2 75 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1444 24 1
"3210" "exp3" 2 76 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1116 0 0
"3210" "exp3" 2 77 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 5666 0 0
"3210" "exp3" 2 78 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 4723 0 0
"3210" "exp3" 2 79 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1516 0 0
"3210" "exp3" 2 80 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1033 25 1
"3210" "exp3" 2 81 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1232 39 1
"3210" "exp3" 2 82 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 837 28 1
"3210" "exp3" 2 83 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 852 0 0
"3210" "exp3" 2 84 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1118 35 1
"3210" "exp3" 2 85 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 2051 0 0
"3210" "exp3" 2 86 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2314 0 0
"3210" "exp3" 2 87 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1449 32 1
"3210" "exp3" 2 88 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 5216 0 0
"3210" "exp3" 2 89 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1327 37 1
"3210" "exp3" 2 90 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1444 29 1
"3210" "exp3" 2 91 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 896 25 1
"3210" "exp3" 2 92 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 3969 0 0
"3210" "exp3" 2 93 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 1770 0 0
"3210" "exp3" 2 94 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 1314 0 0
"3210" "exp3" 2 95 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1559 36 1
"3210" "exp3" 2 96 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1398 0 0
"3210" "exp3" 2 97 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1091 23 1
"3210" "exp3" 2 98 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1015 42 1
"3210" "exp3" 2 99 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 3124 0 0
"3210" "exp3" 2 100 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 985 0 0
"3210" "exp3" 2 101 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1004 44 1
"3210" "exp3" 2 102 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 969 0 0
"3210" "exp3" 2 103 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 735 29 1
"3210" "exp3" 2 104 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 733 26 1
"3210" "exp3" 2 105 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1736 43 1
"3210" "exp3" 2 106 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1413 0 0
"3210" "exp3" 2 107 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 2085 94 1
"3210" "exp3" 2 108 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1677 31 1
"3210" "exp3" 2 109 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 8172 78 1
"3210" "exp3" 2 110 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 2386 0 0
"3210" "exp3" 2 111 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1162 21 1
"3210" "exp3" 2 112 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2097 0 0
"3210" "exp3" 2 113 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1474 0 0
"3210" "exp3" 2 114 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2416 68 1
"3210" "exp3" 2 115 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 2441 0 0
"3210" "exp3" 2 116 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 2017 37 1
"3210" "exp3" 2 117 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 811 17 1
"3210" "exp3" 2 118 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1388 39 1
"3210" "exp3" 2 119 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2063 67 1
"3210" "exp3" 2 120 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 955 0 0
"3210" "exp3" 2 121 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1091 0 0
"3210" "exp3" 2 122 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1186 20 1
"3210" "exp3" 2 123 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 4406 0 0
"3210" "exp3" 2 124 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1113 36 1
"3210" "exp3" 2 125 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1307 14 1
"3210" "exp3" 2 126 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1384 11 1
"3210" "exp3" 2 127 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1015 18 1
"3210" "exp3" 2 128 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 4967 0 0
"3210" "exp3" 2 129 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2002 0 0
"3210" "exp3" 2 130 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1137 0 0
"3210" "exp3" 2 131 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1454 0 0
"3210" "exp3" 2 132 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 3820 31 1
"3210" "exp3" 1 1 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1054 0 0
"3210" "exp3" 1 2 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1831 10 1
"3210" "exp3" 1 3 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 713 27 1
"3210" "exp3" 1 4 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1607 0 0
"3210" "exp3" 1 5 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 2871 37 1
"3210" "exp3" 1 6 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 2527 0 0
"3210" "exp3" 1 7 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 2173 20 1
"3210" "exp3" 1 8 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1142 0 0
"3210" "exp3" 1 9 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 1994 6 1
"3210" "exp3" 1 10 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1569 0 0
"3210" "exp3" 1 11 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1715 0 0
"3210" "exp3" 1 12 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 610 0 0
"3210" "exp3" 1 13 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1031 21 1
"3210" "exp3" 1 14 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1079 56 1
"3210" "exp3" 1 15 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1769 48 1
"3210" "exp3" 1 16 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1283 16 1
"3210" "exp3" 1 17 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1708 8 1
"3210" "exp3" 1 18 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 974 23 1
"3210" "exp3" 1 19 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1296 28 1
"3210" "exp3" 1 20 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1041 0 0
"3210" "exp3" 1 21 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 1737 0 0
"3210" "exp3" 1 22 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2199 0 0
"3210" "exp3" 1 23 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 2136 0 0
"3210" "exp3" 1 24 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 589 13 1
"3210" "exp3" 1 25 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1832 0 0
"3210" "exp3" 1 26 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1441 31 1
"3210" "exp3" 1 27 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 701 22 1
"3210" "exp3" 1 28 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 672 21 1
"3210" "exp3" 1 29 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1309 0 0
"3210" "exp3" 1 30 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 2644 55 1
"3210" "exp3" 1 31 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1372 21 1
"3210" "exp3" 1 32 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1532 12 1
"3210" "exp3" 1 33 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 647 0 0
"3210" "exp3" 1 34 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 997 0 0
"3210" "exp3" 1 35 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 567 0 0
"3210" "exp3" 1 36 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 671 0 0
"3210" "exp3" 1 37 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 929 0 0
"3210" "exp3" 1 38 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 601 14 1
"3210" "exp3" 1 39 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 2191 43 1
"3210" "exp3" 1 40 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1611 0 0
"3210" "exp3" 1 41 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1671 32 1
"3210" "exp3" 1 42 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1209 0 0
"3210" "exp3" 1 43 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1235 0 0
"3210" "exp3" 1 44 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 3543 63 1
"3210" "exp3" 1 45 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1707 0 0
"3210" "exp3" 1 46 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1087 0 0
"3210" "exp3" 1 47 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2527 87 1
"3210" "exp3" 1 48 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1324 0 0
"3210" "exp3" 1 49 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 532 47 1
"3210" "exp3" 1 50 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 658 24 1
"3210" "exp3" 1 51 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 620 25 1
"3210" "exp3" 1 52 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 660 16 1
"3210" "exp3" 1 53 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 730 0 0
"3210" "exp3" 1 54 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 678 17 1
"3210" "exp3" 1 55 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1343 35 1
"3210" "exp3" 1 56 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1044 20 1
"3210" "exp3" 1 57 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 1528 0 0
"3210" "exp3" 1 58 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1310 0 0
"3210" "exp3" 1 59 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 589 0 0
"3210" "exp3" 1 60 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 769 6 1
"3210" "exp3" 1 61 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1299 0 0
"3210" "exp3" 1 62 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1362 0 0
"3210" "exp3" 1 63 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 2337 24 1
"3210" "exp3" 1 64 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 629 19 1
"3210" "exp3" 1 65 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1778 42 1
"3210" "exp3" 1 66 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1513 93 1
"3210" "exp3" 1 67 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1196 0 0
"3210" "exp3" 1 68 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 4599 42 1
"3210" "exp3" 1 69 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1424 14 1
"3210" "exp3" 1 70 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1179 31 1
"3210" "exp3" 1 71 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1759 12 1
"3210" "exp3" 1 72 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 902 15 1
"3210" "exp3" 1 73 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 778 20 1
"3210" "exp3" 1 74 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 2203 0 0
"3210" "exp3" 1 75 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1248 0 0
"3210" "exp3" 1 76 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2391 23 1
"3210" "exp3" 1 77 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 2074 0 0
"3210" "exp3" 1 78 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 608 33 1
"3210" "exp3" 1 79 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 2015 24 1
"3210" "exp3" 1 80 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 2356 36 1
"3210" "exp3" 1 81 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1641 0 0
"3210" "exp3" 1 82 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1698 64 1
"3210" "exp3" 1 83 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 3691 23 1
"3210" "exp3" 1 84 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1897 0 0
"3210" "exp3" 1 85 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1339 0 0
"3210" "exp3" 1 86 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1097 31 1
"3210" "exp3" 1 87 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 953 17 1
"3210" "exp3" 1 88 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 636 32 1
"3210" "exp3" 1 89 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1944 0 0
"3210" "exp3" 1 90 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1356 0 0
"3210" "exp3" 1 91 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1066 19 1
"3210" "exp3" 1 92 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 679 19 1
"3210" "exp3" 1 93 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 869 18 1
"3210" "exp3" 1 94 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 500 7 1
"3210" "exp3" 1 95 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 1316 3 1
"3210" "exp3" 1 96 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1365 28 1
"3210" "exp3" 1 97 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1094 0 0
"3210" "exp3" 1 98 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1613 15 1
"3210" "exp3" 1 99 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 562 9 1
"3210" "exp3" 1 100 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1061 75 1
"3210" "exp3" 1 101 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1796 0 0
"3210" "exp3" 1 102 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1320 18 1
"3210" "exp3" 1 103 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 1931 5 1
"3210" "exp3" 1 104 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1648 0 0
"3210" "exp3" 1 105 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1484 55 1
"3210" "exp3" 1 106 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 2858 25 1
"3210" "exp3" 1 107 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1244 0 0
"3210" "exp3" 1 108 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1198 0 0
"3210" "exp3" 1 109 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1997 0 0
"3210" "exp3" 1 110 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1011 26 1
"3210" "exp3" 1 111 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 953 0 0
"3210" "exp3" 1 112 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 498 5 1
"3210" "exp3" 1 113 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 576 0 0
"3210" "exp3" 1 114 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 2225 0 0
"3210" "exp3" 1 115 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1244 34 1
"3210" "exp3" 1 116 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1621 15 1
"3210" "exp3" 1 117 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 613 0 0
"3210" "exp3" 1 118 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1617 24 1
"3210" "exp3" 1 119 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 900 14 1
"3210" "exp3" 1 120 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1460 39 1
"3210" "exp3" 1 121 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 874 35 1
"3210" "exp3" 1 122 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 1168 2 1
"3210" "exp3" 1 123 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 666 22 1
"3210" "exp3" 1 124 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 738 26 1
"3210" "exp3" 1 125 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1267 0 0
"3210" "exp3" 1 126 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1640 77 1
"3210" "exp3" 1 127 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1336 0 0
"3210" "exp3" 1 128 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1246 0 0
"3210" "exp3" 1 129 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 861 22 1
"3210" "exp3" 1 130 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1201 0 0
"3210" "exp3" 1 131 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1779 0 0
"3210" "exp3" 1 132 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 2047 34 1
"3210" "exp3" 2 1 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 763 9 1
"3210" "exp3" 2 2 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1143 0 0
"3210" "exp3" 2 3 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 518 22 1
"3210" "exp3" 2 4 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 690 22 1
"3210" "exp3" 2 5 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 1243 5 1
"3210" "exp3" 2 6 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 567 0 0
"3210" "exp3" 2 7 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 858 16 1
"3210" "exp3" 2 8 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1896 0 0
"3210" "exp3" 2 9 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1178 0 0
"3210" "exp3" 2 10 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 903 0 0
"3210" "exp3" 2 11 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 808 22 1
"3210" "exp3" 2 12 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 588 32 1
"3210" "exp3" 2 13 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 532 0 0
"3210" "exp3" 2 14 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 843 0 0
"3210" "exp3" 2 15 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 654 36 1
"3210" "exp3" 2 16 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 338 0 0
"3210" "exp3" 2 17 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 492 0 0
"3210" "exp3" 2 18 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 2030 12 1
"3210" "exp3" 2 19 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 1392 0 0
"3210" "exp3" 2 20 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1773 0 0
"3210" "exp3" 2 21 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 2221 17 1
"3210" "exp3" 2 22 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1535 0 0
"3210" "exp3" 2 23 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1822 0 0
"3210" "exp3" 2 24 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1407 26 1
"3210" "exp3" 2 25 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 758 29 1
"3210" "exp3" 2 26 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1175 23 1
"3210" "exp3" 2 27 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 532 0 0
"3210" "exp3" 2 28 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1197 46 1
"3210" "exp3" 2 29 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1134 44 1
"3210" "exp3" 2 30 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 1559 0 0
"3210" "exp3" 2 31 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1170 21 1
"3210" "exp3" 2 32 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 915 0 0
"3210" "exp3" 2 33 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 561 0 0
"3210" "exp3" 2 34 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 635 30 1
"3210" "exp3" 2 35 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 929 20 1
"3210" "exp3" 2 36 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 961 20 1
"3210" "exp3" 2 37 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 868 0 0
"3210" "exp3" 2 38 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1113 14 1
"3210" "exp3" 2 39 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 699 14 1
"3210" "exp3" 2 40 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1983 0 0
"3210" "exp3" 2 41 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1133 26 1
"3210" "exp3" 2 42 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1263 0 0
"3210" "exp3" 2 43 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1299 69 1
"3210" "exp3" 2 44 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 1054 52 1
"3210" "exp3" 2 45 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 4616 25 1
"3210" "exp3" 2 46 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 916 24 1
"3210" "exp3" 2 47 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 666 18 1
"3210" "exp3" 2 48 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2278 0 0
"3210" "exp3" 2 49 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 872 9 1
"3210" "exp3" 2 50 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1089 8 1
"3210" "exp3" 2 51 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1542 43 1
"3210" "exp3" 2 52 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1044 20 1
"3210" "exp3" 2 53 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1299 35 1
"3210" "exp3" 2 54 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 1639 67 1
"3210" "exp3" 2 55 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1063 0 0
"3210" "exp3" 2 56 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 598 7 1
"3210" "exp3" 2 57 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1711 0 0
"3210" "exp3" 2 58 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 948 0 0
"3210" "exp3" 2 59 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 758 7 1
"3210" "exp3" 2 60 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1511 24 1
"3210" "exp3" 2 61 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1694 37 1
"3210" "exp3" 2 62 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 674 0 0
"3210" "exp3" 2 63 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1128 11 1
"3210" "exp3" 2 64 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1040 0 0
"3210" "exp3" 2 65 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1424 0 0
"3210" "exp3" 2 66 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1382 40 1
"3210" "exp3" 2 67 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1332 0 0
"3210" "exp3" 2 68 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 804 42 1
"3210" "exp3" 2 69 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2177 0 0
"3210" "exp3" 2 70 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 837 3 1
"3210" "exp3" 2 71 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1109 34 1
"3210" "exp3" 2 72 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 761 0 0
"3210" "exp3" 2 73 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1061 18 1
"3210" "exp3" 2 74 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1077 32 1
"3210" "exp3" 2 75 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 892 0 0
"3210" "exp3" 2 76 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 2066 0 0
"3210" "exp3" 2 77 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 970 13 1
"3210" "exp3" 2 78 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 773 30 1
"3210" "exp3" 2 79 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 822 0 0
"3210" "exp3" 2 80 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1525 0 0
"3210" "exp3" 2 81 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1040 0 0
"3210" "exp3" 2 82 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 660 16 1
"3210" "exp3" 2 83 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 898 0 0
"3210" "exp3" 2 84 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 746 17 1
"3210" "exp3" 2 85 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1448 27 1
"3210" "exp3" 2 86 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1041 29 1
"3210" "exp3" 2 87 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 483 8 1
"3210" "exp3" 2 88 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1278 20 1
"3210" "exp3" 2 89 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1896 60 1
"3210" "exp3" 2 90 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 729 19 1
"3210" "exp3" 2 91 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1656 0 0
"3210" "exp3" 2 92 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 685 0 0
"3210" "exp3" 2 93 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1391 15 1
"3210" "exp3" 2 94 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 516 19 1
"3210" "exp3" 2 95 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 461 11 1
"3210" "exp3" 2 96 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 849 24 1
"3210" "exp3" 2 97 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1112 17 1
"3210" "exp3" 2 98 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 929 34 1
"3210" "exp3" 2 99 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 746 25 1
"3210" "exp3" 2 100 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 643 44 1
"3210" "exp3" 2 101 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 681 0 0
"3210" "exp3" 2 102 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1035 0 0
"3210" "exp3" 2 103 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 473 21 1
"3210" "exp3" 2 104 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 383 17 1
"3210" "exp3" 2 105 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 522 29 1
"3210" "exp3" 2 106 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 867 10 1
"3210" "exp3" 2 107 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1158 41 1
"3210" "exp3" 2 108 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1051 31 1
"3210" "exp3" 2 109 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 2107 0 0
"3210" "exp3" 2 110 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 966 23 1
"3210" "exp3" 2 111 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 893 15 1
"3210" "exp3" 2 112 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 400 25 1
"3210" "exp3" 2 113 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 597 0 0
"3210" "exp3" 2 114 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 588 0 0
"3210" "exp3" 2 115 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 585 38 1
"3210" "exp3" 2 116 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1076 0 0
"3210" "exp3" 2 117 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 986 26 1
"3210" "exp3" 2 118 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1133 0 0
"3210" "exp3" 2 119 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 937 33 1
"3210" "exp3" 2 120 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 857 0 0
"3210" "exp3" 2 121 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 747 21 1
"3210" "exp3" 2 122 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 653 15 1
"3210" "exp3" 2 123 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 492 22 1
"3210" "exp3" 2 124 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 569 0 0
"3210" "exp3" 2 125 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1589 72 1
"3210" "exp3" 2 126 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1146 28 1
"3210" "exp3" 2 127 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 4581 0 0
"3210" "exp3" 2 128 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 950 27 1
"3210" "exp3" 2 129 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 574 30 1
"3210" "exp3" 2 130 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 651 13 1
"3210" "exp3" 2 131 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1060 77 1
"3210" "exp3" 2 132 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1686 0 0
"3210" "exp3" 1 1 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1489 25 1
"3210" "exp3" 1 2 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1046 35 1
"3210" "exp3" 1 3 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 627 22 1
"3210" "exp3" 1 4 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1702 17 1
"3210" "exp3" 1 5 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2692 38 1
"3210" "exp3" 1 6 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1077 0 0
"3210" "exp3" 1 7 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1983 0 0
"3210" "exp3" 1 8 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 873 0 0
"3210" "exp3" 1 9 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1368 32 1
"3210" "exp3" 1 10 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2221 13 1
"3210" "exp3" 1 11 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 2798 0 0
"3210" "exp3" 1 12 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1788 0 0
"3210" "exp3" 1 13 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1950 94 1
"3210" "exp3" 1 14 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 912 0 0
"3210" "exp3" 1 15 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 768 11 1
"3210" "exp3" 1 16 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 810 35 1
"3210" "exp3" 1 17 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 2165 17 1
"3210" "exp3" 1 18 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 979 19 1
"3210" "exp3" 1 19 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1109 34 1
"3210" "exp3" 1 20 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 920 37 1
"3210" "exp3" 1 21 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2163 44 1
"3210" "exp3" 1 22 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1694 0 0
"3210" "exp3" 1 23 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 2907 0 0
"3210" "exp3" 1 24 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1129 23 1
"3210" "exp3" 1 25 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1350 30 1
"3210" "exp3" 1 26 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 2021 42 1
"3210" "exp3" 1 27 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 956 27 1
"3210" "exp3" 1 28 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 601 23 1
"3210" "exp3" 1 29 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1141 17 1
"3210" "exp3" 1 30 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1429 0 0
"3210" "exp3" 1 31 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1055 0 0
"3210" "exp3" 1 32 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1246 26 1
"3210" "exp3" 1 33 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1705 0 0
"3210" "exp3" 1 34 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 2223 16 1
"3210" "exp3" 1 35 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1412 0 0
"3210" "exp3" 1 36 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2574 32 1
"3210" "exp3" 1 37 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1397 0 0
"3210" "exp3" 1 38 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1771 22 1
"3210" "exp3" 1 39 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1600 11 1
"3210" "exp3" 1 40 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 893 15 1
"3210" "exp3" 1 41 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1475 37 1
"3210" "exp3" 1 42 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 839 0 0
"3210" "exp3" 1 43 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 789 8 1
"3210" "exp3" 1 44 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1159 14 1
"3210" "exp3" 1 45 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 842 34 1
"3210" "exp3" 1 46 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1017 32 1
"3210" "exp3" 1 47 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 937 16 1
"3210" "exp3" 1 48 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1326 0 0
"3210" "exp3" 1 49 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1925 40 1
"3210" "exp3" 1 50 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1084 33 1
"3210" "exp3" 1 51 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1587 0 0
"3210" "exp3" 1 52 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 3053 0 0
"3210" "exp3" 1 53 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1628 30 1
"3210" "exp3" 1 54 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 1155 0 0
"3210" "exp3" 1 55 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1204 0 0
"3210" "exp3" 1 56 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1286 0 0
"3210" "exp3" 1 57 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1271 0 0
"3210" "exp3" 1 58 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 829 21 1
"3210" "exp3" 1 59 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1032 20 1
"3210" "exp3" 1 60 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1323 0 0
"3210" "exp3" 1 61 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1331 0 0
"3210" "exp3" 1 62 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 4066 33 1
"3210" "exp3" 1 63 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1357 26 1
"3210" "exp3" 1 64 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 872 14 1
"3210" "exp3" 1 65 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 605 17 1
"3210" "exp3" 1 66 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1118 28 1
"3210" "exp3" 1 67 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1311 0 0
"3210" "exp3" 1 68 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 816 28 1
"3210" "exp3" 1 69 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1270 22 1
"3210" "exp3" 1 70 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1314 0 0
"3210" "exp3" 1 71 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1691 36 1
"3210" "exp3" 1 72 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1604 0 0
"3210" "exp3" 1 73 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2427 0 0
"3210" "exp3" 1 74 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 2599 24 1
"3210" "exp3" 1 75 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 6014 0 0
"3210" "exp3" 1 76 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1471 31 1
"3210" "exp3" 1 77 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1183 12 1
"3210" "exp3" 1 78 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1364 0 0
"3210" "exp3" 1 79 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1928 0 0
"3210" "exp3" 1 80 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1492 35 1
"3210" "exp3" 1 81 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1065 45 1
"3210" "exp3" 1 82 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1092 21 1
"3210" "exp3" 1 83 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 913 43 1
"3210" "exp3" 1 84 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1773 0 0
"3210" "exp3" 1 85 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 3194 0 0
"3210" "exp3" 1 86 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2995 31 1
"3210" "exp3" 1 87 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1805 85 1
"3210" "exp3" 1 88 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2730 96 1
"3210" "exp3" 1 89 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1570 19 1
"3210" "exp3" 1 90 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1526 0 0
"3210" "exp3" 1 91 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1620 0 0
"3210" "exp3" 1 92 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1660 0 0
"3210" "exp3" 1 93 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1470 0 0
"3210" "exp3" 1 94 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1267 0 0
"3210" "exp3" 1 95 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1209 36 1
"3210" "exp3" 1 96 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1054 29 1
"3210" "exp3" 1 97 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1033 20 1
"3210" "exp3" 1 98 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1022 0 0
"3210" "exp3" 1 99 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 839 20 1
"3210" "exp3" 1 100 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1101 24 1
"3210" "exp3" 1 101 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1271 29 1
"3210" "exp3" 1 102 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 752 25 1
"3210" "exp3" 1 103 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1157 0 0
"3210" "exp3" 1 104 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 911 32 1
"3210" "exp3" 1 105 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 814 0 0
"3210" "exp3" 1 106 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1612 0 0
"3210" "exp3" 1 107 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2191 49 1
"3210" "exp3" 1 108 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 2603 0 0
"3210" "exp3" 1 109 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1779 45 1
"3210" "exp3" 1 110 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 4610 0 0
"3210" "exp3" 1 111 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1168 36 1
"3210" "exp3" 1 112 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1413 16 1
"3210" "exp3" 1 113 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 965 39 1
"3210" "exp3" 1 114 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1064 28 1
"3210" "exp3" 1 115 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 3444 18 1
"3210" "exp3" 1 116 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1257 13 1
"3210" "exp3" 1 117 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1006 19 1
"3210" "exp3" 1 118 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1307 23 1
"3210" "exp3" 1 119 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 687 9 1
"3210" "exp3" 1 120 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1654 19 1
"3210" "exp3" 1 121 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1186 0 0
"3210" "exp3" 1 122 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 609 8 1
"3210" "exp3" 1 123 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 640 24 1
"3210" "exp3" 1 124 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 806 2 1
"3210" "exp3" 1 125 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2481 37 1
"3210" "exp3" 1 126 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 883 0 0
"3210" "exp3" 1 127 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1059 18 1
"3210" "exp3" 1 128 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 748 13 1
"3210" "exp3" 1 129 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1203 44 1
"3210" "exp3" 1 130 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 711 10 1
"3210" "exp3" 1 131 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1152 39 1
"3210" "exp3" 1 132 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1073 27 1
"3210" "exp3" 2 1 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1985 0 0
"3210" "exp3" 2 2 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 866 0 0
"3210" "exp3" 2 3 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 742 18 1
"3210" "exp3" 2 4 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 522 0 0
"3210" "exp3" 2 5 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 625 30 1
"3210" "exp3" 2 6 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 697 33 1
"3210" "exp3" 2 7 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 796 0 0
"3210" "exp3" 2 8 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 631 18 1
"3210" "exp3" 2 9 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 529 15 1
"3210" "exp3" 2 10 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 659 0 0
"3210" "exp3" 2 11 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 507 1 1
"3210" "exp3" 2 12 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1205 20 1
"3210" "exp3" 2 13 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 867 37 1
"3210" "exp3" 2 14 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1143 0 0
"3210" "exp3" 2 15 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 2473 0 0
"3210" "exp3" 2 16 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 828 29 1
"3210" "exp3" 2 17 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1140 0 0
"3210" "exp3" 2 18 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 807 25 1
"3210" "exp3" 2 19 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1626 27 1
"3210" "exp3" 2 20 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 891 0 0
"3210" "exp3" 2 21 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1458 21 1
"3210" "exp3" 2 22 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1314 0 0
"3210" "exp3" 2 23 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 852 0 0
"3210" "exp3" 2 24 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1262 0 0
"3210" "exp3" 2 25 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 2696 22 1
"3210" "exp3" 2 26 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1224 8 1
"3210" "exp3" 2 27 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1007 38 1
"3210" "exp3" 2 28 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 981 28 1
"3210" "exp3" 2 29 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 2013 0 0
"3210" "exp3" 2 30 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1244 15 1
"3210" "exp3" 2 31 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1074 33 1
"3210" "exp3" 2 32 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 686 8 1
"3210" "exp3" 2 33 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 701 33 1
"3210" "exp3" 2 34 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 704 29 1
"3210" "exp3" 2 35 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 568 0 0
"3210" "exp3" 2 36 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1316 16 1
"3210" "exp3" 2 37 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 631 24 1
"3210" "exp3" 2 38 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 595 14 1
"3210" "exp3" 2 39 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 514 24 1
"3210" "exp3" 2 40 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 498 21 1
"3210" "exp3" 2 41 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 802 0 0
"3210" "exp3" 2 42 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1040 19 1
"3210" "exp3" 2 43 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 840 0 0
"3210" "exp3" 2 44 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 587 32 1
"3210" "exp3" 2 45 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 741 0 0
"3210" "exp3" 2 46 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 579 17 1
"3210" "exp3" 2 47 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 3563 0 0
"3210" "exp3" 2 48 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1211 24 1
"3210" "exp3" 2 49 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1297 0 0
"3210" "exp3" 2 50 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1322 18 1
"3210" "exp3" 2 51 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 885 41 1
"3210" "exp3" 2 52 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 651 28 1
"3210" "exp3" 2 53 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 512 23 1
"3210" "exp3" 2 54 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1016 30 1
"3210" "exp3" 2 55 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 669 39 1
"3210" "exp3" 2 56 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 696 45 1
"3210" "exp3" 2 57 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 552 44 1
"3210" "exp3" 2 58 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 825 21 1
"3210" "exp3" 2 59 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 876 32 1
"3210" "exp3" 2 60 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 3685 0 0
"3210" "exp3" 2 61 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1570 0 0
"3210" "exp3" 2 62 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1569 14 1
"3210" "exp3" 2 63 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1835 20 1
"3210" "exp3" 2 64 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 927 0 0
"3210" "exp3" 2 65 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 746 37 1
"3210" "exp3" 2 66 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 815 0 0
"3210" "exp3" 2 67 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 868 36 1
"3210" "exp3" 2 68 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 770 19 1
"3210" "exp3" 2 69 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 624 26 1
"3210" "exp3" 2 70 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 607 0 0
"3210" "exp3" 2 71 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 787 31 1
"3210" "exp3" 2 72 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 878 40 1
"3210" "exp3" 2 73 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 646 9 1
"3210" "exp3" 2 74 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 598 0 0
"3210" "exp3" 2 75 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 425 15 1
"3210" "exp3" 2 76 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 617 23 1
"3210" "exp3" 2 77 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 680 31 1
"3210" "exp3" 2 78 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 735 25 1
"3210" "exp3" 2 79 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 624 29 1
"3210" "exp3" 2 80 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 460 3 1
"3210" "exp3" 2 81 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 537 80 1
"3210" "exp3" 2 82 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 936 47 1
"3210" "exp3" 2 83 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 914 48 1
"3210" "exp3" 2 84 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 596 0 0
"3210" "exp3" 2 85 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1001 31 1
"3210" "exp3" 2 86 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 838 35 1
"3210" "exp3" 2 87 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 577 45 1
"3210" "exp3" 2 88 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 517 11 1
"3210" "exp3" 2 89 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 713 23 1
"3210" "exp3" 2 90 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 684 23 1
"3210" "exp3" 2 91 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 684 13 1
"3210" "exp3" 2 92 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 617 0 0
"3210" "exp3" 2 93 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 359 31 1
"3210" "exp3" 2 94 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 659 7 1
"3210" "exp3" 2 95 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1065 27 1
"3210" "exp3" 2 96 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1583 10 1
"3210" "exp3" 2 97 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1619 42 1
"3210" "exp3" 2 98 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1171 0 0
"3210" "exp3" 2 99 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1551 0 0
"3210" "exp3" 2 100 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2296 36 1
"3210" "exp3" 2 101 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1138 0 0
"3210" "exp3" 2 102 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1017 26 1
"3210" "exp3" 2 103 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1069 11 1
"3210" "exp3" 2 104 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1453 12 1
"3210" "exp3" 2 105 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 866 44 1
"3210" "exp3" 2 106 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 729 17 1
"3210" "exp3" 2 107 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 666 18 1
"3210" "exp3" 2 108 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 675 46 1
"3210" "exp3" 2 109 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 972 0 0
"3210" "exp3" 2 110 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 792 40 1
"3210" "exp3" 2 111 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 602 19 1
"3210" "exp3" 2 112 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 806 43 1
"3210" "exp3" 2 113 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 878 26 1
"3210" "exp3" 2 114 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 694 20 1
"3210" "exp3" 2 115 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 727 13 1
"3210" "exp3" 2 116 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 941 0 0
"3210" "exp3" 2 117 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 849 22 1
"3210" "exp3" 2 118 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 677 13 1
"3210" "exp3" 2 119 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 801 28 1
"3210" "exp3" 2 120 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 712 34 1
"3210" "exp3" 2 121 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 476 39 1
"3210" "exp3" 2 122 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 723 25 1
"3210" "exp3" 2 123 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 980 49 1
"3210" "exp3" 2 124 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 609 70 1
"3210" "exp3" 2 125 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1018 33 1
"3210" "exp3" 2 126 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 679 17 1
"3210" "exp3" 2 127 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 568 26 1
"3210" "exp3" 2 128 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1001 38 1
"3210" "exp3" 2 129 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 510 0 0
"3210" "exp3" 2 130 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 499 4 1
"3210" "exp3" 2 131 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 580 27 1
"3210" "exp3" 2 132 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 559 16 1
"3210" "exp3" 1 1 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 2352 0 0
"3210" "exp3" 1 2 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1161 0 0
"3210" "exp3" 1 3 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 2482 29 1
"3210" "exp3" 1 4 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1845 0 0
"3210" "exp3" 1 5 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1547 40 1
"3210" "exp3" 1 6 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1112 35 1
"3210" "exp3" 1 7 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1448 33 1
"3210" "exp3" 1 8 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1578 0 0
"3210" "exp3" 1 9 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 2352 0 0
"3210" "exp3" 1 10 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1097 36 1
"3210" "exp3" 1 11 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 3161 36 1
"3210" "exp3" 1 12 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 1061 0 0
"3210" "exp3" 1 13 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1365 35 1
"3210" "exp3" 1 14 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 2556 0 0
"3210" "exp3" 1 15 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1872 39 1
"3210" "exp3" 1 16 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 678 24 1
"3210" "exp3" 1 17 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1246 0 0
"3210" "exp3" 1 18 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1213 0 0
"3210" "exp3" 1 19 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 4088 0 0
"3210" "exp3" 1 20 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1465 49 1
"3210" "exp3" 1 21 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 837 0 0
"3210" "exp3" 1 22 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1376 42 1
"3210" "exp3" 1 23 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1678 0 0
"3210" "exp3" 1 24 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1115 41 1
"3210" "exp3" 1 25 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1490 0 0
"3210" "exp3" 1 26 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 807 0 0
"3210" "exp3" 1 27 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2034 0 0
"3210" "exp3" 1 28 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 630 0 0
"3210" "exp3" 1 29 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 592 0 0
"3210" "exp3" 1 30 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1487 45 1
"3210" "exp3" 1 31 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1043 35 1
"3210" "exp3" 1 32 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 842 24 1
"3210" "exp3" 1 33 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1618 0 0
"3210" "exp3" 1 34 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1435 42 1
"3210" "exp3" 1 35 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1576 0 0
"3210" "exp3" 1 36 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 859 0 0
"3210" "exp3" 1 37 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 681 0 0
"3210" "exp3" 1 38 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 742 0 0
"3210" "exp3" 1 39 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1443 44 1
"3210" "exp3" 1 40 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1034 0 0
"3210" "exp3" 1 41 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1353 0 0
"3210" "exp3" 1 42 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 1559 0 0
"3210" "exp3" 1 43 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 820 0 0
"3210" "exp3" 1 44 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 721 77 1
"3210" "exp3" 1 45 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 1428 0 0
"3210" "exp3" 1 46 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1120 0 0
"3210" "exp3" 1 47 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 600 0 0
"3210" "exp3" 1 48 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 545 0 0
"3210" "exp3" 1 49 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1476 70 1
"3210" "exp3" 1 50 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 592 0 0
"3210" "exp3" 1 51 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 659 0 0
"3210" "exp3" 1 52 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 513 69 1
"3210" "exp3" 1 53 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1227 0 0
"3210" "exp3" 1 54 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 833 74 1
"3210" "exp3" 1 55 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 388 0 0
"3210" "exp3" 1 56 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 697 0 0
"3210" "exp3" 1 57 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1130 37 1
"3210" "exp3" 1 58 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1276 24 1
"3210" "exp3" 1 59 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 643 0 0
"3210" "exp3" 1 60 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 918 0 0
"3210" "exp3" 1 61 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 472 0 0
"3210" "exp3" 1 62 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 991 64 1
"3210" "exp3" 1 63 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1005 41 1
"3210" "exp3" 1 64 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1256 28 1
"3210" "exp3" 1 65 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1405 0 0
"3210" "exp3" 1 66 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 873 39 1
"3210" "exp3" 1 67 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1426 0 0
"3210" "exp3" 1 68 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 876 0 0
"3210" "exp3" 1 69 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1122 0 0
"3210" "exp3" 1 70 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 871 5 1
"3210" "exp3" 1 71 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1247 0 0
"3210" "exp3" 1 72 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1832 0 0
"3210" "exp3" 1 73 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1238 0 0
"3210" "exp3" 1 74 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 561 80 1
"3210" "exp3" 1 75 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 525 0 0
"3210" "exp3" 1 76 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 551 0 0
"3210" "exp3" 1 77 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1224 8 1
"3210" "exp3" 1 78 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 936 0 0
"3210" "exp3" 1 79 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 1640 0 0
"3210" "exp3" 1 80 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 1306 0 0
"3210" "exp3" 1 81 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1620 37 1
"3210" "exp3" 1 82 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 1412 0 0
"3210" "exp3" 1 83 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 959 0 0
"3210" "exp3" 1 84 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 836 0 0
"3210" "exp3" 1 85 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 2173 0 0
"3210" "exp3" 1 86 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1291 80 1
"3210" "exp3" 1 87 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 665 0 0
"3210" "exp3" 1 88 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 970 0 0
"3210" "exp3" 1 89 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 410 0 0
"3210" "exp3" 1 90 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 377 0 0
"3210" "exp3" 1 91 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 401 0 0
"3210" "exp3" 1 92 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 538 0 0
"3210" "exp3" 1 93 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1163 44 1
"3210" "exp3" 1 94 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1330 0 0
"3210" "exp3" 1 95 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 647 0 0
"3210" "exp3" 1 96 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1054 0 0
"3210" "exp3" 1 97 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 729 68 1
"3210" "exp3" 1 98 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 530 0 0
"3210" "exp3" 1 99 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 362 0 0
"3210" "exp3" 1 100 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 535 0 0
"3210" "exp3" 1 101 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 956 0 0
"3210" "exp3" 1 102 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1096 16 1
"3210" "exp3" 1 103 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 933 78 1
"3210" "exp3" 1 104 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 524 0 0
"3210" "exp3" 1 105 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1124 47 1
"3210" "exp3" 1 106 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1327 0 0
"3210" "exp3" 1 107 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 936 77 1
"3210" "exp3" 1 108 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1055 32 1
"3210" "exp3" 1 109 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 766 4 1
"3210" "exp3" 1 110 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 585 17 1
"3210" "exp3" 1 111 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1072 21 1
"3210" "exp3" 1 112 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 874 26 1
"3210" "exp3" 1 113 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 657 0 0
"3210" "exp3" 1 114 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1230 0 0
"3210" "exp3" 1 115 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1373 0 0
"3210" "exp3" 1 116 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1996 68 1
"3210" "exp3" 1 117 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 569 0 0
"3210" "exp3" 1 118 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1800 31 1
"3210" "exp3" 1 119 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 756 0 0
"3210" "exp3" 1 120 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 708 97 1
"3210" "exp3" 1 121 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1440 28 1
"3210" "exp3" 1 122 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 870 0 0
"3210" "exp3" 1 123 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 477 0 0
"3210" "exp3" 1 124 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 505 0 0
"3210" "exp3" 1 125 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 490 0 0
"3210" "exp3" 1 126 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 500 0 0
"3210" "exp3" 1 127 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 763 48 1
"3210" "exp3" 1 128 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1223 0 0
"3210" "exp3" 1 129 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1046 29 1
"3210" "exp3" 1 130 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1183 85 1
"3210" "exp3" 1 131 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 937 0 0
"3210" "exp3" 1 132 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 2528 32 1
"3210" "exp3" 2 1 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 1765 0 0
"3210" "exp3" 2 2 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1098 0 0
"3210" "exp3" 2 3 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 943 26 1
"3210" "exp3" 2 4 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 820 49 1
"3210" "exp3" 2 5 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1356 26 1
"3210" "exp3" 2 6 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 616 0 0
"3210" "exp3" 2 7 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 796 0 0
"3210" "exp3" 2 8 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 938 44 1
"3210" "exp3" 2 9 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 645 0 0
"3210" "exp3" 2 10 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1310 0 0
"3210" "exp3" 2 11 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 798 0 0
"3210" "exp3" 2 12 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1028 0 0
"3210" "exp3" 2 13 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 671 0 0
"3210" "exp3" 2 14 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1013 0 0
"3210" "exp3" 2 15 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1108 34 1
"3210" "exp3" 2 16 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 882 0 0
"3210" "exp3" 2 17 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 536 62 1
"3210" "exp3" 2 18 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 758 0 0
"3210" "exp3" 2 19 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 563 0 0
"3210" "exp3" 2 20 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 866 44 1
"3210" "exp3" 2 21 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1597 0 0
"3210" "exp3" 2 22 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 618 86 1
"3210" "exp3" 2 23 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 627 0 0
"3210" "exp3" 2 24 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 791 0 0
"3210" "exp3" 2 25 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 576 0 0
"3210" "exp3" 2 26 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1327 47 1
"3210" "exp3" 2 27 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1366 0 0
"3210" "exp3" 2 28 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 494 95 1
"3210" "exp3" 2 29 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1091 0 0
"3210" "exp3" 2 30 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1951 0 0
"3210" "exp3" 2 31 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1385 0 0
"3210" "exp3" 2 32 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1146 0 0
"3210" "exp3" 2 33 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 752 0 0
"3210" "exp3" 2 34 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1138 0 0
"3210" "exp3" 2 35 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 807 0 0
"3210" "exp3" 2 36 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1103 0 0
"3210" "exp3" 2 37 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 845 0 0
"3210" "exp3" 2 38 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 2086 24 1
"3210" "exp3" 2 39 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 522 0 0
"3210" "exp3" 2 40 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1569 33 1
"3210" "exp3" 2 41 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1018 29 1
"3210" "exp3" 2 42 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 523 70 1
"3210" "exp3" 2 43 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1660 0 0
"3210" "exp3" 2 44 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 3652 40 1
"3210" "exp3" 2 45 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 895 32 1
"3210" "exp3" 2 46 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1039 0 0
"3210" "exp3" 2 47 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1263 0 0
"3210" "exp3" 2 48 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 973 48 1
"3210" "exp3" 2 49 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1847 0 0
"3210" "exp3" 2 50 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2009 35 1
"3210" "exp3" 2 51 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 994 0 0
"3210" "exp3" 2 52 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 760 0 0
"3210" "exp3" 2 53 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 954 0 0
"3210" "exp3" 2 54 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 767 30 1
"3210" "exp3" 2 55 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 776 27 1
"3210" "exp3" 2 56 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 686 0 0
"3210" "exp3" 2 57 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1947 19 1
"3210" "exp3" 2 58 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1315 0 0
"3210" "exp3" 2 59 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 557 0 0
"3210" "exp3" 2 60 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 518 73 1
"3210" "exp3" 2 61 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 629 0 0
"3210" "exp3" 2 62 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 419 0 0
"3210" "exp3" 2 63 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 671 0 0
"3210" "exp3" 2 64 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 384 0 0
"3210" "exp3" 2 65 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1045 0 0
"3210" "exp3" 2 66 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2565 0 0
"3210" "exp3" 2 67 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1337 0 0
"3210" "exp3" 2 68 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1165 0 0
"3210" "exp3" 2 69 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1222 0 0
"3210" "exp3" 2 70 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1267 36 1
"3210" "exp3" 2 71 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1228 89 1
"3210" "exp3" 2 72 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1936 29 1
"3210" "exp3" 2 73 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1232 0 0
"3210" "exp3" 2 74 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 821 0 0
"3210" "exp3" 2 75 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1272 0 0
"3210" "exp3" 2 76 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1733 34 1
"3210" "exp3" 2 77 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1111 20 1
"3210" "exp3" 2 78 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 838 0 0
"3210" "exp3" 2 79 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 756 0 0
"3210" "exp3" 2 80 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 620 0 0
"3210" "exp3" 2 81 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 747 0 0
"3210" "exp3" 2 82 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 518 0 0
"3210" "exp3" 2 83 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1221 0 0
"3210" "exp3" 2 84 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 725 22 1
"3210" "exp3" 2 85 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 569 69 1
"3210" "exp3" 2 86 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 597 91 1
"3210" "exp3" 2 87 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 705 92 1
"3210" "exp3" 2 88 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1401 34 1
"3210" "exp3" 2 89 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1222 37 1
"3210" "exp3" 2 90 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 911 0 0
"3210" "exp3" 2 91 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1280 90 1
"3210" "exp3" 2 92 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1335 86 1
"3210" "exp3" 2 93 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1067 40 1
"3210" "exp3" 2 94 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 825 18 1
"3210" "exp3" 2 95 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 702 0 0
"3210" "exp3" 2 96 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 1393 81 1
"3210" "exp3" 2 97 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1140 0 0
"3210" "exp3" 2 98 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 891 0 0
"3210" "exp3" 2 99 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 725 25 1
"3210" "exp3" 2 100 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 965 31 1
"3210" "exp3" 2 101 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 824 43 1
"3210" "exp3" 2 102 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 945 33 1
"3210" "exp3" 2 103 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1306 99 1
"3210" "exp3" 2 104 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 849 78 1
"3210" "exp3" 2 105 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1222 0 0
"3210" "exp3" 2 106 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1068 43 1
"3210" "exp3" 2 107 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1020 45 1
"3210" "exp3" 2 108 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1127 32 1
"3210" "exp3" 2 109 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1491 29 1
"3210" "exp3" 2 110 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1275 0 0
"3210" "exp3" 2 111 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 721 80 1
"3210" "exp3" 2 112 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1529 39 1
"3210" "exp3" 2 113 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1165 32 1
"3210" "exp3" 2 114 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 1878 81 1
"3210" "exp3" 2 115 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 845 0 0
"3210" "exp3" 2 116 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 1076 7 1
"3210" "exp3" 2 117 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 710 84 1
"3210" "exp3" 2 118 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 643 0 0
"3210" "exp3" 2 119 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1219 77 1
"3210" "exp3" 2 120 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1004 0 0
"3210" "exp3" 2 121 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1242 0 0
"3210" "exp3" 2 122 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 500 0 0
"3210" "exp3" 2 123 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 448 0 0
"3210" "exp3" 2 124 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 397 55 1
"3210" "exp3" 2 125 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 565 15 1
"3210" "exp3" 2 126 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 618 20 1
"3210" "exp3" 2 127 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 571 0 0
"3210" "exp3" 2 128 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1238 41 1
"3210" "exp3" 2 129 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1556 0 0
"3210" "exp3" 2 130 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 795 42 1
"3210" "exp3" 2 131 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1032 36 1
"3210" "exp3" 2 132 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 823 26 1
"3301" "exp3" 1 1 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1388 41 1
"3301" "exp3" 1 2 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 1901 0 0
"3301" "exp3" 1 3 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1206 8 1
"3301" "exp3" 1 4 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1981 17 1
"3301" "exp3" 1 5 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 1529 0 0
"3301" "exp3" 1 6 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1846 30 1
"3301" "exp3" 1 7 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1047 32 1
"3301" "exp3" 1 8 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1463 37 1
"3301" "exp3" 1 9 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 2409 0 0
"3301" "exp3" 1 10 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1431 26 1
"3301" "exp3" 1 11 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 2264 34 1
"3301" "exp3" 1 12 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 697 15 1
"3301" "exp3" 1 13 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1399 0 0
"3301" "exp3" 1 14 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 4032 87 1
"3301" "exp3" 1 15 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1646 0 0
"3301" "exp3" 1 16 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 938 0 0
"3301" "exp3" 1 17 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1467 90 1
"3301" "exp3" 1 18 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 848 46 1
"3301" "exp3" 1 19 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 2279 26 1
"3301" "exp3" 1 20 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1164 0 0
"3301" "exp3" 1 21 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 472 4 1
"3301" "exp3" 1 22 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 581 21 1
"3301" "exp3" 1 23 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1927 14 1
"3301" "exp3" 1 24 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 791 24 1
"3301" "exp3" 1 25 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1702 0 0
"3301" "exp3" 1 26 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 3968 28 1
"3301" "exp3" 1 27 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1230 37 1
"3301" "exp3" 1 28 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1098 36 1
"3301" "exp3" 1 29 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 2534 22 1
"3301" "exp3" 1 30 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1242 19 1
"3301" "exp3" 1 31 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 1862 6 1
"3301" "exp3" 1 32 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 761 24 1
"3301" "exp3" 1 33 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1003 22 1
"3301" "exp3" 1 34 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 864 32 1
"3301" "exp3" 1 35 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1923 35 1
"3301" "exp3" 1 36 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 2505 9 1
"3301" "exp3" 1 37 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1770 45 1
"3301" "exp3" 1 38 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 703 0 0
"3301" "exp3" 1 39 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 888 31 1
"3301" "exp3" 1 40 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 792 0 0
"3301" "exp3" 1 41 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1585 33 1
"3301" "exp3" 1 42 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 835 29 1
"3301" "exp3" 1 43 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1364 20 1
"3301" "exp3" 1 44 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1534 18 1
"3301" "exp3" 1 45 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1025 29 1
"3301" "exp3" 1 46 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1025 0 0
"3301" "exp3" 1 47 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1186 0 0
"3301" "exp3" 1 48 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1522 0 0
"3301" "exp3" 1 49 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1214 30 1
"3301" "exp3" 1 50 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1532 11 1
"3301" "exp3" 1 51 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1421 0 0
"3301" "exp3" 1 52 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 909 0 0
"3301" "exp3" 1 53 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 2658 44 1
"3301" "exp3" 1 54 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1718 14 1
"3301" "exp3" 1 55 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1118 15 1
"3301" "exp3" 1 56 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 918 16 1
"3301" "exp3" 1 57 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1467 10 1
"3301" "exp3" 1 58 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1086 0 0
"3301" "exp3" 1 59 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 620 40 1
"3301" "exp3" 1 60 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 600 0 0
"3301" "exp3" 1 61 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 707 0 0
"3301" "exp3" 1 62 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1645 24 1
"3301" "exp3" 1 63 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 1408 5 1
"3301" "exp3" 1 64 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 793 0 0
"3301" "exp3" 1 65 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1202 19 1
"3301" "exp3" 1 66 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 963 25 1
"3301" "exp3" 1 67 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 706 28 1
"3301" "exp3" 1 68 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 2038 23 1
"3301" "exp3" 1 69 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 587 21 1
"3301" "exp3" 1 70 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1793 67 1
"3301" "exp3" 1 71 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 872 16 1
"3301" "exp3" 1 72 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 763 13 1
"3301" "exp3" 1 73 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1988 31 1
"3301" "exp3" 1 74 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1750 0 0
"3301" "exp3" 1 75 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 707 0 0
"3301" "exp3" 1 76 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1322 26 1
"3301" "exp3" 1 77 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 798 38 1
"3301" "exp3" 1 78 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 2193 0 0
"3301" "exp3" 1 79 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 2619 27 1
"3301" "exp3" 1 80 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1936 0 0
"3301" "exp3" 1 81 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 2354 19 1
"3301" "exp3" 1 82 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1100 42 1
"3301" "exp3" 1 83 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1359 22 1
"3301" "exp3" 1 84 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1367 17 1
"3301" "exp3" 1 85 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 757 32 1
"3301" "exp3" 1 86 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 717 43 1
"3301" "exp3" 1 87 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 954 30 1
"3301" "exp3" 1 88 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1364 0 0
"3301" "exp3" 1 89 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1466 45 1
"3301" "exp3" 1 90 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 604 40 1
"3301" "exp3" 1 91 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1029 14 1
"3301" "exp3" 1 92 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 581 20 1
"3301" "exp3" 1 93 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 831 22 1
"3301" "exp3" 1 94 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 729 0 0
"3301" "exp3" 1 95 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1091 23 1
"3301" "exp3" 1 96 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 695 18 1
"3301" "exp3" 1 97 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 1277 8 1
"3301" "exp3" 1 98 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 951 39 1
"3301" "exp3" 1 99 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 709 18 1
"3301" "exp3" 1 100 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 859 0 0
"3301" "exp3" 1 101 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 554 23 1
"3301" "exp3" 1 102 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1610 36 1
"3301" "exp3" 1 103 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 821 47 1
"3301" "exp3" 1 104 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1150 12 1
"3301" "exp3" 1 105 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 2053 29 1
"3301" "exp3" 1 106 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 3362 0 0
"3301" "exp3" 1 107 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1762 34 1
"3301" "exp3" 1 108 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 3050 23 1
"3301" "exp3" 1 109 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 850 16 1
"3301" "exp3" 1 110 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 885 27 1
"3301" "exp3" 1 111 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1195 15 1
"3301" "exp3" 1 112 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 488 0 0
"3301" "exp3" 1 113 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1801 0 0
"3301" "exp3" 1 114 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 2303 0 0
"3301" "exp3" 1 115 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1343 35 1
"3301" "exp3" 1 116 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1301 12 1
"3301" "exp3" 1 117 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1315 20 1
"3301" "exp3" 1 118 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1001 28 1
"3301" "exp3" 1 119 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1081 0 0
"3301" "exp3" 1 120 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1663 0 0
"3301" "exp3" 1 121 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 770 0 0
"3301" "exp3" 1 122 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 603 18 1
"3301" "exp3" 1 123 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 532 31 1
"3301" "exp3" 1 124 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 779 25 1
"3301" "exp3" 1 125 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 954 6 1
"3301" "exp3" 1 126 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 597 17 1
"3301" "exp3" 1 127 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 869 0 0
"3301" "exp3" 1 128 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 704 13 1
"3301" "exp3" 1 129 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2606 0 0
"3301" "exp3" 1 130 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 759 0 0
"3301" "exp3" 1 131 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 485 34 1
"3301" "exp3" 1 132 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 792 33 1
"3301" "exp3" 2 1 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 790 27 1
"3301" "exp3" 2 2 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 780 0 0
"3301" "exp3" 2 3 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 559 18 1
"3301" "exp3" 2 4 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 883 0 0
"3301" "exp3" 2 5 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1452 0 0
"3301" "exp3" 2 6 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 847 12 1
"3301" "exp3" 2 7 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 593 23 1
"3301" "exp3" 2 8 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 909 43 1
"3301" "exp3" 2 9 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1493 28 1
"3301" "exp3" 2 10 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1260 33 1
"3301" "exp3" 2 11 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 791 22 1
"3301" "exp3" 2 12 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 648 0 0
"3301" "exp3" 2 13 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 654 0 0
"3301" "exp3" 2 14 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 616 36 1
"3301" "exp3" 2 15 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 572 20 1
"3301" "exp3" 2 16 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1960 0 0
"3301" "exp3" 2 17 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1132 25 1
"3301" "exp3" 2 18 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1088 28 1
"3301" "exp3" 2 19 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1071 21 1
"3301" "exp3" 2 20 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 596 0 0
"3301" "exp3" 2 21 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 736 17 1
"3301" "exp3" 2 22 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 871 0 0
"3301" "exp3" 2 23 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1172 89 1
"3301" "exp3" 2 24 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 897 26 1
"3301" "exp3" 2 25 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 526 6 1
"3301" "exp3" 2 26 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2330 22 1
"3301" "exp3" 2 27 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 653 29 1
"3301" "exp3" 2 28 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 2771 84 1
"3301" "exp3" 2 29 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 985 0 0
"3301" "exp3" 2 30 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 732 36 1
"3301" "exp3" 2 31 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 985 19 1
"3301" "exp3" 2 32 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 583 0 0
"3301" "exp3" 2 33 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1036 0 0
"3301" "exp3" 2 34 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2665 49 1
"3301" "exp3" 2 35 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 608 14 1
"3301" "exp3" 2 36 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 726 0 0
"3301" "exp3" 2 37 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1104 10 1
"3301" "exp3" 2 38 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 940 15 1
"3301" "exp3" 2 39 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 764 16 1
"3301" "exp3" 2 40 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 714 0 0
"3301" "exp3" 2 41 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1561 9 1
"3301" "exp3" 2 42 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 540 0 0
"3301" "exp3" 2 43 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 494 7 1
"3301" "exp3" 2 44 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 673 21 1
"3301" "exp3" 2 45 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 679 29 1
"3301" "exp3" 2 46 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1444 19 1
"3301" "exp3" 2 47 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 579 29 1
"3301" "exp3" 2 48 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 871 20 1
"3301" "exp3" 2 49 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 489 0 0
"3301" "exp3" 2 50 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2337 69 1
"3301" "exp3" 2 51 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 712 17 1
"3301" "exp3" 2 52 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1080 0 0
"3301" "exp3" 2 53 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 818 0 0
"3301" "exp3" 2 54 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 615 27 1
"3301" "exp3" 2 55 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 860 15 1
"3301" "exp3" 2 56 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 2340 17 1
"3301" "exp3" 2 57 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1113 93 1
"3301" "exp3" 2 58 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 516 0 0
"3301" "exp3" 2 59 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 726 13 1
"3301" "exp3" 2 60 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1143 0 0
"3301" "exp3" 2 61 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 1481 67 1
"3301" "exp3" 2 62 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 3755 0 0
"3301" "exp3" 2 63 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 662 31 1
"3301" "exp3" 2 64 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1754 0 0
"3301" "exp3" 2 65 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1820 26 1
"3301" "exp3" 2 66 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 701 11 1
"3301" "exp3" 2 67 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 472 0 0
"3301" "exp3" 2 68 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 978 0 0
"3301" "exp3" 2 69 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 484 24 1
"3301" "exp3" 2 70 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 472 18 1
"3301" "exp3" 2 71 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 762 41 1
"3301" "exp3" 2 72 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 940 0 0
"3301" "exp3" 2 73 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 1554 63 1
"3301" "exp3" 2 74 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1373 0 0
"3301" "exp3" 2 75 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 588 0 0
"3301" "exp3" 2 76 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1466 25 1
"3301" "exp3" 2 77 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1030 45 1
"3301" "exp3" 2 78 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 638 17 1
"3301" "exp3" 2 79 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 2468 24 1
"3301" "exp3" 2 80 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 606 0 0
"3301" "exp3" 2 81 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 635 35 1
"3301" "exp3" 2 82 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 547 0 0
"3301" "exp3" 2 83 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 536 48 1
"3301" "exp3" 2 84 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1212 13 1
"3301" "exp3" 2 85 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 524 14 1
"3301" "exp3" 2 86 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 875 23 1
"3301" "exp3" 2 87 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 1667 58 1
"3301" "exp3" 2 88 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 498 8 1
"3301" "exp3" 2 89 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 979 0 0
"3301" "exp3" 2 90 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2792 0 0
"3301" "exp3" 2 91 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 779 0 0
"3301" "exp3" 2 92 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 756 0 0
"3301" "exp3" 2 93 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1525 0 0
"3301" "exp3" 2 94 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 734 32 1
"3301" "exp3" 2 95 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 700 28 1
"3301" "exp3" 2 96 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 584 31 1
"3301" "exp3" 2 97 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 584 19 1
"3301" "exp3" 2 98 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 564 19 1
"3301" "exp3" 2 99 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 622 1 1
"3301" "exp3" 2 100 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 2285 0 0
"3301" "exp3" 2 101 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 639 0 0
"3301" "exp3" 2 102 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 840 30 1
"3301" "exp3" 2 103 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 705 0 0
"3301" "exp3" 2 104 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1387 14 1
"3301" "exp3" 2 105 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1033 24 1
"3301" "exp3" 2 106 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 718 12 1
"3301" "exp3" 2 107 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 509 38 1
"3301" "exp3" 2 108 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 635 22 1
"3301" "exp3" 2 109 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 506 30 1
"3301" "exp3" 2 110 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 976 20 1
"3301" "exp3" 2 111 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 3277 0 0
"3301" "exp3" 2 112 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1223 41 1
"3301" "exp3" 2 113 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 667 0 0
"3301" "exp3" 2 114 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1892 0 0
"3301" "exp3" 2 115 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 572 24 1
"3301" "exp3" 2 116 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 978 0 0
"3301" "exp3" 2 117 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 420 22 1
"3301" "exp3" 2 118 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 716 30 1
"3301" "exp3" 2 119 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 2351 0 0
"3301" "exp3" 2 120 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 982 34 1
"3301" "exp3" 2 121 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 437 16 1
"3301" "exp3" 2 122 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1617 25 1
"3301" "exp3" 2 123 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 353 23 1
"3301" "exp3" 2 124 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 416 23 1
"3301" "exp3" 2 125 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 547 33 1
"3301" "exp3" 2 126 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 692 20 1
"3301" "exp3" 2 127 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 894 21 1
"3301" "exp3" 2 128 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 833 0 0
"3301" "exp3" 2 129 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1327 36 1
"3301" "exp3" 2 130 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 523 27 1
"3301" "exp3" 2 131 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 856 0 0
"3301" "exp3" 2 132 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 998 0 0
"3301" "exp3" 1 1 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1354 8 1
"3301" "exp3" 1 2 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2579 41 1
"3301" "exp3" 1 3 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1861 0 0
"3301" "exp3" 1 4 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1923 0 0
"3301" "exp3" 1 5 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 2364 47 1
"3301" "exp3" 1 6 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 2277 35 1
"3301" "exp3" 1 7 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1731 35 1
"3301" "exp3" 1 8 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1057 43 1
"3301" "exp3" 1 9 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1744 0 0
"3301" "exp3" 1 10 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 932 0 0
"3301" "exp3" 1 11 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1454 32 1
"3301" "exp3" 1 12 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1057 22 1
"3301" "exp3" 1 13 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1571 30 1
"3301" "exp3" 1 14 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 970 27 1
"3301" "exp3" 1 15 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 964 31 1
"3301" "exp3" 1 16 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1026 25 1
"3301" "exp3" 1 17 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 2553 0 0
"3301" "exp3" 1 18 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 4760 89 1
"3301" "exp3" 1 19 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1286 26 1
"3301" "exp3" 1 20 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1074 37 1
"3301" "exp3" 1 21 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 916 29 1
"3301" "exp3" 1 22 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1058 38 1
"3301" "exp3" 1 23 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1252 0 0
"3301" "exp3" 1 24 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1054 36 1
"3301" "exp3" 1 25 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 939 42 1
"3301" "exp3" 1 26 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 871 19 1
"3301" "exp3" 1 27 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 991 21 1
"3301" "exp3" 1 28 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1323 0 0
"3301" "exp3" 1 29 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 816 30 1
"3301" "exp3" 1 30 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1873 0 0
"3301" "exp3" 1 31 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 751 23 1
"3301" "exp3" 1 32 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 915 23 1
"3301" "exp3" 1 33 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 2256 32 1
"3301" "exp3" 1 34 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1176 43 1
"3301" "exp3" 1 35 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1580 0 0
"3301" "exp3" 1 36 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1023 31 1
"3301" "exp3" 1 37 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 858 0 0
"3301" "exp3" 1 38 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1755 0 0
"3301" "exp3" 1 39 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 951 22 1
"3301" "exp3" 1 40 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 820 0 0
"3301" "exp3" 1 41 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1346 21 1
"3301" "exp3" 1 42 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1511 24 1
"3301" "exp3" 1 43 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1283 45 1
"3301" "exp3" 1 44 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 622 0 0
"3301" "exp3" 1 45 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1575 0 0
"3301" "exp3" 1 46 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 629 31 1
"3301" "exp3" 1 47 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 544 4 1
"3301" "exp3" 1 48 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1584 0 0
"3301" "exp3" 1 49 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1085 0 0
"3301" "exp3" 1 50 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2113 88 1
"3301" "exp3" 1 51 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1043 41 1
"3301" "exp3" 1 52 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1427 23 1
"3301" "exp3" 1 53 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1607 0 0
"3301" "exp3" 1 54 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 953 22 1
"3301" "exp3" 1 55 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 657 34 1
"3301" "exp3" 1 56 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 976 28 1
"3301" "exp3" 1 57 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 639 20 1
"3301" "exp3" 1 58 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1474 19 1
"3301" "exp3" 1 59 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1741 15 1
"3301" "exp3" 1 60 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 772 19 1
"3301" "exp3" 1 61 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 735 19 1
"3301" "exp3" 1 62 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 748 25 1
"3301" "exp3" 1 63 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1526 48 1
"3301" "exp3" 1 64 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 955 12 1
"3301" "exp3" 1 65 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 3536 0 0
"3301" "exp3" 1 66 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1241 40 1
"3301" "exp3" 1 67 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1667 16 1
"3301" "exp3" 1 68 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 881 17 1
"3301" "exp3" 1 69 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1571 45 1
"3301" "exp3" 1 70 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 801 1 1
"3301" "exp3" 1 71 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1783 0 0
"3301" "exp3" 1 72 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1056 0 0
"3301" "exp3" 1 73 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 853 26 1
"3301" "exp3" 1 74 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 771 28 1
"3301" "exp3" 1 75 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 2301 16 1
"3301" "exp3" 1 76 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1591 0 0
"3301" "exp3" 1 77 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 854 0 0
"3301" "exp3" 1 78 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1132 27 1
"3301" "exp3" 1 79 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1365 16 1
"3301" "exp3" 1 80 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1049 25 1
"3301" "exp3" 1 81 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 743 31 1
"3301" "exp3" 1 82 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1097 17 1
"3301" "exp3" 1 83 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 807 0 0
"3301" "exp3" 1 84 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 676 21 1
"3301" "exp3" 1 85 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 915 0 0
"3301" "exp3" 1 86 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 2774 0 0
"3301" "exp3" 1 87 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 732 5 1
"3301" "exp3" 1 88 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 2285 0 0
"3301" "exp3" 1 89 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1058 0 0
"3301" "exp3" 1 90 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 574 39 1
"3301" "exp3" 1 91 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 922 26 1
"3301" "exp3" 1 92 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1159 0 0
"3301" "exp3" 1 93 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 827 13 1
"3301" "exp3" 1 94 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1079 0 0
"3301" "exp3" 1 95 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1945 29 1
"3301" "exp3" 1 96 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 851 0 0
"3301" "exp3" 1 97 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1507 0 0
"3301" "exp3" 1 98 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 734 42 1
"3301" "exp3" 1 99 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 516 0 0
"3301" "exp3" 1 100 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 749 0 0
"3301" "exp3" 1 101 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1344 18 1
"3301" "exp3" 1 102 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 840 0 0
"3301" "exp3" 1 103 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1620 0 0
"3301" "exp3" 1 104 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 622 24 1
"3301" "exp3" 1 105 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 764 0 0
"3301" "exp3" 1 106 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 794 11 1
"3301" "exp3" 1 107 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 787 36 1
"3301" "exp3" 1 108 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 858 0 0
"3301" "exp3" 1 109 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 778 24 1
"3301" "exp3" 1 110 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 621 0 0
"3301" "exp3" 1 111 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 987 20 1
"3301" "exp3" 1 112 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1171 0 0
"3301" "exp3" 1 113 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 938 34 1
"3301" "exp3" 1 114 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 721 20 1
"3301" "exp3" 1 115 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 795 33 1
"3301" "exp3" 1 116 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1043 37 1
"3301" "exp3" 1 117 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1713 49 1
"3301" "exp3" 1 118 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1363 82 1
"3301" "exp3" 1 119 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1022 90 1
"3301" "exp3" 1 120 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 752 0 0
"3301" "exp3" 1 121 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 766 0 0
"3301" "exp3" 1 122 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1196 0 0
"3301" "exp3" 1 123 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1073 32 1
"3301" "exp3" 1 124 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 2054 27 1
"3301" "exp3" 1 125 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1559 0 0
"3301" "exp3" 1 126 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1414 0 0
"3301" "exp3" 1 127 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1461 29 1
"3301" "exp3" 1 128 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 707 23 1
"3301" "exp3" 1 129 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1439 0 0
"3301" "exp3" 1 130 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 2388 18 1
"3301" "exp3" 1 131 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1295 32 1
"3301" "exp3" 1 132 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1653 0 0
"3301" "exp3" 2 1 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1145 24 1
"3301" "exp3" 2 2 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 553 22 1
"3301" "exp3" 2 3 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1389 0 0
"3301" "exp3" 2 4 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1134 38 1
"3301" "exp3" 2 5 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1453 17 1
"3301" "exp3" 2 6 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1206 23 1
"3301" "exp3" 2 7 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 854 0 0
"3301" "exp3" 2 8 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 961 25 1
"3301" "exp3" 2 9 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1537 21 1
"3301" "exp3" 2 10 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 2739 0 0
"3301" "exp3" 2 11 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1126 0 0
"3301" "exp3" 2 12 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 751 0 0
"3301" "exp3" 2 13 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 528 0 0
"3301" "exp3" 2 14 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1097 0 0
"3301" "exp3" 2 15 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1218 31 1
"3301" "exp3" 2 16 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 681 24 1
"3301" "exp3" 2 17 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1227 0 0
"3301" "exp3" 2 18 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 595 28 1
"3301" "exp3" 2 19 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 917 0 0
"3301" "exp3" 2 20 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 771 28 1
"3301" "exp3" 2 21 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 560 23 1
"3301" "exp3" 2 22 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 581 0 0
"3301" "exp3" 2 23 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 966 35 1
"3301" "exp3" 2 24 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 678 0 0
"3301" "exp3" 2 25 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1049 0 0
"3301" "exp3" 2 26 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 979 13 1
"3301" "exp3" 2 27 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 770 19 1
"3301" "exp3" 2 28 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 729 0 0
"3301" "exp3" 2 29 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1042 0 0
"3301" "exp3" 2 30 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1599 35 1
"3301" "exp3" 2 31 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 649 0 0
"3301" "exp3" 2 32 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 617 34 1
"3301" "exp3" 2 33 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1148 20 1
"3301" "exp3" 2 34 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 561 31 1
"3301" "exp3" 2 35 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1746 0 0
"3301" "exp3" 2 36 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 817 30 1
"3301" "exp3" 2 37 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 506 0 0
"3301" "exp3" 2 38 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1215 0 0
"3301" "exp3" 2 39 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1417 24 1
"3301" "exp3" 2 40 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 930 0 0
"3301" "exp3" 2 41 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 871 0 0
"3301" "exp3" 2 42 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1081 27 1
"3301" "exp3" 2 43 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 999 91 1
"3301" "exp3" 2 44 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1262 0 0
"3301" "exp3" 2 45 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 587 0 0
"3301" "exp3" 2 46 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1341 92 1
"3301" "exp3" 2 47 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1029 0 0
"3301" "exp3" 2 48 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 983 40 1
"3301" "exp3" 2 49 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 574 0 0
"3301" "exp3" 2 50 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1120 0 0
"3301" "exp3" 2 51 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 554 30 1
"3301" "exp3" 2 52 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 473 17 1
"3301" "exp3" 2 53 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 2377 0 0
"3301" "exp3" 2 54 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1502 41 1
"3301" "exp3" 2 55 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 535 15 1
"3301" "exp3" 2 56 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 2471 0 0
"3301" "exp3" 2 57 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 502 28 1
"3301" "exp3" 2 58 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 421 31 1
"3301" "exp3" 2 59 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 623 18 1
"3301" "exp3" 2 60 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 560 13 1
"3301" "exp3" 2 61 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 608 15 1
"3301" "exp3" 2 62 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 837 27 1
"3301" "exp3" 2 63 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 885 0 0
"3301" "exp3" 2 64 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 886 17 1
"3301" "exp3" 2 65 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 758 0 0
"3301" "exp3" 2 66 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 767 0 0
"3301" "exp3" 2 67 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 672 0 0
"3301" "exp3" 2 68 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 657 14 1
"3301" "exp3" 2 69 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1181 45 1
"3301" "exp3" 2 70 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1149 34 1
"3301" "exp3" 2 71 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1038 37 1
"3301" "exp3" 2 72 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 2142 12 1
"3301" "exp3" 2 73 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 743 32 1
"3301" "exp3" 2 74 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 672 32 1
"3301" "exp3" 2 75 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1615 0 0
"3301" "exp3" 2 76 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 977 47 1
"3301" "exp3" 2 77 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1014 42 1
"3301" "exp3" 2 78 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 616 0 0
"3301" "exp3" 2 79 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 839 39 1
"3301" "exp3" 2 80 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 984 0 0
"3301" "exp3" 2 81 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1118 0 0
"3301" "exp3" 2 82 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 761 28 1
"3301" "exp3" 2 83 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 685 0 0
"3301" "exp3" 2 84 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 646 31 1
"3301" "exp3" 2 85 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 713 16 1
"3301" "exp3" 2 86 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 917 49 1
"3301" "exp3" 2 87 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 952 29 1
"3301" "exp3" 2 88 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 884 44 1
"3301" "exp3" 2 89 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 609 29 1
"3301" "exp3" 2 90 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 774 35 1
"3301" "exp3" 2 91 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1036 33 1
"3301" "exp3" 2 92 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1156 0 0
"3301" "exp3" 2 93 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1295 0 0
"3301" "exp3" 2 94 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 673 23 1
"3301" "exp3" 2 95 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 946 0 0
"3301" "exp3" 2 96 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1970 26 1
"3301" "exp3" 2 97 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 648 39 1
"3301" "exp3" 2 98 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 977 26 1
"3301" "exp3" 2 99 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1110 0 0
"3301" "exp3" 2 100 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1046 0 0
"3301" "exp3" 2 101 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 736 36 1
"3301" "exp3" 2 102 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1127 0 0
"3301" "exp3" 2 103 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1321 19 1
"3301" "exp3" 2 104 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1039 0 0
"3301" "exp3" 2 105 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1159 17 1
"3301" "exp3" 2 106 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 878 29 1
"3301" "exp3" 2 107 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 662 24 1
"3301" "exp3" 2 108 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 674 12 1
"3301" "exp3" 2 109 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 952 0 0
"3301" "exp3" 2 110 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 632 25 1
"3301" "exp3" 2 111 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 775 0 0
"3301" "exp3" 2 112 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 545 15 1
"3301" "exp3" 2 113 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1189 0 0
"3301" "exp3" 2 114 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 985 33 1
"3301" "exp3" 2 115 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 721 0 0
"3301" "exp3" 2 116 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 730 19 1
"3301" "exp3" 2 117 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 680 0 0
"3301" "exp3" 2 118 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 702 0 0
"3301" "exp3" 2 119 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 785 25 1
"3301" "exp3" 2 120 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 603 16 1
"3301" "exp3" 2 121 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 632 26 1
"3301" "exp3" 2 122 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1191 18 1
"3301" "exp3" 2 123 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 535 0 0
"3301" "exp3" 2 124 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 936 0 0
"3301" "exp3" 2 125 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1396 0 0
"3301" "exp3" 2 126 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 745 20 1
"3301" "exp3" 2 127 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 739 0 0
"3301" "exp3" 2 128 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 624 22 1
"3301" "exp3" 2 129 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 2090 0 0
"3301" "exp3" 2 130 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 2443 26 1
"3301" "exp3" 2 131 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 584 0 0
"3301" "exp3" 2 132 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 449 0 0
"3301" "exp3" 1 1 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 685 19 1
"3301" "exp3" 1 2 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 707 20 1
"3301" "exp3" 1 3 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 385 13 1
"3301" "exp3" 1 4 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 889 26 1
"3301" "exp3" 1 5 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 730 35 1
"3301" "exp3" 1 6 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 750 16 1
"3301" "exp3" 1 7 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 644 21 1
"3301" "exp3" 1 8 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 512 3 1
"3301" "exp3" 1 9 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1628 25 1
"3301" "exp3" 1 10 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 704 19 1
"3301" "exp3" 1 11 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 825 16 1
"3301" "exp3" 1 12 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1532 33 1
"3301" "exp3" 1 13 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1273 0 0
"3301" "exp3" 1 14 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 844 0 0
"3301" "exp3" 1 15 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1557 0 0
"3301" "exp3" 1 16 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 959 24 1
"3301" "exp3" 1 17 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 994 0 0
"3301" "exp3" 1 18 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 751 0 0
"3301" "exp3" 1 19 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1777 21 1
"3301" "exp3" 1 20 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 2713 0 0
"3301" "exp3" 1 21 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 653 10 1
"3301" "exp3" 1 22 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 870 18 1
"3301" "exp3" 1 23 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 698 30 1
"3301" "exp3" 1 24 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 917 0 0
"3301" "exp3" 1 25 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 758 25 1
"3301" "exp3" 1 26 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1070 13 1
"3301" "exp3" 1 27 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 583 0 0
"3301" "exp3" 1 28 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 702 26 1
"3301" "exp3" 1 29 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 567 35 1
"3301" "exp3" 1 30 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 523 6 1
"3301" "exp3" 1 31 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1163 42 1
"3301" "exp3" 1 32 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 2135 20 1
"3301" "exp3" 1 33 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1054 28 1
"3301" "exp3" 1 34 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1016 0 0
"3301" "exp3" 1 35 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 935 0 0
"3301" "exp3" 1 36 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 482 36 1
"3301" "exp3" 1 37 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 432 14 1
"3301" "exp3" 1 38 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 981 43 1
"3301" "exp3" 1 39 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 883 18 1
"3301" "exp3" 1 40 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 706 45 1
"3301" "exp3" 1 41 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 621 11 1
"3301" "exp3" 1 42 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 949 29 1
"3301" "exp3" 1 43 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 597 30 1
"3301" "exp3" 1 44 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 620 41 1
"3301" "exp3" 1 45 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 376 17 1
"3301" "exp3" 1 46 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 582 30 1
"3301" "exp3" 1 47 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 597 37 1
"3301" "exp3" 1 48 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 969 0 0
"3301" "exp3" 1 49 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 635 13 1
"3301" "exp3" 1 50 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1011 29 1
"3301" "exp3" 1 51 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 720 23 1
"3301" "exp3" 1 52 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 862 0 0
"3301" "exp3" 1 53 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1254 0 0
"3301" "exp3" 1 54 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 790 22 1
"3301" "exp3" 1 55 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 956 0 0
"3301" "exp3" 1 56 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 697 0 0
"3301" "exp3" 1 57 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1762 0 0
"3301" "exp3" 1 58 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 884 0 0
"3301" "exp3" 1 59 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 454 24 1
"3301" "exp3" 1 60 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 878 30 1
"3301" "exp3" 1 61 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 692 34 1
"3301" "exp3" 1 62 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 919 31 1
"3301" "exp3" 1 63 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 468 0 0
"3301" "exp3" 1 64 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 891 0 0
"3301" "exp3" 1 65 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 418 0 0
"3301" "exp3" 1 66 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 484 27 1
"3301" "exp3" 1 67 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 576 27 1
"3301" "exp3" 1 68 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 845 41 1
"3301" "exp3" 1 69 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 687 27 1
"3301" "exp3" 1 70 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 702 18 1
"3301" "exp3" 1 71 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 802 38 1
"3301" "exp3" 1 72 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 854 0 0
"3301" "exp3" 1 73 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 528 12 1
"3301" "exp3" 1 74 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 748 40 1
"3301" "exp3" 1 75 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 875 23 1
"3301" "exp3" 1 76 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 750 17 1
"3301" "exp3" 1 77 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 860 42 1
"3301" "exp3" 1 78 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 743 39 1
"3301" "exp3" 1 79 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 529 38 1
"3301" "exp3" 1 80 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 502 26 1
"3301" "exp3" 1 81 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 512 17 1
"3301" "exp3" 1 82 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 490 0 0
"3301" "exp3" 1 83 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 786 48 1
"3301" "exp3" 1 84 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 576 28 1
"3301" "exp3" 1 85 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 587 14 1
"3301" "exp3" 1 86 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 559 32 1
"3301" "exp3" 1 87 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 514 0 0
"3301" "exp3" 1 88 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 571 0 0
"3301" "exp3" 1 89 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 997 0 0
"3301" "exp3" 1 90 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1202 26 1
"3301" "exp3" 1 91 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 609 0 0
"3301" "exp3" 1 92 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 531 33 1
"3301" "exp3" 1 93 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1589 10 1
"3301" "exp3" 1 94 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 713 37 1
"3301" "exp3" 1 95 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 556 0 0
"3301" "exp3" 1 96 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 473 25 1
"3301" "exp3" 1 97 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 721 0 0
"3301" "exp3" 1 98 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 377 34 1
"3301" "exp3" 1 99 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 419 21 1
"3301" "exp3" 1 100 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 423 31 1
"3301" "exp3" 1 101 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 460 33 1
"3301" "exp3" 1 102 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 467 18 1
"3301" "exp3" 1 103 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 531 47 1
"3301" "exp3" 1 104 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 526 28 1
"3301" "exp3" 1 105 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 530 43 1
"3301" "exp3" 1 106 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 476 20 1
"3301" "exp3" 1 107 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 454 32 1
"3301" "exp3" 1 108 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 529 0 0
"3301" "exp3" 1 109 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 531 29 1
"3301" "exp3" 1 110 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 507 15 1
"3301" "exp3" 1 111 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 572 25 1
"3301" "exp3" 1 112 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 585 24 1
"3301" "exp3" 1 113 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 858 0 0
"3301" "exp3" 1 114 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 756 31 1
"3301" "exp3" 1 115 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 580 14 1
"3301" "exp3" 1 116 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 847 39 1
"3301" "exp3" 1 117 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 858 0 0
"3301" "exp3" 1 118 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 820 23 1
"3301" "exp3" 1 119 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 568 19 1
"3301" "exp3" 1 120 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 471 22 1
"3301" "exp3" 1 121 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 692 16 1
"3301" "exp3" 1 122 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 625 92 1
"3301" "exp3" 1 123 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 514 44 1
"3301" "exp3" 1 124 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 3667 0 0
"3301" "exp3" 1 125 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 760 35 1
"3301" "exp3" 1 126 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1385 44 1
"3301" "exp3" 1 127 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 632 27 1
"3301" "exp3" 1 128 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 425 29 1
"3301" "exp3" 1 129 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 506 15 1
"3301" "exp3" 1 130 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 376 31 1
"3301" "exp3" 1 131 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 415 22 1
"3301" "exp3" 1 132 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 380 0 0
"3301" "exp3" 2 1 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 740 31 1
"3301" "exp3" 2 2 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1029 0 0
"3301" "exp3" 2 3 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 448 9 1
"3301" "exp3" 2 4 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 390 11 1
"3301" "exp3" 2 5 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 700 17 1
"3301" "exp3" 2 6 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 622 19 1
"3301" "exp3" 2 7 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 402 24 1
"3301" "exp3" 2 8 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 663 22 1
"3301" "exp3" 2 9 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 621 26 1
"3301" "exp3" 2 10 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 665 44 1
"3301" "exp3" 2 11 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 604 36 1
"3301" "exp3" 2 12 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 780 20 1
"3301" "exp3" 2 13 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 842 19 1
"3301" "exp3" 2 14 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 428 16 1
"3301" "exp3" 2 15 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 597 34 1
"3301" "exp3" 2 16 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 468 24 1
"3301" "exp3" 2 17 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 832 0 0
"3301" "exp3" 2 18 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1006 0 0
"3301" "exp3" 2 19 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 972 0 0
"3301" "exp3" 2 20 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 552 14 1
"3301" "exp3" 2 21 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 565 13 1
"3301" "exp3" 2 22 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 455 40 1
"3301" "exp3" 2 23 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1232 0 0
"3301" "exp3" 2 24 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 485 33 1
"3301" "exp3" 2 25 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 387 2 1
"3301" "exp3" 2 26 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 523 12 1
"3301" "exp3" 2 27 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1034 39 1
"3301" "exp3" 2 28 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 708 23 1
"3301" "exp3" 2 29 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 850 20 1
"3301" "exp3" 2 30 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 573 0 0
"3301" "exp3" 2 31 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 577 32 1
"3301" "exp3" 2 32 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 688 0 0
"3301" "exp3" 2 33 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 586 17 1
"3301" "exp3" 2 34 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 824 30 1
"3301" "exp3" 2 35 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 775 0 0
"3301" "exp3" 2 36 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 683 43 1
"3301" "exp3" 2 37 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 550 27 1
"3301" "exp3" 2 38 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 643 33 1
"3301" "exp3" 2 39 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 589 31 1
"3301" "exp3" 2 40 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 449 19 1
"3301" "exp3" 2 41 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 811 92 1
"3301" "exp3" 2 42 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 555 37 1
"3301" "exp3" 2 43 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 653 21 1
"3301" "exp3" 2 44 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 558 23 1
"3301" "exp3" 2 45 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 543 3 1
"3301" "exp3" 2 46 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 843 32 1
"3301" "exp3" 2 47 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 528 26 1
"3301" "exp3" 2 48 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 664 0 0
"3301" "exp3" 2 49 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 942 18 1
"3301" "exp3" 2 50 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 494 34 1
"3301" "exp3" 2 51 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 459 26 1
"3301" "exp3" 2 52 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 453 20 1
"3301" "exp3" 2 53 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 469 32 1
"3301" "exp3" 2 54 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 721 0 0
"3301" "exp3" 2 55 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 613 29 1
"3301" "exp3" 2 56 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 3053 0 0
"3301" "exp3" 2 57 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 580 44 1
"3301" "exp3" 2 58 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 453 18 1
"3301" "exp3" 2 59 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 409 27 1
"3301" "exp3" 2 60 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 676 38 1
"3301" "exp3" 2 61 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 896 0 0
"3301" "exp3" 2 62 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 406 23 1
"3301" "exp3" 2 63 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 513 29 1
"3301" "exp3" 2 64 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 768 37 1
"3301" "exp3" 2 65 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 560 29 1
"3301" "exp3" 2 66 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 651 30 1
"3301" "exp3" 2 67 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 495 21 1
"3301" "exp3" 2 68 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 569 27 1
"3301" "exp3" 2 69 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 568 7 1
"3301" "exp3" 2 70 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 426 21 1
"3301" "exp3" 2 71 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1767 12 1
"3301" "exp3" 2 72 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 710 0 0
"3301" "exp3" 2 73 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 886 0 0
"3301" "exp3" 2 74 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1010 25 1
"3301" "exp3" 2 75 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 911 25 1
"3301" "exp3" 2 76 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1412 0 0
"3301" "exp3" 2 77 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 590 19 1
"3301" "exp3" 2 78 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 646 35 1
"3301" "exp3" 2 79 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 484 17 1
"3301" "exp3" 2 80 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 665 0 0
"3301" "exp3" 2 81 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 795 14 1
"3301" "exp3" 2 82 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 809 35 1
"3301" "exp3" 2 83 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 389 0 0
"3301" "exp3" 2 84 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 474 18 1
"3301" "exp3" 2 85 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 573 0 0
"3301" "exp3" 2 86 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 396 25 1
"3301" "exp3" 2 87 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 492 33 1
"3301" "exp3" 2 88 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 390 10 1
"3301" "exp3" 2 89 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 598 22 1
"3301" "exp3" 2 90 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 657 0 0
"3301" "exp3" 2 91 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 713 11 1
"3301" "exp3" 2 92 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 811 28 1
"3301" "exp3" 2 93 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 831 0 0
"3301" "exp3" 2 94 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 870 0 0
"3301" "exp3" 2 95 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1058 17 1
"3301" "exp3" 2 96 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 794 49 1
"3301" "exp3" 2 97 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1010 0 0
"3301" "exp3" 2 98 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1153 0 0
"3301" "exp3" 2 99 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 651 24 1
"3301" "exp3" 2 100 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 580 15 1
"3301" "exp3" 2 101 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 648 29 1
"3301" "exp3" 2 102 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 491 22 1
"3301" "exp3" 2 103 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 555 14 1
"3301" "exp3" 2 104 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 715 36 1
"3301" "exp3" 2 105 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 780 13 1
"3301" "exp3" 2 106 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 458 0 0
"3301" "exp3" 2 107 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 377 0 0
"3301" "exp3" 2 108 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 769 30 1
"3301" "exp3" 2 109 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 636 0 0
"3301" "exp3" 2 110 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 405 10 1
"3301" "exp3" 2 111 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 605 16 1
"3301" "exp3" 2 112 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 808 0 0
"3301" "exp3" 2 113 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 745 30 1
"3301" "exp3" 2 114 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 447 28 1
"3301" "exp3" 2 115 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 433 39 1
"3301" "exp3" 2 116 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 479 0 0
"3301" "exp3" 2 117 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 498 28 1
"3301" "exp3" 2 118 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 452 0 0
"3301" "exp3" 2 119 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 395 15 1
"3301" "exp3" 2 120 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 378 33 1
"3301" "exp3" 2 121 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 396 5 1
"3301" "exp3" 2 122 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 702 34 1
"3301" "exp3" 2 123 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 607 0 0
"3301" "exp3" 2 124 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 745 48 1
"3301" "exp3" 2 125 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 797 22 1
"3301" "exp3" 2 126 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 813 0 0
"3301" "exp3" 2 127 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 898 20 1
"3301" "exp3" 2 128 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 706 0 0
"3301" "exp3" 2 129 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 545 0 0
"3301" "exp3" 2 130 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 611 0 0
"3301" "exp3" 2 131 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 806 0 0
"3301" "exp3" 2 132 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 634 0 0
"3301" "exp3" 1 1 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 837 12 1
"3301" "exp3" 1 2 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1360 31 1
"3301" "exp3" 1 3 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1771 0 0
"3301" "exp3" 1 4 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 890 20 1
"3301" "exp3" 1 5 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1752 0 0
"3301" "exp3" 1 6 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1239 0 0
"3301" "exp3" 1 7 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1032 0 0
"3301" "exp3" 1 8 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1018 41 1
"3301" "exp3" 1 9 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 902 9 1
"3301" "exp3" 1 10 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1078 23 1
"3301" "exp3" 1 11 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1395 20 1
"3301" "exp3" 1 12 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 842 13 1
"3301" "exp3" 1 13 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1088 40 1
"3301" "exp3" 1 14 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1146 10 1
"3301" "exp3" 1 15 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 961 0 0
"3301" "exp3" 1 16 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 812 19 1
"3301" "exp3" 1 17 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 924 0 0
"3301" "exp3" 1 18 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 703 29 1
"3301" "exp3" 1 19 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1092 21 1
"3301" "exp3" 1 20 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1142 38 1
"3301" "exp3" 1 21 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1037 0 0
"3301" "exp3" 1 22 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 921 21 1
"3301" "exp3" 1 23 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1003 18 1
"3301" "exp3" 1 24 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1758 13 1
"3301" "exp3" 1 25 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 752 10 1
"3301" "exp3" 1 26 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 755 36 1
"3301" "exp3" 1 27 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 790 0 0
"3301" "exp3" 1 28 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 706 22 1
"3301" "exp3" 1 29 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 842 28 1
"3301" "exp3" 1 30 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 592 27 1
"3301" "exp3" 1 31 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1137 30 1
"3301" "exp3" 1 32 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 722 14 1
"3301" "exp3" 1 33 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 950 32 1
"3301" "exp3" 1 34 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 603 5 1
"3301" "exp3" 1 35 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 709 0 0
"3301" "exp3" 1 36 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1012 42 1
"3301" "exp3" 1 37 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 983 18 1
"3301" "exp3" 1 38 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1037 44 1
"3301" "exp3" 1 39 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 745 0 0
"3301" "exp3" 1 40 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 702 7 1
"3301" "exp3" 1 41 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 849 25 1
"3301" "exp3" 1 42 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1342 18 1
"3301" "exp3" 1 43 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 878 18 1
"3301" "exp3" 1 44 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1314 0 0
"3301" "exp3" 1 45 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 723 21 1
"3301" "exp3" 1 46 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 754 0 0
"3301" "exp3" 1 47 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 989 37 1
"3301" "exp3" 1 48 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1252 16 1
"3301" "exp3" 1 49 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1947 36 1
"3301" "exp3" 1 50 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1016 46 1
"3301" "exp3" 1 51 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1074 30 1
"3301" "exp3" 1 52 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 829 30 1
"3301" "exp3" 1 53 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 720 26 1
"3301" "exp3" 1 54 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1595 27 1
"3301" "exp3" 1 55 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1606 45 1
"3301" "exp3" 1 56 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 585 12 1
"3301" "exp3" 1 57 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1156 37 1
"3301" "exp3" 1 58 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 631 15 1
"3301" "exp3" 1 59 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 980 0 0
"3301" "exp3" 1 60 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1041 22 1
"3301" "exp3" 1 61 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1473 29 1
"3301" "exp3" 1 62 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 687 31 1
"3301" "exp3" 1 63 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 715 3 1
"3301" "exp3" 1 64 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 644 0 0
"3301" "exp3" 1 65 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 879 0 0
"3301" "exp3" 1 66 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 759 33 1
"3301" "exp3" 1 67 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 862 43 1
"3301" "exp3" 1 68 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 798 0 0
"3301" "exp3" 1 69 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 953 24 1
"3301" "exp3" 1 70 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 960 7 1
"3301" "exp3" 1 71 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 791 32 1
"3301" "exp3" 1 72 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 772 16 1
"3301" "exp3" 1 73 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 873 30 1
"3301" "exp3" 1 74 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 524 16 1
"3301" "exp3" 1 75 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 674 44 1
"3301" "exp3" 1 76 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 480 19 1
"3301" "exp3" 1 77 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 734 36 1
"3301" "exp3" 1 78 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 484 15 1
"3301" "exp3" 1 79 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 741 21 1
"3301" "exp3" 1 80 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 964 20 1
"3301" "exp3" 1 81 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1267 26 1
"3301" "exp3" 1 82 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 958 11 1
"3301" "exp3" 1 83 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 686 27 1
"3301" "exp3" 1 84 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1117 25 1
"3301" "exp3" 1 85 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1060 0 0
"3301" "exp3" 1 86 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 951 14 1
"3301" "exp3" 1 87 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1034 0 0
"3301" "exp3" 1 88 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1616 35 1
"3301" "exp3" 1 89 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1018 33 1
"3301" "exp3" 1 90 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 912 29 1
"3301" "exp3" 1 91 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1787 0 0
"3301" "exp3" 1 92 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1604 24 1
"3301" "exp3" 1 93 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 910 0 0
"3301" "exp3" 1 94 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 788 17 1
"3301" "exp3" 1 95 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 976 0 0
"3301" "exp3" 1 96 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1367 94 1
"3301" "exp3" 1 97 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1800 39 1
"3301" "exp3" 1 98 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1107 0 0
"3301" "exp3" 1 99 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 821 49 1
"3301" "exp3" 1 100 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 816 0 0
"3301" "exp3" 1 101 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 986 48 1
"3301" "exp3" 1 102 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 905 32 1
"3301" "exp3" 1 103 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 740 13 1
"3301" "exp3" 1 104 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 559 42 1
"3301" "exp3" 1 105 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1014 0 0
"3301" "exp3" 1 106 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 836 0 0
"3301" "exp3" 1 107 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 616 22 1
"3301" "exp3" 1 108 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 613 47 1
"3301" "exp3" 1 109 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 770 38 1
"3301" "exp3" 1 110 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 723 24 1
"3301" "exp3" 1 111 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 635 0 0
"3301" "exp3" 1 112 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 759 35 1
"3301" "exp3" 1 113 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 841 23 1
"3301" "exp3" 1 114 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 863 27 1
"3301" "exp3" 1 115 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 2106 15 1
"3301" "exp3" 1 116 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 590 8 1
"3301" "exp3" 1 117 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 995 0 0
"3301" "exp3" 1 118 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1837 14 1
"3301" "exp3" 1 119 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1079 0 0
"3301" "exp3" 1 120 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2278 40 1
"3301" "exp3" 1 121 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 774 0 0
"3301" "exp3" 1 122 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 811 0 0
"3301" "exp3" 1 123 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1489 22 1
"3301" "exp3" 1 124 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 768 26 1
"3301" "exp3" 1 125 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 2086 0 0
"3301" "exp3" 1 126 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1040 35 1
"3301" "exp3" 1 127 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 692 25 1
"3301" "exp3" 1 128 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1090 32 1
"3301" "exp3" 1 129 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1246 0 0
"3301" "exp3" 1 130 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 692 0 0
"3301" "exp3" 1 131 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 625 39 1
"3301" "exp3" 1 132 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 787 28 1
"3301" "exp3" 2 1 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1112 13 1
"3301" "exp3" 2 2 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 642 0 0
"3301" "exp3" 2 3 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 682 19 1
"3301" "exp3" 2 4 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 725 11 1
"3301" "exp3" 2 5 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 726 15 1
"3301" "exp3" 2 6 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1774 0 0
"3301" "exp3" 2 7 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 946 33 1
"3301" "exp3" 2 8 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1305 45 1
"3301" "exp3" 2 9 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 830 23 1
"3301" "exp3" 2 10 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 684 0 0
"3301" "exp3" 2 11 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1277 0 0
"3301" "exp3" 2 12 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 552 36 1
"3301" "exp3" 2 13 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 794 18 1
"3301" "exp3" 2 14 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1113 0 0
"3301" "exp3" 2 15 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 737 23 1
"3301" "exp3" 2 16 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1824 28 1
"3301" "exp3" 2 17 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 803 0 0
"3301" "exp3" 2 18 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 817 9 1
"3301" "exp3" 2 19 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 996 0 0
"3301" "exp3" 2 20 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1020 20 1
"3301" "exp3" 2 21 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 2768 80 1
"3301" "exp3" 2 22 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 603 0 0
"3301" "exp3" 2 23 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 669 24 1
"3301" "exp3" 2 24 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 565 29 1
"3301" "exp3" 2 25 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 769 0 0
"3301" "exp3" 2 26 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1021 0 0
"3301" "exp3" 2 27 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1040 0 0
"3301" "exp3" 2 28 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 733 22 1
"3301" "exp3" 2 29 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 645 26 1
"3301" "exp3" 2 30 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 577 0 0
"3301" "exp3" 2 31 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 845 23 1
"3301" "exp3" 2 32 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 819 16 1
"3301" "exp3" 2 33 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 996 0 0
"3301" "exp3" 2 34 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1349 40 1
"3301" "exp3" 2 35 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 613 41 1
"3301" "exp3" 2 36 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 894 0 0
"3301" "exp3" 2 37 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 595 0 0
"3301" "exp3" 2 38 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 746 43 1
"3301" "exp3" 2 39 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 1473 6 1
"3301" "exp3" 2 40 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 996 6 1
"3301" "exp3" 2 41 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 731 34 1
"3301" "exp3" 2 42 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 722 31 1
"3301" "exp3" 2 43 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1199 41 1
"3301" "exp3" 2 44 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 674 25 1
"3301" "exp3" 2 45 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1443 0 0
"3301" "exp3" 2 46 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 944 37 1
"3301" "exp3" 2 47 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 849 0 0
"3301" "exp3" 2 48 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 633 15 1
"3301" "exp3" 2 49 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 944 0 0
"3301" "exp3" 2 50 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 974 30 1
"3301" "exp3" 2 51 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 530 14 1
"3301" "exp3" 2 52 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 938 16 1
"3301" "exp3" 2 53 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 890 0 0
"3301" "exp3" 2 54 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 959 42 1
"3301" "exp3" 2 55 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 623 17 1
"3301" "exp3" 2 56 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 725 27 1
"3301" "exp3" 2 57 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 855 14 1
"3301" "exp3" 2 58 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1053 0 0
"3301" "exp3" 2 59 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 841 0 0
"3301" "exp3" 2 60 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 997 26 1
"3301" "exp3" 2 61 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1057 0 0
"3301" "exp3" 2 62 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 587 42 1
"3301" "exp3" 2 63 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 896 99 1
"3301" "exp3" 2 64 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1108 10 1
"3301" "exp3" 2 65 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 636 32 1
"3301" "exp3" 2 66 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 902 0 0
"3301" "exp3" 2 67 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 940 0 0
"3301" "exp3" 2 68 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 648 5 1
"3301" "exp3" 2 69 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 2079 0 0
"3301" "exp3" 2 70 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 788 0 0
"3301" "exp3" 2 71 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 929 2 1
"3301" "exp3" 2 72 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1702 0 0
"3301" "exp3" 2 73 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1121 31 1
"3301" "exp3" 2 74 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 818 19 1
"3301" "exp3" 2 75 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1131 0 0
"3301" "exp3" 2 76 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 793 12 1
"3301" "exp3" 2 77 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 933 22 1
"3301" "exp3" 2 78 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 604 17 1
"3301" "exp3" 2 79 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1189 25 1
"3301" "exp3" 2 80 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 659 15 1
"3301" "exp3" 2 81 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 566 26 1
"3301" "exp3" 2 82 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1058 29 1
"3301" "exp3" 2 83 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 639 0 0
"3301" "exp3" 2 84 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 624 0 0
"3301" "exp3" 2 85 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 562 32 1
"3301" "exp3" 2 86 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 837 39 1
"3301" "exp3" 2 87 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1079 49 1
"3301" "exp3" 2 88 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 949 0 0
"3301" "exp3" 2 89 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 888 22 1
"3301" "exp3" 2 90 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 686 35 1
"3301" "exp3" 2 91 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 776 0 0
"3301" "exp3" 2 92 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1158 25 1
"3301" "exp3" 2 93 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1034 0 0
"3301" "exp3" 2 94 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 811 30 1
"3301" "exp3" 2 95 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 568 28 1
"3301" "exp3" 2 96 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 783 22 1
"3301" "exp3" 2 97 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 919 18 1
"3301" "exp3" 2 98 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 662 28 1
"3301" "exp3" 2 99 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 821 35 1
"3301" "exp3" 2 100 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 624 19 1
"3301" "exp3" 2 101 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 639 0 0
"3301" "exp3" 2 102 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 931 0 0
"3301" "exp3" 2 103 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1086 0 0
"3301" "exp3" 2 104 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 574 0 0
"3301" "exp3" 2 105 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 889 21 1
"3301" "exp3" 2 106 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 796 25 1
"3301" "exp3" 2 107 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1653 33 1
"3301" "exp3" 2 108 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 602 48 1
"3301" "exp3" 2 109 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 680 24 1
"3301" "exp3" 2 110 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 625 0 0
"3301" "exp3" 2 111 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 990 40 1
"3301" "exp3" 2 112 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 601 39 1
"3301" "exp3" 2 113 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1194 0 0
"3301" "exp3" 2 114 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 691 29 1
"3301" "exp3" 2 115 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 916 30 1
"3301" "exp3" 2 116 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 810 0 0
"3301" "exp3" 2 117 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1069 36 1
"3301" "exp3" 2 118 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 842 14 1
"3301" "exp3" 2 119 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1376 0 0
"3301" "exp3" 2 120 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 622 21 1
"3301" "exp3" 2 121 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1352 27 1
"3301" "exp3" 2 122 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1142 46 1
"3301" "exp3" 2 123 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 975 27 1
"3301" "exp3" 2 124 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 760 13 1
"3301" "exp3" 2 125 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 589 4 1
"3301" "exp3" 2 126 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1055 19 1
"3301" "exp3" 2 127 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 694 24 1
"3301" "exp3" 2 128 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 629 8 1
"3301" "exp3" 2 129 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 898 0 0
"3301" "exp3" 2 130 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 783 84 1
"3301" "exp3" 2 131 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1055 0 0
"3301" "exp3" 2 132 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1216 0 0
"3302" "exp3" 1 1 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 1474 6 1
"3302" "exp3" 1 2 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1527 0 0
"3302" "exp3" 1 3 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1386 38 1
"3302" "exp3" 1 4 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1397 49 1
"3302" "exp3" 1 5 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1320 27 1
"3302" "exp3" 1 6 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1508 0 0
"3302" "exp3" 1 7 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1429 40 1
"3302" "exp3" 1 8 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1664 84 1
"3302" "exp3" 1 9 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1058 41 1
"3302" "exp3" 1 10 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1112 25 1
"3302" "exp3" 1 11 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1082 21 1
"3302" "exp3" 1 12 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1099 0 0
"3302" "exp3" 1 13 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1209 24 1
"3302" "exp3" 1 14 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1341 16 1
"3302" "exp3" 1 15 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1134 0 0
"3302" "exp3" 1 16 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1509 20 1
"3302" "exp3" 1 17 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 1405 0 0
"3302" "exp3" 1 18 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1224 27 1
"3302" "exp3" 1 19 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1758 17 1
"3302" "exp3" 1 20 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1418 29 1
"3302" "exp3" 1 21 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 1697 0 0
"3302" "exp3" 1 22 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1586 0 0
"3302" "exp3" 1 23 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1207 0 0
"3302" "exp3" 1 24 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1119 36 1
"3302" "exp3" 1 25 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 976 0 0
"3302" "exp3" 1 26 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1285 26 1
"3302" "exp3" 1 27 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1445 0 0
"3302" "exp3" 1 28 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1492 0 0
"3302" "exp3" 1 29 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1066 0 0
"3302" "exp3" 1 30 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1570 17 1
"3302" "exp3" 1 31 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1882 10 1
"3302" "exp3" 1 32 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 2297 0 0
"3302" "exp3" 1 33 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1056 8 1
"3302" "exp3" 1 34 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1608 0 0
"3302" "exp3" 1 35 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1901 34 1
"3302" "exp3" 1 36 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1325 0 0
"3302" "exp3" 1 37 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1274 19 1
"3302" "exp3" 1 38 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1242 28 1
"3302" "exp3" 1 39 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1404 35 1
"3302" "exp3" 1 40 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1344 20 1
"3302" "exp3" 1 41 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1577 33 1
"3302" "exp3" 1 42 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1667 0 0
"3302" "exp3" 1 43 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 2075 0 0
"3302" "exp3" 1 44 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 1771 3 1
"3302" "exp3" 1 45 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1171 30 1
"3302" "exp3" 1 46 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1792 0 0
"3302" "exp3" 1 47 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 2593 7 1
"3302" "exp3" 1 48 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1997 15 1
"3302" "exp3" 1 49 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 1918 1 1
"3302" "exp3" 1 50 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1649 0 0
"3302" "exp3" 1 51 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1677 0 0
"3302" "exp3" 1 52 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1233 0 0
"3302" "exp3" 1 53 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1175 39 1
"3302" "exp3" 1 54 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1531 9 1
"3302" "exp3" 1 55 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1392 0 0
"3302" "exp3" 1 56 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1421 25 1
"3302" "exp3" 1 57 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1233 0 0
"3302" "exp3" 1 58 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1883 12 1
"3302" "exp3" 1 59 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1997 34 1
"3302" "exp3" 1 60 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1527 31 1
"3302" "exp3" 1 61 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 2009 32 1
"3302" "exp3" 1 62 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 943 0 0
"3302" "exp3" 1 63 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 839 0 0
"3302" "exp3" 1 64 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1618 31 1
"3302" "exp3" 1 65 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1049 42 1
"3302" "exp3" 1 66 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1288 18 1
"3302" "exp3" 1 67 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1216 33 1
"3302" "exp3" 1 68 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 1532 8 1
"3302" "exp3" 1 69 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1990 0 0
"3302" "exp3" 1 70 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1772 22 1
"3302" "exp3" 1 71 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1526 12 1
"3302" "exp3" 1 72 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1497 0 0
"3302" "exp3" 1 73 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1495 0 0
"3302" "exp3" 1 74 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1312 0 0
"3302" "exp3" 1 75 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1955 0 0
"3302" "exp3" 1 76 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1072 34 1
"3302" "exp3" 1 77 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 2064 5 1
"3302" "exp3" 1 78 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 2001 22 1
"3302" "exp3" 1 79 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1322 0 0
"3302" "exp3" 1 80 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 915 15 1
"3302" "exp3" 1 81 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 787 0 0
"3302" "exp3" 1 82 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1018 37 1
"3302" "exp3" 1 83 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1227 0 0
"3302" "exp3" 1 84 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1341 0 0
"3302" "exp3" 1 85 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1120 0 0
"3302" "exp3" 1 86 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1915 0 0
"3302" "exp3" 1 87 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 1746 0 0
"3302" "exp3" 1 88 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1230 41 1
"3302" "exp3" 1 89 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1358 13 1
"3302" "exp3" 1 90 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 921 29 1
"3302" "exp3" 1 91 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1648 14 1
"3302" "exp3" 1 92 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1952 0 0
"3302" "exp3" 1 93 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 918 0 0
"3302" "exp3" 1 94 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1222 0 0
"3302" "exp3" 1 95 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1555 0 0
"3302" "exp3" 1 96 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1149 23 1
"3302" "exp3" 1 97 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 993 0 0
"3302" "exp3" 1 98 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1000 36 1
"3302" "exp3" 1 99 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 1956 0 0
"3302" "exp3" 1 100 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1917 13 1
"3302" "exp3" 1 101 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1328 20 1
"3302" "exp3" 1 102 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 976 0 0
"3302" "exp3" 1 103 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1252 0 0
"3302" "exp3" 1 104 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1360 0 0
"3302" "exp3" 1 105 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1382 0 0
"3302" "exp3" 1 106 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 919 24 1
"3302" "exp3" 1 107 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 891 18 1
"3302" "exp3" 1 108 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 866 0 0
"3302" "exp3" 1 109 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1256 0 0
"3302" "exp3" 1 110 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 1359 6 1
"3302" "exp3" 1 111 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1327 14 1
"3302" "exp3" 1 112 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 872 0 0
"3302" "exp3" 1 113 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 822 38 1
"3302" "exp3" 1 114 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 781 35 1
"3302" "exp3" 1 115 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 717 25 1
"3302" "exp3" 1 116 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 953 28 1
"3302" "exp3" 1 117 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 784 29 1
"3302" "exp3" 1 118 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 942 28 1
"3302" "exp3" 1 119 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 693 0 0
"3302" "exp3" 1 120 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1209 0 0
"3302" "exp3" 1 121 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1855 0 0
"3302" "exp3" 1 122 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 985 32 1
"3302" "exp3" 1 123 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 870 26 1
"3302" "exp3" 1 124 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 868 27 1
"3302" "exp3" 1 125 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 991 14 1
"3302" "exp3" 1 126 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1257 0 0
"3302" "exp3" 1 127 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 757 28 1
"3302" "exp3" 1 128 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1501 22 1
"3302" "exp3" 1 129 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1660 0 0
"3302" "exp3" 1 130 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1290 0 0
"3302" "exp3" 1 131 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 941 19 1
"3302" "exp3" 1 132 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 953 33 1
"3302" "exp3" 2 1 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 745 20 1
"3302" "exp3" 2 2 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 733 17 1
"3302" "exp3" 2 3 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1011 0 0
"3302" "exp3" 2 4 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 981 0 0
"3302" "exp3" 2 5 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 934 18 1
"3302" "exp3" 2 6 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 944 25 1
"3302" "exp3" 2 7 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 1058 0 0
"3302" "exp3" 2 8 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 741 28 1
"3302" "exp3" 2 9 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1029 20 1
"3302" "exp3" 2 10 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 727 35 1
"3302" "exp3" 2 11 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 708 0 0
"3302" "exp3" 2 12 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 803 20 1
"3302" "exp3" 2 13 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 756 30 1
"3302" "exp3" 2 14 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 896 7 1
"3302" "exp3" 2 15 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 830 17 1
"3302" "exp3" 2 16 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 937 0 0
"3302" "exp3" 2 17 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 846 0 0
"3302" "exp3" 2 18 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1241 38 1
"3302" "exp3" 2 19 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1149 0 0
"3302" "exp3" 2 20 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 946 27 1
"3302" "exp3" 2 21 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 985 21 1
"3302" "exp3" 2 22 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 801 23 1
"3302" "exp3" 2 23 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 948 26 1
"3302" "exp3" 2 24 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 771 34 1
"3302" "exp3" 2 25 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1115 0 0
"3302" "exp3" 2 26 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 852 0 0
"3302" "exp3" 2 27 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 858 30 1
"3302" "exp3" 2 28 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1035 94 1
"3302" "exp3" 2 29 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1035 16 1
"3302" "exp3" 2 30 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 613 12 1
"3302" "exp3" 2 31 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1033 26 1
"3302" "exp3" 2 32 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1944 0 0
"3302" "exp3" 2 33 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1916 19 1
"3302" "exp3" 2 34 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 889 0 0
"3302" "exp3" 2 35 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 977 19 1
"3302" "exp3" 2 36 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 857 16 1
"3302" "exp3" 2 37 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1054 0 0
"3302" "exp3" 2 38 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 1111 7 1
"3302" "exp3" 2 39 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 814 19 1
"3302" "exp3" 2 40 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1289 0 0
"3302" "exp3" 2 41 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 902 15 1
"3302" "exp3" 2 42 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1092 8 1
"3302" "exp3" 2 43 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 959 17 1
"3302" "exp3" 2 44 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 762 26 1
"3302" "exp3" 2 45 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1056 11 1
"3302" "exp3" 2 46 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 949 43 1
"3302" "exp3" 2 47 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1437 0 0
"3302" "exp3" 2 48 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 997 48 1
"3302" "exp3" 2 49 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 924 19 1
"3302" "exp3" 2 50 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1103 0 0
"3302" "exp3" 2 51 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1227 0 0
"3302" "exp3" 2 52 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1252 36 1
"3302" "exp3" 2 53 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1165 16 1
"3302" "exp3" 2 54 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 648 20 1
"3302" "exp3" 2 55 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1231 0 0
"3302" "exp3" 2 56 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 956 0 0
"3302" "exp3" 2 57 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1106 0 0
"3302" "exp3" 2 58 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1215 45 1
"3302" "exp3" 2 59 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 747 37 1
"3302" "exp3" 2 60 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 935 47 1
"3302" "exp3" 2 61 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1023 27 1
"3302" "exp3" 2 62 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 864 40 1
"3302" "exp3" 2 63 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 754 0 0
"3302" "exp3" 2 64 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 910 0 0
"3302" "exp3" 2 65 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1084 29 1
"3302" "exp3" 2 66 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 822 31 1
"3302" "exp3" 2 67 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 717 38 1
"3302" "exp3" 2 68 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 706 0 0
"3302" "exp3" 2 69 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 651 28 1
"3302" "exp3" 2 70 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 649 0 0
"3302" "exp3" 2 71 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 676 0 0
"3302" "exp3" 2 72 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 843 0 0
"3302" "exp3" 2 73 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 704 46 1
"3302" "exp3" 2 74 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 747 0 0
"3302" "exp3" 2 75 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 956 9 1
"3302" "exp3" 2 76 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 623 28 1
"3302" "exp3" 2 77 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 466 24 1
"3302" "exp3" 2 78 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 564 12 1
"3302" "exp3" 2 79 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 731 24 1
"3302" "exp3" 2 80 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 806 21 1
"3302" "exp3" 2 81 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 783 25 1
"3302" "exp3" 2 82 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 653 0 0
"3302" "exp3" 2 83 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 772 23 1
"3302" "exp3" 2 84 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 864 42 1
"3302" "exp3" 2 85 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 603 0 0
"3302" "exp3" 2 86 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1154 30 1
"3302" "exp3" 2 87 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 628 33 1
"3302" "exp3" 2 88 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 637 0 0
"3302" "exp3" 2 89 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 644 18 1
"3302" "exp3" 2 90 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 685 0 0
"3302" "exp3" 2 91 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 756 39 1
"3302" "exp3" 2 92 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 957 13 1
"3302" "exp3" 2 93 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 831 27 1
"3302" "exp3" 2 94 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1090 90 1
"3302" "exp3" 2 95 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 894 29 1
"3302" "exp3" 2 96 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 681 25 1
"3302" "exp3" 2 97 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 508 23 1
"3302" "exp3" 2 98 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 648 35 1
"3302" "exp3" 2 99 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 807 0 0
"3302" "exp3" 2 100 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1949 0 0
"3302" "exp3" 2 101 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 830 27 1
"3302" "exp3" 2 102 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1012 99 1
"3302" "exp3" 2 103 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 791 0 0
"3302" "exp3" 2 104 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1610 0 0
"3302" "exp3" 2 105 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 720 29 1
"3302" "exp3" 2 106 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 742 22 1
"3302" "exp3" 2 107 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1553 0 0
"3302" "exp3" 2 108 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1159 14 1
"3302" "exp3" 2 109 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1268 49 1
"3302" "exp3" 2 110 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1034 0 0
"3302" "exp3" 2 111 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 757 18 1
"3302" "exp3" 2 112 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 621 32 1
"3302" "exp3" 2 113 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 804 0 0
"3302" "exp3" 2 114 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 764 0 0
"3302" "exp3" 2 115 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 671 13 1
"3302" "exp3" 2 116 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 976 22 1
"3302" "exp3" 2 117 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 675 14 1
"3302" "exp3" 2 118 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 835 21 1
"3302" "exp3" 2 119 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1144 0 0
"3302" "exp3" 2 120 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 874 18 1
"3302" "exp3" 2 121 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 570 0 0
"3302" "exp3" 2 122 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 720 0 0
"3302" "exp3" 2 123 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 664 42 1
"3302" "exp3" 2 124 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 940 0 0
"3302" "exp3" 2 125 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 582 59 1
"3302" "exp3" 2 126 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 856 0 0
"3302" "exp3" 2 127 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1355 0 0
"3302" "exp3" 2 128 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1063 0 0
"3302" "exp3" 2 129 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1233 33 1
"3302" "exp3" 2 130 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1758 15 1
"3302" "exp3" 2 131 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 951 0 0
"3302" "exp3" 2 132 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1059 35 1
"3302" "exp3" 1 1 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1061 0 0
"3302" "exp3" 1 2 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 1529 0 0
"3302" "exp3" 1 3 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1338 21 1
"3302" "exp3" 1 4 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1317 30 1
"3302" "exp3" 1 5 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1481 0 0
"3302" "exp3" 1 6 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1855 28 1
"3302" "exp3" 1 7 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1347 17 1
"3302" "exp3" 1 8 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1857 80 1
"3302" "exp3" 1 9 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1189 15 1
"3302" "exp3" 1 10 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1429 0 0
"3302" "exp3" 1 11 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1687 99 1
"3302" "exp3" 1 12 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1449 45 1
"3302" "exp3" 1 13 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1546 0 0
"3302" "exp3" 1 14 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1534 31 1
"3302" "exp3" 1 15 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1667 0 0
"3302" "exp3" 1 16 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1923 8 1
"3302" "exp3" 1 17 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1091 20 1
"3302" "exp3" 1 18 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1346 6 1
"3302" "exp3" 1 19 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1317 26 1
"3302" "exp3" 1 20 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1559 0 0
"3302" "exp3" 1 21 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1194 12 1
"3302" "exp3" 1 22 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 889 22 1
"3302" "exp3" 1 23 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1298 48 1
"3302" "exp3" 1 24 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1326 29 1
"3302" "exp3" 1 25 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1128 15 1
"3302" "exp3" 1 26 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1282 37 1
"3302" "exp3" 1 27 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1451 32 1
"3302" "exp3" 1 28 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1167 29 1
"3302" "exp3" 1 29 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 865 18 1
"3302" "exp3" 1 30 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 991 18 1
"3302" "exp3" 1 31 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 904 0 0
"3302" "exp3" 1 32 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1058 0 0
"3302" "exp3" 1 33 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1059 42 1
"3302" "exp3" 1 34 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1002 22 1
"3302" "exp3" 1 35 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 884 26 1
"3302" "exp3" 1 36 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 920 0 0
"3302" "exp3" 1 37 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1027 22 1
"3302" "exp3" 1 38 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1228 11 1
"3302" "exp3" 1 39 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 808 21 1
"3302" "exp3" 1 40 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 793 8 1
"3302" "exp3" 1 41 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1231 17 1
"3302" "exp3" 1 42 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1040 25 1
"3302" "exp3" 1 43 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1454 67 1
"3302" "exp3" 1 44 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1608 0 0
"3302" "exp3" 1 45 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 811 0 0
"3302" "exp3" 1 46 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1020 47 1
"3302" "exp3" 1 47 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1143 35 1
"3302" "exp3" 1 48 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1155 0 0
"3302" "exp3" 1 49 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1004 0 0
"3302" "exp3" 1 50 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1297 37 1
"3302" "exp3" 1 51 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1138 19 1
"3302" "exp3" 1 52 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1044 41 1
"3302" "exp3" 1 53 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1020 31 1
"3302" "exp3" 1 54 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 815 35 1
"3302" "exp3" 1 55 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1056 16 1
"3302" "exp3" 1 56 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1701 43 1
"3302" "exp3" 1 57 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1829 29 1
"3302" "exp3" 1 58 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1719 22 1
"3302" "exp3" 1 59 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 722 20 1
"3302" "exp3" 1 60 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 757 32 1
"3302" "exp3" 1 61 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1050 34 1
"3302" "exp3" 1 62 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1113 0 0
"3302" "exp3" 1 63 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 839 24 1
"3302" "exp3" 1 64 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1589 44 1
"3302" "exp3" 1 65 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1144 14 1
"3302" "exp3" 1 66 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 903 0 0
"3302" "exp3" 1 67 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1055 0 0
"3302" "exp3" 1 68 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1321 26 1
"3302" "exp3" 1 69 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 950 32 1
"3302" "exp3" 1 70 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 980 0 0
"3302" "exp3" 1 71 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1276 12 1
"3302" "exp3" 1 72 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1085 18 1
"3302" "exp3" 1 73 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1004 0 0
"3302" "exp3" 1 74 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 804 25 1
"3302" "exp3" 1 75 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1669 13 1
"3302" "exp3" 1 76 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1371 0 0
"3302" "exp3" 1 77 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 830 0 0
"3302" "exp3" 1 78 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 716 0 0
"3302" "exp3" 1 79 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 829 39 1
"3302" "exp3" 1 80 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 923 20 1
"3302" "exp3" 1 81 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1095 28 1
"3302" "exp3" 1 82 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1089 36 1
"3302" "exp3" 1 83 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1004 6 1
"3302" "exp3" 1 84 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 668 0 0
"3302" "exp3" 1 85 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1187 0 0
"3302" "exp3" 1 86 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 741 34 1
"3302" "exp3" 1 87 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1065 21 1
"3302" "exp3" 1 88 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 838 9 1
"3302" "exp3" 1 89 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1061 24 1
"3302" "exp3" 1 90 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 676 19 1
"3302" "exp3" 1 91 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 896 26 1
"3302" "exp3" 1 92 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1454 0 0
"3302" "exp3" 1 93 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1199 0 0
"3302" "exp3" 1 94 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 707 0 0
"3302" "exp3" 1 95 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 941 24 1
"3302" "exp3" 1 96 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1072 0 0
"3302" "exp3" 1 97 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 772 13 1
"3302" "exp3" 1 98 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 749 0 0
"3302" "exp3" 1 99 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 853 25 1
"3302" "exp3" 1 100 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 812 14 1
"3302" "exp3" 1 101 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 657 23 1
"3302" "exp3" 1 102 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 786 0 0
"3302" "exp3" 1 103 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1081 23 1
"3302" "exp3" 1 104 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 818 16 1
"3302" "exp3" 1 105 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1895 32 1
"3302" "exp3" 1 106 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2269 0 0
"3302" "exp3" 1 107 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1611 0 0
"3302" "exp3" 1 108 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1261 11 1
"3302" "exp3" 1 109 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1891 0 0
"3302" "exp3" 1 110 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1098 31 1
"3302" "exp3" 1 111 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 894 0 0
"3302" "exp3" 1 112 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 825 13 1
"3302" "exp3" 1 113 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1079 25 1
"3302" "exp3" 1 114 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1074 35 1
"3302" "exp3" 1 115 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1284 14 1
"3302" "exp3" 1 116 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 765 27 1
"3302" "exp3" 1 117 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1033 36 1
"3302" "exp3" 1 118 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1352 0 0
"3302" "exp3" 1 119 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1592 42 1
"3302" "exp3" 1 120 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 805 28 1
"3302" "exp3" 1 121 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 693 0 0
"3302" "exp3" 1 122 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1315 17 1
"3302" "exp3" 1 123 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1193 46 1
"3302" "exp3" 1 124 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1058 39 1
"3302" "exp3" 1 125 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 879 19 1
"3302" "exp3" 1 126 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 747 0 0
"3302" "exp3" 1 127 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1043 28 1
"3302" "exp3" 1 128 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1364 37 1
"3302" "exp3" 1 129 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1765 10 1
"3302" "exp3" 1 130 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 818 0 0
"3302" "exp3" 1 131 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1158 18 1
"3302" "exp3" 1 132 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 973 16 1
"3302" "exp3" 2 1 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1423 0 0
"3302" "exp3" 2 2 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1352 29 1
"3302" "exp3" 2 3 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 777 14 1
"3302" "exp3" 2 4 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 690 38 1
"3302" "exp3" 2 5 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 816 10 1
"3302" "exp3" 2 6 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 774 23 1
"3302" "exp3" 2 7 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1055 0 0
"3302" "exp3" 2 8 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 797 17 1
"3302" "exp3" 2 9 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1070 0 0
"3302" "exp3" 2 10 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 759 20 1
"3302" "exp3" 2 11 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 925 30 1
"3302" "exp3" 2 12 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1319 0 0
"3302" "exp3" 2 13 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 618 10 1
"3302" "exp3" 2 14 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 779 13 1
"3302" "exp3" 2 15 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 535 0 0
"3302" "exp3" 2 16 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 823 26 1
"3302" "exp3" 2 17 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 666 0 0
"3302" "exp3" 2 18 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1088 0 0
"3302" "exp3" 2 19 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 706 22 1
"3302" "exp3" 2 20 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 713 21 1
"3302" "exp3" 2 21 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 863 18 1
"3302" "exp3" 2 22 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 915 32 1
"3302" "exp3" 2 23 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 992 0 0
"3302" "exp3" 2 24 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 932 41 1
"3302" "exp3" 2 25 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1044 24 1
"3302" "exp3" 2 26 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 934 41 1
"3302" "exp3" 2 27 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 950 0 0
"3302" "exp3" 2 28 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 744 23 1
"3302" "exp3" 2 29 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 814 0 0
"3302" "exp3" 2 30 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1301 33 1
"3302" "exp3" 2 31 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 967 8 1
"3302" "exp3" 2 32 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 614 0 0
"3302" "exp3" 2 33 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1076 0 0
"3302" "exp3" 2 34 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 983 0 0
"3302" "exp3" 2 35 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 903 36 1
"3302" "exp3" 2 36 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1359 13 1
"3302" "exp3" 2 37 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 839 0 0
"3302" "exp3" 2 38 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 845 0 0
"3302" "exp3" 2 39 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1328 16 1
"3302" "exp3" 2 40 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1012 0 0
"3302" "exp3" 2 41 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 860 38 1
"3302" "exp3" 2 42 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1217 0 0
"3302" "exp3" 2 43 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 799 0 0
"3302" "exp3" 2 44 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 988 20 1
"3302" "exp3" 2 45 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 777 0 0
"3302" "exp3" 2 46 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 887 16 1
"3302" "exp3" 2 47 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 770 22 1
"3302" "exp3" 2 48 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 977 42 1
"3302" "exp3" 2 49 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 860 19 1
"3302" "exp3" 2 50 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 897 31 1
"3302" "exp3" 2 51 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1021 0 0
"3302" "exp3" 2 52 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 724 28 1
"3302" "exp3" 2 53 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1245 15 1
"3302" "exp3" 2 54 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 916 0 0
"3302" "exp3" 2 55 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1508 0 0
"3302" "exp3" 2 56 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 740 25 1
"3302" "exp3" 2 57 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 755 0 0
"3302" "exp3" 2 58 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 910 0 0
"3302" "exp3" 2 59 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1135 11 1
"3302" "exp3" 2 60 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 747 29 1
"3302" "exp3" 2 61 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1099 0 0
"3302" "exp3" 2 62 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 811 26 1
"3302" "exp3" 2 63 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1156 35 1
"3302" "exp3" 2 64 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1270 13 1
"3302" "exp3" 2 65 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 946 0 0
"3302" "exp3" 2 66 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 882 0 0
"3302" "exp3" 2 67 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 881 32 1
"3302" "exp3" 2 68 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 736 36 1
"3302" "exp3" 2 69 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1111 39 1
"3302" "exp3" 2 70 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 831 31 1
"3302" "exp3" 2 71 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 750 31 1
"3302" "exp3" 2 72 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 860 0 0
"3302" "exp3" 2 73 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1012 0 0
"3302" "exp3" 2 74 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 686 0 0
"3302" "exp3" 2 75 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 931 17 1
"3302" "exp3" 2 76 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1125 15 1
"3302" "exp3" 2 77 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 746 0 0
"3302" "exp3" 2 78 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 878 28 1
"3302" "exp3" 2 79 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 703 24 1
"3302" "exp3" 2 80 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1314 0 0
"3302" "exp3" 2 81 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 787 0 0
"3302" "exp3" 2 82 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1518 5 1
"3302" "exp3" 2 83 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 871 23 1
"3302" "exp3" 2 84 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 845 33 1
"3302" "exp3" 2 85 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 978 0 0
"3302" "exp3" 2 86 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 809 32 1
"3302" "exp3" 2 87 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1009 7 1
"3302" "exp3" 2 88 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 795 0 0
"3302" "exp3" 2 89 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 608 0 0
"3302" "exp3" 2 90 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 630 21 1
"3302" "exp3" 2 91 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 653 16 1
"3302" "exp3" 2 92 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 600 8 1
"3302" "exp3" 2 93 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1091 31 1
"3302" "exp3" 2 94 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1449 18 1
"3302" "exp3" 2 95 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 729 34 1
"3302" "exp3" 2 96 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 740 14 1
"3302" "exp3" 2 97 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1092 20 1
"3302" "exp3" 2 98 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 703 35 1
"3302" "exp3" 2 99 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 770 43 1
"3302" "exp3" 2 100 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 812 39 1
"3302" "exp3" 2 101 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1165 28 1
"3302" "exp3" 2 102 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 734 33 1
"3302" "exp3" 2 103 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 925 18 1
"3302" "exp3" 2 104 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 669 46 1
"3302" "exp3" 2 105 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1108 25 1
"3302" "exp3" 2 106 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 860 25 1
"3302" "exp3" 2 107 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 871 0 0
"3302" "exp3" 2 108 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1629 0 0
"3302" "exp3" 2 109 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1053 0 0
"3302" "exp3" 2 110 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1049 37 1
"3302" "exp3" 2 111 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 816 42 1
"3302" "exp3" 2 112 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1138 23 1
"3302" "exp3" 2 113 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 880 20 1
"3302" "exp3" 2 114 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 847 22 1
"3302" "exp3" 2 115 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 824 0 0
"3302" "exp3" 2 116 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 893 29 1
"3302" "exp3" 2 117 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 736 0 0
"3302" "exp3" 2 118 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1183 9 1
"3302" "exp3" 2 119 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 699 0 0
"3302" "exp3" 2 120 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1114 0 0
"3302" "exp3" 2 121 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 653 15 1
"3302" "exp3" 2 122 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 843 6 1
"3302" "exp3" 2 123 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 1159 7 1
"3302" "exp3" 2 124 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 749 21 1
"3302" "exp3" 2 125 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 818 17 1
"3302" "exp3" 2 126 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 639 24 1
"3302" "exp3" 2 127 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 600 19 1
"3302" "exp3" 2 128 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 703 30 1
"3302" "exp3" 2 129 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 770 0 0
"3302" "exp3" 2 130 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 824 0 0
"3302" "exp3" 2 131 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 630 34 1
"3302" "exp3" 2 132 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 729 37 1
"3302" "exp3" 1 1 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 830 12 1
"3302" "exp3" 1 2 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1566 10 1
"3302" "exp3" 1 3 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1028 22 1
"3302" "exp3" 1 4 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1342 27 1
"3302" "exp3" 1 5 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1831 22 1
"3302" "exp3" 1 6 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 1338 60 1
"3302" "exp3" 1 7 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1042 23 1
"3302" "exp3" 1 8 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1170 21 1
"3302" "exp3" 1 9 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1469 0 0
"3302" "exp3" 1 10 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1889 16 1
"3302" "exp3" 1 11 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1576 18 1
"3302" "exp3" 1 12 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1667 27 1
"3302" "exp3" 1 13 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1902 0 0
"3302" "exp3" 1 14 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1020 0 0
"3302" "exp3" 1 15 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 1523 0 0
"3302" "exp3" 1 16 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1524 23 1
"3302" "exp3" 1 17 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1241 28 1
"3302" "exp3" 1 18 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1129 34 1
"3302" "exp3" 1 19 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1293 37 1
"3302" "exp3" 1 20 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1062 28 1
"3302" "exp3" 1 21 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2125 0 0
"3302" "exp3" 1 22 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1471 43 1
"3302" "exp3" 1 23 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1629 26 1
"3302" "exp3" 1 24 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1230 20 1
"3302" "exp3" 1 25 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1258 26 1
"3302" "exp3" 1 26 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1068 19 1
"3302" "exp3" 1 27 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 917 23 1
"3302" "exp3" 1 28 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1103 0 0
"3302" "exp3" 1 29 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1079 15 1
"3302" "exp3" 1 30 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 1026 0 0
"3302" "exp3" 1 31 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1207 30 1
"3302" "exp3" 1 32 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1204 0 0
"3302" "exp3" 1 33 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1088 29 1
"3302" "exp3" 1 34 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1461 29 1
"3302" "exp3" 1 35 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 718 0 0
"3302" "exp3" 1 36 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1120 0 0
"3302" "exp3" 1 37 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1141 38 1
"3302" "exp3" 1 38 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1114 18 1
"3302" "exp3" 1 39 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1290 0 0
"3302" "exp3" 1 40 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1046 0 0
"3302" "exp3" 1 41 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1603 34 1
"3302" "exp3" 1 42 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 1243 0 0
"3302" "exp3" 1 43 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1337 21 1
"3302" "exp3" 1 44 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1332 31 1
"3302" "exp3" 1 45 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 979 25 1
"3302" "exp3" 1 46 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1411 41 1
"3302" "exp3" 1 47 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1123 0 0
"3302" "exp3" 1 48 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1554 0 0
"3302" "exp3" 1 49 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 1923 0 0
"3302" "exp3" 1 50 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1487 18 1
"3302" "exp3" 1 51 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1028 28 1
"3302" "exp3" 1 52 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1115 33 1
"3302" "exp3" 1 53 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1333 39 1
"3302" "exp3" 1 54 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 881 19 1
"3302" "exp3" 1 55 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1286 22 1
"3302" "exp3" 1 56 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1856 0 0
"3302" "exp3" 1 57 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1966 0 0
"3302" "exp3" 1 58 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 938 16 1
"3302" "exp3" 1 59 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2035 17 1
"3302" "exp3" 1 60 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1381 35 1
"3302" "exp3" 1 61 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1036 0 0
"3302" "exp3" 1 62 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 837 17 1
"3302" "exp3" 1 63 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1263 35 1
"3302" "exp3" 1 64 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 1128 0 0
"3302" "exp3" 1 65 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1307 0 0
"3302" "exp3" 1 66 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 784 17 1
"3302" "exp3" 1 67 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 1726 52 1
"3302" "exp3" 1 68 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 2331 12 1
"3302" "exp3" 1 69 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1515 31 1
"3302" "exp3" 1 70 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1272 0 0
"3302" "exp3" 1 71 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1440 33 1
"3302" "exp3" 1 72 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1600 0 0
"3302" "exp3" 1 73 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1992 6 1
"3302" "exp3" 1 74 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1457 7 1
"3302" "exp3" 1 75 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1640 36 1
"3302" "exp3" 1 76 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1099 9 1
"3302" "exp3" 1 77 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 2530 0 0
"3302" "exp3" 1 78 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1128 0 0
"3302" "exp3" 1 79 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1957 0 0
"3302" "exp3" 1 80 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 2119 56 1
"3302" "exp3" 1 81 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1407 19 1
"3302" "exp3" 1 82 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 980 14 1
"3302" "exp3" 1 83 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2680 0 0
"3302" "exp3" 1 84 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 2273 0 0
"3302" "exp3" 1 85 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1883 0 0
"3302" "exp3" 1 86 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 2173 0 0
"3302" "exp3" 1 87 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1013 13 1
"3302" "exp3" 1 88 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1506 20 1
"3302" "exp3" 1 89 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1052 0 0
"3302" "exp3" 1 90 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1125 24 1
"3302" "exp3" 1 91 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 2738 8 1
"3302" "exp3" 1 92 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1063 27 1
"3302" "exp3" 1 93 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1151 0 0
"3302" "exp3" 1 94 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1262 42 1
"3302" "exp3" 1 95 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2203 64 1
"3302" "exp3" 1 96 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 2051 19 1
"3302" "exp3" 1 97 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1083 32 1
"3302" "exp3" 1 98 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1646 33 1
"3302" "exp3" 1 99 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1182 0 0
"3302" "exp3" 1 100 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1194 15 1
"3302" "exp3" 1 101 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1346 42 1
"3302" "exp3" 1 102 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1376 0 0
"3302" "exp3" 1 103 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1297 34 1
"3302" "exp3" 1 104 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1327 0 0
"3302" "exp3" 1 105 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1285 0 0
"3302" "exp3" 1 106 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1314 0 0
"3302" "exp3" 1 107 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 939 16 1
"3302" "exp3" 1 108 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 1647 0 0
"3302" "exp3" 1 109 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1189 20 1
"3302" "exp3" 1 110 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 954 21 1
"3302" "exp3" 1 111 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1046 0 0
"3302" "exp3" 1 112 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1113 35 1
"3302" "exp3" 1 113 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 743 32 1
"3302" "exp3" 1 114 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 920 45 1
"3302" "exp3" 1 115 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1792 7 1
"3302" "exp3" 1 116 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1272 0 0
"3302" "exp3" 1 117 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1087 18 1
"3302" "exp3" 1 118 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1059 0 0
"3302" "exp3" 1 119 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1693 32 1
"3302" "exp3" 1 120 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1212 29 1
"3302" "exp3" 1 121 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1075 14 1
"3302" "exp3" 1 122 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 938 24 1
"3302" "exp3" 1 123 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 777 11 1
"3302" "exp3" 1 124 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1219 98 1
"3302" "exp3" 1 125 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 2480 20 1
"3302" "exp3" 1 126 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1105 25 1
"3302" "exp3" 1 127 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 1144 62 1
"3302" "exp3" 1 128 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1368 26 1
"3302" "exp3" 1 129 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 925 21 1
"3302" "exp3" 1 130 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1874 0 0
"3302" "exp3" 1 131 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1042 25 1
"3302" "exp3" 1 132 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 1301 5 1
"3302" "exp3" 2 1 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1436 0 0
"3302" "exp3" 2 2 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 677 0 0
"3302" "exp3" 2 3 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 693 0 0
"3302" "exp3" 2 4 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 936 30 1
"3302" "exp3" 2 5 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1033 0 0
"3302" "exp3" 2 6 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1726 0 0
"3302" "exp3" 2 7 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1661 27 1
"3302" "exp3" 2 8 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1258 27 1
"3302" "exp3" 2 9 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1043 39 1
"3302" "exp3" 2 10 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1333 45 1
"3302" "exp3" 2 11 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1108 21 1
"3302" "exp3" 2 12 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 966 0 0
"3302" "exp3" 2 13 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1070 6 1
"3302" "exp3" 2 14 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 2101 14 1
"3302" "exp3" 2 15 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1056 19 1
"3302" "exp3" 2 16 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 820 31 1
"3302" "exp3" 2 17 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1003 9 1
"3302" "exp3" 2 18 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1191 0 0
"3302" "exp3" 2 19 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1296 24 1
"3302" "exp3" 2 20 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 915 5 1
"3302" "exp3" 2 21 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 875 0 0
"3302" "exp3" 2 22 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1252 25 1
"3302" "exp3" 2 23 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 3114 0 0
"3302" "exp3" 2 24 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1142 0 0
"3302" "exp3" 2 25 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 791 24 1
"3302" "exp3" 2 26 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1533 0 0
"3302" "exp3" 2 27 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1007 0 0
"3302" "exp3" 2 28 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 938 0 0
"3302" "exp3" 2 29 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 837 15 1
"3302" "exp3" 2 30 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1104 0 0
"3302" "exp3" 2 31 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1548 0 0
"3302" "exp3" 2 32 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 750 8 1
"3302" "exp3" 2 33 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 937 0 0
"3302" "exp3" 2 34 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 921 36 1
"3302" "exp3" 2 35 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1072 33 1
"3302" "exp3" 2 36 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 847 16 1
"3302" "exp3" 2 37 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 772 0 0
"3302" "exp3" 2 38 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 695 7 1
"3302" "exp3" 2 39 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 986 40 1
"3302" "exp3" 2 40 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1458 0 0
"3302" "exp3" 2 41 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1440 31 1
"3302" "exp3" 2 42 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1625 99 1
"3302" "exp3" 2 43 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1936 41 1
"3302" "exp3" 2 44 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1855 19 1
"3302" "exp3" 2 45 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1436 13 1
"3302" "exp3" 2 46 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1026 25 1
"3302" "exp3" 2 47 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1167 20 1
"3302" "exp3" 2 48 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1143 39 1
"3302" "exp3" 2 49 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1686 33 1
"3302" "exp3" 2 50 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1605 0 0
"3302" "exp3" 2 51 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1164 0 0
"3302" "exp3" 2 52 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 920 21 1
"3302" "exp3" 2 53 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1763 0 0
"3302" "exp3" 2 54 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1061 22 1
"3302" "exp3" 2 55 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1161 0 0
"3302" "exp3" 2 56 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1381 46 1
"3302" "exp3" 2 57 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1395 27 1
"3302" "exp3" 2 58 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1380 21 1
"3302" "exp3" 2 59 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1148 0 0
"3302" "exp3" 2 60 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1200 0 0
"3302" "exp3" 2 61 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1000 36 1
"3302" "exp3" 2 62 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1308 32 1
"3302" "exp3" 2 63 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 874 13 1
"3302" "exp3" 2 64 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1188 29 1
"3302" "exp3" 2 65 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 1543 58 1
"3302" "exp3" 2 66 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 1442 0 0
"3302" "exp3" 2 67 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 2454 17 1
"3302" "exp3" 2 68 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1075 26 1
"3302" "exp3" 2 69 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1160 0 0
"3302" "exp3" 2 70 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1442 0 0
"3302" "exp3" 2 71 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1085 40 1
"3302" "exp3" 2 72 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1146 16 1
"3302" "exp3" 2 73 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 897 0 0
"3302" "exp3" 2 74 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1145 11 1
"3302" "exp3" 2 75 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 994 25 1
"3302" "exp3" 2 76 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 909 0 0
"3302" "exp3" 2 77 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 916 23 1
"3302" "exp3" 2 78 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1197 0 0
"3302" "exp3" 2 79 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1268 23 1
"3302" "exp3" 2 80 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 910 0 0
"3302" "exp3" 2 81 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 784 0 0
"3302" "exp3" 2 82 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 805 22 1
"3302" "exp3" 2 83 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1171 32 1
"3302" "exp3" 2 84 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 762 10 1
"3302" "exp3" 2 85 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1203 15 1
"3302" "exp3" 2 86 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 861 23 1
"3302" "exp3" 2 87 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 864 23 1
"3302" "exp3" 2 88 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1014 43 1
"3302" "exp3" 2 89 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 809 10 1
"3302" "exp3" 2 90 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 1104 2 1
"3302" "exp3" 2 91 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1549 30 1
"3302" "exp3" 2 92 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1380 12 1
"3302" "exp3" 2 93 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1624 0 0
"3302" "exp3" 2 94 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1277 4 1
"3302" "exp3" 2 95 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1366 27 1
"3302" "exp3" 2 96 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1789 44 1
"3302" "exp3" 2 97 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 876 20 1
"3302" "exp3" 2 98 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 834 26 1
"3302" "exp3" 2 99 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1305 0 0
"3302" "exp3" 2 100 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 930 0 0
"3302" "exp3" 2 101 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1391 0 0
"3302" "exp3" 2 102 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1160 26 1
"3302" "exp3" 2 103 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 866 15 1
"3302" "exp3" 2 104 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 787 38 1
"3302" "exp3" 2 105 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1345 34 1
"3302" "exp3" 2 106 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1162 35 1
"3302" "exp3" 2 107 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 900 14 1
"3302" "exp3" 2 108 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 660 0 0
"3302" "exp3" 2 109 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 817 0 0
"3302" "exp3" 2 110 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 996 17 1
"3302" "exp3" 2 111 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 699 28 1
"3302" "exp3" 2 112 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 596 24 1
"3302" "exp3" 2 113 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1791 13 1
"3302" "exp3" 2 114 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1008 35 1
"3302" "exp3" 2 115 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 783 9 1
"3302" "exp3" 2 116 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 967 14 1
"3302" "exp3" 2 117 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 813 31 1
"3302" "exp3" 2 118 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 993 28 1
"3302" "exp3" 2 119 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1299 63 1
"3302" "exp3" 2 120 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 918 18 1
"3302" "exp3" 2 121 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1159 44 1
"3302" "exp3" 2 122 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 953 36 1
"3302" "exp3" 2 123 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 774 18 1
"3302" "exp3" 2 124 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 895 25 1
"3302" "exp3" 2 125 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1064 47 1
"3302" "exp3" 2 126 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 810 32 1
"3302" "exp3" 2 127 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1089 0 0
"3302" "exp3" 2 128 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2113 38 1
"3302" "exp3" 2 129 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 940 18 1
"3302" "exp3" 2 130 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2111 17 1
"3302" "exp3" 2 131 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 907 21 1
"3302" "exp3" 2 132 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 998 28 1
"3302" "exp3" 1 1 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1226 19 1
"3302" "exp3" 1 2 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1621 10 1
"3302" "exp3" 1 3 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1482 7 1
"3302" "exp3" 1 4 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 786 34 1
"3302" "exp3" 1 5 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 706 27 1
"3302" "exp3" 1 6 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 808 45 1
"3302" "exp3" 1 7 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 853 11 1
"3302" "exp3" 1 8 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 635 39 1
"3302" "exp3" 1 9 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 709 37 1
"3302" "exp3" 1 10 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 645 18 1
"3302" "exp3" 1 11 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 735 26 1
"3302" "exp3" 1 12 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 941 28 1
"3302" "exp3" 1 13 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 554 0 0
"3302" "exp3" 1 14 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 570 33 1
"3302" "exp3" 1 15 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 528 0 0
"3302" "exp3" 1 16 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 796 67 1
"3302" "exp3" 1 17 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 719 17 1
"3302" "exp3" 1 18 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 588 25 1
"3302" "exp3" 1 19 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1004 30 1
"3302" "exp3" 1 20 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 686 20 1
"3302" "exp3" 1 21 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 575 0 0
"3302" "exp3" 1 22 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 456 27 1
"3302" "exp3" 1 23 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 509 16 1
"3302" "exp3" 1 24 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 435 22 1
"3302" "exp3" 1 25 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 912 0 0
"3302" "exp3" 1 26 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 900 0 0
"3302" "exp3" 1 27 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1492 0 0
"3302" "exp3" 1 28 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 629 16 1
"3302" "exp3" 1 29 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 503 36 1
"3302" "exp3" 1 30 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 427 30 1
"3302" "exp3" 1 31 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 697 29 1
"3302" "exp3" 1 32 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 684 5 1
"3302" "exp3" 1 33 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 386 0 0
"3302" "exp3" 1 34 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 614 0 0
"3302" "exp3" 1 35 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 615 33 1
"3302" "exp3" 1 36 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 833 0 0
"3302" "exp3" 1 37 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 441 0 0
"3302" "exp3" 1 38 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 860 30 1
"3302" "exp3" 1 39 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 732 49 1
"3302" "exp3" 1 40 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1244 0 0
"3302" "exp3" 1 41 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 661 0 0
"3302" "exp3" 1 42 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 574 0 0
"3302" "exp3" 1 43 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 840 21 1
"3302" "exp3" 1 44 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 652 0 0
"3302" "exp3" 1 45 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 828 13 1
"3302" "exp3" 1 46 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 918 14 1
"3302" "exp3" 1 47 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 866 0 0
"3302" "exp3" 1 48 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 647 12 1
"3302" "exp3" 1 49 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 663 9 1
"3302" "exp3" 1 50 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 756 35 1
"3302" "exp3" 1 51 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 449 24 1
"3302" "exp3" 1 52 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 664 0 0
"3302" "exp3" 1 53 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 643 0 0
"3302" "exp3" 1 54 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 881 0 0
"3302" "exp3" 1 55 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 608 27 1
"3302" "exp3" 1 56 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 412 0 0
"3302" "exp3" 1 57 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 473 23 1
"3302" "exp3" 1 58 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 487 0 0
"3302" "exp3" 1 59 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 481 3 1
"3302" "exp3" 1 60 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 676 46 1
"3302" "exp3" 1 61 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 650 16 1
"3302" "exp3" 1 62 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 845 36 1
"3302" "exp3" 1 63 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1558 15 1
"3302" "exp3" 1 64 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1377 0 0
"3302" "exp3" 1 65 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 681 5 1
"3302" "exp3" 1 66 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 719 43 1
"3302" "exp3" 1 67 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 721 47 1
"3302" "exp3" 1 68 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 853 0 0
"3302" "exp3" 1 69 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 697 0 0
"3302" "exp3" 1 70 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 700 34 1
"3302" "exp3" 1 71 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 821 18 1
"3302" "exp3" 1 72 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 921 26 1
"3302" "exp3" 1 73 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1034 0 0
"3302" "exp3" 1 74 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 892 0 0
"3302" "exp3" 1 75 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 872 22 1
"3302" "exp3" 1 76 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 648 0 0
"3302" "exp3" 1 77 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 674 0 0
"3302" "exp3" 1 78 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 556 0 0
"3302" "exp3" 1 79 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 552 29 1
"3302" "exp3" 1 80 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1105 0 0
"3302" "exp3" 1 81 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 565 11 1
"3302" "exp3" 1 82 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 547 14 1
"3302" "exp3" 1 83 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 461 10 1
"3302" "exp3" 1 84 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 547 0 0
"3302" "exp3" 1 85 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 639 24 1
"3302" "exp3" 1 86 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 611 23 1
"3302" "exp3" 1 87 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 543 20 1
"3302" "exp3" 1 88 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 507 15 1
"3302" "exp3" 1 89 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 634 24 1
"3302" "exp3" 1 90 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 986 25 1
"3302" "exp3" 1 91 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 504 35 1
"3302" "exp3" 1 92 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 582 0 0
"3302" "exp3" 1 93 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 838 25 1
"3302" "exp3" 1 94 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 462 23 1
"3302" "exp3" 1 95 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 418 45 1
"3302" "exp3" 1 96 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 705 0 0
"3302" "exp3" 1 97 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1118 0 0
"3302" "exp3" 1 98 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 451 19 1
"3302" "exp3" 1 99 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 495 37 1
"3302" "exp3" 1 100 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 537 21 1
"3302" "exp3" 1 101 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 646 21 1
"3302" "exp3" 1 102 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 445 2 1
"3302" "exp3" 1 103 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 423 31 1
"3302" "exp3" 1 104 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 498 17 1
"3302" "exp3" 1 105 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 573 32 1
"3302" "exp3" 1 106 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 930 52 1
"3302" "exp3" 1 107 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 697 18 1
"3302" "exp3" 1 108 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 474 6 1
"3302" "exp3" 1 109 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 567 20 1
"3302" "exp3" 1 110 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 555 66 1
"3302" "exp3" 1 111 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 587 7 1
"3302" "exp3" 1 112 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 705 0 0
"3302" "exp3" 1 113 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 534 27 1
"3302" "exp3" 1 114 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 612 40 1
"3302" "exp3" 1 115 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1168 0 0
"3302" "exp3" 1 116 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 593 28 1
"3302" "exp3" 1 117 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1358 69 1
"3302" "exp3" 1 118 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 834 0 0
"3302" "exp3" 1 119 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1266 0 0
"3302" "exp3" 1 120 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 846 41 1
"3302" "exp3" 1 121 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 916 0 0
"3302" "exp3" 1 122 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1361 0 0
"3302" "exp3" 1 123 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 816 8 1
"3302" "exp3" 1 124 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 435 17 1
"3302" "exp3" 1 125 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 541 15 1
"3302" "exp3" 1 126 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 496 0 0
"3302" "exp3" 1 127 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 842 24 1
"3302" "exp3" 1 128 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 560 41 1
"3302" "exp3" 1 129 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 497 9 1
"3302" "exp3" 1 130 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 485 13 1
"3302" "exp3" 1 131 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 525 22 1
"3302" "exp3" 1 132 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 379 44 1
"3302" "exp3" 2 1 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 656 13 1
"3302" "exp3" 2 2 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 431 39 1
"3302" "exp3" 2 3 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 401 29 1
"3302" "exp3" 2 4 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 358 37 1
"3302" "exp3" 2 5 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 459 0 0
"3302" "exp3" 2 6 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 651 8 1
"3302" "exp3" 2 7 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 553 6 1
"3302" "exp3" 2 8 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 937 0 0
"3302" "exp3" 2 9 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 475 27 1
"3302" "exp3" 2 10 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 615 0 0
"3302" "exp3" 2 11 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 719 0 0
"3302" "exp3" 2 12 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 768 0 0
"3302" "exp3" 2 13 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 878 0 0
"3302" "exp3" 2 14 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 723 21 1
"3302" "exp3" 2 15 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 994 0 0
"3302" "exp3" 2 16 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 662 27 1
"3302" "exp3" 2 17 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 516 21 1
"3302" "exp3" 2 18 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 550 18 1
"3302" "exp3" 2 19 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 487 36 1
"3302" "exp3" 2 20 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 514 24 1
"3302" "exp3" 2 21 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 435 0 0
"3302" "exp3" 2 22 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 451 9 1
"3302" "exp3" 2 23 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 578 30 1
"3302" "exp3" 2 24 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 545 20 1
"3302" "exp3" 2 25 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 685 0 0
"3302" "exp3" 2 26 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 477 42 1
"3302" "exp3" 2 27 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1037 17 1
"3302" "exp3" 2 28 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 727 13 1
"3302" "exp3" 2 29 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 611 4 1
"3302" "exp3" 2 30 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 621 31 1
"3302" "exp3" 2 31 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 939 0 0
"3302" "exp3" 2 32 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 657 16 1
"3302" "exp3" 2 33 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 672 31 1
"3302" "exp3" 2 34 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 585 11 1
"3302" "exp3" 2 35 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 537 0 0
"3302" "exp3" 2 36 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 819 7 1
"3302" "exp3" 2 37 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 628 25 1
"3302" "exp3" 2 38 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 486 8 1
"3302" "exp3" 2 39 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 704 0 0
"3302" "exp3" 2 40 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 724 47 1
"3302" "exp3" 2 41 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 645 0 0
"3302" "exp3" 2 42 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 478 30 1
"3302" "exp3" 2 43 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 966 0 0
"3302" "exp3" 2 44 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1362 0 0
"3302" "exp3" 2 45 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 594 14 1
"3302" "exp3" 2 46 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 540 44 1
"3302" "exp3" 2 47 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 525 22 1
"3302" "exp3" 2 48 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 611 67 1
"3302" "exp3" 2 49 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 583 22 1
"3302" "exp3" 2 50 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 643 39 1
"3302" "exp3" 2 51 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 599 0 0
"3302" "exp3" 2 52 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 678 27 1
"3302" "exp3" 2 53 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 783 0 0
"3302" "exp3" 2 54 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 415 0 0
"3302" "exp3" 2 55 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 363 0 0
"3302" "exp3" 2 56 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 436 24 1
"3302" "exp3" 2 57 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 358 15 1
"3302" "exp3" 2 58 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 530 32 1
"3302" "exp3" 2 59 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 598 15 1
"3302" "exp3" 2 60 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 648 45 1
"3302" "exp3" 2 61 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 545 17 1
"3302" "exp3" 2 62 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 726 27 1
"3302" "exp3" 2 63 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 570 0 0
"3302" "exp3" 2 64 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 810 0 0
"3302" "exp3" 2 65 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1013 0 0
"3302" "exp3" 2 66 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 763 0 0
"3302" "exp3" 2 67 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 550 19 1
"3302" "exp3" 2 68 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 463 10 1
"3302" "exp3" 2 69 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 687 0 0
"3302" "exp3" 2 70 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 555 14 1
"3302" "exp3" 2 71 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 540 18 1
"3302" "exp3" 2 72 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 563 10 1
"3302" "exp3" 2 73 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 508 28 1
"3302" "exp3" 2 74 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 674 57 1
"3302" "exp3" 2 75 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 976 0 0
"3302" "exp3" 2 76 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 726 0 0
"3302" "exp3" 2 77 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 895 0 0
"3302" "exp3" 2 78 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 1218 0 0
"3302" "exp3" 2 79 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 709 23 1
"3302" "exp3" 2 80 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 679 0 0
"3302" "exp3" 2 81 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 507 6 1
"3302" "exp3" 2 82 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 2413 0 0
"3302" "exp3" 2 83 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 812 18 1
"3302" "exp3" 2 84 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 559 33 1
"3302" "exp3" 2 85 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 464 16 1
"3302" "exp3" 2 86 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 362 7 1
"3302" "exp3" 2 87 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 432 22 1
"3302" "exp3" 2 88 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 405 0 0
"3302" "exp3" 2 89 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 848 0 0
"3302" "exp3" 2 90 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 568 21 1
"3302" "exp3" 2 91 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 835 0 0
"3302" "exp3" 2 92 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 628 26 1
"3302" "exp3" 2 93 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1562 68 1
"3302" "exp3" 2 94 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 871 0 0
"3302" "exp3" 2 95 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 824 0 0
"3302" "exp3" 2 96 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 717 23 1
"3302" "exp3" 2 97 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 617 0 0
"3302" "exp3" 2 98 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 765 20 1
"3302" "exp3" 2 99 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 907 19 1
"3302" "exp3" 2 100 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 739 0 0
"3302" "exp3" 2 101 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 598 12 1
"3302" "exp3" 2 102 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 578 0 0
"3302" "exp3" 2 103 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 525 35 1
"3302" "exp3" 2 104 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 960 15 1
"3302" "exp3" 2 105 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 573 37 1
"3302" "exp3" 2 106 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 513 20 1
"3302" "exp3" 2 107 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 441 13 1
"3302" "exp3" 2 108 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 545 23 1
"3302" "exp3" 2 109 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 716 42 1
"3302" "exp3" 2 110 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 477 31 1
"3302" "exp3" 2 111 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 631 33 1
"3302" "exp3" 2 112 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 398 0 0
"3302" "exp3" 2 113 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 360 0 0
"3302" "exp3" 2 114 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 465 0 0
"3302" "exp3" 2 115 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 378 12 1
"3302" "exp3" 2 116 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 394 0 0
"3302" "exp3" 2 117 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 556 19 1
"3302" "exp3" 2 118 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 475 22 1
"3302" "exp3" 2 119 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 733 0 0
"3302" "exp3" 2 120 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 929 19 1
"3302" "exp3" 2 121 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 923 32 1
"3302" "exp3" 2 122 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 530 18 1
"3302" "exp3" 2 123 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 761 0 0
"3302" "exp3" 2 124 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 421 0 0
"3302" "exp3" 2 125 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 476 0 0
"3302" "exp3" 2 126 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 872 0 0
"3302" "exp3" 2 127 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 958 0 0
"3302" "exp3" 2 128 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 572 17 1
"3302" "exp3" 2 129 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 378 0 0
"3302" "exp3" 2 130 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 681 11 1
"3302" "exp3" 2 131 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 362 25 1
"3302" "exp3" 2 132 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 300 29 1
"3303" "exp3" 1 1 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 501 22 1
"3303" "exp3" 1 2 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 556 28 1
"3303" "exp3" 1 3 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 418 0 0
"3303" "exp3" 1 4 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 593 2 1
"3303" "exp3" 1 5 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 519 23 1
"3303" "exp3" 1 6 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 497 35 1
"3303" "exp3" 1 7 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 768 0 0
"3303" "exp3" 1 8 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 752 44 1
"3303" "exp3" 1 9 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 863 23 1
"3303" "exp3" 1 10 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1604 11 1
"3303" "exp3" 1 11 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 2384 0 0
"3303" "exp3" 1 12 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1093 0 0
"3303" "exp3" 1 13 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1262 0 0
"3303" "exp3" 1 14 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1068 0 0
"3303" "exp3" 1 15 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1396 0 0
"3303" "exp3" 1 16 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 917 0 0
"3303" "exp3" 1 17 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1619 80 1
"3303" "exp3" 1 18 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1072 0 0
"3303" "exp3" 1 19 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1584 0 0
"3303" "exp3" 1 20 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 838 44 1
"3303" "exp3" 1 21 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 883 37 1
"3303" "exp3" 1 22 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 1187 0 0
"3303" "exp3" 1 23 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 938 31 1
"3303" "exp3" 1 24 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1082 0 0
"3303" "exp3" 1 25 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1249 0 0
"3303" "exp3" 1 26 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 1594 0 0
"3303" "exp3" 1 27 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1404 41 1
"3303" "exp3" 1 28 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1276 27 1
"3303" "exp3" 1 29 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 770 33 1
"3303" "exp3" 1 30 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 983 0 0
"3303" "exp3" 1 31 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1231 74 1
"3303" "exp3" 1 32 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1536 0 0
"3303" "exp3" 1 33 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1110 0 0
"3303" "exp3" 1 34 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 654 31 1
"3303" "exp3" 1 35 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1380 12 1
"3303" "exp3" 1 36 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1157 0 0
"3303" "exp3" 1 37 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 769 0 0
"3303" "exp3" 1 38 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 855 18 1
"3303" "exp3" 1 39 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1116 25 1
"3303" "exp3" 1 40 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1088 0 0
"3303" "exp3" 1 41 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1011 31 1
"3303" "exp3" 1 42 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 960 23 1
"3303" "exp3" 1 43 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 872 21 1
"3303" "exp3" 1 44 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1048 16 1
"3303" "exp3" 1 45 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 796 0 0
"3303" "exp3" 1 46 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 829 30 1
"3303" "exp3" 1 47 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 586 32 1
"3303" "exp3" 1 48 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 718 29 1
"3303" "exp3" 1 49 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1368 13 1
"3303" "exp3" 1 50 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1532 29 1
"3303" "exp3" 1 51 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1820 19 1
"3303" "exp3" 1 52 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 830 27 1
"3303" "exp3" 1 53 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 1234 0 0
"3303" "exp3" 1 54 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 636 33 1
"3303" "exp3" 1 55 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1224 0 0
"3303" "exp3" 1 56 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 1160 0 0
"3303" "exp3" 1 57 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1047 72 1
"3303" "exp3" 1 58 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1336 0 0
"3303" "exp3" 1 59 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1231 0 0
"3303" "exp3" 1 60 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1163 0 0
"3303" "exp3" 1 61 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1043 0 0
"3303" "exp3" 1 62 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1136 0 0
"3303" "exp3" 1 63 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1061 43 1
"3303" "exp3" 1 64 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1234 24 1
"3303" "exp3" 1 65 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 2926 0 0
"3303" "exp3" 1 66 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1248 0 0
"3303" "exp3" 1 67 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1075 45 1
"3303" "exp3" 1 68 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 826 32 1
"3303" "exp3" 1 69 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 631 0 0
"3303" "exp3" 1 70 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 716 29 1
"3303" "exp3" 1 71 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 826 0 0
"3303" "exp3" 1 72 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1377 34 1
"3303" "exp3" 1 73 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 836 0 0
"3303" "exp3" 1 74 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1340 0 0
"3303" "exp3" 1 75 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1040 0 0
"3303" "exp3" 1 76 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 695 0 0
"3303" "exp3" 1 77 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1158 28 1
"3303" "exp3" 1 78 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1436 35 1
"3303" "exp3" 1 79 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1902 0 0
"3303" "exp3" 1 80 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 812 89 1
"3303" "exp3" 1 81 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 895 45 1
"3303" "exp3" 1 82 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 925 42 1
"3303" "exp3" 1 83 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 72 0 0
"3303" "exp3" 1 84 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1929 0 0
"3303" "exp3" 1 85 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 971 37 1
"3303" "exp3" 1 86 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 630 0 0
"3303" "exp3" 1 87 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 1692 0 0
"3303" "exp3" 1 88 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 798 0 0
"3303" "exp3" 1 89 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 743 0 0
"3303" "exp3" 1 90 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1038 80 1
"3303" "exp3" 1 91 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 768 88 1
"3303" "exp3" 1 92 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 509 33 1
"3303" "exp3" 1 93 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1151 0 0
"3303" "exp3" 1 94 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 878 0 0
"3303" "exp3" 1 95 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 842 0 0
"3303" "exp3" 1 96 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1336 0 0
"3303" "exp3" 1 97 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 571 0 0
"3303" "exp3" 1 98 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1138 15 1
"3303" "exp3" 1 99 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1527 38 1
"3303" "exp3" 1 100 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 790 0 0
"3303" "exp3" 1 101 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1278 0 0
"3303" "exp3" 1 102 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 931 0 0
"3303" "exp3" 1 103 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 542 0 0
"3303" "exp3" 1 104 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 878 26 1
"3303" "exp3" 1 105 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 554 0 0
"3303" "exp3" 1 106 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 1161 0 0
"3303" "exp3" 1 107 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 665 0 0
"3303" "exp3" 1 108 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 740 0 0
"3303" "exp3" 1 109 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 645 24 1
"3303" "exp3" 1 110 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 716 0 0
"3303" "exp3" 1 111 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 588 86 1
"3303" "exp3" 1 112 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1153 41 1
"3303" "exp3" 1 113 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1217 40 1
"3303" "exp3" 1 114 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 2591 0 0
"3303" "exp3" 1 115 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 917 30 1
"3303" "exp3" 1 116 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 881 34 1
"3303" "exp3" 1 117 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 726 33 1
"3303" "exp3" 1 118 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1530 22 1
"3303" "exp3" 1 119 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 979 0 0
"3303" "exp3" 1 120 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1083 0 0
"3303" "exp3" 1 121 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1522 47 1
"3303" "exp3" 1 122 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1106 42 1
"3303" "exp3" 1 123 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2358 0 0
"3303" "exp3" 1 124 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1115 30 1
"3303" "exp3" 1 125 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 2263 37 1
"3303" "exp3" 1 126 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1377 0 0
"3303" "exp3" 1 127 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1156 25 1
"3303" "exp3" 1 128 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 724 36 1
"3303" "exp3" 1 129 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 952 32 1
"3303" "exp3" 1 130 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1030 92 1
"3303" "exp3" 1 131 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 782 35 1
"3303" "exp3" 1 132 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1161 0 0
"3303" "exp3" 2 1 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 685 21 1
"3303" "exp3" 2 2 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1768 0 0
"3303" "exp3" 2 3 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 753 0 0
"3303" "exp3" 2 4 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 2241 0 0
"3303" "exp3" 2 5 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 939 0 0
"3303" "exp3" 2 6 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1113 0 0
"3303" "exp3" 2 7 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1271 23 1
"3303" "exp3" 2 8 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 891 22 1
"3303" "exp3" 2 9 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 541 44 1
"3303" "exp3" 2 10 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1859 0 0
"3303" "exp3" 2 11 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 617 0 0
"3303" "exp3" 2 12 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 650 0 0
"3303" "exp3" 2 13 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 982 0 0
"3303" "exp3" 2 14 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 645 0 0
"3303" "exp3" 2 15 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 586 32 1
"3303" "exp3" 2 16 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2040 0 0
"3303" "exp3" 2 17 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 705 0 0
"3303" "exp3" 2 18 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1258 0 0
"3303" "exp3" 2 19 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 833 0 0
"3303" "exp3" 2 20 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1022 0 0
"3303" "exp3" 2 21 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 2527 38 1
"3303" "exp3" 2 22 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 583 0 0
"3303" "exp3" 2 23 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 595 0 0
"3303" "exp3" 2 24 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 430 0 0
"3303" "exp3" 2 25 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1088 0 0
"3303" "exp3" 2 26 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 866 26 1
"3303" "exp3" 2 27 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 784 0 0
"3303" "exp3" 2 28 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1267 31 1
"3303" "exp3" 2 29 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 764 0 0
"3303" "exp3" 2 30 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1964 26 1
"3303" "exp3" 2 31 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 738 35 1
"3303" "exp3" 2 32 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 836 0 0
"3303" "exp3" 2 33 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1029 31 1
"3303" "exp3" 2 34 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1221 0 0
"3303" "exp3" 2 35 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2225 47 1
"3303" "exp3" 2 36 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1215 42 1
"3303" "exp3" 2 37 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 827 0 0
"3303" "exp3" 2 38 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 940 26 1
"3303" "exp3" 2 39 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 617 0 0
"3303" "exp3" 2 40 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 674 0 0
"3303" "exp3" 2 41 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 772 9 1
"3303" "exp3" 2 42 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 2023 0 0
"3303" "exp3" 2 43 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1428 0 0
"3303" "exp3" 2 44 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 2218 76 1
"3303" "exp3" 2 45 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1093 0 0
"3303" "exp3" 2 46 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 773 0 0
"3303" "exp3" 2 47 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 1117 0 0
"3303" "exp3" 2 48 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1561 27 1
"3303" "exp3" 2 49 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 780 0 0
"3303" "exp3" 2 50 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 804 23 1
"3303" "exp3" 2 51 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 601 0 0
"3303" "exp3" 2 52 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 998 0 0
"3303" "exp3" 2 53 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 1236 0 0
"3303" "exp3" 2 54 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1253 79 1
"3303" "exp3" 2 55 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1339 39 1
"3303" "exp3" 2 56 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1100 0 0
"3303" "exp3" 2 57 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1116 24 1
"3303" "exp3" 2 58 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 744 0 0
"3303" "exp3" 2 59 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1004 30 1
"3303" "exp3" 2 60 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1032 70 1
"3303" "exp3" 2 61 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1288 0 0
"3303" "exp3" 2 62 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 761 0 0
"3303" "exp3" 2 63 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1030 0 0
"3303" "exp3" 2 64 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 544 22 1
"3303" "exp3" 2 65 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1093 0 0
"3303" "exp3" 2 66 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1162 0 0
"3303" "exp3" 2 67 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 935 0 0
"3303" "exp3" 2 68 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2061 29 1
"3303" "exp3" 2 69 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 637 0 0
"3303" "exp3" 2 70 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1267 19 1
"3303" "exp3" 2 71 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1175 33 1
"3303" "exp3" 2 72 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 708 0 0
"3303" "exp3" 2 73 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 607 0 0
"3303" "exp3" 2 74 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 1043 0 0
"3303" "exp3" 2 75 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 605 0 0
"3303" "exp3" 2 76 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 665 0 0
"3303" "exp3" 2 77 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 693 34 1
"3303" "exp3" 2 78 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1076 0 0
"3303" "exp3" 2 79 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 1369 0 0
"3303" "exp3" 2 80 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 972 0 0
"3303" "exp3" 2 81 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 736 33 1
"3303" "exp3" 2 82 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 524 19 1
"3303" "exp3" 2 83 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 669 0 0
"3303" "exp3" 2 84 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 500 29 1
"3303" "exp3" 2 85 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1130 0 0
"3303" "exp3" 2 86 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 551 21 1
"3303" "exp3" 2 87 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 1132 52 1
"3303" "exp3" 2 88 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1371 0 0
"3303" "exp3" 2 89 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 2009 0 0
"3303" "exp3" 2 90 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1025 38 1
"3303" "exp3" 2 91 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 736 92 1
"3303" "exp3" 2 92 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 756 32 1
"3303" "exp3" 2 93 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 784 25 1
"3303" "exp3" 2 94 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 961 0 0
"3303" "exp3" 2 95 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1025 0 0
"3303" "exp3" 2 96 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 856 0 0
"3303" "exp3" 2 97 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 629 37 1
"3303" "exp3" 2 98 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 767 77 1
"3303" "exp3" 2 99 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 945 27 1
"3303" "exp3" 2 100 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1183 40 1
"3303" "exp3" 2 101 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1182 0 0
"3303" "exp3" 2 102 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 635 0 0
"3303" "exp3" 2 103 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 561 0 0
"3303" "exp3" 2 104 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 543 0 0
"3303" "exp3" 2 105 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 493 0 0
"3303" "exp3" 2 106 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 910 0 0
"3303" "exp3" 2 107 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 572 82 1
"3303" "exp3" 2 108 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 536 76 1
"3303" "exp3" 2 109 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1286 29 1
"3303" "exp3" 2 110 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 778 0 0
"3303" "exp3" 2 111 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1360 23 1
"3303" "exp3" 2 112 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 590 89 1
"3303" "exp3" 2 113 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 701 0 0
"3303" "exp3" 2 114 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 857 69 1
"3303" "exp3" 2 115 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 913 64 1
"3303" "exp3" 2 116 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1012 43 1
"3303" "exp3" 2 117 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1165 0 0
"3303" "exp3" 2 118 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1239 49 1
"3303" "exp3" 2 119 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1270 28 1
"3303" "exp3" 2 120 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1788 0 0
"3303" "exp3" 2 121 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 657 0 0
"3303" "exp3" 2 122 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 1808 0 0
"3303" "exp3" 2 123 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 980 37 1
"3303" "exp3" 2 124 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 852 81 1
"3303" "exp3" 2 125 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 1031 0 0
"3303" "exp3" 2 126 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 721 0 0
"3303" "exp3" 2 127 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 1692 0 0
"3303" "exp3" 2 128 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 655 58 1
"3303" "exp3" 2 129 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1067 0 0
"3303" "exp3" 2 130 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 755 0 0
"3303" "exp3" 2 131 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 776 0 0
"3303" "exp3" 2 132 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1693 36 1
"3303" "exp3" 1 1 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 1307 9 1
"3303" "exp3" 1 2 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 845 0 0
"3303" "exp3" 1 3 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1143 0 0
"3303" "exp3" 1 4 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 952 0 0
"3303" "exp3" 1 5 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1156 18 1
"3303" "exp3" 1 6 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1897 0 0
"3303" "exp3" 1 7 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1359 0 0
"3303" "exp3" 1 8 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1910 0 0
"3303" "exp3" 1 9 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 1122 0 0
"3303" "exp3" 1 10 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2455 0 0
"3303" "exp3" 1 11 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 1760 0 0
"3303" "exp3" 1 12 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 2525 61 1
"3303" "exp3" 1 13 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1530 0 0
"3303" "exp3" 1 14 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1712 0 0
"3303" "exp3" 1 15 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 3183 35 1
"3303" "exp3" 1 16 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 1221 0 0
"3303" "exp3" 1 17 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1956 0 0
"3303" "exp3" 1 18 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 2160 0 0
"3303" "exp3" 1 19 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1671 35 1
"3303" "exp3" 1 20 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1486 14 1
"3303" "exp3" 1 21 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1029 0 0
"3303" "exp3" 1 22 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 3173 43 1
"3303" "exp3" 1 23 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1620 0 0
"3303" "exp3" 1 24 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 1001 0 0
"3303" "exp3" 1 25 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1197 42 1
"3303" "exp3" 1 26 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1090 0 0
"3303" "exp3" 1 27 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 935 26 1
"3303" "exp3" 1 28 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1001 0 0
"3303" "exp3" 1 29 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 831 0 0
"3303" "exp3" 1 30 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 652 0 0
"3303" "exp3" 1 31 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 833 25 1
"3303" "exp3" 1 32 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 804 27 1
"3303" "exp3" 1 33 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 692 22 1
"3303" "exp3" 1 34 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 972 43 1
"3303" "exp3" 1 35 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 700 38 1
"3303" "exp3" 1 36 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 746 0 0
"3303" "exp3" 1 37 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 925 94 1
"3303" "exp3" 1 38 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1450 0 0
"3303" "exp3" 1 39 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1035 0 0
"3303" "exp3" 1 40 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1650 27 1
"3303" "exp3" 1 41 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 840 28 1
"3303" "exp3" 1 42 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 779 0 0
"3303" "exp3" 1 43 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 717 19 1
"3303" "exp3" 1 44 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 687 0 0
"3303" "exp3" 1 45 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1004 0 0
"3303" "exp3" 1 46 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 837 0 0
"3303" "exp3" 1 47 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 1051 65 1
"3303" "exp3" 1 48 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 852 0 0
"3303" "exp3" 1 49 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1024 34 1
"3303" "exp3" 1 50 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 997 0 0
"3303" "exp3" 1 51 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 687 0 0
"3303" "exp3" 1 52 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1250 31 1
"3303" "exp3" 1 53 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 878 32 1
"3303" "exp3" 1 54 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 842 0 0
"3303" "exp3" 1 55 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 732 36 1
"3303" "exp3" 1 56 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 842 0 0
"3303" "exp3" 1 57 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 758 0 0
"3303" "exp3" 1 58 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 1077 61 1
"3303" "exp3" 1 59 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 743 0 0
"3303" "exp3" 1 60 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 792 37 1
"3303" "exp3" 1 61 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 509 0 0
"3303" "exp3" 1 62 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1017 0 0
"3303" "exp3" 1 63 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1336 22 1
"3303" "exp3" 1 64 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 633 0 0
"3303" "exp3" 1 65 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 1272 0 0
"3303" "exp3" 1 66 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 3523 67 1
"3303" "exp3" 1 67 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2274 0 0
"3303" "exp3" 1 68 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 2450 25 1
"3303" "exp3" 1 69 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 3148 33 1
"3303" "exp3" 1 70 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1612 23 1
"3303" "exp3" 1 71 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 2284 0 0
"3303" "exp3" 1 72 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1639 0 0
"3303" "exp3" 1 73 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 960 0 0
"3303" "exp3" 1 74 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2024 0 0
"3303" "exp3" 1 75 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 989 81 1
"3303" "exp3" 1 76 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1688 22 1
"3303" "exp3" 1 77 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 3349 0 0
"3303" "exp3" 1 78 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 998 26 1
"3303" "exp3" 1 79 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 719 90 1
"3303" "exp3" 1 80 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 791 1 1
"3303" "exp3" 1 81 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 2241 0 0
"3303" "exp3" 1 82 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 2230 0 0
"3303" "exp3" 1 83 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1219 0 0
"3303" "exp3" 1 84 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1040 0 0
"3303" "exp3" 1 85 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 1010 56 1
"3303" "exp3" 1 86 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 752 0 0
"3303" "exp3" 1 87 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 1390 79 1
"3303" "exp3" 1 88 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1169 0 0
"3303" "exp3" 1 89 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1010 32 1
"3303" "exp3" 1 90 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 906 28 1
"3303" "exp3" 1 91 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 816 28 1
"3303" "exp3" 1 92 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 703 0 0
"3303" "exp3" 1 93 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 780 30 1
"3303" "exp3" 1 94 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 802 22 1
"3303" "exp3" 1 95 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 538 0 0
"3303" "exp3" 1 96 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 938 0 0
"3303" "exp3" 1 97 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 974 0 0
"3303" "exp3" 1 98 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 2721 0 0
"3303" "exp3" 1 99 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1157 42 1
"3303" "exp3" 1 100 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 676 0 0
"3303" "exp3" 1 101 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 813 0 0
"3303" "exp3" 1 102 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 954 73 1
"3303" "exp3" 1 103 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 700 0 0
"3303" "exp3" 1 104 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1149 41 1
"3303" "exp3" 1 105 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1152 0 0
"3303" "exp3" 1 106 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 797 0 0
"3303" "exp3" 1 107 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 650 0 0
"3303" "exp3" 1 108 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1301 0 0
"3303" "exp3" 1 109 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 958 0 0
"3303" "exp3" 1 110 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1368 0 0
"3303" "exp3" 1 111 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1329 30 1
"3303" "exp3" 1 112 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1479 12 1
"3303" "exp3" 1 113 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1078 0 0
"3303" "exp3" 1 114 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 3003 0 0
"3303" "exp3" 1 115 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 916 40 1
"3303" "exp3" 1 116 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 2081 0 0
"3303" "exp3" 1 117 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1468 0 0
"3303" "exp3" 1 118 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1265 29 1
"3303" "exp3" 1 119 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1607 24 1
"3303" "exp3" 1 120 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 550 0 0
"3303" "exp3" 1 121 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 599 0 0
"3303" "exp3" 1 122 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 622 0 0
"3303" "exp3" 1 123 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 999 0 0
"3303" "exp3" 1 124 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1823 32 1
"3303" "exp3" 1 125 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 5182 0 0
"3303" "exp3" 1 126 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 1477 0 0
"3303" "exp3" 1 127 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1078 0 0
"3303" "exp3" 1 128 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 688 17 1
"3303" "exp3" 1 129 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1177 93 1
"3303" "exp3" 1 130 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1261 45 1
"3303" "exp3" 1 131 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 897 0 0
"3303" "exp3" 1 132 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1268 0 0
"3303" "exp3" 2 1 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 1194 72 1
"3303" "exp3" 2 2 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1217 0 0
"3303" "exp3" 2 3 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1289 32 1
"3303" "exp3" 2 4 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 841 36 1
"3303" "exp3" 2 5 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 841 93 1
"3303" "exp3" 2 6 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 945 45 1
"3303" "exp3" 2 7 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 1328 0 0
"3303" "exp3" 2 8 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 876 0 0
"3303" "exp3" 2 9 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 722 42 1
"3303" "exp3" 2 10 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 675 0 0
"3303" "exp3" 2 11 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 496 31 1
"3303" "exp3" 2 12 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 866 0 0
"3303" "exp3" 2 13 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 633 34 1
"3303" "exp3" 2 14 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 5185 37 1
"3303" "exp3" 2 15 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1342 94 1
"3303" "exp3" 2 16 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1565 0 0
"3303" "exp3" 2 17 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 808 0 0
"3303" "exp3" 2 18 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 804 0 0
"3303" "exp3" 2 19 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2294 39 1
"3303" "exp3" 2 20 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 972 0 0
"3303" "exp3" 2 21 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 561 0 0
"3303" "exp3" 2 22 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 654 0 0
"3303" "exp3" 2 23 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1417 0 0
"3303" "exp3" 2 24 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1311 29 1
"3303" "exp3" 2 25 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 713 0 0
"3303" "exp3" 2 26 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 767 0 0
"3303" "exp3" 2 27 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 911 0 0
"3303" "exp3" 2 28 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 554 0 0
"3303" "exp3" 2 29 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 538 0 0
"3303" "exp3" 2 30 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 688 0 0
"3303" "exp3" 2 31 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 666 0 0
"3303" "exp3" 2 32 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 893 43 1
"3303" "exp3" 2 33 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1205 0 0
"3303" "exp3" 2 34 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1401 64 1
"3303" "exp3" 2 35 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1613 54 1
"3303" "exp3" 2 36 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1226 47 1
"3303" "exp3" 2 37 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1458 28 1
"3303" "exp3" 2 38 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 656 0 0
"3303" "exp3" 2 39 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 631 72 1
"3303" "exp3" 2 40 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 741 0 0
"3303" "exp3" 2 41 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 571 0 0
"3303" "exp3" 2 42 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 746 0 0
"3303" "exp3" 2 43 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 593 0 0
"3303" "exp3" 2 44 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 2822 25 1
"3303" "exp3" 2 45 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 3465 0 0
"3303" "exp3" 2 46 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 702 0 0
"3303" "exp3" 2 47 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1619 37 1
"3303" "exp3" 2 48 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1542 24 1
"3303" "exp3" 2 49 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 2499 25 1
"3303" "exp3" 2 50 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1122 0 0
"3303" "exp3" 2 51 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1498 24 1
"3303" "exp3" 2 52 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 906 0 0
"3303" "exp3" 2 53 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 874 82 1
"3303" "exp3" 2 54 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 754 0 0
"3303" "exp3" 2 55 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 684 0 0
"3303" "exp3" 2 56 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 448 0 0
"3303" "exp3" 2 57 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 959 0 0
"3303" "exp3" 2 58 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 492 0 0
"3303" "exp3" 2 59 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 948 0 0
"3303" "exp3" 2 60 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 545 0 0
"3303" "exp3" 2 61 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 853 40 1
"3303" "exp3" 2 62 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 859 49 1
"3303" "exp3" 2 63 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 2379 26 1
"3303" "exp3" 2 64 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 852 0 0
"3303" "exp3" 2 65 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 887 41 1
"3303" "exp3" 2 66 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1311 27 1
"3303" "exp3" 2 67 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 744 26 1
"3303" "exp3" 2 68 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1240 0 0
"3303" "exp3" 2 69 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1317 0 0
"3303" "exp3" 2 70 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 889 0 0
"3303" "exp3" 2 71 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1087 0 0
"3303" "exp3" 2 72 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2878 21 1
"3303" "exp3" 2 73 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 4758 0 0
"3303" "exp3" 2 74 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 896 42 1
"3303" "exp3" 2 75 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 896 0 0
"3303" "exp3" 2 76 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1094 27 1
"3303" "exp3" 2 77 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 645 0 0
"3303" "exp3" 2 78 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 496 0 0
"3303" "exp3" 2 79 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 515 0 0
"3303" "exp3" 2 80 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 4386 0 0
"3303" "exp3" 2 81 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 699 0 0
"3303" "exp3" 2 82 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 522 0 0
"3303" "exp3" 2 83 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 772 0 0
"3303" "exp3" 2 84 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 2733 0 0
"3303" "exp3" 2 85 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 817 33 1
"3303" "exp3" 2 86 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 513 0 0
"3303" "exp3" 2 87 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 635 45 1
"3303" "exp3" 2 88 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 579 0 0
"3303" "exp3" 2 89 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 548 82 1
"3303" "exp3" 2 90 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 1315 0 0
"3303" "exp3" 2 91 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1774 0 0
"3303" "exp3" 2 92 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 861 20 1
"3303" "exp3" 2 93 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 3648 0 0
"3303" "exp3" 2 94 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 906 77 1
"3303" "exp3" 2 95 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 727 0 0
"3303" "exp3" 2 96 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 931 27 1
"3303" "exp3" 2 97 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 1018 0 0
"3303" "exp3" 2 98 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 974 28 1
"3303" "exp3" 2 99 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 780 0 0
"3303" "exp3" 2 100 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1119 0 0
"3303" "exp3" 2 101 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 790 0 0
"3303" "exp3" 2 102 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 3323 35 1
"3303" "exp3" 2 103 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1107 0 0
"3303" "exp3" 2 104 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 737 44 1
"3303" "exp3" 2 105 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 850 0 0
"3303" "exp3" 2 106 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 680 0 0
"3303" "exp3" 2 107 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 824 30 1
"3303" "exp3" 2 108 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 605 0 0
"3303" "exp3" 2 109 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 758 35 1
"3303" "exp3" 2 110 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 499 0 0
"3303" "exp3" 2 111 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 527 0 0
"3303" "exp3" 2 112 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 707 23 1
"3303" "exp3" 2 113 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 905 29 1
"3303" "exp3" 2 114 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 955 0 0
"3303" "exp3" 2 115 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1101 48 1
"3303" "exp3" 2 116 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1405 0 0
"3303" "exp3" 2 117 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 827 22 1
"3303" "exp3" 2 118 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1308 80 1
"3303" "exp3" 2 119 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 598 0 0
"3303" "exp3" 2 120 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 606 0 0
"3303" "exp3" 2 121 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 793 0 0
"3303" "exp3" 2 122 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1837 0 0
"3303" "exp3" 2 123 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 800 0 0
"3303" "exp3" 2 124 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 724 0 0
"3303" "exp3" 2 125 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 760 0 0
"3303" "exp3" 2 126 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 4334 0 0
"3303" "exp3" 2 127 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 854 0 0
"3303" "exp3" 2 128 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1023 32 1
"3303" "exp3" 2 129 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 972 37 1
"3303" "exp3" 2 130 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 847 31 1
"3303" "exp3" 2 131 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 564 0 0
"3303" "exp3" 2 132 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 767 70 1
"3303" "exp3" 1 1 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2314 0 0
"3303" "exp3" 1 2 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1170 0 0
"3303" "exp3" 1 3 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1603 0 0
"3303" "exp3" 1 4 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 3307 0 0
"3303" "exp3" 1 5 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1657 0 0
"3303" "exp3" 1 6 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1107 26 1
"3303" "exp3" 1 7 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1063 44 1
"3303" "exp3" 1 8 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1116 9 1
"3303" "exp3" 1 9 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 2289 35 1
"3303" "exp3" 1 10 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 611 36 1
"3303" "exp3" 1 11 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 881 94 1
"3303" "exp3" 1 12 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 848 25 1
"3303" "exp3" 1 13 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1274 30 1
"3303" "exp3" 1 14 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 953 0 0
"3303" "exp3" 1 15 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1028 65 1
"3303" "exp3" 1 16 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 817 34 1
"3303" "exp3" 1 17 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1169 17 1
"3303" "exp3" 1 18 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 2315 0 0
"3303" "exp3" 1 19 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 1095 0 0
"3303" "exp3" 1 20 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 840 0 0
"3303" "exp3" 1 21 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 1071 0 0
"3303" "exp3" 1 22 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1111 0 0
"3303" "exp3" 1 23 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1167 0 0
"3303" "exp3" 1 24 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 891 22 1
"3303" "exp3" 1 25 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 931 0 0
"3303" "exp3" 1 26 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1121 23 1
"3303" "exp3" 1 27 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 766 0 0
"3303" "exp3" 1 28 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 925 0 0
"3303" "exp3" 1 29 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2010 0 0
"3303" "exp3" 1 30 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1370 0 0
"3303" "exp3" 1 31 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1266 35 1
"3303" "exp3" 1 32 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1660 45 1
"3303" "exp3" 1 33 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 903 45 1
"3303" "exp3" 1 34 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1097 23 1
"3303" "exp3" 1 35 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1438 43 1
"3303" "exp3" 1 36 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1561 0 0
"3303" "exp3" 1 37 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 559 24 1
"3303" "exp3" 1 38 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1291 0 0
"3303" "exp3" 1 39 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 754 80 1
"3303" "exp3" 1 40 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 949 0 0
"3303" "exp3" 1 41 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 819 0 0
"3303" "exp3" 1 42 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 2320 0 0
"3303" "exp3" 1 43 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 941 0 0
"3303" "exp3" 1 44 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 2368 0 0
"3303" "exp3" 1 45 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1583 75 1
"3303" "exp3" 1 46 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1350 29 1
"3303" "exp3" 1 47 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 1162 0 0
"3303" "exp3" 1 48 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 809 0 0
"3303" "exp3" 1 49 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 1071 0 0
"3303" "exp3" 1 50 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 863 27 1
"3303" "exp3" 1 51 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 658 26 1
"3303" "exp3" 1 52 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 739 0 0
"3303" "exp3" 1 53 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 628 0 0
"3303" "exp3" 1 54 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 827 0 0
"3303" "exp3" 1 55 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 531 29 1
"3303" "exp3" 1 56 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 1142 79 1
"3303" "exp3" 1 57 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1174 33 1
"3303" "exp3" 1 58 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 722 42 1
"3303" "exp3" 1 59 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 782 24 1
"3303" "exp3" 1 60 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 2017 0 0
"3303" "exp3" 1 61 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 879 0 0
"3303" "exp3" 1 62 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 920 36 1
"3303" "exp3" 1 63 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 784 24 1
"3303" "exp3" 1 64 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 675 0 0
"3303" "exp3" 1 65 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 833 33 1
"3303" "exp3" 1 66 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1399 32 1
"3303" "exp3" 1 67 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 777 0 0
"3303" "exp3" 1 68 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1058 23 1
"3303" "exp3" 1 69 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 797 26 1
"3303" "exp3" 1 70 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1272 0 0
"3303" "exp3" 1 71 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 953 59 1
"3303" "exp3" 1 72 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 975 22 1
"3303" "exp3" 1 73 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 745 0 0
"3303" "exp3" 1 74 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 682 27 1
"3303" "exp3" 1 75 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 995 0 0
"3303" "exp3" 1 76 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 3827 43 1
"3303" "exp3" 1 77 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 602 0 0
"3303" "exp3" 1 78 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 620 0 0
"3303" "exp3" 1 79 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 981 46 1
"3303" "exp3" 1 80 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 548 37 1
"3303" "exp3" 1 81 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 662 0 0
"3303" "exp3" 1 82 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 676 80 1
"3303" "exp3" 1 83 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1289 41 1
"3303" "exp3" 1 84 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 721 28 1
"3303" "exp3" 1 85 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 521 33 1
"3303" "exp3" 1 86 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 515 39 1
"3303" "exp3" 1 87 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 584 0 0
"3303" "exp3" 1 88 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 599 0 0
"3303" "exp3" 1 89 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 551 0 0
"3303" "exp3" 1 90 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 590 0 0
"3303" "exp3" 1 91 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 558 0 0
"3303" "exp3" 1 92 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 625 0 0
"3303" "exp3" 1 93 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1038 0 0
"3303" "exp3" 1 94 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 850 0 0
"3303" "exp3" 1 95 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 634 0 0
"3303" "exp3" 1 96 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 737 0 0
"3303" "exp3" 1 97 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 748 44 1
"3303" "exp3" 1 98 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 636 81 1
"3303" "exp3" 1 99 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1140 37 1
"3303" "exp3" 1 100 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 777 0 0
"3303" "exp3" 1 101 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 591 0 0
"3303" "exp3" 1 102 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 543 0 0
"3303" "exp3" 1 103 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 862 0 0
"3303" "exp3" 1 104 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 572 0 0
"3303" "exp3" 1 105 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 522 0 0
"3303" "exp3" 1 106 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 969 28 1
"3303" "exp3" 1 107 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 496 0 0
"3303" "exp3" 1 108 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 654 0 0
"3303" "exp3" 1 109 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 671 37 1
"3303" "exp3" 1 110 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 625 34 1
"3303" "exp3" 1 111 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 577 33 1
"3303" "exp3" 1 112 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 622 0 0
"3303" "exp3" 1 113 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 572 48 1
"3303" "exp3" 1 114 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 483 32 1
"3303" "exp3" 1 115 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 675 0 0
"3303" "exp3" 1 116 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 687 38 1
"3303" "exp3" 1 117 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 587 39 1
"3303" "exp3" 1 118 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 569 31 1
"3303" "exp3" 1 119 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 584 30 1
"3303" "exp3" 1 120 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 479 36 1
"3303" "exp3" 1 121 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 545 0 0
"3303" "exp3" 1 122 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 507 0 0
"3303" "exp3" 1 123 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 638 0 0
"3303" "exp3" 1 124 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1093 38 1
"3303" "exp3" 1 125 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 710 0 0
"3303" "exp3" 1 126 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 825 29 1
"3303" "exp3" 1 127 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 743 0 0
"3303" "exp3" 1 128 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 550 0 0
"3303" "exp3" 1 129 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 642 95 1
"3303" "exp3" 1 130 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 1030 60 1
"3303" "exp3" 1 131 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 983 31 1
"3303" "exp3" 1 132 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 587 0 0
"3303" "exp3" 2 1 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 731 24 1
"3303" "exp3" 2 2 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 572 0 0
"3303" "exp3" 2 3 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 478 24 1
"3303" "exp3" 2 4 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 725 30 1
"3303" "exp3" 2 5 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 514 90 1
"3303" "exp3" 2 6 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 599 35 1
"3303" "exp3" 2 7 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1227 0 0
"3303" "exp3" 2 8 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 729 39 1
"3303" "exp3" 2 9 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 695 30 1
"3303" "exp3" 2 10 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 719 28 1
"3303" "exp3" 2 11 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 866 27 1
"3303" "exp3" 2 12 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 607 33 1
"3303" "exp3" 2 13 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 603 25 1
"3303" "exp3" 2 14 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 727 82 1
"3303" "exp3" 2 15 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1233 31 1
"3303" "exp3" 2 16 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 588 32 1
"3303" "exp3" 2 17 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 626 83 1
"3303" "exp3" 2 18 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 826 0 0
"3303" "exp3" 2 19 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 745 41 1
"3303" "exp3" 2 20 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 535 0 0
"3303" "exp3" 2 21 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 503 0 0
"3303" "exp3" 2 22 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 534 33 1
"3303" "exp3" 2 23 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 539 0 0
"3303" "exp3" 2 24 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 817 0 0
"3303" "exp3" 2 25 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 588 0 0
"3303" "exp3" 2 26 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 669 25 1
"3303" "exp3" 2 27 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 906 0 0
"3303" "exp3" 2 28 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1407 31 1
"3303" "exp3" 2 29 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 602 23 1
"3303" "exp3" 2 30 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 732 27 1
"3303" "exp3" 2 31 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1468 0 0
"3303" "exp3" 2 32 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1127 28 1
"3303" "exp3" 2 33 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 611 39 1
"3303" "exp3" 2 34 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1038 89 1
"3303" "exp3" 2 35 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 852 27 1
"3303" "exp3" 2 36 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 644 17 1
"3303" "exp3" 2 37 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 517 0 0
"3303" "exp3" 2 38 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 676 0 0
"3303" "exp3" 2 39 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 562 0 0
"3303" "exp3" 2 40 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 721 0 0
"3303" "exp3" 2 41 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1149 0 0
"3303" "exp3" 2 42 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 640 0 0
"3303" "exp3" 2 43 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 569 80 1
"3303" "exp3" 2 44 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 588 0 0
"3303" "exp3" 2 45 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 617 0 0
"3303" "exp3" 2 46 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 908 46 1
"3303" "exp3" 2 47 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 514 0 0
"3303" "exp3" 2 48 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 556 85 1
"3303" "exp3" 2 49 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 576 0 0
"3303" "exp3" 2 50 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 576 0 0
"3303" "exp3" 2 51 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 533 0 0
"3303" "exp3" 2 52 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 563 38 1
"3303" "exp3" 2 53 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 606 0 0
"3303" "exp3" 2 54 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 994 30 1
"3303" "exp3" 2 55 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 771 43 1
"3303" "exp3" 2 56 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 772 0 0
"3303" "exp3" 2 57 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 808 0 0
"3303" "exp3" 2 58 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 585 30 1
"3303" "exp3" 2 59 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1094 0 0
"3303" "exp3" 2 60 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 722 0 0
"3303" "exp3" 2 61 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2966 22 1
"3303" "exp3" 2 62 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 656 0 0
"3303" "exp3" 2 63 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 572 0 0
"3303" "exp3" 2 64 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 834 26 1
"3303" "exp3" 2 65 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1470 6 1
"3303" "exp3" 2 66 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 2947 33 1
"3303" "exp3" 2 67 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 483 23 1
"3303" "exp3" 2 68 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 800 0 0
"3303" "exp3" 2 69 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 569 15 1
"3303" "exp3" 2 70 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 793 0 0
"3303" "exp3" 2 71 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 772 36 1
"3303" "exp3" 2 72 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 448 26 1
"3303" "exp3" 2 73 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 470 33 1
"3303" "exp3" 2 74 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 671 0 0
"3303" "exp3" 2 75 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 609 0 0
"3303" "exp3" 2 76 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 651 42 1
"3303" "exp3" 2 77 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1049 29 1
"3303" "exp3" 2 78 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 861 0 0
"3303" "exp3" 2 79 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1534 28 1
"3303" "exp3" 2 80 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 591 0 0
"3303" "exp3" 2 81 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 651 0 0
"3303" "exp3" 2 82 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 2687 38 1
"3303" "exp3" 2 83 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1008 0 0
"3303" "exp3" 2 84 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 545 0 0
"3303" "exp3" 2 85 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1238 29 1
"3303" "exp3" 2 86 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 479 0 0
"3303" "exp3" 2 87 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 482 0 0
"3303" "exp3" 2 88 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 706 25 1
"3303" "exp3" 2 89 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 590 0 0
"3303" "exp3" 2 90 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 445 37 1
"3303" "exp3" 2 91 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 909 0 0
"3303" "exp3" 2 92 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 727 43 1
"3303" "exp3" 2 93 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 794 0 0
"3303" "exp3" 2 94 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2825 37 1
"3303" "exp3" 2 95 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 551 0 0
"3303" "exp3" 2 96 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1494 0 0
"3303" "exp3" 2 97 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1122 0 0
"3303" "exp3" 2 98 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 532 0 0
"3303" "exp3" 2 99 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 462 0 0
"3303" "exp3" 2 100 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 590 42 1
"3303" "exp3" 2 101 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 640 0 0
"3303" "exp3" 2 102 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1229 24 1
"3303" "exp3" 2 103 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 757 34 1
"3303" "exp3" 2 104 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 595 49 1
"3303" "exp3" 2 105 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1041 79 1
"3303" "exp3" 2 106 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 626 0 0
"3303" "exp3" 2 107 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1915 0 0
"3303" "exp3" 2 108 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 530 27 1
"3303" "exp3" 2 109 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 582 0 0
"3303" "exp3" 2 110 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 695 40 1
"3303" "exp3" 2 111 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1259 21 1
"3303" "exp3" 2 112 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 834 0 0
"3303" "exp3" 2 113 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 573 84 1
"3303" "exp3" 2 114 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 913 32 1
"3303" "exp3" 2 115 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 749 0 0
"3303" "exp3" 2 116 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 615 0 0
"3303" "exp3" 2 117 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1019 78 1
"3303" "exp3" 2 118 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 822 0 0
"3303" "exp3" 2 119 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1451 0 0
"3303" "exp3" 2 120 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 744 34 1
"3303" "exp3" 2 121 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 644 0 0
"3303" "exp3" 2 122 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 883 0 0
"3303" "exp3" 2 123 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 635 86 1
"3303" "exp3" 2 124 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 667 0 0
"3303" "exp3" 2 125 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 717 29 1
"3303" "exp3" 2 126 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 808 0 0
"3303" "exp3" 2 127 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 736 0 0
"3303" "exp3" 2 128 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1262 36 1
"3303" "exp3" 2 129 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1226 41 1
"3303" "exp3" 2 130 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 731 0 0
"3303" "exp3" 2 131 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 604 0 0
"3303" "exp3" 2 132 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 688 29 1
"3303" "exp3" 1 1 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 2985 0 0
"3303" "exp3" 1 2 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 896 43 1
"3303" "exp3" 1 3 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 871 29 1
"3303" "exp3" 1 4 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1230 8 1
"3303" "exp3" 1 5 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 2365 21 1
"3303" "exp3" 1 6 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 692 30 1
"3303" "exp3" 1 7 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 565 40 1
"3303" "exp3" 1 8 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 704 0 0
"3303" "exp3" 1 9 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 579 60 1
"3303" "exp3" 1 10 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 574 0 0
"3303" "exp3" 1 11 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2005 0 0
"3303" "exp3" 1 12 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1092 34 1
"3303" "exp3" 1 13 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 629 83 1
"3303" "exp3" 1 14 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 599 43 1
"3303" "exp3" 1 15 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 943 0 0
"3303" "exp3" 1 16 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 696 53 1
"3303" "exp3" 1 17 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 2074 0 0
"3303" "exp3" 1 18 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 2510 75 1
"3303" "exp3" 1 19 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1853 0 0
"3303" "exp3" 1 20 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 667 0 0
"3303" "exp3" 1 21 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1703 0 0
"3303" "exp3" 1 22 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 4129 17 1
"3303" "exp3" 1 23 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 759 0 0
"3303" "exp3" 1 24 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 835 0 0
"3303" "exp3" 1 25 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 2820 0 0
"3303" "exp3" 1 26 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1862 29 1
"3303" "exp3" 1 27 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 610 0 0
"3303" "exp3" 1 28 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 817 0 0
"3303" "exp3" 1 29 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 3126 0 0
"3303" "exp3" 1 30 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 895 0 0
"3303" "exp3" 1 31 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 720 26 1
"3303" "exp3" 1 32 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 873 0 0
"3303" "exp3" 1 33 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 560 0 0
"3303" "exp3" 1 34 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 686 23 1
"3303" "exp3" 1 35 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1993 0 0
"3303" "exp3" 1 36 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 870 0 0
"3303" "exp3" 1 37 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 981 72 1
"3303" "exp3" 1 38 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1970 22 1
"3303" "exp3" 1 39 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1235 26 1
"3303" "exp3" 1 40 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1199 0 0
"3303" "exp3" 1 41 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 825 32 1
"3303" "exp3" 1 42 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 852 26 1
"3303" "exp3" 1 43 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 648 0 0
"3303" "exp3" 1 44 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 913 38 1
"3303" "exp3" 1 45 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 2080 0 0
"3303" "exp3" 1 46 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 843 0 0
"3303" "exp3" 1 47 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 828 36 1
"3303" "exp3" 1 48 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 857 0 0
"3303" "exp3" 1 49 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 772 0 0
"3303" "exp3" 1 50 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1359 0 0
"3303" "exp3" 1 51 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 984 0 0
"3303" "exp3" 1 52 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1696 27 1
"3303" "exp3" 1 53 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1012 87 1
"3303" "exp3" 1 54 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1393 31 1
"3303" "exp3" 1 55 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 2148 28 1
"3303" "exp3" 1 56 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 677 85 1
"3303" "exp3" 1 57 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 782 31 1
"3303" "exp3" 1 58 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 659 44 1
"3303" "exp3" 1 59 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 721 29 1
"3303" "exp3" 1 60 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 805 42 1
"3303" "exp3" 1 61 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 669 0 0
"3303" "exp3" 1 62 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 745 44 1
"3303" "exp3" 1 63 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 863 0 0
"3303" "exp3" 1 64 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 653 41 1
"3303" "exp3" 1 65 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 642 0 0
"3303" "exp3" 1 66 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 623 45 1
"3303" "exp3" 1 67 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1603 0 0
"3303" "exp3" 1 68 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 815 0 0
"3303" "exp3" 1 69 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1050 0 0
"3303" "exp3" 1 70 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 810 0 0
"3303" "exp3" 1 71 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 2261 0 0
"3303" "exp3" 1 72 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1475 0 0
"3303" "exp3" 1 73 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1895 25 1
"3303" "exp3" 1 74 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 589 94 1
"3303" "exp3" 1 75 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 993 33 1
"3303" "exp3" 1 76 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 966 30 1
"3303" "exp3" 1 77 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 644 27 1
"3303" "exp3" 1 78 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 857 22 1
"3303" "exp3" 1 79 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 700 0 0
"3303" "exp3" 1 80 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 799 0 0
"3303" "exp3" 1 81 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1287 46 1
"3303" "exp3" 1 82 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 650 0 0
"3303" "exp3" 1 83 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 628 88 1
"3303" "exp3" 1 84 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1258 0 0
"3303" "exp3" 1 85 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 910 24 1
"3303" "exp3" 1 86 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 2351 0 0
"3303" "exp3" 1 87 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 588 37 1
"3303" "exp3" 1 88 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 748 0 0
"3303" "exp3" 1 89 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 902 31 1
"3303" "exp3" 1 90 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 880 25 1
"3303" "exp3" 1 91 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 669 0 0
"3303" "exp3" 1 92 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 635 52 1
"3303" "exp3" 1 93 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 998 18 1
"3303" "exp3" 1 94 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 2907 22 1
"3303" "exp3" 1 95 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1078 0 0
"3303" "exp3" 1 96 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1349 24 1
"3303" "exp3" 1 97 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 971 32 1
"3303" "exp3" 1 98 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 767 0 0
"3303" "exp3" 1 99 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 719 93 1
"3303" "exp3" 1 100 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 2446 37 1
"3303" "exp3" 1 101 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 648 36 1
"3303" "exp3" 1 102 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 922 28 1
"3303" "exp3" 1 103 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 758 0 0
"3303" "exp3" 1 104 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 685 0 0
"3303" "exp3" 1 105 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 672 0 0
"3303" "exp3" 1 106 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1116 27 1
"3303" "exp3" 1 107 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 528 0 0
"3303" "exp3" 1 108 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 977 32 1
"3303" "exp3" 1 109 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 820 0 0
"3303" "exp3" 1 110 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1157 0 0
"3303" "exp3" 1 111 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1087 30 1
"3303" "exp3" 1 112 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 587 0 0
"3303" "exp3" 1 113 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 618 0 0
"3303" "exp3" 1 114 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 569 0 0
"3303" "exp3" 1 115 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 711 0 0
"3303" "exp3" 1 116 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 962 37 1
"3303" "exp3" 1 117 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 771 0 0
"3303" "exp3" 1 118 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1046 0 0
"3303" "exp3" 1 119 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 800 0 0
"3303" "exp3" 1 120 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1119 0 0
"3303" "exp3" 1 121 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 606 90 1
"3303" "exp3" 1 122 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 546 86 1
"3303" "exp3" 1 123 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 647 0 0
"3303" "exp3" 1 124 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 536 0 0
"3303" "exp3" 1 125 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1018 72 1
"3303" "exp3" 1 126 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 903 25 1
"3303" "exp3" 1 127 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 612 29 1
"3303" "exp3" 1 128 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1099 0 0
"3303" "exp3" 1 129 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 768 21 1
"3303" "exp3" 1 130 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 991 24 1
"3303" "exp3" 1 131 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 871 0 0
"3303" "exp3" 1 132 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 759 33 1
"3303" "exp3" 2 1 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1230 27 1
"3303" "exp3" 2 2 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1394 28 1
"3303" "exp3" 2 3 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 955 0 0
"3303" "exp3" 2 4 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 691 46 1
"3303" "exp3" 2 5 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 778 0 0
"3303" "exp3" 2 6 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 635 0 0
"3303" "exp3" 2 7 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1086 0 0
"3303" "exp3" 2 8 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1409 0 0
"3303" "exp3" 2 9 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1020 29 1
"3303" "exp3" 2 10 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 625 0 0
"3303" "exp3" 2 11 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 937 89 1
"3303" "exp3" 2 12 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 816 0 0
"3303" "exp3" 2 13 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 707 35 1
"3303" "exp3" 2 14 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 836 0 0
"3303" "exp3" 2 15 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1297 22 1
"3303" "exp3" 2 16 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 916 23 1
"3303" "exp3" 2 17 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 638 0 0
"3303" "exp3" 2 18 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 739 84 1
"3303" "exp3" 2 19 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 572 0 0
"3303" "exp3" 2 20 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1136 0 0
"3303" "exp3" 2 21 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1004 49 1
"3303" "exp3" 2 22 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1895 37 1
"3303" "exp3" 2 23 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 717 0 0
"3303" "exp3" 2 24 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1909 23 1
"3303" "exp3" 2 25 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1639 0 0
"3303" "exp3" 2 26 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 981 81 1
"3303" "exp3" 2 27 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1030 0 0
"3303" "exp3" 2 28 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1934 0 0
"3303" "exp3" 2 29 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1248 37 1
"3303" "exp3" 2 30 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 561 32 1
"3303" "exp3" 2 31 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 742 0 0
"3303" "exp3" 2 32 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 604 0 0
"3303" "exp3" 2 33 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 559 31 1
"3303" "exp3" 2 34 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 536 90 1
"3303" "exp3" 2 35 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 500 0 0
"3303" "exp3" 2 36 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 749 21 1
"3303" "exp3" 2 37 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 710 86 1
"3303" "exp3" 2 38 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 880 0 0
"3303" "exp3" 2 39 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 570 31 1
"3303" "exp3" 2 40 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1856 31 1
"3303" "exp3" 2 41 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 626 29 1
"3303" "exp3" 2 42 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 675 0 0
"3303" "exp3" 2 43 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 587 22 1
"3303" "exp3" 2 44 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 599 21 1
"3303" "exp3" 2 45 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 734 0 0
"3303" "exp3" 2 46 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 469 32 1
"3303" "exp3" 2 47 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 575 0 0
"3303" "exp3" 2 48 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 683 0 0
"3303" "exp3" 2 49 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 807 0 0
"3303" "exp3" 2 50 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 963 33 1
"3303" "exp3" 2 51 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 644 34 1
"3303" "exp3" 2 52 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 577 6 1
"3303" "exp3" 2 53 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 887 38 1
"3303" "exp3" 2 54 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1490 0 0
"3303" "exp3" 2 55 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 582 27 1
"3303" "exp3" 2 56 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 772 36 1
"3303" "exp3" 2 57 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 624 0 0
"3303" "exp3" 2 58 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 590 94 1
"3303" "exp3" 2 59 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 703 0 0
"3303" "exp3" 2 60 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 472 0 0
"3303" "exp3" 2 61 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 508 0 0
"3303" "exp3" 2 62 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 437 0 0
"3303" "exp3" 2 63 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 717 0 0
"3303" "exp3" 2 64 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1347 40 1
"3303" "exp3" 2 65 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 720 39 1
"3303" "exp3" 2 66 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 767 25 1
"3303" "exp3" 2 67 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 778 24 1
"3303" "exp3" 2 68 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 676 27 1
"3303" "exp3" 2 69 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1023 20 1
"3303" "exp3" 2 70 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 741 24 1
"3303" "exp3" 2 71 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 708 0 0
"3303" "exp3" 2 72 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 892 30 1
"3303" "exp3" 2 73 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 849 28 1
"3303" "exp3" 2 74 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1217 0 0
"3303" "exp3" 2 75 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 749 26 1
"3303" "exp3" 2 76 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 659 0 0
"3303" "exp3" 2 77 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 535 0 0
"3303" "exp3" 2 78 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 521 70 1
"3303" "exp3" 2 79 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1373 25 1
"3303" "exp3" 2 80 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 925 45 1
"3303" "exp3" 2 81 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 729 0 0
"3303" "exp3" 2 82 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 767 21 1
"3303" "exp3" 2 83 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 596 22 1
"3303" "exp3" 2 84 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 626 0 0
"3303" "exp3" 2 85 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 714 0 0
"3303" "exp3" 2 86 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 543 47 1
"3303" "exp3" 2 87 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1036 0 0
"3303" "exp3" 2 88 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 854 0 0
"3303" "exp3" 2 89 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 492 0 0
"3303" "exp3" 2 90 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 549 28 1
"3303" "exp3" 2 91 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 602 0 0
"3303" "exp3" 2 92 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 946 0 0
"3303" "exp3" 2 93 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1002 44 1
"3303" "exp3" 2 94 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 692 0 0
"3303" "exp3" 2 95 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 465 0 0
"3303" "exp3" 2 96 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 879 41 1
"3303" "exp3" 2 97 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 880 0 0
"3303" "exp3" 2 98 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1010 0 0
"3303" "exp3" 2 99 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1121 0 0
"3303" "exp3" 2 100 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1062 0 0
"3303" "exp3" 2 101 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 617 41 1
"3303" "exp3" 2 102 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 497 34 1
"3303" "exp3" 2 103 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 731 29 1
"3303" "exp3" 2 104 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 932 31 1
"3303" "exp3" 2 105 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 544 26 1
"3303" "exp3" 2 106 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 658 0 0
"3303" "exp3" 2 107 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 451 29 1
"3303" "exp3" 2 108 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 446 0 0
"3303" "exp3" 2 109 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 753 43 1
"3303" "exp3" 2 110 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 628 0 0
"3303" "exp3" 2 111 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 843 0 0
"3303" "exp3" 2 112 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 896 42 1
"3303" "exp3" 2 113 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 619 0 0
"3303" "exp3" 2 114 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 682 0 0
"3303" "exp3" 2 115 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 528 0 0
"3303" "exp3" 2 116 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 616 33 1
"3303" "exp3" 2 117 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 536 25 1
"3303" "exp3" 2 118 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 574 82 1
"3303" "exp3" 2 119 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 860 0 0
"3303" "exp3" 2 120 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 540 22 1
"3303" "exp3" 2 121 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 990 0 0
"3303" "exp3" 2 122 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 912 0 0
"3303" "exp3" 2 123 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1147 0 0
"3303" "exp3" 2 124 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 900 0 0
"3303" "exp3" 2 125 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 794 0 0
"3303" "exp3" 2 126 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 810 0 0
"3303" "exp3" 2 127 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1155 0 0
"3303" "exp3" 2 128 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1757 23 1
"3303" "exp3" 2 129 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1026 42 1
"3303" "exp3" 2 130 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 655 24 1
"3303" "exp3" 2 131 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 640 33 1
"3303" "exp3" 2 132 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1024 12 1
"3304" "exp3" 1 1 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 3664 0 0
"3304" "exp3" 1 2 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 4138 21 1
"3304" "exp3" 1 3 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 3142 20 1
"3304" "exp3" 1 4 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2356 21 1
"3304" "exp3" 1 5 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 5845 25 1
"3304" "exp3" 1 6 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 3185 0 0
"3304" "exp3" 1 7 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 7312 65 1
"3304" "exp3" 1 8 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 2890 16 1
"3304" "exp3" 1 9 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 4074 0 0
"3304" "exp3" 1 10 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 6757 0 0
"3304" "exp3" 1 11 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 4946 13 1
"3304" "exp3" 1 12 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 3395 0 0
"3304" "exp3" 1 13 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 6199 18 1
"3304" "exp3" 1 14 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 4195 0 0
"3304" "exp3" 1 15 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 4240 11 1
"3304" "exp3" 1 16 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 3201 0 0
"3304" "exp3" 1 17 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2637 0 0
"3304" "exp3" 1 18 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2387 20 1
"3304" "exp3" 1 19 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 7304 41 1
"3304" "exp3" 1 20 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 5385 0 0
"3304" "exp3" 1 21 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 7911 0 0
"3304" "exp3" 1 22 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 2634 23 1
"3304" "exp3" 1 23 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 3164 25 1
"3304" "exp3" 1 24 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 5629 0 0
"3304" "exp3" 1 25 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 3855 22 1
"3304" "exp3" 1 26 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 7992 0 0
"3304" "exp3" 1 27 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 7412 0 0
"3304" "exp3" 1 28 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 3977 19 1
"3304" "exp3" 1 29 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 7324 92 1
"3304" "exp3" 1 30 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 3433 10 1
"3304" "exp3" 1 31 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 4114 0 0
"3304" "exp3" 1 32 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 5736 31 1
"3304" "exp3" 1 33 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 6276 0 0
"3304" "exp3" 1 34 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 6914 0 0
"3304" "exp3" 1 35 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 3314 0 0
"3304" "exp3" 1 36 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 7254 0 0
"3304" "exp3" 1 37 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 8450 0 0
"3304" "exp3" 1 38 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 4205 36 1
"3304" "exp3" 1 39 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 3583 71 1
"3304" "exp3" 1 40 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 5253 94 1
"3304" "exp3" 1 41 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 9256 0 0
"3304" "exp3" 1 42 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 6043 0 0
"3304" "exp3" 1 43 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 3676 79 1
"3304" "exp3" 1 44 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 8756 78 1
"3304" "exp3" 1 45 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 5497 27 1
"3304" "exp3" 1 46 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 3192 0 0
"3304" "exp3" 1 47 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 5445 28 1
"3304" "exp3" 1 48 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2806 25 1
"3304" "exp3" 1 49 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 8268 0 0
"3304" "exp3" 1 50 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 4043 58 1
"3304" "exp3" 1 51 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 4647 20 1
"3304" "exp3" 1 52 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 3504 39 1
"3304" "exp3" 1 53 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 4539 0 0
"3304" "exp3" 1 54 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 5235 0 0
"3304" "exp3" 1 55 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1849 32 1
"3304" "exp3" 1 56 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 3509 30 1
"3304" "exp3" 1 57 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 5029 21 1
"3304" "exp3" 1 58 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 4102 70 1
"3304" "exp3" 1 59 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 3871 84 1
"3304" "exp3" 1 60 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 10268 0 0
"3304" "exp3" 1 61 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 4776 0 0
"3304" "exp3" 1 62 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2739 27 1
"3304" "exp3" 1 63 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2782 0 0
"3304" "exp3" 1 64 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 3392 36 1
"3304" "exp3" 1 65 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 4234 0 0
"3304" "exp3" 1 66 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 5729 91 1
"3304" "exp3" 1 67 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 7410 0 0
"3304" "exp3" 1 68 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 4382 0 0
"3304" "exp3" 1 69 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 6183 0 0
"3304" "exp3" 1 70 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 3972 0 0
"3304" "exp3" 1 71 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 4661 0 0
"3304" "exp3" 1 72 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 5775 0 0
"3304" "exp3" 1 73 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 4424 0 0
"3304" "exp3" 1 74 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 5895 0 0
"3304" "exp3" 1 75 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 5269 18 1
"3304" "exp3" 1 76 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 5326 0 0
"3304" "exp3" 1 77 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 6136 0 0
"3304" "exp3" 1 78 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 3933 0 0
"3304" "exp3" 1 79 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 6980 0 0
"3304" "exp3" 1 80 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 6469 22 1
"3304" "exp3" 1 81 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 7778 17 1
"3304" "exp3" 1 82 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 10950 0 0
"3304" "exp3" 1 83 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 9822 76 1
"3304" "exp3" 1 84 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 3220 0 0
"3304" "exp3" 1 85 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 6232 67 1
"3304" "exp3" 1 86 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 2919 67 1
"3304" "exp3" 1 87 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 7467 0 0
"3304" "exp3" 1 88 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 3795 0 0
"3304" "exp3" 1 89 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 9064 73 1
"3304" "exp3" 1 90 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 3862 0 0
"3304" "exp3" 1 91 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 6215 0 0
"3304" "exp3" 1 92 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 2172 0 0
"3304" "exp3" 1 93 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 9697 14 1
"3304" "exp3" 1 94 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 6323 0 0
"3304" "exp3" 1 95 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 7266 33 1
"3304" "exp3" 1 96 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 3559 55 1
"3304" "exp3" 1 97 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 6322 0 0
"3304" "exp3" 1 98 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 5646 23 1
"3304" "exp3" 1 99 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 3647 0 0
"3304" "exp3" 1 100 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 9279 0 0
"3304" "exp3" 1 101 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 3683 0 0
"3304" "exp3" 1 102 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 9916 0 0
"3304" "exp3" 1 103 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 5823 0 0
"3304" "exp3" 1 104 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 3841 83 1
"3304" "exp3" 1 105 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 10734 0 0
"3304" "exp3" 1 106 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 7875 0 0
"3304" "exp3" 1 107 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 7498 0 0
"3304" "exp3" 1 108 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 5636 40 1
"3304" "exp3" 1 109 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 3217 0 0
"3304" "exp3" 1 110 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 6705 0 0
"3304" "exp3" 1 111 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 12590 0 0
"3304" "exp3" 1 112 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 3368 0 0
"3304" "exp3" 1 113 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 10239 18 1
"3304" "exp3" 1 114 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 3225 37 1
"3304" "exp3" 1 115 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 4200 94 1
"3304" "exp3" 1 116 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 6114 14 1
"3304" "exp3" 1 117 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 3667 42 1
"3304" "exp3" 1 118 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 5148 10 1
"3304" "exp3" 1 119 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 3729 35 1
"3304" "exp3" 1 120 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 6875 0 0
"3304" "exp3" 1 121 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 6162 0 0
"3304" "exp3" 1 122 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 6031 34 1
"3304" "exp3" 1 123 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 3321 0 0
"3304" "exp3" 1 124 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 7284 91 1
"3304" "exp3" 1 125 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2683 0 0
"3304" "exp3" 1 126 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 11356 76 1
"3304" "exp3" 1 127 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 10889 0 0
"3304" "exp3" 1 128 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 4810 44 1
"3304" "exp3" 1 129 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 6913 45 1
"3304" "exp3" 1 130 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 6630 0 0
"3304" "exp3" 1 131 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 5569 0 0
"3304" "exp3" 1 132 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 6030 24 1
"3304" "exp3" 2 1 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 6905 64 1
"3304" "exp3" 2 2 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 2794 0 0
"3304" "exp3" 2 3 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 7069 36 1
"3304" "exp3" 2 4 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 9998 38 1
"3304" "exp3" 2 5 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 3874 0 0
"3304" "exp3" 2 6 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 9892 0 0
"3304" "exp3" 2 7 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 4102 14 1
"3304" "exp3" 2 8 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 7673 40 1
"3304" "exp3" 2 9 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 2240 17 1
"3304" "exp3" 2 10 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 3933 22 1
"3304" "exp3" 2 11 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 4010 21 1
"3304" "exp3" 2 12 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2264 33 1
"3304" "exp3" 2 13 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 4227 45 1
"3304" "exp3" 2 14 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 3926 26 1
"3304" "exp3" 2 15 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 3969 27 1
"3304" "exp3" 2 16 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1960 42 1
"3304" "exp3" 2 17 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 7008 41 1
"3304" "exp3" 2 18 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 6326 16 1
"3304" "exp3" 2 19 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 2518 0 0
"3304" "exp3" 2 20 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 2631 32 1
"3304" "exp3" 2 21 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 4727 0 0
"3304" "exp3" 2 22 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 3595 0 0
"3304" "exp3" 2 23 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2975 35 1
"3304" "exp3" 2 24 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2012 0 0
"3304" "exp3" 2 25 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 7781 35 1
"3304" "exp3" 2 26 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 3764 17 1
"3304" "exp3" 2 27 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 3209 25 1
"3304" "exp3" 2 28 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 4553 20 1
"3304" "exp3" 2 29 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 2048 0 0
"3304" "exp3" 2 30 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 2785 68 1
"3304" "exp3" 2 31 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 7461 0 0
"3304" "exp3" 2 32 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 3455 10 1
"3304" "exp3" 2 33 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 4384 30 1
"3304" "exp3" 2 34 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 5685 0 0
"3304" "exp3" 2 35 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 4712 0 0
"3304" "exp3" 2 36 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 9582 0 0
"3304" "exp3" 2 37 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 3460 34 1
"3304" "exp3" 2 38 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 6863 44 1
"3304" "exp3" 2 39 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 4852 0 0
"3304" "exp3" 2 40 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 5078 25 1
"3304" "exp3" 2 41 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2917 18 1
"3304" "exp3" 2 42 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 3660 0 0
"3304" "exp3" 2 43 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 5194 0 0
"3304" "exp3" 2 44 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 3744 95 1
"3304" "exp3" 2 45 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 4300 0 0
"3304" "exp3" 2 46 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 3452 0 0
"3304" "exp3" 2 47 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 3836 0 0
"3304" "exp3" 2 48 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 5592 70 1
"3304" "exp3" 2 49 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 2176 18 1
"3304" "exp3" 2 50 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2713 0 0
"3304" "exp3" 2 51 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 7260 0 0
"3304" "exp3" 2 52 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 3153 53 1
"3304" "exp3" 2 53 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 3563 13 1
"3304" "exp3" 2 54 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 3119 0 0
"3304" "exp3" 2 55 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 7468 25 1
"3304" "exp3" 2 56 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 8931 0 0
"3304" "exp3" 2 57 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 5532 0 0
"3304" "exp3" 2 58 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 4415 0 0
"3304" "exp3" 2 59 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 5848 0 0
"3304" "exp3" 2 60 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 6390 0 0
"3304" "exp3" 2 61 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 4843 41 1
"3304" "exp3" 2 62 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 3314 13 1
"3304" "exp3" 2 63 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 6440 0 0
"3304" "exp3" 2 64 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2062 0 0
"3304" "exp3" 2 65 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 9951 38 1
"3304" "exp3" 2 66 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 7380 14 1
"3304" "exp3" 2 67 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 2617 76 1
"3304" "exp3" 2 68 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1534 0 0
"3304" "exp3" 2 69 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 3613 85 1
"3304" "exp3" 2 70 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 2793 0 0
"3304" "exp3" 2 71 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 6238 9 1
"3304" "exp3" 2 72 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2344 28 1
"3304" "exp3" 2 73 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 9125 0 0
"3304" "exp3" 2 74 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 6917 0 0
"3304" "exp3" 2 75 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 3051 7 1
"3304" "exp3" 2 76 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 4543 24 1
"3304" "exp3" 2 77 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 3254 30 1
"3304" "exp3" 2 78 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 2394 72 1
"3304" "exp3" 2 79 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 3502 32 1
"3304" "exp3" 2 80 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 5714 24 1
"3304" "exp3" 2 81 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 7176 0 0
"3304" "exp3" 2 82 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 4772 37 1
"3304" "exp3" 2 83 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 2342 54 1
"3304" "exp3" 2 84 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 3566 29 1
"3304" "exp3" 2 85 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2708 0 0
"3304" "exp3" 2 86 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 3682 18 1
"3304" "exp3" 2 87 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 2803 24 1
"3304" "exp3" 2 88 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 5172 0 0
"3304" "exp3" 2 89 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 2746 0 0
"3304" "exp3" 2 90 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 6986 0 0
"3304" "exp3" 2 91 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 5041 19 1
"3304" "exp3" 2 92 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 3320 34 1
"3304" "exp3" 2 93 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1987 0 0
"3304" "exp3" 2 94 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 7932 22 1
"3304" "exp3" 2 95 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 2037 0 0
"3304" "exp3" 2 96 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1515 31 1
"3304" "exp3" 2 97 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 3689 28 1
"3304" "exp3" 2 98 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 5474 0 0
"3304" "exp3" 2 99 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1103 17 1
"3304" "exp3" 2 100 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 2493 14 1
"3304" "exp3" 2 101 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 3818 29 1
"3304" "exp3" 2 102 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 2369 0 0
"3304" "exp3" 2 103 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 3156 8 1
"3304" "exp3" 2 104 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 4906 74 1
"3304" "exp3" 2 105 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 2462 0 0
"3304" "exp3" 2 106 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 7360 0 0
"3304" "exp3" 2 107 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 4020 0 0
"3304" "exp3" 2 108 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 4430 26 1
"3304" "exp3" 2 109 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 7206 15 1
"3304" "exp3" 2 110 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 3216 0 0
"3304" "exp3" 2 111 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 4014 0 0
"3304" "exp3" 2 112 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 2825 12 1
"3304" "exp3" 2 113 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2592 0 0
"3304" "exp3" 2 114 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 6249 0 0
"3304" "exp3" 2 115 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 4253 15 1
"3304" "exp3" 2 116 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2041 36 1
"3304" "exp3" 2 117 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 5624 21 1
"3304" "exp3" 2 118 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 6650 22 1
"3304" "exp3" 2 119 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2087 20 1
"3304" "exp3" 2 120 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 3800 0 0
"3304" "exp3" 2 121 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2583 39 1
"3304" "exp3" 2 122 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 3785 10 1
"3304" "exp3" 2 123 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2467 0 0
"3304" "exp3" 2 124 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 6464 16 1
"3304" "exp3" 2 125 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2916 19 1
"3304" "exp3" 2 126 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 4840 70 1
"3304" "exp3" 2 127 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 4887 0 0
"3304" "exp3" 2 128 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 2573 0 0
"3304" "exp3" 2 129 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 6250 84 1
"3304" "exp3" 2 130 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 4996 23 1
"3304" "exp3" 2 131 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 7392 23 1
"3304" "exp3" 2 132 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2437 23 1
"3304" "exp3" 1 1 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 4388 0 0
"3304" "exp3" 1 2 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 7790 0 0
"3304" "exp3" 1 3 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 3662 83 1
"3304" "exp3" 1 4 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 4485 0 0
"3304" "exp3" 1 5 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 3825 0 0
"3304" "exp3" 1 6 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2964 0 0
"3304" "exp3" 1 7 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 3537 0 0
"3304" "exp3" 1 8 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 4622 41 1
"3304" "exp3" 1 9 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 3929 0 0
"3304" "exp3" 1 10 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 3358 0 0
"3304" "exp3" 1 11 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 5870 78 1
"3304" "exp3" 1 12 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 3720 0 0
"3304" "exp3" 1 13 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 3717 0 0
"3304" "exp3" 1 14 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 2149 67 1
"3304" "exp3" 1 15 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 3589 0 0
"3304" "exp3" 1 16 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 5765 0 0
"3304" "exp3" 1 17 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 3938 23 1
"3304" "exp3" 1 18 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 6686 0 0
"3304" "exp3" 1 19 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 5527 69 1
"3304" "exp3" 1 20 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 6757 0 0
"3304" "exp3" 1 21 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 3383 0 0
"3304" "exp3" 1 22 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 3577 0 0
"3304" "exp3" 1 23 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 4939 0 0
"3304" "exp3" 1 24 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 4922 32 1
"3304" "exp3" 1 25 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 3247 34 1
"3304" "exp3" 1 26 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 5039 0 0
"3304" "exp3" 1 27 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 4614 0 0
"3304" "exp3" 1 28 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 2476 0 0
"3304" "exp3" 1 29 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 9014 0 0
"3304" "exp3" 1 30 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 2349 54 1
"3304" "exp3" 1 31 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 2868 69 1
"3304" "exp3" 1 32 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 4778 28 1
"3304" "exp3" 1 33 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 2847 0 0
"3304" "exp3" 1 34 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 8413 0 0
"3304" "exp3" 1 35 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 3627 20 1
"3304" "exp3" 1 36 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 5535 0 0
"3304" "exp3" 1 37 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 10572 0 0
"3304" "exp3" 1 38 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 5054 0 0
"3304" "exp3" 1 39 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 10011 0 0
"3304" "exp3" 1 40 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1908 0 0
"3304" "exp3" 1 41 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 6856 0 0
"3304" "exp3" 1 42 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 5674 0 0
"3304" "exp3" 1 43 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 4153 0 0
"3304" "exp3" 1 44 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 2996 0 0
"3304" "exp3" 1 45 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2361 64 1
"3304" "exp3" 1 46 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 1638 0 0
"3304" "exp3" 1 47 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1971 0 0
"3304" "exp3" 1 48 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 10550 53 1
"3304" "exp3" 1 49 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 8856 0 0
"3304" "exp3" 1 50 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 5148 96 1
"3304" "exp3" 1 51 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 4014 84 1
"3304" "exp3" 1 52 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 13245 0 0
"3304" "exp3" 1 53 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 2162 0 0
"3304" "exp3" 1 54 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 3853 21 1
"3304" "exp3" 1 55 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 4225 0 0
"3304" "exp3" 1 56 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1782 75 1
"3304" "exp3" 1 57 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 3500 78 1
"3304" "exp3" 1 58 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2070 28 1
"3304" "exp3" 1 59 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 3338 0 0
"3304" "exp3" 1 60 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 2243 95 1
"3304" "exp3" 1 61 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2892 0 0
"3304" "exp3" 1 62 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2667 0 0
"3304" "exp3" 1 63 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 5206 0 0
"3304" "exp3" 1 64 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 6685 0 0
"3304" "exp3" 1 65 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1989 0 0
"3304" "exp3" 1 66 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 4150 0 0
"3304" "exp3" 1 67 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 2059 68 1
"3304" "exp3" 1 68 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1987 0 0
"3304" "exp3" 1 69 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 4991 0 0
"3304" "exp3" 1 70 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 5894 0 0
"3304" "exp3" 1 71 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 3428 31 1
"3304" "exp3" 1 72 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 3103 59 1
"3304" "exp3" 1 73 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 2492 24 1
"3304" "exp3" 1 74 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 2899 0 0
"3304" "exp3" 1 75 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 3506 45 1
"3304" "exp3" 1 76 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2926 27 1
"3304" "exp3" 1 77 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 2361 0 0
"3304" "exp3" 1 78 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 6352 0 0
"3304" "exp3" 1 79 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2973 37 1
"3304" "exp3" 1 80 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 6108 29 1
"3304" "exp3" 1 81 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 10559 0 0
"3304" "exp3" 1 82 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1624 76 1
"3304" "exp3" 1 83 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 5336 0 0
"3304" "exp3" 1 84 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2430 0 0
"3304" "exp3" 1 85 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 5551 0 0
"3304" "exp3" 1 86 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 2710 0 0
"3304" "exp3" 1 87 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 7024 0 0
"3304" "exp3" 1 88 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2290 30 1
"3304" "exp3" 1 89 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 2637 0 0
"3304" "exp3" 1 90 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1982 0 0
"3304" "exp3" 1 91 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2810 92 1
"3304" "exp3" 1 92 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 5190 0 0
"3304" "exp3" 1 93 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 3477 80 1
"3304" "exp3" 1 94 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 6112 29 1
"3304" "exp3" 1 95 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1677 0 0
"3304" "exp3" 1 96 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 3668 39 1
"3304" "exp3" 1 97 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2989 26 1
"3304" "exp3" 1 98 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 3389 57 1
"3304" "exp3" 1 99 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 4475 0 0
"3304" "exp3" 1 100 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 1894 0 0
"3304" "exp3" 1 101 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 1888 0 0
"3304" "exp3" 1 102 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 4612 0 0
"3304" "exp3" 1 103 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 7022 0 0
"3304" "exp3" 1 104 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 5900 0 0
"3304" "exp3" 1 105 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 3926 0 0
"3304" "exp3" 1 106 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 4334 0 0
"3304" "exp3" 1 107 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 3386 97 1
"3304" "exp3" 1 108 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 3712 0 0
"3304" "exp3" 1 109 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 4330 0 0
"3304" "exp3" 1 110 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 4398 63 1
"3304" "exp3" 1 111 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 6392 71 1
"3304" "exp3" 1 112 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 4494 0 0
"3304" "exp3" 1 113 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1875 23 1
"3304" "exp3" 1 114 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 2324 0 0
"3304" "exp3" 1 115 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 2158 0 0
"3304" "exp3" 1 116 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 11073 15 1
"3304" "exp3" 1 117 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 3166 32 1
"3304" "exp3" 1 118 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 3012 0 0
"3304" "exp3" 1 119 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 4832 25 1
"3304" "exp3" 1 120 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 8045 89 1
"3304" "exp3" 1 121 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1304 0 0
"3304" "exp3" 1 122 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 5964 0 0
"3304" "exp3" 1 123 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 3711 69 1
"3304" "exp3" 1 124 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2047 0 0
"3304" "exp3" 1 125 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 3445 0 0
"3304" "exp3" 1 126 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1243 0 0
"3304" "exp3" 1 127 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2646 44 1
"3304" "exp3" 1 128 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3269 67 1
"3304" "exp3" 1 129 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 9768 0 0
"3304" "exp3" 1 130 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 5934 25 1
"3304" "exp3" 1 131 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2198 43 1
"3304" "exp3" 1 132 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 2969 0 0
"3304" "exp3" 2 1 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 5017 34 1
"3304" "exp3" 2 2 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 7197 0 0
"3304" "exp3" 2 3 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 4392 0 0
"3304" "exp3" 2 4 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 4031 0 0
"3304" "exp3" 2 5 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 4884 30 1
"3304" "exp3" 2 6 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 2153 0 0
"3304" "exp3" 2 7 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 3322 13 1
"3304" "exp3" 2 8 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 3889 0 0
"3304" "exp3" 2 9 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 3045 68 1
"3304" "exp3" 2 10 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 5889 49 1
"3304" "exp3" 2 11 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 6672 62 1
"3304" "exp3" 2 12 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 4832 73 1
"3304" "exp3" 2 13 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 2820 0 0
"3304" "exp3" 2 14 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 3944 83 1
"3304" "exp3" 2 15 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 3689 27 1
"3304" "exp3" 2 16 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 5632 10 1
"3304" "exp3" 2 17 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 2732 0 0
"3304" "exp3" 2 18 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 4282 0 0
"3304" "exp3" 2 19 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 3852 0 0
"3304" "exp3" 2 20 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 4698 28 1
"3304" "exp3" 2 21 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 3107 0 0
"3304" "exp3" 2 22 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 8191 0 0
"3304" "exp3" 2 23 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 3579 0 0
"3304" "exp3" 2 24 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 5252 0 0
"3304" "exp3" 2 25 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1976 0 0
"3304" "exp3" 2 26 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 6474 23 1
"3304" "exp3" 2 27 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 4752 0 0
"3304" "exp3" 2 28 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 7879 30 1
"3304" "exp3" 2 29 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2141 37 1
"3304" "exp3" 2 30 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 5808 0 0
"3304" "exp3" 2 31 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 4304 21 1
"3304" "exp3" 2 32 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 3265 0 0
"3304" "exp3" 2 33 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 7277 69 1
"3304" "exp3" 2 34 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 4249 14 1
"3304" "exp3" 2 35 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 5207 36 1
"3304" "exp3" 2 36 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 6602 0 0
"3304" "exp3" 2 37 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2612 34 1
"3304" "exp3" 2 38 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 6738 0 0
"3304" "exp3" 2 39 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 3136 71 1
"3304" "exp3" 2 40 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 2776 7 1
"3304" "exp3" 2 41 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 12389 0 0
"3304" "exp3" 2 42 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1141 0 0
"3304" "exp3" 2 43 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 2510 0 0
"3304" "exp3" 2 44 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1558 0 0
"3304" "exp3" 2 45 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 4065 0 0
"3304" "exp3" 2 46 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 2822 0 0
"3304" "exp3" 2 47 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1988 0 0
"3304" "exp3" 2 48 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 3312 0 0
"3304" "exp3" 2 49 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 4995 0 0
"3304" "exp3" 2 50 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2586 0 0
"3304" "exp3" 2 51 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 2147 18 1
"3304" "exp3" 2 52 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2067 0 0
"3304" "exp3" 2 53 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 2440 0 0
"3304" "exp3" 2 54 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 3598 0 0
"3304" "exp3" 2 55 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 4083 0 0
"3304" "exp3" 2 56 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1641 22 1
"3304" "exp3" 2 57 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 3126 39 1
"3304" "exp3" 2 58 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 4839 30 1
"3304" "exp3" 2 59 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2654 38 1
"3304" "exp3" 2 60 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 4163 0 0
"3304" "exp3" 2 61 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2921 36 1
"3304" "exp3" 2 62 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 2325 0 0
"3304" "exp3" 2 63 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 2443 0 0
"3304" "exp3" 2 64 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1450 20 1
"3304" "exp3" 2 65 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 9189 0 0
"3304" "exp3" 2 66 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 9668 0 0
"3304" "exp3" 2 67 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 2269 48 1
"3304" "exp3" 2 68 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 2301 0 0
"3304" "exp3" 2 69 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1053 23 1
"3304" "exp3" 2 70 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1869 26 1
"3304" "exp3" 2 71 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1518 83 1
"3304" "exp3" 2 72 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 2245 25 1
"3304" "exp3" 2 73 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 2101 0 0
"3304" "exp3" 2 74 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2163 0 0
"3304" "exp3" 2 75 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 3695 66 1
"3304" "exp3" 2 76 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 1670 0 0
"3304" "exp3" 2 77 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 3191 0 0
"3304" "exp3" 2 78 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1416 0 0
"3304" "exp3" 2 79 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 3110 0 0
"3304" "exp3" 2 80 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1809 40 1
"3304" "exp3" 2 81 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3191 67 1
"3304" "exp3" 2 82 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 2599 24 1
"3304" "exp3" 2 83 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1446 37 1
"3304" "exp3" 2 84 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 1998 0 0
"3304" "exp3" 2 85 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 3044 31 1
"3304" "exp3" 2 86 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 1059 0 0
"3304" "exp3" 2 87 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 3443 16 1
"3304" "exp3" 2 88 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 3559 25 1
"3304" "exp3" 2 89 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 2883 0 0
"3304" "exp3" 2 90 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1741 0 0
"3304" "exp3" 2 91 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 2461 35 1
"3304" "exp3" 2 92 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1767 0 0
"3304" "exp3" 2 93 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1814 19 1
"3304" "exp3" 2 94 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1510 24 1
"3304" "exp3" 2 95 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1758 0 0
"3304" "exp3" 2 96 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 5058 68 1
"3304" "exp3" 2 97 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 2780 0 0
"3304" "exp3" 2 98 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1919 33 1
"3304" "exp3" 2 99 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 3526 29 1
"3304" "exp3" 2 100 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 7007 23 1
"3304" "exp3" 2 101 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 2747 67 1
"3304" "exp3" 2 102 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 756 21 1
"3304" "exp3" 2 103 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 4273 0 0
"3304" "exp3" 2 104 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1429 91 1
"3304" "exp3" 2 105 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 4924 0 0
"3304" "exp3" 2 106 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1363 40 1
"3304" "exp3" 2 107 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1194 20 1
"3304" "exp3" 2 108 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 3634 0 0
"3304" "exp3" 2 109 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1829 0 0
"3304" "exp3" 2 110 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1327 0 0
"3304" "exp3" 2 111 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 3793 0 0
"3304" "exp3" 2 112 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 3250 0 0
"3304" "exp3" 2 113 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2770 0 0
"3304" "exp3" 2 114 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 8688 0 0
"3304" "exp3" 2 115 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2357 0 0
"3304" "exp3" 2 116 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1556 0 0
"3304" "exp3" 2 117 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1361 0 0
"3304" "exp3" 2 118 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1398 25 1
"3304" "exp3" 2 119 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1877 28 1
"3304" "exp3" 2 120 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1808 0 0
"3304" "exp3" 2 121 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2138 45 1
"3304" "exp3" 2 122 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 2918 19 1
"3304" "exp3" 2 123 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 4076 31 1
"3304" "exp3" 2 124 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 3708 13 1
"3304" "exp3" 2 125 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 3533 0 0
"3304" "exp3" 2 126 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 5781 17 1
"3304" "exp3" 2 127 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1817 85 1
"3304" "exp3" 2 128 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1998 0 0
"3304" "exp3" 2 129 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 2034 23 1
"3304" "exp3" 2 130 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2587 0 0
"3304" "exp3" 2 131 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1991 20 1
"3304" "exp3" 2 132 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 3975 0 0
"3304" "exp3" 1 1 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 5835 9 1
"3304" "exp3" 1 2 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 4809 21 1
"3304" "exp3" 1 3 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 4227 42 1
"3304" "exp3" 1 4 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 3371 0 0
"3304" "exp3" 1 5 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 5029 22 1
"3304" "exp3" 1 6 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 3019 75 1
"3304" "exp3" 1 7 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 5762 0 0
"3304" "exp3" 1 8 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 2878 96 1
"3304" "exp3" 1 9 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 2921 0 0
"3304" "exp3" 1 10 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1754 55 1
"3304" "exp3" 1 11 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1708 0 0
"3304" "exp3" 1 12 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1292 24 1
"3304" "exp3" 1 13 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 3063 59 1
"3304" "exp3" 1 14 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1777 0 0
"3304" "exp3" 1 15 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 3306 0 0
"3304" "exp3" 1 16 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 3653 0 0
"3304" "exp3" 1 17 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 3844 0 0
"3304" "exp3" 1 18 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 7901 0 0
"3304" "exp3" 1 19 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 3401 0 0
"3304" "exp3" 1 20 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 3647 40 1
"3304" "exp3" 1 21 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 2071 72 1
"3304" "exp3" 1 22 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 4872 34 1
"3304" "exp3" 1 23 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 2291 0 0
"3304" "exp3" 1 24 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 9187 19 1
"3304" "exp3" 1 25 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 3014 31 1
"3304" "exp3" 1 26 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2606 17 1
"3304" "exp3" 1 27 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1552 0 0
"3304" "exp3" 1 28 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 2161 16 1
"3304" "exp3" 1 29 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 2576 0 0
"3304" "exp3" 1 30 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1604 0 0
"3304" "exp3" 1 31 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 2136 40 1
"3304" "exp3" 1 32 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 6673 52 1
"3304" "exp3" 1 33 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 4839 0 0
"3304" "exp3" 1 34 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 2040 61 1
"3304" "exp3" 1 35 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1524 0 0
"3304" "exp3" 1 36 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1009 0 0
"3304" "exp3" 1 37 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 3321 0 0
"3304" "exp3" 1 38 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 2248 84 1
"3304" "exp3" 1 39 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 2754 58 1
"3304" "exp3" 1 40 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 2914 0 0
"3304" "exp3" 1 41 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2935 72 1
"3304" "exp3" 1 42 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1562 24 1
"3304" "exp3" 1 43 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 2458 0 0
"3304" "exp3" 1 44 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 3903 32 1
"3304" "exp3" 1 45 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 2727 0 0
"3304" "exp3" 1 46 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 3220 44 1
"3304" "exp3" 1 47 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1434 29 1
"3304" "exp3" 1 48 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 6692 0 0
"3304" "exp3" 1 49 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2097 44 1
"3304" "exp3" 1 50 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1551 37 1
"3304" "exp3" 1 51 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 2327 0 0
"3304" "exp3" 1 52 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 2095 0 0
"3304" "exp3" 1 53 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 2519 73 1
"3304" "exp3" 1 54 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1557 0 0
"3304" "exp3" 1 55 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1266 0 0
"3304" "exp3" 1 56 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 2659 28 1
"3304" "exp3" 1 57 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2660 0 0
"3304" "exp3" 1 58 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 2653 0 0
"3304" "exp3" 1 59 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 2717 0 0
"3304" "exp3" 1 60 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 2440 0 0
"3304" "exp3" 1 61 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1564 0 0
"3304" "exp3" 1 62 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 2373 0 0
"3304" "exp3" 1 63 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 2421 91 1
"3304" "exp3" 1 64 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 911 0 0
"3304" "exp3" 1 65 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1081 0 0
"3304" "exp3" 1 66 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 2120 65 1
"3304" "exp3" 1 67 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1642 0 0
"3304" "exp3" 1 68 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2561 39 1
"3304" "exp3" 1 69 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 2654 69 1
"3304" "exp3" 1 70 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 4178 45 1
"3304" "exp3" 1 71 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2326 18 1
"3304" "exp3" 1 72 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 2258 33 1
"3304" "exp3" 1 73 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2431 31 1
"3304" "exp3" 1 74 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 2185 25 1
"3304" "exp3" 1 75 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1109 0 0
"3304" "exp3" 1 76 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1364 0 0
"3304" "exp3" 1 77 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1274 0 0
"3304" "exp3" 1 78 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 3061 0 0
"3304" "exp3" 1 79 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 2604 11 1
"3304" "exp3" 1 80 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 3027 0 0
"3304" "exp3" 1 81 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1537 0 0
"3304" "exp3" 1 82 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 2272 0 0
"3304" "exp3" 1 83 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 2294 0 0
"3304" "exp3" 1 84 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1863 93 1
"3304" "exp3" 1 85 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 2464 0 0
"3304" "exp3" 1 86 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 882 0 0
"3304" "exp3" 1 87 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1447 13 1
"3304" "exp3" 1 88 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 789 12 1
"3304" "exp3" 1 89 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 1402 0 0
"3304" "exp3" 1 90 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1894 0 0
"3304" "exp3" 1 91 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1149 0 0
"3304" "exp3" 1 92 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 2485 0 0
"3304" "exp3" 1 93 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 663 0 0
"3304" "exp3" 1 94 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1701 0 0
"3304" "exp3" 1 95 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 3808 20 1
"3304" "exp3" 1 96 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 3146 32 1
"3304" "exp3" 1 97 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1015 26 1
"3304" "exp3" 1 98 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 940 73 1
"3304" "exp3" 1 99 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1530 0 0
"3304" "exp3" 1 100 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1317 35 1
"3304" "exp3" 1 101 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1874 0 0
"3304" "exp3" 1 102 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1643 43 1
"3304" "exp3" 1 103 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2575 68 1
"3304" "exp3" 1 104 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1296 0 0
"3304" "exp3" 1 105 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 2100 23 1
"3304" "exp3" 1 106 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1007 0 0
"3304" "exp3" 1 107 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1808 0 0
"3304" "exp3" 1 108 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 2926 0 0
"3304" "exp3" 1 109 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1084 0 0
"3304" "exp3" 1 110 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 817 0 0
"3304" "exp3" 1 111 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1999 74 1
"3304" "exp3" 1 112 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1531 81 1
"3304" "exp3" 1 113 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 980 21 1
"3304" "exp3" 1 114 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 961 0 0
"3304" "exp3" 1 115 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2507 0 0
"3304" "exp3" 1 116 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1187 82 1
"3304" "exp3" 1 117 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1004 0 0
"3304" "exp3" 1 118 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 2828 0 0
"3304" "exp3" 1 119 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 1626 0 0
"3304" "exp3" 1 120 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1427 6 1
"3304" "exp3" 1 121 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 3974 0 0
"3304" "exp3" 1 122 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 1372 0 0
"3304" "exp3" 1 123 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1483 30 1
"3304" "exp3" 1 124 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 822 28 1
"3304" "exp3" 1 125 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 2957 0 0
"3304" "exp3" 1 126 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1645 25 1
"3304" "exp3" 1 127 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 2088 0 0
"3304" "exp3" 1 128 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 1224 0 0
"3304" "exp3" 1 129 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 1292 87 1
"3304" "exp3" 1 130 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1562 37 1
"3304" "exp3" 1 131 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1933 0 0
"3304" "exp3" 1 132 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1045 0 0
"3304" "exp3" 2 1 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 3807 0 0
"3304" "exp3" 2 2 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 4528 82 1
"3304" "exp3" 2 3 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 1959 0 0
"3304" "exp3" 2 4 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 833 35 1
"3304" "exp3" 2 5 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1329 43 1
"3304" "exp3" 2 6 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 596 0 0
"3304" "exp3" 2 7 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 714 0 0
"3304" "exp3" 2 8 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1719 0 0
"3304" "exp3" 2 9 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 882 23 1
"3304" "exp3" 2 10 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 2083 0 0
"3304" "exp3" 2 11 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1980 0 0
"3304" "exp3" 2 12 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1107 0 0
"3304" "exp3" 2 13 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 3022 0 0
"3304" "exp3" 2 14 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1002 0 0
"3304" "exp3" 2 15 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1812 21 1
"3304" "exp3" 2 16 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 2801 34 1
"3304" "exp3" 2 17 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 1396 0 0
"3304" "exp3" 2 18 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1753 0 0
"3304" "exp3" 2 19 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 1248 0 0
"3304" "exp3" 2 20 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1214 0 0
"3304" "exp3" 2 21 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 3121 23 1
"3304" "exp3" 2 22 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1278 34 1
"3304" "exp3" 2 23 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 2652 0 0
"3304" "exp3" 2 24 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 2059 0 0
"3304" "exp3" 2 25 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1242 0 0
"3304" "exp3" 2 26 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1399 0 0
"3304" "exp3" 2 27 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1514 0 0
"3304" "exp3" 2 28 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 834 32 1
"3304" "exp3" 2 29 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 1535 0 0
"3304" "exp3" 2 30 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1875 19 1
"3304" "exp3" 2 31 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 945 0 0
"3304" "exp3" 2 32 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1703 0 0
"3304" "exp3" 2 33 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1324 23 1
"3304" "exp3" 2 34 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 2192 0 0
"3304" "exp3" 2 35 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 859 0 0
"3304" "exp3" 2 36 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 2349 30 1
"3304" "exp3" 2 37 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1376 0 0
"3304" "exp3" 2 38 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 2238 0 0
"3304" "exp3" 2 39 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 757 0 0
"3304" "exp3" 2 40 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 1440 0 0
"3304" "exp3" 2 41 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 2003 0 0
"3304" "exp3" 2 42 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 2345 97 1
"3304" "exp3" 2 43 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 3227 49 1
"3304" "exp3" 2 44 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 993 0 0
"3304" "exp3" 2 45 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1640 0 0
"3304" "exp3" 2 46 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1657 0 0
"3304" "exp3" 2 47 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 1148 0 0
"3304" "exp3" 2 48 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1452 0 0
"3304" "exp3" 2 49 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1166 0 0
"3304" "exp3" 2 50 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 2237 0 0
"3304" "exp3" 2 51 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1146 44 1
"3304" "exp3" 2 52 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 870 0 0
"3304" "exp3" 2 53 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 2329 0 0
"3304" "exp3" 2 54 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 2019 0 0
"3304" "exp3" 2 55 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1229 0 0
"3304" "exp3" 2 56 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 1219 0 0
"3304" "exp3" 2 57 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 959 67 1
"3304" "exp3" 2 58 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1106 0 0
"3304" "exp3" 2 59 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1050 0 0
"3304" "exp3" 2 60 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1516 0 0
"3304" "exp3" 2 61 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 731 0 0
"3304" "exp3" 2 62 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 548 0 0
"3304" "exp3" 2 63 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1115 0 0
"3304" "exp3" 2 64 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1728 0 0
"3304" "exp3" 2 65 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 1633 9 1
"3304" "exp3" 2 66 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 678 0 0
"3304" "exp3" 2 67 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 841 0 0
"3304" "exp3" 2 68 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 1676 0 0
"3304" "exp3" 2 69 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 2489 61 1
"3304" "exp3" 2 70 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1901 13 1
"3304" "exp3" 2 71 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1870 31 1
"3304" "exp3" 2 72 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 2324 55 1
"3304" "exp3" 2 73 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1552 22 1
"3304" "exp3" 2 74 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1329 92 1
"3304" "exp3" 2 75 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 2201 0 0
"3304" "exp3" 2 76 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1719 60 1
"3304" "exp3" 2 77 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 3244 76 1
"3304" "exp3" 2 78 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1501 0 0
"3304" "exp3" 2 79 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 920 32 1
"3304" "exp3" 2 80 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1374 0 0
"3304" "exp3" 2 81 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1976 95 1
"3304" "exp3" 2 82 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1238 25 1
"3304" "exp3" 2 83 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1664 0 0
"3304" "exp3" 2 84 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 882 64 1
"3304" "exp3" 2 85 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 656 0 0
"3304" "exp3" 2 86 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2155 39 1
"3304" "exp3" 2 87 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 934 69 1
"3304" "exp3" 2 88 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 1138 66 1
"3304" "exp3" 2 89 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1313 0 0
"3304" "exp3" 2 90 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 501 67 1
"3304" "exp3" 2 91 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 546 0 0
"3304" "exp3" 2 92 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1832 0 0
"3304" "exp3" 2 93 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 911 0 0
"3304" "exp3" 2 94 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 919 0 0
"3304" "exp3" 2 95 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 1655 0 0
"3304" "exp3" 2 96 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 1324 0 0
"3304" "exp3" 2 97 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 538 0 0
"3304" "exp3" 2 98 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 638 0 0
"3304" "exp3" 2 99 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 1413 0 0
"3304" "exp3" 2 100 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 622 9 1
"3304" "exp3" 2 101 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 2013 0 0
"3304" "exp3" 2 102 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1082 0 0
"3304" "exp3" 2 103 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 599 68 1
"3304" "exp3" 2 104 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 451 0 0
"3304" "exp3" 2 105 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1147 0 0
"3304" "exp3" 2 106 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 907 13 1
"3304" "exp3" 2 107 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 1984 0 0
"3304" "exp3" 2 108 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 519 0 0
"3304" "exp3" 2 109 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 871 26 1
"3304" "exp3" 2 110 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 584 0 0
"3304" "exp3" 2 111 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 818 0 0
"3304" "exp3" 2 112 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1003 71 1
"3304" "exp3" 2 113 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1870 78 1
"3304" "exp3" 2 114 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 657 73 1
"3304" "exp3" 2 115 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 1405 63 1
"3304" "exp3" 2 116 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 2270 0 0
"3304" "exp3" 2 117 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1589 18 1
"3304" "exp3" 2 118 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 588 18 1
"3304" "exp3" 2 119 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 974 20 1
"3304" "exp3" 2 120 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1299 38 1
"3304" "exp3" 2 121 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 851 0 0
"3304" "exp3" 2 122 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1064 24 1
"3304" "exp3" 2 123 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 767 25 1
"3304" "exp3" 2 124 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 822 84 1
"3304" "exp3" 2 125 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1163 0 0
"3304" "exp3" 2 126 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1219 0 0
"3304" "exp3" 2 127 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1338 0 0
"3304" "exp3" 2 128 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 863 0 0
"3304" "exp3" 2 129 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1037 0 0
"3304" "exp3" 2 130 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 2122 0 0
"3304" "exp3" 2 131 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1764 0 0
"3304" "exp3" 2 132 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1159 0 0
"3304" "exp3" 1 1 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 5650 38 1
"3304" "exp3" 1 2 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 11787 0 0
"3304" "exp3" 1 3 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1732 42 1
"3304" "exp3" 1 4 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 3078 21 1
"3304" "exp3" 1 5 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 2456 5 1
"3304" "exp3" 1 6 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 2467 0 0
"3304" "exp3" 1 7 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1227 0 0
"3304" "exp3" 1 8 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 6061 0 0
"3304" "exp3" 1 9 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 962 0 0
"3304" "exp3" 1 10 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1255 0 0
"3304" "exp3" 1 11 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1932 0 0
"3304" "exp3" 1 12 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1680 18 1
"3304" "exp3" 1 13 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2241 43 1
"3304" "exp3" 1 14 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1298 0 0
"3304" "exp3" 1 15 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1379 0 0
"3304" "exp3" 1 16 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 818 26 1
"3304" "exp3" 1 17 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 872 21 1
"3304" "exp3" 1 18 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1432 0 0
"3304" "exp3" 1 19 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1350 59 1
"3304" "exp3" 1 20 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1445 0 0
"3304" "exp3" 1 21 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 917 0 0
"3304" "exp3" 1 22 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 1140 0 0
"3304" "exp3" 1 23 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 667 0 0
"3304" "exp3" 1 24 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1111 0 0
"3304" "exp3" 1 25 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 576 31 1
"3304" "exp3" 1 26 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 2395 78 1
"3304" "exp3" 1 27 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1007 19 1
"3304" "exp3" 1 28 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1732 70 1
"3304" "exp3" 1 29 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 979 42 1
"3304" "exp3" 1 30 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1375 0 0
"3304" "exp3" 1 31 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1346 0 0
"3304" "exp3" 1 32 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 828 0 0
"3304" "exp3" 1 33 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 538 0 0
"3304" "exp3" 1 34 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1211 0 0
"3304" "exp3" 1 35 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 550 15 1
"3304" "exp3" 1 36 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 624 18 1
"3304" "exp3" 1 37 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1354 83 1
"3304" "exp3" 1 38 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 671 0 0
"3304" "exp3" 1 39 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 642 35 1
"3304" "exp3" 1 40 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 946 0 0
"3304" "exp3" 1 41 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1593 0 0
"3304" "exp3" 1 42 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 524 0 0
"3304" "exp3" 1 43 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 936 0 0
"3304" "exp3" 1 44 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1402 27 1
"3304" "exp3" 1 45 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1211 26 1
"3304" "exp3" 1 46 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1385 24 1
"3304" "exp3" 1 47 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 979 25 1
"3304" "exp3" 1 48 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 483 21 1
"3304" "exp3" 1 49 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1582 0 0
"3304" "exp3" 1 50 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1107 0 0
"3304" "exp3" 1 51 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 586 27 1
"3304" "exp3" 1 52 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 622 43 1
"3304" "exp3" 1 53 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 679 0 0
"3304" "exp3" 1 54 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 963 22 1
"3304" "exp3" 1 55 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1094 0 0
"3304" "exp3" 1 56 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 1302 71 1
"3304" "exp3" 1 57 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1028 0 0
"3304" "exp3" 1 58 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 998 39 1
"3304" "exp3" 1 59 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1425 17 1
"3304" "exp3" 1 60 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 558 8 1
"3304" "exp3" 1 61 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1363 20 1
"3304" "exp3" 1 62 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1765 0 0
"3304" "exp3" 1 63 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 510 0 0
"3304" "exp3" 1 64 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1122 0 0
"3304" "exp3" 1 65 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 934 24 1
"3304" "exp3" 1 66 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 558 7 1
"3304" "exp3" 1 67 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1102 25 1
"3304" "exp3" 1 68 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1838 68 1
"3304" "exp3" 1 69 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1146 13 1
"3304" "exp3" 1 70 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 971 0 0
"3304" "exp3" 1 71 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 528 32 1
"3304" "exp3" 1 72 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 725 0 0
"3304" "exp3" 1 73 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 483 0 0
"3304" "exp3" 1 74 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 303 84 1
"3304" "exp3" 1 75 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 388 0 0
"3304" "exp3" 1 76 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 739 33 1
"3304" "exp3" 1 77 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 878 0 0
"3304" "exp3" 1 78 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 524 0 0
"3304" "exp3" 1 79 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 520 48 1
"3304" "exp3" 1 80 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 749 44 1
"3304" "exp3" 1 81 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 547 0 0
"3304" "exp3" 1 82 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 706 19 1
"3304" "exp3" 1 83 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 712 0 0
"3304" "exp3" 1 84 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 517 0 0
"3304" "exp3" 1 85 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1393 0 0
"3304" "exp3" 1 86 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 408 44 1
"3304" "exp3" 1 87 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 951 0 0
"3304" "exp3" 1 88 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 994 29 1
"3304" "exp3" 1 89 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 766 0 0
"3304" "exp3" 1 90 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1325 0 0
"3304" "exp3" 1 91 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 632 0 0
"3304" "exp3" 1 92 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1665 40 1
"3304" "exp3" 1 93 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1189 0 0
"3304" "exp3" 1 94 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 959 11 1
"3304" "exp3" 1 95 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 498 0 0
"3304" "exp3" 1 96 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1388 27 1
"3304" "exp3" 1 97 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 483 0 0
"3304" "exp3" 1 98 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 955 0 0
"3304" "exp3" 1 99 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 665 0 0
"3304" "exp3" 1 100 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1465 28 1
"3304" "exp3" 1 101 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 503 9 1
"3304" "exp3" 1 102 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1043 29 1
"3304" "exp3" 1 103 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 942 14 1
"3304" "exp3" 1 104 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 986 0 0
"3304" "exp3" 1 105 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1026 0 0
"3304" "exp3" 1 106 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 860 0 0
"3304" "exp3" 1 107 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 927 0 0
"3304" "exp3" 1 108 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 357 15 1
"3304" "exp3" 1 109 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 396 0 0
"3304" "exp3" 1 110 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 494 28 1
"3304" "exp3" 1 111 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 818 0 0
"3304" "exp3" 1 112 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 691 22 1
"3304" "exp3" 1 113 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 382 28 1
"3304" "exp3" 1 114 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 332 22 1
"3304" "exp3" 1 115 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1096 82 1
"3304" "exp3" 1 116 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 821 0 0
"3304" "exp3" 1 117 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 604 0 0
"3304" "exp3" 1 118 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 931 68 1
"3304" "exp3" 1 119 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1159 0 0
"3304" "exp3" 1 120 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1828 0 0
"3304" "exp3" 1 121 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 989 0 0
"3304" "exp3" 1 122 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1393 0 0
"3304" "exp3" 1 123 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1400 0 0
"3304" "exp3" 1 124 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 781 0 0
"3304" "exp3" 1 125 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 301 46 1
"3304" "exp3" 1 126 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 851 0 0
"3304" "exp3" 1 127 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 893 0 0
"3304" "exp3" 1 128 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 851 0 0
"3304" "exp3" 1 129 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1381 0 0
"3304" "exp3" 1 130 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 565 0 0
"3304" "exp3" 1 131 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 219 0 0
"3304" "exp3" 1 132 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 5451 0 0
"3304" "exp3" 2 1 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1227 0 0
"3304" "exp3" 2 2 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1058 0 0
"3304" "exp3" 2 3 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1751 0 0
"3304" "exp3" 2 4 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 556 30 1
"3304" "exp3" 2 5 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1147 57 1
"3304" "exp3" 2 6 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 849 71 1
"3304" "exp3" 2 7 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 599 79 1
"3304" "exp3" 2 8 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 723 0 0
"3304" "exp3" 2 9 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1594 0 0
"3304" "exp3" 2 10 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1436 0 0
"3304" "exp3" 2 11 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1626 41 1
"3304" "exp3" 2 12 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 553 32 1
"3304" "exp3" 2 13 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1091 0 0
"3304" "exp3" 2 14 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 735 80 1
"3304" "exp3" 2 15 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1406 38 1
"3304" "exp3" 2 16 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 593 30 1
"3304" "exp3" 2 17 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 675 53 1
"3304" "exp3" 2 18 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 507 69 1
"3304" "exp3" 2 19 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 610 43 1
"3304" "exp3" 2 20 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 723 0 0
"3304" "exp3" 2 21 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 599 0 0
"3304" "exp3" 2 22 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 808 0 0
"3304" "exp3" 2 23 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 2883 0 0
"3304" "exp3" 2 24 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 739 33 1
"3304" "exp3" 2 25 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1328 0 0
"3304" "exp3" 2 26 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 744 37 1
"3304" "exp3" 2 27 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 676 0 0
"3304" "exp3" 2 28 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 1366 0 0
"3304" "exp3" 2 29 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1055 0 0
"3304" "exp3" 2 30 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 1081 0 0
"3304" "exp3" 2 31 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 544 0 0
"3304" "exp3" 2 32 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1137 0 0
"3304" "exp3" 2 33 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 568 0 0
"3304" "exp3" 2 34 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1400 31 1
"3304" "exp3" 2 35 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 577 29 1
"3304" "exp3" 2 36 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 674 14 1
"3304" "exp3" 2 37 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 753 5 1
"3304" "exp3" 2 38 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 986 0 0
"3304" "exp3" 2 39 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 905 98 1
"3304" "exp3" 2 40 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 626 0 0
"3304" "exp3" 2 41 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1075 0 0
"3304" "exp3" 2 42 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 589 31 1
"3304" "exp3" 2 43 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 475 24 1
"3304" "exp3" 2 44 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1280 45 1
"3304" "exp3" 2 45 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 465 0 0
"3304" "exp3" 2 46 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 580 24 1
"3304" "exp3" 2 47 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 855 26 1
"3304" "exp3" 2 48 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 745 0 0
"3304" "exp3" 2 49 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 481 59 1
"3304" "exp3" 2 50 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 497 63 1
"3304" "exp3" 2 51 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 782 0 0
"3304" "exp3" 2 52 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 455 28 1
"3304" "exp3" 2 53 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 431 26 1
"3304" "exp3" 2 54 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 211 80 1
"3304" "exp3" 2 55 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 541 21 1
"3304" "exp3" 2 56 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 893 0 0
"3304" "exp3" 2 57 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 744 12 1
"3304" "exp3" 2 58 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 2430 0 0
"3304" "exp3" 2 59 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1106 71 1
"3304" "exp3" 2 60 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1715 16 1
"3304" "exp3" 2 61 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1670 0 0
"3304" "exp3" 2 62 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 3224 0 0
"3304" "exp3" 2 63 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1745 7 1
"3304" "exp3" 2 64 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1256 0 0
"3304" "exp3" 2 65 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 2700 55 1
"3304" "exp3" 2 66 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 1840 0 0
"3304" "exp3" 2 67 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 1087 66 1
"3304" "exp3" 2 68 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 2081 0 0
"3304" "exp3" 2 69 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 1792 79 1
"3304" "exp3" 2 70 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 620 0 0
"3304" "exp3" 2 71 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 1364 58 1
"3304" "exp3" 2 72 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 460 33 1
"3304" "exp3" 2 73 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 387 0 0
"3304" "exp3" 2 74 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1252 84 1
"3304" "exp3" 2 75 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 537 0 0
"3304" "exp3" 2 76 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 955 0 0
"3304" "exp3" 2 77 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 492 0 0
"3304" "exp3" 2 78 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1259 0 0
"3304" "exp3" 2 79 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 618 0 0
"3304" "exp3" 2 80 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 420 0 0
"3304" "exp3" 2 81 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 913 0 0
"3304" "exp3" 2 82 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 560 0 0
"3304" "exp3" 2 83 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 679 73 1
"3304" "exp3" 2 84 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 996 64 1
"3304" "exp3" 2 85 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1225 28 1
"3304" "exp3" 2 86 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 663 0 0
"3304" "exp3" 2 87 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 380 0 0
"3304" "exp3" 2 88 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 19 0 0
"3304" "exp3" 2 89 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 298 60 1
"3304" "exp3" 2 90 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 465 84 1
"3304" "exp3" 2 91 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 816 19 1
"3304" "exp3" 2 92 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1242 46 1
"3304" "exp3" 2 93 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 496 0 0
"3304" "exp3" 2 94 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1259 44 1
"3304" "exp3" 2 95 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1242 0 0
"3304" "exp3" 2 96 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 822 0 0
"3304" "exp3" 2 97 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 838 0 0
"3304" "exp3" 2 98 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 739 0 0
"3304" "exp3" 2 99 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 279 0 0
"3304" "exp3" 2 100 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1704 0 0
"3304" "exp3" 2 101 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1040 0 0
"3304" "exp3" 2 102 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 831 0 0
"3304" "exp3" 2 103 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 580 48 1
"3304" "exp3" 2 104 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1694 0 0
"3304" "exp3" 2 105 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 792 0 0
"3304" "exp3" 2 106 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1938 0 0
"3304" "exp3" 2 107 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1713 0 0
"3304" "exp3" 2 108 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 853 0 0
"3304" "exp3" 2 109 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 603 0 0
"3304" "exp3" 2 110 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1509 0 0
"3304" "exp3" 2 111 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 954 0 0
"3304" "exp3" 2 112 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 686 0 0
"3304" "exp3" 2 113 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 602 22 1
"3304" "exp3" 2 114 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 613 0 0
"3304" "exp3" 2 115 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 461 0 0
"3304" "exp3" 2 116 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 959 0 0
"3304" "exp3" 2 117 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1332 0 0
"3304" "exp3" 2 118 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 3312 0 0
"3304" "exp3" 2 119 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 500 32 1
"3304" "exp3" 2 120 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 574 26 1
"3304" "exp3" 2 121 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 539 0 0
"3304" "exp3" 2 122 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 673 37 1
"3304" "exp3" 2 123 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1811 20 1
"3304" "exp3" 2 124 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 1631 82 1
"3304" "exp3" 2 125 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 617 35 1
"3304" "exp3" 2 126 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 605 0 0
"3304" "exp3" 2 127 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 301 0 0
"3304" "exp3" 2 128 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1538 0 0
"3304" "exp3" 2 129 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 630 73 1
"3304" "exp3" 2 130 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 721 0 0
"3304" "exp3" 2 131 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 706 0 0
"3304" "exp3" 2 132 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 534 0 0
"3305" "exp3" 1 1 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 1627 0 0
"3305" "exp3" 1 2 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 3198 0 0
"3305" "exp3" 1 3 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1658 31 1
"3305" "exp3" 1 4 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1613 42 1
"3305" "exp3" 1 5 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 3179 0 0
"3305" "exp3" 1 6 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1895 35 1
"3305" "exp3" 1 7 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1905 0 0
"3305" "exp3" 1 8 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1454 0 0
"3305" "exp3" 1 9 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 2537 0 0
"3305" "exp3" 1 10 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 2404 35 1
"3305" "exp3" 1 11 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1800 9 1
"3305" "exp3" 1 12 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1687 18 1
"3305" "exp3" 1 13 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2294 30 1
"3305" "exp3" 1 14 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2235 37 1
"3305" "exp3" 1 15 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 3189 0 0
"3305" "exp3" 1 16 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 4796 30 1
"3305" "exp3" 1 17 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 5460 0 0
"3305" "exp3" 1 18 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 3143 0 0
"3305" "exp3" 1 19 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 3476 40 1
"3305" "exp3" 1 20 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 3909 27 1
"3305" "exp3" 1 21 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 2669 31 1
"3305" "exp3" 1 22 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1228 18 1
"3305" "exp3" 1 23 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2824 0 0
"3305" "exp3" 1 24 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2120 37 1
"3305" "exp3" 1 25 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1801 0 0
"3305" "exp3" 1 26 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 2091 33 1
"3305" "exp3" 1 27 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2404 0 0
"3305" "exp3" 1 28 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 4385 25 1
"3305" "exp3" 1 29 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 3850 15 1
"3305" "exp3" 1 30 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2574 49 1
"3305" "exp3" 1 31 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 2860 0 0
"3305" "exp3" 1 32 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 2758 27 1
"3305" "exp3" 1 33 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 4433 0 0
"3305" "exp3" 1 34 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 3726 10 1
"3305" "exp3" 1 35 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 2892 0 0
"3305" "exp3" 1 36 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 3381 74 1
"3305" "exp3" 1 37 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 3901 0 0
"3305" "exp3" 1 38 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 3326 40 1
"3305" "exp3" 1 39 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2832 0 0
"3305" "exp3" 1 40 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1806 6 1
"3305" "exp3" 1 41 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 2166 20 1
"3305" "exp3" 1 42 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 3032 30 1
"3305" "exp3" 1 43 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 2451 0 0
"3305" "exp3" 1 44 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1309 21 1
"3305" "exp3" 1 45 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 2787 14 1
"3305" "exp3" 1 46 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 3987 91 1
"3305" "exp3" 1 47 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1944 23 1
"3305" "exp3" 1 48 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 3524 0 0
"3305" "exp3" 1 49 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 4793 0 0
"3305" "exp3" 1 50 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2334 0 0
"3305" "exp3" 1 51 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 2523 0 0
"3305" "exp3" 1 52 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 3289 36 1
"3305" "exp3" 1 53 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 2505 12 1
"3305" "exp3" 1 54 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 2055 0 0
"3305" "exp3" 1 55 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 2214 29 1
"3305" "exp3" 1 56 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1603 29 1
"3305" "exp3" 1 57 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 3772 17 1
"3305" "exp3" 1 58 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 4120 0 0
"3305" "exp3" 1 59 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2571 0 0
"3305" "exp3" 1 60 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 2421 11 1
"3305" "exp3" 1 61 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 3956 22 1
"3305" "exp3" 1 62 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1871 27 1
"3305" "exp3" 1 63 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 2736 35 1
"3305" "exp3" 1 64 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 2795 0 0
"3305" "exp3" 1 65 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 4219 0 0
"3305" "exp3" 1 66 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 7149 5 1
"3305" "exp3" 1 67 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1603 0 0
"3305" "exp3" 1 68 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1394 23 1
"3305" "exp3" 1 69 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2027 17 1
"3305" "exp3" 1 70 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1694 44 1
"3305" "exp3" 1 71 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1024 31 1
"3305" "exp3" 1 72 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1010 39 1
"3305" "exp3" 1 73 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1848 25 1
"3305" "exp3" 1 74 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 4706 0 0
"3305" "exp3" 1 75 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 4595 0 0
"3305" "exp3" 1 76 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 2115 26 1
"3305" "exp3" 1 77 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 2230 0 0
"3305" "exp3" 1 78 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3775 0 0
"3305" "exp3" 1 79 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2963 0 0
"3305" "exp3" 1 80 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1461 19 1
"3305" "exp3" 1 81 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1301 25 1
"3305" "exp3" 1 82 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 790 13 1
"3305" "exp3" 1 83 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 3455 20 1
"3305" "exp3" 1 84 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 4412 23 1
"3305" "exp3" 1 85 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1398 24 1
"3305" "exp3" 1 86 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 3499 41 1
"3305" "exp3" 1 87 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 3875 0 0
"3305" "exp3" 1 88 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1784 21 1
"3305" "exp3" 1 89 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2591 0 0
"3305" "exp3" 1 90 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1934 0 0
"3305" "exp3" 1 91 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 2309 13 1
"3305" "exp3" 1 92 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1650 26 1
"3305" "exp3" 1 93 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 6779 20 1
"3305" "exp3" 1 94 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 3819 0 0
"3305" "exp3" 1 95 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 2663 19 1
"3305" "exp3" 1 96 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2229 32 1
"3305" "exp3" 1 97 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1481 41 1
"3305" "exp3" 1 98 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 4698 0 0
"3305" "exp3" 1 99 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1082 21 1
"3305" "exp3" 1 100 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1689 24 1
"3305" "exp3" 1 101 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1096 7 1
"3305" "exp3" 1 102 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 5551 14 1
"3305" "exp3" 1 103 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 4283 0 0
"3305" "exp3" 1 104 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 4510 0 0
"3305" "exp3" 1 105 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 3338 24 1
"3305" "exp3" 1 106 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1722 14 1
"3305" "exp3" 1 107 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1143 18 1
"3305" "exp3" 1 108 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 4880 0 0
"3305" "exp3" 1 109 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1624 0 0
"3305" "exp3" 1 110 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 2007 0 0
"3305" "exp3" 1 111 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1024 7 1
"3305" "exp3" 1 112 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 4579 10 1
"3305" "exp3" 1 113 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 4003 22 1
"3305" "exp3" 1 114 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2926 0 0
"3305" "exp3" 1 115 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 4633 0 0
"3305" "exp3" 1 116 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 3025 22 1
"3305" "exp3" 1 117 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 3448 0 0
"3305" "exp3" 1 118 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 4811 17 1
"3305" "exp3" 1 119 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 10381 79 1
"3305" "exp3" 1 120 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 3654 48 1
"3305" "exp3" 1 121 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 6356 30 1
"3305" "exp3" 1 122 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1870 44 1
"3305" "exp3" 1 123 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1571 0 0
"3305" "exp3" 1 124 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 2585 0 0
"3305" "exp3" 1 125 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1728 0 0
"3305" "exp3" 1 126 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 994 0 0
"3305" "exp3" 1 127 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1365 33 1
"3305" "exp3" 1 128 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1507 0 0
"3305" "exp3" 1 129 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1230 37 1
"3305" "exp3" 1 130 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 3018 0 0
"3305" "exp3" 1 131 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2226 45 1
"3305" "exp3" 1 132 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 5159 0 0
"3305" "exp3" 2 1 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2235 34 1
"3305" "exp3" 2 2 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1862 24 1
"3305" "exp3" 2 3 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1695 0 0
"3305" "exp3" 2 4 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 4049 0 0
"3305" "exp3" 2 5 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 5309 0 0
"3305" "exp3" 2 6 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2532 0 0
"3305" "exp3" 2 7 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 4008 0 0
"3305" "exp3" 2 8 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 7940 0 0
"3305" "exp3" 2 9 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 3778 32 1
"3305" "exp3" 2 10 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1651 25 1
"3305" "exp3" 2 11 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 2222 0 0
"3305" "exp3" 2 12 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 4078 0 0
"3305" "exp3" 2 13 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 5140 33 1
"3305" "exp3" 2 14 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 3296 0 0
"3305" "exp3" 2 15 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 2473 0 0
"3305" "exp3" 2 16 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 3538 8 1
"3305" "exp3" 2 17 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2425 0 0
"3305" "exp3" 2 18 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1167 27 1
"3305" "exp3" 2 19 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 3552 29 1
"3305" "exp3" 2 20 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 4190 19 1
"3305" "exp3" 2 21 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 3938 12 1
"3305" "exp3" 2 22 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2611 37 1
"3305" "exp3" 2 23 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2314 0 0
"3305" "exp3" 2 24 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1501 48 1
"3305" "exp3" 2 25 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 4228 0 0
"3305" "exp3" 2 26 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 3405 95 1
"3305" "exp3" 2 27 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 4916 93 1
"3305" "exp3" 2 28 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 3960 31 1
"3305" "exp3" 2 29 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1812 0 0
"3305" "exp3" 2 30 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2966 0 0
"3305" "exp3" 2 31 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 3354 18 1
"3305" "exp3" 2 32 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 3414 22 1
"3305" "exp3" 2 33 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1939 0 0
"3305" "exp3" 2 34 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 4409 30 1
"3305" "exp3" 2 35 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 960 36 1
"3305" "exp3" 2 36 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 3520 0 0
"3305" "exp3" 2 37 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1784 45 1
"3305" "exp3" 2 38 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 2341 0 0
"3305" "exp3" 2 39 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1199 0 0
"3305" "exp3" 2 40 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1129 0 0
"3305" "exp3" 2 41 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 2268 21 1
"3305" "exp3" 2 42 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 2195 26 1
"3305" "exp3" 2 43 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1313 26 1
"3305" "exp3" 2 44 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 5308 14 1
"3305" "exp3" 2 45 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 4157 21 1
"3305" "exp3" 2 46 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 3228 34 1
"3305" "exp3" 2 47 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2325 20 1
"3305" "exp3" 2 48 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2464 0 0
"3305" "exp3" 2 49 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 3740 16 1
"3305" "exp3" 2 50 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 5633 13 1
"3305" "exp3" 2 51 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1413 35 1
"3305" "exp3" 2 52 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1661 35 1
"3305" "exp3" 2 53 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1332 25 1
"3305" "exp3" 2 54 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1433 19 1
"3305" "exp3" 2 55 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 4106 0 0
"3305" "exp3" 2 56 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 3286 0 0
"3305" "exp3" 2 57 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 3317 32 1
"3305" "exp3" 2 58 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2760 26 1
"3305" "exp3" 2 59 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 3982 41 1
"3305" "exp3" 2 60 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 3474 27 1
"3305" "exp3" 2 61 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2782 13 1
"3305" "exp3" 2 62 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 3406 4 1
"3305" "exp3" 2 63 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1852 44 1
"3305" "exp3" 2 64 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 3565 16 1
"3305" "exp3" 2 65 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 3341 0 0
"3305" "exp3" 2 66 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2817 0 0
"3305" "exp3" 2 67 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1891 39 1
"3305" "exp3" 2 68 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 3036 0 0
"3305" "exp3" 2 69 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2060 40 1
"3305" "exp3" 2 70 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 3149 94 1
"3305" "exp3" 2 71 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 5241 30 1
"3305" "exp3" 2 72 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 3490 15 1
"3305" "exp3" 2 73 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3370 67 1
"3305" "exp3" 2 74 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2884 32 1
"3305" "exp3" 2 75 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 2047 31 1
"3305" "exp3" 2 76 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 2749 0 0
"3305" "exp3" 2 77 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 4569 70 1
"3305" "exp3" 2 78 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2743 39 1
"3305" "exp3" 2 79 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1975 0 0
"3305" "exp3" 2 80 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 2091 0 0
"3305" "exp3" 2 81 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 5975 0 0
"3305" "exp3" 2 82 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 3912 18 1
"3305" "exp3" 2 83 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 3105 0 0
"3305" "exp3" 2 84 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 2085 0 0
"3305" "exp3" 2 85 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 3025 0 0
"3305" "exp3" 2 86 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1259 29 1
"3305" "exp3" 2 87 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 2332 20 1
"3305" "exp3" 2 88 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 2393 25 1
"3305" "exp3" 2 89 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 4151 0 0
"3305" "exp3" 2 90 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 3121 0 0
"3305" "exp3" 2 91 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 4234 17 1
"3305" "exp3" 2 92 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1981 33 1
"3305" "exp3" 2 93 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1689 38 1
"3305" "exp3" 2 94 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 3262 17 1
"3305" "exp3" 2 95 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 3589 35 1
"3305" "exp3" 2 96 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2180 0 0
"3305" "exp3" 2 97 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 3351 0 0
"3305" "exp3" 2 98 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2704 20 1
"3305" "exp3" 2 99 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 3132 44 1
"3305" "exp3" 2 100 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 4609 26 1
"3305" "exp3" 2 101 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 3785 64 1
"3305" "exp3" 2 102 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 5333 14 1
"3305" "exp3" 2 103 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 3803 0 0
"3305" "exp3" 2 104 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 3189 72 1
"3305" "exp3" 2 105 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2993 0 0
"3305" "exp3" 2 106 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 2461 24 1
"3305" "exp3" 2 107 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 5994 19 1
"3305" "exp3" 2 108 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2798 0 0
"3305" "exp3" 2 109 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 3252 17 1
"3305" "exp3" 2 110 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2464 28 1
"3305" "exp3" 2 111 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 3834 0 0
"3305" "exp3" 2 112 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2567 0 0
"3305" "exp3" 2 113 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1952 0 0
"3305" "exp3" 2 114 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1641 38 1
"3305" "exp3" 2 115 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 3033 0 0
"3305" "exp3" 2 116 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 2091 23 1
"3305" "exp3" 2 117 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 2428 0 0
"3305" "exp3" 2 118 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 7410 0 0
"3305" "exp3" 2 119 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2697 0 0
"3305" "exp3" 2 120 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 2631 17 1
"3305" "exp3" 2 121 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2096 0 0
"3305" "exp3" 2 122 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 975 0 0
"3305" "exp3" 2 123 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1485 46 1
"3305" "exp3" 2 124 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 982 22 1
"3305" "exp3" 2 125 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 3065 0 0
"3305" "exp3" 2 126 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 3074 18 1
"3305" "exp3" 2 127 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1311 15 1
"3305" "exp3" 2 128 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2341 21 1
"3305" "exp3" 2 129 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1367 0 0
"3305" "exp3" 2 130 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 3039 0 0
"3305" "exp3" 2 131 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 4670 0 0
"3305" "exp3" 2 132 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 2705 0 0
"3305" "exp3" 1 1 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2625 0 0
"3305" "exp3" 1 2 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2052 19 1
"3305" "exp3" 1 3 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1798 31 1
"3305" "exp3" 1 4 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 568 7 1
"3305" "exp3" 1 5 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 3497 0 0
"3305" "exp3" 1 6 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 5532 0 0
"3305" "exp3" 1 7 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 4756 52 1
"3305" "exp3" 1 8 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 834 35 1
"3305" "exp3" 1 9 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1134 0 0
"3305" "exp3" 1 10 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 616 18 1
"3305" "exp3" 1 11 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 692 26 1
"3305" "exp3" 1 12 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 805 19 1
"3305" "exp3" 1 13 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 2689 0 0
"3305" "exp3" 1 14 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1274 33 1
"3305" "exp3" 1 15 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2064 39 1
"3305" "exp3" 1 16 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 3526 49 1
"3305" "exp3" 1 17 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1435 13 1
"3305" "exp3" 1 18 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1231 24 1
"3305" "exp3" 1 19 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 815 37 1
"3305" "exp3" 1 20 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 2332 6 1
"3305" "exp3" 1 21 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1077 25 1
"3305" "exp3" 1 22 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1380 45 1
"3305" "exp3" 1 23 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1044 36 1
"3305" "exp3" 1 24 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 591 11 1
"3305" "exp3" 1 25 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 710 0 0
"3305" "exp3" 1 26 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 897 7 1
"3305" "exp3" 1 27 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 977 34 1
"3305" "exp3" 1 28 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1543 94 1
"3305" "exp3" 1 29 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2133 0 0
"3305" "exp3" 1 30 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1155 30 1
"3305" "exp3" 1 31 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 607 18 1
"3305" "exp3" 1 32 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1054 0 0
"3305" "exp3" 1 33 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 2523 16 1
"3305" "exp3" 1 34 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 982 29 1
"3305" "exp3" 1 35 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 689 0 0
"3305" "exp3" 1 36 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 620 11 1
"3305" "exp3" 1 37 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 904 0 0
"3305" "exp3" 1 38 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 2593 0 0
"3305" "exp3" 1 39 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1327 30 1
"3305" "exp3" 1 40 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1069 0 0
"3305" "exp3" 1 41 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1213 21 1
"3305" "exp3" 1 42 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1860 16 1
"3305" "exp3" 1 43 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 977 24 1
"3305" "exp3" 1 44 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 722 0 0
"3305" "exp3" 1 45 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 723 23 1
"3305" "exp3" 1 46 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1147 27 1
"3305" "exp3" 1 47 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 811 0 0
"3305" "exp3" 1 48 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1224 35 1
"3305" "exp3" 1 49 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 616 27 1
"3305" "exp3" 1 50 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1729 30 1
"3305" "exp3" 1 51 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1294 0 0
"3305" "exp3" 1 52 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 719 0 0
"3305" "exp3" 1 53 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 573 40 1
"3305" "exp3" 1 54 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1041 34 1
"3305" "exp3" 1 55 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1467 0 0
"3305" "exp3" 1 56 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1191 0 0
"3305" "exp3" 1 57 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1059 23 1
"3305" "exp3" 1 58 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 610 10 1
"3305" "exp3" 1 59 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 746 26 1
"3305" "exp3" 1 60 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 509 9 1
"3305" "exp3" 1 61 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 932 16 1
"3305" "exp3" 1 62 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1402 0 0
"3305" "exp3" 1 63 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2262 0 0
"3305" "exp3" 1 64 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 5299 0 0
"3305" "exp3" 1 65 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1963 25 1
"3305" "exp3" 1 66 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 908 42 1
"3305" "exp3" 1 67 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 573 29 1
"3305" "exp3" 1 68 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 634 12 1
"3305" "exp3" 1 69 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 921 22 1
"3305" "exp3" 1 70 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 702 0 0
"3305" "exp3" 1 71 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 492 14 1
"3305" "exp3" 1 72 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 795 27 1
"3305" "exp3" 1 73 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 887 46 1
"3305" "exp3" 1 74 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1323 0 0
"3305" "exp3" 1 75 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 681 31 1
"3305" "exp3" 1 76 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1765 0 0
"3305" "exp3" 1 77 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 783 8 1
"3305" "exp3" 1 78 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1008 33 1
"3305" "exp3" 1 79 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1403 27 1
"3305" "exp3" 1 80 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 2101 22 1
"3305" "exp3" 1 81 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 2795 9 1
"3305" "exp3" 1 82 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 6446 0 0
"3305" "exp3" 1 83 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1957 15 1
"3305" "exp3" 1 84 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1664 0 0
"3305" "exp3" 1 85 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 3323 43 1
"3305" "exp3" 1 86 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1438 0 0
"3305" "exp3" 1 87 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 927 38 1
"3305" "exp3" 1 88 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 811 0 0
"3305" "exp3" 1 89 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1216 36 1
"3305" "exp3" 1 90 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 3456 0 0
"3305" "exp3" 1 91 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1195 28 1
"3305" "exp3" 1 92 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 526 12 1
"3305" "exp3" 1 93 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 844 14 1
"3305" "exp3" 1 94 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 2382 29 1
"3305" "exp3" 1 95 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1796 19 1
"3305" "exp3" 1 96 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1066 20 1
"3305" "exp3" 1 97 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1761 37 1
"3305" "exp3" 1 98 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 830 31 1
"3305" "exp3" 1 99 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 613 24 1
"3305" "exp3" 1 100 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 495 10 1
"3305" "exp3" 1 101 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1553 0 0
"3305" "exp3" 1 102 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1116 30 1
"3305" "exp3" 1 103 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 3008 0 0
"3305" "exp3" 1 104 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1533 31 1
"3305" "exp3" 1 105 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1356 17 1
"3305" "exp3" 1 106 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1132 20 1
"3305" "exp3" 1 107 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 873 44 1
"3305" "exp3" 1 108 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 498 17 1
"3305" "exp3" 1 109 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 703 22 1
"3305" "exp3" 1 110 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 677 0 0
"3305" "exp3" 1 111 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 832 41 1
"3305" "exp3" 1 112 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 798 18 1
"3305" "exp3" 1 113 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 954 18 1
"3305" "exp3" 1 114 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 984 15 1
"3305" "exp3" 1 115 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 571 17 1
"3305" "exp3" 1 116 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 757 13 1
"3305" "exp3" 1 117 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1019 47 1
"3305" "exp3" 1 118 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 906 0 0
"3305" "exp3" 1 119 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 563 0 0
"3305" "exp3" 1 120 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1098 13 1
"3305" "exp3" 1 121 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 863 20 1
"3305" "exp3" 1 122 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1805 40 1
"3305" "exp3" 1 123 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 3158 0 0
"3305" "exp3" 1 124 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1739 45 1
"3305" "exp3" 1 125 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1516 35 1
"3305" "exp3" 1 126 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1206 32 1
"3305" "exp3" 1 127 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 645 26 1
"3305" "exp3" 1 128 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 790 23 1
"3305" "exp3" 1 129 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 759 0 0
"3305" "exp3" 1 130 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 764 24 1
"3305" "exp3" 1 131 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 763 39 1
"3305" "exp3" 1 132 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1133 21 1
"3305" "exp3" 2 1 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1567 0 0
"3305" "exp3" 2 2 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1267 20 1
"3305" "exp3" 2 3 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 628 49 1
"3305" "exp3" 2 4 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 576 0 0
"3305" "exp3" 2 5 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 483 18 1
"3305" "exp3" 2 6 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 494 26 1
"3305" "exp3" 2 7 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 796 10 1
"3305" "exp3" 2 8 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1036 0 0
"3305" "exp3" 2 9 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1619 43 1
"3305" "exp3" 2 10 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 607 22 1
"3305" "exp3" 2 11 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 603 0 0
"3305" "exp3" 2 12 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1462 0 0
"3305" "exp3" 2 13 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 975 0 0
"3305" "exp3" 2 14 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2236 0 0
"3305" "exp3" 2 15 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 697 19 1
"3305" "exp3" 2 16 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 568 14 1
"3305" "exp3" 2 17 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 755 15 1
"3305" "exp3" 2 18 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 722 37 1
"3305" "exp3" 2 19 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 503 11 1
"3305" "exp3" 2 20 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1365 0 0
"3305" "exp3" 2 21 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2782 20 1
"3305" "exp3" 2 22 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1114 27 1
"3305" "exp3" 2 23 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2303 45 1
"3305" "exp3" 2 24 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1791 9 1
"3305" "exp3" 2 25 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 5013 0 0
"3305" "exp3" 2 26 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 841 8 1
"3305" "exp3" 2 27 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 813 0 0
"3305" "exp3" 2 28 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 459 2 1
"3305" "exp3" 2 29 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 2084 0 0
"3305" "exp3" 2 30 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1452 0 0
"3305" "exp3" 2 31 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1120 0 0
"3305" "exp3" 2 32 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 2748 0 0
"3305" "exp3" 2 33 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 2303 0 0
"3305" "exp3" 2 34 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1884 0 0
"3305" "exp3" 2 35 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 651 23 1
"3305" "exp3" 2 36 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1935 18 1
"3305" "exp3" 2 37 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1488 17 1
"3305" "exp3" 2 38 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1243 0 0
"3305" "exp3" 2 39 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1757 29 1
"3305" "exp3" 2 40 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1323 18 1
"3305" "exp3" 2 41 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1974 47 1
"3305" "exp3" 2 42 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1732 13 1
"3305" "exp3" 2 43 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 2723 0 0
"3305" "exp3" 2 44 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 4324 25 1
"3305" "exp3" 2 45 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 401 20 1
"3305" "exp3" 2 46 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 2199 17 1
"3305" "exp3" 2 47 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 801 7 1
"3305" "exp3" 2 48 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 504 27 1
"3305" "exp3" 2 49 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 727 13 1
"3305" "exp3" 2 50 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 701 0 0
"3305" "exp3" 2 51 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 569 48 1
"3305" "exp3" 2 52 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 571 15 1
"3305" "exp3" 2 53 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 644 32 1
"3305" "exp3" 2 54 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 588 36 1
"3305" "exp3" 2 55 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 866 40 1
"3305" "exp3" 2 56 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 695 30 1
"3305" "exp3" 2 57 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 463 22 1
"3305" "exp3" 2 58 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 727 29 1
"3305" "exp3" 2 59 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 758 32 1
"3305" "exp3" 2 60 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 3876 44 1
"3305" "exp3" 2 61 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 747 32 1
"3305" "exp3" 2 62 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 724 0 0
"3305" "exp3" 2 63 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 690 40 1
"3305" "exp3" 2 64 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 988 19 1
"3305" "exp3" 2 65 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 3180 0 0
"3305" "exp3" 2 66 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1113 0 0
"3305" "exp3" 2 67 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 1047 8 1
"3305" "exp3" 2 68 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1462 31 1
"3305" "exp3" 2 69 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 643 0 0
"3305" "exp3" 2 70 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 545 25 1
"3305" "exp3" 2 71 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 793 0 0
"3305" "exp3" 2 72 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 876 26 1
"3305" "exp3" 2 73 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 2079 13 1
"3305" "exp3" 2 74 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 756 0 0
"3305" "exp3" 2 75 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 632 23 1
"3305" "exp3" 2 76 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 956 39 1
"3305" "exp3" 2 77 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 740 0 0
"3305" "exp3" 2 78 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 651 34 1
"3305" "exp3" 2 79 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 532 28 1
"3305" "exp3" 2 80 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 750 28 1
"3305" "exp3" 2 81 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 618 30 1
"3305" "exp3" 2 82 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1697 0 0
"3305" "exp3" 2 83 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 575 16 1
"3305" "exp3" 2 84 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1182 0 0
"3305" "exp3" 2 85 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 954 30 1
"3305" "exp3" 2 86 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 765 23 1
"3305" "exp3" 2 87 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 590 22 1
"3305" "exp3" 2 88 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 730 15 1
"3305" "exp3" 2 89 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1944 31 1
"3305" "exp3" 2 90 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1182 45 1
"3305" "exp3" 2 91 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1867 16 1
"3305" "exp3" 2 92 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 678 0 0
"3305" "exp3" 2 93 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 923 33 1
"3305" "exp3" 2 94 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 697 0 0
"3305" "exp3" 2 95 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 909 19 1
"3305" "exp3" 2 96 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 545 33 1
"3305" "exp3" 2 97 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 579 0 0
"3305" "exp3" 2 98 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2564 42 1
"3305" "exp3" 2 99 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 733 14 1
"3305" "exp3" 2 100 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1051 27 1
"3305" "exp3" 2 101 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 511 24 1
"3305" "exp3" 2 102 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 644 39 1
"3305" "exp3" 2 103 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 3493 11 1
"3305" "exp3" 2 104 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 3971 44 1
"3305" "exp3" 2 105 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1248 36 1
"3305" "exp3" 2 106 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 670 35 1
"3305" "exp3" 2 107 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 569 30 1
"3305" "exp3" 2 108 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 5929 0 0
"3305" "exp3" 2 109 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1477 32 1
"3305" "exp3" 2 110 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 534 0 0
"3305" "exp3" 2 111 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 927 29 1
"3305" "exp3" 2 112 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 545 0 0
"3305" "exp3" 2 113 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 717 27 1
"3305" "exp3" 2 114 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 4209 0 0
"3305" "exp3" 2 115 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2889 0 0
"3305" "exp3" 2 116 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1588 0 0
"3305" "exp3" 2 117 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1183 0 0
"3305" "exp3" 2 118 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2188 23 1
"3305" "exp3" 2 119 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1292 33 1
"3305" "exp3" 2 120 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 2988 18 1
"3305" "exp3" 2 121 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 471 0 0
"3305" "exp3" 2 122 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 543 21 1
"3305" "exp3" 2 123 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1198 0 0
"3305" "exp3" 2 124 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1469 17 1
"3305" "exp3" 2 125 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1040 0 0
"3305" "exp3" 2 126 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1614 24 1
"3305" "exp3" 2 127 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 809 12 1
"3305" "exp3" 2 128 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 671 34 1
"3305" "exp3" 2 129 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 559 0 0
"3305" "exp3" 2 130 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 991 0 0
"3305" "exp3" 2 131 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1139 0 0
"3305" "exp3" 2 132 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 699 0 0
"3305" "exp3" 1 1 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1914 66 1
"3305" "exp3" 1 2 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 2757 35 1
"3305" "exp3" 1 3 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1333 31 1
"3305" "exp3" 1 4 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 773 9 1
"3305" "exp3" 1 5 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1882 42 1
"3305" "exp3" 1 6 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3335 93 1
"3305" "exp3" 1 7 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 2211 0 0
"3305" "exp3" 1 8 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 819 0 0
"3305" "exp3" 1 9 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 1201 0 0
"3305" "exp3" 1 10 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2926 0 0
"3305" "exp3" 1 11 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1020 13 1
"3305" "exp3" 1 12 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1358 23 1
"3305" "exp3" 1 13 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 2663 0 0
"3305" "exp3" 1 14 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1832 25 1
"3305" "exp3" 1 15 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1641 24 1
"3305" "exp3" 1 16 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 729 0 0
"3305" "exp3" 1 17 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 2285 0 0
"3305" "exp3" 1 18 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 2384 0 0
"3305" "exp3" 1 19 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1778 0 0
"3305" "exp3" 1 20 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1148 36 1
"3305" "exp3" 1 21 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1626 0 0
"3305" "exp3" 1 22 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2233 16 1
"3305" "exp3" 1 23 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1297 23 1
"3305" "exp3" 1 24 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 774 30 1
"3305" "exp3" 1 25 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 920 0 0
"3305" "exp3" 1 26 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1571 28 1
"3305" "exp3" 1 27 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1531 8 1
"3305" "exp3" 1 28 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 3728 18 1
"3305" "exp3" 1 29 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 2434 76 1
"3305" "exp3" 1 30 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1951 0 0
"3305" "exp3" 1 31 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1336 32 1
"3305" "exp3" 1 32 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1388 15 1
"3305" "exp3" 1 33 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 857 6 1
"3305" "exp3" 1 34 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1401 9 1
"3305" "exp3" 1 35 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 3116 0 0
"3305" "exp3" 1 36 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 528 7 1
"3305" "exp3" 1 37 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 675 29 1
"3305" "exp3" 1 38 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1728 33 1
"3305" "exp3" 1 39 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 3215 98 1
"3305" "exp3" 1 40 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1998 12 1
"3305" "exp3" 1 41 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2329 0 0
"3305" "exp3" 1 42 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1754 34 1
"3305" "exp3" 1 43 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 914 31 1
"3305" "exp3" 1 44 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1068 0 0
"3305" "exp3" 1 45 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1388 0 0
"3305" "exp3" 1 46 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 2320 33 1
"3305" "exp3" 1 47 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2159 0 0
"3305" "exp3" 1 48 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1547 36 1
"3305" "exp3" 1 49 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1253 28 1
"3305" "exp3" 1 50 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 667 30 1
"3305" "exp3" 1 51 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 813 14 1
"3305" "exp3" 1 52 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 941 21 1
"3305" "exp3" 1 53 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2350 0 0
"3305" "exp3" 1 54 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1036 28 1
"3305" "exp3" 1 55 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 2859 27 1
"3305" "exp3" 1 56 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 727 13 1
"3305" "exp3" 1 57 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1218 0 0
"3305" "exp3" 1 58 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 5091 45 1
"3305" "exp3" 1 59 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1340 18 1
"3305" "exp3" 1 60 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 949 16 1
"3305" "exp3" 1 61 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1960 0 0
"3305" "exp3" 1 62 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 3637 0 0
"3305" "exp3" 1 63 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 784 49 1
"3305" "exp3" 1 64 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 773 35 1
"3305" "exp3" 1 65 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 634 30 1
"3305" "exp3" 1 66 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1076 33 1
"3305" "exp3" 1 67 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 2100 0 0
"3305" "exp3" 1 68 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1724 21 1
"3305" "exp3" 1 69 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1844 37 1
"3305" "exp3" 1 70 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 774 39 1
"3305" "exp3" 1 71 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 737 0 0
"3305" "exp3" 1 72 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1716 35 1
"3305" "exp3" 1 73 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 868 0 0
"3305" "exp3" 1 74 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 2274 0 0
"3305" "exp3" 1 75 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 3049 0 0
"3305" "exp3" 1 76 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 702 13 1
"3305" "exp3" 1 77 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1256 14 1
"3305" "exp3" 1 78 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 2039 21 1
"3305" "exp3" 1 79 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1240 0 0
"3305" "exp3" 1 80 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 3328 0 0
"3305" "exp3" 1 81 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1848 32 1
"3305" "exp3" 1 82 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1206 30 1
"3305" "exp3" 1 83 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 802 25 1
"3305" "exp3" 1 84 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 768 12 1
"3305" "exp3" 1 85 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 736 0 0
"3305" "exp3" 1 86 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 906 21 1
"3305" "exp3" 1 87 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 908 32 1
"3305" "exp3" 1 88 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1050 0 0
"3305" "exp3" 1 89 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 2110 0 0
"3305" "exp3" 1 90 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 3024 5 1
"3305" "exp3" 1 91 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1450 17 1
"3305" "exp3" 1 92 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 2131 42 1
"3305" "exp3" 1 93 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 817 45 1
"3305" "exp3" 1 94 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1476 0 0
"3305" "exp3" 1 95 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1109 0 0
"3305" "exp3" 1 96 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 757 27 1
"3305" "exp3" 1 97 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1160 33 1
"3305" "exp3" 1 98 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1753 0 0
"3305" "exp3" 1 99 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 831 0 0
"3305" "exp3" 1 100 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 771 0 0
"3305" "exp3" 1 101 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1278 0 0
"3305" "exp3" 1 102 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 3221 15 1
"3305" "exp3" 1 103 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1995 47 1
"3305" "exp3" 1 104 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1777 19 1
"3305" "exp3" 1 105 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 931 20 1
"3305" "exp3" 1 106 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1923 38 1
"3305" "exp3" 1 107 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 625 19 1
"3305" "exp3" 1 108 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 706 0 0
"3305" "exp3" 1 109 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 704 0 0
"3305" "exp3" 1 110 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 853 20 1
"3305" "exp3" 1 111 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2394 22 1
"3305" "exp3" 1 112 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1127 0 0
"3305" "exp3" 1 113 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1467 20 1
"3305" "exp3" 1 114 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1584 0 0
"3305" "exp3" 1 115 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1208 16 1
"3305" "exp3" 1 116 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 841 0 0
"3305" "exp3" 1 117 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 727 40 1
"3305" "exp3" 1 118 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 962 0 0
"3305" "exp3" 1 119 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1003 1 1
"3305" "exp3" 1 120 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 4945 26 1
"3305" "exp3" 1 121 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 5643 25 1
"3305" "exp3" 1 122 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1255 0 0
"3305" "exp3" 1 123 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 635 31 1
"3305" "exp3" 1 124 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 840 0 0
"3305" "exp3" 1 125 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1838 27 1
"3305" "exp3" 1 126 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 979 48 1
"3305" "exp3" 1 127 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1179 15 1
"3305" "exp3" 1 128 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1875 43 1
"3305" "exp3" 1 129 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1135 0 0
"3305" "exp3" 1 130 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 896 83 1
"3305" "exp3" 1 131 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 996 10 1
"3305" "exp3" 1 132 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 1142 0 0
"3305" "exp3" 2 1 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 867 0 0
"3305" "exp3" 2 2 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 4135 0 0
"3305" "exp3" 2 3 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1008 21 1
"3305" "exp3" 2 4 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 931 39 1
"3305" "exp3" 2 5 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1230 0 0
"3305" "exp3" 2 6 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 665 25 1
"3305" "exp3" 2 7 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 934 26 1
"3305" "exp3" 2 8 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 876 0 0
"3305" "exp3" 2 9 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1303 34 1
"3305" "exp3" 2 10 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 925 3 1
"3305" "exp3" 2 11 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1588 31 1
"3305" "exp3" 2 12 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1062 0 0
"3305" "exp3" 2 13 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2931 0 0
"3305" "exp3" 2 14 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 758 26 1
"3305" "exp3" 2 15 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1817 0 0
"3305" "exp3" 2 16 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 794 42 1
"3305" "exp3" 2 17 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 774 10 1
"3305" "exp3" 2 18 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 2070 14 1
"3305" "exp3" 2 19 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1272 35 1
"3305" "exp3" 2 20 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2431 14 1
"3305" "exp3" 2 21 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1137 0 0
"3305" "exp3" 2 22 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1934 0 0
"3305" "exp3" 2 23 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1537 0 0
"3305" "exp3" 2 24 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1122 35 1
"3305" "exp3" 2 25 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1275 36 1
"3305" "exp3" 2 26 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 982 16 1
"3305" "exp3" 2 27 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2062 75 1
"3305" "exp3" 2 28 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 2399 18 1
"3305" "exp3" 2 29 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 2393 0 0
"3305" "exp3" 2 30 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1858 0 0
"3305" "exp3" 2 31 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1042 0 0
"3305" "exp3" 2 32 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 3562 72 1
"3305" "exp3" 2 33 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1325 15 1
"3305" "exp3" 2 34 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1632 0 0
"3305" "exp3" 2 35 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1141 10 1
"3305" "exp3" 2 36 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 3356 26 1
"3305" "exp3" 2 37 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1455 0 0
"3305" "exp3" 2 38 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1601 20 1
"3305" "exp3" 2 39 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1975 0 0
"3305" "exp3" 2 40 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2816 40 1
"3305" "exp3" 2 41 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 995 24 1
"3305" "exp3" 2 42 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 978 38 1
"3305" "exp3" 2 43 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 577 0 0
"3305" "exp3" 2 44 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 852 19 1
"3305" "exp3" 2 45 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1361 17 1
"3305" "exp3" 2 46 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1290 0 0
"3305" "exp3" 2 47 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1534 33 1
"3305" "exp3" 2 48 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1100 41 1
"3305" "exp3" 2 49 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 758 27 1
"3305" "exp3" 2 50 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1809 0 0
"3305" "exp3" 2 51 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 953 30 1
"3305" "exp3" 2 52 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 547 8 1
"3305" "exp3" 2 53 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1786 33 1
"3305" "exp3" 2 54 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 670 0 0
"3305" "exp3" 2 55 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1161 0 0
"3305" "exp3" 2 56 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 628 24 1
"3305" "exp3" 2 57 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 849 18 1
"3305" "exp3" 2 58 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 923 75 1
"3305" "exp3" 2 59 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 795 0 0
"3305" "exp3" 2 60 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1651 0 0
"3305" "exp3" 2 61 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1842 28 1
"3305" "exp3" 2 62 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 2033 66 1
"3305" "exp3" 2 63 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1386 0 0
"3305" "exp3" 2 64 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 772 0 0
"3305" "exp3" 2 65 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1260 0 0
"3305" "exp3" 2 66 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 802 22 1
"3305" "exp3" 2 67 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 705 29 1
"3305" "exp3" 2 68 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 813 0 0
"3305" "exp3" 2 69 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 704 33 1
"3305" "exp3" 2 70 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 937 95 1
"3305" "exp3" 2 71 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2854 49 1
"3305" "exp3" 2 72 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 757 68 1
"3305" "exp3" 2 73 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1159 0 0
"3305" "exp3" 2 74 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1428 0 0
"3305" "exp3" 2 75 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 892 40 1
"3305" "exp3" 2 76 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1399 47 1
"3305" "exp3" 2 77 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 950 31 1
"3305" "exp3" 2 78 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1477 0 0
"3305" "exp3" 2 79 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1040 16 1
"3305" "exp3" 2 80 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1625 22 1
"3305" "exp3" 2 81 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 588 24 1
"3305" "exp3" 2 82 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 858 9 1
"3305" "exp3" 2 83 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1000 13 1
"3305" "exp3" 2 84 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 934 29 1
"3305" "exp3" 2 85 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 3080 45 1
"3305" "exp3" 2 86 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2689 37 1
"3305" "exp3" 2 87 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1015 0 0
"3305" "exp3" 2 88 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1534 0 0
"3305" "exp3" 2 89 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 2462 12 1
"3305" "exp3" 2 90 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 909 0 0
"3305" "exp3" 2 91 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1089 31 1
"3305" "exp3" 2 92 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 548 27 1
"3305" "exp3" 2 93 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 1232 0 0
"3305" "exp3" 2 94 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1996 43 1
"3305" "exp3" 2 95 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1379 20 1
"3305" "exp3" 2 96 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 914 0 0
"3305" "exp3" 2 97 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 679 21 1
"3305" "exp3" 2 98 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 584 6 1
"3305" "exp3" 2 99 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 861 19 1
"3305" "exp3" 2 100 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1173 0 0
"3305" "exp3" 2 101 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 600 0 0
"3305" "exp3" 2 102 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 665 11 1
"3305" "exp3" 2 103 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 656 0 0
"3305" "exp3" 2 104 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 814 0 0
"3305" "exp3" 2 105 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 763 11 1
"3305" "exp3" 2 106 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 823 0 0
"3305" "exp3" 2 107 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 812 17 1
"3305" "exp3" 2 108 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 789 0 0
"3305" "exp3" 2 109 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 642 21 1
"3305" "exp3" 2 110 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 807 42 1
"3305" "exp3" 2 111 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 791 23 1
"3305" "exp3" 2 112 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 644 1 1
"3305" "exp3" 2 113 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 4880 0 0
"3305" "exp3" 2 114 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1629 0 0
"3305" "exp3" 2 115 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1330 7 1
"3305" "exp3" 2 116 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 2099 20 1
"3305" "exp3" 2 117 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1555 9 1
"3305" "exp3" 2 118 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 880 12 1
"3305" "exp3" 2 119 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 2659 38 1
"3305" "exp3" 2 120 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 912 8 1
"3305" "exp3" 2 121 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1221 20 1
"3305" "exp3" 2 122 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 587 24 1
"3305" "exp3" 2 123 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1156 67 1
"3305" "exp3" 2 124 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1038 27 1
"3305" "exp3" 2 125 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 937 0 0
"3305" "exp3" 2 126 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 4051 30 1
"3305" "exp3" 2 127 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1007 19 1
"3305" "exp3" 2 128 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1089 0 0
"3305" "exp3" 2 129 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 798 14 1
"3305" "exp3" 2 130 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1546 0 0
"3305" "exp3" 2 131 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2448 0 0
"3305" "exp3" 2 132 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 863 23 1
"3305" "exp3" 1 1 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 920 0 0
"3305" "exp3" 1 2 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 747 27 1
"3305" "exp3" 1 3 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 759 0 0
"3305" "exp3" 1 4 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 483 20 1
"3305" "exp3" 1 5 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 392 5 1
"3305" "exp3" 1 6 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 384 18 1
"3305" "exp3" 1 7 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 468 24 1
"3305" "exp3" 1 8 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 449 31 1
"3305" "exp3" 1 9 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 438 0 0
"3305" "exp3" 1 10 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 656 24 1
"3305" "exp3" 1 11 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 652 25 1
"3305" "exp3" 1 12 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1227 48 1
"3305" "exp3" 1 13 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 479 37 1
"3305" "exp3" 1 14 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 737 0 0
"3305" "exp3" 1 15 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1222 7 1
"3305" "exp3" 1 16 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 519 0 0
"3305" "exp3" 1 17 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 825 34 1
"3305" "exp3" 1 18 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 642 22 1
"3305" "exp3" 1 19 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 1225 0 0
"3305" "exp3" 1 20 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 644 13 1
"3305" "exp3" 1 21 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1363 29 1
"3305" "exp3" 1 22 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 454 0 0
"3305" "exp3" 1 23 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 639 11 1
"3305" "exp3" 1 24 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 619 0 0
"3305" "exp3" 1 25 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 422 42 1
"3305" "exp3" 1 26 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 422 20 1
"3305" "exp3" 1 27 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 350 0 0
"3305" "exp3" 1 28 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 476 33 1
"3305" "exp3" 1 29 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 750 11 1
"3305" "exp3" 1 30 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 3049 65 1
"3305" "exp3" 1 31 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 677 25 1
"3305" "exp3" 1 32 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 448 22 1
"3305" "exp3" 1 33 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 675 15 1
"3305" "exp3" 1 34 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 458 0 0
"3305" "exp3" 1 35 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 566 0 0
"3305" "exp3" 1 36 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 612 14 1
"3305" "exp3" 1 37 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 677 40 1
"3305" "exp3" 1 38 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 558 6 1
"3305" "exp3" 1 39 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 2114 0 0
"3305" "exp3" 1 40 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 831 21 1
"3305" "exp3" 1 41 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 732 5 1
"3305" "exp3" 1 42 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 2933 0 0
"3305" "exp3" 1 43 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 963 34 1
"3305" "exp3" 1 44 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 742 37 1
"3305" "exp3" 1 45 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 451 26 1
"3305" "exp3" 1 46 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 628 0 0
"3305" "exp3" 1 47 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 4808 29 1
"3305" "exp3" 1 48 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 602 3 1
"3305" "exp3" 1 49 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 888 49 1
"3305" "exp3" 1 50 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 518 25 1
"3305" "exp3" 1 51 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 864 32 1
"3305" "exp3" 1 52 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 441 19 1
"3305" "exp3" 1 53 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 547 0 0
"3305" "exp3" 1 54 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 900 0 0
"3305" "exp3" 1 55 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1677 0 0
"3305" "exp3" 1 56 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 733 28 1
"3305" "exp3" 1 57 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 461 30 1
"3305" "exp3" 1 58 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 661 45 1
"3305" "exp3" 1 59 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 575 13 1
"3305" "exp3" 1 60 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 515 17 1
"3305" "exp3" 1 61 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 2104 21 1
"3305" "exp3" 1 62 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 563 26 1
"3305" "exp3" 1 63 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 598 0 0
"3305" "exp3" 1 64 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 747 0 0
"3305" "exp3" 1 65 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 968 41 1
"3305" "exp3" 1 66 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 878 45 1
"3305" "exp3" 1 67 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 862 43 1
"3305" "exp3" 1 68 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1176 0 0
"3305" "exp3" 1 69 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 2513 0 0
"3305" "exp3" 1 70 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 2257 12 1
"3305" "exp3" 1 71 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 470 24 1
"3305" "exp3" 1 72 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 877 0 0
"3305" "exp3" 1 73 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 612 22 1
"3305" "exp3" 1 74 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1136 27 1
"3305" "exp3" 1 75 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 2002 31 1
"3305" "exp3" 1 76 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 530 17 1
"3305" "exp3" 1 77 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 450 18 1
"3305" "exp3" 1 78 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 376 0 0
"3305" "exp3" 1 79 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 580 28 1
"3305" "exp3" 1 80 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 739 10 1
"3305" "exp3" 1 81 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 801 21 1
"3305" "exp3" 1 82 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 656 23 1
"3305" "exp3" 1 83 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1935 36 1
"3305" "exp3" 1 84 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 555 0 0
"3305" "exp3" 1 85 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 528 0 0
"3305" "exp3" 1 86 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 399 33 1
"3305" "exp3" 1 87 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 909 33 1
"3305" "exp3" 1 88 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 693 24 1
"3305" "exp3" 1 89 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 852 0 0
"3305" "exp3" 1 90 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 601 4 1
"3305" "exp3" 1 91 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 989 21 1
"3305" "exp3" 1 92 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 769 0 0
"3305" "exp3" 1 93 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 549 35 1
"3305" "exp3" 1 94 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 984 18 1
"3305" "exp3" 1 95 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 3920 14 1
"3305" "exp3" 1 96 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1078 0 0
"3305" "exp3" 1 97 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1594 18 1
"3305" "exp3" 1 98 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 890 0 0
"3305" "exp3" 1 99 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 450 10 1
"3305" "exp3" 1 100 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 670 0 0
"3305" "exp3" 1 101 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1422 29 1
"3305" "exp3" 1 102 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 606 0 0
"3305" "exp3" 1 103 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1090 22 1
"3305" "exp3" 1 104 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 688 26 1
"3305" "exp3" 1 105 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 569 26 1
"3305" "exp3" 1 106 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 952 0 0
"3305" "exp3" 1 107 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1371 30 1
"3305" "exp3" 1 108 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 610 0 0
"3305" "exp3" 1 109 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 588 0 0
"3305" "exp3" 1 110 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 690 16 1
"3305" "exp3" 1 111 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 733 30 1
"3305" "exp3" 1 112 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 537 15 1
"3305" "exp3" 1 113 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 534 0 0
"3305" "exp3" 1 114 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 545 14 1
"3305" "exp3" 1 115 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 872 32 1
"3305" "exp3" 1 116 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 624 17 1
"3305" "exp3" 1 117 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 749 6 1
"3305" "exp3" 1 118 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1217 0 0
"3305" "exp3" 1 119 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1311 0 0
"3305" "exp3" 1 120 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 498 16 1
"3305" "exp3" 1 121 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 439 0 0
"3305" "exp3" 1 122 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2155 19 1
"3305" "exp3" 1 123 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 665 25 1
"3305" "exp3" 1 124 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 1293 0 0
"3305" "exp3" 1 125 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 3067 0 0
"3305" "exp3" 1 126 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 962 28 1
"3305" "exp3" 1 127 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 1050 68 1
"3305" "exp3" 1 128 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 838 0 0
"3305" "exp3" 1 129 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 5206 16 1
"3305" "exp3" 1 130 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 618 15 1
"3305" "exp3" 1 131 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 801 0 0
"3305" "exp3" 1 132 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 494 19 1
"3305" "exp3" 2 1 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1029 31 1
"3305" "exp3" 2 2 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 485 32 1
"3305" "exp3" 2 3 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 514 0 0
"3305" "exp3" 2 4 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 511 25 1
"3305" "exp3" 2 5 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 382 0 0
"3305" "exp3" 2 6 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 392 0 0
"3305" "exp3" 2 7 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 412 0 0
"3305" "exp3" 2 8 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 339 27 1
"3305" "exp3" 2 9 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 351 9 1
"3305" "exp3" 2 10 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 400 6 1
"3305" "exp3" 2 11 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 334 0 0
"3305" "exp3" 2 12 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 374 35 1
"3305" "exp3" 2 13 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 273 0 0
"3305" "exp3" 2 14 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 475 0 0
"3305" "exp3" 2 15 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 530 0 0
"3305" "exp3" 2 16 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 374 17 1
"3305" "exp3" 2 17 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 364 0 0
"3305" "exp3" 2 18 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 494 27 1
"3305" "exp3" 2 19 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 430 19 1
"3305" "exp3" 2 20 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 587 14 1
"3305" "exp3" 2 21 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1242 40 1
"3305" "exp3" 2 22 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 416 3 1
"3305" "exp3" 2 23 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 402 12 1
"3305" "exp3" 2 24 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 479 0 0
"3305" "exp3" 2 25 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 568 0 0
"3305" "exp3" 2 26 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 393 0 0
"3305" "exp3" 2 27 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 553 33 1
"3305" "exp3" 2 28 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 619 26 1
"3305" "exp3" 2 29 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 545 16 1
"3305" "exp3" 2 30 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1845 0 0
"3305" "exp3" 2 31 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1950 22 1
"3305" "exp3" 2 32 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 598 28 1
"3305" "exp3" 2 33 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 571 12 1
"3305" "exp3" 2 34 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 470 0 0
"3305" "exp3" 2 35 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1285 0 0
"3305" "exp3" 2 36 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1444 0 0
"3305" "exp3" 2 37 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 651 5 1
"3305" "exp3" 2 38 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1207 23 1
"3305" "exp3" 2 39 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 503 22 1
"3305" "exp3" 2 40 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 561 0 0
"3305" "exp3" 2 41 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 754 0 0
"3305" "exp3" 2 42 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1712 0 0
"3305" "exp3" 2 43 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 634 33 1
"3305" "exp3" 2 44 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1904 11 1
"3305" "exp3" 2 45 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 999 38 1
"3305" "exp3" 2 46 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 608 26 1
"3305" "exp3" 2 47 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 515 25 1
"3305" "exp3" 2 48 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 562 18 1
"3305" "exp3" 2 49 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 474 0 0
"3305" "exp3" 2 50 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 415 29 1
"3305" "exp3" 2 51 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 376 24 1
"3305" "exp3" 2 52 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 342 36 1
"3305" "exp3" 2 53 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 358 17 1
"3305" "exp3" 2 54 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 445 0 0
"3305" "exp3" 2 55 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 397 13 1
"3305" "exp3" 2 56 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 520 31 1
"3305" "exp3" 2 57 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1228 0 0
"3305" "exp3" 2 58 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1157 45 1
"3305" "exp3" 2 59 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 6017 72 1
"3305" "exp3" 2 60 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 991 6 1
"3305" "exp3" 2 61 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1110 0 0
"3305" "exp3" 2 62 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 737 25 1
"3305" "exp3" 2 63 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1252 0 0
"3305" "exp3" 2 64 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 453 34 1
"3305" "exp3" 2 65 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 394 0 0
"3305" "exp3" 2 66 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1073 0 0
"3305" "exp3" 2 67 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1235 0 0
"3305" "exp3" 2 68 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 501 23 1
"3305" "exp3" 2 69 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 433 0 0
"3305" "exp3" 2 70 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 474 14 1
"3305" "exp3" 2 71 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 640 36 1
"3305" "exp3" 2 72 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 859 18 1
"3305" "exp3" 2 73 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1000 27 1
"3305" "exp3" 2 74 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 436 29 1
"3305" "exp3" 2 75 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 417 21 1
"3305" "exp3" 2 76 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 491 0 0
"3305" "exp3" 2 77 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 530 21 1
"3305" "exp3" 2 78 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 383 20 1
"3305" "exp3" 2 79 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 784 31 1
"3305" "exp3" 2 80 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 482 23 1
"3305" "exp3" 2 81 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 774 13 1
"3305" "exp3" 2 82 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 755 31 1
"3305" "exp3" 2 83 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 821 13 1
"3305" "exp3" 2 84 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 2546 41 1
"3305" "exp3" 2 85 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 2260 18 1
"3305" "exp3" 2 86 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 568 20 1
"3305" "exp3" 2 87 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1516 0 0
"3305" "exp3" 2 88 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 4134 0 0
"3305" "exp3" 2 89 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 579 42 1
"3305" "exp3" 2 90 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 567 45 1
"3305" "exp3" 2 91 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 452 14 1
"3305" "exp3" 2 92 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 345 22 1
"3305" "exp3" 2 93 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 415 0 0
"3305" "exp3" 2 94 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 511 47 1
"3305" "exp3" 2 95 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 424 35 1
"3305" "exp3" 2 96 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 929 0 0
"3305" "exp3" 2 97 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 731 43 1
"3305" "exp3" 2 98 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 553 30 1
"3305" "exp3" 2 99 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1198 0 0
"3305" "exp3" 2 100 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 655 25 1
"3305" "exp3" 2 101 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 718 0 0
"3305" "exp3" 2 102 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1431 0 0
"3305" "exp3" 2 103 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 894 0 0
"3305" "exp3" 2 104 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 459 34 1
"3305" "exp3" 2 105 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 588 20 1
"3305" "exp3" 2 106 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 491 26 1
"3305" "exp3" 2 107 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 476 30 1
"3305" "exp3" 2 108 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 862 49 1
"3305" "exp3" 2 109 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 3732 23 1
"3305" "exp3" 2 110 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 580 15 1
"3305" "exp3" 2 111 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 403 8 1
"3305" "exp3" 2 112 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1489 0 0
"3305" "exp3" 2 113 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 2052 0 0
"3305" "exp3" 2 114 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 866 38 1
"3305" "exp3" 2 115 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 424 0 0
"3305" "exp3" 2 116 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 415 15 1
"3305" "exp3" 2 117 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 516 35 1
"3305" "exp3" 2 118 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 414 9 1
"3305" "exp3" 2 119 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 686 10 1
"3305" "exp3" 2 120 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 326 16 1
"3305" "exp3" 2 121 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 236 70 1
"3305" "exp3" 2 122 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 360 41 1
"3305" "exp3" 2 123 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 472 16 1
"3305" "exp3" 2 124 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 543 0 0
"3305" "exp3" 2 125 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 597 18 1
"3305" "exp3" 2 126 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 477 24 1
"3305" "exp3" 2 127 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 458 36 1
"3305" "exp3" 2 128 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 567 11 1
"3305" "exp3" 2 129 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 502 21 1
"3305" "exp3" 2 130 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 598 0 0
"3305" "exp3" 2 131 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 400 17 1
"3305" "exp3" 2 132 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 405 19 1
"3306" "exp3" 1 1 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1207 25 1
"3306" "exp3" 1 2 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1321 29 1
"3306" "exp3" 1 3 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1946 0 0
"3306" "exp3" 1 4 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1099 24 1
"3306" "exp3" 1 5 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1479 16 1
"3306" "exp3" 1 6 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 2060 57 1
"3306" "exp3" 1 7 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1823 1 1
"3306" "exp3" 1 8 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1804 0 0
"3306" "exp3" 1 9 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1213 31 1
"3306" "exp3" 1 10 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 2945 0 0
"3306" "exp3" 1 11 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 2091 0 0
"3306" "exp3" 1 12 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 3227 63 1
"3306" "exp3" 1 13 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 989 0 0
"3306" "exp3" 1 14 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1405 22 1
"3306" "exp3" 1 15 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1383 35 1
"3306" "exp3" 1 16 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1145 0 0
"3306" "exp3" 1 17 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 2339 22 1
"3306" "exp3" 1 18 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1269 20 1
"3306" "exp3" 1 19 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1968 0 0
"3306" "exp3" 1 20 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1345 0 0
"3306" "exp3" 1 21 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1381 25 1
"3306" "exp3" 1 22 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1210 0 0
"3306" "exp3" 1 23 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2386 40 1
"3306" "exp3" 1 24 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 3567 31 1
"3306" "exp3" 1 25 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1025 22 1
"3306" "exp3" 1 26 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1625 0 0
"3306" "exp3" 1 27 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2057 66 1
"3306" "exp3" 1 28 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 911 23 1
"3306" "exp3" 1 29 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1180 10 1
"3306" "exp3" 1 30 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1577 0 0
"3306" "exp3" 1 31 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1874 15 1
"3306" "exp3" 1 32 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1429 39 1
"3306" "exp3" 1 33 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 979 17 1
"3306" "exp3" 1 34 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 970 18 1
"3306" "exp3" 1 35 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2227 41 1
"3306" "exp3" 1 36 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1184 12 1
"3306" "exp3" 1 37 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1519 33 1
"3306" "exp3" 1 38 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1124 20 1
"3306" "exp3" 1 39 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1978 0 0
"3306" "exp3" 1 40 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 937 21 1
"3306" "exp3" 1 41 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1219 5 1
"3306" "exp3" 1 42 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 3128 21 1
"3306" "exp3" 1 43 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1869 13 1
"3306" "exp3" 1 44 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1432 30 1
"3306" "exp3" 1 45 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2725 0 0
"3306" "exp3" 1 46 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 1568 7 1
"3306" "exp3" 1 47 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 4029 36 1
"3306" "exp3" 1 48 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 2232 17 1
"3306" "exp3" 1 49 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2283 0 0
"3306" "exp3" 1 50 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1997 27 1
"3306" "exp3" 1 51 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2488 45 1
"3306" "exp3" 1 52 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1991 36 1
"3306" "exp3" 1 53 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 3704 0 0
"3306" "exp3" 1 54 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1191 32 1
"3306" "exp3" 1 55 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1951 0 0
"3306" "exp3" 1 56 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1946 0 0
"3306" "exp3" 1 57 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1588 28 1
"3306" "exp3" 1 58 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 2305 32 1
"3306" "exp3" 1 59 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1998 38 1
"3306" "exp3" 1 60 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1486 29 1
"3306" "exp3" 1 61 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1241 28 1
"3306" "exp3" 1 62 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 3512 0 0
"3306" "exp3" 1 63 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1288 0 0
"3306" "exp3" 1 64 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 852 13 1
"3306" "exp3" 1 65 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 2770 0 0
"3306" "exp3" 1 66 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1816 26 1
"3306" "exp3" 1 67 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 2149 89 1
"3306" "exp3" 1 68 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1655 33 1
"3306" "exp3" 1 69 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1060 27 1
"3306" "exp3" 1 70 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 2179 9 1
"3306" "exp3" 1 71 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 2895 0 0
"3306" "exp3" 1 72 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1832 44 1
"3306" "exp3" 1 73 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 2259 0 0
"3306" "exp3" 1 74 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 3022 0 0
"3306" "exp3" 1 75 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 962 24 1
"3306" "exp3" 1 76 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1863 0 0
"3306" "exp3" 1 77 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 2875 5 1
"3306" "exp3" 1 78 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1720 0 0
"3306" "exp3" 1 79 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 3234 26 1
"3306" "exp3" 1 80 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1659 35 1
"3306" "exp3" 1 81 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1714 17 1
"3306" "exp3" 1 82 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1188 37 1
"3306" "exp3" 1 83 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 910 32 1
"3306" "exp3" 1 84 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1622 33 1
"3306" "exp3" 1 85 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1560 27 1
"3306" "exp3" 1 86 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 2608 24 1
"3306" "exp3" 1 87 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 2065 0 0
"3306" "exp3" 1 88 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1265 40 1
"3306" "exp3" 1 89 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1885 0 0
"3306" "exp3" 1 90 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1478 14 1
"3306" "exp3" 1 91 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 3158 70 1
"3306" "exp3" 1 92 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1709 6 1
"3306" "exp3" 1 93 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1882 0 0
"3306" "exp3" 1 94 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1019 0 0
"3306" "exp3" 1 95 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1856 18 1
"3306" "exp3" 1 96 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 3294 0 0
"3306" "exp3" 1 97 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1976 18 1
"3306" "exp3" 1 98 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1318 20 1
"3306" "exp3" 1 99 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1882 20 1
"3306" "exp3" 1 100 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1958 34 1
"3306" "exp3" 1 101 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1327 44 1
"3306" "exp3" 1 102 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 2791 19 1
"3306" "exp3" 1 103 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1274 11 1
"3306" "exp3" 1 104 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 3238 31 1
"3306" "exp3" 1 105 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1395 23 1
"3306" "exp3" 1 106 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2513 0 0
"3306" "exp3" 1 107 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2943 0 0
"3306" "exp3" 1 108 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1554 0 0
"3306" "exp3" 1 109 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1559 0 0
"3306" "exp3" 1 110 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1832 0 0
"3306" "exp3" 1 111 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 2162 0 0
"3306" "exp3" 1 112 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 973 0 0
"3306" "exp3" 1 113 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 2750 31 1
"3306" "exp3" 1 114 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1193 35 1
"3306" "exp3" 1 115 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 3707 0 0
"3306" "exp3" 1 116 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1528 0 0
"3306" "exp3" 1 117 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 2749 42 1
"3306" "exp3" 1 118 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 2081 0 0
"3306" "exp3" 1 119 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 3086 24 1
"3306" "exp3" 1 120 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1632 0 0
"3306" "exp3" 1 121 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1184 0 0
"3306" "exp3" 1 122 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1737 0 0
"3306" "exp3" 1 123 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 1953 0 0
"3306" "exp3" 1 124 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1388 0 0
"3306" "exp3" 1 125 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1292 0 0
"3306" "exp3" 1 126 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1215 23 1
"3306" "exp3" 1 127 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1677 0 0
"3306" "exp3" 1 128 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1042 39 1
"3306" "exp3" 1 129 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1805 28 1
"3306" "exp3" 1 130 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 2295 0 0
"3306" "exp3" 1 131 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1012 48 1
"3306" "exp3" 1 132 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1836 0 0
"3306" "exp3" 2 1 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1126 0 0
"3306" "exp3" 2 2 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1749 0 0
"3306" "exp3" 2 3 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1714 18 1
"3306" "exp3" 2 4 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 2295 26 1
"3306" "exp3" 2 5 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1223 0 0
"3306" "exp3" 2 6 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1604 30 1
"3306" "exp3" 2 7 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 3050 0 0
"3306" "exp3" 2 8 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1275 19 1
"3306" "exp3" 2 9 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1314 0 0
"3306" "exp3" 2 10 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1725 0 0
"3306" "exp3" 2 11 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1679 36 1
"3306" "exp3" 2 12 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 2061 6 1
"3306" "exp3" 2 13 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1969 26 1
"3306" "exp3" 2 14 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1325 0 0
"3306" "exp3" 2 15 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 2206 17 1
"3306" "exp3" 2 16 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1131 42 1
"3306" "exp3" 2 17 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1344 0 0
"3306" "exp3" 2 18 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1408 41 1
"3306" "exp3" 2 19 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1619 0 0
"3306" "exp3" 2 20 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1750 27 1
"3306" "exp3" 2 21 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1858 11 1
"3306" "exp3" 2 22 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1356 24 1
"3306" "exp3" 2 23 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1360 31 1
"3306" "exp3" 2 24 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1301 0 0
"3306" "exp3" 2 25 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 4100 0 0
"3306" "exp3" 2 26 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1708 15 1
"3306" "exp3" 2 27 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 2707 0 0
"3306" "exp3" 2 28 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1240 0 0
"3306" "exp3" 2 29 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1221 43 1
"3306" "exp3" 2 30 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2856 0 0
"3306" "exp3" 2 31 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1921 32 1
"3306" "exp3" 2 32 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1196 16 1
"3306" "exp3" 2 33 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1710 13 1
"3306" "exp3" 2 34 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3165 93 1
"3306" "exp3" 2 35 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1983 0 0
"3306" "exp3" 2 36 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1588 34 1
"3306" "exp3" 2 37 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 3193 13 1
"3306" "exp3" 2 38 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1899 0 0
"3306" "exp3" 2 39 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1757 0 0
"3306" "exp3" 2 40 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1494 0 0
"3306" "exp3" 2 41 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2799 14 1
"3306" "exp3" 2 42 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 2003 0 0
"3306" "exp3" 2 43 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1177 48 1
"3306" "exp3" 2 44 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1165 35 1
"3306" "exp3" 2 45 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1182 38 1
"3306" "exp3" 2 46 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1094 0 0
"3306" "exp3" 2 47 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1087 22 1
"3306" "exp3" 2 48 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1638 45 1
"3306" "exp3" 2 49 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1318 0 0
"3306" "exp3" 2 50 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1012 47 1
"3306" "exp3" 2 51 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 3190 0 0
"3306" "exp3" 2 52 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1323 0 0
"3306" "exp3" 2 53 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1562 0 0
"3306" "exp3" 2 54 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1298 23 1
"3306" "exp3" 2 55 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 2100 25 1
"3306" "exp3" 2 56 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 2608 0 0
"3306" "exp3" 2 57 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 2076 80 1
"3306" "exp3" 2 58 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 2068 36 1
"3306" "exp3" 2 59 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1319 22 1
"3306" "exp3" 2 60 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 2417 23 1
"3306" "exp3" 2 61 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1402 44 1
"3306" "exp3" 2 62 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 3107 39 1
"3306" "exp3" 2 63 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 2204 18 1
"3306" "exp3" 2 64 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1465 0 0
"3306" "exp3" 2 65 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1652 0 0
"3306" "exp3" 2 66 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3462 49 1
"3306" "exp3" 2 67 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 4179 0 0
"3306" "exp3" 2 68 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1604 0 0
"3306" "exp3" 2 69 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1844 21 1
"3306" "exp3" 2 70 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 2715 91 1
"3306" "exp3" 2 71 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 3518 18 1
"3306" "exp3" 2 72 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1347 0 0
"3306" "exp3" 2 73 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1938 28 1
"3306" "exp3" 2 74 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 2781 0 0
"3306" "exp3" 2 75 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 2539 13 1
"3306" "exp3" 2 76 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 2388 0 0
"3306" "exp3" 2 77 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2639 22 1
"3306" "exp3" 2 78 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1569 30 1
"3306" "exp3" 2 79 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 3027 0 0
"3306" "exp3" 2 80 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2579 24 1
"3306" "exp3" 2 81 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2085 0 0
"3306" "exp3" 2 82 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1350 20 1
"3306" "exp3" 2 83 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 3704 0 0
"3306" "exp3" 2 84 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 2727 0 0
"3306" "exp3" 2 85 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1732 31 1
"3306" "exp3" 2 86 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 2764 0 0
"3306" "exp3" 2 87 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1635 23 1
"3306" "exp3" 2 88 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1541 0 0
"3306" "exp3" 2 89 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1248 40 1
"3306" "exp3" 2 90 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1431 38 1
"3306" "exp3" 2 91 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1133 35 1
"3306" "exp3" 2 92 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1740 0 0
"3306" "exp3" 2 93 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1619 19 1
"3306" "exp3" 2 94 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1684 19 1
"3306" "exp3" 2 95 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 3081 0 0
"3306" "exp3" 2 96 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2780 0 0
"3306" "exp3" 2 97 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 2416 0 0
"3306" "exp3" 2 98 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1381 21 1
"3306" "exp3" 2 99 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 3075 0 0
"3306" "exp3" 2 100 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1409 15 1
"3306" "exp3" 2 101 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1796 0 0
"3306" "exp3" 2 102 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1601 14 1
"3306" "exp3" 2 103 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 2081 36 1
"3306" "exp3" 2 104 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1559 0 0
"3306" "exp3" 2 105 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1616 0 0
"3306" "exp3" 2 106 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 5023 0 0
"3306" "exp3" 2 107 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 3706 37 1
"3306" "exp3" 2 108 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1962 31 1
"3306" "exp3" 2 109 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2002 39 1
"3306" "exp3" 2 110 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 2435 0 0
"3306" "exp3" 2 111 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 2876 0 0
"3306" "exp3" 2 112 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2051 40 1
"3306" "exp3" 2 113 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 2039 0 0
"3306" "exp3" 2 114 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1217 18 1
"3306" "exp3" 2 115 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1930 0 0
"3306" "exp3" 2 116 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 2459 29 1
"3306" "exp3" 2 117 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1359 17 1
"3306" "exp3" 2 118 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1621 29 1
"3306" "exp3" 2 119 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 3070 95 1
"3306" "exp3" 2 120 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 2522 0 0
"3306" "exp3" 2 121 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1793 33 1
"3306" "exp3" 2 122 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 2005 35 1
"3306" "exp3" 2 123 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 2147 0 0
"3306" "exp3" 2 124 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1972 32 1
"3306" "exp3" 2 125 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1716 33 1
"3306" "exp3" 2 126 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1840 0 0
"3306" "exp3" 2 127 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1574 17 1
"3306" "exp3" 2 128 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 2010 0 0
"3306" "exp3" 2 129 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 4122 0 0
"3306" "exp3" 2 130 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 3714 44 1
"3306" "exp3" 2 131 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 2398 0 0
"3306" "exp3" 2 132 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1979 25 1
"3306" "exp3" 1 1 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 5413 30 1
"3306" "exp3" 1 2 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 3159 0 0
"3306" "exp3" 1 3 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2987 20 1
"3306" "exp3" 1 4 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 3717 20 1
"3306" "exp3" 1 5 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2438 31 1
"3306" "exp3" 1 6 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 4995 75 1
"3306" "exp3" 1 7 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 2019 21 1
"3306" "exp3" 1 8 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 4870 25 1
"3306" "exp3" 1 9 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 5630 0 0
"3306" "exp3" 1 10 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 7794 37 1
"3306" "exp3" 1 11 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 6869 0 0
"3306" "exp3" 1 12 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 3420 0 0
"3306" "exp3" 1 13 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 7570 35 1
"3306" "exp3" 1 14 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2876 0 0
"3306" "exp3" 1 15 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 2502 24 1
"3306" "exp3" 1 16 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 2197 33 1
"3306" "exp3" 1 17 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2792 16 1
"3306" "exp3" 1 18 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 3537 40 1
"3306" "exp3" 1 19 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 4447 0 0
"3306" "exp3" 1 20 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 5022 84 1
"3306" "exp3" 1 21 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 6130 0 0
"3306" "exp3" 1 22 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2754 49 1
"3306" "exp3" 1 23 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 4030 27 1
"3306" "exp3" 1 24 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 3775 0 0
"3306" "exp3" 1 25 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 4328 22 1
"3306" "exp3" 1 26 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3245 67 1
"3306" "exp3" 1 27 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 5235 0 0
"3306" "exp3" 1 28 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1625 22 1
"3306" "exp3" 1 29 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 3022 23 1
"3306" "exp3" 1 30 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 6397 12 1
"3306" "exp3" 1 31 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 2633 0 0
"3306" "exp3" 1 32 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 4221 27 1
"3306" "exp3" 1 33 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2514 43 1
"3306" "exp3" 1 34 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2603 43 1
"3306" "exp3" 1 35 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 5211 0 0
"3306" "exp3" 1 36 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 5346 47 1
"3306" "exp3" 1 37 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 4391 11 1
"3306" "exp3" 1 38 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 3708 39 1
"3306" "exp3" 1 39 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 10188 0 0
"3306" "exp3" 1 40 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2748 0 0
"3306" "exp3" 1 41 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 3903 90 1
"3306" "exp3" 1 42 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2209 29 1
"3306" "exp3" 1 43 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 3822 0 0
"3306" "exp3" 1 44 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 2630 0 0
"3306" "exp3" 1 45 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 2444 25 1
"3306" "exp3" 1 46 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 3113 0 0
"3306" "exp3" 1 47 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2004 22 1
"3306" "exp3" 1 48 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1824 32 1
"3306" "exp3" 1 49 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2274 0 0
"3306" "exp3" 1 50 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 3529 33 1
"3306" "exp3" 1 51 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 3903 0 0
"3306" "exp3" 1 52 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 2861 18 1
"3306" "exp3" 1 53 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 3286 20 1
"3306" "exp3" 1 54 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 4074 0 0
"3306" "exp3" 1 55 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 6546 0 0
"3306" "exp3" 1 56 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 2755 25 1
"3306" "exp3" 1 57 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 3119 34 1
"3306" "exp3" 1 58 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 4674 37 1
"3306" "exp3" 1 59 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2112 21 1
"3306" "exp3" 1 60 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 2569 0 0
"3306" "exp3" 1 61 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2005 0 0
"3306" "exp3" 1 62 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 4222 0 0
"3306" "exp3" 1 63 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2740 32 1
"3306" "exp3" 1 64 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 3980 0 0
"3306" "exp3" 1 65 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2915 0 0
"3306" "exp3" 1 66 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 2836 42 1
"3306" "exp3" 1 67 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 3743 26 1
"3306" "exp3" 1 68 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 3731 14 1
"3306" "exp3" 1 69 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2180 0 0
"3306" "exp3" 1 70 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 4679 0 0
"3306" "exp3" 1 71 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1989 48 1
"3306" "exp3" 1 72 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 8904 0 0
"3306" "exp3" 1 73 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 3420 24 1
"3306" "exp3" 1 74 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 6277 28 1
"3306" "exp3" 1 75 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 3186 0 0
"3306" "exp3" 1 76 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 3947 41 1
"3306" "exp3" 1 77 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2862 44 1
"3306" "exp3" 1 78 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 3835 0 0
"3306" "exp3" 1 79 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 4164 0 0
"3306" "exp3" 1 80 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 3100 17 1
"3306" "exp3" 1 81 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 2813 0 0
"3306" "exp3" 1 82 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2254 0 0
"3306" "exp3" 1 83 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 3688 0 0
"3306" "exp3" 1 84 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3527 0 0
"3306" "exp3" 1 85 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 3159 13 1
"3306" "exp3" 1 86 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1899 45 1
"3306" "exp3" 1 87 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2964 0 0
"3306" "exp3" 1 88 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1532 0 0
"3306" "exp3" 1 89 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2489 0 0
"3306" "exp3" 1 90 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 4630 92 1
"3306" "exp3" 1 91 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 7687 15 1
"3306" "exp3" 1 92 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 2374 84 1
"3306" "exp3" 1 93 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1912 0 0
"3306" "exp3" 1 94 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 2711 27 1
"3306" "exp3" 1 95 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 7254 0 0
"3306" "exp3" 1 96 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 4283 19 1
"3306" "exp3" 1 97 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 3727 0 0
"3306" "exp3" 1 98 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 3654 0 0
"3306" "exp3" 1 99 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1909 97 1
"3306" "exp3" 1 100 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 3686 0 0
"3306" "exp3" 1 101 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2955 42 1
"3306" "exp3" 1 102 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 4686 30 1
"3306" "exp3" 1 103 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2103 38 1
"3306" "exp3" 1 104 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1859 0 0
"3306" "exp3" 1 105 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2848 64 1
"3306" "exp3" 1 106 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 3557 28 1
"3306" "exp3" 1 107 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 5598 28 1
"3306" "exp3" 1 108 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 3165 30 1
"3306" "exp3" 1 109 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2431 38 1
"3306" "exp3" 1 110 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 3619 0 0
"3306" "exp3" 1 111 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1472 0 0
"3306" "exp3" 1 112 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1800 0 0
"3306" "exp3" 1 113 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 4006 0 0
"3306" "exp3" 1 114 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 3117 18 1
"3306" "exp3" 1 115 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1874 14 1
"3306" "exp3" 1 116 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 3635 0 0
"3306" "exp3" 1 117 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 2513 0 0
"3306" "exp3" 1 118 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 2442 17 1
"3306" "exp3" 1 119 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 5326 24 1
"3306" "exp3" 1 120 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2423 36 1
"3306" "exp3" 1 121 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 3500 23 1
"3306" "exp3" 1 122 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2015 0 0
"3306" "exp3" 1 123 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2429 26 1
"3306" "exp3" 1 124 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 3255 23 1
"3306" "exp3" 1 125 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 3279 0 0
"3306" "exp3" 1 126 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 3248 22 1
"3306" "exp3" 1 127 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1659 0 0
"3306" "exp3" 1 128 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2496 29 1
"3306" "exp3" 1 129 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 4969 13 1
"3306" "exp3" 1 130 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 3942 19 1
"3306" "exp3" 1 131 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 4747 0 0
"3306" "exp3" 1 132 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 3952 32 1
"3306" "exp3" 2 1 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2221 0 0
"3306" "exp3" 2 2 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1331 0 0
"3306" "exp3" 2 3 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 3292 0 0
"3306" "exp3" 2 4 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2948 0 0
"3306" "exp3" 2 5 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 4293 13 1
"3306" "exp3" 2 6 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 3871 0 0
"3306" "exp3" 2 7 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 3118 0 0
"3306" "exp3" 2 8 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 3142 17 1
"3306" "exp3" 2 9 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1960 30 1
"3306" "exp3" 2 10 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 5739 64 1
"3306" "exp3" 2 11 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 2684 0 0
"3306" "exp3" 2 12 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1536 0 0
"3306" "exp3" 2 13 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 4203 36 1
"3306" "exp3" 2 14 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 2160 25 1
"3306" "exp3" 2 15 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 6550 0 0
"3306" "exp3" 2 16 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 6316 0 0
"3306" "exp3" 2 17 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 2739 23 1
"3306" "exp3" 2 18 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 4689 67 1
"3306" "exp3" 2 19 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 4050 0 0
"3306" "exp3" 2 20 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 3809 29 1
"3306" "exp3" 2 21 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 3987 0 0
"3306" "exp3" 2 22 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2373 0 0
"3306" "exp3" 2 23 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 2098 0 0
"3306" "exp3" 2 24 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2133 44 1
"3306" "exp3" 2 25 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2143 32 1
"3306" "exp3" 2 26 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 3392 0 0
"3306" "exp3" 2 27 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2153 0 0
"3306" "exp3" 2 28 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 2419 33 1
"3306" "exp3" 2 29 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 3320 29 1
"3306" "exp3" 2 30 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2536 16 1
"3306" "exp3" 2 31 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1371 0 0
"3306" "exp3" 2 32 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 3599 29 1
"3306" "exp3" 2 33 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 4323 20 1
"3306" "exp3" 2 34 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 3048 24 1
"3306" "exp3" 2 35 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 2591 23 1
"3306" "exp3" 2 36 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2248 0 0
"3306" "exp3" 2 37 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1649 0 0
"3306" "exp3" 2 38 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2122 46 1
"3306" "exp3" 2 39 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 2443 0 0
"3306" "exp3" 2 40 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 2829 0 0
"3306" "exp3" 2 41 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 4337 15 1
"3306" "exp3" 2 42 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 4763 17 1
"3306" "exp3" 2 43 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 2123 28 1
"3306" "exp3" 2 44 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1783 23 1
"3306" "exp3" 2 45 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 5959 0 0
"3306" "exp3" 2 46 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2066 0 0
"3306" "exp3" 2 47 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 3694 31 1
"3306" "exp3" 2 48 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2977 26 1
"3306" "exp3" 2 49 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2526 0 0
"3306" "exp3" 2 50 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 5595 18 1
"3306" "exp3" 2 51 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 3874 26 1
"3306" "exp3" 2 52 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 3372 33 1
"3306" "exp3" 2 53 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 2976 27 1
"3306" "exp3" 2 54 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 3975 19 1
"3306" "exp3" 2 55 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 5477 0 0
"3306" "exp3" 2 56 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 4065 0 0
"3306" "exp3" 2 57 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 4153 0 0
"3306" "exp3" 2 58 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2510 38 1
"3306" "exp3" 2 59 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2062 0 0
"3306" "exp3" 2 60 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 2985 0 0
"3306" "exp3" 2 61 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1277 0 0
"3306" "exp3" 2 62 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1868 0 0
"3306" "exp3" 2 63 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 2761 68 1
"3306" "exp3" 2 64 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 4721 9 1
"3306" "exp3" 2 65 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 2169 31 1
"3306" "exp3" 2 66 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2066 38 1
"3306" "exp3" 2 67 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 4146 0 0
"3306" "exp3" 2 68 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 2212 14 1
"3306" "exp3" 2 69 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2028 36 1
"3306" "exp3" 2 70 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 2722 0 0
"3306" "exp3" 2 71 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 4113 0 0
"3306" "exp3" 2 72 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2469 35 1
"3306" "exp3" 2 73 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 4560 16 1
"3306" "exp3" 2 74 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 5437 21 1
"3306" "exp3" 2 75 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 5855 30 1
"3306" "exp3" 2 76 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 2778 19 1
"3306" "exp3" 2 77 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 3596 42 1
"3306" "exp3" 2 78 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 7203 0 0
"3306" "exp3" 2 79 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 2130 0 0
"3306" "exp3" 2 80 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1611 0 0
"3306" "exp3" 2 81 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 3508 0 0
"3306" "exp3" 2 82 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 4484 94 1
"3306" "exp3" 2 83 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 4072 0 0
"3306" "exp3" 2 84 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 5322 76 1
"3306" "exp3" 2 85 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 2128 45 1
"3306" "exp3" 2 86 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2335 0 0
"3306" "exp3" 2 87 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 3336 0 0
"3306" "exp3" 2 88 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 4405 0 0
"3306" "exp3" 2 89 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2145 45 1
"3306" "exp3" 2 90 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1574 0 0
"3306" "exp3" 2 91 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 3024 0 0
"3306" "exp3" 2 92 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 3888 0 0
"3306" "exp3" 2 93 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2395 31 1
"3306" "exp3" 2 94 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 4472 0 0
"3306" "exp3" 2 95 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1231 0 0
"3306" "exp3" 2 96 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 3800 0 0
"3306" "exp3" 2 97 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 3325 0 0
"3306" "exp3" 2 98 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 2317 19 1
"3306" "exp3" 2 99 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1602 43 1
"3306" "exp3" 2 100 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 3017 28 1
"3306" "exp3" 2 101 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2582 34 1
"3306" "exp3" 2 102 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 6302 0 0
"3306" "exp3" 2 103 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1666 0 0
"3306" "exp3" 2 104 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 4253 18 1
"3306" "exp3" 2 105 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1921 18 1
"3306" "exp3" 2 106 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1837 0 0
"3306" "exp3" 2 107 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1700 17 1
"3306" "exp3" 2 108 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2623 0 0
"3306" "exp3" 2 109 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 3335 0 0
"3306" "exp3" 2 110 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2892 0 0
"3306" "exp3" 2 111 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 4263 0 0
"3306" "exp3" 2 112 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 5841 0 0
"3306" "exp3" 2 113 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 4274 34 1
"3306" "exp3" 2 114 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 2268 73 1
"3306" "exp3" 2 115 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 2432 25 1
"3306" "exp3" 2 116 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 2583 35 1
"3306" "exp3" 2 117 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1921 42 1
"3306" "exp3" 2 118 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1335 21 1
"3306" "exp3" 2 119 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2331 20 1
"3306" "exp3" 2 120 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1256 0 0
"3306" "exp3" 2 121 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1566 0 0
"3306" "exp3" 2 122 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1628 0 0
"3306" "exp3" 2 123 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 4063 0 0
"3306" "exp3" 2 124 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 2397 15 1
"3306" "exp3" 2 125 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1703 0 0
"3306" "exp3" 2 126 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 4175 0 0
"3306" "exp3" 2 127 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 3864 0 0
"3306" "exp3" 2 128 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 12060 0 0
"3306" "exp3" 2 129 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 3297 0 0
"3306" "exp3" 2 130 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 2932 28 1
"3306" "exp3" 2 131 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 2180 0 0
"3306" "exp3" 2 132 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1910 27 1
"3306" "exp3" 1 1 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1584 18 1
"3306" "exp3" 1 2 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2188 20 1
"3306" "exp3" 1 3 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 2502 17 1
"3306" "exp3" 1 4 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1503 0 0
"3306" "exp3" 1 5 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 2124 16 1
"3306" "exp3" 1 6 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 2988 0 0
"3306" "exp3" 1 7 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 4028 31 1
"3306" "exp3" 1 8 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2584 0 0
"3306" "exp3" 1 9 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 2329 35 1
"3306" "exp3" 1 10 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 2340 0 0
"3306" "exp3" 1 11 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2003 21 1
"3306" "exp3" 1 12 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1903 31 1
"3306" "exp3" 1 13 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2372 36 1
"3306" "exp3" 1 14 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 4013 0 0
"3306" "exp3" 1 15 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2920 0 0
"3306" "exp3" 1 16 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 3288 32 1
"3306" "exp3" 1 17 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 4819 8 1
"3306" "exp3" 1 18 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1514 19 1
"3306" "exp3" 1 19 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1871 15 1
"3306" "exp3" 1 20 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 2508 0 0
"3306" "exp3" 1 21 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 2398 36 1
"3306" "exp3" 1 22 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 2997 0 0
"3306" "exp3" 1 23 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1485 0 0
"3306" "exp3" 1 24 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1194 0 0
"3306" "exp3" 1 25 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 2343 0 0
"3306" "exp3" 1 26 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1703 0 0
"3306" "exp3" 1 27 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 3951 0 0
"3306" "exp3" 1 28 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 3814 79 1
"3306" "exp3" 1 29 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1445 24 1
"3306" "exp3" 1 30 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 3987 0 0
"3306" "exp3" 1 31 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1642 0 0
"3306" "exp3" 1 32 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1493 22 1
"3306" "exp3" 1 33 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2784 0 0
"3306" "exp3" 1 34 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2631 37 1
"3306" "exp3" 1 35 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 5424 15 1
"3306" "exp3" 1 36 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1926 33 1
"3306" "exp3" 1 37 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 3760 0 0
"3306" "exp3" 1 38 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 4029 0 0
"3306" "exp3" 1 39 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1546 0 0
"3306" "exp3" 1 40 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 3367 23 1
"3306" "exp3" 1 41 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 7680 22 1
"3306" "exp3" 1 42 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 2614 34 1
"3306" "exp3" 1 43 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 5231 11 1
"3306" "exp3" 1 44 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 5148 0 0
"3306" "exp3" 1 45 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 2816 20 1
"3306" "exp3" 1 46 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2067 0 0
"3306" "exp3" 1 47 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1847 23 1
"3306" "exp3" 1 48 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2803 0 0
"3306" "exp3" 1 49 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 2538 0 0
"3306" "exp3" 1 50 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1849 49 1
"3306" "exp3" 1 51 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 2843 17 1
"3306" "exp3" 1 52 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1715 36 1
"3306" "exp3" 1 53 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 3435 24 1
"3306" "exp3" 1 54 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2671 17 1
"3306" "exp3" 1 55 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 2125 0 0
"3306" "exp3" 1 56 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1567 41 1
"3306" "exp3" 1 57 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2275 0 0
"3306" "exp3" 1 58 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2975 35 1
"3306" "exp3" 1 59 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2226 0 0
"3306" "exp3" 1 60 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 3952 14 1
"3306" "exp3" 1 61 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1729 47 1
"3306" "exp3" 1 62 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1340 26 1
"3306" "exp3" 1 63 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2154 0 0
"3306" "exp3" 1 64 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 2811 0 0
"3306" "exp3" 1 65 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2464 19 1
"3306" "exp3" 1 66 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1911 0 0
"3306" "exp3" 1 67 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1774 0 0
"3306" "exp3" 1 68 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1840 28 1
"3306" "exp3" 1 69 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2561 18 1
"3306" "exp3" 1 70 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1623 30 1
"3306" "exp3" 1 71 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 3234 32 1
"3306" "exp3" 1 72 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 5380 0 0
"3306" "exp3" 1 73 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1742 22 1
"3306" "exp3" 1 74 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 2770 0 0
"3306" "exp3" 1 75 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2547 0 0
"3306" "exp3" 1 76 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 3445 0 0
"3306" "exp3" 1 77 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1486 39 1
"3306" "exp3" 1 78 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1177 27 1
"3306" "exp3" 1 79 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1741 42 1
"3306" "exp3" 1 80 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 5667 0 0
"3306" "exp3" 1 81 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 2436 0 0
"3306" "exp3" 1 82 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1883 33 1
"3306" "exp3" 1 83 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1513 0 0
"3306" "exp3" 1 84 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1406 0 0
"3306" "exp3" 1 85 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 2089 88 1
"3306" "exp3" 1 86 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 3636 48 1
"3306" "exp3" 1 87 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 3485 0 0
"3306" "exp3" 1 88 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2480 19 1
"3306" "exp3" 1 89 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 3726 24 1
"3306" "exp3" 1 90 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1564 45 1
"3306" "exp3" 1 91 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 5551 0 0
"3306" "exp3" 1 92 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 3063 0 0
"3306" "exp3" 1 93 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1570 41 1
"3306" "exp3" 1 94 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1512 0 0
"3306" "exp3" 1 95 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 2044 21 1
"3306" "exp3" 1 96 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 5492 26 1
"3306" "exp3" 1 97 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 2531 0 0
"3306" "exp3" 1 98 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 2399 28 1
"3306" "exp3" 1 99 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1628 0 0
"3306" "exp3" 1 100 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 7007 24 1
"3306" "exp3" 1 101 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1595 93 1
"3306" "exp3" 1 102 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 2575 0 0
"3306" "exp3" 1 103 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 2738 25 1
"3306" "exp3" 1 104 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2779 0 0
"3306" "exp3" 1 105 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1515 35 1
"3306" "exp3" 1 106 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 6779 27 1
"3306" "exp3" 1 107 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 3110 29 1
"3306" "exp3" 1 108 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1912 0 0
"3306" "exp3" 1 109 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1607 29 1
"3306" "exp3" 1 110 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 5173 0 0
"3306" "exp3" 1 111 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2295 31 1
"3306" "exp3" 1 112 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2745 0 0
"3306" "exp3" 1 113 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1754 23 1
"3306" "exp3" 1 114 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 2305 99 1
"3306" "exp3" 1 115 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1642 20 1
"3306" "exp3" 1 116 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 2626 82 1
"3306" "exp3" 1 117 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1539 38 1
"3306" "exp3" 1 118 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 3822 13 1
"3306" "exp3" 1 119 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1421 17 1
"3306" "exp3" 1 120 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1762 18 1
"3306" "exp3" 1 121 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 2819 29 1
"3306" "exp3" 1 122 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1750 0 0
"3306" "exp3" 1 123 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 5391 45 1
"3306" "exp3" 1 124 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1893 0 0
"3306" "exp3" 1 125 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2052 39 1
"3306" "exp3" 1 126 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 2562 0 0
"3306" "exp3" 1 127 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2373 0 0
"3306" "exp3" 1 128 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 6336 87 1
"3306" "exp3" 1 129 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 2182 25 1
"3306" "exp3" 1 130 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 5204 27 1
"3306" "exp3" 1 131 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 4171 0 0
"3306" "exp3" 1 132 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1356 0 0
"3306" "exp3" 2 1 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2080 0 0
"3306" "exp3" 2 2 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1479 37 1
"3306" "exp3" 2 3 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1764 0 0
"3306" "exp3" 2 4 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 2859 0 0
"3306" "exp3" 2 5 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1801 23 1
"3306" "exp3" 2 6 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1753 27 1
"3306" "exp3" 2 7 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1584 0 0
"3306" "exp3" 2 8 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1279 0 0
"3306" "exp3" 2 9 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 3177 0 0
"3306" "exp3" 2 10 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1509 47 1
"3306" "exp3" 2 11 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1449 0 0
"3306" "exp3" 2 12 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 4443 0 0
"3306" "exp3" 2 13 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 3317 36 1
"3306" "exp3" 2 14 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2974 25 1
"3306" "exp3" 2 15 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 2083 28 1
"3306" "exp3" 2 16 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2932 20 1
"3306" "exp3" 2 17 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 2398 24 1
"3306" "exp3" 2 18 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 4257 0 0
"3306" "exp3" 2 19 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1996 0 0
"3306" "exp3" 2 20 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 3726 35 1
"3306" "exp3" 2 21 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 3335 22 1
"3306" "exp3" 2 22 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2519 38 1
"3306" "exp3" 2 23 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 3816 19 1
"3306" "exp3" 2 24 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1732 28 1
"3306" "exp3" 2 25 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2057 42 1
"3306" "exp3" 2 26 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 4000 23 1
"3306" "exp3" 2 27 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2572 49 1
"3306" "exp3" 2 28 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 4221 0 0
"3306" "exp3" 2 29 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 2135 29 1
"3306" "exp3" 2 30 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1784 0 0
"3306" "exp3" 2 31 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 6972 28 1
"3306" "exp3" 2 32 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1528 43 1
"3306" "exp3" 2 33 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1692 22 1
"3306" "exp3" 2 34 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 3711 21 1
"3306" "exp3" 2 35 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2065 0 0
"3306" "exp3" 2 36 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1961 0 0
"3306" "exp3" 2 37 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 4845 0 0
"3306" "exp3" 2 38 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2680 0 0
"3306" "exp3" 2 39 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1908 48 1
"3306" "exp3" 2 40 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 4954 30 1
"3306" "exp3" 2 41 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2844 0 0
"3306" "exp3" 2 42 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 3405 0 0
"3306" "exp3" 2 43 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1729 0 0
"3306" "exp3" 2 44 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 2157 0 0
"3306" "exp3" 2 45 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1389 0 0
"3306" "exp3" 2 46 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 5079 0 0
"3306" "exp3" 2 47 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1200 0 0
"3306" "exp3" 2 48 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 5701 0 0
"3306" "exp3" 2 49 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1657 39 1
"3306" "exp3" 2 50 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2115 20 1
"3306" "exp3" 2 51 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 3017 24 1
"3306" "exp3" 2 52 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1960 0 0
"3306" "exp3" 2 53 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1652 0 0
"3306" "exp3" 2 54 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 2514 87 1
"3306" "exp3" 2 55 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1802 0 0
"3306" "exp3" 2 56 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 3837 19 1
"3306" "exp3" 2 57 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 2998 29 1
"3306" "exp3" 2 58 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2566 89 1
"3306" "exp3" 2 59 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 3964 16 1
"3306" "exp3" 2 60 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 5411 0 0
"3306" "exp3" 2 61 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1972 0 0
"3306" "exp3" 2 62 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 3173 88 1
"3306" "exp3" 2 63 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 8003 0 0
"3306" "exp3" 2 64 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 3936 14 1
"3306" "exp3" 2 65 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 3349 18 1
"3306" "exp3" 2 66 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 2462 0 0
"3306" "exp3" 2 67 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 5490 18 1
"3306" "exp3" 2 68 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 4724 0 0
"3306" "exp3" 2 69 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1777 0 0
"3306" "exp3" 2 70 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 4344 81 1
"3306" "exp3" 2 71 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2803 0 0
"3306" "exp3" 2 72 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 2983 18 1
"3306" "exp3" 2 73 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1742 0 0
"3306" "exp3" 2 74 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1933 30 1
"3306" "exp3" 2 75 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1425 32 1
"3306" "exp3" 2 76 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2026 0 0
"3306" "exp3" 2 77 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1534 36 1
"3306" "exp3" 2 78 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1948 29 1
"3306" "exp3" 2 79 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 2423 0 0
"3306" "exp3" 2 80 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 3564 25 1
"3306" "exp3" 2 81 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 2914 0 0
"3306" "exp3" 2 82 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1702 34 1
"3306" "exp3" 2 83 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1782 31 1
"3306" "exp3" 2 84 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2400 19 1
"3306" "exp3" 2 85 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 2317 20 1
"3306" "exp3" 2 86 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1457 42 1
"3306" "exp3" 2 87 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 2700 0 0
"3306" "exp3" 2 88 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 2793 17 1
"3306" "exp3" 2 89 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1676 33 1
"3306" "exp3" 2 90 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2516 0 0
"3306" "exp3" 2 91 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2107 0 0
"3306" "exp3" 2 92 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1716 0 0
"3306" "exp3" 2 93 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 3078 0 0
"3306" "exp3" 2 94 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 2503 0 0
"3306" "exp3" 2 95 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 2403 0 0
"3306" "exp3" 2 96 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 3359 24 1
"3306" "exp3" 2 97 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 2638 28 1
"3306" "exp3" 2 98 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 3382 15 1
"3306" "exp3" 2 99 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1664 18 1
"3306" "exp3" 2 100 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1705 26 1
"3306" "exp3" 2 101 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1534 0 0
"3306" "exp3" 2 102 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1853 34 1
"3306" "exp3" 2 103 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 2480 30 1
"3306" "exp3" 2 104 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2215 46 1
"3306" "exp3" 2 105 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1937 38 1
"3306" "exp3" 2 106 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 3786 26 1
"3306" "exp3" 2 107 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1585 27 1
"3306" "exp3" 2 108 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1944 17 1
"3306" "exp3" 2 109 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 2006 33 1
"3306" "exp3" 2 110 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 2193 0 0
"3306" "exp3" 2 111 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1214 39 1
"3306" "exp3" 2 112 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1534 0 0
"3306" "exp3" 2 113 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2180 45 1
"3306" "exp3" 2 114 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2575 0 0
"3306" "exp3" 2 115 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2904 0 0
"3306" "exp3" 2 116 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1791 0 0
"3306" "exp3" 2 117 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1744 43 1
"3306" "exp3" 2 118 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 3392 0 0
"3306" "exp3" 2 119 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1842 37 1
"3306" "exp3" 2 120 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1865 27 1
"3306" "exp3" 2 121 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2186 0 0
"3306" "exp3" 2 122 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 2469 13 1
"3306" "exp3" 2 123 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 3423 0 0
"3306" "exp3" 2 124 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 3067 25 1
"3306" "exp3" 2 125 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1666 34 1
"3306" "exp3" 2 126 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1580 15 1
"3306" "exp3" 2 127 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 3635 21 1
"3306" "exp3" 2 128 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 2389 0 0
"3306" "exp3" 2 129 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 3351 26 1
"3306" "exp3" 2 130 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1938 0 0
"3306" "exp3" 2 131 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1547 0 0
"3306" "exp3" 2 132 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2085 29 1
"3306" "exp3" 1 1 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 3556 0 0
"3306" "exp3" 1 2 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 2880 0 0
"3306" "exp3" 1 3 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 3047 70 1
"3306" "exp3" 1 4 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 3164 0 0
"3306" "exp3" 1 5 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1553 0 0
"3306" "exp3" 1 6 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 2859 0 0
"3306" "exp3" 1 7 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 2085 28 1
"3306" "exp3" 1 8 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1836 83 1
"3306" "exp3" 1 9 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 5834 0 0
"3306" "exp3" 1 10 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1297 26 1
"3306" "exp3" 1 11 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 4476 25 1
"3306" "exp3" 1 12 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 3154 26 1
"3306" "exp3" 1 13 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1966 37 1
"3306" "exp3" 1 14 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2004 18 1
"3306" "exp3" 1 15 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2020 23 1
"3306" "exp3" 1 16 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 2298 0 0
"3306" "exp3" 1 17 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2359 31 1
"3306" "exp3" 1 18 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1588 16 1
"3306" "exp3" 1 19 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 2470 20 1
"3306" "exp3" 1 20 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1262 18 1
"3306" "exp3" 1 21 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 2356 29 1
"3306" "exp3" 1 22 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 2107 0 0
"3306" "exp3" 1 23 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1289 29 1
"3306" "exp3" 1 24 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2015 47 1
"3306" "exp3" 1 25 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 2081 21 1
"3306" "exp3" 1 26 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 4208 0 0
"3306" "exp3" 1 27 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1306 22 1
"3306" "exp3" 1 28 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1079 30 1
"3306" "exp3" 1 29 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 2444 0 0
"3306" "exp3" 1 30 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 3262 28 1
"3306" "exp3" 1 31 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2069 42 1
"3306" "exp3" 1 32 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 2770 39 1
"3306" "exp3" 1 33 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 3891 26 1
"3306" "exp3" 1 34 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1748 35 1
"3306" "exp3" 1 35 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 2797 35 1
"3306" "exp3" 1 36 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1249 0 0
"3306" "exp3" 1 37 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1321 0 0
"3306" "exp3" 1 38 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 2055 0 0
"3306" "exp3" 1 39 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1471 0 0
"3306" "exp3" 1 40 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 2269 30 1
"3306" "exp3" 1 41 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1127 41 1
"3306" "exp3" 1 42 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 6412 0 0
"3306" "exp3" 1 43 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1815 38 1
"3306" "exp3" 1 44 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1329 48 1
"3306" "exp3" 1 45 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 4634 0 0
"3306" "exp3" 1 46 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1298 34 1
"3306" "exp3" 1 47 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 4024 0 0
"3306" "exp3" 1 48 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1288 0 0
"3306" "exp3" 1 49 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1910 0 0
"3306" "exp3" 1 50 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 6333 0 0
"3306" "exp3" 1 51 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1748 34 1
"3306" "exp3" 1 52 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 4105 0 0
"3306" "exp3" 1 53 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2161 67 1
"3306" "exp3" 1 54 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1375 49 1
"3306" "exp3" 1 55 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1640 0 0
"3306" "exp3" 1 56 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1984 25 1
"3306" "exp3" 1 57 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1158 30 1
"3306" "exp3" 1 58 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1698 36 1
"3306" "exp3" 1 59 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1910 0 0
"3306" "exp3" 1 60 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 2218 20 1
"3306" "exp3" 1 61 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 2047 0 0
"3306" "exp3" 1 62 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 2696 0 0
"3306" "exp3" 1 63 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 3595 0 0
"3306" "exp3" 1 64 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1709 0 0
"3306" "exp3" 1 65 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1903 0 0
"3306" "exp3" 1 66 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2353 0 0
"3306" "exp3" 1 67 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 3171 0 0
"3306" "exp3" 1 68 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1988 0 0
"3306" "exp3" 1 69 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 2954 0 0
"3306" "exp3" 1 70 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1649 0 0
"3306" "exp3" 1 71 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1759 31 1
"3306" "exp3" 1 72 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1744 32 1
"3306" "exp3" 1 73 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 2689 23 1
"3306" "exp3" 1 74 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 4245 26 1
"3306" "exp3" 1 75 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1733 80 1
"3306" "exp3" 1 76 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2229 29 1
"3306" "exp3" 1 77 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1589 0 0
"3306" "exp3" 1 78 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2644 17 1
"3306" "exp3" 1 79 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1213 0 0
"3306" "exp3" 1 80 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1287 33 1
"3306" "exp3" 1 81 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 3704 28 1
"3306" "exp3" 1 82 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 2612 0 0
"3306" "exp3" 1 83 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1800 81 1
"3306" "exp3" 1 84 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2232 19 1
"3306" "exp3" 1 85 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1717 0 0
"3306" "exp3" 1 86 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 3495 0 0
"3306" "exp3" 1 87 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 3323 0 0
"3306" "exp3" 1 88 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1526 0 0
"3306" "exp3" 1 89 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 2935 0 0
"3306" "exp3" 1 90 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 3132 43 1
"3306" "exp3" 1 91 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 2598 0 0
"3306" "exp3" 1 92 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 5842 0 0
"3306" "exp3" 1 93 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 2645 0 0
"3306" "exp3" 1 94 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 3473 0 0
"3306" "exp3" 1 95 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1474 0 0
"3306" "exp3" 1 96 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 5581 72 1
"3306" "exp3" 1 97 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1301 40 1
"3306" "exp3" 1 98 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1648 32 1
"3306" "exp3" 1 99 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1254 27 1
"3306" "exp3" 1 100 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 856 32 1
"3306" "exp3" 1 101 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1245 36 1
"3306" "exp3" 1 102 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1953 23 1
"3306" "exp3" 1 103 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 2013 84 1
"3306" "exp3" 1 104 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 2426 0 0
"3306" "exp3" 1 105 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 2524 13 1
"3306" "exp3" 1 106 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1103 0 0
"3306" "exp3" 1 107 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 2708 21 1
"3306" "exp3" 1 108 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 2081 0 0
"3306" "exp3" 1 109 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 6565 0 0
"3306" "exp3" 1 110 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 2283 15 1
"3306" "exp3" 1 111 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 2115 0 0
"3306" "exp3" 1 112 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1633 0 0
"3306" "exp3" 1 113 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1425 0 0
"3306" "exp3" 1 114 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 2099 37 1
"3306" "exp3" 1 115 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1118 45 1
"3306" "exp3" 1 116 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1980 0 0
"3306" "exp3" 1 117 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 2485 40 1
"3306" "exp3" 1 118 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1513 96 1
"3306" "exp3" 1 119 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 2397 14 1
"3306" "exp3" 1 120 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 2196 22 1
"3306" "exp3" 1 121 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 2947 0 0
"3306" "exp3" 1 122 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1848 25 1
"3306" "exp3" 1 123 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 2192 23 1
"3306" "exp3" 1 124 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1330 24 1
"3306" "exp3" 1 125 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1731 0 0
"3306" "exp3" 1 126 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 2274 0 0
"3306" "exp3" 1 127 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1009 21 1
"3306" "exp3" 1 128 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1496 38 1
"3306" "exp3" 1 129 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 2089 0 0
"3306" "exp3" 1 130 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 2949 0 0
"3306" "exp3" 1 131 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 2486 0 0
"3306" "exp3" 1 132 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1484 0 0
"3306" "exp3" 2 1 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1851 0 0
"3306" "exp3" 2 2 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1581 0 0
"3306" "exp3" 2 3 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1226 30 1
"3306" "exp3" 2 4 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1188 29 1
"3306" "exp3" 2 5 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 2045 0 0
"3306" "exp3" 2 6 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1040 38 1
"3306" "exp3" 2 7 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1530 83 1
"3306" "exp3" 2 8 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 2637 89 1
"3306" "exp3" 2 9 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1154 44 1
"3306" "exp3" 2 10 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 4625 0 0
"3306" "exp3" 2 11 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1635 30 1
"3306" "exp3" 2 12 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1873 0 0
"3306" "exp3" 2 13 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 2032 0 0
"3306" "exp3" 2 14 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1186 26 1
"3306" "exp3" 2 15 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 992 31 1
"3306" "exp3" 2 16 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1402 0 0
"3306" "exp3" 2 17 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 2015 27 1
"3306" "exp3" 2 18 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1091 0 0
"3306" "exp3" 2 19 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1741 0 0
"3306" "exp3" 2 20 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1099 0 0
"3306" "exp3" 2 21 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2488 0 0
"3306" "exp3" 2 22 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1550 33 1
"3306" "exp3" 2 23 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 5900 0 0
"3306" "exp3" 2 24 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1198 39 1
"3306" "exp3" 2 25 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1293 32 1
"3306" "exp3" 2 26 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 977 32 1
"3306" "exp3" 2 27 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1566 0 0
"3306" "exp3" 2 28 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1519 46 1
"3306" "exp3" 2 29 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1519 40 1
"3306" "exp3" 2 30 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 3404 0 0
"3306" "exp3" 2 31 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1635 20 1
"3306" "exp3" 2 32 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1272 0 0
"3306" "exp3" 2 33 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1826 0 0
"3306" "exp3" 2 34 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 4165 0 0
"3306" "exp3" 2 35 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1524 47 1
"3306" "exp3" 2 36 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 2165 0 0
"3306" "exp3" 2 37 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 2750 0 0
"3306" "exp3" 2 38 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2631 0 0
"3306" "exp3" 2 39 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1495 31 1
"3306" "exp3" 2 40 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2197 19 1
"3306" "exp3" 2 41 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 2046 0 0
"3306" "exp3" 2 42 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1680 0 0
"3306" "exp3" 2 43 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1428 0 0
"3306" "exp3" 2 44 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 2232 0 0
"3306" "exp3" 2 45 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1568 0 0
"3306" "exp3" 2 46 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 3480 18 1
"3306" "exp3" 2 47 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1588 21 1
"3306" "exp3" 2 48 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 2271 24 1
"3306" "exp3" 2 49 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1636 0 0
"3306" "exp3" 2 50 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1987 0 0
"3306" "exp3" 2 51 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1482 35 1
"3306" "exp3" 2 52 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 2513 22 1
"3306" "exp3" 2 53 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1306 0 0
"3306" "exp3" 2 54 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1172 22 1
"3306" "exp3" 2 55 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2191 0 0
"3306" "exp3" 2 56 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2415 29 1
"3306" "exp3" 2 57 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1278 32 1
"3306" "exp3" 2 58 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 2104 25 1
"3306" "exp3" 2 59 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1455 0 0
"3306" "exp3" 2 60 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 3264 13 1
"3306" "exp3" 2 61 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1223 0 0
"3306" "exp3" 2 62 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2274 0 0
"3306" "exp3" 2 63 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1585 17 1
"3306" "exp3" 2 64 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1640 0 0
"3306" "exp3" 2 65 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1985 83 1
"3306" "exp3" 2 66 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 974 30 1
"3306" "exp3" 2 67 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1398 21 1
"3306" "exp3" 2 68 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1552 0 0
"3306" "exp3" 2 69 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1516 0 0
"3306" "exp3" 2 70 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 3373 31 1
"3306" "exp3" 2 71 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1336 0 0
"3306" "exp3" 2 72 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1559 0 0
"3306" "exp3" 2 73 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1164 34 1
"3306" "exp3" 2 74 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1302 0 0
"3306" "exp3" 2 75 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1588 0 0
"3306" "exp3" 2 76 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1356 23 1
"3306" "exp3" 2 77 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1081 48 1
"3306" "exp3" 2 78 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1400 0 0
"3306" "exp3" 2 79 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1556 73 1
"3306" "exp3" 2 80 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 3555 0 0
"3306" "exp3" 2 81 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1289 43 1
"3306" "exp3" 2 82 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1202 40 1
"3306" "exp3" 2 83 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1363 0 0
"3306" "exp3" 2 84 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1450 0 0
"3306" "exp3" 2 85 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1407 14 1
"3306" "exp3" 2 86 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1102 0 0
"3306" "exp3" 2 87 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 2199 25 1
"3306" "exp3" 2 88 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1148 36 1
"3306" "exp3" 2 89 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 856 0 0
"3306" "exp3" 2 90 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1233 21 1
"3306" "exp3" 2 91 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 892 35 1
"3306" "exp3" 2 92 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1301 39 1
"3306" "exp3" 2 93 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1193 0 0
"3306" "exp3" 2 94 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1268 0 0
"3306" "exp3" 2 95 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 2213 0 0
"3306" "exp3" 2 96 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 2648 0 0
"3306" "exp3" 2 97 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1321 18 1
"3306" "exp3" 2 98 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1010 0 0
"3306" "exp3" 2 99 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1284 0 0
"3306" "exp3" 2 100 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1543 0 0
"3306" "exp3" 2 101 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 3481 0 0
"3306" "exp3" 2 102 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1100 41 1
"3306" "exp3" 2 103 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1136 42 1
"3306" "exp3" 2 104 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1200 0 0
"3306" "exp3" 2 105 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1504 0 0
"3306" "exp3" 2 106 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 2940 0 0
"3306" "exp3" 2 107 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 843 0 0
"3306" "exp3" 2 108 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 2182 71 1
"3306" "exp3" 2 109 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2884 0 0
"3306" "exp3" 2 110 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 3294 99 1
"3306" "exp3" 2 111 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1585 0 0
"3306" "exp3" 2 112 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1006 25 1
"3306" "exp3" 2 113 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 2731 0 0
"3306" "exp3" 2 114 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1878 0 0
"3306" "exp3" 2 115 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 2663 19 1
"3306" "exp3" 2 116 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 2229 28 1
"3306" "exp3" 2 117 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 3321 22 1
"3306" "exp3" 2 118 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 2021 17 1
"3306" "exp3" 2 119 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1326 0 0
"3306" "exp3" 2 120 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 959 0 0
"3306" "exp3" 2 121 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 3588 0 0
"3306" "exp3" 2 122 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1409 0 0
"3306" "exp3" 2 123 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 2037 24 1
"3306" "exp3" 2 124 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 4052 0 0
"3306" "exp3" 2 125 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1042 22 1
"3306" "exp3" 2 126 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1500 37 1
"3306" "exp3" 2 127 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1100 0 0
"3306" "exp3" 2 128 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 2411 0 0
"3306" "exp3" 2 129 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 818 23 1
"3306" "exp3" 2 130 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1818 0 0
"3306" "exp3" 2 131 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1897 0 0
"3306" "exp3" 2 132 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 837 0 0
"3307" "exp3" 1 1 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1398 0 0
"3307" "exp3" 1 2 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1382 40 1
"3307" "exp3" 1 3 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 1449 0 0
"3307" "exp3" 1 4 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 3521 0 0
"3307" "exp3" 1 5 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1588 0 0
"3307" "exp3" 1 6 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1165 13 1
"3307" "exp3" 1 7 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1564 17 1
"3307" "exp3" 1 8 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1260 26 1
"3307" "exp3" 1 9 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 878 0 0
"3307" "exp3" 1 10 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1315 43 1
"3307" "exp3" 1 11 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1377 16 1
"3307" "exp3" 1 12 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1353 34 1
"3307" "exp3" 1 13 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 836 0 0
"3307" "exp3" 1 14 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 2843 24 1
"3307" "exp3" 1 15 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1088 40 1
"3307" "exp3" 1 16 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 704 3 1
"3307" "exp3" 1 17 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1248 22 1
"3307" "exp3" 1 18 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1223 15 1
"3307" "exp3" 1 19 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1195 20 1
"3307" "exp3" 1 20 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 1732 61 1
"3307" "exp3" 1 21 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1443 27 1
"3307" "exp3" 1 22 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 1838 5 1
"3307" "exp3" 1 23 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1643 24 1
"3307" "exp3" 1 24 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 1392 0 0
"3307" "exp3" 1 25 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1637 0 0
"3307" "exp3" 1 26 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 1547 63 1
"3307" "exp3" 1 27 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1153 0 0
"3307" "exp3" 1 28 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1299 26 1
"3307" "exp3" 1 29 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 2188 16 1
"3307" "exp3" 1 30 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1319 32 1
"3307" "exp3" 1 31 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1131 8 1
"3307" "exp3" 1 32 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1651 43 1
"3307" "exp3" 1 33 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 2329 24 1
"3307" "exp3" 1 34 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1840 0 0
"3307" "exp3" 1 35 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 2972 14 1
"3307" "exp3" 1 36 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 830 0 0
"3307" "exp3" 1 37 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 1343 4 1
"3307" "exp3" 1 38 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1782 10 1
"3307" "exp3" 1 39 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 2809 9 1
"3307" "exp3" 1 40 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 2087 9 1
"3307" "exp3" 1 41 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1827 0 0
"3307" "exp3" 1 42 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1145 47 1
"3307" "exp3" 1 43 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1839 17 1
"3307" "exp3" 1 44 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 954 19 1
"3307" "exp3" 1 45 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 1103 0 0
"3307" "exp3" 1 46 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 2103 0 0
"3307" "exp3" 1 47 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 2198 0 0
"3307" "exp3" 1 48 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1598 0 0
"3307" "exp3" 1 49 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 5608 45 1
"3307" "exp3" 1 50 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1096 17 1
"3307" "exp3" 1 51 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 831 0 0
"3307" "exp3" 1 52 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 783 21 1
"3307" "exp3" 1 53 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1027 23 1
"3307" "exp3" 1 54 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1701 36 1
"3307" "exp3" 1 55 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1986 27 1
"3307" "exp3" 1 56 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1697 0 0
"3307" "exp3" 1 57 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1605 14 1
"3307" "exp3" 1 58 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1247 18 1
"3307" "exp3" 1 59 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 842 26 1
"3307" "exp3" 1 60 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 796 0 0
"3307" "exp3" 1 61 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 709 39 1
"3307" "exp3" 1 62 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 562 15 1
"3307" "exp3" 1 63 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1613 21 1
"3307" "exp3" 1 64 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 535 44 1
"3307" "exp3" 1 65 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 3353 0 0
"3307" "exp3" 1 66 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1258 15 1
"3307" "exp3" 1 67 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 625 25 1
"3307" "exp3" 1 68 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1035 0 0
"3307" "exp3" 1 69 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1030 0 0
"3307" "exp3" 1 70 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 525 12 1
"3307" "exp3" 1 71 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 2204 0 0
"3307" "exp3" 1 72 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 708 22 1
"3307" "exp3" 1 73 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 667 18 1
"3307" "exp3" 1 74 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 518 11 1
"3307" "exp3" 1 75 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1087 38 1
"3307" "exp3" 1 76 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 4368 41 1
"3307" "exp3" 1 77 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1347 41 1
"3307" "exp3" 1 78 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 679 0 0
"3307" "exp3" 1 79 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 9361 63 1
"3307" "exp3" 1 80 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1274 30 1
"3307" "exp3" 1 81 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1158 22 1
"3307" "exp3" 1 82 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1220 30 1
"3307" "exp3" 1 83 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 546 21 1
"3307" "exp3" 1 84 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 607 0 0
"3307" "exp3" 1 85 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 487 38 1
"3307" "exp3" 1 86 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 780 10 1
"3307" "exp3" 1 87 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 671 49 1
"3307" "exp3" 1 88 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 871 16 1
"3307" "exp3" 1 89 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1736 6 1
"3307" "exp3" 1 90 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 695 30 1
"3307" "exp3" 1 91 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 667 31 1
"3307" "exp3" 1 92 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 3628 12 1
"3307" "exp3" 1 93 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 670 0 0
"3307" "exp3" 1 94 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 4689 0 0
"3307" "exp3" 1 95 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 450 0 0
"3307" "exp3" 1 96 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 631 8 1
"3307" "exp3" 1 97 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 899 0 0
"3307" "exp3" 1 98 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1138 0 0
"3307" "exp3" 1 99 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 4847 0 0
"3307" "exp3" 1 100 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 491 5 1
"3307" "exp3" 1 101 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 830 25 1
"3307" "exp3" 1 102 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 4894 0 0
"3307" "exp3" 1 103 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 643 19 1
"3307" "exp3" 1 104 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 5489 0 0
"3307" "exp3" 1 105 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 712 31 1
"3307" "exp3" 1 106 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1433 33 1
"3307" "exp3" 1 107 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 3078 65 1
"3307" "exp3" 1 108 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1382 34 1
"3307" "exp3" 1 109 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 914 35 1
"3307" "exp3" 1 110 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 7426 33 1
"3307" "exp3" 1 111 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1373 77 1
"3307" "exp3" 1 112 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2629 68 1
"3307" "exp3" 1 113 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 777 29 1
"3307" "exp3" 1 114 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 642 0 0
"3307" "exp3" 1 115 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 789 36 1
"3307" "exp3" 1 116 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1257 31 1
"3307" "exp3" 1 117 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 6200 25 1
"3307" "exp3" 1 118 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 844 25 1
"3307" "exp3" 1 119 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 828 0 0
"3307" "exp3" 1 120 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 753 20 1
"3307" "exp3" 1 121 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 3810 28 1
"3307" "exp3" 1 122 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 2433 22 1
"3307" "exp3" 1 123 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 731 0 0
"3307" "exp3" 1 124 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 357 7 1
"3307" "exp3" 1 125 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 619 19 1
"3307" "exp3" 1 126 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 998 23 1
"3307" "exp3" 1 127 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 694 13 1
"3307" "exp3" 1 128 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 4113 98 1
"3307" "exp3" 1 129 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1139 19 1
"3307" "exp3" 1 130 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1661 26 1
"3307" "exp3" 1 131 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 743 37 1
"3307" "exp3" 1 132 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 640 0 0
"3307" "exp3" 2 1 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 597 0 0
"3307" "exp3" 2 2 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 528 25 1
"3307" "exp3" 2 3 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1022 0 0
"3307" "exp3" 2 4 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 779 22 1
"3307" "exp3" 2 5 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 742 49 1
"3307" "exp3" 2 6 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 792 25 1
"3307" "exp3" 2 7 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 2891 32 1
"3307" "exp3" 2 8 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1835 0 0
"3307" "exp3" 2 9 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 2987 0 0
"3307" "exp3" 2 10 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 758 0 0
"3307" "exp3" 2 11 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 475 0 0
"3307" "exp3" 2 12 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 429 26 1
"3307" "exp3" 2 13 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 785 0 0
"3307" "exp3" 2 14 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 4920 21 1
"3307" "exp3" 2 15 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 1509 6 1
"3307" "exp3" 2 16 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 518 0 0
"3307" "exp3" 2 17 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 520 24 1
"3307" "exp3" 2 18 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 610 0 0
"3307" "exp3" 2 19 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 617 30 1
"3307" "exp3" 2 20 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 577 27 1
"3307" "exp3" 2 21 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 3355 0 0
"3307" "exp3" 2 22 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 771 0 0
"3307" "exp3" 2 23 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 541 25 1
"3307" "exp3" 2 24 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 887 0 0
"3307" "exp3" 2 25 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 642 72 1
"3307" "exp3" 2 26 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 523 28 1
"3307" "exp3" 2 27 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 5618 5 1
"3307" "exp3" 2 28 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 548 15 1
"3307" "exp3" 2 29 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 573 38 1
"3307" "exp3" 2 30 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 481 7 1
"3307" "exp3" 2 31 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 739 22 1
"3307" "exp3" 2 32 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1525 33 1
"3307" "exp3" 2 33 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 394 0 0
"3307" "exp3" 2 34 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 2432 0 0
"3307" "exp3" 2 35 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 604 8 1
"3307" "exp3" 2 36 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1100 0 0
"3307" "exp3" 2 37 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 3033 0 0
"3307" "exp3" 2 38 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 390 58 1
"3307" "exp3" 2 39 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 518 35 1
"3307" "exp3" 2 40 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 4414 0 0
"3307" "exp3" 2 41 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 666 30 1
"3307" "exp3" 2 42 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 2027 0 0
"3307" "exp3" 2 43 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 499 0 0
"3307" "exp3" 2 44 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1820 19 1
"3307" "exp3" 2 45 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 555 14 1
"3307" "exp3" 2 46 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 591 31 1
"3307" "exp3" 2 47 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 804 37 1
"3307" "exp3" 2 48 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 712 0 0
"3307" "exp3" 2 49 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 959 26 1
"3307" "exp3" 2 50 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1363 0 0
"3307" "exp3" 2 51 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 3479 0 0
"3307" "exp3" 2 52 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 524 0 0
"3307" "exp3" 2 53 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 830 12 1
"3307" "exp3" 2 54 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 771 13 1
"3307" "exp3" 2 55 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1044 32 1
"3307" "exp3" 2 56 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 509 8 1
"3307" "exp3" 2 57 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 3615 74 1
"3307" "exp3" 2 58 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 540 33 1
"3307" "exp3" 2 59 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1339 0 0
"3307" "exp3" 2 60 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 4079 0 0
"3307" "exp3" 2 61 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1543 34 1
"3307" "exp3" 2 62 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 520 45 1
"3307" "exp3" 2 63 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 653 11 1
"3307" "exp3" 2 64 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 408 26 1
"3307" "exp3" 2 65 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 460 0 0
"3307" "exp3" 2 66 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 464 34 1
"3307" "exp3" 2 67 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 574 43 1
"3307" "exp3" 2 68 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 381 22 1
"3307" "exp3" 2 69 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 554 0 0
"3307" "exp3" 2 70 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 3971 3 1
"3307" "exp3" 2 71 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 608 18 1
"3307" "exp3" 2 72 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 471 16 1
"3307" "exp3" 2 73 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1048 36 1
"3307" "exp3" 2 74 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 2762 23 1
"3307" "exp3" 2 75 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 450 24 1
"3307" "exp3" 2 76 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1576 0 0
"3307" "exp3" 2 77 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 583 19 1
"3307" "exp3" 2 78 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1520 0 0
"3307" "exp3" 2 79 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1024 0 0
"3307" "exp3" 2 80 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 581 39 1
"3307" "exp3" 2 81 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1963 0 0
"3307" "exp3" 2 82 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 3882 0 0
"3307" "exp3" 2 83 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 588 46 1
"3307" "exp3" 2 84 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 3839 0 0
"3307" "exp3" 2 85 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1004 40 1
"3307" "exp3" 2 86 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 3089 0 0
"3307" "exp3" 2 87 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 1707 0 0
"3307" "exp3" 2 88 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 5642 0 0
"3307" "exp3" 2 89 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 532 15 1
"3307" "exp3" 2 90 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1187 37 1
"3307" "exp3" 2 91 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 634 16 1
"3307" "exp3" 2 92 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 3323 19 1
"3307" "exp3" 2 93 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 457 21 1
"3307" "exp3" 2 94 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1742 0 0
"3307" "exp3" 2 95 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 9630 0 0
"3307" "exp3" 2 96 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 512 5 1
"3307" "exp3" 2 97 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 542 6 1
"3307" "exp3" 2 98 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 7104 35 1
"3307" "exp3" 2 99 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 763 43 1
"3307" "exp3" 2 100 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 778 9 1
"3307" "exp3" 2 101 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 448 28 1
"3307" "exp3" 2 102 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 6022 0 0
"3307" "exp3" 2 103 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 396 0 0
"3307" "exp3" 2 104 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 759 52 1
"3307" "exp3" 2 105 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2723 31 1
"3307" "exp3" 2 106 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 3747 0 0
"3307" "exp3" 2 107 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 607 0 0
"3307" "exp3" 2 108 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 506 13 1
"3307" "exp3" 2 109 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 573 38 1
"3307" "exp3" 2 110 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 610 33 1
"3307" "exp3" 2 111 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 504 27 1
"3307" "exp3" 2 112 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 2263 83 1
"3307" "exp3" 2 113 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 3017 32 1
"3307" "exp3" 2 114 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 1827 0 0
"3307" "exp3" 2 115 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 601 0 0
"3307" "exp3" 2 116 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 6279 9 1
"3307" "exp3" 2 117 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 556 0 0
"3307" "exp3" 2 118 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 370 0 0
"3307" "exp3" 2 119 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 13615 0 0
"3307" "exp3" 2 120 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 1982 4 1
"3307" "exp3" 2 121 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 478 35 1
"3307" "exp3" 2 122 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1211 10 1
"3307" "exp3" 2 123 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 487 2 1
"3307" "exp3" 2 124 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 582 27 1
"3307" "exp3" 2 125 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 4047 0 0
"3307" "exp3" 2 126 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 495 29 1
"3307" "exp3" 2 127 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 670 30 1
"3307" "exp3" 2 128 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 602 0 0
"3307" "exp3" 2 129 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 6853 0 0
"3307" "exp3" 2 130 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 751 0 0
"3307" "exp3" 2 131 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 6287 73 1
"3307" "exp3" 2 132 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 769 45 1
"3307" "exp3" 1 1 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2980 0 0
"3307" "exp3" 1 2 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 713 15 1
"3307" "exp3" 1 3 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1149 10 1
"3307" "exp3" 1 4 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 786 3 1
"3307" "exp3" 1 5 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 3140 0 0
"3307" "exp3" 1 6 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 5468 0 0
"3307" "exp3" 1 7 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1039 0 0
"3307" "exp3" 1 8 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 643 11 1
"3307" "exp3" 1 9 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 772 16 1
"3307" "exp3" 1 10 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 6404 21 1
"3307" "exp3" 1 11 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1609 0 0
"3307" "exp3" 1 12 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 575 0 0
"3307" "exp3" 1 13 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 893 0 0
"3307" "exp3" 1 14 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 715 0 0
"3307" "exp3" 1 15 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 720 0 0
"3307" "exp3" 1 16 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1871 0 0
"3307" "exp3" 1 17 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 7283 45 1
"3307" "exp3" 1 18 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 548 0 0
"3307" "exp3" 1 19 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 4768 0 0
"3307" "exp3" 1 20 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1258 0 0
"3307" "exp3" 1 21 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 642 22 1
"3307" "exp3" 1 22 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 2046 0 0
"3307" "exp3" 1 23 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1853 18 1
"3307" "exp3" 1 24 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 361 0 0
"3307" "exp3" 1 25 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 6965 0 0
"3307" "exp3" 1 26 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 525 27 1
"3307" "exp3" 1 27 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 887 43 1
"3307" "exp3" 1 28 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1505 34 1
"3307" "exp3" 1 29 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2837 72 1
"3307" "exp3" 1 30 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 5187 0 0
"3307" "exp3" 1 31 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 469 0 0
"3307" "exp3" 1 32 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1081 0 0
"3307" "exp3" 1 33 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 5166 11 1
"3307" "exp3" 1 34 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 974 0 0
"3307" "exp3" 1 35 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 503 30 1
"3307" "exp3" 1 36 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 4529 0 0
"3307" "exp3" 1 37 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1892 0 0
"3307" "exp3" 1 38 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 461 0 0
"3307" "exp3" 1 39 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 597 33 1
"3307" "exp3" 1 40 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 5889 24 1
"3307" "exp3" 1 41 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 277 0 0
"3307" "exp3" 1 42 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 704 26 1
"3307" "exp3" 1 43 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1259 25 1
"3307" "exp3" 1 44 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 2434 30 1
"3307" "exp3" 1 45 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 738 61 1
"3307" "exp3" 1 46 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 669 17 1
"3307" "exp3" 1 47 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 582 32 1
"3307" "exp3" 1 48 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 6716 42 1
"3307" "exp3" 1 49 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1524 49 1
"3307" "exp3" 1 50 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 3320 38 1
"3307" "exp3" 1 51 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 960 0 0
"3307" "exp3" 1 52 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2870 0 0
"3307" "exp3" 1 53 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 3315 38 1
"3307" "exp3" 1 54 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1891 25 1
"3307" "exp3" 1 55 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 4863 16 1
"3307" "exp3" 1 56 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 998 0 0
"3307" "exp3" 1 57 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 2107 0 0
"3307" "exp3" 1 58 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 2795 30 1
"3307" "exp3" 1 59 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 4374 1 1
"3307" "exp3" 1 60 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1542 19 1
"3307" "exp3" 1 61 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1909 28 1
"3307" "exp3" 1 62 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 2489 81 1
"3307" "exp3" 1 63 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 404 21 1
"3307" "exp3" 1 64 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1116 42 1
"3307" "exp3" 1 65 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 643 0 0
"3307" "exp3" 1 66 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 687 26 1
"3307" "exp3" 1 67 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 10420 7 1
"3307" "exp3" 1 68 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 954 0 0
"3307" "exp3" 1 69 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 3574 22 1
"3307" "exp3" 1 70 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 6933 74 1
"3307" "exp3" 1 71 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1745 0 0
"3307" "exp3" 1 72 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 853 0 0
"3307" "exp3" 1 73 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 7472 0 0
"3307" "exp3" 1 74 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 2480 25 1
"3307" "exp3" 1 75 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 5937 0 0
"3307" "exp3" 1 76 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 700 2 1
"3307" "exp3" 1 77 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3034 65 1
"3307" "exp3" 1 78 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 2785 0 0
"3307" "exp3" 1 79 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 9169 0 0
"3307" "exp3" 1 80 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 2490 57 1
"3307" "exp3" 1 81 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1001 70 1
"3307" "exp3" 1 82 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1092 0 0
"3307" "exp3" 1 83 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 2707 13 1
"3307" "exp3" 1 84 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1782 6 1
"3307" "exp3" 1 85 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2146 0 0
"3307" "exp3" 1 86 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1487 0 0
"3307" "exp3" 1 87 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 2472 76 1
"3307" "exp3" 1 88 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 2711 18 1
"3307" "exp3" 1 89 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 5064 7 1
"3307" "exp3" 1 90 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 1908 73 1
"3307" "exp3" 1 91 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1277 65 1
"3307" "exp3" 1 92 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1556 0 0
"3307" "exp3" 1 93 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1426 0 0
"3307" "exp3" 1 94 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 871 13 1
"3307" "exp3" 1 95 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 4141 63 1
"3307" "exp3" 1 96 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1759 28 1
"3307" "exp3" 1 97 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 4470 15 1
"3307" "exp3" 1 98 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1618 0 0
"3307" "exp3" 1 99 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1672 20 1
"3307" "exp3" 1 100 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2400 0 0
"3307" "exp3" 1 101 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 3581 0 0
"3307" "exp3" 1 102 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 4970 44 1
"3307" "exp3" 1 103 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 2361 72 1
"3307" "exp3" 1 104 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 4442 0 0
"3307" "exp3" 1 105 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 5741 29 1
"3307" "exp3" 1 106 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1568 27 1
"3307" "exp3" 1 107 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 823 0 0
"3307" "exp3" 1 108 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 7165 86 1
"3307" "exp3" 1 109 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 3429 55 1
"3307" "exp3" 1 110 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 3171 0 0
"3307" "exp3" 1 111 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1903 0 0
"3307" "exp3" 1 112 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1281 27 1
"3307" "exp3" 1 113 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 4869 0 0
"3307" "exp3" 1 114 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2088 41 1
"3307" "exp3" 1 115 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 2423 0 0
"3307" "exp3" 1 116 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 5549 12 1
"3307" "exp3" 1 117 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 8561 0 0
"3307" "exp3" 1 118 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1354 76 1
"3307" "exp3" 1 119 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 4000 85 1
"3307" "exp3" 1 120 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 3000 0 0
"3307" "exp3" 1 121 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 2159 21 1
"3307" "exp3" 1 122 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 2817 21 1
"3307" "exp3" 1 123 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1951 0 0
"3307" "exp3" 1 124 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1765 34 1
"3307" "exp3" 1 125 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1595 0 0
"3307" "exp3" 1 126 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 4135 34 1
"3307" "exp3" 1 127 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 3380 0 0
"3307" "exp3" 1 128 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 2416 0 0
"3307" "exp3" 1 129 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 7399 13 1
"3307" "exp3" 1 130 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 2586 0 0
"3307" "exp3" 1 131 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 652 20 1
"3307" "exp3" 1 132 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 517 0 0
"3307" "exp3" 2 1 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 1774 56 1
"3307" "exp3" 2 2 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1698 0 0
"3307" "exp3" 2 3 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 509 0 0
"3307" "exp3" 2 4 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 870 0 0
"3307" "exp3" 2 5 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 601 0 0
"3307" "exp3" 2 6 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 578 0 0
"3307" "exp3" 2 7 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 555 33 1
"3307" "exp3" 2 8 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 583 14 1
"3307" "exp3" 2 9 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 982 24 1
"3307" "exp3" 2 10 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1244 22 1
"3307" "exp3" 2 11 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 469 0 0
"3307" "exp3" 2 12 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1523 0 0
"3307" "exp3" 2 13 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 858 0 0
"3307" "exp3" 2 14 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 5393 0 0
"3307" "exp3" 2 15 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1554 0 0
"3307" "exp3" 2 16 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 950 0 0
"3307" "exp3" 2 17 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 1054 0 0
"3307" "exp3" 2 18 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 6328 0 0
"3307" "exp3" 2 19 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 1200 0 0
"3307" "exp3" 2 20 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 2182 0 0
"3307" "exp3" 2 21 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 3979 0 0
"3307" "exp3" 2 22 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 787 51 1
"3307" "exp3" 2 23 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 715 1 1
"3307" "exp3" 2 24 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1292 10 1
"3307" "exp3" 2 25 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 675 32 1
"3307" "exp3" 2 26 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1873 37 1
"3307" "exp3" 2 27 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 3621 36 1
"3307" "exp3" 2 28 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 738 18 1
"3307" "exp3" 2 29 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1281 18 1
"3307" "exp3" 2 30 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 5855 31 1
"3307" "exp3" 2 31 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1028 0 0
"3307" "exp3" 2 32 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 883 11 1
"3307" "exp3" 2 33 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 368 0 0
"3307" "exp3" 2 34 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 648 18 1
"3307" "exp3" 2 35 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 600 23 1
"3307" "exp3" 2 36 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 502 0 0
"3307" "exp3" 2 37 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 295 0 0
"3307" "exp3" 2 38 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 394 0 0
"3307" "exp3" 2 39 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 6813 0 0
"3307" "exp3" 2 40 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1178 0 0
"3307" "exp3" 2 41 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 695 0 0
"3307" "exp3" 2 42 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 573 38 1
"3307" "exp3" 2 43 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 4113 28 1
"3307" "exp3" 2 44 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 5133 66 1
"3307" "exp3" 2 45 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1609 29 1
"3307" "exp3" 2 46 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 454 30 1
"3307" "exp3" 2 47 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 317 0 0
"3307" "exp3" 2 48 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 3505 2 1
"3307" "exp3" 2 49 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 612 40 1
"3307" "exp3" 2 50 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1023 0 0
"3307" "exp3" 2 51 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 668 0 0
"3307" "exp3" 2 52 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 3351 0 0
"3307" "exp3" 2 53 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 3243 59 1
"3307" "exp3" 2 54 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1279 45 1
"3307" "exp3" 2 55 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1280 12 1
"3307" "exp3" 2 56 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1193 28 1
"3307" "exp3" 2 57 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 9356 32 1
"3307" "exp3" 2 58 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2660 34 1
"3307" "exp3" 2 59 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1081 0 0
"3307" "exp3" 2 60 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 689 28 1
"3307" "exp3" 2 61 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 781 0 0
"3307" "exp3" 2 62 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 3008 0 0
"3307" "exp3" 2 63 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 4564 82 1
"3307" "exp3" 2 64 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 909 17 1
"3307" "exp3" 2 65 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 635 0 0
"3307" "exp3" 2 66 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 835 27 1
"3307" "exp3" 2 67 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 4793 16 1
"3307" "exp3" 2 68 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 3861 0 0
"3307" "exp3" 2 69 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 3792 0 0
"3307" "exp3" 2 70 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 2145 0 0
"3307" "exp3" 2 71 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 2084 21 1
"3307" "exp3" 2 72 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 8887 34 1
"3307" "exp3" 2 73 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1867 0 0
"3307" "exp3" 2 74 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1565 32 1
"3307" "exp3" 2 75 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 7480 30 1
"3307" "exp3" 2 76 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1421 0 0
"3307" "exp3" 2 77 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1386 63 1
"3307" "exp3" 2 78 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 7316 0 0
"3307" "exp3" 2 79 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 652 24 1
"3307" "exp3" 2 80 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 733 0 0
"3307" "exp3" 2 81 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 721 0 0
"3307" "exp3" 2 82 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 5028 0 0
"3307" "exp3" 2 83 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 4729 0 0
"3307" "exp3" 2 84 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1666 0 0
"3307" "exp3" 2 85 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 9964 0 0
"3307" "exp3" 2 86 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1003 57 1
"3307" "exp3" 2 87 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1318 29 1
"3307" "exp3" 2 88 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 5863 0 0
"3307" "exp3" 2 89 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 768 26 1
"3307" "exp3" 2 90 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 600 0 0
"3307" "exp3" 2 91 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 4281 25 1
"3307" "exp3" 2 92 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 7398 0 0
"3307" "exp3" 2 93 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1235 22 1
"3307" "exp3" 2 94 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 680 13 1
"3307" "exp3" 2 95 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 463 0 0
"3307" "exp3" 2 96 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 5697 7 1
"3307" "exp3" 2 97 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 266 7 1
"3307" "exp3" 2 98 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 869 0 0
"3307" "exp3" 2 99 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 509 0 0
"3307" "exp3" 2 100 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 4680 67 1
"3307" "exp3" 2 101 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 4992 4 1
"3307" "exp3" 2 102 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 512 83 1
"3307" "exp3" 2 103 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 341 0 0
"3307" "exp3" 2 104 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1241 0 0
"3307" "exp3" 2 105 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 3493 39 1
"3307" "exp3" 2 106 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1555 0 0
"3307" "exp3" 2 107 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 4776 81 1
"3307" "exp3" 2 108 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1673 0 0
"3307" "exp3" 2 109 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 5222 0 0
"3307" "exp3" 2 110 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1082 19 1
"3307" "exp3" 2 111 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 2098 65 1
"3307" "exp3" 2 112 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 8304 21 1
"3307" "exp3" 2 113 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1304 55 1
"3307" "exp3" 2 114 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1268 0 0
"3307" "exp3" 2 115 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1024 33 1
"3307" "exp3" 2 116 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 664 0 0
"3307" "exp3" 2 117 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1042 11 1
"3307" "exp3" 2 118 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 958 3 1
"3307" "exp3" 2 119 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1647 40 1
"3307" "exp3" 2 120 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 5839 28 1
"3307" "exp3" 2 121 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 8346 13 1
"3307" "exp3" 2 122 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1006 0 0
"3307" "exp3" 2 123 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 5406 14 1
"3307" "exp3" 2 124 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 1136 59 1
"3307" "exp3" 2 125 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 3234 19 1
"3307" "exp3" 2 126 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 5344 0 0
"3307" "exp3" 2 127 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 7009 0 0
"3307" "exp3" 2 128 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 615 79 1
"3307" "exp3" 2 129 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 2994 23 1
"3307" "exp3" 2 130 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 5893 0 0
"3307" "exp3" 2 131 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1203 21 1
"3307" "exp3" 2 132 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1546 46 1
"3307" "exp3" 1 1 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 617 38 1
"3307" "exp3" 1 2 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 4428 0 0
"3307" "exp3" 1 3 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1574 0 0
"3307" "exp3" 1 4 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 1473 0 0
"3307" "exp3" 1 5 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 1387 0 0
"3307" "exp3" 1 6 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 7826 0 0
"3307" "exp3" 1 7 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1388 0 0
"3307" "exp3" 1 8 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2911 0 0
"3307" "exp3" 1 9 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 7332 67 1
"3307" "exp3" 1 10 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1131 0 0
"3307" "exp3" 1 11 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 4690 10 1
"3307" "exp3" 1 12 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 644 0 0
"3307" "exp3" 1 13 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 665 0 0
"3307" "exp3" 1 14 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 4068 0 0
"3307" "exp3" 1 15 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 985 14 1
"3307" "exp3" 1 16 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 1186 0 0
"3307" "exp3" 1 17 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 16064 0 0
"3307" "exp3" 1 18 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 4398 42 1
"3307" "exp3" 1 19 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 3459 19 1
"3307" "exp3" 1 20 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 2970 0 0
"3307" "exp3" 1 21 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 458 23 1
"3307" "exp3" 1 22 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 571 0 0
"3307" "exp3" 1 23 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1603 15 1
"3307" "exp3" 1 24 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1623 20 1
"3307" "exp3" 1 25 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 5050 33 1
"3307" "exp3" 1 26 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 878 75 1
"3307" "exp3" 1 27 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1342 0 0
"3307" "exp3" 1 28 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 724 8 1
"3307" "exp3" 1 29 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 8002 0 0
"3307" "exp3" 1 30 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2032 0 0
"3307" "exp3" 1 31 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 2024 0 0
"3307" "exp3" 1 32 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 3626 0 0
"3307" "exp3" 1 33 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 2189 0 0
"3307" "exp3" 1 34 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 1921 0 0
"3307" "exp3" 1 35 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 3568 0 0
"3307" "exp3" 1 36 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 2431 0 0
"3307" "exp3" 1 37 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 2545 0 0
"3307" "exp3" 1 38 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 2378 0 0
"3307" "exp3" 1 39 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 2314 0 0
"3307" "exp3" 1 40 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2754 13 1
"3307" "exp3" 1 41 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 4110 0 0
"3307" "exp3" 1 42 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 2391 0 0
"3307" "exp3" 1 43 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1468 0 0
"3307" "exp3" 1 44 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2816 75 1
"3307" "exp3" 1 45 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1194 0 0
"3307" "exp3" 1 46 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2633 0 0
"3307" "exp3" 1 47 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 2092 0 0
"3307" "exp3" 1 48 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1951 28 1
"3307" "exp3" 1 49 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1045 64 1
"3307" "exp3" 1 50 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 1221 63 1
"3307" "exp3" 1 51 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1726 0 0
"3307" "exp3" 1 52 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 2225 0 0
"3307" "exp3" 1 53 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 4539 20 1
"3307" "exp3" 1 54 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 1630 73 1
"3307" "exp3" 1 55 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1707 27 1
"3307" "exp3" 1 56 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 998 0 0
"3307" "exp3" 1 57 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1428 0 0
"3307" "exp3" 1 58 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 2562 0 0
"3307" "exp3" 1 59 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1739 46 1
"3307" "exp3" 1 60 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 1445 16 1
"3307" "exp3" 1 61 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 749 0 0
"3307" "exp3" 1 62 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1760 21 1
"3307" "exp3" 1 63 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 2000 4 1
"3307" "exp3" 1 64 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 5341 20 1
"3307" "exp3" 1 65 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2696 36 1
"3307" "exp3" 1 66 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 8320 0 0
"3307" "exp3" 1 67 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 3573 0 0
"3307" "exp3" 1 68 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1688 0 0
"3307" "exp3" 1 69 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 535 19 1
"3307" "exp3" 1 70 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 569 0 0
"3307" "exp3" 1 71 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 426 0 0
"3307" "exp3" 1 72 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 1772 0 0
"3307" "exp3" 1 73 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1040 0 0
"3307" "exp3" 1 74 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 724 0 0
"3307" "exp3" 1 75 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 1788 0 0
"3307" "exp3" 1 76 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1283 0 0
"3307" "exp3" 1 77 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1495 0 0
"3307" "exp3" 1 78 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1154 0 0
"3307" "exp3" 1 79 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 787 0 0
"3307" "exp3" 1 80 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 612 0 0
"3307" "exp3" 1 81 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 992 75 1
"3307" "exp3" 1 82 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 1349 60 1
"3307" "exp3" 1 83 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 440 0 0
"3307" "exp3" 1 84 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1488 0 0
"3307" "exp3" 1 85 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 587 0 0
"3307" "exp3" 1 86 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 484 0 0
"3307" "exp3" 1 87 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 589 0 0
"3307" "exp3" 1 88 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 502 0 0
"3307" "exp3" 1 89 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 479 0 0
"3307" "exp3" 1 90 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 2063 13 1
"3307" "exp3" 1 91 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 1187 74 1
"3307" "exp3" 1 92 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1190 61 1
"3307" "exp3" 1 93 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 991 11 1
"3307" "exp3" 1 94 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 516 0 0
"3307" "exp3" 1 95 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 400 0 0
"3307" "exp3" 1 96 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 354 76 1
"3307" "exp3" 1 97 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1797 0 0
"3307" "exp3" 1 98 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 551 0 0
"3307" "exp3" 1 99 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2003 40 1
"3307" "exp3" 1 100 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 1421 0 0
"3307" "exp3" 1 101 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1531 37 1
"3307" "exp3" 1 102 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 495 83 1
"3307" "exp3" 1 103 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1010 0 0
"3307" "exp3" 1 104 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 543 0 0
"3307" "exp3" 1 105 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1026 0 0
"3307" "exp3" 1 106 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1234 0 0
"3307" "exp3" 1 107 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1072 0 0
"3307" "exp3" 1 108 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 912 34 1
"3307" "exp3" 1 109 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 821 0 0
"3307" "exp3" 1 110 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 903 58 1
"3307" "exp3" 1 111 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 632 93 1
"3307" "exp3" 1 112 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 595 0 0
"3307" "exp3" 1 113 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 2622 74 1
"3307" "exp3" 1 114 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 587 0 0
"3307" "exp3" 1 115 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 1726 0 0
"3307" "exp3" 1 116 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 4075 21 1
"3307" "exp3" 1 117 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 6248 0 0
"3307" "exp3" 1 118 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 2215 92 1
"3307" "exp3" 1 119 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 2448 20 1
"3307" "exp3" 1 120 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 3284 0 0
"3307" "exp3" 1 121 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 3269 70 1
"3307" "exp3" 1 122 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 646 0 0
"3307" "exp3" 1 123 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 5377 0 0
"3307" "exp3" 1 124 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 3101 0 0
"3307" "exp3" 1 125 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 3398 0 0
"3307" "exp3" 1 126 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 2584 0 0
"3307" "exp3" 1 127 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1588 32 1
"3307" "exp3" 1 128 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1548 0 0
"3307" "exp3" 1 129 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 2151 0 0
"3307" "exp3" 1 130 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 6475 0 0
"3307" "exp3" 1 131 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 961 0 0
"3307" "exp3" 1 132 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1656 0 0
"3307" "exp3" 2 1 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1186 0 0
"3307" "exp3" 2 2 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 565 0 0
"3307" "exp3" 2 3 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 701 0 0
"3307" "exp3" 2 4 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 699 62 1
"3307" "exp3" 2 5 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1282 29 1
"3307" "exp3" 2 6 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 852 0 0
"3307" "exp3" 2 7 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 682 69 1
"3307" "exp3" 2 8 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1761 0 0
"3307" "exp3" 2 9 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 1249 0 0
"3307" "exp3" 2 10 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 1424 6 1
"3307" "exp3" 2 11 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 1564 55 1
"3307" "exp3" 2 12 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 941 0 0
"3307" "exp3" 2 13 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1224 15 1
"3307" "exp3" 2 14 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 2145 0 0
"3307" "exp3" 2 15 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 878 0 0
"3307" "exp3" 2 16 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 580 33 1
"3307" "exp3" 2 17 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1366 0 0
"3307" "exp3" 2 18 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 703 0 0
"3307" "exp3" 2 19 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 511 0 0
"3307" "exp3" 2 20 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 985 0 0
"3307" "exp3" 2 21 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1025 0 0
"3307" "exp3" 2 22 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 590 0 0
"3307" "exp3" 2 23 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 680 0 0
"3307" "exp3" 2 24 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1526 0 0
"3307" "exp3" 2 25 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1672 30 1
"3307" "exp3" 2 26 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 905 0 0
"3307" "exp3" 2 27 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1454 0 0
"3307" "exp3" 2 28 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 936 0 0
"3307" "exp3" 2 29 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1078 0 0
"3307" "exp3" 2 30 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 5184 9 1
"3307" "exp3" 2 31 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 4558 0 0
"3307" "exp3" 2 32 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 1106 0 0
"3307" "exp3" 2 33 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 2970 22 1
"3307" "exp3" 2 34 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 3325 0 0
"3307" "exp3" 2 35 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 3376 0 0
"3307" "exp3" 2 36 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 613 0 0
"3307" "exp3" 2 37 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 4586 0 0
"3307" "exp3" 2 38 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2208 0 0
"3307" "exp3" 2 39 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1904 0 0
"3307" "exp3" 2 40 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 2645 0 0
"3307" "exp3" 2 41 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 3763 74 1
"3307" "exp3" 2 42 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1191 28 1
"3307" "exp3" 2 43 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 1902 0 0
"3307" "exp3" 2 44 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1951 34 1
"3307" "exp3" 2 45 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 3335 36 1
"3307" "exp3" 2 46 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1680 40 1
"3307" "exp3" 2 47 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 2580 0 0
"3307" "exp3" 2 48 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 3347 0 0
"3307" "exp3" 2 49 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 2249 66 1
"3307" "exp3" 2 50 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 2515 0 0
"3307" "exp3" 2 51 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 2209 55 1
"3307" "exp3" 2 52 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 2163 0 0
"3307" "exp3" 2 53 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1727 0 0
"3307" "exp3" 2 54 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 4143 42 1
"3307" "exp3" 2 55 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 1178 78 1
"3307" "exp3" 2 56 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2873 90 1
"3307" "exp3" 2 57 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 2389 0 0
"3307" "exp3" 2 58 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 810 0 0
"3307" "exp3" 2 59 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1976 0 0
"3307" "exp3" 2 60 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 2255 17 1
"3307" "exp3" 2 61 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 2911 0 0
"3307" "exp3" 2 62 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 2482 37 1
"3307" "exp3" 2 63 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2488 20 1
"3307" "exp3" 2 64 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 4407 0 0
"3307" "exp3" 2 65 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 2016 0 0
"3307" "exp3" 2 66 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2678 28 1
"3307" "exp3" 2 67 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 4004 0 0
"3307" "exp3" 2 68 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 2182 0 0
"3307" "exp3" 2 69 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2031 42 1
"3307" "exp3" 2 70 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1684 0 0
"3307" "exp3" 2 71 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 2377 70 1
"3307" "exp3" 2 72 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 2820 0 0
"3307" "exp3" 2 73 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 3953 0 0
"3307" "exp3" 2 74 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1437 27 1
"3307" "exp3" 2 75 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2127 68 1
"3307" "exp3" 2 76 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1332 0 0
"3307" "exp3" 2 77 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1312 0 0
"3307" "exp3" 2 78 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 1386 0 0
"3307" "exp3" 2 79 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 2223 0 0
"3307" "exp3" 2 80 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1245 41 1
"3307" "exp3" 2 81 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 2275 0 0
"3307" "exp3" 2 82 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 949 0 0
"3307" "exp3" 2 83 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 2357 0 0
"3307" "exp3" 2 84 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 3508 76 1
"3307" "exp3" 2 85 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1372 0 0
"3307" "exp3" 2 86 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 2236 0 0
"3307" "exp3" 2 87 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 826 40 1
"3307" "exp3" 2 88 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 2107 88 1
"3307" "exp3" 2 89 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1574 0 0
"3307" "exp3" 2 90 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 917 0 0
"3307" "exp3" 2 91 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1519 80 1
"3307" "exp3" 2 92 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 1826 75 1
"3307" "exp3" 2 93 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 2688 21 1
"3307" "exp3" 2 94 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 2177 8 1
"3307" "exp3" 2 95 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 2792 16 1
"3307" "exp3" 2 96 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 5107 23 1
"3307" "exp3" 2 97 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 2380 1 1
"3307" "exp3" 2 98 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2112 49 1
"3307" "exp3" 2 99 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1897 0 0
"3307" "exp3" 2 100 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1995 87 1
"3307" "exp3" 2 101 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 1775 0 0
"3307" "exp3" 2 102 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 2097 7 1
"3307" "exp3" 2 103 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 1297 0 0
"3307" "exp3" 2 104 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 2173 83 1
"3307" "exp3" 2 105 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 2704 0 0
"3307" "exp3" 2 106 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 2547 0 0
"3307" "exp3" 2 107 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2992 63 1
"3307" "exp3" 2 108 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1018 0 0
"3307" "exp3" 2 109 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 1540 0 0
"3307" "exp3" 2 110 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2289 67 1
"3307" "exp3" 2 111 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1873 19 1
"3307" "exp3" 2 112 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 2191 76 1
"3307" "exp3" 2 113 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 1974 0 0
"3307" "exp3" 2 114 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2082 0 0
"3307" "exp3" 2 115 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 1504 0 0
"3307" "exp3" 2 116 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 5891 0 0
"3307" "exp3" 2 117 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2483 33 1
"3307" "exp3" 2 118 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1684 0 0
"3307" "exp3" 2 119 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1577 76 1
"3307" "exp3" 2 120 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 918 77 1
"3307" "exp3" 2 121 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 486 21 1
"3307" "exp3" 2 122 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1041 38 1
"3307" "exp3" 2 123 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 2333 0 0
"3307" "exp3" 2 124 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 853 0 0
"3307" "exp3" 2 125 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 998 0 0
"3307" "exp3" 2 126 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 569 53 1
"3307" "exp3" 2 127 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1176 0 0
"3307" "exp3" 2 128 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 861 69 1
"3307" "exp3" 2 129 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 696 0 0
"3307" "exp3" 2 130 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1445 0 0
"3307" "exp3" 2 131 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 912 0 0
"3307" "exp3" 2 132 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 4170 18 1
"3307" "exp3" 1 1 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 1584 0 0
"3307" "exp3" 1 2 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1346 0 0
"3307" "exp3" 1 3 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 5773 65 1
"3307" "exp3" 1 4 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 2396 0 0
"3307" "exp3" 1 5 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 3015 0 0
"3307" "exp3" 1 6 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 2545 5 1
"3307" "exp3" 1 7 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 2698 0 0
"3307" "exp3" 1 8 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 3494 19 1
"3307" "exp3" 1 9 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 2285 0 0
"3307" "exp3" 1 10 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1650 11 1
"3307" "exp3" 1 11 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1834 87 1
"3307" "exp3" 1 12 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 2342 0 0
"3307" "exp3" 1 13 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 1979 78 1
"3307" "exp3" 1 14 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2362 0 0
"3307" "exp3" 1 15 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1105 0 0
"3307" "exp3" 1 16 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1665 0 0
"3307" "exp3" 1 17 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 2480 18 1
"3307" "exp3" 1 18 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 3273 27 1
"3307" "exp3" 1 19 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 2627 85 1
"3307" "exp3" 1 20 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 2204 0 0
"3307" "exp3" 1 21 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1428 30 1
"3307" "exp3" 1 22 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1764 0 0
"3307" "exp3" 1 23 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 915 0 0
"3307" "exp3" 1 24 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1491 18 1
"3307" "exp3" 1 25 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 2382 0 0
"3307" "exp3" 1 26 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1936 0 0
"3307" "exp3" 1 27 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 3301 0 0
"3307" "exp3" 1 28 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 2245 0 0
"3307" "exp3" 1 29 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1627 0 0
"3307" "exp3" 1 30 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1545 30 1
"3307" "exp3" 1 31 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 3735 0 0
"3307" "exp3" 1 32 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 2478 9 1
"3307" "exp3" 1 33 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2297 36 1
"3307" "exp3" 1 34 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1579 13 1
"3307" "exp3" 1 35 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 986 28 1
"3307" "exp3" 1 36 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 6694 0 0
"3307" "exp3" 1 37 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 1099 72 1
"3307" "exp3" 1 38 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1684 19 1
"3307" "exp3" 1 39 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 2528 75 1
"3307" "exp3" 1 40 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 2306 61 1
"3307" "exp3" 1 41 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 2829 0 0
"3307" "exp3" 1 42 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1868 86 1
"3307" "exp3" 1 43 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 2123 0 0
"3307" "exp3" 1 44 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1620 32 1
"3307" "exp3" 1 45 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2186 0 0
"3307" "exp3" 1 46 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2533 38 1
"3307" "exp3" 1 47 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1790 19 1
"3307" "exp3" 1 48 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1082 0 0
"3307" "exp3" 1 49 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 773 0 0
"3307" "exp3" 1 50 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1109 22 1
"3307" "exp3" 1 51 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 945 0 0
"3307" "exp3" 1 52 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 400 0 0
"3307" "exp3" 1 53 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 392 17 1
"3307" "exp3" 1 54 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1047 43 1
"3307" "exp3" 1 55 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1455 86 1
"3307" "exp3" 1 56 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1484 0 0
"3307" "exp3" 1 57 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 1499 0 0
"3307" "exp3" 1 58 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 2387 25 1
"3307" "exp3" 1 59 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 869 20 1
"3307" "exp3" 1 60 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 1644 0 0
"3307" "exp3" 1 61 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 6059 0 0
"3307" "exp3" 1 62 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 1197 0 0
"3307" "exp3" 1 63 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 2006 0 0
"3307" "exp3" 1 64 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 751 0 0
"3307" "exp3" 1 65 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1707 0 0
"3307" "exp3" 1 66 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1013 0 0
"3307" "exp3" 1 67 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 538 0 0
"3307" "exp3" 1 68 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 485 34 1
"3307" "exp3" 1 69 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 282 0 0
"3307" "exp3" 1 70 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1706 35 1
"3307" "exp3" 1 71 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 1693 0 0
"3307" "exp3" 1 72 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1255 0 0
"3307" "exp3" 1 73 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1323 0 0
"3307" "exp3" 1 74 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 991 0 0
"3307" "exp3" 1 75 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1474 24 1
"3307" "exp3" 1 76 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 5551 2 1
"3307" "exp3" 1 77 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2223 20 1
"3307" "exp3" 1 78 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 6498 13 1
"3307" "exp3" 1 79 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1570 40 1
"3307" "exp3" 1 80 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1651 25 1
"3307" "exp3" 1 81 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1392 37 1
"3307" "exp3" 1 82 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1214 74 1
"3307" "exp3" 1 83 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1413 0 0
"3307" "exp3" 1 84 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 512 0 0
"3307" "exp3" 1 85 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1607 27 1
"3307" "exp3" 1 86 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 695 69 1
"3307" "exp3" 1 87 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 6341 49 1
"3307" "exp3" 1 88 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 4604 0 0
"3307" "exp3" 1 89 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1941 0 0
"3307" "exp3" 1 90 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 601 25 1
"3307" "exp3" 1 91 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 4384 73 1
"3307" "exp3" 1 92 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1588 0 0
"3307" "exp3" 1 93 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1526 72 1
"3307" "exp3" 1 94 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2190 0 0
"3307" "exp3" 1 95 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1518 0 0
"3307" "exp3" 1 96 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1834 45 1
"3307" "exp3" 1 97 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1561 0 0
"3307" "exp3" 1 98 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 838 0 0
"3307" "exp3" 1 99 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1596 0 0
"3307" "exp3" 1 100 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 1410 0 0
"3307" "exp3" 1 101 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 939 0 0
"3307" "exp3" 1 102 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 4885 0 0
"3307" "exp3" 1 103 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1149 78 1
"3307" "exp3" 1 104 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 2113 0 0
"3307" "exp3" 1 105 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 2655 0 0
"3307" "exp3" 1 106 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 5447 7 1
"3307" "exp3" 1 107 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1399 0 0
"3307" "exp3" 1 108 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 1781 56 1
"3307" "exp3" 1 109 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 682 6 1
"3307" "exp3" 1 110 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1426 0 0
"3307" "exp3" 1 111 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1071 36 1
"3307" "exp3" 1 112 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1156 38 1
"3307" "exp3" 1 113 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 1078 67 1
"3307" "exp3" 1 114 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1509 0 0
"3307" "exp3" 1 115 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 12528 0 0
"3307" "exp3" 1 116 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1842 21 1
"3307" "exp3" 1 117 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2036 34 1
"3307" "exp3" 1 118 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1952 0 0
"3307" "exp3" 1 119 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1894 0 0
"3307" "exp3" 1 120 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1533 0 0
"3307" "exp3" 1 121 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1013 0 0
"3307" "exp3" 1 122 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2175 0 0
"3307" "exp3" 1 123 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1620 0 0
"3307" "exp3" 1 124 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1177 68 1
"3307" "exp3" 1 125 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1105 64 1
"3307" "exp3" 1 126 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 781 0 0
"3307" "exp3" 1 127 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 2905 23 1
"3307" "exp3" 1 128 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1395 0 0
"3307" "exp3" 1 129 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 1038 0 0
"3307" "exp3" 1 130 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 805 0 0
"3307" "exp3" 1 131 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1349 0 0
"3307" "exp3" 1 132 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2062 0 0
"3307" "exp3" 2 1 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 949 0 0
"3307" "exp3" 2 2 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 1225 67 1
"3307" "exp3" 2 3 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1043 27 1
"3307" "exp3" 2 4 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 377 32 1
"3307" "exp3" 2 5 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1047 0 0
"3307" "exp3" 2 6 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1041 80 1
"3307" "exp3" 2 7 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1355 77 1
"3307" "exp3" 2 8 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 891 0 0
"3307" "exp3" 2 9 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 947 0 0
"3307" "exp3" 2 10 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 1543 65 1
"3307" "exp3" 2 11 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1351 69 1
"3307" "exp3" 2 12 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1388 10 1
"3307" "exp3" 2 13 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1210 0 0
"3307" "exp3" 2 14 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2134 86 1
"3307" "exp3" 2 15 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2210 0 0
"3307" "exp3" 2 16 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1412 20 1
"3307" "exp3" 2 17 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1294 0 0
"3307" "exp3" 2 18 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2294 0 0
"3307" "exp3" 2 19 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 832 0 0
"3307" "exp3" 2 20 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1050 78 1
"3307" "exp3" 2 21 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1135 0 0
"3307" "exp3" 2 22 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 583 39 1
"3307" "exp3" 2 23 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1286 37 1
"3307" "exp3" 2 24 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1002 0 0
"3307" "exp3" 2 25 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1924 84 1
"3307" "exp3" 2 26 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2781 0 0
"3307" "exp3" 2 27 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 4896 8 1
"3307" "exp3" 2 28 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 524 66 1
"3307" "exp3" 2 29 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 891 0 0
"3307" "exp3" 2 30 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 817 28 1
"3307" "exp3" 2 31 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 756 0 0
"3307" "exp3" 2 32 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 1565 0 0
"3307" "exp3" 2 33 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1151 0 0
"3307" "exp3" 2 34 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1102 76 1
"3307" "exp3" 2 35 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 1093 0 0
"3307" "exp3" 2 36 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 983 43 1
"3307" "exp3" 2 37 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 940 0 0
"3307" "exp3" 2 38 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1589 19 1
"3307" "exp3" 2 39 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 2249 65 1
"3307" "exp3" 2 40 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 1033 0 0
"3307" "exp3" 2 41 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1860 0 0
"3307" "exp3" 2 42 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 2098 0 0
"3307" "exp3" 2 43 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 2411 31 1
"3307" "exp3" 2 44 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2615 0 0
"3307" "exp3" 2 45 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2016 33 1
"3307" "exp3" 2 46 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1839 0 0
"3307" "exp3" 2 47 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1309 0 0
"3307" "exp3" 2 48 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1762 36 1
"3307" "exp3" 2 49 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1797 0 0
"3307" "exp3" 2 50 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 2415 25 1
"3307" "exp3" 2 51 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1518 0 0
"3307" "exp3" 2 52 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1877 0 0
"3307" "exp3" 2 53 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 2155 75 1
"3307" "exp3" 2 54 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2468 42 1
"3307" "exp3" 2 55 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 2322 0 0
"3307" "exp3" 2 56 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1178 44 1
"3307" "exp3" 2 57 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 587 0 0
"3307" "exp3" 2 58 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 730 0 0
"3307" "exp3" 2 59 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 501 35 1
"3307" "exp3" 2 60 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 410 30 1
"3307" "exp3" 2 61 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 515 0 0
"3307" "exp3" 2 62 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1445 13 1
"3307" "exp3" 2 63 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 964 28 1
"3307" "exp3" 2 64 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 653 89 1
"3307" "exp3" 2 65 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 293 13 1
"3307" "exp3" 2 66 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 311 29 1
"3307" "exp3" 2 67 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 647 0 0
"3307" "exp3" 2 68 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 379 30 1
"3307" "exp3" 2 69 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 638 0 0
"3307" "exp3" 2 70 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 656 11 1
"3307" "exp3" 2 71 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1042 0 0
"3307" "exp3" 2 72 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 1468 60 1
"3307" "exp3" 2 73 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1132 0 0
"3307" "exp3" 2 74 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 326 0 0
"3307" "exp3" 2 75 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 520 0 0
"3307" "exp3" 2 76 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 327 22 1
"3307" "exp3" 2 77 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 374 19 1
"3307" "exp3" 2 78 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 165 0 0
"3307" "exp3" 2 79 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 176 0 0
"3307" "exp3" 2 80 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 310 27 1
"3307" "exp3" 2 81 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 340 74 1
"3307" "exp3" 2 82 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 407 0 0
"3307" "exp3" 2 83 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 326 0 0
"3307" "exp3" 2 84 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 299 1 1
"3307" "exp3" 2 85 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 1000 0 0
"3307" "exp3" 2 86 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 1195 0 0
"3307" "exp3" 2 87 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 710 12 1
"3307" "exp3" 2 88 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 355 66 1
"3307" "exp3" 2 89 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1481 29 1
"3307" "exp3" 2 90 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1611 19 1
"3307" "exp3" 2 91 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2653 38 1
"3307" "exp3" 2 92 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1654 0 0
"3307" "exp3" 2 93 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1104 16 1
"3307" "exp3" 2 94 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 2728 79 1
"3307" "exp3" 2 95 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 1174 0 0
"3307" "exp3" 2 96 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 2657 0 0
"3307" "exp3" 2 97 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1409 0 0
"3307" "exp3" 2 98 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 422 39 1
"3307" "exp3" 2 99 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 706 0 0
"3307" "exp3" 2 100 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 836 88 1
"3307" "exp3" 2 101 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 345 0 0
"3307" "exp3" 2 102 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 709 68 1
"3307" "exp3" 2 103 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 331 0 0
"3307" "exp3" 2 104 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 333 22 1
"3307" "exp3" 2 105 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1077 0 0
"3307" "exp3" 2 106 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 534 0 0
"3307" "exp3" 2 107 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1070 85 1
"3307" "exp3" 2 108 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 390 26 1
"3307" "exp3" 2 109 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 456 0 0
"3307" "exp3" 2 110 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 564 36 1
"3307" "exp3" 2 111 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 846 0 0
"3307" "exp3" 2 112 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1355 0 0
"3307" "exp3" 2 113 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1375 0 0
"3307" "exp3" 2 114 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 971 9 1
"3307" "exp3" 2 115 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 342 0 0
"3307" "exp3" 2 116 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 1584 0 0
"3307" "exp3" 2 117 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 562 23 1
"3307" "exp3" 2 118 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 249 0 0
"3307" "exp3" 2 119 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 305 9 1
"3307" "exp3" 2 120 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 332 37 1
"3307" "exp3" 2 121 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 331 0 0
"3307" "exp3" 2 122 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 314 74 1
"3307" "exp3" 2 123 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 943 0 0
"3307" "exp3" 2 124 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 850 18 1
"3307" "exp3" 2 125 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 394 33 1
"3307" "exp3" 2 126 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 411 55 1
"3307" "exp3" 2 127 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 1110 59 1
"3307" "exp3" 2 128 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1379 0 0
"3307" "exp3" 2 129 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 519 82 1
"3307" "exp3" 2 130 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 548 0 0
"3307" "exp3" 2 131 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 277 0 0
"3307" "exp3" 2 132 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 278 0 0
"3308" "exp3" 1 1 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2135 0 0
"3308" "exp3" 1 2 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2594 0 0
"3308" "exp3" 1 3 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 3105 0 0
"3308" "exp3" 1 4 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2563 13 1
"3308" "exp3" 1 5 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 2801 0 0
"3308" "exp3" 1 6 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2769 0 0
"3308" "exp3" 1 7 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 2771 0 0
"3308" "exp3" 1 8 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 2755 24 1
"3308" "exp3" 1 9 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 3661 31 1
"3308" "exp3" 1 10 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 2266 0 0
"3308" "exp3" 1 11 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 4215 18 1
"3308" "exp3" 1 12 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 3418 0 0
"3308" "exp3" 1 13 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1602 14 1
"3308" "exp3" 1 14 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 3157 0 0
"3308" "exp3" 1 15 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 3495 10 1
"3308" "exp3" 1 16 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 3768 36 1
"3308" "exp3" 1 17 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 1571 0 0
"3308" "exp3" 1 18 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2987 0 0
"3308" "exp3" 1 19 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2020 0 0
"3308" "exp3" 1 20 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 3012 28 1
"3308" "exp3" 1 21 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 2803 0 0
"3308" "exp3" 1 22 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2283 0 0
"3308" "exp3" 1 23 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 4181 54 1
"3308" "exp3" 1 24 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 2845 0 0
"3308" "exp3" 1 25 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2889 0 0
"3308" "exp3" 1 26 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 6352 17 1
"3308" "exp3" 1 27 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 3238 43 1
"3308" "exp3" 1 28 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1890 0 0
"3308" "exp3" 1 29 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 5075 27 1
"3308" "exp3" 1 30 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 3122 71 1
"3308" "exp3" 1 31 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 2455 78 1
"3308" "exp3" 1 32 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1793 79 1
"3308" "exp3" 1 33 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1985 0 0
"3308" "exp3" 1 34 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 3165 34 1
"3308" "exp3" 1 35 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 2353 26 1
"3308" "exp3" 1 36 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 3742 0 0
"3308" "exp3" 1 37 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 2038 0 0
"3308" "exp3" 1 38 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 2259 0 0
"3308" "exp3" 1 39 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 5210 0 0
"3308" "exp3" 1 40 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 2402 0 0
"3308" "exp3" 1 41 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1098 21 1
"3308" "exp3" 1 42 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 3565 14 1
"3308" "exp3" 1 43 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2741 0 0
"3308" "exp3" 1 44 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 3500 0 0
"3308" "exp3" 1 45 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2035 32 1
"3308" "exp3" 1 46 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 4584 73 1
"3308" "exp3" 1 47 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2474 0 0
"3308" "exp3" 1 48 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 2769 0 0
"3308" "exp3" 1 49 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 4266 0 0
"3308" "exp3" 1 50 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1901 0 0
"3308" "exp3" 1 51 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1688 0 0
"3308" "exp3" 1 52 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2783 43 1
"3308" "exp3" 1 53 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1794 99 1
"3308" "exp3" 1 54 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 6387 19 1
"3308" "exp3" 1 55 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1524 0 0
"3308" "exp3" 1 56 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 3391 0 0
"3308" "exp3" 1 57 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 4556 77 1
"3308" "exp3" 1 58 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2824 22 1
"3308" "exp3" 1 59 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 2373 0 0
"3308" "exp3" 1 60 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 6712 0 0
"3308" "exp3" 1 61 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 2000 84 1
"3308" "exp3" 1 62 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 8013 72 1
"3308" "exp3" 1 63 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 2283 0 0
"3308" "exp3" 1 64 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 2209 0 0
"3308" "exp3" 1 65 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 2116 67 1
"3308" "exp3" 1 66 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 2647 23 1
"3308" "exp3" 1 67 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 3707 0 0
"3308" "exp3" 1 68 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 5050 36 1
"3308" "exp3" 1 69 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2645 32 1
"3308" "exp3" 1 70 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 3275 18 1
"3308" "exp3" 1 71 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 4170 0 0
"3308" "exp3" 1 72 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2798 0 0
"3308" "exp3" 1 73 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 3095 15 1
"3308" "exp3" 1 74 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2630 44 1
"3308" "exp3" 1 75 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 3444 0 0
"3308" "exp3" 1 76 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 3127 64 1
"3308" "exp3" 1 77 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 4312 0 0
"3308" "exp3" 1 78 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2735 0 0
"3308" "exp3" 1 79 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 3303 39 1
"3308" "exp3" 1 80 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1951 20 1
"3308" "exp3" 1 81 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 5109 0 0
"3308" "exp3" 1 82 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 7015 28 1
"3308" "exp3" 1 83 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 3944 0 0
"3308" "exp3" 1 84 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 3353 0 0
"3308" "exp3" 1 85 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 8561 26 1
"3308" "exp3" 1 86 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 3969 0 0
"3308" "exp3" 1 87 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 4098 0 0
"3308" "exp3" 1 88 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 3429 0 0
"3308" "exp3" 1 89 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 6386 0 0
"3308" "exp3" 1 90 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2170 16 1
"3308" "exp3" 1 91 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 4962 0 0
"3308" "exp3" 1 92 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 4140 0 0
"3308" "exp3" 1 93 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 6167 0 0
"3308" "exp3" 1 94 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 4143 31 1
"3308" "exp3" 1 95 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 4610 0 0
"3308" "exp3" 1 96 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 3076 89 1
"3308" "exp3" 1 97 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 9108 45 1
"3308" "exp3" 1 98 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 2770 83 1
"3308" "exp3" 1 99 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 3998 17 1
"3308" "exp3" 1 100 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 5227 70 1
"3308" "exp3" 1 101 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1890 0 0
"3308" "exp3" 1 102 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 2711 23 1
"3308" "exp3" 1 103 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2328 21 1
"3308" "exp3" 1 104 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2359 0 0
"3308" "exp3" 1 105 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 2843 35 1
"3308" "exp3" 1 106 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 6710 0 0
"3308" "exp3" 1 107 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 5101 37 1
"3308" "exp3" 1 108 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 3846 0 0
"3308" "exp3" 1 109 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 6913 0 0
"3308" "exp3" 1 110 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 4730 18 1
"3308" "exp3" 1 111 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 3057 25 1
"3308" "exp3" 1 112 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 3981 48 1
"3308" "exp3" 1 113 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 3977 0 0
"3308" "exp3" 1 114 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 2717 15 1
"3308" "exp3" 1 115 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2041 41 1
"3308" "exp3" 1 116 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 4169 19 1
"3308" "exp3" 1 117 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 4238 22 1
"3308" "exp3" 1 118 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 12900 41 1
"3308" "exp3" 1 119 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 2707 0 0
"3308" "exp3" 1 120 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 3467 20 1
"3308" "exp3" 1 121 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2475 0 0
"3308" "exp3" 1 122 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 5368 37 1
"3308" "exp3" 1 123 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 2395 0 0
"3308" "exp3" 1 124 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 3204 0 0
"3308" "exp3" 1 125 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 5448 27 1
"3308" "exp3" 1 126 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 3048 0 0
"3308" "exp3" 1 127 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2690 96 1
"3308" "exp3" 1 128 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 7870 26 1
"3308" "exp3" 1 129 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 3041 0 0
"3308" "exp3" 1 130 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 13681 0 0
"3308" "exp3" 1 131 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 3792 94 1
"3308" "exp3" 1 132 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 3383 21 1
"3308" "exp3" 2 1 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 4226 0 0
"3308" "exp3" 2 2 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 2575 0 0
"3308" "exp3" 2 3 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 3423 0 0
"3308" "exp3" 2 4 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 2703 0 0
"3308" "exp3" 2 5 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 11099 0 0
"3308" "exp3" 2 6 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 8306 0 0
"3308" "exp3" 2 7 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 2197 23 1
"3308" "exp3" 2 8 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 2263 0 0
"3308" "exp3" 2 9 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 3956 0 0
"3308" "exp3" 2 10 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 2220 0 0
"3308" "exp3" 2 11 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 4105 0 0
"3308" "exp3" 2 12 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 2401 45 1
"3308" "exp3" 2 13 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 2403 0 0
"3308" "exp3" 2 14 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 6431 31 1
"3308" "exp3" 2 15 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 9624 0 0
"3308" "exp3" 2 16 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2439 37 1
"3308" "exp3" 2 17 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2822 26 1
"3308" "exp3" 2 18 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 14838 0 0
"3308" "exp3" 2 19 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1202 0 0
"3308" "exp3" 2 20 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1580 78 1
"3308" "exp3" 2 21 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 2697 78 1
"3308" "exp3" 2 22 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 3897 28 1
"3308" "exp3" 2 23 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 4106 0 0
"3308" "exp3" 2 24 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2859 72 1
"3308" "exp3" 2 25 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 4036 35 1
"3308" "exp3" 2 26 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2117 0 0
"3308" "exp3" 2 27 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2229 0 0
"3308" "exp3" 2 28 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 2008 0 0
"3308" "exp3" 2 29 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2705 0 0
"3308" "exp3" 2 30 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 7971 0 0
"3308" "exp3" 2 31 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 2696 29 1
"3308" "exp3" 2 32 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 3450 28 1
"3308" "exp3" 2 33 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 2482 21 1
"3308" "exp3" 2 34 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 4940 25 1
"3308" "exp3" 2 35 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2215 0 0
"3308" "exp3" 2 36 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 6489 67 1
"3308" "exp3" 2 37 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 3244 15 1
"3308" "exp3" 2 38 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3558 67 1
"3308" "exp3" 2 39 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2497 42 1
"3308" "exp3" 2 40 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 3352 84 1
"3308" "exp3" 2 41 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 3110 20 1
"3308" "exp3" 2 42 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2181 0 0
"3308" "exp3" 2 43 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 7768 0 0
"3308" "exp3" 2 44 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1989 92 1
"3308" "exp3" 2 45 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 1137 0 0
"3308" "exp3" 2 46 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 909 0 0
"3308" "exp3" 2 47 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2695 41 1
"3308" "exp3" 2 48 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1494 0 0
"3308" "exp3" 2 49 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 1534 0 0
"3308" "exp3" 2 50 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 4496 0 0
"3308" "exp3" 2 51 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1332 20 1
"3308" "exp3" 2 52 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2150 34 1
"3308" "exp3" 2 53 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1797 0 0
"3308" "exp3" 2 54 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 8061 0 0
"3308" "exp3" 2 55 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 2304 0 0
"3308" "exp3" 2 56 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1440 24 1
"3308" "exp3" 2 57 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1890 44 1
"3308" "exp3" 2 58 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 1456 0 0
"3308" "exp3" 2 59 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 2095 0 0
"3308" "exp3" 2 60 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2998 0 0
"3308" "exp3" 2 61 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 2470 35 1
"3308" "exp3" 2 62 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2541 39 1
"3308" "exp3" 2 63 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 2610 87 1
"3308" "exp3" 2 64 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1899 25 1
"3308" "exp3" 2 65 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 3397 0 0
"3308" "exp3" 2 66 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 3763 0 0
"3308" "exp3" 2 67 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 2201 27 1
"3308" "exp3" 2 68 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 3646 77 1
"3308" "exp3" 2 69 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1908 0 0
"3308" "exp3" 2 70 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 3487 23 1
"3308" "exp3" 2 71 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1619 0 0
"3308" "exp3" 2 72 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 5809 0 0
"3308" "exp3" 2 73 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1738 43 1
"3308" "exp3" 2 74 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 2754 0 0
"3308" "exp3" 2 75 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1989 0 0
"3308" "exp3" 2 76 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 3414 29 1
"3308" "exp3" 2 77 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1790 0 0
"3308" "exp3" 2 78 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1490 0 0
"3308" "exp3" 2 79 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 2191 21 1
"3308" "exp3" 2 80 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1521 0 0
"3308" "exp3" 2 81 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1625 31 1
"3308" "exp3" 2 82 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1851 0 0
"3308" "exp3" 2 83 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1786 0 0
"3308" "exp3" 2 84 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 3065 24 1
"3308" "exp3" 2 85 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 2012 0 0
"3308" "exp3" 2 86 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1917 0 0
"3308" "exp3" 2 87 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1437 33 1
"3308" "exp3" 2 88 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 2347 21 1
"3308" "exp3" 2 89 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1149 0 0
"3308" "exp3" 2 90 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1428 32 1
"3308" "exp3" 2 91 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1415 0 0
"3308" "exp3" 2 92 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 2256 39 1
"3308" "exp3" 2 93 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2667 64 1
"3308" "exp3" 2 94 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1842 0 0
"3308" "exp3" 2 95 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1651 0 0
"3308" "exp3" 2 96 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 3536 42 1
"3308" "exp3" 2 97 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2408 30 1
"3308" "exp3" 2 98 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 2408 48 1
"3308" "exp3" 2 99 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1543 0 0
"3308" "exp3" 2 100 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 4663 27 1
"3308" "exp3" 2 101 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 4227 31 1
"3308" "exp3" 2 102 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2378 38 1
"3308" "exp3" 2 103 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1983 0 0
"3308" "exp3" 2 104 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1436 0 0
"3308" "exp3" 2 105 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 3101 40 1
"3308" "exp3" 2 106 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 6056 0 0
"3308" "exp3" 2 107 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1885 32 1
"3308" "exp3" 2 108 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 1679 0 0
"3308" "exp3" 2 109 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 4052 15 1
"3308" "exp3" 2 110 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 2205 0 0
"3308" "exp3" 2 111 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 2385 83 1
"3308" "exp3" 2 112 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2251 30 1
"3308" "exp3" 2 113 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 2069 81 1
"3308" "exp3" 2 114 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 4211 32 1
"3308" "exp3" 2 115 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2398 20 1
"3308" "exp3" 2 116 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1780 0 0
"3308" "exp3" 2 117 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2513 0 0
"3308" "exp3" 2 118 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1116 0 0
"3308" "exp3" 2 119 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 1246 80 1
"3308" "exp3" 2 120 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 1698 0 0
"3308" "exp3" 2 121 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 3238 0 0
"3308" "exp3" 2 122 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 2781 88 1
"3308" "exp3" 2 123 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1544 0 0
"3308" "exp3" 2 124 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 2913 17 1
"3308" "exp3" 2 125 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2177 47 1
"3308" "exp3" 2 126 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1496 97 1
"3308" "exp3" 2 127 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1716 46 1
"3308" "exp3" 2 128 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 3411 24 1
"3308" "exp3" 2 129 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1668 21 1
"3308" "exp3" 2 130 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 4063 0 0
"3308" "exp3" 2 131 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2259 0 0
"3308" "exp3" 2 132 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 987 96 1
"3308" "exp3" 1 1 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1366 0 0
"3308" "exp3" 1 2 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1167 33 1
"3308" "exp3" 1 3 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1682 0 0
"3308" "exp3" 1 4 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 2453 0 0
"3308" "exp3" 1 5 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 766 22 1
"3308" "exp3" 1 6 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1335 26 1
"3308" "exp3" 1 7 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 599 24 1
"3308" "exp3" 1 8 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 702 26 1
"3308" "exp3" 1 9 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1679 28 1
"3308" "exp3" 1 10 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 2657 0 0
"3308" "exp3" 1 11 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 808 19 1
"3308" "exp3" 1 12 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 4096 37 1
"3308" "exp3" 1 13 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1936 42 1
"3308" "exp3" 1 14 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1489 22 1
"3308" "exp3" 1 15 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 3084 29 1
"3308" "exp3" 1 16 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 912 0 0
"3308" "exp3" 1 17 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1625 13 1
"3308" "exp3" 1 18 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 805 8 1
"3308" "exp3" 1 19 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2115 0 0
"3308" "exp3" 1 20 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1281 28 1
"3308" "exp3" 1 21 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 3994 0 0
"3308" "exp3" 1 22 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1165 28 1
"3308" "exp3" 1 23 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1183 0 0
"3308" "exp3" 1 24 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1286 0 0
"3308" "exp3" 1 25 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1893 0 0
"3308" "exp3" 1 26 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1279 0 0
"3308" "exp3" 1 27 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 1112 5 1
"3308" "exp3" 1 28 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 3083 25 1
"3308" "exp3" 1 29 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1003 21 1
"3308" "exp3" 1 30 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 932 0 0
"3308" "exp3" 1 31 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 677 20 1
"3308" "exp3" 1 32 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1595 0 0
"3308" "exp3" 1 33 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1328 33 1
"3308" "exp3" 1 34 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1555 39 1
"3308" "exp3" 1 35 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1575 6 1
"3308" "exp3" 1 36 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1808 7 1
"3308" "exp3" 1 37 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1824 35 1
"3308" "exp3" 1 38 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 2062 13 1
"3308" "exp3" 1 39 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1114 0 0
"3308" "exp3" 1 40 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 3011 34 1
"3308" "exp3" 1 41 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 928 27 1
"3308" "exp3" 1 42 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1720 75 1
"3308" "exp3" 1 43 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1917 70 1
"3308" "exp3" 1 44 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1980 0 0
"3308" "exp3" 1 45 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2559 19 1
"3308" "exp3" 1 46 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 950 4 1
"3308" "exp3" 1 47 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 2304 0 0
"3308" "exp3" 1 48 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 2784 34 1
"3308" "exp3" 1 49 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 1340 5 1
"3308" "exp3" 1 50 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1331 14 1
"3308" "exp3" 1 51 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 3038 22 1
"3308" "exp3" 1 52 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1175 35 1
"3308" "exp3" 1 53 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1208 0 0
"3308" "exp3" 1 54 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1553 0 0
"3308" "exp3" 1 55 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 2756 0 0
"3308" "exp3" 1 56 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1513 0 0
"3308" "exp3" 1 57 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 3082 68 1
"3308" "exp3" 1 58 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1096 25 1
"3308" "exp3" 1 59 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 2263 18 1
"3308" "exp3" 1 60 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1359 0 0
"3308" "exp3" 1 61 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 2287 0 0
"3308" "exp3" 1 62 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 2557 29 1
"3308" "exp3" 1 63 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1366 30 1
"3308" "exp3" 1 64 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 2641 84 1
"3308" "exp3" 1 65 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1823 0 0
"3308" "exp3" 1 66 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2788 44 1
"3308" "exp3" 1 67 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1097 29 1
"3308" "exp3" 1 68 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 2368 17 1
"3308" "exp3" 1 69 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 980 20 1
"3308" "exp3" 1 70 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1108 48 1
"3308" "exp3" 1 71 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1669 0 0
"3308" "exp3" 1 72 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 2088 0 0
"3308" "exp3" 1 73 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 936 0 0
"3308" "exp3" 1 74 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1313 40 1
"3308" "exp3" 1 75 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1892 0 0
"3308" "exp3" 1 76 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1862 44 1
"3308" "exp3" 1 77 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1070 38 1
"3308" "exp3" 1 78 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1371 36 1
"3308" "exp3" 1 79 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 2641 0 0
"3308" "exp3" 1 80 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 920 17 1
"3308" "exp3" 1 81 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 2536 74 1
"3308" "exp3" 1 82 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 2227 0 0
"3308" "exp3" 1 83 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 3774 60 1
"3308" "exp3" 1 84 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 3834 21 1
"3308" "exp3" 1 85 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1157 28 1
"3308" "exp3" 1 86 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 4137 33 1
"3308" "exp3" 1 87 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 879 30 1
"3308" "exp3" 1 88 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1711 0 0
"3308" "exp3" 1 89 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 2161 0 0
"3308" "exp3" 1 90 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 2029 0 0
"3308" "exp3" 1 91 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 2252 34 1
"3308" "exp3" 1 92 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 3698 10 1
"3308" "exp3" 1 93 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 3098 49 1
"3308" "exp3" 1 94 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 4818 0 0
"3308" "exp3" 1 95 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 2655 63 1
"3308" "exp3" 1 96 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1671 16 1
"3308" "exp3" 1 97 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1312 35 1
"3308" "exp3" 1 98 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1731 41 1
"3308" "exp3" 1 99 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2111 18 1
"3308" "exp3" 1 100 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 4499 8 1
"3308" "exp3" 1 101 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1209 23 1
"3308" "exp3" 1 102 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1231 0 0
"3308" "exp3" 1 103 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1168 32 1
"3308" "exp3" 1 104 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 2124 38 1
"3308" "exp3" 1 105 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 837 0 0
"3308" "exp3" 1 106 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1412 0 0
"3308" "exp3" 1 107 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 884 21 1
"3308" "exp3" 1 108 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1445 43 1
"3308" "exp3" 1 109 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 996 36 1
"3308" "exp3" 1 110 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1024 39 1
"3308" "exp3" 1 111 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 717 42 1
"3308" "exp3" 1 112 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1014 0 0
"3308" "exp3" 1 113 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1256 26 1
"3308" "exp3" 1 114 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1027 24 1
"3308" "exp3" 1 115 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 861 17 1
"3308" "exp3" 1 116 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1117 32 1
"3308" "exp3" 1 117 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1676 0 0
"3308" "exp3" 1 118 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 707 9 1
"3308" "exp3" 1 119 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1214 24 1
"3308" "exp3" 1 120 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2093 67 1
"3308" "exp3" 1 121 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1624 0 0
"3308" "exp3" 1 122 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1440 20 1
"3308" "exp3" 1 123 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1096 27 1
"3308" "exp3" 1 124 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 2338 27 1
"3308" "exp3" 1 125 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 2976 11 1
"3308" "exp3" 1 126 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1048 0 0
"3308" "exp3" 1 127 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1463 17 1
"3308" "exp3" 1 128 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 999 0 0
"3308" "exp3" 1 129 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1252 15 1
"3308" "exp3" 1 130 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1549 23 1
"3308" "exp3" 1 131 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 917 0 0
"3308" "exp3" 1 132 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1176 0 0
"3308" "exp3" 2 1 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 2835 11 1
"3308" "exp3" 2 2 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1148 19 1
"3308" "exp3" 2 3 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1239 16 1
"3308" "exp3" 2 4 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 826 0 0
"3308" "exp3" 2 5 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1252 0 0
"3308" "exp3" 2 6 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1300 0 0
"3308" "exp3" 2 7 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1187 32 1
"3308" "exp3" 2 8 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 912 0 0
"3308" "exp3" 2 9 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 705 24 1
"3308" "exp3" 2 10 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1400 0 0
"3308" "exp3" 2 11 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 3188 39 1
"3308" "exp3" 2 12 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1286 16 1
"3308" "exp3" 2 13 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 2037 0 0
"3308" "exp3" 2 14 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1171 20 1
"3308" "exp3" 2 15 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1639 0 0
"3308" "exp3" 2 16 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 852 28 1
"3308" "exp3" 2 17 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 2065 0 0
"3308" "exp3" 2 18 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 724 0 0
"3308" "exp3" 2 19 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 704 36 1
"3308" "exp3" 2 20 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1158 35 1
"3308" "exp3" 2 21 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1029 20 1
"3308" "exp3" 2 22 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1484 32 1
"3308" "exp3" 2 23 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1468 13 1
"3308" "exp3" 2 24 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1199 0 0
"3308" "exp3" 2 25 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 933 29 1
"3308" "exp3" 2 26 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1205 33 1
"3308" "exp3" 2 27 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1098 15 1
"3308" "exp3" 2 28 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1406 10 1
"3308" "exp3" 2 29 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 842 0 0
"3308" "exp3" 2 30 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 908 0 0
"3308" "exp3" 2 31 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1403 31 1
"3308" "exp3" 2 32 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1303 0 0
"3308" "exp3" 2 33 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 805 23 1
"3308" "exp3" 2 34 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 509 9 1
"3308" "exp3" 2 35 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1028 35 1
"3308" "exp3" 2 36 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 580 0 0
"3308" "exp3" 2 37 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 720 37 1
"3308" "exp3" 2 38 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 540 0 0
"3308" "exp3" 2 39 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1000 0 0
"3308" "exp3" 2 40 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 955 0 0
"3308" "exp3" 2 41 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 1412 5 1
"3308" "exp3" 2 42 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1143 0 0
"3308" "exp3" 2 43 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 984 18 1
"3308" "exp3" 2 44 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 891 10 1
"3308" "exp3" 2 45 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 960 24 1
"3308" "exp3" 2 46 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1246 39 1
"3308" "exp3" 2 47 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 946 16 1
"3308" "exp3" 2 48 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1618 8 1
"3308" "exp3" 2 49 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1487 40 1
"3308" "exp3" 2 50 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1201 14 1
"3308" "exp3" 2 51 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 768 42 1
"3308" "exp3" 2 52 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 708 19 1
"3308" "exp3" 2 53 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1573 31 1
"3308" "exp3" 2 54 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1052 0 0
"3308" "exp3" 2 55 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 713 21 1
"3308" "exp3" 2 56 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1327 0 0
"3308" "exp3" 2 57 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1302 27 1
"3308" "exp3" 2 58 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1027 14 1
"3308" "exp3" 2 59 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 685 22 1
"3308" "exp3" 2 60 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 647 21 1
"3308" "exp3" 2 61 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1615 0 0
"3308" "exp3" 2 62 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1072 24 1
"3308" "exp3" 2 63 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1481 33 1
"3308" "exp3" 2 64 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 2398 35 1
"3308" "exp3" 2 65 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1141 45 1
"3308" "exp3" 2 66 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1179 26 1
"3308" "exp3" 2 67 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 4507 96 1
"3308" "exp3" 2 68 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 2810 24 1
"3308" "exp3" 2 69 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 814 38 1
"3308" "exp3" 2 70 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1032 17 1
"3308" "exp3" 2 71 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 861 15 1
"3308" "exp3" 2 72 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1129 34 1
"3308" "exp3" 2 73 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 783 43 1
"3308" "exp3" 2 74 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1013 0 0
"3308" "exp3" 2 75 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1031 17 1
"3308" "exp3" 2 76 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1542 0 0
"3308" "exp3" 2 77 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 801 27 1
"3308" "exp3" 2 78 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 857 0 0
"3308" "exp3" 2 79 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1101 0 0
"3308" "exp3" 2 80 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 748 95 1
"3308" "exp3" 2 81 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1069 0 0
"3308" "exp3" 2 82 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 839 49 1
"3308" "exp3" 2 83 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 1957 17 1
"3308" "exp3" 2 84 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 921 0 0
"3308" "exp3" 2 85 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 959 23 1
"3308" "exp3" 2 86 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 2005 0 0
"3308" "exp3" 2 87 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1804 18 1
"3308" "exp3" 2 88 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1332 0 0
"3308" "exp3" 2 89 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 670 25 1
"3308" "exp3" 2 90 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1847 0 0
"3308" "exp3" 2 91 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 867 19 1
"3308" "exp3" 2 92 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1309 0 0
"3308" "exp3" 2 93 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 954 0 0
"3308" "exp3" 2 94 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1490 43 1
"3308" "exp3" 2 95 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1066 33 1
"3308" "exp3" 2 96 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 782 25 1
"3308" "exp3" 2 97 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1146 25 1
"3308" "exp3" 2 98 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 713 0 0
"3308" "exp3" 2 99 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1447 41 1
"3308" "exp3" 2 100 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 686 34 1
"3308" "exp3" 2 101 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1013 27 1
"3308" "exp3" 2 102 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1271 31 1
"3308" "exp3" 2 103 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 1209 18 1
"3308" "exp3" 2 104 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 754 7 1
"3308" "exp3" 2 105 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 700 19 1
"3308" "exp3" 2 106 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1217 47 1
"3308" "exp3" 2 107 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1349 0 0
"3308" "exp3" 2 108 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1733 44 1
"3308" "exp3" 2 109 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1229 0 0
"3308" "exp3" 2 110 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 854 0 0
"3308" "exp3" 2 111 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1021 41 1
"3308" "exp3" 2 112 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 2062 0 0
"3308" "exp3" 2 113 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 2529 12 1
"3308" "exp3" 2 114 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 5986 0 0
"3308" "exp3" 2 115 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 888 22 1
"3308" "exp3" 2 116 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 582 0 0
"3308" "exp3" 2 117 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 639 0 0
"3308" "exp3" 2 118 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 699 14 1
"3308" "exp3" 2 119 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 652 0 0
"3308" "exp3" 2 120 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1116 26 1
"3308" "exp3" 2 121 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1831 0 0
"3308" "exp3" 2 122 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 772 0 0
"3308" "exp3" 2 123 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1119 21 1
"3308" "exp3" 2 124 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1027 0 0
"3308" "exp3" 2 125 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1635 0 0
"3308" "exp3" 2 126 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 644 21 1
"3308" "exp3" 2 127 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 669 22 1
"3308" "exp3" 2 128 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 581 3 1
"3308" "exp3" 2 129 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1063 17 1
"3308" "exp3" 2 130 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1152 0 0
"3308" "exp3" 2 131 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1222 0 0
"3308" "exp3" 2 132 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1201 25 1
"3308" "exp3" 1 1 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1348 0 0
"3308" "exp3" 1 2 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1290 78 1
"3308" "exp3" 1 3 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1072 0 0
"3308" "exp3" 1 4 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1847 28 1
"3308" "exp3" 1 5 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 2816 0 0
"3308" "exp3" 1 6 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1877 0 0
"3308" "exp3" 1 7 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 1157 0 0
"3308" "exp3" 1 8 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2084 34 1
"3308" "exp3" 1 9 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1237 0 0
"3308" "exp3" 1 10 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 2274 72 1
"3308" "exp3" 1 11 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 2529 0 0
"3308" "exp3" 1 12 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 2930 0 0
"3308" "exp3" 1 13 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1387 45 1
"3308" "exp3" 1 14 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 2291 0 0
"3308" "exp3" 1 15 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 2950 51 1
"3308" "exp3" 1 16 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1819 39 1
"3308" "exp3" 1 17 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 1769 78 1
"3308" "exp3" 1 18 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 2222 0 0
"3308" "exp3" 1 19 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 2451 0 0
"3308" "exp3" 1 20 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1755 24 1
"3308" "exp3" 1 21 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1685 41 1
"3308" "exp3" 1 22 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 2036 0 0
"3308" "exp3" 1 23 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1536 38 1
"3308" "exp3" 1 24 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 1789 0 0
"3308" "exp3" 1 25 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 2042 76 1
"3308" "exp3" 1 26 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2141 40 1
"3308" "exp3" 1 27 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1429 0 0
"3308" "exp3" 1 28 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 927 0 0
"3308" "exp3" 1 29 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1583 43 1
"3308" "exp3" 1 30 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1783 0 0
"3308" "exp3" 1 31 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 2281 0 0
"3308" "exp3" 1 32 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1472 17 1
"3308" "exp3" 1 33 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 5089 69 1
"3308" "exp3" 1 34 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1505 0 0
"3308" "exp3" 1 35 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1535 16 1
"3308" "exp3" 1 36 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 2021 0 0
"3308" "exp3" 1 37 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1405 75 1
"3308" "exp3" 1 38 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1633 37 1
"3308" "exp3" 1 39 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 1808 0 0
"3308" "exp3" 1 40 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1226 35 1
"3308" "exp3" 1 41 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1421 0 0
"3308" "exp3" 1 42 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1400 0 0
"3308" "exp3" 1 43 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 3301 87 1
"3308" "exp3" 1 44 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 1925 0 0
"3308" "exp3" 1 45 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 2222 0 0
"3308" "exp3" 1 46 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1346 0 0
"3308" "exp3" 1 47 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1819 39 1
"3308" "exp3" 1 48 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 944 42 1
"3308" "exp3" 1 49 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1044 32 1
"3308" "exp3" 1 50 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1350 66 1
"3308" "exp3" 1 51 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1916 0 0
"3308" "exp3" 1 52 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2323 41 1
"3308" "exp3" 1 53 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 2091 0 0
"3308" "exp3" 1 54 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1198 63 1
"3308" "exp3" 1 55 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1386 0 0
"3308" "exp3" 1 56 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1722 80 1
"3308" "exp3" 1 57 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1094 0 0
"3308" "exp3" 1 58 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 2657 79 1
"3308" "exp3" 1 59 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1172 0 0
"3308" "exp3" 1 60 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1529 82 1
"3308" "exp3" 1 61 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 2033 31 1
"3308" "exp3" 1 62 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1150 75 1
"3308" "exp3" 1 63 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 3188 0 0
"3308" "exp3" 1 64 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1500 0 0
"3308" "exp3" 1 65 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 842 0 0
"3308" "exp3" 1 66 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1887 0 0
"3308" "exp3" 1 67 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 3171 0 0
"3308" "exp3" 1 68 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1131 0 0
"3308" "exp3" 1 69 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 3683 26 1
"3308" "exp3" 1 70 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1238 93 1
"3308" "exp3" 1 71 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 8692 36 1
"3308" "exp3" 1 72 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1164 0 0
"3308" "exp3" 1 73 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1085 44 1
"3308" "exp3" 1 74 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1730 0 0
"3308" "exp3" 1 75 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1365 0 0
"3308" "exp3" 1 76 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1046 0 0
"3308" "exp3" 1 77 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1350 0 0
"3308" "exp3" 1 78 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 2225 67 1
"3308" "exp3" 1 79 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 2058 0 0
"3308" "exp3" 1 80 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 647 92 1
"3308" "exp3" 1 81 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 705 0 0
"3308" "exp3" 1 82 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1285 46 1
"3308" "exp3" 1 83 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 904 0 0
"3308" "exp3" 1 84 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 920 0 0
"3308" "exp3" 1 85 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1302 67 1
"3308" "exp3" 1 86 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 799 0 0
"3308" "exp3" 1 87 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 616 0 0
"3308" "exp3" 1 88 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 1262 0 0
"3308" "exp3" 1 89 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 756 86 1
"3308" "exp3" 1 90 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 959 97 1
"3308" "exp3" 1 91 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1317 0 0
"3308" "exp3" 1 92 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1630 0 0
"3308" "exp3" 1 93 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1083 0 0
"3308" "exp3" 1 94 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1725 24 1
"3308" "exp3" 1 95 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 886 0 0
"3308" "exp3" 1 96 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1385 0 0
"3308" "exp3" 1 97 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1114 0 0
"3308" "exp3" 1 98 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 828 0 0
"3308" "exp3" 1 99 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 863 0 0
"3308" "exp3" 1 100 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 2260 0 0
"3308" "exp3" 1 101 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1404 44 1
"3308" "exp3" 1 102 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 2724 0 0
"3308" "exp3" 1 103 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1244 0 0
"3308" "exp3" 1 104 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1136 70 1
"3308" "exp3" 1 105 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1695 0 0
"3308" "exp3" 1 106 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1454 67 1
"3308" "exp3" 1 107 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1391 91 1
"3308" "exp3" 1 108 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1320 36 1
"3308" "exp3" 1 109 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1700 0 0
"3308" "exp3" 1 110 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 2182 0 0
"3308" "exp3" 1 111 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1507 0 0
"3308" "exp3" 1 112 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 1550 0 0
"3308" "exp3" 1 113 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 968 79 1
"3308" "exp3" 1 114 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 803 0 0
"3308" "exp3" 1 115 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1798 0 0
"3308" "exp3" 1 116 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 2289 36 1
"3308" "exp3" 1 117 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1249 74 1
"3308" "exp3" 1 118 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 1408 0 0
"3308" "exp3" 1 119 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 769 0 0
"3308" "exp3" 1 120 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1505 30 1
"3308" "exp3" 1 121 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 3991 65 1
"3308" "exp3" 1 122 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 628 0 0
"3308" "exp3" 1 123 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 748 0 0
"3308" "exp3" 1 124 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 689 42 1
"3308" "exp3" 1 125 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 904 0 0
"3308" "exp3" 1 126 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 548 0 0
"3308" "exp3" 1 127 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 2605 57 1
"3308" "exp3" 1 128 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 640 0 0
"3308" "exp3" 1 129 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 2890 14 1
"3308" "exp3" 1 130 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1295 23 1
"3308" "exp3" 1 131 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1446 0 0
"3308" "exp3" 1 132 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 865 72 1
"3308" "exp3" 2 1 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1129 0 0
"3308" "exp3" 2 2 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 796 79 1
"3308" "exp3" 2 3 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1537 36 1
"3308" "exp3" 2 4 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1165 55 1
"3308" "exp3" 2 5 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 652 78 1
"3308" "exp3" 2 6 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 966 0 0
"3308" "exp3" 2 7 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1321 0 0
"3308" "exp3" 2 8 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1145 38 1
"3308" "exp3" 2 9 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1003 0 0
"3308" "exp3" 2 10 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 851 0 0
"3308" "exp3" 2 11 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 1078 0 0
"3308" "exp3" 2 12 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1984 0 0
"3308" "exp3" 2 13 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1217 0 0
"3308" "exp3" 2 14 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 957 0 0
"3308" "exp3" 2 15 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1813 0 0
"3308" "exp3" 2 16 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1363 0 0
"3308" "exp3" 2 17 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1681 0 0
"3308" "exp3" 2 18 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1045 21 1
"3308" "exp3" 2 19 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1073 0 0
"3308" "exp3" 2 20 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1128 0 0
"3308" "exp3" 2 21 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 941 0 0
"3308" "exp3" 2 22 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 1074 73 1
"3308" "exp3" 2 23 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 2287 0 0
"3308" "exp3" 2 24 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1353 0 0
"3308" "exp3" 2 25 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1284 0 0
"3308" "exp3" 2 26 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1823 90 1
"3308" "exp3" 2 27 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 923 10 1
"3308" "exp3" 2 28 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1538 0 0
"3308" "exp3" 2 29 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1029 0 0
"3308" "exp3" 2 30 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1057 0 0
"3308" "exp3" 2 31 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 3344 65 1
"3308" "exp3" 2 32 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 793 73 1
"3308" "exp3" 2 33 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 828 0 0
"3308" "exp3" 2 34 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1119 20 1
"3308" "exp3" 2 35 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1075 0 0
"3308" "exp3" 2 36 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 2830 54 1
"3308" "exp3" 2 37 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 2947 63 1
"3308" "exp3" 2 38 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 938 0 0
"3308" "exp3" 2 39 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1646 0 0
"3308" "exp3" 2 40 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1870 0 0
"3308" "exp3" 2 41 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 2063 0 0
"3308" "exp3" 2 42 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1007 0 0
"3308" "exp3" 2 43 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 872 0 0
"3308" "exp3" 2 44 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1478 0 0
"3308" "exp3" 2 45 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2383 0 0
"3308" "exp3" 2 46 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1293 0 0
"3308" "exp3" 2 47 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1780 0 0
"3308" "exp3" 2 48 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2095 16 1
"3308" "exp3" 2 49 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 987 0 0
"3308" "exp3" 2 50 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1056 63 1
"3308" "exp3" 2 51 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 961 71 1
"3308" "exp3" 2 52 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 775 0 0
"3308" "exp3" 2 53 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1255 0 0
"3308" "exp3" 2 54 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 1272 74 1
"3308" "exp3" 2 55 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 897 78 1
"3308" "exp3" 2 56 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1277 48 1
"3308" "exp3" 2 57 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2153 42 1
"3308" "exp3" 2 58 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1039 0 0
"3308" "exp3" 2 59 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1043 35 1
"3308" "exp3" 2 60 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 893 0 0
"3308" "exp3" 2 61 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1818 0 0
"3308" "exp3" 2 62 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1746 0 0
"3308" "exp3" 2 63 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1540 0 0
"3308" "exp3" 2 64 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 1185 0 0
"3308" "exp3" 2 65 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 890 0 0
"3308" "exp3" 2 66 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1288 0 0
"3308" "exp3" 2 67 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 690 0 0
"3308" "exp3" 2 68 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 4384 0 0
"3308" "exp3" 2 69 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1501 85 1
"3308" "exp3" 2 70 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 779 0 0
"3308" "exp3" 2 71 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1129 0 0
"3308" "exp3" 2 72 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1246 0 0
"3308" "exp3" 2 73 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1709 75 1
"3308" "exp3" 2 74 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 924 66 1
"3308" "exp3" 2 75 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1062 68 1
"3308" "exp3" 2 76 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 648 0 0
"3308" "exp3" 2 77 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 999 57 1
"3308" "exp3" 2 78 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1244 33 1
"3308" "exp3" 2 79 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 906 0 0
"3308" "exp3" 2 80 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1677 0 0
"3308" "exp3" 2 81 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 783 79 1
"3308" "exp3" 2 82 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1087 12 1
"3308" "exp3" 2 83 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 1288 0 0
"3308" "exp3" 2 84 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 2502 45 1
"3308" "exp3" 2 85 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1565 27 1
"3308" "exp3" 2 86 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1171 0 0
"3308" "exp3" 2 87 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 3390 74 1
"3308" "exp3" 2 88 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1625 0 0
"3308" "exp3" 2 89 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2451 0 0
"3308" "exp3" 2 90 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 2149 0 0
"3308" "exp3" 2 91 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1867 0 0
"3308" "exp3" 2 92 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 880 0 0
"3308" "exp3" 2 93 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 965 0 0
"3308" "exp3" 2 94 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 3526 0 0
"3308" "exp3" 2 95 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1633 77 1
"3308" "exp3" 2 96 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1462 0 0
"3308" "exp3" 2 97 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1619 42 1
"3308" "exp3" 2 98 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1358 0 0
"3308" "exp3" 2 99 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 2374 0 0
"3308" "exp3" 2 100 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1323 0 0
"3308" "exp3" 2 101 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2976 39 1
"3308" "exp3" 2 102 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1130 36 1
"3308" "exp3" 2 103 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 2053 0 0
"3308" "exp3" 2 104 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 4429 0 0
"3308" "exp3" 2 105 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1438 83 1
"3308" "exp3" 2 106 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1765 29 1
"3308" "exp3" 2 107 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 2196 0 0
"3308" "exp3" 2 108 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1432 87 1
"3308" "exp3" 2 109 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 6553 0 0
"3308" "exp3" 2 110 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1394 70 1
"3308" "exp3" 2 111 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1037 0 0
"3308" "exp3" 2 112 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1130 0 0
"3308" "exp3" 2 113 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1603 0 0
"3308" "exp3" 2 114 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 888 0 0
"3308" "exp3" 2 115 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1886 0 0
"3308" "exp3" 2 116 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1473 0 0
"3308" "exp3" 2 117 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1909 26 1
"3308" "exp3" 2 118 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 2407 0 0
"3308" "exp3" 2 119 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1584 0 0
"3308" "exp3" 2 120 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 1093 0 0
"3308" "exp3" 2 121 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 1115 77 1
"3308" "exp3" 2 122 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1131 96 1
"3308" "exp3" 2 123 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1013 0 0
"3308" "exp3" 2 124 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 634 0 0
"3308" "exp3" 2 125 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1571 0 0
"3308" "exp3" 2 126 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2830 34 1
"3308" "exp3" 2 127 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1552 0 0
"3308" "exp3" 2 128 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 819 68 1
"3308" "exp3" 2 129 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 905 44 1
"3308" "exp3" 2 130 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 953 31 1
"3308" "exp3" 2 131 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1204 0 0
"3308" "exp3" 2 132 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1654 0 0
"3308" "exp3" 1 1 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 1481 68 1
"3308" "exp3" 1 2 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1674 0 0
"3308" "exp3" 1 3 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1120 33 1
"3308" "exp3" 1 4 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1809 15 1
"3308" "exp3" 1 5 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1357 31 1
"3308" "exp3" 1 6 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1032 9 1
"3308" "exp3" 1 7 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 2745 0 0
"3308" "exp3" 1 8 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2127 89 1
"3308" "exp3" 1 9 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1691 0 0
"3308" "exp3" 1 10 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1448 82 1
"3308" "exp3" 1 11 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 2572 0 0
"3308" "exp3" 1 12 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 2299 35 1
"3308" "exp3" 1 13 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 2042 0 0
"3308" "exp3" 1 14 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 2587 44 1
"3308" "exp3" 1 15 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1914 68 1
"3308" "exp3" 1 16 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 4582 37 1
"3308" "exp3" 1 17 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2676 25 1
"3308" "exp3" 1 18 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1893 0 0
"3308" "exp3" 1 19 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2550 0 0
"3308" "exp3" 1 20 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 2846 0 0
"3308" "exp3" 1 21 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1240 0 0
"3308" "exp3" 1 22 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1354 35 1
"3308" "exp3" 1 23 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2046 33 1
"3308" "exp3" 1 24 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2030 31 1
"3308" "exp3" 1 25 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 1509 0 0
"3308" "exp3" 1 26 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1677 0 0
"3308" "exp3" 1 27 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1435 48 1
"3308" "exp3" 1 28 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 2032 22 1
"3308" "exp3" 1 29 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1935 38 1
"3308" "exp3" 1 30 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2150 23 1
"3308" "exp3" 1 31 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 2501 65 1
"3308" "exp3" 1 32 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 1452 0 0
"3308" "exp3" 1 33 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 2521 0 0
"3308" "exp3" 1 34 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1645 0 0
"3308" "exp3" 1 35 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1024 0 0
"3308" "exp3" 1 36 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 2637 55 1
"3308" "exp3" 1 37 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1056 92 1
"3308" "exp3" 1 38 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1483 0 0
"3308" "exp3" 1 39 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1956 0 0
"3308" "exp3" 1 40 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1434 0 0
"3308" "exp3" 1 41 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 2491 0 0
"3308" "exp3" 1 42 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 2052 0 0
"3308" "exp3" 1 43 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1054 28 1
"3308" "exp3" 1 44 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1281 39 1
"3308" "exp3" 1 45 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 841 40 1
"3308" "exp3" 1 46 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 2279 0 0
"3308" "exp3" 1 47 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2503 29 1
"3308" "exp3" 1 48 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 870 0 0
"3308" "exp3" 1 49 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 911 86 1
"3308" "exp3" 1 50 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 1548 66 1
"3308" "exp3" 1 51 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1501 0 0
"3308" "exp3" 1 52 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 4200 28 1
"3308" "exp3" 1 53 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1645 24 1
"3308" "exp3" 1 54 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1181 0 0
"3308" "exp3" 1 55 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1996 0 0
"3308" "exp3" 1 56 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1424 0 0
"3308" "exp3" 1 57 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1411 0 0
"3308" "exp3" 1 58 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 2998 0 0
"3308" "exp3" 1 59 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 3028 0 0
"3308" "exp3" 1 60 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 1876 54 1
"3308" "exp3" 1 61 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2403 0 0
"3308" "exp3" 1 62 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1693 22 1
"3308" "exp3" 1 63 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1902 68 1
"3308" "exp3" 1 64 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1885 0 0
"3308" "exp3" 1 65 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1478 0 0
"3308" "exp3" 1 66 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 2217 0 0
"3308" "exp3" 1 67 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 967 0 0
"3308" "exp3" 1 68 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 976 0 0
"3308" "exp3" 1 69 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1552 0 0
"3308" "exp3" 1 70 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1974 0 0
"3308" "exp3" 1 71 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 2257 86 1
"3308" "exp3" 1 72 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1910 43 1
"3308" "exp3" 1 73 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1906 49 1
"3308" "exp3" 1 74 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1558 0 0
"3308" "exp3" 1 75 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2518 27 1
"3308" "exp3" 1 76 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1090 0 0
"3308" "exp3" 1 77 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2923 21 1
"3308" "exp3" 1 78 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2093 75 1
"3308" "exp3" 1 79 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1506 19 1
"3308" "exp3" 1 80 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1767 27 1
"3308" "exp3" 1 81 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1898 28 1
"3308" "exp3" 1 82 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 870 94 1
"3308" "exp3" 1 83 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 899 0 0
"3308" "exp3" 1 84 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2043 0 0
"3308" "exp3" 1 85 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1820 0 0
"3308" "exp3" 1 86 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 2159 5 1
"3308" "exp3" 1 87 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2894 47 1
"3308" "exp3" 1 88 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1488 0 0
"3308" "exp3" 1 89 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1648 19 1
"3308" "exp3" 1 90 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2272 67 1
"3308" "exp3" 1 91 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2810 37 1
"3308" "exp3" 1 92 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1189 30 1
"3308" "exp3" 1 93 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 2193 0 0
"3308" "exp3" 1 94 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1069 0 0
"3308" "exp3" 1 95 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1571 29 1
"3308" "exp3" 1 96 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1005 30 1
"3308" "exp3" 1 97 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 2413 0 0
"3308" "exp3" 1 98 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 2276 87 1
"3308" "exp3" 1 99 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 3301 0 0
"3308" "exp3" 1 100 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1319 42 1
"3308" "exp3" 1 101 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1880 23 1
"3308" "exp3" 1 102 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1165 25 1
"3308" "exp3" 1 103 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1094 21 1
"3308" "exp3" 1 104 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1062 19 1
"3308" "exp3" 1 105 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1558 0 0
"3308" "exp3" 1 106 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2944 44 1
"3308" "exp3" 1 107 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1691 91 1
"3308" "exp3" 1 108 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1325 30 1
"3308" "exp3" 1 109 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1095 18 1
"3308" "exp3" 1 110 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2000 40 1
"3308" "exp3" 1 111 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 2813 37 1
"3308" "exp3" 1 112 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 999 34 1
"3308" "exp3" 1 113 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 705 6 1
"3308" "exp3" 1 114 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1169 18 1
"3308" "exp3" 1 115 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1887 24 1
"3308" "exp3" 1 116 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1217 0 0
"3308" "exp3" 1 117 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1879 38 1
"3308" "exp3" 1 118 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 3152 0 0
"3308" "exp3" 1 119 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1198 0 0
"3308" "exp3" 1 120 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1389 17 1
"3308" "exp3" 1 121 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2097 43 1
"3308" "exp3" 1 122 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1369 31 1
"3308" "exp3" 1 123 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1585 27 1
"3308" "exp3" 1 124 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1129 0 0
"3308" "exp3" 1 125 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1680 26 1
"3308" "exp3" 1 126 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 2412 0 0
"3308" "exp3" 1 127 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1617 20 1
"3308" "exp3" 1 128 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1478 18 1
"3308" "exp3" 1 129 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 743 0 0
"3308" "exp3" 1 130 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 2543 0 0
"3308" "exp3" 1 131 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1336 0 0
"3308" "exp3" 1 132 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1076 26 1
"3308" "exp3" 2 1 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 22 0 0
"3308" "exp3" 2 2 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1117 30 1
"3308" "exp3" 2 3 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 969 18 1
"3308" "exp3" 2 4 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1189 0 0
"3308" "exp3" 2 5 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 972 0 0
"3308" "exp3" 2 6 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1016 0 0
"3308" "exp3" 2 7 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1088 44 1
"3308" "exp3" 2 8 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 950 0 0
"3308" "exp3" 2 9 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 983 32 1
"3308" "exp3" 2 10 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 951 0 0
"3308" "exp3" 2 11 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 871 0 0
"3308" "exp3" 2 12 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 4894 24 1
"3308" "exp3" 2 13 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 673 24 1
"3308" "exp3" 2 14 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 964 16 1
"3308" "exp3" 2 15 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 4080 0 0
"3308" "exp3" 2 16 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1954 0 0
"3308" "exp3" 2 17 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1393 0 0
"3308" "exp3" 2 18 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 759 45 1
"3308" "exp3" 2 19 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 837 0 0
"3308" "exp3" 2 20 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 902 32 1
"3308" "exp3" 2 21 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 984 0 0
"3308" "exp3" 2 22 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 761 39 1
"3308" "exp3" 2 23 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 734 39 1
"3308" "exp3" 2 24 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1700 33 1
"3308" "exp3" 2 25 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1012 47 1
"3308" "exp3" 2 26 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1470 0 0
"3308" "exp3" 2 27 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1918 0 0
"3308" "exp3" 2 28 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1559 40 1
"3308" "exp3" 2 29 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 911 32 1
"3308" "exp3" 2 30 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1060 0 0
"3308" "exp3" 2 31 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 1071 0 0
"3308" "exp3" 2 32 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1744 0 0
"3308" "exp3" 2 33 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1223 86 1
"3308" "exp3" 2 34 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 2460 0 0
"3308" "exp3" 2 35 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 2450 0 0
"3308" "exp3" 2 36 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 2986 0 0
"3308" "exp3" 2 37 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 4415 41 1
"3308" "exp3" 2 38 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2377 0 0
"3308" "exp3" 2 39 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 2203 17 1
"3308" "exp3" 2 40 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1440 36 1
"3308" "exp3" 2 41 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 2656 0 0
"3308" "exp3" 2 42 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2407 42 1
"3308" "exp3" 2 43 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 1956 0 0
"3308" "exp3" 2 44 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1753 23 1
"3308" "exp3" 2 45 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1444 0 0
"3308" "exp3" 2 46 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 846 26 1
"3308" "exp3" 2 47 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1652 0 0
"3308" "exp3" 2 48 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 2294 17 1
"3308" "exp3" 2 49 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1367 0 0
"3308" "exp3" 2 50 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 2804 37 1
"3308" "exp3" 2 51 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1593 35 1
"3308" "exp3" 2 52 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 1503 0 0
"3308" "exp3" 2 53 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 2395 0 0
"3308" "exp3" 2 54 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 2139 34 1
"3308" "exp3" 2 55 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1470 21 1
"3308" "exp3" 2 56 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1415 33 1
"3308" "exp3" 2 57 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 795 0 0
"3308" "exp3" 2 58 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 861 29 1
"3308" "exp3" 2 59 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1430 77 1
"3308" "exp3" 2 60 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1839 38 1
"3308" "exp3" 2 61 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 998 37 1
"3308" "exp3" 2 62 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 885 0 0
"3308" "exp3" 2 63 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 715 12 1
"3308" "exp3" 2 64 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 958 19 1
"3308" "exp3" 2 65 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2043 17 1
"3308" "exp3" 2 66 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1044 0 0
"3308" "exp3" 2 67 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1220 0 0
"3308" "exp3" 2 68 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1622 0 0
"3308" "exp3" 2 69 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 809 34 1
"3308" "exp3" 2 70 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 829 37 1
"3308" "exp3" 2 71 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1851 0 0
"3308" "exp3" 2 72 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 2341 87 1
"3308" "exp3" 2 73 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2181 0 0
"3308" "exp3" 2 74 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1109 21 1
"3308" "exp3" 2 75 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 962 17 1
"3308" "exp3" 2 76 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 942 0 0
"3308" "exp3" 2 77 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1041 0 0
"3308" "exp3" 2 78 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 951 22 1
"3308" "exp3" 2 79 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 3382 28 1
"3308" "exp3" 2 80 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 850 20 1
"3308" "exp3" 2 81 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1019 19 1
"3308" "exp3" 2 82 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1728 15 1
"3308" "exp3" 2 83 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 872 30 1
"3308" "exp3" 2 84 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 7944 18 1
"3308" "exp3" 2 85 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1236 27 1
"3308" "exp3" 2 86 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1229 0 0
"3308" "exp3" 2 87 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1165 27 1
"3308" "exp3" 2 88 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1940 0 0
"3308" "exp3" 2 89 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 3040 84 1
"3308" "exp3" 2 90 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 735 31 1
"3308" "exp3" 2 91 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1242 25 1
"3308" "exp3" 2 92 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1452 0 0
"3308" "exp3" 2 93 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1185 20 1
"3308" "exp3" 2 94 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 712 0 0
"3308" "exp3" 2 95 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2404 49 1
"3308" "exp3" 2 96 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 3054 0 0
"3308" "exp3" 2 97 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 3386 0 0
"3308" "exp3" 2 98 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1486 0 0
"3308" "exp3" 2 99 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1030 0 0
"3308" "exp3" 2 100 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2191 0 0
"3308" "exp3" 2 101 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1370 0 0
"3308" "exp3" 2 102 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1700 18 1
"3308" "exp3" 2 103 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 795 0 0
"3308" "exp3" 2 104 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1155 18 1
"3308" "exp3" 2 105 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1648 0 0
"3308" "exp3" 2 106 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1019 94 1
"3308" "exp3" 2 107 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2166 0 0
"3308" "exp3" 2 108 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 756 16 1
"3308" "exp3" 2 109 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1805 33 1
"3308" "exp3" 2 110 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1770 31 1
"3308" "exp3" 2 111 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 4449 0 0
"3308" "exp3" 2 112 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1406 40 1
"3308" "exp3" 2 113 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 940 0 0
"3308" "exp3" 2 114 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 2104 19 1
"3308" "exp3" 2 115 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 2895 0 0
"3308" "exp3" 2 116 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1210 21 1
"3308" "exp3" 2 117 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 830 31 1
"3308" "exp3" 2 118 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 3260 0 0
"3308" "exp3" 2 119 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1698 36 1
"3308" "exp3" 2 120 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 3359 0 0
"3308" "exp3" 2 121 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 2013 0 0
"3308" "exp3" 2 122 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2326 46 1
"3308" "exp3" 2 123 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 2614 20 1
"3308" "exp3" 2 124 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 2055 0 0
"3308" "exp3" 2 125 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 637 30 1
"3308" "exp3" 2 126 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 889 38 1
"3308" "exp3" 2 127 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1547 0 0
"3308" "exp3" 2 128 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1369 0 0
"3308" "exp3" 2 129 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1468 0 0
"3308" "exp3" 2 130 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1100 19 1
"3308" "exp3" 2 131 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1213 0 0
"3308" "exp3" 2 132 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 782 43 1
"3309" "exp3" 1 1 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 795 0 0
"3309" "exp3" 1 2 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 983 7 1
"3309" "exp3" 1 3 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1839 0 0
"3309" "exp3" 1 4 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 759 49 1
"3309" "exp3" 1 5 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2119 0 0
"3309" "exp3" 1 6 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1410 31 1
"3309" "exp3" 1 7 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 803 23 1
"3309" "exp3" 1 8 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 767 24 1
"3309" "exp3" 1 9 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1719 0 0
"3309" "exp3" 1 10 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 809 0 0
"3309" "exp3" 1 11 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1029 0 0
"3309" "exp3" 1 12 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1819 0 0
"3309" "exp3" 1 13 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1088 25 1
"3309" "exp3" 1 14 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1093 35 1
"3309" "exp3" 1 15 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 998 43 1
"3309" "exp3" 1 16 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1266 0 0
"3309" "exp3" 1 17 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1448 47 1
"3309" "exp3" 1 18 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1907 12 1
"3309" "exp3" 1 19 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 970 29 1
"3309" "exp3" 1 20 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 892 0 0
"3309" "exp3" 1 21 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 933 26 1
"3309" "exp3" 1 22 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1555 8 1
"3309" "exp3" 1 23 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 753 0 0
"3309" "exp3" 1 24 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 835 27 1
"3309" "exp3" 1 25 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1446 6 1
"3309" "exp3" 1 26 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1090 16 1
"3309" "exp3" 1 27 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1347 0 0
"3309" "exp3" 1 28 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1357 0 0
"3309" "exp3" 1 29 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2394 86 1
"3309" "exp3" 1 30 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 841 28 1
"3309" "exp3" 1 31 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1189 35 1
"3309" "exp3" 1 32 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1033 0 0
"3309" "exp3" 1 33 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 643 26 1
"3309" "exp3" 1 34 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 556 0 0
"3309" "exp3" 1 35 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 667 34 1
"3309" "exp3" 1 36 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 793 41 1
"3309" "exp3" 1 37 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2252 0 0
"3309" "exp3" 1 38 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 2006 69 1
"3309" "exp3" 1 39 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1138 0 0
"3309" "exp3" 1 40 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 972 19 1
"3309" "exp3" 1 41 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 961 25 1
"3309" "exp3" 1 42 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 2469 0 0
"3309" "exp3" 1 43 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1674 42 1
"3309" "exp3" 1 44 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 2391 0 0
"3309" "exp3" 1 45 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1919 4 1
"3309" "exp3" 1 46 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1564 25 1
"3309" "exp3" 1 47 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1051 0 0
"3309" "exp3" 1 48 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1061 0 0
"3309" "exp3" 1 49 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 710 19 1
"3309" "exp3" 1 50 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 2783 17 1
"3309" "exp3" 1 51 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 2871 15 1
"3309" "exp3" 1 52 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1119 40 1
"3309" "exp3" 1 53 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 745 0 0
"3309" "exp3" 1 54 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1215 20 1
"3309" "exp3" 1 55 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 787 28 1
"3309" "exp3" 1 56 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 1008 0 0
"3309" "exp3" 1 57 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 848 44 1
"3309" "exp3" 1 58 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1153 30 1
"3309" "exp3" 1 59 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1682 30 1
"3309" "exp3" 1 60 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 1626 0 0
"3309" "exp3" 1 61 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 951 0 0
"3309" "exp3" 1 62 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 796 32 1
"3309" "exp3" 1 63 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 902 35 1
"3309" "exp3" 1 64 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 518 15 1
"3309" "exp3" 1 65 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 802 23 1
"3309" "exp3" 1 66 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1064 0 0
"3309" "exp3" 1 67 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 879 0 0
"3309" "exp3" 1 68 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 1628 0 0
"3309" "exp3" 1 69 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 2099 40 1
"3309" "exp3" 1 70 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1468 0 0
"3309" "exp3" 1 71 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1557 33 1
"3309" "exp3" 1 72 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1660 28 1
"3309" "exp3" 1 73 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 2184 0 0
"3309" "exp3" 1 74 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1371 17 1
"3309" "exp3" 1 75 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1784 0 0
"3309" "exp3" 1 76 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2164 21 1
"3309" "exp3" 1 77 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 3899 0 0
"3309" "exp3" 1 78 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1583 24 1
"3309" "exp3" 1 79 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1142 32 1
"3309" "exp3" 1 80 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 2229 16 1
"3309" "exp3" 1 81 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1157 33 1
"3309" "exp3" 1 82 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 631 16 1
"3309" "exp3" 1 83 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1071 21 1
"3309" "exp3" 1 84 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1108 26 1
"3309" "exp3" 1 85 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1185 36 1
"3309" "exp3" 1 86 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1015 38 1
"3309" "exp3" 1 87 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 819 32 1
"3309" "exp3" 1 88 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1018 33 1
"3309" "exp3" 1 89 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1192 0 0
"3309" "exp3" 1 90 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 820 18 1
"3309" "exp3" 1 91 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1389 0 0
"3309" "exp3" 1 92 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 2201 13 1
"3309" "exp3" 1 93 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1286 0 0
"3309" "exp3" 1 94 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1731 38 1
"3309" "exp3" 1 95 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 2675 0 0
"3309" "exp3" 1 96 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1015 29 1
"3309" "exp3" 1 97 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1737 0 0
"3309" "exp3" 1 98 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1598 22 1
"3309" "exp3" 1 99 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 974 20 1
"3309" "exp3" 1 100 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1032 20 1
"3309" "exp3" 1 101 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 562 8 1
"3309" "exp3" 1 102 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1086 0 0
"3309" "exp3" 1 103 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1778 39 1
"3309" "exp3" 1 104 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1149 27 1
"3309" "exp3" 1 105 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 759 31 1
"3309" "exp3" 1 106 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2030 37 1
"3309" "exp3" 1 107 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 2718 0 0
"3309" "exp3" 1 108 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 929 27 1
"3309" "exp3" 1 109 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1253 0 0
"3309" "exp3" 1 110 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 957 14 1
"3309" "exp3" 1 111 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1061 0 0
"3309" "exp3" 1 112 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1177 20 1
"3309" "exp3" 1 113 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1471 0 0
"3309" "exp3" 1 114 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2744 0 0
"3309" "exp3" 1 115 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 2292 95 1
"3309" "exp3" 1 116 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1384 34 1
"3309" "exp3" 1 117 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1876 0 0
"3309" "exp3" 1 118 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 968 0 0
"3309" "exp3" 1 119 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 945 3 1
"3309" "exp3" 1 120 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2024 37 1
"3309" "exp3" 1 121 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 887 13 1
"3309" "exp3" 1 122 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1487 0 0
"3309" "exp3" 1 123 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 1021 0 0
"3309" "exp3" 1 124 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 2573 55 1
"3309" "exp3" 1 125 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1719 36 1
"3309" "exp3" 1 126 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 748 22 1
"3309" "exp3" 1 127 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1289 0 0
"3309" "exp3" 1 128 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 695 14 1
"3309" "exp3" 1 129 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 979 17 1
"3309" "exp3" 1 130 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 890 36 1
"3309" "exp3" 1 131 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 818 0 0
"3309" "exp3" 1 132 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 619 30 1
"3309" "exp3" 2 1 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1364 0 0
"3309" "exp3" 2 2 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 655 0 0
"3309" "exp3" 2 3 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 638 22 1
"3309" "exp3" 2 4 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 716 20 1
"3309" "exp3" 2 5 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 771 42 1
"3309" "exp3" 2 6 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 875 0 0
"3309" "exp3" 2 7 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1443 0 0
"3309" "exp3" 2 8 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 863 0 0
"3309" "exp3" 2 9 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 933 49 1
"3309" "exp3" 2 10 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 907 32 1
"3309" "exp3" 2 11 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 893 40 1
"3309" "exp3" 2 12 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1324 20 1
"3309" "exp3" 2 13 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 799 17 1
"3309" "exp3" 2 14 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1432 39 1
"3309" "exp3" 2 15 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1806 0 0
"3309" "exp3" 2 16 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1971 17 1
"3309" "exp3" 2 17 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 847 24 1
"3309" "exp3" 2 18 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 961 31 1
"3309" "exp3" 2 19 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 861 23 1
"3309" "exp3" 2 20 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1198 0 0
"3309" "exp3" 2 21 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1175 15 1
"3309" "exp3" 2 22 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1197 7 1
"3309" "exp3" 2 23 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1850 33 1
"3309" "exp3" 2 24 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1305 26 1
"3309" "exp3" 2 25 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1538 0 0
"3309" "exp3" 2 26 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1183 0 0
"3309" "exp3" 2 27 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 941 25 1
"3309" "exp3" 2 28 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 867 0 0
"3309" "exp3" 2 29 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2796 63 1
"3309" "exp3" 2 30 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1340 20 1
"3309" "exp3" 2 31 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1318 26 1
"3309" "exp3" 2 32 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 938 32 1
"3309" "exp3" 2 33 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1135 25 1
"3309" "exp3" 2 34 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 982 28 1
"3309" "exp3" 2 35 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1138 31 1
"3309" "exp3" 2 36 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 983 12 1
"3309" "exp3" 2 37 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1622 0 0
"3309" "exp3" 2 38 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 689 23 1
"3309" "exp3" 2 39 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1012 24 1
"3309" "exp3" 2 40 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1079 32 1
"3309" "exp3" 2 41 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 576 0 0
"3309" "exp3" 2 42 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 713 28 1
"3309" "exp3" 2 43 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 917 0 0
"3309" "exp3" 2 44 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 748 11 1
"3309" "exp3" 2 45 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 829 0 0
"3309" "exp3" 2 46 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1024 0 0
"3309" "exp3" 2 47 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1114 0 0
"3309" "exp3" 2 48 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 919 0 0
"3309" "exp3" 2 49 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1919 25 1
"3309" "exp3" 2 50 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1142 29 1
"3309" "exp3" 2 51 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1690 14 1
"3309" "exp3" 2 52 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 787 28 1
"3309" "exp3" 2 53 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1069 0 0
"3309" "exp3" 2 54 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 903 41 1
"3309" "exp3" 2 55 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 735 33 1
"3309" "exp3" 2 56 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 763 28 1
"3309" "exp3" 2 57 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1021 0 0
"3309" "exp3" 2 58 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2379 0 0
"3309" "exp3" 2 59 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1347 30 1
"3309" "exp3" 2 60 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1050 0 0
"3309" "exp3" 2 61 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1241 0 0
"3309" "exp3" 2 62 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 867 24 1
"3309" "exp3" 2 63 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1331 18 1
"3309" "exp3" 2 64 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 1275 0 0
"3309" "exp3" 2 65 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1038 16 1
"3309" "exp3" 2 66 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 772 21 1
"3309" "exp3" 2 67 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 729 42 1
"3309" "exp3" 2 68 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 784 69 1
"3309" "exp3" 2 69 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 858 0 0
"3309" "exp3" 2 70 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1119 23 1
"3309" "exp3" 2 71 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 665 18 1
"3309" "exp3" 2 72 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 854 16 1
"3309" "exp3" 2 73 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1044 27 1
"3309" "exp3" 2 74 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 683 18 1
"3309" "exp3" 2 75 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 753 0 0
"3309" "exp3" 2 76 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 825 31 1
"3309" "exp3" 2 77 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 844 0 0
"3309" "exp3" 2 78 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 605 0 0
"3309" "exp3" 2 79 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2314 21 1
"3309" "exp3" 2 80 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1218 37 1
"3309" "exp3" 2 81 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 661 16 1
"3309" "exp3" 2 82 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1222 32 1
"3309" "exp3" 2 83 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 874 0 0
"3309" "exp3" 2 84 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1131 0 0
"3309" "exp3" 2 85 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 891 81 1
"3309" "exp3" 2 86 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 840 0 0
"3309" "exp3" 2 87 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 648 3 1
"3309" "exp3" 2 88 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 707 7 1
"3309" "exp3" 2 89 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 997 0 0
"3309" "exp3" 2 90 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 874 22 1
"3309" "exp3" 2 91 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 874 0 0
"3309" "exp3" 2 92 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 856 45 1
"3309" "exp3" 2 93 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 667 0 0
"3309" "exp3" 2 94 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 605 19 1
"3309" "exp3" 2 95 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 809 9 1
"3309" "exp3" 2 96 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 673 4 1
"3309" "exp3" 2 97 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 821 30 1
"3309" "exp3" 2 98 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 871 29 1
"3309" "exp3" 2 99 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 685 17 1
"3309" "exp3" 2 100 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 977 15 1
"3309" "exp3" 2 101 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1250 37 1
"3309" "exp3" 2 102 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1017 0 0
"3309" "exp3" 2 103 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 734 36 1
"3309" "exp3" 2 104 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 770 27 1
"3309" "exp3" 2 105 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 600 8 1
"3309" "exp3" 2 106 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 661 44 1
"3309" "exp3" 2 107 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 703 26 1
"3309" "exp3" 2 108 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 413 12 1
"3309" "exp3" 2 109 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 540 19 1
"3309" "exp3" 2 110 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 623 46 1
"3309" "exp3" 2 111 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 509 10 1
"3309" "exp3" 2 112 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 801 25 1
"3309" "exp3" 2 113 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 729 17 1
"3309" "exp3" 2 114 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 578 21 1
"3309" "exp3" 2 115 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 521 14 1
"3309" "exp3" 2 116 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 491 11 1
"3309" "exp3" 2 117 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 490 27 1
"3309" "exp3" 2 118 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 489 34 1
"3309" "exp3" 2 119 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 563 33 1
"3309" "exp3" 2 120 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 486 48 1
"3309" "exp3" 2 121 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 399 19 1
"3309" "exp3" 2 122 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 627 43 1
"3309" "exp3" 2 123 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 579 0 0
"3309" "exp3" 2 124 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 670 36 1
"3309" "exp3" 2 125 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 586 22 1
"3309" "exp3" 2 126 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 571 0 0
"3309" "exp3" 2 127 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 524 30 1
"3309" "exp3" 2 128 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 478 38 1
"3309" "exp3" 2 129 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 614 35 1
"3309" "exp3" 2 130 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 551 5 1
"3309" "exp3" 2 131 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 564 26 1
"3309" "exp3" 2 132 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 834 1 1
"3309" "exp3" 1 1 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 501 25 1
"3309" "exp3" 1 2 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 578 21 1
"3309" "exp3" 1 3 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 606 0 0
"3309" "exp3" 1 4 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1274 0 0
"3309" "exp3" 1 5 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 481 0 0
"3309" "exp3" 1 6 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 496 25 1
"3309" "exp3" 1 7 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 493 19 1
"3309" "exp3" 1 8 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 448 6 1
"3309" "exp3" 1 9 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 422 22 1
"3309" "exp3" 1 10 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 478 0 0
"3309" "exp3" 1 11 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 421 43 1
"3309" "exp3" 1 12 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 666 39 1
"3309" "exp3" 1 13 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 590 27 1
"3309" "exp3" 1 14 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 821 0 0
"3309" "exp3" 1 15 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 629 21 1
"3309" "exp3" 1 16 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 924 0 0
"3309" "exp3" 1 17 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1697 44 1
"3309" "exp3" 1 18 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 665 29 1
"3309" "exp3" 1 19 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 550 16 1
"3309" "exp3" 1 20 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 1284 17 1
"3309" "exp3" 1 21 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1008 0 0
"3309" "exp3" 1 22 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1144 34 1
"3309" "exp3" 1 23 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1001 18 1
"3309" "exp3" 1 24 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1383 90 1
"3309" "exp3" 1 25 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 1341 0 0
"3309" "exp3" 1 26 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 986 23 1
"3309" "exp3" 1 27 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 543 0 0
"3309" "exp3" 1 28 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 772 0 0
"3309" "exp3" 1 29 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 605 0 0
"3309" "exp3" 1 30 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 536 7 1
"3309" "exp3" 1 31 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 402 17 1
"3309" "exp3" 1 32 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 561 0 0
"3309" "exp3" 1 33 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 634 0 0
"3309" "exp3" 1 34 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 879 13 1
"3309" "exp3" 1 35 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 489 25 1
"3309" "exp3" 1 36 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 905 0 0
"3309" "exp3" 1 37 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 518 46 1
"3309" "exp3" 1 38 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 421 5 1
"3309" "exp3" 1 39 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 316 78 1
"3309" "exp3" 1 40 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 540 0 0
"3309" "exp3" 1 41 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 728 26 1
"3309" "exp3" 1 42 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 384 18 1
"3309" "exp3" 1 43 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 528 0 0
"3309" "exp3" 1 44 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 390 0 0
"3309" "exp3" 1 45 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 489 10 1
"3309" "exp3" 1 46 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 545 0 0
"3309" "exp3" 1 47 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 618 69 1
"3309" "exp3" 1 48 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 585 15 1
"3309" "exp3" 1 49 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 475 21 1
"3309" "exp3" 1 50 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 496 44 1
"3309" "exp3" 1 51 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 897 0 0
"3309" "exp3" 1 52 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 619 0 0
"3309" "exp3" 1 53 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 485 9 1
"3309" "exp3" 1 54 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 493 2 1
"3309" "exp3" 1 55 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 791 0 0
"3309" "exp3" 1 56 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 903 0 0
"3309" "exp3" 1 57 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1583 85 1
"3309" "exp3" 1 58 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 885 35 1
"3309" "exp3" 1 59 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 668 23 1
"3309" "exp3" 1 60 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 1227 0 0
"3309" "exp3" 1 61 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 521 28 1
"3309" "exp3" 1 62 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 521 0 0
"3309" "exp3" 1 63 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 445 16 1
"3309" "exp3" 1 64 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 535 15 1
"3309" "exp3" 1 65 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 368 26 1
"3309" "exp3" 1 66 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 344 37 1
"3309" "exp3" 1 67 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 356 26 1
"3309" "exp3" 1 68 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 412 20 1
"3309" "exp3" 1 69 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 374 22 1
"3309" "exp3" 1 70 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 405 29 1
"3309" "exp3" 1 71 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 363 23 1
"3309" "exp3" 1 72 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 474 0 0
"3309" "exp3" 1 73 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 577 12 1
"3309" "exp3" 1 74 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 484 0 0
"3309" "exp3" 1 75 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 555 32 1
"3309" "exp3" 1 76 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 495 37 1
"3309" "exp3" 1 77 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 599 4 1
"3309" "exp3" 1 78 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 730 0 0
"3309" "exp3" 1 79 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 968 0 0
"3309" "exp3" 1 80 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1178 0 0
"3309" "exp3" 1 81 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 522 14 1
"3309" "exp3" 1 82 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 429 11 1
"3309" "exp3" 1 83 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 716 0 0
"3309" "exp3" 1 84 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 671 14 1
"3309" "exp3" 1 85 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1251 0 0
"3309" "exp3" 1 86 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 899 31 1
"3309" "exp3" 1 87 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 680 0 0
"3309" "exp3" 1 88 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 651 42 1
"3309" "exp3" 1 89 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 519 36 1
"3309" "exp3" 1 90 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1028 33 1
"3309" "exp3" 1 91 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 903 0 0
"3309" "exp3" 1 92 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1034 24 1
"3309" "exp3" 1 93 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 1389 0 0
"3309" "exp3" 1 94 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 2459 0 0
"3309" "exp3" 1 95 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1027 0 0
"3309" "exp3" 1 96 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 610 18 1
"3309" "exp3" 1 97 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 474 8 1
"3309" "exp3" 1 98 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 410 33 1
"3309" "exp3" 1 99 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 566 0 0
"3309" "exp3" 1 100 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 350 5 1
"3309" "exp3" 1 101 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 515 0 0
"3309" "exp3" 1 102 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 541 38 1
"3309" "exp3" 1 103 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 398 6 1
"3309" "exp3" 1 104 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 458 32 1
"3309" "exp3" 1 105 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 575 13 1
"3309" "exp3" 1 106 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 562 0 0
"3309" "exp3" 1 107 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 571 0 0
"3309" "exp3" 1 108 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 607 43 1
"3309" "exp3" 1 109 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 848 65 1
"3309" "exp3" 1 110 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1030 0 0
"3309" "exp3" 1 111 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1094 0 0
"3309" "exp3" 1 112 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1024 0 0
"3309" "exp3" 1 113 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 982 31 1
"3309" "exp3" 1 114 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 588 41 1
"3309" "exp3" 1 115 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 914 91 1
"3309" "exp3" 1 116 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1460 40 1
"3309" "exp3" 1 117 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 528 25 1
"3309" "exp3" 1 118 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 921 0 0
"3309" "exp3" 1 119 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 2260 58 1
"3309" "exp3" 1 120 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 907 28 1
"3309" "exp3" 1 121 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 608 45 1
"3309" "exp3" 1 122 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 713 0 0
"3309" "exp3" 1 123 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 517 34 1
"3309" "exp3" 1 124 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 886 0 0
"3309" "exp3" 1 125 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 544 0 0
"3309" "exp3" 1 126 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 530 0 0
"3309" "exp3" 1 127 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 904 0 0
"3309" "exp3" 1 128 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 661 0 0
"3309" "exp3" 1 129 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 500 0 0
"3309" "exp3" 1 130 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 734 0 0
"3309" "exp3" 1 131 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 471 11 1
"3309" "exp3" 1 132 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 590 45 1
"3309" "exp3" 2 1 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 376 8 1
"3309" "exp3" 2 2 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 490 22 1
"3309" "exp3" 2 3 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 372 36 1
"3309" "exp3" 2 4 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 365 21 1
"3309" "exp3" 2 5 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 386 43 1
"3309" "exp3" 2 6 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 584 0 0
"3309" "exp3" 2 7 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 589 30 1
"3309" "exp3" 2 8 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 615 0 0
"3309" "exp3" 2 9 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 647 28 1
"3309" "exp3" 2 10 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 652 35 1
"3309" "exp3" 2 11 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 783 23 1
"3309" "exp3" 2 12 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 776 0 0
"3309" "exp3" 2 13 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 630 0 0
"3309" "exp3" 2 14 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 722 27 1
"3309" "exp3" 2 15 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 548 0 0
"3309" "exp3" 2 16 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 586 37 1
"3309" "exp3" 2 17 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 459 10 1
"3309" "exp3" 2 18 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 580 5 1
"3309" "exp3" 2 19 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 2782 84 1
"3309" "exp3" 2 20 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1096 0 0
"3309" "exp3" 2 21 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 685 0 0
"3309" "exp3" 2 22 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 785 46 1
"3309" "exp3" 2 23 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 901 71 1
"3309" "exp3" 2 24 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 758 17 1
"3309" "exp3" 2 25 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 1153 0 0
"3309" "exp3" 2 26 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1413 68 1
"3309" "exp3" 2 27 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 759 24 1
"3309" "exp3" 2 28 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 568 18 1
"3309" "exp3" 2 29 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 1263 0 0
"3309" "exp3" 2 30 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 584 9 1
"3309" "exp3" 2 31 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 903 38 1
"3309" "exp3" 2 32 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 569 34 1
"3309" "exp3" 2 33 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 504 12 1
"3309" "exp3" 2 34 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 829 0 0
"3309" "exp3" 2 35 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1237 31 1
"3309" "exp3" 2 36 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 806 36 1
"3309" "exp3" 2 37 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 590 34 1
"3309" "exp3" 2 38 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 562 30 1
"3309" "exp3" 2 39 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 899 0 0
"3309" "exp3" 2 40 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 883 0 0
"3309" "exp3" 2 41 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1496 37 1
"3309" "exp3" 2 42 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 635 31 1
"3309" "exp3" 2 43 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 821 13 1
"3309" "exp3" 2 44 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1077 0 0
"3309" "exp3" 2 45 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 599 19 1
"3309" "exp3" 2 46 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 876 0 0
"3309" "exp3" 2 47 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 593 33 1
"3309" "exp3" 2 48 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 686 0 0
"3309" "exp3" 2 49 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 596 25 1
"3309" "exp3" 2 50 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 500 23 1
"3309" "exp3" 2 51 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 670 6 1
"3309" "exp3" 2 52 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 751 0 0
"3309" "exp3" 2 53 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1519 0 0
"3309" "exp3" 2 54 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 985 0 0
"3309" "exp3" 2 55 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1112 25 1
"3309" "exp3" 2 56 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 965 13 1
"3309" "exp3" 2 57 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 828 0 0
"3309" "exp3" 2 58 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1123 48 1
"3309" "exp3" 2 59 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 726 26 1
"3309" "exp3" 2 60 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 987 35 1
"3309" "exp3" 2 61 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 563 0 0
"3309" "exp3" 2 62 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 609 20 1
"3309" "exp3" 2 63 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 410 19 1
"3309" "exp3" 2 64 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 557 21 1
"3309" "exp3" 2 65 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 470 32 1
"3309" "exp3" 2 66 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 737 14 1
"3309" "exp3" 2 67 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 360 7 1
"3309" "exp3" 2 68 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 409 27 1
"3309" "exp3" 2 69 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 384 23 1
"3309" "exp3" 2 70 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 458 40 1
"3309" "exp3" 2 71 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 488 0 0
"3309" "exp3" 2 72 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 533 28 1
"3309" "exp3" 2 73 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 695 23 1
"3309" "exp3" 2 74 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 524 0 0
"3309" "exp3" 2 75 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 782 0 0
"3309" "exp3" 2 76 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 543 0 0
"3309" "exp3" 2 77 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 628 0 0
"3309" "exp3" 2 78 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 505 15 1
"3309" "exp3" 2 79 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1395 0 0
"3309" "exp3" 2 80 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 539 0 0
"3309" "exp3" 2 81 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 1077 0 0
"3309" "exp3" 2 82 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 553 19 1
"3309" "exp3" 2 83 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 627 0 0
"3309" "exp3" 2 84 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 442 40 1
"3309" "exp3" 2 85 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 447 17 1
"3309" "exp3" 2 86 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 745 15 1
"3309" "exp3" 2 87 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 518 27 1
"3309" "exp3" 2 88 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 480 0 0
"3309" "exp3" 2 89 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 605 17 1
"3309" "exp3" 2 90 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 654 10 1
"3309" "exp3" 2 91 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 545 24 1
"3309" "exp3" 2 92 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 654 20 1
"3309" "exp3" 2 93 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1155 29 1
"3309" "exp3" 2 94 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 843 0 0
"3309" "exp3" 2 95 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 1380 0 0
"3309" "exp3" 2 96 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2226 0 0
"3309" "exp3" 2 97 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 481 31 1
"3309" "exp3" 2 98 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 537 0 0
"3309" "exp3" 2 99 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 565 36 1
"3309" "exp3" 2 100 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 895 0 0
"3309" "exp3" 2 101 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 949 0 0
"3309" "exp3" 2 102 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 488 24 1
"3309" "exp3" 2 103 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 474 0 0
"3309" "exp3" 2 104 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 426 6 1
"3309" "exp3" 2 105 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 568 35 1
"3309" "exp3" 2 106 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 516 20 1
"3309" "exp3" 2 107 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 320 17 1
"3309" "exp3" 2 108 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1118 56 1
"3309" "exp3" 2 109 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 963 68 1
"3309" "exp3" 2 110 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 637 15 1
"3309" "exp3" 2 111 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 569 33 1
"3309" "exp3" 2 112 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 532 0 0
"3309" "exp3" 2 113 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 658 11 1
"3309" "exp3" 2 114 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 648 41 1
"3309" "exp3" 2 115 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 515 16 1
"3309" "exp3" 2 116 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 471 29 1
"3309" "exp3" 2 117 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 504 0 0
"3309" "exp3" 2 118 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 922 0 0
"3309" "exp3" 2 119 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 1479 0 0
"3309" "exp3" 2 120 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 658 38 1
"3309" "exp3" 2 121 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 545 0 0
"3309" "exp3" 2 122 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1093 0 0
"3309" "exp3" 2 123 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 685 28 1
"3309" "exp3" 2 124 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 567 26 1
"3309" "exp3" 2 125 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 433 19 1
"3309" "exp3" 2 126 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 329 12 1
"3309" "exp3" 2 127 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 444 21 1
"3309" "exp3" 2 128 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 646 18 1
"3309" "exp3" 2 129 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 570 33 1
"3309" "exp3" 2 130 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 435 14 1
"3309" "exp3" 2 131 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 419 47 1
"3309" "exp3" 2 132 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 478 3 1
"3309" "exp3" 1 1 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 425 5 1
"3309" "exp3" 1 2 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 787 0 0
"3309" "exp3" 1 3 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 419 26 1
"3309" "exp3" 1 4 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 528 34 1
"3309" "exp3" 1 5 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 589 45 1
"3309" "exp3" 1 6 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 377 22 1
"3309" "exp3" 1 7 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 422 13 1
"3309" "exp3" 1 8 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 813 44 1
"3309" "exp3" 1 9 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 403 32 1
"3309" "exp3" 1 10 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 1023 0 0
"3309" "exp3" 1 11 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 652 19 1
"3309" "exp3" 1 12 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 554 0 0
"3309" "exp3" 1 13 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 420 0 0
"3309" "exp3" 1 14 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 616 40 1
"3309" "exp3" 1 15 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 490 45 1
"3309" "exp3" 1 16 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 668 8 1
"3309" "exp3" 1 17 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 690 0 0
"3309" "exp3" 1 18 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 528 31 1
"3309" "exp3" 1 19 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 463 0 0
"3309" "exp3" 1 20 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 945 15 1
"3309" "exp3" 1 21 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 917 44 1
"3309" "exp3" 1 22 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 1071 81 1
"3309" "exp3" 1 23 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 1014 0 0
"3309" "exp3" 1 24 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 629 39 1
"3309" "exp3" 1 25 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 418 0 0
"3309" "exp3" 1 26 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 743 27 1
"3309" "exp3" 1 27 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 700 0 0
"3309" "exp3" 1 28 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 540 14 1
"3309" "exp3" 1 29 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1039 86 1
"3309" "exp3" 1 30 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 530 0 0
"3309" "exp3" 1 31 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 402 23 1
"3309" "exp3" 1 32 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 373 7 1
"3309" "exp3" 1 33 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 511 24 1
"3309" "exp3" 1 34 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 739 0 0
"3309" "exp3" 1 35 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 501 0 0
"3309" "exp3" 1 36 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 890 15 1
"3309" "exp3" 1 37 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1624 0 0
"3309" "exp3" 1 38 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1035 0 0
"3309" "exp3" 1 39 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 853 0 0
"3309" "exp3" 1 40 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 947 93 1
"3309" "exp3" 1 41 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 774 24 1
"3309" "exp3" 1 42 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 992 49 1
"3309" "exp3" 1 43 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 622 0 0
"3309" "exp3" 1 44 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 555 18 1
"3309" "exp3" 1 45 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 674 33 1
"3309" "exp3" 1 46 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 515 31 1
"3309" "exp3" 1 47 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 744 32 1
"3309" "exp3" 1 48 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1597 12 1
"3309" "exp3" 1 49 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 980 35 1
"3309" "exp3" 1 50 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 554 0 0
"3309" "exp3" 1 51 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 777 0 0
"3309" "exp3" 1 52 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1740 18 1
"3309" "exp3" 1 53 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1377 12 1
"3309" "exp3" 1 54 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1340 34 1
"3309" "exp3" 1 55 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1081 0 0
"3309" "exp3" 1 56 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 782 0 0
"3309" "exp3" 1 57 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 532 0 0
"3309" "exp3" 1 58 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1732 0 0
"3309" "exp3" 1 59 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 928 0 0
"3309" "exp3" 1 60 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1101 21 1
"3309" "exp3" 1 61 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 647 39 1
"3309" "exp3" 1 62 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 662 0 0
"3309" "exp3" 1 63 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 965 36 1
"3309" "exp3" 1 64 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 936 0 0
"3309" "exp3" 1 65 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1374 20 1
"3309" "exp3" 1 66 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 560 28 1
"3309" "exp3" 1 67 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 476 21 1
"3309" "exp3" 1 68 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 433 2 1
"3309" "exp3" 1 69 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 862 70 1
"3309" "exp3" 1 70 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 718 0 0
"3309" "exp3" 1 71 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 575 0 0
"3309" "exp3" 1 72 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 494 0 0
"3309" "exp3" 1 73 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 812 0 0
"3309" "exp3" 1 74 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 623 25 1
"3309" "exp3" 1 75 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 708 21 1
"3309" "exp3" 1 76 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 671 16 1
"3309" "exp3" 1 77 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 798 0 0
"3309" "exp3" 1 78 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 689 35 1
"3309" "exp3" 1 79 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 425 24 1
"3309" "exp3" 1 80 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 427 0 0
"3309" "exp3" 1 81 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 691 19 1
"3309" "exp3" 1 82 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 458 0 0
"3309" "exp3" 1 83 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 614 30 1
"3309" "exp3" 1 84 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 574 28 1
"3309" "exp3" 1 85 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 532 10 1
"3309" "exp3" 1 86 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 534 0 0
"3309" "exp3" 1 87 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 446 32 1
"3309" "exp3" 1 88 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 562 30 1
"3309" "exp3" 1 89 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 883 0 0
"3309" "exp3" 1 90 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 512 20 1
"3309" "exp3" 1 91 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 674 0 0
"3309" "exp3" 1 92 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 472 47 1
"3309" "exp3" 1 93 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 564 0 0
"3309" "exp3" 1 94 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 550 26 1
"3309" "exp3" 1 95 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 565 9 1
"3309" "exp3" 1 96 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 516 0 0
"3309" "exp3" 1 97 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 476 1 1
"3309" "exp3" 1 98 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 932 11 1
"3309" "exp3" 1 99 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1483 36 1
"3309" "exp3" 1 100 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 582 0 0
"3309" "exp3" 1 101 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 457 13 1
"3309" "exp3" 1 102 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 677 25 1
"3309" "exp3" 1 103 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 499 20 1
"3309" "exp3" 1 104 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 764 23 1
"3309" "exp3" 1 105 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 693 71 1
"3309" "exp3" 1 106 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 486 17 1
"3309" "exp3" 1 107 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 610 37 1
"3309" "exp3" 1 108 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 948 0 0
"3309" "exp3" 1 109 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 810 24 1
"3309" "exp3" 1 110 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 633 0 0
"3309" "exp3" 1 111 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 461 0 0
"3309" "exp3" 1 112 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 725 0 0
"3309" "exp3" 1 113 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 434 0 0
"3309" "exp3" 1 114 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 457 20 1
"3309" "exp3" 1 115 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 617 0 0
"3309" "exp3" 1 116 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 587 23 1
"3309" "exp3" 1 117 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 639 0 0
"3309" "exp3" 1 118 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1098 15 1
"3309" "exp3" 1 119 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 496 0 0
"3309" "exp3" 1 120 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1002 32 1
"3309" "exp3" 1 121 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 576 0 0
"3309" "exp3" 1 122 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 581 26 1
"3309" "exp3" 1 123 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 444 3 1
"3309" "exp3" 1 124 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 930 19 1
"3309" "exp3" 1 125 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 531 22 1
"3309" "exp3" 1 126 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 446 5 1
"3309" "exp3" 1 127 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 697 28 1
"3309" "exp3" 1 128 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 567 0 0
"3309" "exp3" 1 129 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 496 38 1
"3309" "exp3" 1 130 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 413 33 1
"3309" "exp3" 1 131 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 472 18 1
"3309" "exp3" 1 132 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 422 6 1
"3309" "exp3" 2 1 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 818 13 1
"3309" "exp3" 2 2 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 876 42 1
"3309" "exp3" 2 3 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 425 0 0
"3309" "exp3" 2 4 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 481 15 1
"3309" "exp3" 2 5 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 449 31 1
"3309" "exp3" 2 6 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 381 38 1
"3309" "exp3" 2 7 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 452 0 0
"3309" "exp3" 2 8 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 388 10 1
"3309" "exp3" 2 9 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 473 14 1
"3309" "exp3" 2 10 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 548 0 0
"3309" "exp3" 2 11 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 674 34 1
"3309" "exp3" 2 12 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 516 21 1
"3309" "exp3" 2 13 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 960 14 1
"3309" "exp3" 2 14 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 594 0 0
"3309" "exp3" 2 15 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1140 0 0
"3309" "exp3" 2 16 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 739 63 1
"3309" "exp3" 2 17 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 555 0 0
"3309" "exp3" 2 18 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 586 0 0
"3309" "exp3" 2 19 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 447 0 0
"3309" "exp3" 2 20 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 529 13 1
"3309" "exp3" 2 21 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 706 99 1
"3309" "exp3" 2 22 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 710 0 0
"3309" "exp3" 2 23 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 733 0 0
"3309" "exp3" 2 24 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1824 0 0
"3309" "exp3" 2 25 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 625 30 1
"3309" "exp3" 2 26 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 644 40 1
"3309" "exp3" 2 27 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 565 32 1
"3309" "exp3" 2 28 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 462 39 1
"3309" "exp3" 2 29 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 562 57 1
"3309" "exp3" 2 30 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 700 28 1
"3309" "exp3" 2 31 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 493 0 0
"3309" "exp3" 2 32 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 380 30 1
"3309" "exp3" 2 33 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 764 35 1
"3309" "exp3" 2 34 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 867 37 1
"3309" "exp3" 2 35 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 591 25 1
"3309" "exp3" 2 36 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 618 0 0
"3309" "exp3" 2 37 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 646 20 1
"3309" "exp3" 2 38 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 405 0 0
"3309" "exp3" 2 39 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 447 12 1
"3309" "exp3" 2 40 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 678 29 1
"3309" "exp3" 2 41 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 592 42 1
"3309" "exp3" 2 42 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 441 31 1
"3309" "exp3" 2 43 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 370 0 0
"3309" "exp3" 2 44 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 426 0 0
"3309" "exp3" 2 45 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 491 19 1
"3309" "exp3" 2 46 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 612 39 1
"3309" "exp3" 2 47 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 405 26 1
"3309" "exp3" 2 48 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 509 0 0
"3309" "exp3" 2 49 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 449 12 1
"3309" "exp3" 2 50 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 673 36 1
"3309" "exp3" 2 51 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 870 0 0
"3309" "exp3" 2 52 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1065 0 0
"3309" "exp3" 2 53 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 757 19 1
"3309" "exp3" 2 54 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 513 7 1
"3309" "exp3" 2 55 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 851 0 0
"3309" "exp3" 2 56 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 611 26 1
"3309" "exp3" 2 57 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 657 31 1
"3309" "exp3" 2 58 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 586 0 0
"3309" "exp3" 2 59 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 928 0 0
"3309" "exp3" 2 60 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 568 6 1
"3309" "exp3" 2 61 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 734 0 0
"3309" "exp3" 2 62 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 548 32 1
"3309" "exp3" 2 63 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 707 0 0
"3309" "exp3" 2 64 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 601 36 1
"3309" "exp3" 2 65 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1195 0 0
"3309" "exp3" 2 66 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1527 90 1
"3309" "exp3" 2 67 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 821 0 0
"3309" "exp3" 2 68 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1218 19 1
"3309" "exp3" 2 69 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 636 0 0
"3309" "exp3" 2 70 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 703 19 1
"3309" "exp3" 2 71 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 744 17 1
"3309" "exp3" 2 72 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 833 0 0
"3309" "exp3" 2 73 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 532 29 1
"3309" "exp3" 2 74 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 475 8 1
"3309" "exp3" 2 75 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 472 67 1
"3309" "exp3" 2 76 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 460 0 0
"3309" "exp3" 2 77 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 982 0 0
"3309" "exp3" 2 78 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1280 32 1
"3309" "exp3" 2 79 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 913 17 1
"3309" "exp3" 2 80 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 617 30 1
"3309" "exp3" 2 81 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 554 25 1
"3309" "exp3" 2 82 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 636 22 1
"3309" "exp3" 2 83 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 571 23 1
"3309" "exp3" 2 84 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 858 17 1
"3309" "exp3" 2 85 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 960 0 0
"3309" "exp3" 2 86 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 770 45 1
"3309" "exp3" 2 87 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 721 16 1
"3309" "exp3" 2 88 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 535 47 1
"3309" "exp3" 2 89 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 815 17 1
"3309" "exp3" 2 90 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 584 2 1
"3309" "exp3" 2 91 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 609 27 1
"3309" "exp3" 2 92 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 692 25 1
"3309" "exp3" 2 93 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 630 24 1
"3309" "exp3" 2 94 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 674 18 1
"3309" "exp3" 2 95 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 526 35 1
"3309" "exp3" 2 96 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 456 24 1
"3309" "exp3" 2 97 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 613 41 1
"3309" "exp3" 2 98 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 463 5 1
"3309" "exp3" 2 99 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 749 0 0
"3309" "exp3" 2 100 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 690 27 1
"3309" "exp3" 2 101 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 523 0 0
"3309" "exp3" 2 102 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 647 29 1
"3309" "exp3" 2 103 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 946 0 0
"3309" "exp3" 2 104 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 856 21 1
"3309" "exp3" 2 105 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 746 38 1
"3309" "exp3" 2 106 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 557 16 1
"3309" "exp3" 2 107 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 879 21 1
"3309" "exp3" 2 108 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 981 40 1
"3309" "exp3" 2 109 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 706 0 0
"3309" "exp3" 2 110 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 458 22 1
"3309" "exp3" 2 111 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 975 0 0
"3309" "exp3" 2 112 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1110 95 1
"3309" "exp3" 2 113 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1070 22 1
"3309" "exp3" 2 114 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 706 44 1
"3309" "exp3" 2 115 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 864 0 0
"3309" "exp3" 2 116 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 695 0 0
"3309" "exp3" 2 117 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 863 20 1
"3309" "exp3" 2 118 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 743 0 0
"3309" "exp3" 2 119 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 827 20 1
"3309" "exp3" 2 120 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1057 11 1
"3309" "exp3" 2 121 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 989 23 1
"3309" "exp3" 2 122 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1251 28 1
"3309" "exp3" 2 123 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 744 18 1
"3309" "exp3" 2 124 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 666 13 1
"3309" "exp3" 2 125 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 740 22 1
"3309" "exp3" 2 126 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 882 26 1
"3309" "exp3" 2 127 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1158 23 1
"3309" "exp3" 2 128 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 887 0 0
"3309" "exp3" 2 129 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 552 0 0
"3309" "exp3" 2 130 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 671 18 1
"3309" "exp3" 2 131 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 579 0 0
"3309" "exp3" 2 132 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 508 15 1
"3309" "exp3" 1 1 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 773 0 0
"3309" "exp3" 1 2 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 756 0 0
"3309" "exp3" 1 3 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 476 0 0
"3309" "exp3" 1 4 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 436 37 1
"3309" "exp3" 1 5 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 401 0 0
"3309" "exp3" 1 6 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 426 42 1
"3309" "exp3" 1 7 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 345 22 1
"3309" "exp3" 1 8 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 376 26 1
"3309" "exp3" 1 9 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 513 16 1
"3309" "exp3" 1 10 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 365 9 1
"3309" "exp3" 1 11 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 429 0 0
"3309" "exp3" 1 12 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 310 15 1
"3309" "exp3" 1 13 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 412 27 1
"3309" "exp3" 1 14 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 429 42 1
"3309" "exp3" 1 15 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 475 6 1
"3309" "exp3" 1 16 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 461 1 1
"3309" "exp3" 1 17 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 503 0 0
"3309" "exp3" 1 18 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 428 0 0
"3309" "exp3" 1 19 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 446 66 1
"3309" "exp3" 1 20 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 318 0 0
"3309" "exp3" 1 21 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 573 19 1
"3309" "exp3" 1 22 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 705 0 0
"3309" "exp3" 1 23 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 552 0 0
"3309" "exp3" 1 24 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 594 27 1
"3309" "exp3" 1 25 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 523 20 1
"3309" "exp3" 1 26 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 470 10 1
"3309" "exp3" 1 27 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 405 0 0
"3309" "exp3" 1 28 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 564 26 1
"3309" "exp3" 1 29 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 456 4 1
"3309" "exp3" 1 30 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 557 15 1
"3309" "exp3" 1 31 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 455 0 0
"3309" "exp3" 1 32 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 919 44 1
"3309" "exp3" 1 33 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 704 0 0
"3309" "exp3" 1 34 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 862 32 1
"3309" "exp3" 1 35 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 703 0 0
"3309" "exp3" 1 36 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 560 18 1
"3309" "exp3" 1 37 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 549 11 1
"3309" "exp3" 1 38 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 562 14 1
"3309" "exp3" 1 39 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 465 17 1
"3309" "exp3" 1 40 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 535 0 0
"3309" "exp3" 1 41 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 553 0 0
"3309" "exp3" 1 42 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 443 25 1
"3309" "exp3" 1 43 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 549 40 1
"3309" "exp3" 1 44 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 492 5 1
"3309" "exp3" 1 45 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 453 27 1
"3309" "exp3" 1 46 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 504 0 0
"3309" "exp3" 1 47 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 353 7 1
"3309" "exp3" 1 48 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 441 0 0
"3309" "exp3" 1 49 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 521 19 1
"3309" "exp3" 1 50 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 486 22 1
"3309" "exp3" 1 51 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 604 32 1
"3309" "exp3" 1 52 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 518 38 1
"3309" "exp3" 1 53 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 403 0 0
"3309" "exp3" 1 54 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 409 8 1
"3309" "exp3" 1 55 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 476 5 1
"3309" "exp3" 1 56 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 550 34 1
"3309" "exp3" 1 57 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 465 0 0
"3309" "exp3" 1 58 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 439 41 1
"3309" "exp3" 1 59 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 343 0 0
"3309" "exp3" 1 60 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 499 25 1
"3309" "exp3" 1 61 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 422 46 1
"3309" "exp3" 1 62 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 539 18 1
"3309" "exp3" 1 63 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 515 24 1
"3309" "exp3" 1 64 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 536 25 1
"3309" "exp3" 1 65 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 428 0 0
"3309" "exp3" 1 66 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 673 30 1
"3309" "exp3" 1 67 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 495 34 1
"3309" "exp3" 1 68 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 529 10 1
"3309" "exp3" 1 69 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 551 40 1
"3309" "exp3" 1 70 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 501 36 1
"3309" "exp3" 1 71 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 375 0 0
"3309" "exp3" 1 72 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 602 0 0
"3309" "exp3" 1 73 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 883 0 0
"3309" "exp3" 1 74 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 623 19 1
"3309" "exp3" 1 75 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 520 41 1
"3309" "exp3" 1 76 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 635 13 1
"3309" "exp3" 1 77 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 481 0 0
"3309" "exp3" 1 78 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 499 8 1
"3309" "exp3" 1 79 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 516 0 0
"3309" "exp3" 1 80 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 390 19 1
"3309" "exp3" 1 81 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 460 22 1
"3309" "exp3" 1 82 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 514 18 1
"3309" "exp3" 1 83 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 508 23 1
"3309" "exp3" 1 84 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 525 11 1
"3309" "exp3" 1 85 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 439 13 1
"3309" "exp3" 1 86 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 518 0 0
"3309" "exp3" 1 87 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 483 31 1
"3309" "exp3" 1 88 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 471 21 1
"3309" "exp3" 1 89 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 562 23 1
"3309" "exp3" 1 90 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 695 20 1
"3309" "exp3" 1 91 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 749 26 1
"3309" "exp3" 1 92 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 507 24 1
"3309" "exp3" 1 93 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 580 47 1
"3309" "exp3" 1 94 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 548 0 0
"3309" "exp3" 1 95 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 387 0 0
"3309" "exp3" 1 96 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 518 16 1
"3309" "exp3" 1 97 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 901 33 1
"3309" "exp3" 1 98 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 531 21 1
"3309" "exp3" 1 99 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 483 12 1
"3309" "exp3" 1 100 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 410 0 0
"3309" "exp3" 1 101 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 598 26 1
"3309" "exp3" 1 102 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 525 45 1
"3309" "exp3" 1 103 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 583 0 0
"3309" "exp3" 1 104 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 459 39 1
"3309" "exp3" 1 105 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 432 0 0
"3309" "exp3" 1 106 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 543 0 0
"3309" "exp3" 1 107 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 558 9 1
"3309" "exp3" 1 108 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 461 17 1
"3309" "exp3" 1 109 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 436 0 0
"3309" "exp3" 1 110 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 501 0 0
"3309" "exp3" 1 111 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 404 0 0
"3309" "exp3" 1 112 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 350 2 1
"3309" "exp3" 1 113 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 667 28 1
"3309" "exp3" 1 114 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 767 0 0
"3309" "exp3" 1 115 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1003 43 1
"3309" "exp3" 1 116 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 559 17 1
"3309" "exp3" 1 117 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1491 15 1
"3309" "exp3" 1 118 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 694 68 1
"3309" "exp3" 1 119 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 769 0 0
"3309" "exp3" 1 120 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 616 30 1
"3309" "exp3" 1 121 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 595 0 0
"3309" "exp3" 1 122 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 465 7 1
"3309" "exp3" 1 123 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 718 0 0
"3309" "exp3" 1 124 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 630 14 1
"3309" "exp3" 1 125 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 458 13 1
"3309" "exp3" 1 126 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 694 33 1
"3309" "exp3" 1 127 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 813 38 1
"3309" "exp3" 1 128 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 579 0 0
"3309" "exp3" 1 129 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 776 20 1
"3309" "exp3" 1 130 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 747 36 1
"3309" "exp3" 1 131 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 492 25 1
"3309" "exp3" 1 132 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 652 24 1
"3309" "exp3" 2 1 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 617 0 0
"3309" "exp3" 2 2 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 455 7 1
"3309" "exp3" 2 3 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 478 46 1
"3309" "exp3" 2 4 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 664 28 1
"3309" "exp3" 2 5 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 492 77 1
"3309" "exp3" 2 6 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 445 0 0
"3309" "exp3" 2 7 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 515 0 0
"3309" "exp3" 2 8 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 471 13 1
"3309" "exp3" 2 9 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 440 0 0
"3309" "exp3" 2 10 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 504 35 1
"3309" "exp3" 2 11 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 588 22 1
"3309" "exp3" 2 12 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 418 89 1
"3309" "exp3" 2 13 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 465 25 1
"3309" "exp3" 2 14 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 578 0 0
"3309" "exp3" 2 15 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 424 7 1
"3309" "exp3" 2 16 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 549 19 1
"3309" "exp3" 2 17 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 715 73 1
"3309" "exp3" 2 18 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 492 25 1
"3309" "exp3" 2 19 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 438 0 0
"3309" "exp3" 2 20 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 547 0 0
"3309" "exp3" 2 21 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 590 38 1
"3309" "exp3" 2 22 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 475 12 1
"3309" "exp3" 2 23 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 473 0 0
"3309" "exp3" 2 24 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 486 29 1
"3309" "exp3" 2 25 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 437 34 1
"3309" "exp3" 2 26 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 488 1 1
"3309" "exp3" 2 27 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 471 18 1
"3309" "exp3" 2 28 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 443 0 0
"3309" "exp3" 2 29 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 453 15 1
"3309" "exp3" 2 30 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 480 30 1
"3309" "exp3" 2 31 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1178 0 0
"3309" "exp3" 2 32 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 543 5 1
"3309" "exp3" 2 33 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 406 32 1
"3309" "exp3" 2 34 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 377 26 1
"3309" "exp3" 2 35 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 412 23 1
"3309" "exp3" 2 36 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 526 39 1
"3309" "exp3" 2 37 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 414 33 1
"3309" "exp3" 2 38 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 439 28 1
"3309" "exp3" 2 39 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1411 0 0
"3309" "exp3" 2 40 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 583 28 1
"3309" "exp3" 2 41 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 536 0 0
"3309" "exp3" 2 42 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 585 0 0
"3309" "exp3" 2 43 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 911 43 1
"3309" "exp3" 2 44 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 471 0 0
"3309" "exp3" 2 45 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 438 27 1
"3309" "exp3" 2 46 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 462 0 0
"3309" "exp3" 2 47 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 514 22 1
"3309" "exp3" 2 48 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 563 40 1
"3309" "exp3" 2 49 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 438 0 0
"3309" "exp3" 2 50 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 518 11 1
"3309" "exp3" 2 51 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 404 13 1
"3309" "exp3" 2 52 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 555 33 1
"3309" "exp3" 2 53 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 597 0 0
"3309" "exp3" 2 54 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 312 18 1
"3309" "exp3" 2 55 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 325 24 1
"3309" "exp3" 2 56 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 244 94 1
"3309" "exp3" 2 57 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 582 0 0
"3309" "exp3" 2 58 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 322 23 1
"3309" "exp3" 2 59 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 335 0 0
"3309" "exp3" 2 60 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 329 0 0
"3309" "exp3" 2 61 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 613 12 1
"3309" "exp3" 2 62 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 788 22 1
"3309" "exp3" 2 63 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 343 9 1
"3309" "exp3" 2 64 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 366 21 1
"3309" "exp3" 2 65 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 547 21 1
"3309" "exp3" 2 66 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 351 15 1
"3309" "exp3" 2 67 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 385 19 1
"3309" "exp3" 2 68 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 601 17 1
"3309" "exp3" 2 69 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 512 8 1
"3309" "exp3" 2 70 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 608 16 1
"3309" "exp3" 2 71 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 531 13 1
"3309" "exp3" 2 72 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 395 44 1
"3309" "exp3" 2 73 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 445 28 1
"3309" "exp3" 2 74 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 570 2 1
"3309" "exp3" 2 75 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 500 0 0
"3309" "exp3" 2 76 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 293 0 0
"3309" "exp3" 2 77 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 530 17 1
"3309" "exp3" 2 78 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 243 19 1
"3309" "exp3" 2 79 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 438 10 1
"3309" "exp3" 2 80 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 182 0 0
"3309" "exp3" 2 81 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 305 0 0
"3309" "exp3" 2 82 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 321 84 1
"3309" "exp3" 2 83 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 405 0 0
"3309" "exp3" 2 84 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 428 55 1
"3309" "exp3" 2 85 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 607 35 1
"3309" "exp3" 2 86 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 304 4 1
"3309" "exp3" 2 87 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 412 5 1
"3309" "exp3" 2 88 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 486 17 1
"3309" "exp3" 2 89 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 350 75 1
"3309" "exp3" 2 90 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 630 14 1
"3309" "exp3" 2 91 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1196 27 1
"3309" "exp3" 2 92 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 489 33 1
"3309" "exp3" 2 93 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 680 36 1
"3309" "exp3" 2 94 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 368 0 0
"3309" "exp3" 2 95 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 373 23 1
"3309" "exp3" 2 96 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 442 36 1
"3309" "exp3" 2 97 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 919 0 0
"3309" "exp3" 2 98 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 641 15 1
"3309" "exp3" 2 99 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 550 0 0
"3309" "exp3" 2 100 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 445 20 1
"3309" "exp3" 2 101 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 450 6 1
"3309" "exp3" 2 102 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 403 3 1
"3309" "exp3" 2 103 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 566 37 1
"3309" "exp3" 2 104 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 939 0 0
"3309" "exp3" 2 105 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 498 16 1
"3309" "exp3" 2 106 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 533 32 1
"3309" "exp3" 2 107 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 426 0 0
"3309" "exp3" 2 108 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 413 66 1
"3309" "exp3" 2 109 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 411 59 1
"3309" "exp3" 2 110 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 436 66 1
"3309" "exp3" 2 111 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 524 48 1
"3309" "exp3" 2 112 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 522 0 0
"3309" "exp3" 2 113 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 712 19 1
"3309" "exp3" 2 114 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 737 70 1
"3309" "exp3" 2 115 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 671 26 1
"3309" "exp3" 2 116 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 532 24 1
"3309" "exp3" 2 117 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 659 14 1
"3309" "exp3" 2 118 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1092 69 1
"3309" "exp3" 2 119 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 600 24 1
"3309" "exp3" 2 120 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 466 22 1
"3309" "exp3" 2 121 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 518 8 1
"3309" "exp3" 2 122 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 715 37 1
"3309" "exp3" 2 123 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 528 26 1
"3309" "exp3" 2 124 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 479 29 1
"3309" "exp3" 2 125 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 481 40 1
"3309" "exp3" 2 126 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 563 0 0
"3309" "exp3" 2 127 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 532 20 1
"3309" "exp3" 2 128 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 796 32 1
"3309" "exp3" 2 129 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 671 26 1
"3309" "exp3" 2 130 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 574 43 1
"3309" "exp3" 2 131 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 559 0 0
"3309" "exp3" 2 132 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 555 9 1
"3401" "exp3" 1 1 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 4043 33 1
"3401" "exp3" 1 2 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2751 0 0
"3401" "exp3" 1 3 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 4426 0 0
"3401" "exp3" 1 4 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 3286 43 1
"3401" "exp3" 1 5 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 2601 5 1
"3401" "exp3" 1 6 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 3930 66 1
"3401" "exp3" 1 7 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 2387 0 0
"3401" "exp3" 1 8 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 2715 0 0
"3401" "exp3" 1 9 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 5027 0 0
"3401" "exp3" 1 10 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 3323 0 0
"3401" "exp3" 1 11 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 4892 0 0
"3401" "exp3" 1 12 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 5078 21 1
"3401" "exp3" 1 13 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 10366 65 1
"3401" "exp3" 1 14 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 5503 0 0
"3401" "exp3" 1 15 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 5927 0 0
"3401" "exp3" 1 16 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 3412 11 1
"3401" "exp3" 1 17 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 4030 20 1
"3401" "exp3" 1 18 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 4374 13 1
"3401" "exp3" 1 19 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 6331 56 1
"3401" "exp3" 1 20 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 2857 0 0
"3401" "exp3" 1 21 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 5969 0 0
"3401" "exp3" 1 22 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 5473 0 0
"3401" "exp3" 1 23 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 9452 8 1
"3401" "exp3" 1 24 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 5526 0 0
"3401" "exp3" 1 25 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 6539 84 1
"3401" "exp3" 1 26 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 3243 20 1
"3401" "exp3" 1 27 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 3243 29 1
"3401" "exp3" 1 28 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 4127 0 0
"3401" "exp3" 1 29 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 8319 0 0
"3401" "exp3" 1 30 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 6862 0 0
"3401" "exp3" 1 31 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 3053 0 0
"3401" "exp3" 1 32 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 3425 35 1
"3401" "exp3" 1 33 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 5787 0 0
"3401" "exp3" 1 34 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 8451 0 0
"3401" "exp3" 1 35 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 7444 27 1
"3401" "exp3" 1 36 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 3723 3 1
"3401" "exp3" 1 37 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 6324 0 0
"3401" "exp3" 1 38 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 4590 29 1
"3401" "exp3" 1 39 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 2660 62 1
"3401" "exp3" 1 40 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 2129 0 0
"3401" "exp3" 1 41 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 6489 0 0
"3401" "exp3" 1 42 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 5888 0 0
"3401" "exp3" 1 43 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 5196 69 1
"3401" "exp3" 1 44 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 20308 0 0
"3401" "exp3" 1 45 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 5647 0 0
"3401" "exp3" 1 46 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 2177 82 1
"3401" "exp3" 1 47 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 4029 0 0
"3401" "exp3" 1 48 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 4963 0 0
"3401" "exp3" 1 49 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 5741 68 1
"3401" "exp3" 1 50 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 4260 0 0
"3401" "exp3" 1 51 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 3282 87 1
"3401" "exp3" 1 52 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 10459 0 0
"3401" "exp3" 1 53 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 7108 0 0
"3401" "exp3" 1 54 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 3578 13 1
"3401" "exp3" 1 55 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 5486 0 0
"3401" "exp3" 1 56 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 3147 0 0
"3401" "exp3" 1 57 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 6288 45 1
"3401" "exp3" 1 58 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 3927 65 1
"3401" "exp3" 1 59 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 3336 15 1
"3401" "exp3" 1 60 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 5033 31 1
"3401" "exp3" 1 61 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 3483 0 0
"3401" "exp3" 1 62 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 8987 28 1
"3401" "exp3" 1 63 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 3674 0 0
"3401" "exp3" 1 64 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 6876 25 1
"3401" "exp3" 1 65 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 8513 0 0
"3401" "exp3" 1 66 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 11092 30 1
"3401" "exp3" 1 67 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2577 0 0
"3401" "exp3" 1 68 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 3493 0 0
"3401" "exp3" 1 69 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 7258 39 1
"3401" "exp3" 1 70 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 4721 77 1
"3401" "exp3" 1 71 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 3414 0 0
"3401" "exp3" 1 72 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 12012 0 0
"3401" "exp3" 1 73 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2439 22 1
"3401" "exp3" 1 74 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 4891 0 0
"3401" "exp3" 1 75 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 8254 0 0
"3401" "exp3" 1 76 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 5350 37 1
"3401" "exp3" 1 77 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 8103 81 1
"3401" "exp3" 1 78 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 3028 0 0
"3401" "exp3" 1 79 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 2438 18 1
"3401" "exp3" 1 80 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 3631 43 1
"3401" "exp3" 1 81 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 2586 90 1
"3401" "exp3" 1 82 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 2445 0 0
"3401" "exp3" 1 83 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 4716 68 1
"3401" "exp3" 1 84 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 3013 0 0
"3401" "exp3" 1 85 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 6449 89 1
"3401" "exp3" 1 86 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 6788 0 0
"3401" "exp3" 1 87 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 4797 84 1
"3401" "exp3" 1 88 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 7589 0 0
"3401" "exp3" 1 89 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 5599 0 0
"3401" "exp3" 1 90 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 6897 28 1
"3401" "exp3" 1 91 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 7734 47 1
"3401" "exp3" 1 92 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 8837 0 0
"3401" "exp3" 1 93 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 2922 0 0
"3401" "exp3" 1 94 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 5298 79 1
"3401" "exp3" 1 95 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 4760 24 1
"3401" "exp3" 1 96 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2163 17 1
"3401" "exp3" 1 97 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 5723 14 1
"3401" "exp3" 1 98 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 10029 34 1
"3401" "exp3" 1 99 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2537 0 0
"3401" "exp3" 1 100 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 4034 6 1
"3401" "exp3" 1 101 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 6357 0 0
"3401" "exp3" 1 102 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 6817 0 0
"3401" "exp3" 1 103 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 4499 67 1
"3401" "exp3" 1 104 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 3607 0 0
"3401" "exp3" 1 105 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 3698 0 0
"3401" "exp3" 1 106 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 2842 0 0
"3401" "exp3" 1 107 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 5770 0 0
"3401" "exp3" 1 108 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 5276 20 1
"3401" "exp3" 1 109 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 4717 26 1
"3401" "exp3" 1 110 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2342 0 0
"3401" "exp3" 1 111 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 7319 25 1
"3401" "exp3" 1 112 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 10164 63 1
"3401" "exp3" 1 113 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 4411 0 0
"3401" "exp3" 1 114 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 7071 0 0
"3401" "exp3" 1 115 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2867 0 0
"3401" "exp3" 1 116 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 5728 0 0
"3401" "exp3" 1 117 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 4184 0 0
"3401" "exp3" 1 118 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 7460 0 0
"3401" "exp3" 1 119 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 3675 0 0
"3401" "exp3" 1 120 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 4272 16 1
"3401" "exp3" 1 121 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 2825 74 1
"3401" "exp3" 1 122 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 5893 78 1
"3401" "exp3" 1 123 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 4002 0 0
"3401" "exp3" 1 124 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 3246 0 0
"3401" "exp3" 1 125 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 5876 0 0
"3401" "exp3" 1 126 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 5061 19 1
"3401" "exp3" 1 127 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 4907 95 1
"3401" "exp3" 1 128 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 3275 0 0
"3401" "exp3" 1 129 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2455 49 1
"3401" "exp3" 1 130 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 3499 0 0
"3401" "exp3" 1 131 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 6749 38 1
"3401" "exp3" 1 132 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 2621 77 1
"3401" "exp3" 2 1 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 3813 0 0
"3401" "exp3" 2 2 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 7315 80 1
"3401" "exp3" 2 3 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 4147 47 1
"3401" "exp3" 2 4 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 5085 0 0
"3401" "exp3" 2 5 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 5841 0 0
"3401" "exp3" 2 6 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2616 0 0
"3401" "exp3" 2 7 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 10158 0 0
"3401" "exp3" 2 8 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 3096 0 0
"3401" "exp3" 2 9 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 2949 0 0
"3401" "exp3" 2 10 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 3613 42 1
"3401" "exp3" 2 11 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 12245 35 1
"3401" "exp3" 2 12 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 3521 44 1
"3401" "exp3" 2 13 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 2276 28 1
"3401" "exp3" 2 14 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 4215 73 1
"3401" "exp3" 2 15 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 4480 0 0
"3401" "exp3" 2 16 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 2833 65 1
"3401" "exp3" 2 17 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 5703 0 0
"3401" "exp3" 2 18 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 7206 45 1
"3401" "exp3" 2 19 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 5225 72 1
"3401" "exp3" 2 20 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 3839 0 0
"3401" "exp3" 2 21 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 7179 0 0
"3401" "exp3" 2 22 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 3847 36 1
"3401" "exp3" 2 23 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 4529 0 0
"3401" "exp3" 2 24 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 3131 0 0
"3401" "exp3" 2 25 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 4070 46 1
"3401" "exp3" 2 26 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2324 45 1
"3401" "exp3" 2 27 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 2794 0 0
"3401" "exp3" 2 28 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 4359 0 0
"3401" "exp3" 2 29 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 2619 0 0
"3401" "exp3" 2 30 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 8124 0 0
"3401" "exp3" 2 31 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 1314 0 0
"3401" "exp3" 2 32 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1257 10 1
"3401" "exp3" 2 33 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 5202 0 0
"3401" "exp3" 2 34 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 3967 0 0
"3401" "exp3" 2 35 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 1811 0 0
"3401" "exp3" 2 36 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 3292 0 0
"3401" "exp3" 2 37 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 3267 78 1
"3401" "exp3" 2 38 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 5663 68 1
"3401" "exp3" 2 39 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 9417 0 0
"3401" "exp3" 2 40 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1991 75 1
"3401" "exp3" 2 41 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 1598 0 0
"3401" "exp3" 2 42 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 2510 0 0
"3401" "exp3" 2 43 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 5274 0 0
"3401" "exp3" 2 44 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 12563 0 0
"3401" "exp3" 2 45 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 3694 0 0
"3401" "exp3" 2 46 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 1304 82 1
"3401" "exp3" 2 47 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 1841 0 0
"3401" "exp3" 2 48 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 2268 76 1
"3401" "exp3" 2 49 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1916 0 0
"3401" "exp3" 2 50 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1736 0 0
"3401" "exp3" 2 51 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 4706 37 1
"3401" "exp3" 2 52 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1822 85 1
"3401" "exp3" 2 53 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1410 0 0
"3401" "exp3" 2 54 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1794 0 0
"3401" "exp3" 2 55 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 3423 70 1
"3401" "exp3" 2 56 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1411 0 0
"3401" "exp3" 2 57 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 5039 37 1
"3401" "exp3" 2 58 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2914 39 1
"3401" "exp3" 2 59 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3666 0 0
"3401" "exp3" 2 60 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 4461 38 1
"3401" "exp3" 2 61 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1937 0 0
"3401" "exp3" 2 62 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 5897 36 1
"3401" "exp3" 2 63 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1268 0 0
"3401" "exp3" 2 64 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2438 0 0
"3401" "exp3" 2 65 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 2901 78 1
"3401" "exp3" 2 66 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1536 0 0
"3401" "exp3" 2 67 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 1910 0 0
"3401" "exp3" 2 68 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2681 38 1
"3401" "exp3" 2 69 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1507 89 1
"3401" "exp3" 2 70 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 7337 0 0
"3401" "exp3" 2 71 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 2432 0 0
"3401" "exp3" 2 72 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 1842 87 1
"3401" "exp3" 2 73 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 3161 0 0
"3401" "exp3" 2 74 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 2544 0 0
"3401" "exp3" 2 75 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 2524 0 0
"3401" "exp3" 2 76 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 2630 0 0
"3401" "exp3" 2 77 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 4910 33 1
"3401" "exp3" 2 78 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 10581 41 1
"3401" "exp3" 2 79 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 3729 0 0
"3401" "exp3" 2 80 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 4112 33 1
"3401" "exp3" 2 81 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2115 0 0
"3401" "exp3" 2 82 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 5923 66 1
"3401" "exp3" 2 83 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 7036 43 1
"3401" "exp3" 2 84 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 3194 0 0
"3401" "exp3" 2 85 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2021 0 0
"3401" "exp3" 2 86 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 6582 0 0
"3401" "exp3" 2 87 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 3579 74 1
"3401" "exp3" 2 88 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1025 0 0
"3401" "exp3" 2 89 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 962 0 0
"3401" "exp3" 2 90 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 2962 0 0
"3401" "exp3" 2 91 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 4896 0 0
"3401" "exp3" 2 92 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 3546 0 0
"3401" "exp3" 2 93 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 7904 0 0
"3401" "exp3" 2 94 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 4325 0 0
"3401" "exp3" 2 95 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 3859 74 1
"3401" "exp3" 2 96 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2533 0 0
"3401" "exp3" 2 97 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2977 0 0
"3401" "exp3" 2 98 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 6620 0 0
"3401" "exp3" 2 99 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 5545 73 1
"3401" "exp3" 2 100 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 3241 0 0
"3401" "exp3" 2 101 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 4981 0 0
"3401" "exp3" 2 102 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 2928 0 0
"3401" "exp3" 2 103 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 5606 0 0
"3401" "exp3" 2 104 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 10872 0 0
"3401" "exp3" 2 105 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 15956 80 1
"3401" "exp3" 2 106 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 2990 0 0
"3401" "exp3" 2 107 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1229 92 1
"3401" "exp3" 2 108 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 13912 0 0
"3401" "exp3" 2 109 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 5355 78 1
"3401" "exp3" 2 110 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 4845 0 0
"3401" "exp3" 2 111 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 6840 0 0
"3401" "exp3" 2 112 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1701 0 0
"3401" "exp3" 2 113 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 4912 34 1
"3401" "exp3" 2 114 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2015 0 0
"3401" "exp3" 2 115 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1187 0 0
"3401" "exp3" 2 116 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 3329 39 1
"3401" "exp3" 2 117 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 6166 0 0
"3401" "exp3" 2 118 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 5920 0 0
"3401" "exp3" 2 119 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 9163 0 0
"3401" "exp3" 2 120 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 4558 0 0
"3401" "exp3" 2 121 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 5344 0 0
"3401" "exp3" 2 122 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 3328 0 0
"3401" "exp3" 2 123 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 3300 0 0
"3401" "exp3" 2 124 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 13522 28 1
"3401" "exp3" 2 125 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 7196 18 1
"3401" "exp3" 2 126 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1919 0 0
"3401" "exp3" 2 127 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 3950 70 1
"3401" "exp3" 2 128 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 1848 0 0
"3401" "exp3" 2 129 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 6789 0 0
"3401" "exp3" 2 130 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 9004 33 1
"3401" "exp3" 2 131 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 6317 0 0
"3401" "exp3" 2 132 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 1950 79 1
"3401" "exp3" 1 1 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 3271 0 0
"3401" "exp3" 1 2 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 2006 0 0
"3401" "exp3" 1 3 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 3035 0 0
"3401" "exp3" 1 4 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 2752 0 0
"3401" "exp3" 1 5 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2682 0 0
"3401" "exp3" 1 6 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 4194 31 1
"3401" "exp3" 1 7 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 2136 0 0
"3401" "exp3" 1 8 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 3070 75 1
"3401" "exp3" 1 9 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 5215 17 1
"3401" "exp3" 1 10 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 2830 74 1
"3401" "exp3" 1 11 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2766 40 1
"3401" "exp3" 1 12 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 6893 0 0
"3401" "exp3" 1 13 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 9698 0 0
"3401" "exp3" 1 14 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 4526 26 1
"3401" "exp3" 1 15 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1007 0 0
"3401" "exp3" 1 16 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 1513 0 0
"3401" "exp3" 1 17 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 743 0 0
"3401" "exp3" 1 18 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 689 0 0
"3401" "exp3" 1 19 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 658 0 0
"3401" "exp3" 1 20 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1694 0 0
"3401" "exp3" 1 21 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1020 0 0
"3401" "exp3" 1 22 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 675 0 0
"3401" "exp3" 1 23 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2074 0 0
"3401" "exp3" 1 24 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 4093 0 0
"3401" "exp3" 1 25 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1058 0 0
"3401" "exp3" 1 26 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 788 95 1
"3401" "exp3" 1 27 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 3760 0 0
"3401" "exp3" 1 28 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1643 0 0
"3401" "exp3" 1 29 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 585 68 1
"3401" "exp3" 1 30 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 832 0 0
"3401" "exp3" 1 31 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 768 0 0
"3401" "exp3" 1 32 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1647 0 0
"3401" "exp3" 1 33 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 919 0 0
"3401" "exp3" 1 34 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 6282 0 0
"3401" "exp3" 1 35 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 923 0 0
"3401" "exp3" 1 36 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 3220 61 1
"3401" "exp3" 1 37 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1117 84 1
"3401" "exp3" 1 38 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1862 0 0
"3401" "exp3" 1 39 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 1165 0 0
"3401" "exp3" 1 40 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2168 45 1
"3401" "exp3" 1 41 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 4054 76 1
"3401" "exp3" 1 42 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 612 0 0
"3401" "exp3" 1 43 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 733 0 0
"3401" "exp3" 1 44 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 798 0 0
"3401" "exp3" 1 45 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 544 0 0
"3401" "exp3" 1 46 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 685 0 0
"3401" "exp3" 1 47 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 859 0 0
"3401" "exp3" 1 48 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 1032 0 0
"3401" "exp3" 1 49 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 509 0 0
"3401" "exp3" 1 50 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 439 75 1
"3401" "exp3" 1 51 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 560 0 0
"3401" "exp3" 1 52 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 490 88 1
"3401" "exp3" 1 53 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1873 44 1
"3401" "exp3" 1 54 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 981 0 0
"3401" "exp3" 1 55 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1535 0 0
"3401" "exp3" 1 56 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 1956 0 0
"3401" "exp3" 1 57 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1507 34 1
"3401" "exp3" 1 58 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 777 0 0
"3401" "exp3" 1 59 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 703 0 0
"3401" "exp3" 1 60 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 717 59 1
"3401" "exp3" 1 61 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 524 0 0
"3401" "exp3" 1 62 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 675 0 0
"3401" "exp3" 1 63 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 643 0 0
"3401" "exp3" 1 64 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 456 84 1
"3401" "exp3" 1 65 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 487 0 0
"3401" "exp3" 1 66 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 454 0 0
"3401" "exp3" 1 67 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 526 0 0
"3401" "exp3" 1 68 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1751 42 1
"3401" "exp3" 1 69 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 894 0 0
"3401" "exp3" 1 70 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1899 0 0
"3401" "exp3" 1 71 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 1359 0 0
"3401" "exp3" 1 72 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 621 72 1
"3401" "exp3" 1 73 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2409 0 0
"3401" "exp3" 1 74 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 816 0 0
"3401" "exp3" 1 75 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1654 0 0
"3401" "exp3" 1 76 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1044 0 0
"3401" "exp3" 1 77 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1223 88 1
"3401" "exp3" 1 78 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2179 47 1
"3401" "exp3" 1 79 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 649 71 1
"3401" "exp3" 1 80 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 602 0 0
"3401" "exp3" 1 81 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1363 0 0
"3401" "exp3" 1 82 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 734 0 0
"3401" "exp3" 1 83 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 3253 0 0
"3401" "exp3" 1 84 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 601 0 0
"3401" "exp3" 1 85 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 424 76 1
"3401" "exp3" 1 86 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 784 0 0
"3401" "exp3" 1 87 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2332 0 0
"3401" "exp3" 1 88 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1648 43 1
"3401" "exp3" 1 89 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 660 0 0
"3401" "exp3" 1 90 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 649 0 0
"3401" "exp3" 1 91 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1024 0 0
"3401" "exp3" 1 92 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 562 0 0
"3401" "exp3" 1 93 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 821 92 1
"3401" "exp3" 1 94 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 771 0 0
"3401" "exp3" 1 95 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 613 0 0
"3401" "exp3" 1 96 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1795 42 1
"3401" "exp3" 1 97 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 1105 68 1
"3401" "exp3" 1 98 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 722 0 0
"3401" "exp3" 1 99 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 585 78 1
"3401" "exp3" 1 100 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 1920 0 0
"3401" "exp3" 1 101 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 2294 0 0
"3401" "exp3" 1 102 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2509 0 0
"3401" "exp3" 1 103 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 1249 0 0
"3401" "exp3" 1 104 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1004 0 0
"3401" "exp3" 1 105 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 1331 0 0
"3401" "exp3" 1 106 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 663 0 0
"3401" "exp3" 1 107 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 851 0 0
"3401" "exp3" 1 108 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 596 0 0
"3401" "exp3" 1 109 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 748 0 0
"3401" "exp3" 1 110 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 520 91 1
"3401" "exp3" 1 111 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 660 0 0
"3401" "exp3" 1 112 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 639 0 0
"3401" "exp3" 1 113 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 569 63 1
"3401" "exp3" 1 114 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 1179 63 1
"3401" "exp3" 1 115 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 992 0 0
"3401" "exp3" 1 116 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1231 0 0
"3401" "exp3" 1 117 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 750 70 1
"3401" "exp3" 1 118 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 546 0 0
"3401" "exp3" 1 119 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2971 33 1
"3401" "exp3" 1 120 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1493 67 1
"3401" "exp3" 1 121 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 903 0 0
"3401" "exp3" 1 122 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 621 0 0
"3401" "exp3" 1 123 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 1321 0 0
"3401" "exp3" 1 124 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2896 45 1
"3401" "exp3" 1 125 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 1232 67 1
"3401" "exp3" 1 126 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 748 0 0
"3401" "exp3" 1 127 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 3697 31 1
"3401" "exp3" 1 128 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 2951 0 0
"3401" "exp3" 1 129 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1476 0 0
"3401" "exp3" 1 130 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 715 0 0
"3401" "exp3" 1 131 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 645 0 0
"3401" "exp3" 1 132 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 4185 0 0
"3401" "exp3" 2 1 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 3490 25 1
"3401" "exp3" 2 2 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 1117 0 0
"3401" "exp3" 2 3 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2481 0 0
"3401" "exp3" 2 4 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 1595 0 0
"3401" "exp3" 2 5 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 3685 0 0
"3401" "exp3" 2 6 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1790 91 1
"3401" "exp3" 2 7 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 740 70 1
"3401" "exp3" 2 8 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1175 76 1
"3401" "exp3" 2 9 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2147 46 1
"3401" "exp3" 2 10 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 1280 73 1
"3401" "exp3" 2 11 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 844 0 0
"3401" "exp3" 2 12 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 1674 0 0
"3401" "exp3" 2 13 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 702 74 1
"3401" "exp3" 2 14 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 2093 0 0
"3401" "exp3" 2 15 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2772 37 1
"3401" "exp3" 2 16 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 652 0 0
"3401" "exp3" 2 17 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 439 0 0
"3401" "exp3" 2 18 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1178 0 0
"3401" "exp3" 2 19 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 673 0 0
"3401" "exp3" 2 20 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 786 0 0
"3401" "exp3" 2 21 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 888 66 1
"3401" "exp3" 2 22 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 554 67 1
"3401" "exp3" 2 23 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 620 0 0
"3401" "exp3" 2 24 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 600 81 1
"3401" "exp3" 2 25 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 708 0 0
"3401" "exp3" 2 26 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 427 0 0
"3401" "exp3" 2 27 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 477 70 1
"3401" "exp3" 2 28 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 556 0 0
"3401" "exp3" 2 29 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 429 83 1
"3401" "exp3" 2 30 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 468 0 0
"3401" "exp3" 2 31 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 535 77 1
"3401" "exp3" 2 32 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2680 41 1
"3401" "exp3" 2 33 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1969 43 1
"3401" "exp3" 2 34 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 621 0 0
"3401" "exp3" 2 35 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 476 97 1
"3401" "exp3" 2 36 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 713 0 0
"3401" "exp3" 2 37 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 493 0 0
"3401" "exp3" 2 38 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 618 0 0
"3401" "exp3" 2 39 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 540 0 0
"3401" "exp3" 2 40 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 967 84 1
"3401" "exp3" 2 41 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 1324 0 0
"3401" "exp3" 2 42 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 1871 0 0
"3401" "exp3" 2 43 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 848 0 0
"3401" "exp3" 2 44 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 3281 40 1
"3401" "exp3" 2 45 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1146 0 0
"3401" "exp3" 2 46 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 894 0 0
"3401" "exp3" 2 47 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 766 0 0
"3401" "exp3" 2 48 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2159 39 1
"3401" "exp3" 2 49 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 879 0 0
"3401" "exp3" 2 50 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2301 0 0
"3401" "exp3" 2 51 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 677 0 0
"3401" "exp3" 2 52 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 529 95 1
"3401" "exp3" 2 53 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 480 0 0
"3401" "exp3" 2 54 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 455 0 0
"3401" "exp3" 2 55 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 459 0 0
"3401" "exp3" 2 56 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 680 0 0
"3401" "exp3" 2 57 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 434 84 1
"3401" "exp3" 2 58 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 427 0 0
"3401" "exp3" 2 59 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 408 0 0
"3401" "exp3" 2 60 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 344 0 0
"3401" "exp3" 2 61 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 523 0 0
"3401" "exp3" 2 62 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 400 91 1
"3401" "exp3" 2 63 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 366 0 0
"3401" "exp3" 2 64 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 595 0 0
"3401" "exp3" 2 65 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 449 0 0
"3401" "exp3" 2 66 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2202 0 0
"3401" "exp3" 2 67 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 540 0 0
"3401" "exp3" 2 68 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 410 0 0
"3401" "exp3" 2 69 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 393 81 1
"3401" "exp3" 2 70 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2505 49 1
"3401" "exp3" 2 71 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 905 68 1
"3401" "exp3" 2 72 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 443 0 0
"3401" "exp3" 2 73 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 422 0 0
"3401" "exp3" 2 74 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1569 48 1
"3401" "exp3" 2 75 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 531 0 0
"3401" "exp3" 2 76 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 485 0 0
"3401" "exp3" 2 77 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 761 0 0
"3401" "exp3" 2 78 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 557 0 0
"3401" "exp3" 2 79 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 382 0 0
"3401" "exp3" 2 80 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 464 27 1
"3401" "exp3" 2 81 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 1312 0 0
"3401" "exp3" 2 82 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 462 0 0
"3401" "exp3" 2 83 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 523 0 0
"3401" "exp3" 2 84 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 650 0 0
"3401" "exp3" 2 85 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 446 0 0
"3401" "exp3" 2 86 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 602 0 0
"3401" "exp3" 2 87 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 548 0 0
"3401" "exp3" 2 88 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 515 0 0
"3401" "exp3" 2 89 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 429 0 0
"3401" "exp3" 2 90 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 433 74 1
"3401" "exp3" 2 91 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 406 0 0
"3401" "exp3" 2 92 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 554 0 0
"3401" "exp3" 2 93 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 583 0 0
"3401" "exp3" 2 94 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 3342 44 1
"3401" "exp3" 2 95 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 2718 44 1
"3401" "exp3" 2 96 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 692 0 0
"3401" "exp3" 2 97 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 650 0 0
"3401" "exp3" 2 98 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 632 0 0
"3401" "exp3" 2 99 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 473 0 0
"3401" "exp3" 2 100 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 485 78 1
"3401" "exp3" 2 101 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 423 0 0
"3401" "exp3" 2 102 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 399 0 0
"3401" "exp3" 2 103 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 539 75 1
"3401" "exp3" 2 104 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 667 0 0
"3401" "exp3" 2 105 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 409 0 0
"3401" "exp3" 2 106 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 442 0 0
"3401" "exp3" 2 107 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 533 78 1
"3401" "exp3" 2 108 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 408 81 1
"3401" "exp3" 2 109 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 468 0 0
"3401" "exp3" 2 110 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 526 0 0
"3401" "exp3" 2 111 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 396 0 0
"3401" "exp3" 2 112 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 361 0 0
"3401" "exp3" 2 113 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 491 0 0
"3401" "exp3" 2 114 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 445 0 0
"3401" "exp3" 2 115 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 407 68 1
"3401" "exp3" 2 116 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 368 0 0
"3401" "exp3" 2 117 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 740 59 1
"3401" "exp3" 2 118 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 596 0 0
"3401" "exp3" 2 119 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 528 0 0
"3401" "exp3" 2 120 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 825 0 0
"3401" "exp3" 2 121 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2626 42 1
"3401" "exp3" 2 122 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 595 0 0
"3401" "exp3" 2 123 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 430 0 0
"3401" "exp3" 2 124 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 411 64 1
"3401" "exp3" 2 125 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 461 80 1
"3401" "exp3" 2 126 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 502 83 1
"3401" "exp3" 2 127 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 412 86 1
"3401" "exp3" 2 128 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 425 0 0
"3401" "exp3" 2 129 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 449 0 0
"3401" "exp3" 2 130 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 766 0 0
"3401" "exp3" 2 131 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 574 0 0
"3401" "exp3" 2 132 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 413 0 0
"3401" "exp3" 1 1 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1690 0 0
"3401" "exp3" 1 2 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 869 0 0
"3401" "exp3" 1 3 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 3986 46 1
"3401" "exp3" 1 4 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1795 0 0
"3401" "exp3" 1 5 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1604 0 0
"3401" "exp3" 1 6 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 1269 0 0
"3401" "exp3" 1 7 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1079 0 0
"3401" "exp3" 1 8 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 916 0 0
"3401" "exp3" 1 9 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 558 80 1
"3401" "exp3" 1 10 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 1027 77 1
"3401" "exp3" 1 11 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 758 0 0
"3401" "exp3" 1 12 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 782 0 0
"3401" "exp3" 1 13 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 575 0 0
"3401" "exp3" 1 14 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 779 89 1
"3401" "exp3" 1 15 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1078 0 0
"3401" "exp3" 1 16 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 912 64 1
"3401" "exp3" 1 17 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 837 0 0
"3401" "exp3" 1 18 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 693 0 0
"3401" "exp3" 1 19 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 840 0 0
"3401" "exp3" 1 20 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 908 0 0
"3401" "exp3" 1 21 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1025 0 0
"3401" "exp3" 1 22 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2437 0 0
"3401" "exp3" 1 23 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1009 0 0
"3401" "exp3" 1 24 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 637 0 0
"3401" "exp3" 1 25 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 674 0 0
"3401" "exp3" 1 26 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 707 81 1
"3401" "exp3" 1 27 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 584 0 0
"3401" "exp3" 1 28 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 882 0 0
"3401" "exp3" 1 29 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 724 0 0
"3401" "exp3" 1 30 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 885 70 1
"3401" "exp3" 1 31 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 478 0 0
"3401" "exp3" 1 32 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 864 0 0
"3401" "exp3" 1 33 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1086 0 0
"3401" "exp3" 1 34 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 557 0 0
"3401" "exp3" 1 35 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 802 72 1
"3401" "exp3" 1 36 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 519 0 0
"3401" "exp3" 1 37 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 1324 0 0
"3401" "exp3" 1 38 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 787 73 1
"3401" "exp3" 1 39 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 721 0 0
"3401" "exp3" 1 40 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 775 0 0
"3401" "exp3" 1 41 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 689 0 0
"3401" "exp3" 1 42 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 4499 37 1
"3401" "exp3" 1 43 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 4280 0 0
"3401" "exp3" 1 44 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1878 0 0
"3401" "exp3" 1 45 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1554 33 1
"3401" "exp3" 1 46 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 1352 0 0
"3401" "exp3" 1 47 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 2126 0 0
"3401" "exp3" 1 48 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 1306 0 0
"3401" "exp3" 1 49 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 2707 0 0
"3401" "exp3" 1 50 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1763 38 1
"3401" "exp3" 1 51 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 2605 0 0
"3401" "exp3" 1 52 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 2971 0 0
"3401" "exp3" 1 53 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 910 0 0
"3401" "exp3" 1 54 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 783 0 0
"3401" "exp3" 1 55 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 616 0 0
"3401" "exp3" 1 56 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 2173 41 1
"3401" "exp3" 1 57 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1108 0 0
"3401" "exp3" 1 58 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 809 0 0
"3401" "exp3" 1 59 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 685 0 0
"3401" "exp3" 1 60 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1867 43 1
"3401" "exp3" 1 61 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 549 81 1
"3401" "exp3" 1 62 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 589 0 0
"3401" "exp3" 1 63 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1467 0 0
"3401" "exp3" 1 64 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 593 97 1
"3401" "exp3" 1 65 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 2316 0 0
"3401" "exp3" 1 66 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1250 0 0
"3401" "exp3" 1 67 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 761 0 0
"3401" "exp3" 1 68 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 697 69 1
"3401" "exp3" 1 69 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 870 0 0
"3401" "exp3" 1 70 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 1116 0 0
"3401" "exp3" 1 71 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 680 0 0
"3401" "exp3" 1 72 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 957 0 0
"3401" "exp3" 1 73 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 836 0 0
"3401" "exp3" 1 74 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 672 0 0
"3401" "exp3" 1 75 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 827 0 0
"3401" "exp3" 1 76 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 635 0 0
"3401" "exp3" 1 77 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 451 0 0
"3401" "exp3" 1 78 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 571 0 0
"3401" "exp3" 1 79 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 675 0 0
"3401" "exp3" 1 80 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 497 0 0
"3401" "exp3" 1 81 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 815 0 0
"3401" "exp3" 1 82 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1026 0 0
"3401" "exp3" 1 83 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 718 0 0
"3401" "exp3" 1 84 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 557 0 0
"3401" "exp3" 1 85 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 750 0 0
"3401" "exp3" 1 86 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 887 0 0
"3401" "exp3" 1 87 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 882 0 0
"3401" "exp3" 1 88 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1205 0 0
"3401" "exp3" 1 89 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 906 0 0
"3401" "exp3" 1 90 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 790 0 0
"3401" "exp3" 1 91 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1549 35 1
"3401" "exp3" 1 92 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 857 76 1
"3401" "exp3" 1 93 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 800 0 0
"3401" "exp3" 1 94 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 976 0 0
"3401" "exp3" 1 95 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 828 0 0
"3401" "exp3" 1 96 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 920 0 0
"3401" "exp3" 1 97 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 743 0 0
"3401" "exp3" 1 98 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 619 87 1
"3401" "exp3" 1 99 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 599 0 0
"3401" "exp3" 1 100 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 1069 0 0
"3401" "exp3" 1 101 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 1109 0 0
"3401" "exp3" 1 102 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 529 0 0
"3401" "exp3" 1 103 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 732 0 0
"3401" "exp3" 1 104 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 917 0 0
"3401" "exp3" 1 105 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 854 0 0
"3401" "exp3" 1 106 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1351 0 0
"3401" "exp3" 1 107 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 664 0 0
"3401" "exp3" 1 108 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 564 68 1
"3401" "exp3" 1 109 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 542 0 0
"3401" "exp3" 1 110 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 684 0 0
"3401" "exp3" 1 111 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 2531 56 1
"3401" "exp3" 1 112 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 770 17 1
"3401" "exp3" 1 113 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 1115 0 0
"3401" "exp3" 1 114 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1783 0 0
"3401" "exp3" 1 115 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 3761 0 0
"3401" "exp3" 1 116 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1166 71 1
"3401" "exp3" 1 117 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 2248 74 1
"3401" "exp3" 1 118 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1187 0 0
"3401" "exp3" 1 119 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1399 0 0
"3401" "exp3" 1 120 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 1998 0 0
"3401" "exp3" 1 121 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1239 79 1
"3401" "exp3" 1 122 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 1137 0 0
"3401" "exp3" 1 123 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 2129 0 0
"3401" "exp3" 1 124 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 960 0 0
"3401" "exp3" 1 125 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 834 0 0
"3401" "exp3" 1 126 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 762 0 0
"3401" "exp3" 1 127 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 544 90 1
"3401" "exp3" 1 128 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 782 0 0
"3401" "exp3" 1 129 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 670 78 1
"3401" "exp3" 1 130 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 731 0 0
"3401" "exp3" 1 131 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 787 83 1
"3401" "exp3" 1 132 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 707 0 0
"3401" "exp3" 2 1 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2113 0 0
"3401" "exp3" 2 2 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 1416 0 0
"3401" "exp3" 2 3 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 1517 0 0
"3401" "exp3" 2 4 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 550 0 0
"3401" "exp3" 2 5 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 649 0 0
"3401" "exp3" 2 6 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 650 0 0
"3401" "exp3" 2 7 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 1061 61 1
"3401" "exp3" 2 8 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1716 0 0
"3401" "exp3" 2 9 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 928 0 0
"3401" "exp3" 2 10 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 808 0 0
"3401" "exp3" 2 11 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 755 0 0
"3401" "exp3" 2 12 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1646 0 0
"3401" "exp3" 2 13 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 676 0 0
"3401" "exp3" 2 14 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 2397 38 1
"3401" "exp3" 2 15 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1571 0 0
"3401" "exp3" 2 16 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 825 0 0
"3401" "exp3" 2 17 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 798 0 0
"3401" "exp3" 2 18 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 704 69 1
"3401" "exp3" 2 19 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 999 0 0
"3401" "exp3" 2 20 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 2478 0 0
"3401" "exp3" 2 21 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 2594 0 0
"3401" "exp3" 2 22 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1547 33 1
"3401" "exp3" 2 23 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 841 2 1
"3401" "exp3" 2 24 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1291 0 0
"3401" "exp3" 2 25 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1086 77 1
"3401" "exp3" 2 26 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1147 0 0
"3401" "exp3" 2 27 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1757 45 1
"3401" "exp3" 2 28 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 650 0 0
"3401" "exp3" 2 29 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 2392 48 1
"3401" "exp3" 2 30 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 754 0 0
"3401" "exp3" 2 31 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 660 90 1
"3401" "exp3" 2 32 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1037 0 0
"3401" "exp3" 2 33 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1743 46 1
"3401" "exp3" 2 34 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 705 70 1
"3401" "exp3" 2 35 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 664 0 0
"3401" "exp3" 2 36 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 566 0 0
"3401" "exp3" 2 37 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 715 0 0
"3401" "exp3" 2 38 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 508 71 1
"3401" "exp3" 2 39 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 795 0 0
"3401" "exp3" 2 40 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 527 0 0
"3401" "exp3" 2 41 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 622 0 0
"3401" "exp3" 2 42 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 634 0 0
"3401" "exp3" 2 43 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 547 0 0
"3401" "exp3" 2 44 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 693 69 1
"3401" "exp3" 2 45 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 932 67 1
"3401" "exp3" 2 46 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 860 64 1
"3401" "exp3" 2 47 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 582 0 0
"3401" "exp3" 2 48 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1415 49 1
"3401" "exp3" 2 49 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1354 0 0
"3401" "exp3" 2 50 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 802 0 0
"3401" "exp3" 2 51 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 707 0 0
"3401" "exp3" 2 52 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 812 0 0
"3401" "exp3" 2 53 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 608 0 0
"3401" "exp3" 2 54 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 546 0 0
"3401" "exp3" 2 55 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 479 0 0
"3401" "exp3" 2 56 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 490 0 0
"3401" "exp3" 2 57 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 420 0 0
"3401" "exp3" 2 58 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 555 78 1
"3401" "exp3" 2 59 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 547 83 1
"3401" "exp3" 2 60 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 819 0 0
"3401" "exp3" 2 61 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 643 0 0
"3401" "exp3" 2 62 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 708 75 1
"3401" "exp3" 2 63 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 519 0 0
"3401" "exp3" 2 64 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 878 0 0
"3401" "exp3" 2 65 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 619 0 0
"3401" "exp3" 2 66 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 706 0 0
"3401" "exp3" 2 67 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 687 66 1
"3401" "exp3" 2 68 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 699 0 0
"3401" "exp3" 2 69 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1780 45 1
"3401" "exp3" 2 70 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 615 0 0
"3401" "exp3" 2 71 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 587 0 0
"3401" "exp3" 2 72 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 627 0 0
"3401" "exp3" 2 73 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 1060 70 1
"3401" "exp3" 2 74 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 1102 59 1
"3401" "exp3" 2 75 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 986 0 0
"3401" "exp3" 2 76 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 802 0 0
"3401" "exp3" 2 77 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 475 0 0
"3401" "exp3" 2 78 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 721 0 0
"3401" "exp3" 2 79 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 595 0 0
"3401" "exp3" 2 80 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 692 0 0
"3401" "exp3" 2 81 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 744 80 1
"3401" "exp3" 2 82 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 634 0 0
"3401" "exp3" 2 83 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 594 92 1
"3401" "exp3" 2 84 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 1097 0 0
"3401" "exp3" 2 85 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 899 0 0
"3401" "exp3" 2 86 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 870 0 0
"3401" "exp3" 2 87 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 693 70 1
"3401" "exp3" 2 88 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 680 80 1
"3401" "exp3" 2 89 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 498 0 0
"3401" "exp3" 2 90 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 481 0 0
"3401" "exp3" 2 91 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1071 82 1
"3401" "exp3" 2 92 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1319 0 0
"3401" "exp3" 2 93 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 925 0 0
"3401" "exp3" 2 94 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1891 0 0
"3401" "exp3" 2 95 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1206 0 0
"3401" "exp3" 2 96 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1266 0 0
"3401" "exp3" 2 97 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 802 0 0
"3401" "exp3" 2 98 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 664 0 0
"3401" "exp3" 2 99 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 3026 0 0
"3401" "exp3" 2 100 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1072 21 1
"3401" "exp3" 2 101 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1358 58 1
"3401" "exp3" 2 102 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 586 99 1
"3401" "exp3" 2 103 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 964 0 0
"3401" "exp3" 2 104 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2203 0 0
"3401" "exp3" 2 105 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 1607 0 0
"3401" "exp3" 2 106 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2325 69 1
"3401" "exp3" 2 107 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 811 0 0
"3401" "exp3" 2 108 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 5345 43 1
"3401" "exp3" 2 109 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2231 47 1
"3401" "exp3" 2 110 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1281 79 1
"3401" "exp3" 2 111 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 642 74 1
"3401" "exp3" 2 112 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 803 0 0
"3401" "exp3" 2 113 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 606 0 0
"3401" "exp3" 2 114 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 787 73 1
"3401" "exp3" 2 115 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 633 0 0
"3401" "exp3" 2 116 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 674 0 0
"3401" "exp3" 2 117 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 695 24 1
"3401" "exp3" 2 118 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1069 0 0
"3401" "exp3" 2 119 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 884 0 0
"3401" "exp3" 2 120 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 584 27 1
"3401" "exp3" 2 121 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 645 29 1
"3401" "exp3" 2 122 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 2279 74 1
"3401" "exp3" 2 123 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1873 0 0
"3401" "exp3" 2 124 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1366 0 0
"3401" "exp3" 2 125 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 796 0 0
"3401" "exp3" 2 126 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 1333 0 0
"3401" "exp3" 2 127 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 683 0 0
"3401" "exp3" 2 128 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 1148 0 0
"3401" "exp3" 2 129 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 763 0 0
"3401" "exp3" 2 130 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 742 0 0
"3401" "exp3" 2 131 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 4280 26 1
"3401" "exp3" 2 132 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 2341 0 0
"3401" "exp3" 1 1 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1533 18 1
"3401" "exp3" 1 2 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1118 72 1
"3401" "exp3" 1 3 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 2139 0 0
"3401" "exp3" 1 4 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 766 0 0
"3401" "exp3" 1 5 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1167 27 1
"3401" "exp3" 1 6 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 2051 66 1
"3401" "exp3" 1 7 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1054 0 0
"3401" "exp3" 1 8 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1889 0 0
"3401" "exp3" 1 9 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 2830 21 1
"3401" "exp3" 1 10 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1029 25 1
"3401" "exp3" 1 11 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 909 26 1
"3401" "exp3" 1 12 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1335 23 1
"3401" "exp3" 1 13 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 901 1 1
"3401" "exp3" 1 14 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 770 16 1
"3401" "exp3" 1 15 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 570 0 0
"3401" "exp3" 1 16 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 496 37 1
"3401" "exp3" 1 17 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1420 8 1
"3401" "exp3" 1 18 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1189 30 1
"3401" "exp3" 1 19 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 2365 15 1
"3401" "exp3" 1 20 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1070 0 0
"3401" "exp3" 1 21 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 3808 0 0
"3401" "exp3" 1 22 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 4374 0 0
"3401" "exp3" 1 23 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 2053 0 0
"3401" "exp3" 1 24 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1009 0 0
"3401" "exp3" 1 25 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1887 10 1
"3401" "exp3" 1 26 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1162 0 0
"3401" "exp3" 1 27 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 2627 0 0
"3401" "exp3" 1 28 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 965 62 1
"3401" "exp3" 1 29 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1019 0 0
"3401" "exp3" 1 30 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 723 0 0
"3401" "exp3" 1 31 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1175 0 0
"3401" "exp3" 1 32 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 1082 0 0
"3401" "exp3" 1 33 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1291 0 0
"3401" "exp3" 1 34 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1142 0 0
"3401" "exp3" 1 35 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1152 0 0
"3401" "exp3" 1 36 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1339 4 1
"3401" "exp3" 1 37 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1463 0 0
"3401" "exp3" 1 38 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1899 0 0
"3401" "exp3" 1 39 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1326 20 1
"3401" "exp3" 1 40 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 2090 0 0
"3401" "exp3" 1 41 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 823 0 0
"3401" "exp3" 1 42 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1162 0 0
"3401" "exp3" 1 43 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 949 0 0
"3401" "exp3" 1 44 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 3003 47 1
"3401" "exp3" 1 45 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1269 0 0
"3401" "exp3" 1 46 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 3179 79 1
"3401" "exp3" 1 47 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 813 0 0
"3401" "exp3" 1 48 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 723 0 0
"3401" "exp3" 1 49 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 805 37 1
"3401" "exp3" 1 50 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 833 66 1
"3401" "exp3" 1 51 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 622 0 0
"3401" "exp3" 1 52 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 638 0 0
"3401" "exp3" 1 53 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 854 0 0
"3401" "exp3" 1 54 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1020 78 1
"3401" "exp3" 1 55 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1180 18 1
"3401" "exp3" 1 56 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1686 17 1
"3401" "exp3" 1 57 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2406 48 1
"3401" "exp3" 1 58 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 2941 0 0
"3401" "exp3" 1 59 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1441 14 1
"3401" "exp3" 1 60 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1357 0 0
"3401" "exp3" 1 61 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1164 0 0
"3401" "exp3" 1 62 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1233 17 1
"3401" "exp3" 1 63 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 3977 0 0
"3401" "exp3" 1 64 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1415 15 1
"3401" "exp3" 1 65 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1255 0 0
"3401" "exp3" 1 66 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 5628 0 0
"3401" "exp3" 1 67 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2728 16 1
"3401" "exp3" 1 68 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 1300 0 0
"3401" "exp3" 1 69 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 984 66 1
"3401" "exp3" 1 70 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 1457 5 1
"3401" "exp3" 1 71 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 765 0 0
"3401" "exp3" 1 72 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1423 0 0
"3401" "exp3" 1 73 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1000 76 1
"3401" "exp3" 1 74 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1253 0 0
"3401" "exp3" 1 75 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 673 61 1
"3401" "exp3" 1 76 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 922 0 0
"3401" "exp3" 1 77 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 3514 62 1
"3401" "exp3" 1 78 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 1670 0 0
"3401" "exp3" 1 79 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 3029 2 1
"3401" "exp3" 1 80 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2878 0 0
"3401" "exp3" 1 81 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 814 0 0
"3401" "exp3" 1 82 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1671 36 1
"3401" "exp3" 1 83 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1159 72 1
"3401" "exp3" 1 84 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2715 21 1
"3401" "exp3" 1 85 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1769 22 1
"3401" "exp3" 1 86 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 2445 0 0
"3401" "exp3" 1 87 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1071 0 0
"3401" "exp3" 1 88 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1403 13 1
"3401" "exp3" 1 89 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 5753 0 0
"3401" "exp3" 1 90 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2902 0 0
"3401" "exp3" 1 91 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1468 43 1
"3401" "exp3" 1 92 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1672 0 0
"3401" "exp3" 1 93 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1664 0 0
"3401" "exp3" 1 94 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 2632 0 0
"3401" "exp3" 1 95 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1183 0 0
"3401" "exp3" 1 96 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 2237 0 0
"3401" "exp3" 1 97 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 2670 0 0
"3401" "exp3" 1 98 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 3597 44 1
"3401" "exp3" 1 99 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1455 0 0
"3401" "exp3" 1 100 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 559 0 0
"3401" "exp3" 1 101 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 967 0 0
"3401" "exp3" 1 102 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 2770 6 1
"3401" "exp3" 1 103 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 2011 0 0
"3401" "exp3" 1 104 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1465 0 0
"3401" "exp3" 1 105 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 5231 40 1
"3401" "exp3" 1 106 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 3299 0 0
"3401" "exp3" 1 107 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 2383 0 0
"3401" "exp3" 1 108 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 1988 74 1
"3401" "exp3" 1 109 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1492 0 0
"3401" "exp3" 1 110 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 3963 30 1
"3401" "exp3" 1 111 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 4332 0 0
"3401" "exp3" 1 112 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 3204 0 0
"3401" "exp3" 1 113 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 3978 0 0
"3401" "exp3" 1 114 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 1400 72 1
"3401" "exp3" 1 115 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 802 0 0
"3401" "exp3" 1 116 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2004 49 1
"3401" "exp3" 1 117 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1874 0 0
"3401" "exp3" 1 118 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1665 31 1
"3401" "exp3" 1 119 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1222 33 1
"3401" "exp3" 1 120 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1243 0 0
"3401" "exp3" 1 121 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1012 91 1
"3401" "exp3" 1 122 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1422 44 1
"3401" "exp3" 1 123 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1232 0 0
"3401" "exp3" 1 124 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2175 0 0
"3401" "exp3" 1 125 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 3784 0 0
"3401" "exp3" 1 126 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1847 0 0
"3401" "exp3" 1 127 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1115 70 1
"3401" "exp3" 1 128 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 771 0 0
"3401" "exp3" 1 129 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 2454 0 0
"3401" "exp3" 1 130 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 2939 0 0
"3401" "exp3" 1 131 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1726 0 0
"3401" "exp3" 1 132 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1451 42 1
"3401" "exp3" 2 1 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2539 0 0
"3401" "exp3" 2 2 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1304 43 1
"3401" "exp3" 2 3 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2076 35 1
"3401" "exp3" 2 4 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1956 9 1
"3401" "exp3" 2 5 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 2013 0 0
"3401" "exp3" 2 6 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1423 0 0
"3401" "exp3" 2 7 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 913 79 1
"3401" "exp3" 2 8 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1870 45 1
"3401" "exp3" 2 9 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1995 0 0
"3401" "exp3" 2 10 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 4085 0 0
"3401" "exp3" 2 11 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1690 0 0
"3401" "exp3" 2 12 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 2674 89 1
"3401" "exp3" 2 13 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1128 82 1
"3401" "exp3" 2 14 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1514 97 1
"3401" "exp3" 2 15 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1352 76 1
"3401" "exp3" 2 16 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1645 17 1
"3401" "exp3" 2 17 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2212 37 1
"3401" "exp3" 2 18 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 4481 0 0
"3401" "exp3" 2 19 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1623 39 1
"3401" "exp3" 2 20 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 3205 18 1
"3401" "exp3" 2 21 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 2017 15 1
"3401" "exp3" 2 22 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 2107 85 1
"3401" "exp3" 2 23 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 1135 0 0
"3401" "exp3" 2 24 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 626 83 1
"3401" "exp3" 2 25 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1083 0 0
"3401" "exp3" 2 26 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 559 0 0
"3401" "exp3" 2 27 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 4654 0 0
"3401" "exp3" 2 28 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1030 0 0
"3401" "exp3" 2 29 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 621 82 1
"3401" "exp3" 2 30 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 623 0 0
"3401" "exp3" 2 31 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1906 0 0
"3401" "exp3" 2 32 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1384 0 0
"3401" "exp3" 2 33 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1370 0 0
"3401" "exp3" 2 34 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1307 0 0
"3401" "exp3" 2 35 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 739 0 0
"3401" "exp3" 2 36 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 710 0 0
"3401" "exp3" 2 37 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1410 0 0
"3401" "exp3" 2 38 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2372 75 1
"3401" "exp3" 2 39 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 575 0 0
"3401" "exp3" 2 40 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 726 71 1
"3401" "exp3" 2 41 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 649 71 1
"3401" "exp3" 2 42 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2836 0 0
"3401" "exp3" 2 43 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1425 67 1
"3401" "exp3" 2 44 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 539 67 1
"3401" "exp3" 2 45 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 599 0 0
"3401" "exp3" 2 46 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 658 0 0
"3401" "exp3" 2 47 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 567 0 0
"3401" "exp3" 2 48 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 911 0 0
"3401" "exp3" 2 49 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1735 0 0
"3401" "exp3" 2 50 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1146 44 1
"3401" "exp3" 2 51 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 2175 0 0
"3401" "exp3" 2 52 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1445 0 0
"3401" "exp3" 2 53 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 559 0 0
"3401" "exp3" 2 54 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 625 80 1
"3401" "exp3" 2 55 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 454 0 0
"3401" "exp3" 2 56 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1716 0 0
"3401" "exp3" 2 57 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 3804 68 1
"3401" "exp3" 2 58 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 3136 24 1
"3401" "exp3" 2 59 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2317 0 0
"3401" "exp3" 2 60 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 822 72 1
"3401" "exp3" 2 61 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 989 38 1
"3401" "exp3" 2 62 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 615 81 1
"3401" "exp3" 2 63 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 644 0 0
"3401" "exp3" 2 64 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 658 59 1
"3401" "exp3" 2 65 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 562 0 0
"3401" "exp3" 2 66 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 663 81 1
"3401" "exp3" 2 67 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 613 0 0
"3401" "exp3" 2 68 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 559 0 0
"3401" "exp3" 2 69 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 936 0 0
"3401" "exp3" 2 70 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 1030 0 0
"3401" "exp3" 2 71 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 678 0 0
"3401" "exp3" 2 72 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 572 0 0
"3401" "exp3" 2 73 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 832 0 0
"3401" "exp3" 2 74 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 1853 0 0
"3401" "exp3" 2 75 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1254 0 0
"3401" "exp3" 2 76 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1806 21 1
"3401" "exp3" 2 77 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 892 0 0
"3401" "exp3" 2 78 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1668 81 1
"3401" "exp3" 2 79 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 641 0 0
"3401" "exp3" 2 80 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1564 0 0
"3401" "exp3" 2 81 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 553 55 1
"3401" "exp3" 2 82 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 690 0 0
"3401" "exp3" 2 83 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1387 0 0
"3401" "exp3" 2 84 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 635 0 0
"3401" "exp3" 2 85 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 599 0 0
"3401" "exp3" 2 86 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 851 0 0
"3401" "exp3" 2 87 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 863 0 0
"3401" "exp3" 2 88 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 555 0 0
"3401" "exp3" 2 89 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 2138 0 0
"3401" "exp3" 2 90 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1440 0 0
"3401" "exp3" 2 91 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1275 81 1
"3401" "exp3" 2 92 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 574 0 0
"3401" "exp3" 2 93 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2032 44 1
"3401" "exp3" 2 94 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 688 0 0
"3401" "exp3" 2 95 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1166 0 0
"3401" "exp3" 2 96 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 746 0 0
"3401" "exp3" 2 97 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 964 0 0
"3401" "exp3" 2 98 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 793 0 0
"3401" "exp3" 2 99 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1505 41 1
"3401" "exp3" 2 100 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 5947 8 1
"3401" "exp3" 2 101 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 721 0 0
"3401" "exp3" 2 102 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1038 0 0
"3401" "exp3" 2 103 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 838 0 0
"3401" "exp3" 2 104 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 630 0 0
"3401" "exp3" 2 105 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1261 39 1
"3401" "exp3" 2 106 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1294 0 0
"3401" "exp3" 2 107 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1348 0 0
"3401" "exp3" 2 108 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 622 0 0
"3401" "exp3" 2 109 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 616 0 0
"3401" "exp3" 2 110 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 614 0 0
"3401" "exp3" 2 111 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 737 0 0
"3401" "exp3" 2 112 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 621 0 0
"3401" "exp3" 2 113 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 2344 18 1
"3401" "exp3" 2 114 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 6011 0 0
"3401" "exp3" 2 115 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 649 0 0
"3401" "exp3" 2 116 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 617 70 1
"3401" "exp3" 2 117 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 533 0 0
"3401" "exp3" 2 118 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 573 0 0
"3401" "exp3" 2 119 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1669 0 0
"3401" "exp3" 2 120 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1311 0 0
"3401" "exp3" 2 121 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 617 0 0
"3401" "exp3" 2 122 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 754 0 0
"3401" "exp3" 2 123 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1324 38 1
"3401" "exp3" 2 124 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1291 0 0
"3401" "exp3" 2 125 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1499 0 0
"3401" "exp3" 2 126 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1745 28 1
"3401" "exp3" 2 127 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1172 0 0
"3401" "exp3" 2 128 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1574 36 1
"3401" "exp3" 2 129 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1484 0 0
"3401" "exp3" 2 130 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1719 0 0
"3401" "exp3" 2 131 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 3021 0 0
"3401" "exp3" 2 132 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 1720 0 0
"3402" "exp3" 1 1 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 788 6 1
"3402" "exp3" 1 2 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 754 0 0
"3402" "exp3" 1 3 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1320 35 1
"3402" "exp3" 1 4 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 628 15 1
"3402" "exp3" 1 5 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 664 0 0
"3402" "exp3" 1 6 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 575 19 1
"3402" "exp3" 1 7 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 476 42 1
"3402" "exp3" 1 8 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 690 0 0
"3402" "exp3" 1 9 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 948 0 0
"3402" "exp3" 1 10 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 664 0 0
"3402" "exp3" 1 11 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 564 0 0
"3402" "exp3" 1 12 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 622 21 1
"3402" "exp3" 1 13 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1212 0 0
"3402" "exp3" 1 14 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 534 7 1
"3402" "exp3" 1 15 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 527 0 0
"3402" "exp3" 1 16 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1278 0 0
"3402" "exp3" 1 17 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 638 13 1
"3402" "exp3" 1 18 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 674 5 1
"3402" "exp3" 1 19 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 641 0 0
"3402" "exp3" 1 20 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1025 0 0
"3402" "exp3" 1 21 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 590 29 1
"3402" "exp3" 1 22 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 416 0 0
"3402" "exp3" 1 23 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1161 24 1
"3402" "exp3" 1 24 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 729 12 1
"3402" "exp3" 1 25 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 522 37 1
"3402" "exp3" 1 26 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1682 0 0
"3402" "exp3" 1 27 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 658 49 1
"3402" "exp3" 1 28 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 493 0 0
"3402" "exp3" 1 29 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 511 0 0
"3402" "exp3" 1 30 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 453 14 1
"3402" "exp3" 1 31 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 367 2 1
"3402" "exp3" 1 32 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1249 0 0
"3402" "exp3" 1 33 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 3061 0 0
"3402" "exp3" 1 34 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 694 34 1
"3402" "exp3" 1 35 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 847 0 0
"3402" "exp3" 1 36 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 483 23 1
"3402" "exp3" 1 37 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1088 0 0
"3402" "exp3" 1 38 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 631 0 0
"3402" "exp3" 1 39 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2251 63 1
"3402" "exp3" 1 40 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 967 0 0
"3402" "exp3" 1 41 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1641 20 1
"3402" "exp3" 1 42 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1686 29 1
"3402" "exp3" 1 43 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1539 16 1
"3402" "exp3" 1 44 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 764 44 1
"3402" "exp3" 1 45 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 922 17 1
"3402" "exp3" 1 46 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 423 13 1
"3402" "exp3" 1 47 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 732 21 1
"3402" "exp3" 1 48 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 685 17 1
"3402" "exp3" 1 49 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 592 18 1
"3402" "exp3" 1 50 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 503 26 1
"3402" "exp3" 1 51 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 685 0 0
"3402" "exp3" 1 52 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 549 0 0
"3402" "exp3" 1 53 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 645 0 0
"3402" "exp3" 1 54 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 630 22 1
"3402" "exp3" 1 55 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 519 26 1
"3402" "exp3" 1 56 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 498 0 0
"3402" "exp3" 1 57 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 426 31 1
"3402" "exp3" 1 58 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 506 11 1
"3402" "exp3" 1 59 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 374 0 0
"3402" "exp3" 1 60 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 476 35 1
"3402" "exp3" 1 61 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 646 20 1
"3402" "exp3" 1 62 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 616 4 1
"3402" "exp3" 1 63 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1356 0 0
"3402" "exp3" 1 64 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 591 43 1
"3402" "exp3" 1 65 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 774 18 1
"3402" "exp3" 1 66 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1481 0 0
"3402" "exp3" 1 67 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 796 33 1
"3402" "exp3" 1 68 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1202 24 1
"3402" "exp3" 1 69 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1549 28 1
"3402" "exp3" 1 70 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 600 14 1
"3402" "exp3" 1 71 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 626 36 1
"3402" "exp3" 1 72 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 523 17 1
"3402" "exp3" 1 73 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1111 0 0
"3402" "exp3" 1 74 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 717 26 1
"3402" "exp3" 1 75 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 457 20 1
"3402" "exp3" 1 76 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 627 0 0
"3402" "exp3" 1 77 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1089 22 1
"3402" "exp3" 1 78 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 547 3 1
"3402" "exp3" 1 79 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 592 22 1
"3402" "exp3" 1 80 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 599 34 1
"3402" "exp3" 1 81 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 854 43 1
"3402" "exp3" 1 82 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 874 8 1
"3402" "exp3" 1 83 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 664 32 1
"3402" "exp3" 1 84 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2477 30 1
"3402" "exp3" 1 85 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 678 39 1
"3402" "exp3" 1 86 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 628 0 0
"3402" "exp3" 1 87 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 624 36 1
"3402" "exp3" 1 88 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 561 9 1
"3402" "exp3" 1 89 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1402 38 1
"3402" "exp3" 1 90 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 530 29 1
"3402" "exp3" 1 91 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 743 0 0
"3402" "exp3" 1 92 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 672 32 1
"3402" "exp3" 1 93 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 518 17 1
"3402" "exp3" 1 94 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 586 15 1
"3402" "exp3" 1 95 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 556 8 1
"3402" "exp3" 1 96 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 539 23 1
"3402" "exp3" 1 97 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 585 36 1
"3402" "exp3" 1 98 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 915 0 0
"3402" "exp3" 1 99 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 485 28 1
"3402" "exp3" 1 100 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 479 5 1
"3402" "exp3" 1 101 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 604 25 1
"3402" "exp3" 1 102 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 506 32 1
"3402" "exp3" 1 103 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 546 0 0
"3402" "exp3" 1 104 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 546 7 1
"3402" "exp3" 1 105 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 414 0 0
"3402" "exp3" 1 106 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 859 10 1
"3402" "exp3" 1 107 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 732 24 1
"3402" "exp3" 1 108 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 941 0 0
"3402" "exp3" 1 109 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 460 18 1
"3402" "exp3" 1 110 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 411 1 1
"3402" "exp3" 1 111 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 600 19 1
"3402" "exp3" 1 112 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 631 29 1
"3402" "exp3" 1 113 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 657 30 1
"3402" "exp3" 1 114 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 588 27 1
"3402" "exp3" 1 115 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 643 34 1
"3402" "exp3" 1 116 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 661 0 0
"3402" "exp3" 1 117 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 494 0 0
"3402" "exp3" 1 118 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 960 20 1
"3402" "exp3" 1 119 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 749 0 0
"3402" "exp3" 1 120 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 580 0 0
"3402" "exp3" 1 121 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 877 42 1
"3402" "exp3" 1 122 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 469 21 1
"3402" "exp3" 1 123 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 735 6 1
"3402" "exp3" 1 124 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1224 31 1
"3402" "exp3" 1 125 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 554 0 0
"3402" "exp3" 1 126 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 579 26 1
"3402" "exp3" 1 127 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 559 13 1
"3402" "exp3" 1 128 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 723 27 1
"3402" "exp3" 1 129 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 2382 67 1
"3402" "exp3" 1 130 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1290 0 0
"3402" "exp3" 1 131 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 920 16 1
"3402" "exp3" 1 132 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 729 0 0
"3402" "exp3" 2 1 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1026 26 1
"3402" "exp3" 2 2 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 456 30 1
"3402" "exp3" 2 3 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 400 22 1
"3402" "exp3" 2 4 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 557 0 0
"3402" "exp3" 2 5 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 499 0 0
"3402" "exp3" 2 6 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 628 42 1
"3402" "exp3" 2 7 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 458 0 0
"3402" "exp3" 2 8 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 497 15 1
"3402" "exp3" 2 9 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 726 11 1
"3402" "exp3" 2 10 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 572 12 1
"3402" "exp3" 2 11 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 912 36 1
"3402" "exp3" 2 12 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1870 0 0
"3402" "exp3" 2 13 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 3466 27 1
"3402" "exp3" 2 14 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 581 27 1
"3402" "exp3" 2 15 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 640 29 1
"3402" "exp3" 2 16 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1465 34 1
"3402" "exp3" 2 17 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1034 34 1
"3402" "exp3" 2 18 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 532 23 1
"3402" "exp3" 2 19 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 623 33 1
"3402" "exp3" 2 20 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 670 26 1
"3402" "exp3" 2 21 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 655 30 1
"3402" "exp3" 2 22 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 792 29 1
"3402" "exp3" 2 23 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 604 4 1
"3402" "exp3" 2 24 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 539 19 1
"3402" "exp3" 2 25 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 438 13 1
"3402" "exp3" 2 26 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 387 0 0
"3402" "exp3" 2 27 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 448 40 1
"3402" "exp3" 2 28 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 516 28 1
"3402" "exp3" 2 29 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 409 31 1
"3402" "exp3" 2 30 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 435 20 1
"3402" "exp3" 2 31 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 589 32 1
"3402" "exp3" 2 32 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 804 31 1
"3402" "exp3" 2 33 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 459 17 1
"3402" "exp3" 2 34 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 429 43 1
"3402" "exp3" 2 35 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 502 28 1
"3402" "exp3" 2 36 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 654 21 1
"3402" "exp3" 2 37 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 593 0 0
"3402" "exp3" 2 38 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 513 0 0
"3402" "exp3" 2 39 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1881 42 1
"3402" "exp3" 2 40 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 701 11 1
"3402" "exp3" 2 41 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 694 14 1
"3402" "exp3" 2 42 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 487 8 1
"3402" "exp3" 2 43 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1228 0 0
"3402" "exp3" 2 44 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 477 37 1
"3402" "exp3" 2 45 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 490 46 1
"3402" "exp3" 2 46 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 467 2 1
"3402" "exp3" 2 47 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 490 17 1
"3402" "exp3" 2 48 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 360 0 0
"3402" "exp3" 2 49 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 702 0 0
"3402" "exp3" 2 50 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 607 13 1
"3402" "exp3" 2 51 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 478 36 1
"3402" "exp3" 2 52 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 588 9 1
"3402" "exp3" 2 53 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 983 0 0
"3402" "exp3" 2 54 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 1132 3 1
"3402" "exp3" 2 55 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 808 40 1
"3402" "exp3" 2 56 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 672 0 0
"3402" "exp3" 2 57 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 778 47 1
"3402" "exp3" 2 58 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 616 10 1
"3402" "exp3" 2 59 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 842 35 1
"3402" "exp3" 2 60 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 2747 0 0
"3402" "exp3" 2 61 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 2892 25 1
"3402" "exp3" 2 62 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 611 15 1
"3402" "exp3" 2 63 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1023 0 0
"3402" "exp3" 2 64 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 809 18 1
"3402" "exp3" 2 65 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 958 36 1
"3402" "exp3" 2 66 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 582 9 1
"3402" "exp3" 2 67 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 613 17 1
"3402" "exp3" 2 68 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 474 6 1
"3402" "exp3" 2 69 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 941 0 0
"3402" "exp3" 2 70 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 520 0 0
"3402" "exp3" 2 71 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 2536 15 1
"3402" "exp3" 2 72 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 746 21 1
"3402" "exp3" 2 73 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 583 19 1
"3402" "exp3" 2 74 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 499 7 1
"3402" "exp3" 2 75 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 752 14 1
"3402" "exp3" 2 76 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 788 33 1
"3402" "exp3" 2 77 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 844 27 1
"3402" "exp3" 2 78 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 714 0 0
"3402" "exp3" 2 79 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 512 16 1
"3402" "exp3" 2 80 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 467 8 1
"3402" "exp3" 2 81 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 543 30 1
"3402" "exp3" 2 82 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1193 29 1
"3402" "exp3" 2 83 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 592 0 0
"3402" "exp3" 2 84 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 539 20 1
"3402" "exp3" 2 85 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 554 0 0
"3402" "exp3" 2 86 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 697 0 0
"3402" "exp3" 2 87 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 530 0 0
"3402" "exp3" 2 88 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 599 25 1
"3402" "exp3" 2 89 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 648 24 1
"3402" "exp3" 2 90 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 543 5 1
"3402" "exp3" 2 91 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 674 0 0
"3402" "exp3" 2 92 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 490 19 1
"3402" "exp3" 2 93 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 491 0 0
"3402" "exp3" 2 94 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 3415 56 1
"3402" "exp3" 2 95 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 682 1 1
"3402" "exp3" 2 96 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 696 0 0
"3402" "exp3" 2 97 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1738 24 1
"3402" "exp3" 2 98 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 728 25 1
"3402" "exp3" 2 99 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 630 0 0
"3402" "exp3" 2 100 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 753 0 0
"3402" "exp3" 2 101 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 722 39 1
"3402" "exp3" 2 102 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 650 10 1
"3402" "exp3" 2 103 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 713 0 0
"3402" "exp3" 2 104 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 3366 41 1
"3402" "exp3" 2 105 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1621 0 0
"3402" "exp3" 2 106 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 803 37 1
"3402" "exp3" 2 107 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 654 23 1
"3402" "exp3" 2 108 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 413 0 0
"3402" "exp3" 2 109 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 703 0 0
"3402" "exp3" 2 110 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 543 13 1
"3402" "exp3" 2 111 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1152 0 0
"3402" "exp3" 2 112 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 950 0 0
"3402" "exp3" 2 113 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 505 0 0
"3402" "exp3" 2 114 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 444 7 1
"3402" "exp3" 2 115 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 454 0 0
"3402" "exp3" 2 116 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 544 23 1
"3402" "exp3" 2 117 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 660 26 1
"3402" "exp3" 2 118 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 559 39 1
"3402" "exp3" 2 119 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 541 22 1
"3402" "exp3" 2 120 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 556 0 0
"3402" "exp3" 2 121 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 603 38 1
"3402" "exp3" 2 122 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 601 49 1
"3402" "exp3" 2 123 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1115 19 1
"3402" "exp3" 2 124 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 541 16 1
"3402" "exp3" 2 125 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 599 0 0
"3402" "exp3" 2 126 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 652 28 1
"3402" "exp3" 2 127 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 485 20 1
"3402" "exp3" 2 128 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1080 32 1
"3402" "exp3" 2 129 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1505 31 1
"3402" "exp3" 2 130 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 609 5 1
"3402" "exp3" 2 131 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1536 29 1
"3402" "exp3" 2 132 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 776 22 1
"3402" "exp3" 1 1 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 949 13 1
"3402" "exp3" 1 2 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1368 0 0
"3402" "exp3" 1 3 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1257 0 0
"3402" "exp3" 1 4 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 732 13 1
"3402" "exp3" 1 5 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1935 0 0
"3402" "exp3" 1 6 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 1373 0 0
"3402" "exp3" 1 7 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 2131 27 1
"3402" "exp3" 1 8 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 4131 69 1
"3402" "exp3" 1 9 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2912 0 0
"3402" "exp3" 1 10 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1369 33 1
"3402" "exp3" 1 11 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 809 9 1
"3402" "exp3" 1 12 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 791 18 1
"3402" "exp3" 1 13 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 621 29 1
"3402" "exp3" 1 14 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1257 6 1
"3402" "exp3" 1 15 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1227 26 1
"3402" "exp3" 1 16 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1123 0 0
"3402" "exp3" 1 17 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 534 20 1
"3402" "exp3" 1 18 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 678 18 1
"3402" "exp3" 1 19 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 697 0 0
"3402" "exp3" 1 20 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 674 19 1
"3402" "exp3" 1 21 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 588 17 1
"3402" "exp3" 1 22 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 482 5 1
"3402" "exp3" 1 23 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 398 40 1
"3402" "exp3" 1 24 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 2206 70 1
"3402" "exp3" 1 25 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 2487 32 1
"3402" "exp3" 1 26 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 538 0 0
"3402" "exp3" 1 27 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1045 0 0
"3402" "exp3" 1 28 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 719 8 1
"3402" "exp3" 1 29 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 706 0 0
"3402" "exp3" 1 30 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 536 32 1
"3402" "exp3" 1 31 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 706 14 1
"3402" "exp3" 1 32 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 646 10 1
"3402" "exp3" 1 33 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 595 17 1
"3402" "exp3" 1 34 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 747 21 1
"3402" "exp3" 1 35 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 543 7 1
"3402" "exp3" 1 36 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 483 26 1
"3402" "exp3" 1 37 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1570 0 0
"3402" "exp3" 1 38 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 969 0 0
"3402" "exp3" 1 39 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1083 36 1
"3402" "exp3" 1 40 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 621 12 1
"3402" "exp3" 1 41 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 686 0 0
"3402" "exp3" 1 42 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 990 9 1
"3402" "exp3" 1 43 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1063 17 1
"3402" "exp3" 1 44 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1296 0 0
"3402" "exp3" 1 45 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 949 28 1
"3402" "exp3" 1 46 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 547 29 1
"3402" "exp3" 1 47 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 402 40 1
"3402" "exp3" 1 48 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 463 20 1
"3402" "exp3" 1 49 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 688 46 1
"3402" "exp3" 1 50 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 521 31 1
"3402" "exp3" 1 51 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 638 0 0
"3402" "exp3" 1 52 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 524 0 0
"3402" "exp3" 1 53 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 868 0 0
"3402" "exp3" 1 54 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 700 30 1
"3402" "exp3" 1 55 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1389 21 1
"3402" "exp3" 1 56 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 512 20 1
"3402" "exp3" 1 57 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1510 24 1
"3402" "exp3" 1 58 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 699 0 0
"3402" "exp3" 1 59 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 630 0 0
"3402" "exp3" 1 60 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 794 5 1
"3402" "exp3" 1 61 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 888 16 1
"3402" "exp3" 1 62 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 667 0 0
"3402" "exp3" 1 63 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 867 8 1
"3402" "exp3" 1 64 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 4796 67 1
"3402" "exp3" 1 65 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 730 18 1
"3402" "exp3" 1 66 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 551 34 1
"3402" "exp3" 1 67 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1233 37 1
"3402" "exp3" 1 68 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1622 0 0
"3402" "exp3" 1 69 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 956 25 1
"3402" "exp3" 1 70 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 512 22 1
"3402" "exp3" 1 71 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 417 39 1
"3402" "exp3" 1 72 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 1588 2 1
"3402" "exp3" 1 73 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 896 27 1
"3402" "exp3" 1 74 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 3403 27 1
"3402" "exp3" 1 75 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 2305 55 1
"3402" "exp3" 1 76 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 852 18 1
"3402" "exp3" 1 77 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 717 15 1
"3402" "exp3" 1 78 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 910 7 1
"3402" "exp3" 1 79 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 798 0 0
"3402" "exp3" 1 80 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 889 35 1
"3402" "exp3" 1 81 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 841 0 0
"3402" "exp3" 1 82 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 704 26 1
"3402" "exp3" 1 83 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1962 0 0
"3402" "exp3" 1 84 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1163 24 1
"3402" "exp3" 1 85 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1140 0 0
"3402" "exp3" 1 86 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 7947 72 1
"3402" "exp3" 1 87 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 605 0 0
"3402" "exp3" 1 88 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 790 23 1
"3402" "exp3" 1 89 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 767 0 0
"3402" "exp3" 1 90 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1125 11 1
"3402" "exp3" 1 91 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 865 22 1
"3402" "exp3" 1 92 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 420 19 1
"3402" "exp3" 1 93 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 630 14 1
"3402" "exp3" 1 94 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 826 30 1
"3402" "exp3" 1 95 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 523 6 1
"3402" "exp3" 1 96 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 2106 14 1
"3402" "exp3" 1 97 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 645 0 0
"3402" "exp3" 1 98 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 494 41 1
"3402" "exp3" 1 99 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 492 0 0
"3402" "exp3" 1 100 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 4567 0 0
"3402" "exp3" 1 101 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1283 38 1
"3402" "exp3" 1 102 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 890 37 1
"3402" "exp3" 1 103 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 501 11 1
"3402" "exp3" 1 104 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 4688 0 0
"3402" "exp3" 1 105 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 896 0 0
"3402" "exp3" 1 106 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1279 0 0
"3402" "exp3" 1 107 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 511 23 1
"3402" "exp3" 1 108 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 512 4 1
"3402" "exp3" 1 109 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 6156 56 1
"3402" "exp3" 1 110 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1498 29 1
"3402" "exp3" 1 111 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 965 26 1
"3402" "exp3" 1 112 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1331 0 0
"3402" "exp3" 1 113 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 723 19 1
"3402" "exp3" 1 114 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 466 23 1
"3402" "exp3" 1 115 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 2116 30 1
"3402" "exp3" 1 116 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1430 42 1
"3402" "exp3" 1 117 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1469 0 0
"3402" "exp3" 1 118 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1128 16 1
"3402" "exp3" 1 119 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 641 19 1
"3402" "exp3" 1 120 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 3000 63 1
"3402" "exp3" 1 121 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1490 25 1
"3402" "exp3" 1 122 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 742 23 1
"3402" "exp3" 1 123 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 548 17 1
"3402" "exp3" 1 124 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 526 10 1
"3402" "exp3" 1 125 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 597 33 1
"3402" "exp3" 1 126 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 535 0 0
"3402" "exp3" 1 127 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 406 1 1
"3402" "exp3" 1 128 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1094 0 0
"3402" "exp3" 1 129 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1300 0 0
"3402" "exp3" 1 130 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2417 0 0
"3402" "exp3" 1 131 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1182 38 1
"3402" "exp3" 1 132 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 711 25 1
"3402" "exp3" 2 1 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 679 18 1
"3402" "exp3" 2 2 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 658 17 1
"3402" "exp3" 2 3 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 411 34 1
"3402" "exp3" 2 4 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 432 10 1
"3402" "exp3" 2 5 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 442 43 1
"3402" "exp3" 2 6 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1630 0 0
"3402" "exp3" 2 7 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 991 26 1
"3402" "exp3" 2 8 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 499 16 1
"3402" "exp3" 2 9 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 4173 27 1
"3402" "exp3" 2 10 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1337 27 1
"3402" "exp3" 2 11 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 541 28 1
"3402" "exp3" 2 12 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 819 37 1
"3402" "exp3" 2 13 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 693 22 1
"3402" "exp3" 2 14 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1449 51 1
"3402" "exp3" 2 15 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 815 31 1
"3402" "exp3" 2 16 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 532 32 1
"3402" "exp3" 2 17 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 729 41 1
"3402" "exp3" 2 18 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1346 23 1
"3402" "exp3" 2 19 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 832 16 1
"3402" "exp3" 2 20 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 431 9 1
"3402" "exp3" 2 21 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 924 20 1
"3402" "exp3" 2 22 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 460 0 0
"3402" "exp3" 2 23 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 619 5 1
"3402" "exp3" 2 24 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1263 0 0
"3402" "exp3" 2 25 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 565 1 1
"3402" "exp3" 2 26 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 799 19 1
"3402" "exp3" 2 27 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1186 0 0
"3402" "exp3" 2 28 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2878 0 0
"3402" "exp3" 2 29 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 2801 0 0
"3402" "exp3" 2 30 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2696 40 1
"3402" "exp3" 2 31 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2364 21 1
"3402" "exp3" 2 32 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2485 0 0
"3402" "exp3" 2 33 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 4308 0 0
"3402" "exp3" 2 34 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 893 24 1
"3402" "exp3" 2 35 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 844 14 1
"3402" "exp3" 2 36 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 971 35 1
"3402" "exp3" 2 37 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 612 22 1
"3402" "exp3" 2 38 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 633 29 1
"3402" "exp3" 2 39 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 795 48 1
"3402" "exp3" 2 40 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 704 24 1
"3402" "exp3" 2 41 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 823 15 1
"3402" "exp3" 2 42 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 647 0 0
"3402" "exp3" 2 43 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1942 64 1
"3402" "exp3" 2 44 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1245 6 1
"3402" "exp3" 2 45 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 949 8 1
"3402" "exp3" 2 46 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 777 12 1
"3402" "exp3" 2 47 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 939 23 1
"3402" "exp3" 2 48 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1100 55 1
"3402" "exp3" 2 49 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 913 0 0
"3402" "exp3" 2 50 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1083 0 0
"3402" "exp3" 2 51 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 645 24 1
"3402" "exp3" 2 52 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 768 7 1
"3402" "exp3" 2 53 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 617 14 1
"3402" "exp3" 2 54 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1126 0 0
"3402" "exp3" 2 55 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1011 19 1
"3402" "exp3" 2 56 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 761 23 1
"3402" "exp3" 2 57 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 858 0 0
"3402" "exp3" 2 58 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 500 0 0
"3402" "exp3" 2 59 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 537 0 0
"3402" "exp3" 2 60 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 535 20 1
"3402" "exp3" 2 61 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 724 0 0
"3402" "exp3" 2 62 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 438 8 1
"3402" "exp3" 2 63 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 579 26 1
"3402" "exp3" 2 64 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 710 0 0
"3402" "exp3" 2 65 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 711 45 1
"3402" "exp3" 2 66 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 709 0 0
"3402" "exp3" 2 67 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1315 0 0
"3402" "exp3" 2 68 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 684 16 1
"3402" "exp3" 2 69 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 543 70 1
"3402" "exp3" 2 70 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 617 9 1
"3402" "exp3" 2 71 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 594 0 0
"3402" "exp3" 2 72 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 840 0 0
"3402" "exp3" 2 73 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 589 53 1
"3402" "exp3" 2 74 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 2972 33 1
"3402" "exp3" 2 75 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 593 5 1
"3402" "exp3" 2 76 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 591 13 1
"3402" "exp3" 2 77 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 477 18 1
"3402" "exp3" 2 78 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 908 0 0
"3402" "exp3" 2 79 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 888 36 1
"3402" "exp3" 2 80 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 687 34 1
"3402" "exp3" 2 81 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1893 0 0
"3402" "exp3" 2 82 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 812 15 1
"3402" "exp3" 2 83 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1012 0 0
"3402" "exp3" 2 84 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 668 0 0
"3402" "exp3" 2 85 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 774 21 1
"3402" "exp3" 2 86 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 600 0 0
"3402" "exp3" 2 87 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 642 0 0
"3402" "exp3" 2 88 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 999 0 0
"3402" "exp3" 2 89 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 514 17 1
"3402" "exp3" 2 90 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 605 26 1
"3402" "exp3" 2 91 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 509 0 0
"3402" "exp3" 2 92 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 596 0 0
"3402" "exp3" 2 93 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3046 0 0
"3402" "exp3" 2 94 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 3597 41 1
"3402" "exp3" 2 95 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 687 19 1
"3402" "exp3" 2 96 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 915 24 1
"3402" "exp3" 2 97 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1260 0 0
"3402" "exp3" 2 98 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 875 0 0
"3402" "exp3" 2 99 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 727 29 1
"3402" "exp3" 2 100 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1240 96 1
"3402" "exp3" 2 101 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 949 61 1
"3402" "exp3" 2 102 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 999 13 1
"3402" "exp3" 2 103 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1505 28 1
"3402" "exp3" 2 104 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 3603 68 1
"3402" "exp3" 2 105 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1285 0 0
"3402" "exp3" 2 106 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 751 30 1
"3402" "exp3" 2 107 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 789 30 1
"3402" "exp3" 2 108 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 2190 11 1
"3402" "exp3" 2 109 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 587 18 1
"3402" "exp3" 2 110 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 671 10 1
"3402" "exp3" 2 111 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 573 14 1
"3402" "exp3" 2 112 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 679 0 0
"3402" "exp3" 2 113 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1300 18 1
"3402" "exp3" 2 114 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 650 35 1
"3402" "exp3" 2 115 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 537 0 0
"3402" "exp3" 2 116 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 529 34 1
"3402" "exp3" 2 117 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 690 17 1
"3402" "exp3" 2 118 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 2476 17 1
"3402" "exp3" 2 119 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1060 0 0
"3402" "exp3" 2 120 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 937 20 1
"3402" "exp3" 2 121 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 869 12 1
"3402" "exp3" 2 122 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1571 42 1
"3402" "exp3" 2 123 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 3310 69 1
"3402" "exp3" 2 124 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 629 0 0
"3402" "exp3" 2 125 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 550 25 1
"3402" "exp3" 2 126 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 795 0 0
"3402" "exp3" 2 127 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 540 0 0
"3402" "exp3" 2 128 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 683 21 1
"3402" "exp3" 2 129 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1022 29 1
"3402" "exp3" 2 130 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 708 38 1
"3402" "exp3" 2 131 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 882 0 0
"3402" "exp3" 2 132 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 815 46 1
"3402" "exp3" 1 1 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 794 14 1
"3402" "exp3" 1 2 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2118 0 0
"3402" "exp3" 1 3 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 549 8 1
"3402" "exp3" 1 4 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1060 36 1
"3402" "exp3" 1 5 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 527 23 1
"3402" "exp3" 1 6 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 521 32 1
"3402" "exp3" 1 7 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 729 0 0
"3402" "exp3" 1 8 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 477 19 1
"3402" "exp3" 1 9 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 657 0 0
"3402" "exp3" 1 10 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 686 7 1
"3402" "exp3" 1 11 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 642 10 1
"3402" "exp3" 1 12 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 583 0 0
"3402" "exp3" 1 13 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 698 0 0
"3402" "exp3" 1 14 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 486 18 1
"3402" "exp3" 1 15 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 827 23 1
"3402" "exp3" 1 16 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 3863 66 1
"3402" "exp3" 1 17 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1335 20 1
"3402" "exp3" 1 18 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 4556 23 1
"3402" "exp3" 1 19 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 784 14 1
"3402" "exp3" 1 20 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 606 30 1
"3402" "exp3" 1 21 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 583 11 1
"3402" "exp3" 1 22 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 425 0 0
"3402" "exp3" 1 23 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 426 21 1
"3402" "exp3" 1 24 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 489 22 1
"3402" "exp3" 1 25 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 498 0 0
"3402" "exp3" 1 26 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 4527 0 0
"3402" "exp3" 1 27 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 594 18 1
"3402" "exp3" 1 28 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 527 0 0
"3402" "exp3" 1 29 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 492 15 1
"3402" "exp3" 1 30 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 503 5 1
"3402" "exp3" 1 31 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 507 28 1
"3402" "exp3" 1 32 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 527 0 0
"3402" "exp3" 1 33 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1418 0 0
"3402" "exp3" 1 34 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 837 21 1
"3402" "exp3" 1 35 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 493 26 1
"3402" "exp3" 1 36 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 574 6 1
"3402" "exp3" 1 37 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 4042 0 0
"3402" "exp3" 1 38 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 599 0 0
"3402" "exp3" 1 39 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 635 0 0
"3402" "exp3" 1 40 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 501 16 1
"3402" "exp3" 1 41 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 852 0 0
"3402" "exp3" 1 42 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 505 17 1
"3402" "exp3" 1 43 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 740 0 0
"3402" "exp3" 1 44 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 452 26 1
"3402" "exp3" 1 45 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 543 32 1
"3402" "exp3" 1 46 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 486 0 0
"3402" "exp3" 1 47 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 682 39 1
"3402" "exp3" 1 48 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 546 0 0
"3402" "exp3" 1 49 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 501 0 0
"3402" "exp3" 1 50 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 531 2 1
"3402" "exp3" 1 51 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1350 10 1
"3402" "exp3" 1 52 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 2047 25 1
"3402" "exp3" 1 53 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 2999 0 0
"3402" "exp3" 1 54 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 553 0 0
"3402" "exp3" 1 55 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 3997 48 1
"3402" "exp3" 1 56 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1118 0 0
"3402" "exp3" 1 57 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 497 0 0
"3402" "exp3" 1 58 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 453 15 1
"3402" "exp3" 1 59 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 962 34 1
"3402" "exp3" 1 60 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 677 0 0
"3402" "exp3" 1 61 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 995 21 1
"3402" "exp3" 1 62 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 4982 56 1
"3402" "exp3" 1 63 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 559 29 1
"3402" "exp3" 1 64 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 483 29 1
"3402" "exp3" 1 65 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 461 25 1
"3402" "exp3" 1 66 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 516 27 1
"3402" "exp3" 1 67 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 430 0 0
"3402" "exp3" 1 68 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 664 42 1
"3402" "exp3" 1 69 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 481 0 0
"3402" "exp3" 1 70 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 538 0 0
"3402" "exp3" 1 71 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 817 30 1
"3402" "exp3" 1 72 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2700 17 1
"3402" "exp3" 1 73 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 5051 43 1
"3402" "exp3" 1 74 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 554 27 1
"3402" "exp3" 1 75 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 768 38 1
"3402" "exp3" 1 76 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1129 0 0
"3402" "exp3" 1 77 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1405 9 1
"3402" "exp3" 1 78 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 2886 9 1
"3402" "exp3" 1 79 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1835 18 1
"3402" "exp3" 1 80 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 3582 41 1
"3402" "exp3" 1 81 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 545 15 1
"3402" "exp3" 1 82 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1187 35 1
"3402" "exp3" 1 83 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 476 20 1
"3402" "exp3" 1 84 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 513 0 0
"3402" "exp3" 1 85 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 486 33 1
"3402" "exp3" 1 86 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 542 19 1
"3402" "exp3" 1 87 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 660 24 1
"3402" "exp3" 1 88 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 514 44 1
"3402" "exp3" 1 89 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 900 17 1
"3402" "exp3" 1 90 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 694 33 1
"3402" "exp3" 1 91 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 797 32 1
"3402" "exp3" 1 92 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 698 37 1
"3402" "exp3" 1 93 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 932 40 1
"3402" "exp3" 1 94 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 711 27 1
"3402" "exp3" 1 95 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1833 30 1
"3402" "exp3" 1 96 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 655 4 1
"3402" "exp3" 1 97 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 505 12 1
"3402" "exp3" 1 98 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1139 0 0
"3402" "exp3" 1 99 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 483 0 0
"3402" "exp3" 1 100 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 636 25 1
"3402" "exp3" 1 101 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2944 0 0
"3402" "exp3" 1 102 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 934 21 1
"3402" "exp3" 1 103 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 622 24 1
"3402" "exp3" 1 104 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 545 23 1
"3402" "exp3" 1 105 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 6651 0 0
"3402" "exp3" 1 106 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 7737 0 0
"3402" "exp3" 1 107 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1031 7 1
"3402" "exp3" 1 108 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 846 26 1
"3402" "exp3" 1 109 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 3786 40 1
"3402" "exp3" 1 110 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 474 24 1
"3402" "exp3" 1 111 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 756 22 1
"3402" "exp3" 1 112 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 756 0 0
"3402" "exp3" 1 113 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 890 45 1
"3402" "exp3" 1 114 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1104 30 1
"3402" "exp3" 1 115 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 501 16 1
"3402" "exp3" 1 116 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 682 38 1
"3402" "exp3" 1 117 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1232 25 1
"3402" "exp3" 1 118 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 804 0 0
"3402" "exp3" 1 119 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 2595 0 0
"3402" "exp3" 1 120 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 2248 8 1
"3402" "exp3" 1 121 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 561 28 1
"3402" "exp3" 1 122 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 410 0 0
"3402" "exp3" 1 123 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 553 0 0
"3402" "exp3" 1 124 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 488 0 0
"3402" "exp3" 1 125 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 545 13 1
"3402" "exp3" 1 126 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 532 19 1
"3402" "exp3" 1 127 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 524 35 1
"3402" "exp3" 1 128 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 541 0 0
"3402" "exp3" 1 129 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 535 24 1
"3402" "exp3" 1 130 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 3497 0 0
"3402" "exp3" 1 131 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 3602 14 1
"3402" "exp3" 1 132 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 889 18 1
"3402" "exp3" 2 1 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 771 0 0
"3402" "exp3" 2 2 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 430 0 0
"3402" "exp3" 2 3 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 440 29 1
"3402" "exp3" 2 4 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 447 24 1
"3402" "exp3" 2 5 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 401 33 1
"3402" "exp3" 2 6 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 386 11 1
"3402" "exp3" 2 7 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 357 0 0
"3402" "exp3" 2 8 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 383 21 1
"3402" "exp3" 2 9 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 415 9 1
"3402" "exp3" 2 10 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 524 28 1
"3402" "exp3" 2 11 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 566 0 0
"3402" "exp3" 2 12 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 2147 0 0
"3402" "exp3" 2 13 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 2004 0 0
"3402" "exp3" 2 14 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 669 21 1
"3402" "exp3" 2 15 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 805 25 1
"3402" "exp3" 2 16 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 538 24 1
"3402" "exp3" 2 17 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 464 27 1
"3402" "exp3" 2 18 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 543 39 1
"3402" "exp3" 2 19 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 438 21 1
"3402" "exp3" 2 20 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 773 0 0
"3402" "exp3" 2 21 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 586 0 0
"3402" "exp3" 2 22 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 580 1 1
"3402" "exp3" 2 23 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 464 0 0
"3402" "exp3" 2 24 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 822 18 1
"3402" "exp3" 2 25 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 483 20 1
"3402" "exp3" 2 26 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 497 22 1
"3402" "exp3" 2 27 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1658 91 1
"3402" "exp3" 2 28 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 5970 49 1
"3402" "exp3" 2 29 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2264 95 1
"3402" "exp3" 2 30 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 914 0 0
"3402" "exp3" 2 31 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 2158 0 0
"3402" "exp3" 2 32 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1899 19 1
"3402" "exp3" 2 33 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 596 16 1
"3402" "exp3" 2 34 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 2352 42 1
"3402" "exp3" 2 35 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 491 28 1
"3402" "exp3" 2 36 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 501 43 1
"3402" "exp3" 2 37 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 611 0 0
"3402" "exp3" 2 38 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 378 37 1
"3402" "exp3" 2 39 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 485 38 1
"3402" "exp3" 2 40 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 594 0 0
"3402" "exp3" 2 41 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1179 22 1
"3402" "exp3" 2 42 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 562 26 1
"3402" "exp3" 2 43 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 460 12 1
"3402" "exp3" 2 44 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 3534 41 1
"3402" "exp3" 2 45 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 3306 0 0
"3402" "exp3" 2 46 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 2475 0 0
"3402" "exp3" 2 47 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 2320 0 0
"3402" "exp3" 2 48 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 2112 14 1
"3402" "exp3" 2 49 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 3442 0 0
"3402" "exp3" 2 50 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1128 0 0
"3402" "exp3" 2 51 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 490 17 1
"3402" "exp3" 2 52 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 412 37 1
"3402" "exp3" 2 53 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 596 0 0
"3402" "exp3" 2 54 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 553 30 1
"3402" "exp3" 2 55 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 460 7 1
"3402" "exp3" 2 56 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 652 12 1
"3402" "exp3" 2 57 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 592 0 0
"3402" "exp3" 2 58 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 708 15 1
"3402" "exp3" 2 59 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1284 0 0
"3402" "exp3" 2 60 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 970 21 1
"3402" "exp3" 2 61 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 969 19 1
"3402" "exp3" 2 62 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 532 31 1
"3402" "exp3" 2 63 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 489 0 0
"3402" "exp3" 2 64 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 601 44 1
"3402" "exp3" 2 65 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 572 30 1
"3402" "exp3" 2 66 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 635 26 1
"3402" "exp3" 2 67 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 490 0 0
"3402" "exp3" 2 68 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 668 47 1
"3402" "exp3" 2 69 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 2226 19 1
"3402" "exp3" 2 70 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 607 28 1
"3402" "exp3" 2 71 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 547 25 1
"3402" "exp3" 2 72 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 645 0 0
"3402" "exp3" 2 73 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 2331 0 0
"3402" "exp3" 2 74 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 643 34 1
"3402" "exp3" 2 75 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 477 33 1
"3402" "exp3" 2 76 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 469 26 1
"3402" "exp3" 2 77 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 510 17 1
"3402" "exp3" 2 78 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 837 0 0
"3402" "exp3" 2 79 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 467 42 1
"3402" "exp3" 2 80 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 3350 0 0
"3402" "exp3" 2 81 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 738 18 1
"3402" "exp3" 2 82 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1325 0 0
"3402" "exp3" 2 83 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1168 0 0
"3402" "exp3" 2 84 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 436 16 1
"3402" "exp3" 2 85 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 608 29 1
"3402" "exp3" 2 86 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 527 31 1
"3402" "exp3" 2 87 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 419 0 0
"3402" "exp3" 2 88 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 497 15 1
"3402" "exp3" 2 89 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 535 29 1
"3402" "exp3" 2 90 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 430 29 1
"3402" "exp3" 2 91 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 398 36 1
"3402" "exp3" 2 92 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 497 32 1
"3402" "exp3" 2 93 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 811 34 1
"3402" "exp3" 2 94 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 745 24 1
"3402" "exp3" 2 95 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1441 0 0
"3402" "exp3" 2 96 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 460 18 1
"3402" "exp3" 2 97 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 538 25 1
"3402" "exp3" 2 98 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 508 23 1
"3402" "exp3" 2 99 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 783 27 1
"3402" "exp3" 2 100 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 655 19 1
"3402" "exp3" 2 101 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 797 33 1
"3402" "exp3" 2 102 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1038 14 1
"3402" "exp3" 2 103 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 401 32 1
"3402" "exp3" 2 104 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 461 30 1
"3402" "exp3" 2 105 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 466 10 1
"3402" "exp3" 2 106 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1332 0 0
"3402" "exp3" 2 107 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 490 4 1
"3402" "exp3" 2 108 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 641 33 1
"3402" "exp3" 2 109 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 630 0 0
"3402" "exp3" 2 110 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 626 0 0
"3402" "exp3" 2 111 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 481 5 1
"3402" "exp3" 2 112 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 518 23 1
"3402" "exp3" 2 113 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1007 16 1
"3402" "exp3" 2 114 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 513 13 1
"3402" "exp3" 2 115 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 630 0 0
"3402" "exp3" 2 116 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 836 15 1
"3402" "exp3" 2 117 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2157 0 0
"3402" "exp3" 2 118 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1507 10 1
"3402" "exp3" 2 119 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 8210 31 1
"3402" "exp3" 2 120 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 5865 43 1
"3402" "exp3" 2 121 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 511 45 1
"3402" "exp3" 2 122 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 460 0 0
"3402" "exp3" 2 123 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 510 0 0
"3402" "exp3" 2 124 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 392 23 1
"3402" "exp3" 2 125 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 544 48 1
"3402" "exp3" 2 126 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 476 26 1
"3402" "exp3" 2 127 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 936 13 1
"3402" "exp3" 2 128 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 536 22 1
"3402" "exp3" 2 129 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 597 25 1
"3402" "exp3" 2 130 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1617 8 1
"3402" "exp3" 2 131 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 2433 55 1
"3402" "exp3" 2 132 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 522 14 1
"3402" "exp3" 1 1 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 504 23 1
"3402" "exp3" 1 2 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 471 0 0
"3402" "exp3" 1 3 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 921 38 1
"3402" "exp3" 1 4 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 516 17 1
"3402" "exp3" 1 5 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1635 0 0
"3402" "exp3" 1 6 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 802 0 0
"3402" "exp3" 1 7 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 501 0 0
"3402" "exp3" 1 8 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 656 0 0
"3402" "exp3" 1 9 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1138 0 0
"3402" "exp3" 1 10 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 670 33 1
"3402" "exp3" 1 11 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 492 15 1
"3402" "exp3" 1 12 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 985 0 0
"3402" "exp3" 1 13 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 574 23 1
"3402" "exp3" 1 14 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 505 22 1
"3402" "exp3" 1 15 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 507 0 0
"3402" "exp3" 1 16 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 404 15 1
"3402" "exp3" 1 17 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 446 23 1
"3402" "exp3" 1 18 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 821 25 1
"3402" "exp3" 1 19 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 581 32 1
"3402" "exp3" 1 20 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 473 35 1
"3402" "exp3" 1 21 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 132 74 1
"3402" "exp3" 1 22 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 704 8 1
"3402" "exp3" 1 23 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 3055 18 1
"3402" "exp3" 1 24 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 721 26 1
"3402" "exp3" 1 25 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 106 16 1
"3402" "exp3" 1 26 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 3077 17 1
"3402" "exp3" 1 27 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 1387 0 0
"3402" "exp3" 1 28 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 806 14 1
"3402" "exp3" 1 29 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 535 38 1
"3402" "exp3" 1 30 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2087 0 0
"3402" "exp3" 1 31 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 669 17 1
"3402" "exp3" 1 32 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 572 39 1
"3402" "exp3" 1 33 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 723 13 1
"3402" "exp3" 1 34 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 529 22 1
"3402" "exp3" 1 35 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 493 19 1
"3402" "exp3" 1 36 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 540 4 1
"3402" "exp3" 1 37 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 579 55 1
"3402" "exp3" 1 38 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1236 0 0
"3402" "exp3" 1 39 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1770 35 1
"3402" "exp3" 1 40 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2242 19 1
"3402" "exp3" 1 41 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 3399 28 1
"3402" "exp3" 1 42 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 6501 48 1
"3402" "exp3" 1 43 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 609 0 0
"3402" "exp3" 1 44 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 603 26 1
"3402" "exp3" 1 45 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1398 0 0
"3402" "exp3" 1 46 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 547 31 1
"3402" "exp3" 1 47 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 817 24 1
"3402" "exp3" 1 48 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 933 25 1
"3402" "exp3" 1 49 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 632 0 0
"3402" "exp3" 1 50 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 594 34 1
"3402" "exp3" 1 51 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 484 0 0
"3402" "exp3" 1 52 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 458 30 1
"3402" "exp3" 1 53 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 589 25 1
"3402" "exp3" 1 54 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 4962 14 1
"3402" "exp3" 1 55 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1391 0 0
"3402" "exp3" 1 56 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 3677 0 0
"3402" "exp3" 1 57 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 558 17 1
"3402" "exp3" 1 58 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 505 10 1
"3402" "exp3" 1 59 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 440 3 1
"3402" "exp3" 1 60 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1060 0 0
"3402" "exp3" 1 61 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 2236 30 1
"3402" "exp3" 1 62 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 3855 39 1
"3402" "exp3" 1 63 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 514 27 1
"3402" "exp3" 1 64 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 462 16 1
"3402" "exp3" 1 65 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 544 47 1
"3402" "exp3" 1 66 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 505 23 1
"3402" "exp3" 1 67 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 637 13 1
"3402" "exp3" 1 68 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 776 16 1
"3402" "exp3" 1 69 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 620 32 1
"3402" "exp3" 1 70 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 567 29 1
"3402" "exp3" 1 71 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 539 0 0
"3402" "exp3" 1 72 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 553 8 1
"3402" "exp3" 1 73 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 623 21 1
"3402" "exp3" 1 74 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 799 0 0
"3402" "exp3" 1 75 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2895 0 0
"3402" "exp3" 1 76 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 3524 0 0
"3402" "exp3" 1 77 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1301 27 1
"3402" "exp3" 1 78 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1344 0 0
"3402" "exp3" 1 79 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 832 9 1
"3402" "exp3" 1 80 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1267 25 1
"3402" "exp3" 1 81 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 687 0 0
"3402" "exp3" 1 82 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 602 14 1
"3402" "exp3" 1 83 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 445 27 1
"3402" "exp3" 1 84 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 513 11 1
"3402" "exp3" 1 85 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 528 2 1
"3402" "exp3" 1 86 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 667 21 1
"3402" "exp3" 1 87 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 418 11 1
"3402" "exp3" 1 88 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 796 30 1
"3402" "exp3" 1 89 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1098 0 0
"3402" "exp3" 1 90 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 674 9 1
"3402" "exp3" 1 91 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2299 41 1
"3402" "exp3" 1 92 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1488 31 1
"3402" "exp3" 1 93 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 896 13 1
"3402" "exp3" 1 94 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1482 0 0
"3402" "exp3" 1 95 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 800 0 0
"3402" "exp3" 1 96 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 779 0 0
"3402" "exp3" 1 97 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 826 24 1
"3402" "exp3" 1 98 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 443 22 1
"3402" "exp3" 1 99 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 726 0 0
"3402" "exp3" 1 100 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 552 0 0
"3402" "exp3" 1 101 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 556 0 0
"3402" "exp3" 1 102 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 560 10 1
"3402" "exp3" 1 103 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1373 0 0
"3402" "exp3" 1 104 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 608 29 1
"3402" "exp3" 1 105 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 570 41 1
"3402" "exp3" 1 106 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 637 7 1
"3402" "exp3" 1 107 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 656 26 1
"3402" "exp3" 1 108 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 673 30 1
"3402" "exp3" 1 109 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1176 28 1
"3402" "exp3" 1 110 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 2510 0 0
"3402" "exp3" 1 111 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 4632 0 0
"3402" "exp3" 1 112 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 2872 0 0
"3402" "exp3" 1 113 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 635 0 0
"3402" "exp3" 1 114 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 561 20 1
"3402" "exp3" 1 115 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 938 0 0
"3402" "exp3" 1 116 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1768 42 1
"3402" "exp3" 1 117 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 783 6 1
"3402" "exp3" 1 118 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 591 0 0
"3402" "exp3" 1 119 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 543 24 1
"3402" "exp3" 1 120 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 475 12 1
"3402" "exp3" 1 121 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 578 34 1
"3402" "exp3" 1 122 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 607 22 1
"3402" "exp3" 1 123 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 592 32 1
"3402" "exp3" 1 124 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1099 42 1
"3402" "exp3" 1 125 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 478 19 1
"3402" "exp3" 1 126 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 537 0 0
"3402" "exp3" 1 127 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1269 18 1
"3402" "exp3" 1 128 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 462 18 1
"3402" "exp3" 1 129 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 446 15 1
"3402" "exp3" 1 130 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 560 45 1
"3402" "exp3" 1 131 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1911 33 1
"3402" "exp3" 1 132 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 694 27 1
"3402" "exp3" 2 1 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1049 28 1
"3402" "exp3" 2 2 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 464 31 1
"3402" "exp3" 2 3 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 419 20 1
"3402" "exp3" 2 4 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 381 33 1
"3402" "exp3" 2 5 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 357 0 0
"3402" "exp3" 2 6 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 464 12 1
"3402" "exp3" 2 7 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 399 15 1
"3402" "exp3" 2 8 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 419 28 1
"3402" "exp3" 2 9 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 939 0 0
"3402" "exp3" 2 10 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 450 39 1
"3402" "exp3" 2 11 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 447 28 1
"3402" "exp3" 2 12 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 468 23 1
"3402" "exp3" 2 13 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 402 24 1
"3402" "exp3" 2 14 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 411 0 0
"3402" "exp3" 2 15 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 606 0 0
"3402" "exp3" 2 16 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 420 26 1
"3402" "exp3" 2 17 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 548 18 1
"3402" "exp3" 2 18 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 3262 0 0
"3402" "exp3" 2 19 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 2382 3 1
"3402" "exp3" 2 20 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1457 0 0
"3402" "exp3" 2 21 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 806 36 1
"3402" "exp3" 2 22 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 2163 12 1
"3402" "exp3" 2 23 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 884 34 1
"3402" "exp3" 2 24 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 474 27 1
"3402" "exp3" 2 25 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 480 19 1
"3402" "exp3" 2 26 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 476 10 1
"3402" "exp3" 2 27 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 650 42 1
"3402" "exp3" 2 28 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 461 29 1
"3402" "exp3" 2 29 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 904 0 0
"3402" "exp3" 2 30 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 496 37 1
"3402" "exp3" 2 31 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 428 24 1
"3402" "exp3" 2 32 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 670 0 0
"3402" "exp3" 2 33 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 544 44 1
"3402" "exp3" 2 34 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 586 17 1
"3402" "exp3" 2 35 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 783 0 0
"3402" "exp3" 2 36 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 492 19 1
"3402" "exp3" 2 37 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 452 0 0
"3402" "exp3" 2 38 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 650 25 1
"3402" "exp3" 2 39 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 412 6 1
"3402" "exp3" 2 40 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 3007 15 1
"3402" "exp3" 2 41 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 859 0 0
"3402" "exp3" 2 42 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 4342 21 1
"3402" "exp3" 2 43 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 435 0 0
"3402" "exp3" 2 44 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1412 0 0
"3402" "exp3" 2 45 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 765 0 0
"3402" "exp3" 2 46 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 470 0 0
"3402" "exp3" 2 47 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 547 40 1
"3402" "exp3" 2 48 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 423 0 0
"3402" "exp3" 2 49 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 347 25 1
"3402" "exp3" 2 50 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 609 9 1
"3402" "exp3" 2 51 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 678 7 1
"3402" "exp3" 2 52 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 582 30 1
"3402" "exp3" 2 53 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 724 20 1
"3402" "exp3" 2 54 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 528 13 1
"3402" "exp3" 2 55 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 513 24 1
"3402" "exp3" 2 56 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 609 43 1
"3402" "exp3" 2 57 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 554 13 1
"3402" "exp3" 2 58 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 650 41 1
"3402" "exp3" 2 59 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 613 25 1
"3402" "exp3" 2 60 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 487 15 1
"3402" "exp3" 2 61 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1306 14 1
"3402" "exp3" 2 62 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 1867 6 1
"3402" "exp3" 2 63 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 627 21 1
"3402" "exp3" 2 64 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 421 35 1
"3402" "exp3" 2 65 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2440 0 0
"3402" "exp3" 2 66 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1708 0 0
"3402" "exp3" 2 67 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2207 22 1
"3402" "exp3" 2 68 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 6855 63 1
"3402" "exp3" 2 69 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 7286 0 0
"3402" "exp3" 2 70 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 637 19 1
"3402" "exp3" 2 71 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 564 22 1
"3402" "exp3" 2 72 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 494 8 1
"3402" "exp3" 2 73 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 512 18 1
"3402" "exp3" 2 74 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 752 43 1
"3402" "exp3" 2 75 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 3704 0 0
"3402" "exp3" 2 76 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 665 32 1
"3402" "exp3" 2 77 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 2739 0 0
"3402" "exp3" 2 78 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1895 31 1
"3402" "exp3" 2 79 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 508 0 0
"3402" "exp3" 2 80 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 507 14 1
"3402" "exp3" 2 81 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1183 47 1
"3402" "exp3" 2 82 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 705 22 1
"3402" "exp3" 2 83 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 442 42 1
"3402" "exp3" 2 84 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 807 21 1
"3402" "exp3" 2 85 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 625 8 1
"3402" "exp3" 2 86 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 783 0 0
"3402" "exp3" 2 87 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 512 21 1
"3402" "exp3" 2 88 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 733 29 1
"3402" "exp3" 2 89 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 671 32 1
"3402" "exp3" 2 90 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 718 0 0
"3402" "exp3" 2 91 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 621 17 1
"3402" "exp3" 2 92 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 6294 0 0
"3402" "exp3" 2 93 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 3005 0 0
"3402" "exp3" 2 94 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 583 16 1
"3402" "exp3" 2 95 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 904 30 1
"3402" "exp3" 2 96 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 589 0 0
"3402" "exp3" 2 97 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 398 20 1
"3402" "exp3" 2 98 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 512 46 1
"3402" "exp3" 2 99 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 509 0 0
"3402" "exp3" 2 100 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1082 0 0
"3402" "exp3" 2 101 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 686 7 1
"3402" "exp3" 2 102 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 930 0 0
"3402" "exp3" 2 103 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1509 0 0
"3402" "exp3" 2 104 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 611 19 1
"3402" "exp3" 2 105 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1480 0 0
"3402" "exp3" 2 106 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1144 0 0
"3402" "exp3" 2 107 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 800 16 1
"3402" "exp3" 2 108 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 619 25 1
"3402" "exp3" 2 109 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 495 29 1
"3402" "exp3" 2 110 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 573 9 1
"3402" "exp3" 2 111 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 724 35 1
"3402" "exp3" 2 112 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 5679 0 0
"3402" "exp3" 2 113 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 931 37 1
"3402" "exp3" 2 114 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1189 0 0
"3402" "exp3" 2 115 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2229 17 1
"3402" "exp3" 2 116 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1582 33 1
"3402" "exp3" 2 117 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 752 28 1
"3402" "exp3" 2 118 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 910 0 0
"3402" "exp3" 2 119 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 779 23 1
"3402" "exp3" 2 120 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 659 27 1
"3402" "exp3" 2 121 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 604 0 0
"3402" "exp3" 2 122 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 809 0 0
"3402" "exp3" 2 123 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 968 45 1
"3402" "exp3" 2 124 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 693 24 1
"3402" "exp3" 2 125 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 433 26 1
"3402" "exp3" 2 126 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 440 20 1
"3402" "exp3" 2 127 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 520 33 1
"3402" "exp3" 2 128 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 687 11 1
"3402" "exp3" 2 129 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 432 22 1
"3402" "exp3" 2 130 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 414 29 1
"3402" "exp3" 2 131 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 432 0 0
"3402" "exp3" 2 132 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 479 36 1
"3409" "exp3" 1 1 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1413 43 1
"3409" "exp3" 1 2 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 720 22 1
"3409" "exp3" 1 3 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 731 30 1
"3409" "exp3" 1 4 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 927 0 0
"3409" "exp3" 1 5 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1006 86 1
"3409" "exp3" 1 6 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1068 0 0
"3409" "exp3" 1 7 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1117 0 0
"3409" "exp3" 1 8 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1404 18 1
"3409" "exp3" 1 9 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1110 31 1
"3409" "exp3" 1 10 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1167 27 1
"3409" "exp3" 1 11 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 948 21 1
"3409" "exp3" 1 12 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1452 85 1
"3409" "exp3" 1 13 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 991 41 1
"3409" "exp3" 1 14 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1677 89 1
"3409" "exp3" 1 15 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 1289 64 1
"3409" "exp3" 1 16 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1133 0 0
"3409" "exp3" 1 17 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 895 14 1
"3409" "exp3" 1 18 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 937 79 1
"3409" "exp3" 1 19 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1502 0 0
"3409" "exp3" 1 20 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 937 46 1
"3409" "exp3" 1 21 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 974 20 1
"3409" "exp3" 1 22 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1141 0 0
"3409" "exp3" 1 23 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1278 65 1
"3409" "exp3" 1 24 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1152 13 1
"3409" "exp3" 1 25 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 848 0 0
"3409" "exp3" 1 26 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1482 15 1
"3409" "exp3" 1 27 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1984 0 0
"3409" "exp3" 1 28 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1091 0 0
"3409" "exp3" 1 29 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1131 0 0
"3409" "exp3" 1 30 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 911 73 1
"3409" "exp3" 1 31 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 831 0 0
"3409" "exp3" 1 32 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 734 83 1
"3409" "exp3" 1 33 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1085 0 0
"3409" "exp3" 1 34 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 707 0 0
"3409" "exp3" 1 35 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 779 0 0
"3409" "exp3" 1 36 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1254 35 1
"3409" "exp3" 1 37 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 984 0 0
"3409" "exp3" 1 38 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 827 19 1
"3409" "exp3" 1 39 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 822 96 1
"3409" "exp3" 1 40 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 968 21 1
"3409" "exp3" 1 41 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 957 73 1
"3409" "exp3" 1 42 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1117 0 0
"3409" "exp3" 1 43 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1031 0 0
"3409" "exp3" 1 44 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 610 0 0
"3409" "exp3" 1 45 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 687 24 1
"3409" "exp3" 1 46 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 676 44 1
"3409" "exp3" 1 47 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 716 25 1
"3409" "exp3" 1 48 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1100 28 1
"3409" "exp3" 1 49 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 782 26 1
"3409" "exp3" 1 50 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 999 86 1
"3409" "exp3" 1 51 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 733 74 1
"3409" "exp3" 1 52 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1384 0 0
"3409" "exp3" 1 53 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 796 0 0
"3409" "exp3" 1 54 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 721 0 0
"3409" "exp3" 1 55 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 924 0 0
"3409" "exp3" 1 56 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 760 82 1
"3409" "exp3" 1 57 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 907 27 1
"3409" "exp3" 1 58 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 710 47 1
"3409" "exp3" 1 59 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 979 34 1
"3409" "exp3" 1 60 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 788 0 0
"3409" "exp3" 1 61 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 729 70 1
"3409" "exp3" 1 62 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 895 0 0
"3409" "exp3" 1 63 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 626 0 0
"3409" "exp3" 1 64 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 829 40 1
"3409" "exp3" 1 65 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 821 70 1
"3409" "exp3" 1 66 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1390 0 0
"3409" "exp3" 1 67 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 754 31 1
"3409" "exp3" 1 68 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 936 16 1
"3409" "exp3" 1 69 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 763 76 1
"3409" "exp3" 1 70 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 697 42 1
"3409" "exp3" 1 71 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 639 0 0
"3409" "exp3" 1 72 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 928 0 0
"3409" "exp3" 1 73 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 975 0 0
"3409" "exp3" 1 74 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 823 18 1
"3409" "exp3" 1 75 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 936 95 1
"3409" "exp3" 1 76 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1274 68 1
"3409" "exp3" 1 77 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2054 63 1
"3409" "exp3" 1 78 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 853 20 1
"3409" "exp3" 1 79 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 722 0 0
"3409" "exp3" 1 80 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 930 0 0
"3409" "exp3" 1 81 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1696 45 1
"3409" "exp3" 1 82 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1661 0 0
"3409" "exp3" 1 83 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1231 17 1
"3409" "exp3" 1 84 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 773 37 1
"3409" "exp3" 1 85 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 711 0 0
"3409" "exp3" 1 86 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 912 0 0
"3409" "exp3" 1 87 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 971 67 1
"3409" "exp3" 1 88 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 817 0 0
"3409" "exp3" 1 89 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 805 0 0
"3409" "exp3" 1 90 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1078 35 1
"3409" "exp3" 1 91 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 774 29 1
"3409" "exp3" 1 92 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 961 43 1
"3409" "exp3" 1 93 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 782 0 0
"3409" "exp3" 1 94 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 960 29 1
"3409" "exp3" 1 95 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 886 17 1
"3409" "exp3" 1 96 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1120 0 0
"3409" "exp3" 1 97 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1259 0 0
"3409" "exp3" 1 98 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1258 68 1
"3409" "exp3" 1 99 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 900 0 0
"3409" "exp3" 1 100 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1263 42 1
"3409" "exp3" 1 101 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 879 28 1
"3409" "exp3" 1 102 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 882 0 0
"3409" "exp3" 1 103 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 882 23 1
"3409" "exp3" 1 104 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 652 0 0
"3409" "exp3" 1 105 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1306 0 0
"3409" "exp3" 1 106 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1080 74 1
"3409" "exp3" 1 107 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 923 32 1
"3409" "exp3" 1 108 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1000 0 0
"3409" "exp3" 1 109 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 635 19 1
"3409" "exp3" 1 110 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 703 0 0
"3409" "exp3" 1 111 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 854 37 1
"3409" "exp3" 1 112 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 697 0 0
"3409" "exp3" 1 113 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 725 24 1
"3409" "exp3" 1 114 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 764 0 0
"3409" "exp3" 1 115 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1319 22 1
"3409" "exp3" 1 116 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 710 0 0
"3409" "exp3" 1 117 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1017 0 0
"3409" "exp3" 1 118 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1038 36 1
"3409" "exp3" 1 119 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 774 0 0
"3409" "exp3" 1 120 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 861 26 1
"3409" "exp3" 1 121 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 750 0 0
"3409" "exp3" 1 122 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 866 33 1
"3409" "exp3" 1 123 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1151 0 0
"3409" "exp3" 1 124 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1825 0 0
"3409" "exp3" 1 125 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1212 38 1
"3409" "exp3" 1 126 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 843 0 0
"3409" "exp3" 1 127 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 945 38 1
"3409" "exp3" 1 128 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1316 25 1
"3409" "exp3" 1 129 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1074 69 1
"3409" "exp3" 1 130 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 942 88 1
"3409" "exp3" 1 131 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 924 0 0
"3409" "exp3" 1 132 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 707 0 0
"3409" "exp3" 2 1 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1013 0 0
"3409" "exp3" 2 2 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 623 0 0
"3409" "exp3" 2 3 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 640 42 1
"3409" "exp3" 2 4 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 690 17 1
"3409" "exp3" 2 5 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 589 93 1
"3409" "exp3" 2 6 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 599 43 1
"3409" "exp3" 2 7 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 675 18 1
"3409" "exp3" 2 8 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 596 0 0
"3409" "exp3" 2 9 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 744 0 0
"3409" "exp3" 2 10 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 732 75 1
"3409" "exp3" 2 11 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 725 40 1
"3409" "exp3" 2 12 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 954 0 0
"3409" "exp3" 2 13 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 926 0 0
"3409" "exp3" 2 14 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 817 0 0
"3409" "exp3" 2 15 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1027 0 0
"3409" "exp3" 2 16 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 741 23 1
"3409" "exp3" 2 17 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 842 0 0
"3409" "exp3" 2 18 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 966 28 1
"3409" "exp3" 2 19 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1022 32 1
"3409" "exp3" 2 20 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 791 20 1
"3409" "exp3" 2 21 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 764 14 1
"3409" "exp3" 2 22 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 786 31 1
"3409" "exp3" 2 23 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 912 0 0
"3409" "exp3" 2 24 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 877 37 1
"3409" "exp3" 2 25 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 712 0 0
"3409" "exp3" 2 26 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 878 0 0
"3409" "exp3" 2 27 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 740 34 1
"3409" "exp3" 2 28 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 724 0 0
"3409" "exp3" 2 29 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1203 0 0
"3409" "exp3" 2 30 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 759 0 0
"3409" "exp3" 2 31 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 915 0 0
"3409" "exp3" 2 32 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1013 0 0
"3409" "exp3" 2 33 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 787 20 1
"3409" "exp3" 2 34 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 918 0 0
"3409" "exp3" 2 35 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 745 0 0
"3409" "exp3" 2 36 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1782 80 1
"3409" "exp3" 2 37 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 967 0 0
"3409" "exp3" 2 38 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1157 48 1
"3409" "exp3" 2 39 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 766 0 0
"3409" "exp3" 2 40 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 993 29 1
"3409" "exp3" 2 41 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 872 70 1
"3409" "exp3" 2 42 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 833 0 0
"3409" "exp3" 2 43 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1221 0 0
"3409" "exp3" 2 44 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 684 44 1
"3409" "exp3" 2 45 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1877 19 1
"3409" "exp3" 2 46 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 845 16 1
"3409" "exp3" 2 47 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 967 0 0
"3409" "exp3" 2 48 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 3329 0 0
"3409" "exp3" 2 49 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1179 81 1
"3409" "exp3" 2 50 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 3780 0 0
"3409" "exp3" 2 51 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1310 25 1
"3409" "exp3" 2 52 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1213 13 1
"3409" "exp3" 2 53 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 847 23 1
"3409" "exp3" 2 54 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1340 22 1
"3409" "exp3" 2 55 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 932 90 1
"3409" "exp3" 2 56 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 825 0 0
"3409" "exp3" 2 57 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1075 0 0
"3409" "exp3" 2 58 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 792 0 0
"3409" "exp3" 2 59 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1305 0 0
"3409" "exp3" 2 60 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 788 0 0
"3409" "exp3" 2 61 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1426 0 0
"3409" "exp3" 2 62 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 811 0 0
"3409" "exp3" 2 63 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 739 28 1
"3409" "exp3" 2 64 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1132 0 0
"3409" "exp3" 2 65 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1435 0 0
"3409" "exp3" 2 66 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1157 0 0
"3409" "exp3" 2 67 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 831 0 0
"3409" "exp3" 2 68 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 706 0 0
"3409" "exp3" 2 69 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 895 0 0
"3409" "exp3" 2 70 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1026 0 0
"3409" "exp3" 2 71 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1156 0 0
"3409" "exp3" 2 72 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 794 72 1
"3409" "exp3" 2 73 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1054 0 0
"3409" "exp3" 2 74 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 876 0 0
"3409" "exp3" 2 75 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1076 39 1
"3409" "exp3" 2 76 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 872 0 0
"3409" "exp3" 2 77 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1587 0 0
"3409" "exp3" 2 78 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 797 0 0
"3409" "exp3" 2 79 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1009 43 1
"3409" "exp3" 2 80 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 399 0 0
"3409" "exp3" 2 81 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1170 17 1
"3409" "exp3" 2 82 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1007 0 0
"3409" "exp3" 2 83 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1396 65 1
"3409" "exp3" 2 84 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1117 0 0
"3409" "exp3" 2 85 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1373 42 1
"3409" "exp3" 2 86 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1497 85 1
"3409" "exp3" 2 87 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 748 15 1
"3409" "exp3" 2 88 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 911 0 0
"3409" "exp3" 2 89 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1177 39 1
"3409" "exp3" 2 90 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 925 0 0
"3409" "exp3" 2 91 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1187 75 1
"3409" "exp3" 2 92 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 876 63 1
"3409" "exp3" 2 93 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1612 38 1
"3409" "exp3" 2 94 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 887 0 0
"3409" "exp3" 2 95 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 716 80 1
"3409" "exp3" 2 96 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 741 25 1
"3409" "exp3" 2 97 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 731 0 0
"3409" "exp3" 2 98 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1124 0 0
"3409" "exp3" 2 99 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 926 21 1
"3409" "exp3" 2 100 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1132 24 1
"3409" "exp3" 2 101 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 693 0 0
"3409" "exp3" 2 102 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1368 31 1
"3409" "exp3" 2 103 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1201 18 1
"3409" "exp3" 2 104 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 808 35 1
"3409" "exp3" 2 105 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1378 0 0
"3409" "exp3" 2 106 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1027 27 1
"3409" "exp3" 2 107 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 720 0 0
"3409" "exp3" 2 108 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 672 34 1
"3409" "exp3" 2 109 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 700 6 1
"3409" "exp3" 2 110 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 826 82 1
"3409" "exp3" 2 111 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1245 0 0
"3409" "exp3" 2 112 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 926 30 1
"3409" "exp3" 2 113 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1070 35 1
"3409" "exp3" 2 114 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1134 0 0
"3409" "exp3" 2 115 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1184 26 1
"3409" "exp3" 2 116 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1151 0 0
"3409" "exp3" 2 117 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 837 37 1
"3409" "exp3" 2 118 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 750 0 0
"3409" "exp3" 2 119 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1337 30 1
"3409" "exp3" 2 120 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 916 67 1
"3409" "exp3" 2 121 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1039 0 0
"3409" "exp3" 2 122 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1239 0 0
"3409" "exp3" 2 123 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 744 0 0
"3409" "exp3" 2 124 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 730 78 1
"3409" "exp3" 2 125 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 896 41 1
"3409" "exp3" 2 126 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 952 86 1
"3409" "exp3" 2 127 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1755 26 1
"3409" "exp3" 2 128 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 892 0 0
"3409" "exp3" 2 129 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1036 44 1
"3409" "exp3" 2 130 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 758 0 0
"3409" "exp3" 2 131 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 866 32 1
"3409" "exp3" 2 132 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 682 0 0
"3409" "exp3" 1 1 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 985 95 1
"3409" "exp3" 1 2 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1924 0 0
"3409" "exp3" 1 3 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1582 82 1
"3409" "exp3" 1 4 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1488 0 0
"3409" "exp3" 1 5 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 2158 0 0
"3409" "exp3" 1 6 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 2189 0 0
"3409" "exp3" 1 7 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 2214 0 0
"3409" "exp3" 1 8 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2596 43 1
"3409" "exp3" 1 9 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1513 16 1
"3409" "exp3" 1 10 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 2416 0 0
"3409" "exp3" 1 11 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1426 0 0
"3409" "exp3" 1 12 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1099 24 1
"3409" "exp3" 1 13 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1482 0 0
"3409" "exp3" 1 14 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1539 0 0
"3409" "exp3" 1 15 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1050 0 0
"3409" "exp3" 1 16 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 954 0 0
"3409" "exp3" 1 17 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 2153 27 1
"3409" "exp3" 1 18 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1637 0 0
"3409" "exp3" 1 19 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1895 0 0
"3409" "exp3" 1 20 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 4621 0 0
"3409" "exp3" 1 21 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1198 0 0
"3409" "exp3" 1 22 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1093 0 0
"3409" "exp3" 1 23 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 4658 0 0
"3409" "exp3" 1 24 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1576 0 0
"3409" "exp3" 1 25 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2185 64 1
"3409" "exp3" 1 26 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1946 0 0
"3409" "exp3" 1 27 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1008 22 1
"3409" "exp3" 1 28 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 917 0 0
"3409" "exp3" 1 29 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 881 0 0
"3409" "exp3" 1 30 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1189 0 0
"3409" "exp3" 1 31 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1939 29 1
"3409" "exp3" 1 32 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 822 0 0
"3409" "exp3" 1 33 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1038 21 1
"3409" "exp3" 1 34 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 893 14 1
"3409" "exp3" 1 35 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1648 0 0
"3409" "exp3" 1 36 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1739 38 1
"3409" "exp3" 1 37 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1168 0 0
"3409" "exp3" 1 38 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1071 41 1
"3409" "exp3" 1 39 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1485 0 0
"3409" "exp3" 1 40 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 4250 0 0
"3409" "exp3" 1 41 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1343 23 1
"3409" "exp3" 1 42 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1650 70 1
"3409" "exp3" 1 43 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2842 40 1
"3409" "exp3" 1 44 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1184 33 1
"3409" "exp3" 1 45 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1112 0 0
"3409" "exp3" 1 46 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1374 19 1
"3409" "exp3" 1 47 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 929 0 0
"3409" "exp3" 1 48 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1524 0 0
"3409" "exp3" 1 49 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1206 45 1
"3409" "exp3" 1 50 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1100 0 0
"3409" "exp3" 1 51 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1231 0 0
"3409" "exp3" 1 52 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 933 0 0
"3409" "exp3" 1 53 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1367 76 1
"3409" "exp3" 1 54 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1442 35 1
"3409" "exp3" 1 55 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1311 15 1
"3409" "exp3" 1 56 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1237 0 0
"3409" "exp3" 1 57 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1525 19 1
"3409" "exp3" 1 58 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1145 30 1
"3409" "exp3" 1 59 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1926 0 0
"3409" "exp3" 1 60 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1261 65 1
"3409" "exp3" 1 61 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 868 0 0
"3409" "exp3" 1 62 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 793 0 0
"3409" "exp3" 1 63 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 849 0 0
"3409" "exp3" 1 64 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1498 0 0
"3409" "exp3" 1 65 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1688 0 0
"3409" "exp3" 1 66 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1284 89 1
"3409" "exp3" 1 67 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 991 0 0
"3409" "exp3" 1 68 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 5568 49 1
"3409" "exp3" 1 69 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 921 0 0
"3409" "exp3" 1 70 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 2323 0 0
"3409" "exp3" 1 71 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1425 44 1
"3409" "exp3" 1 72 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1247 0 0
"3409" "exp3" 1 73 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1199 0 0
"3409" "exp3" 1 74 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2438 84 1
"3409" "exp3" 1 75 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1836 21 1
"3409" "exp3" 1 76 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1166 0 0
"3409" "exp3" 1 77 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1570 26 1
"3409" "exp3" 1 78 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1284 0 0
"3409" "exp3" 1 79 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1098 0 0
"3409" "exp3" 1 80 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1035 29 1
"3409" "exp3" 1 81 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1293 0 0
"3409" "exp3" 1 82 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1057 0 0
"3409" "exp3" 1 83 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 4712 42 1
"3409" "exp3" 1 84 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1477 0 0
"3409" "exp3" 1 85 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 2328 17 1
"3409" "exp3" 1 86 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1634 25 1
"3409" "exp3" 1 87 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1053 0 0
"3409" "exp3" 1 88 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1390 23 1
"3409" "exp3" 1 89 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 3404 0 0
"3409" "exp3" 1 90 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1386 0 0
"3409" "exp3" 1 91 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 842 18 1
"3409" "exp3" 1 92 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 883 0 0
"3409" "exp3" 1 93 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 4211 0 0
"3409" "exp3" 1 94 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1019 0 0
"3409" "exp3" 1 95 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 992 0 0
"3409" "exp3" 1 96 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2365 37 1
"3409" "exp3" 1 97 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1398 0 0
"3409" "exp3" 1 98 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1130 0 0
"3409" "exp3" 1 99 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 960 0 0
"3409" "exp3" 1 100 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1102 33 1
"3409" "exp3" 1 101 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2154 0 0
"3409" "exp3" 1 102 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 3616 73 1
"3409" "exp3" 1 103 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 5944 76 1
"3409" "exp3" 1 104 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1187 0 0
"3409" "exp3" 1 105 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1060 90 1
"3409" "exp3" 1 106 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1499 30 1
"3409" "exp3" 1 107 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1737 0 0
"3409" "exp3" 1 108 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1392 28 1
"3409" "exp3" 1 109 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 2583 67 1
"3409" "exp3" 1 110 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1398 48 1
"3409" "exp3" 1 111 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1524 37 1
"3409" "exp3" 1 112 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1532 0 0
"3409" "exp3" 1 113 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1229 25 1
"3409" "exp3" 1 114 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1356 26 1
"3409" "exp3" 1 115 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 3746 69 1
"3409" "exp3" 1 116 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2082 45 1
"3409" "exp3" 1 117 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1571 27 1
"3409" "exp3" 1 118 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2659 0 0
"3409" "exp3" 1 119 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2888 0 0
"3409" "exp3" 1 120 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 3059 0 0
"3409" "exp3" 1 121 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2789 39 1
"3409" "exp3" 1 122 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 999 22 1
"3409" "exp3" 1 123 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 971 32 1
"3409" "exp3" 1 124 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1397 18 1
"3409" "exp3" 1 125 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1470 38 1
"3409" "exp3" 1 126 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1353 0 0
"3409" "exp3" 1 127 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1911 88 1
"3409" "exp3" 1 128 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 2571 72 1
"3409" "exp3" 1 129 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1302 41 1
"3409" "exp3" 1 130 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 997 17 1
"3409" "exp3" 1 131 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1029 0 0
"3409" "exp3" 1 132 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 952 37 1
"3409" "exp3" 2 1 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 901 22 1
"3409" "exp3" 2 2 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 930 0 0
"3409" "exp3" 2 3 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1016 74 1
"3409" "exp3" 2 4 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 773 0 0
"3409" "exp3" 2 5 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 856 0 0
"3409" "exp3" 2 6 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 723 28 1
"3409" "exp3" 2 7 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 904 92 1
"3409" "exp3" 2 8 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1041 0 0
"3409" "exp3" 2 9 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 977 41 1
"3409" "exp3" 2 10 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 876 18 1
"3409" "exp3" 2 11 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1364 82 1
"3409" "exp3" 2 12 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 921 19 1
"3409" "exp3" 2 13 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 710 0 0
"3409" "exp3" 2 14 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 965 82 1
"3409" "exp3" 2 15 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1105 28 1
"3409" "exp3" 2 16 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 827 0 0
"3409" "exp3" 2 17 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 765 0 0
"3409" "exp3" 2 18 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 848 0 0
"3409" "exp3" 2 19 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 668 14 1
"3409" "exp3" 2 20 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1223 40 1
"3409" "exp3" 2 21 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 3144 0 0
"3409" "exp3" 2 22 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1751 0 0
"3409" "exp3" 2 23 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 2992 0 0
"3409" "exp3" 2 24 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 2026 0 0
"3409" "exp3" 2 25 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1611 0 0
"3409" "exp3" 2 26 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1906 0 0
"3409" "exp3" 2 27 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1422 13 1
"3409" "exp3" 2 28 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1015 0 0
"3409" "exp3" 2 29 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1391 22 1
"3409" "exp3" 2 30 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 922 0 0
"3409" "exp3" 2 31 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3039 49 1
"3409" "exp3" 2 32 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1886 44 1
"3409" "exp3" 2 33 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1379 43 1
"3409" "exp3" 2 34 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 884 0 0
"3409" "exp3" 2 35 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1420 47 1
"3409" "exp3" 2 36 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 963 27 1
"3409" "exp3" 2 37 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1060 0 0
"3409" "exp3" 2 38 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 875 34 1
"3409" "exp3" 2 39 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 2350 0 0
"3409" "exp3" 2 40 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1382 0 0
"3409" "exp3" 2 41 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 2735 0 0
"3409" "exp3" 2 42 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 852 83 1
"3409" "exp3" 2 43 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1015 71 1
"3409" "exp3" 2 44 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1383 37 1
"3409" "exp3" 2 45 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1056 0 0
"3409" "exp3" 2 46 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1832 0 0
"3409" "exp3" 2 47 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1191 42 1
"3409" "exp3" 2 48 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1231 20 1
"3409" "exp3" 2 49 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 697 0 0
"3409" "exp3" 2 50 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1270 38 1
"3409" "exp3" 2 51 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 789 0 0
"3409" "exp3" 2 52 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 821 87 1
"3409" "exp3" 2 53 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 724 24 1
"3409" "exp3" 2 54 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1841 45 1
"3409" "exp3" 2 55 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 5992 0 0
"3409" "exp3" 2 56 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1489 39 1
"3409" "exp3" 2 57 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2566 40 1
"3409" "exp3" 2 58 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 796 0 0
"3409" "exp3" 2 59 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 713 0 0
"3409" "exp3" 2 60 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 965 85 1
"3409" "exp3" 2 61 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1005 30 1
"3409" "exp3" 2 62 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1467 0 0
"3409" "exp3" 2 63 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 598 0 0
"3409" "exp3" 2 64 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1261 0 0
"3409" "exp3" 2 65 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 898 75 1
"3409" "exp3" 2 66 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 901 0 0
"3409" "exp3" 2 67 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1493 0 0
"3409" "exp3" 2 68 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1354 0 0
"3409" "exp3" 2 69 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 3025 17 1
"3409" "exp3" 2 70 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1113 0 0
"3409" "exp3" 2 71 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 866 15 1
"3409" "exp3" 2 72 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 959 0 0
"3409" "exp3" 2 73 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1078 0 0
"3409" "exp3" 2 74 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1080 35 1
"3409" "exp3" 2 75 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1018 76 1
"3409" "exp3" 2 76 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1239 32 1
"3409" "exp3" 2 77 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1251 0 0
"3409" "exp3" 2 78 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1653 0 0
"3409" "exp3" 2 79 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1829 0 0
"3409" "exp3" 2 80 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 727 0 0
"3409" "exp3" 2 81 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1191 0 0
"3409" "exp3" 2 82 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 2029 21 1
"3409" "exp3" 2 83 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 2009 19 1
"3409" "exp3" 2 84 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 2595 0 0
"3409" "exp3" 2 85 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 964 25 1
"3409" "exp3" 2 86 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1386 44 1
"3409" "exp3" 2 87 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1100 31 1
"3409" "exp3" 2 88 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1341 29 1
"3409" "exp3" 2 89 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 876 23 1
"3409" "exp3" 2 90 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 703 0 0
"3409" "exp3" 2 91 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 2177 72 1
"3409" "exp3" 2 92 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1216 0 0
"3409" "exp3" 2 93 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 3194 45 1
"3409" "exp3" 2 94 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1491 0 0
"3409" "exp3" 2 95 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 747 17 1
"3409" "exp3" 2 96 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1313 36 1
"3409" "exp3" 2 97 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1183 33 1
"3409" "exp3" 2 98 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2278 34 1
"3409" "exp3" 2 99 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 3909 67 1
"3409" "exp3" 2 100 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1897 87 1
"3409" "exp3" 2 101 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1370 25 1
"3409" "exp3" 2 102 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2203 0 0
"3409" "exp3" 2 103 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 896 0 0
"3409" "exp3" 2 104 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 849 89 1
"3409" "exp3" 2 105 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1179 84 1
"3409" "exp3" 2 106 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1192 36 1
"3409" "exp3" 2 107 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2904 0 0
"3409" "exp3" 2 108 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1133 18 1
"3409" "exp3" 2 109 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1470 67 1
"3409" "exp3" 2 110 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1732 0 0
"3409" "exp3" 2 111 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1913 0 0
"3409" "exp3" 2 112 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1195 78 1
"3409" "exp3" 2 113 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 959 30 1
"3409" "exp3" 2 114 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1628 0 0
"3409" "exp3" 2 115 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1025 21 1
"3409" "exp3" 2 116 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1330 0 0
"3409" "exp3" 2 117 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1027 0 0
"3409" "exp3" 2 118 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 861 0 0
"3409" "exp3" 2 119 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 774 0 0
"3409" "exp3" 2 120 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1217 30 1
"3409" "exp3" 2 121 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 886 0 0
"3409" "exp3" 2 122 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1021 33 1
"3409" "exp3" 2 123 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1788 79 1
"3409" "exp3" 2 124 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 4046 0 0
"3409" "exp3" 2 125 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1094 23 1
"3409" "exp3" 2 126 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2126 37 1
"3409" "exp3" 2 127 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1661 35 1
"3409" "exp3" 2 128 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 701 0 0
"3409" "exp3" 2 129 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1183 0 0
"3409" "exp3" 2 130 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1771 32 1
"3409" "exp3" 2 131 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1491 16 1
"3409" "exp3" 2 132 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2338 0 0
"3409" "exp3" 1 1 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1282 28 1
"3409" "exp3" 1 2 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 883 0 0
"3409" "exp3" 1 3 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 4120 0 0
"3409" "exp3" 1 4 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1577 0 0
"3409" "exp3" 1 5 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1543 0 0
"3409" "exp3" 1 6 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2455 41 1
"3409" "exp3" 1 7 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1856 74 1
"3409" "exp3" 1 8 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1825 0 0
"3409" "exp3" 1 9 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1163 15 1
"3409" "exp3" 1 10 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 986 25 1
"3409" "exp3" 1 11 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1546 0 0
"3409" "exp3" 1 12 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1076 22 1
"3409" "exp3" 1 13 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1297 89 1
"3409" "exp3" 1 14 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 2211 76 1
"3409" "exp3" 1 15 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1100 0 0
"3409" "exp3" 1 16 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1114 26 1
"3409" "exp3" 1 17 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1282 0 0
"3409" "exp3" 1 18 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1164 22 1
"3409" "exp3" 1 19 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1245 36 1
"3409" "exp3" 1 20 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1160 0 0
"3409" "exp3" 1 21 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1073 20 1
"3409" "exp3" 1 22 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1388 0 0
"3409" "exp3" 1 23 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1447 0 0
"3409" "exp3" 1 24 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 863 0 0
"3409" "exp3" 1 25 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 794 0 0
"3409" "exp3" 1 26 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1071 32 1
"3409" "exp3" 1 27 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1026 0 0
"3409" "exp3" 1 28 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 853 0 0
"3409" "exp3" 1 29 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1041 0 0
"3409" "exp3" 1 30 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2173 33 1
"3409" "exp3" 1 31 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1379 0 0
"3409" "exp3" 1 32 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1721 27 1
"3409" "exp3" 1 33 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1529 0 0
"3409" "exp3" 1 34 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1087 23 1
"3409" "exp3" 1 35 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 804 17 1
"3409" "exp3" 1 36 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1714 71 1
"3409" "exp3" 1 37 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1210 94 1
"3409" "exp3" 1 38 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1166 0 0
"3409" "exp3" 1 39 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 3534 65 1
"3409" "exp3" 1 40 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1431 33 1
"3409" "exp3" 1 41 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1263 0 0
"3409" "exp3" 1 42 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2044 79 1
"3409" "exp3" 1 43 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2022 29 1
"3409" "exp3" 1 44 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1136 0 0
"3409" "exp3" 1 45 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1068 19 1
"3409" "exp3" 1 46 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1436 35 1
"3409" "exp3" 1 47 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1072 27 1
"3409" "exp3" 1 48 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1138 0 0
"3409" "exp3" 1 49 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1711 0 0
"3409" "exp3" 1 50 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1182 0 0
"3409" "exp3" 1 51 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 2191 0 0
"3409" "exp3" 1 52 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1372 17 1
"3409" "exp3" 1 53 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1151 0 0
"3409" "exp3" 1 54 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1185 0 0
"3409" "exp3" 1 55 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1472 29 1
"3409" "exp3" 1 56 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2464 40 1
"3409" "exp3" 1 57 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1302 91 1
"3409" "exp3" 1 58 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1012 0 0
"3409" "exp3" 1 59 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 998 0 0
"3409" "exp3" 1 60 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 960 0 0
"3409" "exp3" 1 61 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1235 30 1
"3409" "exp3" 1 62 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2124 48 1
"3409" "exp3" 1 63 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1314 46 1
"3409" "exp3" 1 64 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1016 25 1
"3409" "exp3" 1 65 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1762 32 1
"3409" "exp3" 1 66 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1016 0 0
"3409" "exp3" 1 67 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1059 0 0
"3409" "exp3" 1 68 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1777 42 1
"3409" "exp3" 1 69 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2491 0 0
"3409" "exp3" 1 70 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 3169 0 0
"3409" "exp3" 1 71 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1248 0 0
"3409" "exp3" 1 72 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1485 41 1
"3409" "exp3" 1 73 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1955 0 0
"3409" "exp3" 1 74 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2137 0 0
"3409" "exp3" 1 75 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 2061 0 0
"3409" "exp3" 1 76 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 900 0 0
"3409" "exp3" 1 77 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1787 67 1
"3409" "exp3" 1 78 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1994 49 1
"3409" "exp3" 1 79 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1357 0 0
"3409" "exp3" 1 80 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 1580 63 1
"3409" "exp3" 1 81 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1211 0 0
"3409" "exp3" 1 82 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 2876 0 0
"3409" "exp3" 1 83 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1147 19 1
"3409" "exp3" 1 84 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 816 0 0
"3409" "exp3" 1 85 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1074 0 0
"3409" "exp3" 1 86 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1503 0 0
"3409" "exp3" 1 87 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1438 0 0
"3409" "exp3" 1 88 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1185 0 0
"3409" "exp3" 1 89 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1040 0 0
"3409" "exp3" 1 90 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1074 13 1
"3409" "exp3" 1 91 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1108 0 0
"3409" "exp3" 1 92 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1352 0 0
"3409" "exp3" 1 93 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 835 0 0
"3409" "exp3" 1 94 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 927 0 0
"3409" "exp3" 1 95 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2837 69 1
"3409" "exp3" 1 96 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1485 0 0
"3409" "exp3" 1 97 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 1935 0 0
"3409" "exp3" 1 98 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1153 0 0
"3409" "exp3" 1 99 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1531 43 1
"3409" "exp3" 1 100 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 830 82 1
"3409" "exp3" 1 101 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 830 0 0
"3409" "exp3" 1 102 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 913 0 0
"3409" "exp3" 1 103 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 736 88 1
"3409" "exp3" 1 104 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1223 16 1
"3409" "exp3" 1 105 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1082 28 1
"3409" "exp3" 1 106 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1938 37 1
"3409" "exp3" 1 107 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1136 84 1
"3409" "exp3" 1 108 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1606 38 1
"3409" "exp3" 1 109 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1226 21 1
"3409" "exp3" 1 110 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1607 18 1
"3409" "exp3" 1 111 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 3818 0 0
"3409" "exp3" 1 112 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1329 21 1
"3409" "exp3" 1 113 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1399 0 0
"3409" "exp3" 1 114 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1304 0 0
"3409" "exp3" 1 115 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1388 38 1
"3409" "exp3" 1 116 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1161 40 1
"3409" "exp3" 1 117 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 2099 0 0
"3409" "exp3" 1 118 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1080 30 1
"3409" "exp3" 1 119 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1109 0 0
"3409" "exp3" 1 120 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1444 0 0
"3409" "exp3" 1 121 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1823 0 0
"3409" "exp3" 1 122 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1056 0 0
"3409" "exp3" 1 123 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1260 73 1
"3409" "exp3" 1 124 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2011 39 1
"3409" "exp3" 1 125 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 4102 0 0
"3409" "exp3" 1 126 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 925 0 0
"3409" "exp3" 1 127 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1448 0 0
"3409" "exp3" 1 128 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1539 0 0
"3409" "exp3" 1 129 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1702 36 1
"3409" "exp3" 1 130 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1862 0 0
"3409" "exp3" 1 131 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1050 31 1
"3409" "exp3" 1 132 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 790 0 0
"3409" "exp3" 2 1 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 848 30 1
"3409" "exp3" 2 2 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1008 0 0
"3409" "exp3" 2 3 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1054 0 0
"3409" "exp3" 2 4 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1004 0 0
"3409" "exp3" 2 5 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 964 0 0
"3409" "exp3" 2 6 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 954 30 1
"3409" "exp3" 2 7 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 881 92 1
"3409" "exp3" 2 8 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 970 24 1
"3409" "exp3" 2 9 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 952 0 0
"3409" "exp3" 2 10 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2085 38 1
"3409" "exp3" 2 11 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1000 68 1
"3409" "exp3" 2 12 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 966 21 1
"3409" "exp3" 2 13 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 739 0 0
"3409" "exp3" 2 14 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1839 46 1
"3409" "exp3" 2 15 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1119 0 0
"3409" "exp3" 2 16 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2104 0 0
"3409" "exp3" 2 17 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1461 78 1
"3409" "exp3" 2 18 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1122 16 1
"3409" "exp3" 2 19 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1485 31 1
"3409" "exp3" 2 20 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 909 0 0
"3409" "exp3" 2 21 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 936 23 1
"3409" "exp3" 2 22 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1181 0 0
"3409" "exp3" 2 23 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1160 34 1
"3409" "exp3" 2 24 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 2271 68 1
"3409" "exp3" 2 25 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1020 0 0
"3409" "exp3" 2 26 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 950 0 0
"3409" "exp3" 2 27 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1135 18 1
"3409" "exp3" 2 28 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1263 32 1
"3409" "exp3" 2 29 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1900 86 1
"3409" "exp3" 2 30 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1167 0 0
"3409" "exp3" 2 31 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1337 26 1
"3409" "exp3" 2 32 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 994 19 1
"3409" "exp3" 2 33 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1583 0 0
"3409" "exp3" 2 34 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1617 27 1
"3409" "exp3" 2 35 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1046 0 0
"3409" "exp3" 2 36 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 2856 0 0
"3409" "exp3" 2 37 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 3267 0 0
"3409" "exp3" 2 38 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 843 0 0
"3409" "exp3" 2 39 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1312 0 0
"3409" "exp3" 2 40 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1817 0 0
"3409" "exp3" 2 41 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1033 13 1
"3409" "exp3" 2 42 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 2914 0 0
"3409" "exp3" 2 43 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 836 88 1
"3409" "exp3" 2 44 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 932 0 0
"3409" "exp3" 2 45 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1516 25 1
"3409" "exp3" 2 46 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1952 0 0
"3409" "exp3" 2 47 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 2162 71 1
"3409" "exp3" 2 48 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1913 77 1
"3409" "exp3" 2 49 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1573 35 1
"3409" "exp3" 2 50 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1243 33 1
"3409" "exp3" 2 51 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 3584 0 0
"3409" "exp3" 2 52 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1690 0 0
"3409" "exp3" 2 53 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1205 73 1
"3409" "exp3" 2 54 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1455 0 0
"3409" "exp3" 2 55 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2210 40 1
"3409" "exp3" 2 56 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2823 36 1
"3409" "exp3" 2 57 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1360 67 1
"3409" "exp3" 2 58 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 851 22 1
"3409" "exp3" 2 59 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1169 0 0
"3409" "exp3" 2 60 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 1136 63 1
"3409" "exp3" 2 61 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 983 41 1
"3409" "exp3" 2 62 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 804 22 1
"3409" "exp3" 2 63 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1362 69 1
"3409" "exp3" 2 64 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 841 25 1
"3409" "exp3" 2 65 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1190 31 1
"3409" "exp3" 2 66 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1174 23 1
"3409" "exp3" 2 67 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1531 0 0
"3409" "exp3" 2 68 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1043 20 1
"3409" "exp3" 2 69 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1230 0 0
"3409" "exp3" 2 70 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1600 45 1
"3409" "exp3" 2 71 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2252 29 1
"3409" "exp3" 2 72 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1674 0 0
"3409" "exp3" 2 73 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1694 0 0
"3409" "exp3" 2 74 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 821 17 1
"3409" "exp3" 2 75 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 3683 17 1
"3409" "exp3" 2 76 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1254 49 1
"3409" "exp3" 2 77 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1132 34 1
"3409" "exp3" 2 78 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 771 86 1
"3409" "exp3" 2 79 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1079 0 0
"3409" "exp3" 2 80 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 758 21 1
"3409" "exp3" 2 81 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 882 38 1
"3409" "exp3" 2 82 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 976 0 0
"3409" "exp3" 2 83 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1200 37 1
"3409" "exp3" 2 84 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 782 0 0
"3409" "exp3" 2 85 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1663 28 1
"3409" "exp3" 2 86 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 840 20 1
"3409" "exp3" 2 87 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 733 0 0
"3409" "exp3" 2 88 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 855 0 0
"3409" "exp3" 2 89 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 871 33 1
"3409" "exp3" 2 90 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1423 36 1
"3409" "exp3" 2 91 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1201 47 1
"3409" "exp3" 2 92 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 836 0 0
"3409" "exp3" 2 93 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 4172 0 0
"3409" "exp3" 2 94 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1087 89 1
"3409" "exp3" 2 95 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 830 0 0
"3409" "exp3" 2 96 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1194 26 1
"3409" "exp3" 2 97 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1064 0 0
"3409" "exp3" 2 98 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1181 0 0
"3409" "exp3" 2 99 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1011 0 0
"3409" "exp3" 2 100 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 843 0 0
"3409" "exp3" 2 101 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1468 0 0
"3409" "exp3" 2 102 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1255 87 1
"3409" "exp3" 2 103 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 997 0 0
"3409" "exp3" 2 104 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 895 18 1
"3409" "exp3" 2 105 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 997 0 0
"3409" "exp3" 2 106 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1320 40 1
"3409" "exp3" 2 107 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1871 0 0
"3409" "exp3" 2 108 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 2916 0 0
"3409" "exp3" 2 109 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1397 0 0
"3409" "exp3" 2 110 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1217 0 0
"3409" "exp3" 2 111 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1226 0 0
"3409" "exp3" 2 112 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 2345 0 0
"3409" "exp3" 2 113 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1749 44 1
"3409" "exp3" 2 114 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1088 70 1
"3409" "exp3" 2 115 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 813 0 0
"3409" "exp3" 2 116 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1915 45 1
"3409" "exp3" 2 117 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1800 0 0
"3409" "exp3" 2 118 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 921 28 1
"3409" "exp3" 2 119 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1499 85 1
"3409" "exp3" 2 120 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 974 0 0
"3409" "exp3" 2 121 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 994 0 0
"3409" "exp3" 2 122 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1224 0 0
"3409" "exp3" 2 123 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2392 39 1
"3409" "exp3" 2 124 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 3834 42 1
"3409" "exp3" 2 125 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2906 0 0
"3409" "exp3" 2 126 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 2591 67 1
"3409" "exp3" 2 127 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1434 35 1
"3409" "exp3" 2 128 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1533 0 0
"3409" "exp3" 2 129 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1475 83 1
"3409" "exp3" 2 130 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 3118 43 1
"3409" "exp3" 2 131 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1223 14 1
"3409" "exp3" 2 132 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1001 0 0
"3409" "exp3" 1 1 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1034 41 1
"3409" "exp3" 1 2 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1229 27 1
"3409" "exp3" 1 3 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1779 28 1
"3409" "exp3" 1 4 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 893 0 0
"3409" "exp3" 1 5 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 704 29 1
"3409" "exp3" 1 6 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 811 76 1
"3409" "exp3" 1 7 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 693 0 0
"3409" "exp3" 1 8 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 712 31 1
"3409" "exp3" 1 9 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 701 0 0
"3409" "exp3" 1 10 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1238 34 1
"3409" "exp3" 1 11 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 658 21 1
"3409" "exp3" 1 12 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 854 0 0
"3409" "exp3" 1 13 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 637 19 1
"3409" "exp3" 1 14 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 817 48 1
"3409" "exp3" 1 15 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 938 64 1
"3409" "exp3" 1 16 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1031 0 0
"3409" "exp3" 1 17 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 996 0 0
"3409" "exp3" 1 18 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2887 45 1
"3409" "exp3" 1 19 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 954 18 1
"3409" "exp3" 1 20 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1373 0 0
"3409" "exp3" 1 21 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1181 28 1
"3409" "exp3" 1 22 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 694 16 1
"3409" "exp3" 1 23 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1448 19 1
"3409" "exp3" 1 24 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1403 36 1
"3409" "exp3" 1 25 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1017 0 0
"3409" "exp3" 1 26 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 795 26 1
"3409" "exp3" 1 27 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 1534 0 0
"3409" "exp3" 1 28 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1036 0 0
"3409" "exp3" 1 29 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 774 14 1
"3409" "exp3" 1 30 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 941 0 0
"3409" "exp3" 1 31 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 784 0 0
"3409" "exp3" 1 32 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 705 35 1
"3409" "exp3" 1 33 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 795 0 0
"3409" "exp3" 1 34 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 712 0 0
"3409" "exp3" 1 35 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 960 0 0
"3409" "exp3" 1 36 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 847 0 0
"3409" "exp3" 1 37 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 833 0 0
"3409" "exp3" 1 38 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 748 0 0
"3409" "exp3" 1 39 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1608 0 0
"3409" "exp3" 1 40 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 886 0 0
"3409" "exp3" 1 41 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 771 0 0
"3409" "exp3" 1 42 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 2354 24 1
"3409" "exp3" 1 43 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 700 23 1
"3409" "exp3" 1 44 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 794 0 0
"3409" "exp3" 1 45 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 4188 17 1
"3409" "exp3" 1 46 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 60 0 0
"3409" "exp3" 1 47 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1619 0 0
"3409" "exp3" 1 48 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 781 0 0
"3409" "exp3" 1 49 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 966 44 1
"3409" "exp3" 1 50 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 3915 0 0
"3409" "exp3" 1 51 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1135 0 0
"3409" "exp3" 1 52 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 2401 31 1
"3409" "exp3" 1 53 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 782 20 1
"3409" "exp3" 1 54 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 964 0 0
"3409" "exp3" 1 55 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1111 46 1
"3409" "exp3" 1 56 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 872 0 0
"3409" "exp3" 1 57 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 752 0 0
"3409" "exp3" 1 58 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1103 0 0
"3409" "exp3" 1 59 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 851 0 0
"3409" "exp3" 1 60 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 719 30 1
"3409" "exp3" 1 61 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 943 0 0
"3409" "exp3" 1 62 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1435 22 1
"3409" "exp3" 1 63 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 721 0 0
"3409" "exp3" 1 64 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2787 47 1
"3409" "exp3" 1 65 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1757 17 1
"3409" "exp3" 1 66 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 914 71 1
"3409" "exp3" 1 67 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1714 0 0
"3409" "exp3" 1 68 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 669 80 1
"3409" "exp3" 1 69 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 603 0 0
"3409" "exp3" 1 70 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 762 25 1
"3409" "exp3" 1 71 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1009 0 0
"3409" "exp3" 1 72 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 921 0 0
"3409" "exp3" 1 73 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 2097 23 1
"3409" "exp3" 1 74 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 2290 34 1
"3409" "exp3" 1 75 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 983 0 0
"3409" "exp3" 1 76 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 985 0 0
"3409" "exp3" 1 77 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 988 33 1
"3409" "exp3" 1 78 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 816 0 0
"3409" "exp3" 1 79 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1363 25 1
"3409" "exp3" 1 80 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1020 0 0
"3409" "exp3" 1 81 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 888 20 1
"3409" "exp3" 1 82 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1011 0 0
"3409" "exp3" 1 83 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 2077 0 0
"3409" "exp3" 1 84 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 1214 0 0
"3409" "exp3" 1 85 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1824 0 0
"3409" "exp3" 1 86 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 2006 0 0
"3409" "exp3" 1 87 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 712 0 0
"3409" "exp3" 1 88 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 3546 69 1
"3409" "exp3" 1 89 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1133 32 1
"3409" "exp3" 1 90 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 819 45 1
"3409" "exp3" 1 91 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 710 0 0
"3409" "exp3" 1 92 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 735 37 1
"3409" "exp3" 1 93 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 889 22 1
"3409" "exp3" 1 94 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2028 66 1
"3409" "exp3" 1 95 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 759 0 0
"3409" "exp3" 1 96 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 644 0 0
"3409" "exp3" 1 97 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2001 67 1
"3409" "exp3" 1 98 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 874 0 0
"3409" "exp3" 1 99 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 772 18 1
"3409" "exp3" 1 100 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1186 0 0
"3409" "exp3" 1 101 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1213 0 0
"3409" "exp3" 1 102 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 847 81 1
"3409" "exp3" 1 103 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 741 0 0
"3409" "exp3" 1 104 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 763 0 0
"3409" "exp3" 1 105 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 796 0 0
"3409" "exp3" 1 106 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 909 0 0
"3409" "exp3" 1 107 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 911 80 1
"3409" "exp3" 1 108 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1272 0 0
"3409" "exp3" 1 109 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 746 21 1
"3409" "exp3" 1 110 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 667 26 1
"3409" "exp3" 1 111 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 993 43 1
"3409" "exp3" 1 112 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1050 0 0
"3409" "exp3" 1 113 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 753 0 0
"3409" "exp3" 1 114 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 807 72 1
"3409" "exp3" 1 115 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1048 0 0
"3409" "exp3" 1 116 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 782 0 0
"3409" "exp3" 1 117 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1693 39 1
"3409" "exp3" 1 118 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 805 81 1
"3409" "exp3" 1 119 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 721 0 0
"3409" "exp3" 1 120 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 4383 41 1
"3409" "exp3" 1 121 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1349 75 1
"3409" "exp3" 1 122 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 987 0 0
"3409" "exp3" 1 123 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1158 0 0
"3409" "exp3" 1 124 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 797 0 0
"3409" "exp3" 1 125 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 731 76 1
"3409" "exp3" 1 126 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 962 37 1
"3409" "exp3" 1 127 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 629 0 0
"3409" "exp3" 1 128 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 627 0 0
"3409" "exp3" 1 129 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 978 0 0
"3409" "exp3" 1 130 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1639 30 1
"3409" "exp3" 1 131 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 939 39 1
"3409" "exp3" 1 132 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 784 24 1
"3409" "exp3" 2 1 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1622 39 1
"3409" "exp3" 2 2 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 864 23 1
"3409" "exp3" 2 3 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 689 20 1
"3409" "exp3" 2 4 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 613 0 0
"3409" "exp3" 2 5 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 792 34 1
"3409" "exp3" 2 6 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1166 0 0
"3409" "exp3" 2 7 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 875 0 0
"3409" "exp3" 2 8 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 857 74 1
"3409" "exp3" 2 9 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1073 68 1
"3409" "exp3" 2 10 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 788 0 0
"3409" "exp3" 2 11 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 774 39 1
"3409" "exp3" 2 12 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 853 82 1
"3409" "exp3" 2 13 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 842 0 0
"3409" "exp3" 2 14 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 805 0 0
"3409" "exp3" 2 15 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 926 81 1
"3409" "exp3" 2 16 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 2098 0 0
"3409" "exp3" 2 17 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1004 0 0
"3409" "exp3" 2 18 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 952 40 1
"3409" "exp3" 2 19 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1049 90 1
"3409" "exp3" 2 20 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 843 0 0
"3409" "exp3" 2 21 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 766 18 1
"3409" "exp3" 2 22 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 606 91 1
"3409" "exp3" 2 23 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1025 0 0
"3409" "exp3" 2 24 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 711 21 1
"3409" "exp3" 2 25 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 703 0 0
"3409" "exp3" 2 26 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 850 0 0
"3409" "exp3" 2 27 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 834 66 1
"3409" "exp3" 2 28 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 712 0 0
"3409" "exp3" 2 29 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1004 0 0
"3409" "exp3" 2 30 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1166 63 1
"3409" "exp3" 2 31 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 750 0 0
"3409" "exp3" 2 32 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 766 0 0
"3409" "exp3" 2 33 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1260 0 0
"3409" "exp3" 2 34 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 764 23 1
"3409" "exp3" 2 35 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 868 30 1
"3409" "exp3" 2 36 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 891 0 0
"3409" "exp3" 2 37 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1036 35 1
"3409" "exp3" 2 38 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 732 30 1
"3409" "exp3" 2 39 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1627 15 1
"3409" "exp3" 2 40 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 648 18 1
"3409" "exp3" 2 41 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 746 28 1
"3409" "exp3" 2 42 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 809 0 0
"3409" "exp3" 2 43 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 818 0 0
"3409" "exp3" 2 44 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 597 0 0
"3409" "exp3" 2 45 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 668 0 0
"3409" "exp3" 2 46 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 992 77 1
"3409" "exp3" 2 47 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 936 0 0
"3409" "exp3" 2 48 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 826 97 1
"3409" "exp3" 2 49 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 722 94 1
"3409" "exp3" 2 50 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 718 29 1
"3409" "exp3" 2 51 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 787 38 1
"3409" "exp3" 2 52 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 642 0 0
"3409" "exp3" 2 53 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 814 24 1
"3409" "exp3" 2 54 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 879 36 1
"3409" "exp3" 2 55 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 786 0 0
"3409" "exp3" 2 56 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 768 44 1
"3409" "exp3" 2 57 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 822 25 1
"3409" "exp3" 2 58 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 820 25 1
"3409" "exp3" 2 59 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1309 0 0
"3409" "exp3" 2 60 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 2259 0 0
"3409" "exp3" 2 61 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 881 85 1
"3409" "exp3" 2 62 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 860 16 1
"3409" "exp3" 2 63 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1073 70 1
"3409" "exp3" 2 64 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 659 0 0
"3409" "exp3" 2 65 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 838 45 1
"3409" "exp3" 2 66 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 746 0 0
"3409" "exp3" 2 67 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1070 0 0
"3409" "exp3" 2 68 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 900 0 0
"3409" "exp3" 2 69 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 946 21 1
"3409" "exp3" 2 70 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 850 31 1
"3409" "exp3" 2 71 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1103 37 1
"3409" "exp3" 2 72 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 964 47 1
"3409" "exp3" 2 73 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 901 0 0
"3409" "exp3" 2 74 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 956 0 0
"3409" "exp3" 2 75 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 786 72 1
"3409" "exp3" 2 76 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 838 0 0
"3409" "exp3" 2 77 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1040 78 1
"3409" "exp3" 2 78 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2547 67 1
"3409" "exp3" 2 79 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 647 13 1
"3409" "exp3" 2 80 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 828 0 0
"3409" "exp3" 2 81 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 938 33 1
"3409" "exp3" 2 82 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 680 27 1
"3409" "exp3" 2 83 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1733 57 1
"3409" "exp3" 2 84 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1247 46 1
"3409" "exp3" 2 85 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1556 22 1
"3409" "exp3" 2 86 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 969 20 1
"3409" "exp3" 2 87 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 806 69 1
"3409" "exp3" 2 88 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 811 29 1
"3409" "exp3" 2 89 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 889 81 1
"3409" "exp3" 2 90 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1251 28 1
"3409" "exp3" 2 91 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 706 0 0
"3409" "exp3" 2 92 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 841 0 0
"3409" "exp3" 2 93 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 710 26 1
"3409" "exp3" 2 94 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 826 0 0
"3409" "exp3" 2 95 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 923 0 0
"3409" "exp3" 2 96 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 910 0 0
"3409" "exp3" 2 97 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 854 41 1
"3409" "exp3" 2 98 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 775 22 1
"3409" "exp3" 2 99 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 660 75 1
"3409" "exp3" 2 100 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 821 0 0
"3409" "exp3" 2 101 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 755 31 1
"3409" "exp3" 2 102 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 692 17 1
"3409" "exp3" 2 103 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 592 14 1
"3409" "exp3" 2 104 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 682 92 1
"3409" "exp3" 2 105 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 701 0 0
"3409" "exp3" 2 106 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 851 41 1
"3409" "exp3" 2 107 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 857 36 1
"3409" "exp3" 2 108 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1684 19 1
"3409" "exp3" 2 109 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1240 0 0
"3409" "exp3" 2 110 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 789 0 0
"3409" "exp3" 2 111 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 2742 0 0
"3409" "exp3" 2 112 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 801 33 1
"3409" "exp3" 2 113 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1670 49 1
"3409" "exp3" 2 114 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 1017 0 0
"3409" "exp3" 2 115 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1182 0 0
"3409" "exp3" 2 116 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1085 17 1
"3409" "exp3" 2 117 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1345 0 0
"3409" "exp3" 2 118 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 707 0 0
"3409" "exp3" 2 119 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 843 83 1
"3409" "exp3" 2 120 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1318 0 0
"3409" "exp3" 2 121 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1044 0 0
"3409" "exp3" 2 122 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 827 0 0
"3409" "exp3" 2 123 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 942 64 1
"3409" "exp3" 2 124 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 817 75 1
"3409" "exp3" 2 125 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 728 0 0
"3409" "exp3" 2 126 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 641 0 0
"3409" "exp3" 2 127 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 700 0 0
"3409" "exp3" 2 128 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 891 26 1
"3409" "exp3" 2 129 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 591 0 0
"3409" "exp3" 2 130 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 611 0 0
"3409" "exp3" 2 131 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 863 42 1
"3409" "exp3" 2 132 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1162 0 0
"3410" "exp3" 1 1 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1068 0 0
"3410" "exp3" 1 2 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1084 40 1
"3410" "exp3" 1 3 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1149 29 1
"3410" "exp3" 1 4 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 1177 9 1
"3410" "exp3" 1 5 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1115 34 1
"3410" "exp3" 1 6 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1213 0 0
"3410" "exp3" 1 7 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1066 21 1
"3410" "exp3" 1 8 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 864 20 1
"3410" "exp3" 1 9 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1013 30 1
"3410" "exp3" 1 10 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1114 4 1
"3410" "exp3" 1 11 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1140 27 1
"3410" "exp3" 1 12 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1146 16 1
"3410" "exp3" 1 13 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1071 41 1
"3410" "exp3" 1 14 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 994 16 1
"3410" "exp3" 1 15 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 956 0 0
"3410" "exp3" 1 16 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 772 22 1
"3410" "exp3" 1 17 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1116 13 1
"3410" "exp3" 1 18 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 975 21 1
"3410" "exp3" 1 19 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 885 31 1
"3410" "exp3" 1 20 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1327 45 1
"3410" "exp3" 1 21 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1180 10 1
"3410" "exp3" 1 22 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1232 0 0
"3410" "exp3" 1 23 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 965 22 1
"3410" "exp3" 1 24 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 855 20 1
"3410" "exp3" 1 25 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1028 0 0
"3410" "exp3" 1 26 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 739 38 1
"3410" "exp3" 1 27 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 707 15 1
"3410" "exp3" 1 28 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 734 43 1
"3410" "exp3" 1 29 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 827 46 1
"3410" "exp3" 1 30 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 782 0 0
"3410" "exp3" 1 31 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 730 18 1
"3410" "exp3" 1 32 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 680 0 0
"3410" "exp3" 1 33 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 913 0 0
"3410" "exp3" 1 34 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 845 20 1
"3410" "exp3" 1 35 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 807 26 1
"3410" "exp3" 1 36 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1164 49 1
"3410" "exp3" 1 37 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 790 6 1
"3410" "exp3" 1 38 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1154 0 0
"3410" "exp3" 1 39 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 796 18 1
"3410" "exp3" 1 40 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 898 41 1
"3410" "exp3" 1 41 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1016 9 1
"3410" "exp3" 1 42 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 722 6 1
"3410" "exp3" 1 43 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 709 12 1
"3410" "exp3" 1 44 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 560 3 1
"3410" "exp3" 1 45 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 640 0 0
"3410" "exp3" 1 46 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 637 40 1
"3410" "exp3" 1 47 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 840 45 1
"3410" "exp3" 1 48 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 726 23 1
"3410" "exp3" 1 49 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 636 19 1
"3410" "exp3" 1 50 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 607 16 1
"3410" "exp3" 1 51 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 547 0 0
"3410" "exp3" 1 52 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 621 8 1
"3410" "exp3" 1 53 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1183 37 1
"3410" "exp3" 1 54 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 761 36 1
"3410" "exp3" 1 55 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 838 0 0
"3410" "exp3" 1 56 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 704 33 1
"3410" "exp3" 1 57 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 811 31 1
"3410" "exp3" 1 58 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 707 23 1
"3410" "exp3" 1 59 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 673 42 1
"3410" "exp3" 1 60 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 532 0 0
"3410" "exp3" 1 61 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 516 15 1
"3410" "exp3" 1 62 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 582 0 0
"3410" "exp3" 1 63 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 936 0 0
"3410" "exp3" 1 64 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 469 2 1
"3410" "exp3" 1 65 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 593 11 1
"3410" "exp3" 1 66 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1168 25 1
"3410" "exp3" 1 67 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 679 1 1
"3410" "exp3" 1 68 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 784 18 1
"3410" "exp3" 1 69 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 899 24 1
"3410" "exp3" 1 70 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 656 29 1
"3410" "exp3" 1 71 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 819 28 1
"3410" "exp3" 1 72 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 682 14 1
"3410" "exp3" 1 73 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 722 26 1
"3410" "exp3" 1 74 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 929 7 1
"3410" "exp3" 1 75 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 705 39 1
"3410" "exp3" 1 76 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 691 29 1
"3410" "exp3" 1 77 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 751 0 0
"3410" "exp3" 1 78 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1320 22 1
"3410" "exp3" 1 79 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 579 28 1
"3410" "exp3" 1 80 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 967 0 0
"3410" "exp3" 1 81 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 744 7 1
"3410" "exp3" 1 82 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 592 0 0
"3410" "exp3" 1 83 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 526 11 1
"3410" "exp3" 1 84 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 880 25 1
"3410" "exp3" 1 85 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 688 12 1
"3410" "exp3" 1 86 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 666 37 1
"3410" "exp3" 1 87 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 747 32 1
"3410" "exp3" 1 88 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 601 0 0
"3410" "exp3" 1 89 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 677 10 1
"3410" "exp3" 1 90 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 671 0 0
"3410" "exp3" 1 91 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 570 8 1
"3410" "exp3" 1 92 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 608 17 1
"3410" "exp3" 1 93 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 801 34 1
"3410" "exp3" 1 94 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1154 28 1
"3410" "exp3" 1 95 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1056 13 1
"3410" "exp3" 1 96 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 658 13 1
"3410" "exp3" 1 97 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 712 18 1
"3410" "exp3" 1 98 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 608 17 1
"3410" "exp3" 1 99 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 545 27 1
"3410" "exp3" 1 100 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 587 19 1
"3410" "exp3" 1 101 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 599 30 1
"3410" "exp3" 1 102 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 551 17 1
"3410" "exp3" 1 103 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 633 25 1
"3410" "exp3" 1 104 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 740 48 1
"3410" "exp3" 1 105 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 684 0 0
"3410" "exp3" 1 106 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 694 44 1
"3410" "exp3" 1 107 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 637 23 1
"3410" "exp3" 1 108 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 553 14 1
"3410" "exp3" 1 109 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 631 22 1
"3410" "exp3" 1 110 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 536 15 1
"3410" "exp3" 1 111 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 647 0 0
"3410" "exp3" 1 112 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 553 31 1
"3410" "exp3" 1 113 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 603 30 1
"3410" "exp3" 1 114 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 698 0 0
"3410" "exp3" 1 115 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 560 44 1
"3410" "exp3" 1 116 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 530 23 1
"3410" "exp3" 1 117 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 549 5 1
"3410" "exp3" 1 118 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 734 24 1
"3410" "exp3" 1 119 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1093 0 0
"3410" "exp3" 1 120 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 538 0 0
"3410" "exp3" 1 121 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 669 42 1
"3410" "exp3" 1 122 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 744 5 1
"3410" "exp3" 1 123 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 547 0 0
"3410" "exp3" 1 124 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 595 28 1
"3410" "exp3" 1 125 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 559 14 1
"3410" "exp3" 1 126 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 437 0 0
"3410" "exp3" 1 127 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 530 34 1
"3410" "exp3" 1 128 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 547 37 1
"3410" "exp3" 1 129 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 552 20 1
"3410" "exp3" 1 130 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1118 43 1
"3410" "exp3" 1 131 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 578 17 1
"3410" "exp3" 1 132 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 657 35 1
"3410" "exp3" 2 1 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 738 0 0
"3410" "exp3" 2 2 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 515 6 1
"3410" "exp3" 2 3 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 542 0 0
"3410" "exp3" 2 4 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 535 14 1
"3410" "exp3" 2 5 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 472 12 1
"3410" "exp3" 2 6 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 554 18 1
"3410" "exp3" 2 7 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 740 21 1
"3410" "exp3" 2 8 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 565 38 1
"3410" "exp3" 2 9 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 574 14 1
"3410" "exp3" 2 10 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 834 0 0
"3410" "exp3" 2 11 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 501 22 1
"3410" "exp3" 2 12 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 587 16 1
"3410" "exp3" 2 13 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 558 31 1
"3410" "exp3" 2 14 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 501 13 1
"3410" "exp3" 2 15 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 585 13 1
"3410" "exp3" 2 16 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 669 24 1
"3410" "exp3" 2 17 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 696 26 1
"3410" "exp3" 2 18 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 651 31 1
"3410" "exp3" 2 19 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 786 33 1
"3410" "exp3" 2 20 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 599 42 1
"3410" "exp3" 2 21 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 528 23 1
"3410" "exp3" 2 22 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 505 35 1
"3410" "exp3" 2 23 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 605 39 1
"3410" "exp3" 2 24 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 561 17 1
"3410" "exp3" 2 25 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 524 31 1
"3410" "exp3" 2 26 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 580 7 1
"3410" "exp3" 2 27 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 686 26 1
"3410" "exp3" 2 28 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 577 21 1
"3410" "exp3" 2 29 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 771 45 1
"3410" "exp3" 2 30 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 803 0 0
"3410" "exp3" 2 31 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 526 14 1
"3410" "exp3" 2 32 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 565 36 1
"3410" "exp3" 2 33 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 607 0 0
"3410" "exp3" 2 34 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 678 25 1
"3410" "exp3" 2 35 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 556 0 0
"3410" "exp3" 2 36 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 611 0 0
"3410" "exp3" 2 37 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 487 5 1
"3410" "exp3" 2 38 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 534 20 1
"3410" "exp3" 2 39 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 696 0 0
"3410" "exp3" 2 40 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 607 0 0
"3410" "exp3" 2 41 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 595 3 1
"3410" "exp3" 2 42 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 639 36 1
"3410" "exp3" 2 43 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 651 20 1
"3410" "exp3" 2 44 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 665 27 1
"3410" "exp3" 2 45 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 685 4 1
"3410" "exp3" 2 46 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1257 0 0
"3410" "exp3" 2 47 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 530 8 1
"3410" "exp3" 2 48 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 709 15 1
"3410" "exp3" 2 49 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 642 12 1
"3410" "exp3" 2 50 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 917 0 0
"3410" "exp3" 2 51 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1809 0 0
"3410" "exp3" 2 52 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1106 0 0
"3410" "exp3" 2 53 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 949 0 0
"3410" "exp3" 2 54 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 722 29 1
"3410" "exp3" 2 55 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 543 28 1
"3410" "exp3" 2 56 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 749 46 1
"3410" "exp3" 2 57 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 622 0 0
"3410" "exp3" 2 58 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 651 29 1
"3410" "exp3" 2 59 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 640 0 0
"3410" "exp3" 2 60 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 529 19 1
"3410" "exp3" 2 61 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 463 17 1
"3410" "exp3" 2 62 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 592 0 0
"3410" "exp3" 2 63 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 559 25 1
"3410" "exp3" 2 64 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 435 9 1
"3410" "exp3" 2 65 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 509 30 1
"3410" "exp3" 2 66 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 510 18 1
"3410" "exp3" 2 67 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 541 25 1
"3410" "exp3" 2 68 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 794 0 0
"3410" "exp3" 2 69 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 323 0 0
"3410" "exp3" 2 70 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 481 0 0
"3410" "exp3" 2 71 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 629 0 0
"3410" "exp3" 2 72 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 426 8 1
"3410" "exp3" 2 73 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 513 11 1
"3410" "exp3" 2 74 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 518 15 1
"3410" "exp3" 2 75 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 458 26 1
"3410" "exp3" 2 76 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 645 20 1
"3410" "exp3" 2 77 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 622 30 1
"3410" "exp3" 2 78 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 396 10 1
"3410" "exp3" 2 79 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 472 34 1
"3410" "exp3" 2 80 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 530 0 0
"3410" "exp3" 2 81 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 475 0 0
"3410" "exp3" 2 82 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 462 20 1
"3410" "exp3" 2 83 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 565 33 1
"3410" "exp3" 2 84 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 516 0 0
"3410" "exp3" 2 85 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 568 0 0
"3410" "exp3" 2 86 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 615 31 1
"3410" "exp3" 2 87 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 862 47 1
"3410" "exp3" 2 88 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 593 28 1
"3410" "exp3" 2 89 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 727 0 0
"3410" "exp3" 2 90 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 674 35 1
"3410" "exp3" 2 91 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 704 0 0
"3410" "exp3" 2 92 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 596 10 1
"3410" "exp3" 2 93 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 533 32 1
"3410" "exp3" 2 94 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 471 0 0
"3410" "exp3" 2 95 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 600 0 0
"3410" "exp3" 2 96 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 601 34 1
"3410" "exp3" 2 97 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 674 29 1
"3410" "exp3" 2 98 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 562 0 0
"3410" "exp3" 2 99 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 604 22 1
"3410" "exp3" 2 100 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 485 22 1
"3410" "exp3" 2 101 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 613 0 0
"3410" "exp3" 2 102 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 632 17 1
"3410" "exp3" 2 103 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 556 0 0
"3410" "exp3" 2 104 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 627 0 0
"3410" "exp3" 2 105 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 655 36 1
"3410" "exp3" 2 106 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 806 33 1
"3410" "exp3" 2 107 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 648 19 1
"3410" "exp3" 2 108 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 490 19 1
"3410" "exp3" 2 109 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 548 0 0
"3410" "exp3" 2 110 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 517 6 1
"3410" "exp3" 2 111 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 636 0 0
"3410" "exp3" 2 112 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 446 19 1
"3410" "exp3" 2 113 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 501 9 1
"3410" "exp3" 2 114 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 489 43 1
"3410" "exp3" 2 115 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 531 0 0
"3410" "exp3" 2 116 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 517 41 1
"3410" "exp3" 2 117 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 589 0 0
"3410" "exp3" 2 118 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 643 44 1
"3410" "exp3" 2 119 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 769 15 1
"3410" "exp3" 2 120 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 677 16 1
"3410" "exp3" 2 121 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 544 0 0
"3410" "exp3" 2 122 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 635 44 1
"3410" "exp3" 2 123 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 669 32 1
"3410" "exp3" 2 124 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 531 2 1
"3410" "exp3" 2 125 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 648 27 1
"3410" "exp3" 2 126 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 620 40 1
"3410" "exp3" 2 127 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 551 38 1
"3410" "exp3" 2 128 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 478 23 1
"3410" "exp3" 2 129 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 599 1 1
"3410" "exp3" 2 130 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 559 29 1
"3410" "exp3" 2 131 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 692 34 1
"3410" "exp3" 2 132 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 616 7 1
"3410" "exp3" 1 1 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 488 3 1
"3410" "exp3" 1 2 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 517 17 1
"3410" "exp3" 1 3 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 441 40 1
"3410" "exp3" 1 4 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 406 43 1
"3410" "exp3" 1 5 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 483 45 1
"3410" "exp3" 1 6 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 502 0 0
"3410" "exp3" 1 7 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 586 5 1
"3410" "exp3" 1 8 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 574 17 1
"3410" "exp3" 1 9 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 695 26 1
"3410" "exp3" 1 10 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 743 33 1
"3410" "exp3" 1 11 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 591 0 0
"3410" "exp3" 1 12 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 498 25 1
"3410" "exp3" 1 13 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 695 0 0
"3410" "exp3" 1 14 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 448 16 1
"3410" "exp3" 1 15 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 698 34 1
"3410" "exp3" 1 16 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 609 23 1
"3410" "exp3" 1 17 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 480 20 1
"3410" "exp3" 1 18 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 428 30 1
"3410" "exp3" 1 19 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 481 0 0
"3410" "exp3" 1 20 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 1269 0 0
"3410" "exp3" 1 21 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 411 16 1
"3410" "exp3" 1 22 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 474 16 1
"3410" "exp3" 1 23 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 489 31 1
"3410" "exp3" 1 24 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 696 0 0
"3410" "exp3" 1 25 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 476 0 0
"3410" "exp3" 1 26 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 429 9 1
"3410" "exp3" 1 27 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 481 22 1
"3410" "exp3" 1 28 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 529 44 1
"3410" "exp3" 1 29 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 641 28 1
"3410" "exp3" 1 30 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 482 6 1
"3410" "exp3" 1 31 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 400 35 1
"3410" "exp3" 1 32 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 528 26 1
"3410" "exp3" 1 33 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 568 22 1
"3410" "exp3" 1 34 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 713 0 0
"3410" "exp3" 1 35 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 507 11 1
"3410" "exp3" 1 36 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 447 27 1
"3410" "exp3" 1 37 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 503 15 1
"3410" "exp3" 1 38 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 420 10 1
"3410" "exp3" 1 39 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 473 19 1
"3410" "exp3" 1 40 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 534 33 1
"3410" "exp3" 1 41 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 508 30 1
"3410" "exp3" 1 42 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 533 22 1
"3410" "exp3" 1 43 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 694 0 0
"3410" "exp3" 1 44 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 854 4 1
"3410" "exp3" 1 45 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 659 11 1
"3410" "exp3" 1 46 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 681 0 0
"3410" "exp3" 1 47 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 602 18 1
"3410" "exp3" 1 48 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 655 0 0
"3410" "exp3" 1 49 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 426 6 1
"3410" "exp3" 1 50 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 412 0 0
"3410" "exp3" 1 51 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 720 0 0
"3410" "exp3" 1 52 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1162 29 1
"3410" "exp3" 1 53 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 903 25 1
"3410" "exp3" 1 54 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 794 20 1
"3410" "exp3" 1 55 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 757 0 0
"3410" "exp3" 1 56 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 504 14 1
"3410" "exp3" 1 57 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 425 22 1
"3410" "exp3" 1 58 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 510 35 1
"3410" "exp3" 1 59 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 425 0 0
"3410" "exp3" 1 60 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 451 42 1
"3410" "exp3" 1 61 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 532 24 1
"3410" "exp3" 1 62 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 572 0 0
"3410" "exp3" 1 63 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 439 15 1
"3410" "exp3" 1 64 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 522 18 1
"3410" "exp3" 1 65 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 500 23 1
"3410" "exp3" 1 66 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 518 18 1
"3410" "exp3" 1 67 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 510 0 0
"3410" "exp3" 1 68 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 534 13 1
"3410" "exp3" 1 69 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 569 28 1
"3410" "exp3" 1 70 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 510 14 1
"3410" "exp3" 1 71 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 485 32 1
"3410" "exp3" 1 72 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 567 0 0
"3410" "exp3" 1 73 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 521 19 1
"3410" "exp3" 1 74 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 960 0 0
"3410" "exp3" 1 75 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 755 0 0
"3410" "exp3" 1 76 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 520 0 0
"3410" "exp3" 1 77 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1065 21 1
"3410" "exp3" 1 78 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1507 0 0
"3410" "exp3" 1 79 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 574 13 1
"3410" "exp3" 1 80 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 731 35 1
"3410" "exp3" 1 81 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 514 1 1
"3410" "exp3" 1 82 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1231 0 0
"3410" "exp3" 1 83 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 972 0 0
"3410" "exp3" 1 84 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 996 0 0
"3410" "exp3" 1 85 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 811 2 1
"3410" "exp3" 1 86 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1454 24 1
"3410" "exp3" 1 87 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 689 24 1
"3410" "exp3" 1 88 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 800 21 1
"3410" "exp3" 1 89 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 562 8 1
"3410" "exp3" 1 90 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 501 13 1
"3410" "exp3" 1 91 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 622 31 1
"3410" "exp3" 1 92 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 1080 0 0
"3410" "exp3" 1 93 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1168 27 1
"3410" "exp3" 1 94 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 701 17 1
"3410" "exp3" 1 95 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1231 0 0
"3410" "exp3" 1 96 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 934 19 1
"3410" "exp3" 1 97 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1100 27 1
"3410" "exp3" 1 98 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1082 27 1
"3410" "exp3" 1 99 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 881 41 1
"3410" "exp3" 1 100 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 717 12 1
"3410" "exp3" 1 101 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 616 0 0
"3410" "exp3" 1 102 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 459 15 1
"3410" "exp3" 1 103 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 385 37 1
"3410" "exp3" 1 104 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 515 20 1
"3410" "exp3" 1 105 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 534 0 0
"3410" "exp3" 1 106 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 614 0 0
"3410" "exp3" 1 107 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 605 7 1
"3410" "exp3" 1 108 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 764 0 0
"3410" "exp3" 1 109 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 733 0 0
"3410" "exp3" 1 110 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1302 0 0
"3410" "exp3" 1 111 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 853 32 1
"3410" "exp3" 1 112 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 1123 80 1
"3410" "exp3" 1 113 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 623 0 0
"3410" "exp3" 1 114 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 948 37 1
"3410" "exp3" 1 115 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1174 38 1
"3410" "exp3" 1 116 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 544 39 1
"3410" "exp3" 1 117 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 612 17 1
"3410" "exp3" 1 118 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 485 49 1
"3410" "exp3" 1 119 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 576 18 1
"3410" "exp3" 1 120 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 559 0 0
"3410" "exp3" 1 121 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 540 0 0
"3410" "exp3" 1 122 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 692 40 1
"3410" "exp3" 1 123 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 595 31 1
"3410" "exp3" 1 124 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 505 5 1
"3410" "exp3" 1 125 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 715 36 1
"3410" "exp3" 1 126 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 971 0 0
"3410" "exp3" 1 127 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 579 0 0
"3410" "exp3" 1 128 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1341 0 0
"3410" "exp3" 1 129 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 798 0 0
"3410" "exp3" 1 130 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 717 25 1
"3410" "exp3" 1 131 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 844 46 1
"3410" "exp3" 1 132 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 623 29 1
"3410" "exp3" 2 1 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 534 9 1
"3410" "exp3" 2 2 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 458 21 1
"3410" "exp3" 2 3 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 590 8 1
"3410" "exp3" 2 4 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 386 7 1
"3410" "exp3" 2 5 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1013 0 0
"3410" "exp3" 2 6 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 745 23 1
"3410" "exp3" 2 7 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 493 0 0
"3410" "exp3" 2 8 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 454 0 0
"3410" "exp3" 2 9 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 565 0 0
"3410" "exp3" 2 10 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 439 30 1
"3410" "exp3" 2 11 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 1161 51 1
"3410" "exp3" 2 12 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1160 47 1
"3410" "exp3" 2 13 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1180 0 0
"3410" "exp3" 2 14 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1140 37 1
"3410" "exp3" 2 15 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 850 18 1
"3410" "exp3" 2 16 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 706 26 1
"3410" "exp3" 2 17 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 709 37 1
"3410" "exp3" 2 18 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 561 5 1
"3410" "exp3" 2 19 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1270 26 1
"3410" "exp3" 2 20 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 900 14 1
"3410" "exp3" 2 21 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 903 0 0
"3410" "exp3" 2 22 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 491 0 0
"3410" "exp3" 2 23 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 528 24 1
"3410" "exp3" 2 24 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 639 0 0
"3410" "exp3" 2 25 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 535 35 1
"3410" "exp3" 2 26 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 463 0 0
"3410" "exp3" 2 27 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 581 39 1
"3410" "exp3" 2 28 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 561 23 1
"3410" "exp3" 2 29 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 516 28 1
"3410" "exp3" 2 30 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 458 17 1
"3410" "exp3" 2 31 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 466 37 1
"3410" "exp3" 2 32 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 500 0 0
"3410" "exp3" 2 33 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 392 0 0
"3410" "exp3" 2 34 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1065 46 1
"3410" "exp3" 2 35 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1046 16 1
"3410" "exp3" 2 36 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 1749 0 0
"3410" "exp3" 2 37 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1442 45 1
"3410" "exp3" 2 38 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1094 17 1
"3410" "exp3" 2 39 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 565 0 0
"3410" "exp3" 2 40 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 956 6 1
"3410" "exp3" 2 41 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 530 30 1
"3410" "exp3" 2 42 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 528 16 1
"3410" "exp3" 2 43 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 560 0 0
"3410" "exp3" 2 44 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 441 12 1
"3410" "exp3" 2 45 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 456 38 1
"3410" "exp3" 2 46 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1159 32 1
"3410" "exp3" 2 47 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 893 0 0
"3410" "exp3" 2 48 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 957 39 1
"3410" "exp3" 2 49 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 830 0 0
"3410" "exp3" 2 50 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1153 36 1
"3410" "exp3" 2 51 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1168 0 0
"3410" "exp3" 2 52 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 668 30 1
"3410" "exp3" 2 53 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 882 19 1
"3410" "exp3" 2 54 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 564 20 1
"3410" "exp3" 2 55 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 525 33 1
"3410" "exp3" 2 56 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 554 10 1
"3410" "exp3" 2 57 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 581 24 1
"3410" "exp3" 2 58 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 572 36 1
"3410" "exp3" 2 59 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 608 34 1
"3410" "exp3" 2 60 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1527 0 0
"3410" "exp3" 2 61 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 669 15 1
"3410" "exp3" 2 62 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 627 0 0
"3410" "exp3" 2 63 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 549 18 1
"3410" "exp3" 2 64 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 657 35 1
"3410" "exp3" 2 65 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 596 29 1
"3410" "exp3" 2 66 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 467 21 1
"3410" "exp3" 2 67 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 515 25 1
"3410" "exp3" 2 68 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 663 38 1
"3410" "exp3" 2 69 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 634 2 1
"3410" "exp3" 2 70 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2585 0 0
"3410" "exp3" 2 71 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1273 21 1
"3410" "exp3" 2 72 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 716 1 1
"3410" "exp3" 2 73 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1464 24 1
"3410" "exp3" 2 74 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1390 12 1
"3410" "exp3" 2 75 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1395 0 0
"3410" "exp3" 2 76 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 1583 0 0
"3410" "exp3" 2 77 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1239 11 1
"3410" "exp3" 2 78 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1306 0 0
"3410" "exp3" 2 79 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 988 0 0
"3410" "exp3" 2 80 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1843 34 1
"3410" "exp3" 2 81 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 817 0 0
"3410" "exp3" 2 82 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1823 48 1
"3410" "exp3" 2 83 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1119 0 0
"3410" "exp3" 2 84 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 684 33 1
"3410" "exp3" 2 85 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 922 0 0
"3410" "exp3" 2 86 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 683 0 0
"3410" "exp3" 2 87 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 711 13 1
"3410" "exp3" 2 88 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 632 20 1
"3410" "exp3" 2 89 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 601 43 1
"3410" "exp3" 2 90 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1236 42 1
"3410" "exp3" 2 91 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 653 3 1
"3410" "exp3" 2 92 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 976 0 0
"3410" "exp3" 2 93 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1078 14 1
"3410" "exp3" 2 94 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 618 28 1
"3410" "exp3" 2 95 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 811 28 1
"3410" "exp3" 2 96 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 721 0 0
"3410" "exp3" 2 97 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 594 33 1
"3410" "exp3" 2 98 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 585 20 1
"3410" "exp3" 2 99 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 674 27 1
"3410" "exp3" 2 100 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 887 0 0
"3410" "exp3" 2 101 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1948 10 1
"3410" "exp3" 2 102 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 886 26 1
"3410" "exp3" 2 103 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 819 18 1
"3410" "exp3" 2 104 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 701 31 1
"3410" "exp3" 2 105 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 520 25 1
"3410" "exp3" 2 106 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 685 0 0
"3410" "exp3" 2 107 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 781 30 1
"3410" "exp3" 2 108 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 814 29 1
"3410" "exp3" 2 109 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1202 0 0
"3410" "exp3" 2 110 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 2078 0 0
"3410" "exp3" 2 111 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1408 0 0
"3410" "exp3" 2 112 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1153 41 1
"3410" "exp3" 2 113 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 675 23 1
"3410" "exp3" 2 114 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1151 18 1
"3410" "exp3" 2 115 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 656 15 1
"3410" "exp3" 2 116 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 665 22 1
"3410" "exp3" 2 117 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 697 31 1
"3410" "exp3" 2 118 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1348 0 0
"3410" "exp3" 2 119 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 772 21 1
"3410" "exp3" 2 120 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 538 0 0
"3410" "exp3" 2 121 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 507 13 1
"3410" "exp3" 2 122 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 450 17 1
"3410" "exp3" 2 123 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1446 0 0
"3410" "exp3" 2 124 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 606 29 1
"3410" "exp3" 2 125 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 466 16 1
"3410" "exp3" 2 126 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 552 0 0
"3410" "exp3" 2 127 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 472 0 0
"3410" "exp3" 2 128 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1135 43 1
"3410" "exp3" 2 129 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 598 27 1
"3410" "exp3" 2 130 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1575 69 1
"3410" "exp3" 2 131 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 614 13 1
"3410" "exp3" 2 132 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 890 11 1
"3410" "exp3" 1 1 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 740 35 1
"3410" "exp3" 1 2 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 709 11 1
"3410" "exp3" 1 3 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 566 45 1
"3410" "exp3" 1 4 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 571 11 1
"3410" "exp3" 1 5 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 612 30 1
"3410" "exp3" 1 6 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1290 0 0
"3410" "exp3" 1 7 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 727 0 0
"3410" "exp3" 1 8 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 712 19 1
"3410" "exp3" 1 9 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 526 21 1
"3410" "exp3" 1 10 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 581 0 0
"3410" "exp3" 1 11 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 609 20 1
"3410" "exp3" 1 12 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 789 0 0
"3410" "exp3" 1 13 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 805 0 0
"3410" "exp3" 1 14 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1624 68 1
"3410" "exp3" 1 15 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 962 21 1
"3410" "exp3" 1 16 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 997 0 0
"3410" "exp3" 1 17 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2193 44 1
"3410" "exp3" 1 18 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1276 0 0
"3410" "exp3" 1 19 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 762 0 0
"3410" "exp3" 1 20 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 698 80 1
"3410" "exp3" 1 21 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 619 38 1
"3410" "exp3" 1 22 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 725 24 1
"3410" "exp3" 1 23 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 661 32 1
"3410" "exp3" 1 24 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 534 3 1
"3410" "exp3" 1 25 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 794 34 1
"3410" "exp3" 1 26 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 657 0 0
"3410" "exp3" 1 27 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 623 39 1
"3410" "exp3" 1 28 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 653 18 1
"3410" "exp3" 1 29 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 653 0 0
"3410" "exp3" 1 30 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 603 0 0
"3410" "exp3" 1 31 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 573 15 1
"3410" "exp3" 1 32 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 626 27 1
"3410" "exp3" 1 33 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 505 0 0
"3410" "exp3" 1 34 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 502 0 0
"3410" "exp3" 1 35 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 661 12 1
"3410" "exp3" 1 36 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 347 0 0
"3410" "exp3" 1 37 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 565 7 1
"3410" "exp3" 1 38 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 498 14 1
"3410" "exp3" 1 39 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 761 36 1
"3410" "exp3" 1 40 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 565 39 1
"3410" "exp3" 1 41 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 487 18 1
"3410" "exp3" 1 42 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 542 0 0
"3410" "exp3" 1 43 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 545 66 1
"3410" "exp3" 1 44 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 779 0 0
"3410" "exp3" 1 45 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 582 18 1
"3410" "exp3" 1 46 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 868 0 0
"3410" "exp3" 1 47 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 643 16 1
"3410" "exp3" 1 48 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 703 29 1
"3410" "exp3" 1 49 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 876 24 1
"3410" "exp3" 1 50 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 695 27 1
"3410" "exp3" 1 51 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 667 25 1
"3410" "exp3" 1 52 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 534 30 1
"3410" "exp3" 1 53 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 726 22 1
"3410" "exp3" 1 54 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 623 28 1
"3410" "exp3" 1 55 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 635 2 1
"3410" "exp3" 1 56 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 517 9 1
"3410" "exp3" 1 57 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 2014 0 0
"3410" "exp3" 1 58 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1489 0 0
"3410" "exp3" 1 59 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1169 0 0
"3410" "exp3" 1 60 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1824 0 0
"3410" "exp3" 1 61 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1353 42 1
"3410" "exp3" 1 62 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 918 27 1
"3410" "exp3" 1 63 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 907 0 0
"3410" "exp3" 1 64 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 738 31 1
"3410" "exp3" 1 65 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1815 26 1
"3410" "exp3" 1 66 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 721 22 1
"3410" "exp3" 1 67 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 912 0 0
"3410" "exp3" 1 68 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 1177 5 1
"3410" "exp3" 1 69 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 700 4 1
"3410" "exp3" 1 70 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 715 0 0
"3410" "exp3" 1 71 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 533 23 1
"3410" "exp3" 1 72 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 802 15 1
"3410" "exp3" 1 73 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 816 17 1
"3410" "exp3" 1 74 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 810 0 0
"3410" "exp3" 1 75 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 794 0 0
"3410" "exp3" 1 76 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 816 37 1
"3410" "exp3" 1 77 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 750 33 1
"3410" "exp3" 1 78 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 794 0 0
"3410" "exp3" 1 79 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 586 0 0
"3410" "exp3" 1 80 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 572 0 0
"3410" "exp3" 1 81 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 562 27 1
"3410" "exp3" 1 82 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 923 0 0
"3410" "exp3" 1 83 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 680 25 1
"3410" "exp3" 1 84 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 539 13 1
"3410" "exp3" 1 85 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 591 0 0
"3410" "exp3" 1 86 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 555 0 0
"3410" "exp3" 1 87 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 717 0 0
"3410" "exp3" 1 88 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 663 30 1
"3410" "exp3" 1 89 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 600 0 0
"3410" "exp3" 1 90 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 532 0 0
"3410" "exp3" 1 91 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 574 20 1
"3410" "exp3" 1 92 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 501 15 1
"3410" "exp3" 1 93 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 530 5 1
"3410" "exp3" 1 94 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 441 0 0
"3410" "exp3" 1 95 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 653 24 1
"3410" "exp3" 1 96 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 534 0 0
"3410" "exp3" 1 97 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 613 45 1
"3410" "exp3" 1 98 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 807 0 0
"3410" "exp3" 1 99 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 480 9 1
"3410" "exp3" 1 100 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 449 17 1
"3410" "exp3" 1 101 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 600 0 0
"3410" "exp3" 1 102 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 668 0 0
"3410" "exp3" 1 103 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 532 37 1
"3410" "exp3" 1 104 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 704 22 1
"3410" "exp3" 1 105 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 603 6 1
"3410" "exp3" 1 106 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 927 48 1
"3410" "exp3" 1 107 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 573 25 1
"3410" "exp3" 1 108 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 629 18 1
"3410" "exp3" 1 109 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 903 41 1
"3410" "exp3" 1 110 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 815 0 0
"3410" "exp3" 1 111 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 635 26 1
"3410" "exp3" 1 112 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 551 14 1
"3410" "exp3" 1 113 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 571 0 0
"3410" "exp3" 1 114 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 755 0 0
"3410" "exp3" 1 115 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 430 17 1
"3410" "exp3" 1 116 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 860 0 0
"3410" "exp3" 1 117 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 627 23 1
"3410" "exp3" 1 118 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 634 0 0
"3410" "exp3" 1 119 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 678 33 1
"3410" "exp3" 1 120 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 930 34 1
"3410" "exp3" 1 121 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 903 38 1
"3410" "exp3" 1 122 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 682 10 1
"3410" "exp3" 1 123 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1980 0 0
"3410" "exp3" 1 124 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 902 13 1
"3410" "exp3" 1 125 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1244 20 1
"3410" "exp3" 1 126 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1579 0 0
"3410" "exp3" 1 127 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1086 16 1
"3410" "exp3" 1 128 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 658 0 0
"3410" "exp3" 1 129 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 612 8 1
"3410" "exp3" 1 130 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1642 0 0
"3410" "exp3" 1 131 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 1314 54 1
"3410" "exp3" 1 132 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 746 40 1
"3410" "exp3" 2 1 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 731 9 1
"3410" "exp3" 2 2 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1185 73 1
"3410" "exp3" 2 3 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 979 0 0
"3410" "exp3" 2 4 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 753 57 1
"3410" "exp3" 2 5 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 852 0 0
"3410" "exp3" 2 6 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 834 0 0
"3410" "exp3" 2 7 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 965 17 1
"3410" "exp3" 2 8 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 770 0 0
"3410" "exp3" 2 9 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 918 19 1
"3410" "exp3" 2 10 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 720 0 0
"3410" "exp3" 2 11 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 602 31 1
"3410" "exp3" 2 12 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 734 0 0
"3410" "exp3" 2 13 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 498 24 1
"3410" "exp3" 2 14 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 494 0 0
"3410" "exp3" 2 15 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 694 0 0
"3410" "exp3" 2 16 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 572 0 0
"3410" "exp3" 2 17 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 563 11 1
"3410" "exp3" 2 18 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 552 17 1
"3410" "exp3" 2 19 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 569 29 1
"3410" "exp3" 2 20 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 1249 0 0
"3410" "exp3" 2 21 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1595 20 1
"3410" "exp3" 2 22 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 756 27 1
"3410" "exp3" 2 23 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1662 0 0
"3410" "exp3" 2 24 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1511 79 1
"3410" "exp3" 2 25 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1163 29 1
"3410" "exp3" 2 26 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1271 37 1
"3410" "exp3" 2 27 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 971 0 0
"3410" "exp3" 2 28 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 713 0 0
"3410" "exp3" 2 29 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1146 21 1
"3410" "exp3" 2 30 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1582 4 1
"3410" "exp3" 2 31 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1798 0 0
"3410" "exp3" 2 32 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1450 0 0
"3410" "exp3" 2 33 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1227 40 1
"3410" "exp3" 2 34 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 1640 80 1
"3410" "exp3" 2 35 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1005 0 0
"3410" "exp3" 2 36 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 900 66 1
"3410" "exp3" 2 37 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 842 0 0
"3410" "exp3" 2 38 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 690 9 1
"3410" "exp3" 2 39 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 952 0 0
"3410" "exp3" 2 40 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1291 27 1
"3410" "exp3" 2 41 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1055 0 0
"3410" "exp3" 2 42 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1094 39 1
"3410" "exp3" 2 43 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1270 0 0
"3410" "exp3" 2 44 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1344 22 1
"3410" "exp3" 2 45 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 1398 0 0
"3410" "exp3" 2 46 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1191 0 0
"3410" "exp3" 2 47 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 823 12 1
"3410" "exp3" 2 48 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1379 0 0
"3410" "exp3" 2 49 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1304 0 0
"3410" "exp3" 2 50 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1135 0 0
"3410" "exp3" 2 51 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1134 27 1
"3410" "exp3" 2 52 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 725 36 1
"3410" "exp3" 2 53 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 869 0 0
"3410" "exp3" 2 54 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 676 15 1
"3410" "exp3" 2 55 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1182 0 0
"3410" "exp3" 2 56 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1141 0 0
"3410" "exp3" 2 57 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 758 41 1
"3410" "exp3" 2 58 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1873 87 1
"3410" "exp3" 2 59 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1544 6 1
"3410" "exp3" 2 60 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1173 0 0
"3410" "exp3" 2 61 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1081 0 0
"3410" "exp3" 2 62 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 925 0 0
"3410" "exp3" 2 63 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1046 0 0
"3410" "exp3" 2 64 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1144 0 0
"3410" "exp3" 2 65 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1813 23 1
"3410" "exp3" 2 66 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 870 0 0
"3410" "exp3" 2 67 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 812 16 1
"3410" "exp3" 2 68 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 943 20 1
"3410" "exp3" 2 69 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1023 31 1
"3410" "exp3" 2 70 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1092 32 1
"3410" "exp3" 2 71 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1339 0 0
"3410" "exp3" 2 72 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1721 0 0
"3410" "exp3" 2 73 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1313 45 1
"3410" "exp3" 2 74 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1223 0 0
"3410" "exp3" 2 75 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 846 0 0
"3410" "exp3" 2 76 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 750 0 0
"3410" "exp3" 2 77 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1738 22 1
"3410" "exp3" 2 78 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 749 0 0
"3410" "exp3" 2 79 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 1000 0 0
"3410" "exp3" 2 80 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 886 43 1
"3410" "exp3" 2 81 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 700 8 1
"3410" "exp3" 2 82 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1262 0 0
"3410" "exp3" 2 83 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 1336 82 1
"3410" "exp3" 2 84 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1255 32 1
"3410" "exp3" 2 85 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1601 0 0
"3410" "exp3" 2 86 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1161 0 0
"3410" "exp3" 2 87 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2005 0 0
"3410" "exp3" 2 88 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1253 25 1
"3410" "exp3" 2 89 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1380 0 0
"3410" "exp3" 2 90 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1639 0 0
"3410" "exp3" 2 91 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 942 0 0
"3410" "exp3" 2 92 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1274 0 0
"3410" "exp3" 2 93 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 816 0 0
"3410" "exp3" 2 94 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1150 20 1
"3410" "exp3" 2 95 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 910 0 0
"3410" "exp3" 2 96 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1748 0 0
"3410" "exp3" 2 97 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1016 0 0
"3410" "exp3" 2 98 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1512 29 1
"3410" "exp3" 2 99 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1088 33 1
"3410" "exp3" 2 100 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1529 0 0
"3410" "exp3" 2 101 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 1874 84 1
"3410" "exp3" 2 102 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 668 0 0
"3410" "exp3" 2 103 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 887 78 1
"3410" "exp3" 2 104 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1512 44 1
"3410" "exp3" 2 105 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1160 17 1
"3410" "exp3" 2 106 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 704 22 1
"3410" "exp3" 2 107 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1156 28 1
"3410" "exp3" 2 108 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1511 0 0
"3410" "exp3" 2 109 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1330 15 1
"3410" "exp3" 2 110 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1117 19 1
"3410" "exp3" 2 111 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 675 0 0
"3410" "exp3" 2 112 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1083 0 0
"3410" "exp3" 2 113 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 821 33 1
"3410" "exp3" 2 114 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 619 25 1
"3410" "exp3" 2 115 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1080 0 0
"3410" "exp3" 2 116 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1364 0 0
"3410" "exp3" 2 117 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1313 45 1
"3410" "exp3" 2 118 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1173 23 1
"3410" "exp3" 2 119 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 948 38 1
"3410" "exp3" 2 120 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1214 12 1
"3410" "exp3" 2 121 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1176 37 1
"3410" "exp3" 2 122 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 874 26 1
"3410" "exp3" 2 123 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1148 23 1
"3410" "exp3" 2 124 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1443 17 1
"3410" "exp3" 2 125 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 947 18 1
"3410" "exp3" 2 126 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 928 42 1
"3410" "exp3" 2 127 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 796 14 1
"3410" "exp3" 2 128 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1283 0 0
"3410" "exp3" 2 129 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1555 18 1
"3410" "exp3" 2 130 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 614 0 0
"3410" "exp3" 2 131 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1197 38 1
"3410" "exp3" 2 132 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1162 0 0
"3410" "exp3" 1 1 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1063 0 0
"3410" "exp3" 1 2 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 629 15 1
"3410" "exp3" 1 3 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1155 0 0
"3410" "exp3" 1 4 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1014 0 0
"3410" "exp3" 1 5 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 912 0 0
"3410" "exp3" 1 6 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1100 0 0
"3410" "exp3" 1 7 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 706 23 1
"3410" "exp3" 1 8 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 805 31 1
"3410" "exp3" 1 9 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 757 0 0
"3410" "exp3" 1 10 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 944 13 1
"3410" "exp3" 1 11 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1007 0 0
"3410" "exp3" 1 12 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1249 35 1
"3410" "exp3" 1 13 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 800 22 1
"3410" "exp3" 1 14 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 900 0 0
"3410" "exp3" 1 15 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1313 0 0
"3410" "exp3" 1 16 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 800 26 1
"3410" "exp3" 1 17 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1141 0 0
"3410" "exp3" 1 18 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 1163 3 1
"3410" "exp3" 1 19 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 725 36 1
"3410" "exp3" 1 20 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 538 0 0
"3410" "exp3" 1 21 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 686 36 1
"3410" "exp3" 1 22 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 566 0 0
"3410" "exp3" 1 23 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 876 20 1
"3410" "exp3" 1 24 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1195 0 0
"3410" "exp3" 1 25 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1272 29 1
"3410" "exp3" 1 26 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1028 40 1
"3410" "exp3" 1 27 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 650 0 0
"3410" "exp3" 1 28 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 718 17 1
"3410" "exp3" 1 29 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 671 13 1
"3410" "exp3" 1 30 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 627 15 1
"3410" "exp3" 1 31 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 838 31 1
"3410" "exp3" 1 32 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 629 20 1
"3410" "exp3" 1 33 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 641 38 1
"3410" "exp3" 1 34 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 1320 0 0
"3410" "exp3" 1 35 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 593 0 0
"3410" "exp3" 1 36 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 614 0 0
"3410" "exp3" 1 37 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 592 21 1
"3410" "exp3" 1 38 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 574 28 1
"3410" "exp3" 1 39 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 477 0 0
"3410" "exp3" 1 40 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 945 0 0
"3410" "exp3" 1 41 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1284 0 0
"3410" "exp3" 1 42 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 962 56 1
"3410" "exp3" 1 43 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1011 26 1
"3410" "exp3" 1 44 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 719 17 1
"3410" "exp3" 1 45 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 849 22 1
"3410" "exp3" 1 46 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 733 24 1
"3410" "exp3" 1 47 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 584 20 1
"3410" "exp3" 1 48 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 689 28 1
"3410" "exp3" 1 49 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1071 16 1
"3410" "exp3" 1 50 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 915 17 1
"3410" "exp3" 1 51 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 968 4 1
"3410" "exp3" 1 52 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 982 0 0
"3410" "exp3" 1 53 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1592 29 1
"3410" "exp3" 1 54 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1178 29 1
"3410" "exp3" 1 55 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 729 34 1
"3410" "exp3" 1 56 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 1321 57 1
"3410" "exp3" 1 57 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1768 0 0
"3410" "exp3" 1 58 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1095 9 1
"3410" "exp3" 1 59 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1545 47 1
"3410" "exp3" 1 60 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 947 0 0
"3410" "exp3" 1 61 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 813 0 0
"3410" "exp3" 1 62 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 850 0 0
"3410" "exp3" 1 63 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1703 70 1
"3410" "exp3" 1 64 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 641 14 1
"3410" "exp3" 1 65 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 522 21 1
"3410" "exp3" 1 66 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1358 0 0
"3410" "exp3" 1 67 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 904 14 1
"3410" "exp3" 1 68 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 519 23 1
"3410" "exp3" 1 69 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 697 6 1
"3410" "exp3" 1 70 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 616 1 1
"3410" "exp3" 1 71 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 764 12 1
"3410" "exp3" 1 72 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 669 0 0
"3410" "exp3" 1 73 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 719 0 0
"3410" "exp3" 1 74 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 605 18 1
"3410" "exp3" 1 75 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1135 0 0
"3410" "exp3" 1 76 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 615 5 1
"3410" "exp3" 1 77 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 685 0 0
"3410" "exp3" 1 78 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1571 43 1
"3410" "exp3" 1 79 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 1505 0 0
"3410" "exp3" 1 80 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 557 0 0
"3410" "exp3" 1 81 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 827 0 0
"3410" "exp3" 1 82 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 590 0 0
"3410" "exp3" 1 83 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 460 0 0
"3410" "exp3" 1 84 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 494 8 1
"3410" "exp3" 1 85 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 596 5 1
"3410" "exp3" 1 86 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1067 0 0
"3410" "exp3" 1 87 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 752 0 0
"3410" "exp3" 1 88 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 835 24 1
"3410" "exp3" 1 89 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 890 0 0
"3410" "exp3" 1 90 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 584 0 0
"3410" "exp3" 1 91 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 811 26 1
"3410" "exp3" 1 92 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 553 28 1
"3410" "exp3" 1 93 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1071 0 0
"3410" "exp3" 1 94 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 906 37 1
"3410" "exp3" 1 95 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 663 9 1
"3410" "exp3" 1 96 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 852 22 1
"3410" "exp3" 1 97 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 693 32 1
"3410" "exp3" 1 98 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 746 12 1
"3410" "exp3" 1 99 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 549 27 1
"3410" "exp3" 1 100 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 555 21 1
"3410" "exp3" 1 101 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 535 16 1
"3410" "exp3" 1 102 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 548 25 1
"3410" "exp3" 1 103 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1467 32 1
"3410" "exp3" 1 104 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 543 20 1
"3410" "exp3" 1 105 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 441 24 1
"3410" "exp3" 1 106 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 468 0 0
"3410" "exp3" 1 107 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 601 0 0
"3410" "exp3" 1 108 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 780 41 1
"3410" "exp3" 1 109 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 531 18 1
"3410" "exp3" 1 110 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 524 14 1
"3410" "exp3" 1 111 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 475 0 0
"3410" "exp3" 1 112 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 651 24 1
"3410" "exp3" 1 113 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 608 19 1
"3410" "exp3" 1 114 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 503 27 1
"3410" "exp3" 1 115 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 532 0 0
"3410" "exp3" 1 116 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 624 10 1
"3410" "exp3" 1 117 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1057 0 0
"3410" "exp3" 1 118 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 888 0 0
"3410" "exp3" 1 119 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 736 37 1
"3410" "exp3" 1 120 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 629 17 1
"3410" "exp3" 1 121 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1024 40 1
"3410" "exp3" 1 122 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 468 2 1
"3410" "exp3" 1 123 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1291 0 0
"3410" "exp3" 1 124 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 521 18 1
"3410" "exp3" 1 125 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 339 19 1
"3410" "exp3" 1 126 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 642 19 1
"3410" "exp3" 1 127 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 844 0 0
"3410" "exp3" 1 128 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 535 30 1
"3410" "exp3" 1 129 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1222 0 0
"3410" "exp3" 1 130 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 585 6 1
"3410" "exp3" 1 131 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 827 26 1
"3410" "exp3" 1 132 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 619 0 0
"3410" "exp3" 2 1 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 563 23 1
"3410" "exp3" 2 2 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 593 20 1
"3410" "exp3" 2 3 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 613 40 1
"3410" "exp3" 2 4 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 536 26 1
"3410" "exp3" 2 5 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 489 0 0
"3410" "exp3" 2 6 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 445 0 0
"3410" "exp3" 2 7 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 417 0 0
"3410" "exp3" 2 8 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 477 24 1
"3410" "exp3" 2 9 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 548 0 0
"3410" "exp3" 2 10 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 455 13 1
"3410" "exp3" 2 11 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 400 9 1
"3410" "exp3" 2 12 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 642 30 1
"3410" "exp3" 2 13 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 868 43 1
"3410" "exp3" 2 14 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 750 0 0
"3410" "exp3" 2 15 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1098 0 0
"3410" "exp3" 2 16 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 534 20 1
"3410" "exp3" 2 17 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 992 21 1
"3410" "exp3" 2 18 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 472 19 1
"3410" "exp3" 2 19 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 488 6 1
"3410" "exp3" 2 20 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 611 0 0
"3410" "exp3" 2 21 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 505 0 0
"3410" "exp3" 2 22 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 354 10 1
"3410" "exp3" 2 23 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 616 26 1
"3410" "exp3" 2 24 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 865 0 0
"3410" "exp3" 2 25 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 494 0 0
"3410" "exp3" 2 26 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 516 29 1
"3410" "exp3" 2 27 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 467 5 1
"3410" "exp3" 2 28 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 413 27 1
"3410" "exp3" 2 29 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 680 21 1
"3410" "exp3" 2 30 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 473 5 1
"3410" "exp3" 2 31 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1053 38 1
"3410" "exp3" 2 32 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 493 6 1
"3410" "exp3" 2 33 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 528 8 1
"3410" "exp3" 2 34 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 399 18 1
"3410" "exp3" 2 35 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 594 2 1
"3410" "exp3" 2 36 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 449 0 0
"3410" "exp3" 2 37 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 459 0 0
"3410" "exp3" 2 38 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 788 0 0
"3410" "exp3" 2 39 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 612 20 1
"3410" "exp3" 2 40 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 424 43 1
"3410" "exp3" 2 41 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 728 40 1
"3410" "exp3" 2 42 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 494 23 1
"3410" "exp3" 2 43 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 632 0 0
"3410" "exp3" 2 44 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 410 0 0
"3410" "exp3" 2 45 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 441 0 0
"3410" "exp3" 2 46 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 319 12 1
"3410" "exp3" 2 47 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 388 15 1
"3410" "exp3" 2 48 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1092 0 0
"3410" "exp3" 2 49 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 513 22 1
"3410" "exp3" 2 50 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 589 27 1
"3410" "exp3" 2 51 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 607 30 1
"3410" "exp3" 2 52 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 502 16 1
"3410" "exp3" 2 53 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 493 0 0
"3410" "exp3" 2 54 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 425 29 1
"3410" "exp3" 2 55 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 517 23 1
"3410" "exp3" 2 56 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 602 30 1
"3410" "exp3" 2 57 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 609 15 1
"3410" "exp3" 2 58 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 634 0 0
"3410" "exp3" 2 59 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 596 42 1
"3410" "exp3" 2 60 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 421 20 1
"3410" "exp3" 2 61 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 551 21 1
"3410" "exp3" 2 62 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 529 35 1
"3410" "exp3" 2 63 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 470 25 1
"3410" "exp3" 2 64 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 522 12 1
"3410" "exp3" 2 65 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 529 28 1
"3410" "exp3" 2 66 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 532 10 1
"3410" "exp3" 2 67 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 528 0 0
"3410" "exp3" 2 68 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 468 39 1
"3410" "exp3" 2 69 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 599 0 0
"3410" "exp3" 2 70 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 539 41 1
"3410" "exp3" 2 71 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 529 14 1
"3410" "exp3" 2 72 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 554 33 1
"3410" "exp3" 2 73 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 557 39 1
"3410" "exp3" 2 74 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 459 26 1
"3410" "exp3" 2 75 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 383 0 0
"3410" "exp3" 2 76 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 497 0 0
"3410" "exp3" 2 77 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 315 17 1
"3410" "exp3" 2 78 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 685 19 1
"3410" "exp3" 2 79 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 625 25 1
"3410" "exp3" 2 80 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 378 0 0
"3410" "exp3" 2 81 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 487 34 1
"3410" "exp3" 2 82 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 443 16 1
"3410" "exp3" 2 83 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 561 49 1
"3410" "exp3" 2 84 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 441 22 1
"3410" "exp3" 2 85 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 531 18 1
"3410" "exp3" 2 86 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 555 21 1
"3410" "exp3" 2 87 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 589 26 1
"3410" "exp3" 2 88 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 376 17 1
"3410" "exp3" 2 89 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 607 28 1
"3410" "exp3" 2 90 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 411 11 1
"3410" "exp3" 2 91 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 621 33 1
"3410" "exp3" 2 92 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 520 24 1
"3410" "exp3" 2 93 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 677 17 1
"3410" "exp3" 2 94 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 485 7 1
"3410" "exp3" 2 95 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 494 0 0
"3410" "exp3" 2 96 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 458 23 1
"3410" "exp3" 2 97 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 486 0 0
"3410" "exp3" 2 98 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 759 41 1
"3410" "exp3" 2 99 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 705 0 0
"3410" "exp3" 2 100 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 899 35 1
"3410" "exp3" 2 101 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 487 15 1
"3410" "exp3" 2 102 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 716 22 1
"3410" "exp3" 2 103 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1345 69 1
"3410" "exp3" 2 104 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1023 32 1
"3410" "exp3" 2 105 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 934 31 1
"3410" "exp3" 2 106 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 777 0 0
"3410" "exp3" 2 107 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 1236 0 0
"3410" "exp3" 2 108 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 434 0 0
"3410" "exp3" 2 109 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 861 0 0
"3410" "exp3" 2 110 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 599 0 0
"3410" "exp3" 2 111 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1070 0 0
"3410" "exp3" 2 112 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 894 9 1
"3410" "exp3" 2 113 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 484 8 1
"3410" "exp3" 2 114 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 796 28 1
"3410" "exp3" 2 115 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 551 0 0
"3410" "exp3" 2 116 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 494 24 1
"3410" "exp3" 2 117 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 492 18 1
"3410" "exp3" 2 118 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 510 14 1
"3410" "exp3" 2 119 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 492 13 1
"3410" "exp3" 2 120 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 368 34 1
"3410" "exp3" 2 121 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 626 47 1
"3410" "exp3" 2 122 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1192 63 1
"3410" "exp3" 2 123 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 690 0 0
"3410" "exp3" 2 124 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1277 42 1
"3410" "exp3" 2 125 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 496 0 0
"3410" "exp3" 2 126 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1503 32 1
"3410" "exp3" 2 127 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1833 35 1
"3410" "exp3" 2 128 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 737 33 1
"3410" "exp3" 2 129 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 639 44 1
"3410" "exp3" 2 130 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 565 0 0
"3410" "exp3" 2 131 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 414 36 1
"3410" "exp3" 2 132 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 640 46 1
"3501" "exp3" 1 1 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1028 37 1
"3501" "exp3" 1 2 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 2080 6 1
"3501" "exp3" 1 3 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1581 27 1
"3501" "exp3" 1 4 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 1433 5 1
"3501" "exp3" 1 5 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 2879 27 1
"3501" "exp3" 1 6 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1732 16 1
"3501" "exp3" 1 7 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2560 34 1
"3501" "exp3" 1 8 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 3199 20 1
"3501" "exp3" 1 9 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1931 42 1
"3501" "exp3" 1 10 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 3527 0 0
"3501" "exp3" 1 11 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 3006 64 1
"3501" "exp3" 1 12 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 4365 0 0
"3501" "exp3" 1 13 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1934 0 0
"3501" "exp3" 1 14 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2780 0 0
"3501" "exp3" 1 15 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 2559 0 0
"3501" "exp3" 1 16 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1785 12 1
"3501" "exp3" 1 17 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 3061 0 0
"3501" "exp3" 1 18 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2393 0 0
"3501" "exp3" 1 19 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 4056 41 1
"3501" "exp3" 1 20 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1696 15 1
"3501" "exp3" 1 21 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1970 21 1
"3501" "exp3" 1 22 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 3935 82 1
"3501" "exp3" 1 23 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1920 18 1
"3501" "exp3" 1 24 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 2267 0 0
"3501" "exp3" 1 25 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 2566 0 0
"3501" "exp3" 1 26 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 2322 25 1
"3501" "exp3" 1 27 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 2708 24 1
"3501" "exp3" 1 28 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1333 28 1
"3501" "exp3" 1 29 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1426 0 0
"3501" "exp3" 1 30 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1855 23 1
"3501" "exp3" 1 31 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3013 0 0
"3501" "exp3" 1 32 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 6215 37 1
"3501" "exp3" 1 33 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 5593 45 1
"3501" "exp3" 1 34 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 3388 35 1
"3501" "exp3" 1 35 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 4350 31 1
"3501" "exp3" 1 36 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 3978 0 0
"3501" "exp3" 1 37 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 3874 0 0
"3501" "exp3" 1 38 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 2096 14 1
"3501" "exp3" 1 39 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1943 13 1
"3501" "exp3" 1 40 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 3875 24 1
"3501" "exp3" 1 41 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2251 20 1
"3501" "exp3" 1 42 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 2639 0 0
"3501" "exp3" 1 43 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2889 41 1
"3501" "exp3" 1 44 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 3576 21 1
"3501" "exp3" 1 45 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 4341 0 0
"3501" "exp3" 1 46 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 3127 21 1
"3501" "exp3" 1 47 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 2666 16 1
"3501" "exp3" 1 48 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1486 0 0
"3501" "exp3" 1 49 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 4545 0 0
"3501" "exp3" 1 50 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1464 28 1
"3501" "exp3" 1 51 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 2502 0 0
"3501" "exp3" 1 52 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 3050 17 1
"3501" "exp3" 1 53 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 4831 0 0
"3501" "exp3" 1 54 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 3156 38 1
"3501" "exp3" 1 55 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 3655 42 1
"3501" "exp3" 1 56 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 2551 13 1
"3501" "exp3" 1 57 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1907 29 1
"3501" "exp3" 1 58 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2801 0 0
"3501" "exp3" 1 59 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 4395 95 1
"3501" "exp3" 1 60 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 2426 19 1
"3501" "exp3" 1 61 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 2791 74 1
"3501" "exp3" 1 62 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 2205 15 1
"3501" "exp3" 1 63 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 7977 0 0
"3501" "exp3" 1 64 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1862 18 1
"3501" "exp3" 1 65 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 3584 30 1
"3501" "exp3" 1 66 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 2157 25 1
"3501" "exp3" 1 67 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1633 20 1
"3501" "exp3" 1 68 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2056 0 0
"3501" "exp3" 1 69 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1707 16 1
"3501" "exp3" 1 70 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1917 0 0
"3501" "exp3" 1 71 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 2309 30 1
"3501" "exp3" 1 72 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1898 22 1
"3501" "exp3" 1 73 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 2898 14 1
"3501" "exp3" 1 74 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1525 33 1
"3501" "exp3" 1 75 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 4144 0 0
"3501" "exp3" 1 76 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 3165 25 1
"3501" "exp3" 1 77 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 4113 0 0
"3501" "exp3" 1 78 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 2619 0 0
"3501" "exp3" 1 79 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1399 46 1
"3501" "exp3" 1 80 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 2141 94 1
"3501" "exp3" 1 81 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1937 0 0
"3501" "exp3" 1 82 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 3043 0 0
"3501" "exp3" 1 83 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1875 39 1
"3501" "exp3" 1 84 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2311 0 0
"3501" "exp3" 1 85 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 3564 0 0
"3501" "exp3" 1 86 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1092 0 0
"3501" "exp3" 1 87 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 2640 11 1
"3501" "exp3" 1 88 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1191 24 1
"3501" "exp3" 1 89 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 2262 21 1
"3501" "exp3" 1 90 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 2270 17 1
"3501" "exp3" 1 91 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1590 31 1
"3501" "exp3" 1 92 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1504 36 1
"3501" "exp3" 1 93 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1645 22 1
"3501" "exp3" 1 94 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 2080 23 1
"3501" "exp3" 1 95 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1857 12 1
"3501" "exp3" 1 96 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1504 0 0
"3501" "exp3" 1 97 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1270 35 1
"3501" "exp3" 1 98 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1295 19 1
"3501" "exp3" 1 99 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 3931 0 0
"3501" "exp3" 1 100 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1252 20 1
"3501" "exp3" 1 101 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1311 0 0
"3501" "exp3" 1 102 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 4085 11 1
"3501" "exp3" 1 103 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1405 0 0
"3501" "exp3" 1 104 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1699 23 1
"3501" "exp3" 1 105 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1500 23 1
"3501" "exp3" 1 106 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2097 36 1
"3501" "exp3" 1 107 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 3634 43 1
"3501" "exp3" 1 108 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1907 0 0
"3501" "exp3" 1 109 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1240 33 1
"3501" "exp3" 1 110 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 3939 0 0
"3501" "exp3" 1 111 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1738 0 0
"3501" "exp3" 1 112 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1801 0 0
"3501" "exp3" 1 113 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1464 0 0
"3501" "exp3" 1 114 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1507 0 0
"3501" "exp3" 1 115 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 3310 32 1
"3501" "exp3" 1 116 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 2777 0 0
"3501" "exp3" 1 117 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 4882 40 1
"3501" "exp3" 1 118 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 756 26 1
"3501" "exp3" 1 119 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1492 0 0
"3501" "exp3" 1 120 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1231 15 1
"3501" "exp3" 1 121 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 2252 0 0
"3501" "exp3" 1 122 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1077 13 1
"3501" "exp3" 1 123 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 759 29 1
"3501" "exp3" 1 124 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 994 39 1
"3501" "exp3" 1 125 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1143 0 0
"3501" "exp3" 1 126 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1190 0 0
"3501" "exp3" 1 127 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1653 17 1
"3501" "exp3" 1 128 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1370 17 1
"3501" "exp3" 1 129 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1293 44 1
"3501" "exp3" 1 130 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1270 0 0
"3501" "exp3" 1 131 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1599 22 1
"3501" "exp3" 1 132 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1255 0 0
"3501" "exp3" 2 1 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1374 0 0
"3501" "exp3" 2 2 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1669 0 0
"3501" "exp3" 2 3 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1070 16 1
"3501" "exp3" 2 4 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1154 0 0
"3501" "exp3" 2 5 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1216 22 1
"3501" "exp3" 2 6 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1197 0 0
"3501" "exp3" 2 7 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1395 24 1
"3501" "exp3" 2 8 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1476 11 1
"3501" "exp3" 2 9 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2753 0 0
"3501" "exp3" 2 10 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1599 0 0
"3501" "exp3" 2 11 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 3070 33 1
"3501" "exp3" 2 12 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1371 30 1
"3501" "exp3" 2 13 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1985 93 1
"3501" "exp3" 2 14 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 982 34 1
"3501" "exp3" 2 15 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1606 23 1
"3501" "exp3" 2 16 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 915 16 1
"3501" "exp3" 2 17 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1128 0 0
"3501" "exp3" 2 18 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 938 0 0
"3501" "exp3" 2 19 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1148 25 1
"3501" "exp3" 2 20 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 3639 29 1
"3501" "exp3" 2 21 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1332 19 1
"3501" "exp3" 2 22 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 999 25 1
"3501" "exp3" 2 23 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1562 28 1
"3501" "exp3" 2 24 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1525 0 0
"3501" "exp3" 2 25 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1658 24 1
"3501" "exp3" 2 26 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1770 0 0
"3501" "exp3" 2 27 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1971 32 1
"3501" "exp3" 2 28 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2257 38 1
"3501" "exp3" 2 29 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 2123 5 1
"3501" "exp3" 2 30 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 2502 0 0
"3501" "exp3" 2 31 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 3082 86 1
"3501" "exp3" 2 32 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1083 6 1
"3501" "exp3" 2 33 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1185 22 1
"3501" "exp3" 2 34 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 2079 26 1
"3501" "exp3" 2 35 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1372 31 1
"3501" "exp3" 2 36 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1797 0 0
"3501" "exp3" 2 37 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1858 30 1
"3501" "exp3" 2 38 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 3512 41 1
"3501" "exp3" 2 39 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2210 46 1
"3501" "exp3" 2 40 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1964 15 1
"3501" "exp3" 2 41 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 2700 20 1
"3501" "exp3" 2 42 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 2525 17 1
"3501" "exp3" 2 43 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1728 0 0
"3501" "exp3" 2 44 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2928 0 0
"3501" "exp3" 2 45 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2228 0 0
"3501" "exp3" 2 46 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1173 0 0
"3501" "exp3" 2 47 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1628 0 0
"3501" "exp3" 2 48 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 2840 0 0
"3501" "exp3" 2 49 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 2078 19 1
"3501" "exp3" 2 50 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1594 31 1
"3501" "exp3" 2 51 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1122 25 1
"3501" "exp3" 2 52 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1971 0 0
"3501" "exp3" 2 53 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1453 13 1
"3501" "exp3" 2 54 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 3179 17 1
"3501" "exp3" 2 55 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1673 0 0
"3501" "exp3" 2 56 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1495 0 0
"3501" "exp3" 2 57 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 2756 0 0
"3501" "exp3" 2 58 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1097 32 1
"3501" "exp3" 2 59 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1013 0 0
"3501" "exp3" 2 60 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1661 0 0
"3501" "exp3" 2 61 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 3000 49 1
"3501" "exp3" 2 62 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1970 42 1
"3501" "exp3" 2 63 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1849 34 1
"3501" "exp3" 2 64 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2382 29 1
"3501" "exp3" 2 65 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1639 18 1
"3501" "exp3" 2 66 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1960 29 1
"3501" "exp3" 2 67 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 3298 14 1
"3501" "exp3" 2 68 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1242 0 0
"3501" "exp3" 2 69 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1857 21 1
"3501" "exp3" 2 70 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2132 0 0
"3501" "exp3" 2 71 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1132 43 1
"3501" "exp3" 2 72 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1650 0 0
"3501" "exp3" 2 73 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2569 0 0
"3501" "exp3" 2 74 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1613 14 1
"3501" "exp3" 2 75 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1447 0 0
"3501" "exp3" 2 76 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1711 0 0
"3501" "exp3" 2 77 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1583 0 0
"3501" "exp3" 2 78 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1245 23 1
"3501" "exp3" 2 79 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1232 45 1
"3501" "exp3" 2 80 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1410 27 1
"3501" "exp3" 2 81 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 789 26 1
"3501" "exp3" 2 82 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 3603 10 1
"3501" "exp3" 2 83 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1032 23 1
"3501" "exp3" 2 84 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 2289 0 0
"3501" "exp3" 2 85 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1689 20 1
"3501" "exp3" 2 86 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1499 0 0
"3501" "exp3" 2 87 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1459 44 1
"3501" "exp3" 2 88 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 2062 0 0
"3501" "exp3" 2 89 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1626 0 0
"3501" "exp3" 2 90 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2212 37 1
"3501" "exp3" 2 91 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2137 20 1
"3501" "exp3" 2 92 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2768 13 1
"3501" "exp3" 2 93 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 2228 0 0
"3501" "exp3" 2 94 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 4562 0 0
"3501" "exp3" 2 95 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2594 0 0
"3501" "exp3" 2 96 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2409 0 0
"3501" "exp3" 2 97 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1001 0 0
"3501" "exp3" 2 98 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1646 0 0
"3501" "exp3" 2 99 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1387 38 1
"3501" "exp3" 2 100 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 2398 0 0
"3501" "exp3" 2 101 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1360 0 0
"3501" "exp3" 2 102 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 969 26 1
"3501" "exp3" 2 103 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3294 67 1
"3501" "exp3" 2 104 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1034 15 1
"3501" "exp3" 2 105 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 982 28 1
"3501" "exp3" 2 106 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 865 36 1
"3501" "exp3" 2 107 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1078 0 0
"3501" "exp3" 2 108 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1415 27 1
"3501" "exp3" 2 109 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 3350 0 0
"3501" "exp3" 2 110 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 4844 32 1
"3501" "exp3" 2 111 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 3251 27 1
"3501" "exp3" 2 112 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1903 0 0
"3501" "exp3" 2 113 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1906 0 0
"3501" "exp3" 2 114 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1665 0 0
"3501" "exp3" 2 115 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 2425 0 0
"3501" "exp3" 2 116 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 2595 11 1
"3501" "exp3" 2 117 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 2161 20 1
"3501" "exp3" 2 118 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1340 0 0
"3501" "exp3" 2 119 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 2379 18 1
"3501" "exp3" 2 120 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1853 21 1
"3501" "exp3" 2 121 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1385 40 1
"3501" "exp3" 2 122 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 3791 17 1
"3501" "exp3" 2 123 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 3144 0 0
"3501" "exp3" 2 124 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2785 0 0
"3501" "exp3" 2 125 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 2182 15 1
"3501" "exp3" 2 126 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1618 0 0
"3501" "exp3" 2 127 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2090 0 0
"3501" "exp3" 2 128 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 3274 31 1
"3501" "exp3" 2 129 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1656 35 1
"3501" "exp3" 2 130 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 669 25 1
"3501" "exp3" 2 131 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 887 47 1
"3501" "exp3" 2 132 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 870 18 1
"3501" "exp3" 1 1 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 801 30 1
"3501" "exp3" 1 2 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 699 35 1
"3501" "exp3" 1 3 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 572 12 1
"3501" "exp3" 1 4 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 976 41 1
"3501" "exp3" 1 5 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1179 0 0
"3501" "exp3" 1 6 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 2085 13 1
"3501" "exp3" 1 7 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 3893 0 0
"3501" "exp3" 1 8 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 676 29 1
"3501" "exp3" 1 9 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 709 24 1
"3501" "exp3" 1 10 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1055 37 1
"3501" "exp3" 1 11 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 900 27 1
"3501" "exp3" 1 12 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1105 0 0
"3501" "exp3" 1 13 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 661 42 1
"3501" "exp3" 1 14 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 633 0 0
"3501" "exp3" 1 15 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 568 22 1
"3501" "exp3" 1 16 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1890 98 1
"3501" "exp3" 1 17 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 2310 14 1
"3501" "exp3" 1 18 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1832 15 1
"3501" "exp3" 1 19 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1164 22 1
"3501" "exp3" 1 20 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1175 0 0
"3501" "exp3" 1 21 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 611 21 1
"3501" "exp3" 1 22 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 603 0 0
"3501" "exp3" 1 23 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1244 12 1
"3501" "exp3" 1 24 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 702 0 0
"3501" "exp3" 1 25 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 553 0 0
"3501" "exp3" 1 26 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 556 26 1
"3501" "exp3" 1 27 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 1095 0 0
"3501" "exp3" 1 28 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 779 32 1
"3501" "exp3" 1 29 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 593 26 1
"3501" "exp3" 1 30 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 611 0 0
"3501" "exp3" 1 31 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 573 22 1
"3501" "exp3" 1 32 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 729 0 0
"3501" "exp3" 1 33 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 620 36 1
"3501" "exp3" 1 34 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 535 7 1
"3501" "exp3" 1 35 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 560 37 1
"3501" "exp3" 1 36 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 641 29 1
"3501" "exp3" 1 37 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 560 0 0
"3501" "exp3" 1 38 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 650 30 1
"3501" "exp3" 1 39 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 533 0 0
"3501" "exp3" 1 40 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 786 0 0
"3501" "exp3" 1 41 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 541 33 1
"3501" "exp3" 1 42 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 877 20 1
"3501" "exp3" 1 43 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 590 20 1
"3501" "exp3" 1 44 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 995 8 1
"3501" "exp3" 1 45 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 811 31 1
"3501" "exp3" 1 46 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 846 0 0
"3501" "exp3" 1 47 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 585 45 1
"3501" "exp3" 1 48 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 528 0 0
"3501" "exp3" 1 49 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 730 29 1
"3501" "exp3" 1 50 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1032 21 1
"3501" "exp3" 1 51 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 881 19 1
"3501" "exp3" 1 52 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 738 17 1
"3501" "exp3" 1 53 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 614 25 1
"3501" "exp3" 1 54 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 673 22 1
"3501" "exp3" 1 55 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 661 32 1
"3501" "exp3" 1 56 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 800 17 1
"3501" "exp3" 1 57 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 665 13 1
"3501" "exp3" 1 58 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 619 0 0
"3501" "exp3" 1 59 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 799 49 1
"3501" "exp3" 1 60 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 827 39 1
"3501" "exp3" 1 61 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 488 0 0
"3501" "exp3" 1 62 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1075 18 1
"3501" "exp3" 1 63 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 699 38 1
"3501" "exp3" 1 64 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 540 0 0
"3501" "exp3" 1 65 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 717 7 1
"3501" "exp3" 1 66 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 792 33 1
"3501" "exp3" 1 67 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 956 0 0
"3501" "exp3" 1 68 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 548 0 0
"3501" "exp3" 1 69 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 704 4 1
"3501" "exp3" 1 70 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1960 0 0
"3501" "exp3" 1 71 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1164 17 1
"3501" "exp3" 1 72 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 996 0 0
"3501" "exp3" 1 73 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1050 0 0
"3501" "exp3" 1 74 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1968 27 1
"3501" "exp3" 1 75 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 805 23 1
"3501" "exp3" 1 76 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 869 18 1
"3501" "exp3" 1 77 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 2547 10 1
"3501" "exp3" 1 78 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 821 36 1
"3501" "exp3" 1 79 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1295 0 0
"3501" "exp3" 1 80 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1153 0 0
"3501" "exp3" 1 81 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 2152 0 0
"3501" "exp3" 1 82 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 793 0 0
"3501" "exp3" 1 83 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1185 24 1
"3501" "exp3" 1 84 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1144 38 1
"3501" "exp3" 1 85 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1013 15 1
"3501" "exp3" 1 86 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1122 48 1
"3501" "exp3" 1 87 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 1417 6 1
"3501" "exp3" 1 88 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1140 21 1
"3501" "exp3" 1 89 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1361 19 1
"3501" "exp3" 1 90 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 713 0 0
"3501" "exp3" 1 91 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 564 28 1
"3501" "exp3" 1 92 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 715 18 1
"3501" "exp3" 1 93 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 863 0 0
"3501" "exp3" 1 94 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1053 0 0
"3501" "exp3" 1 95 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 813 25 1
"3501" "exp3" 1 96 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 963 6 1
"3501" "exp3" 1 97 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1230 29 1
"3501" "exp3" 1 98 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1016 28 1
"3501" "exp3" 1 99 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1266 23 1
"3501" "exp3" 1 100 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 1771 5 1
"3501" "exp3" 1 101 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 759 31 1
"3501" "exp3" 1 102 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1052 24 1
"3501" "exp3" 1 103 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1348 11 1
"3501" "exp3" 1 104 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 989 43 1
"3501" "exp3" 1 105 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 976 27 1
"3501" "exp3" 1 106 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1637 16 1
"3501" "exp3" 1 107 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1332 25 1
"3501" "exp3" 1 108 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1066 20 1
"3501" "exp3" 1 109 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1166 0 0
"3501" "exp3" 1 110 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 854 0 0
"3501" "exp3" 1 111 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1047 9 1
"3501" "exp3" 1 112 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 845 0 0
"3501" "exp3" 1 113 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1006 16 1
"3501" "exp3" 1 114 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1011 14 1
"3501" "exp3" 1 115 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1175 14 1
"3501" "exp3" 1 116 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1049 0 0
"3501" "exp3" 1 117 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1412 28 1
"3501" "exp3" 1 118 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 944 35 1
"3501" "exp3" 1 119 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 844 43 1
"3501" "exp3" 1 120 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2739 45 1
"3501" "exp3" 1 121 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 795 0 0
"3501" "exp3" 1 122 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1324 18 1
"3501" "exp3" 1 123 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 957 31 1
"3501" "exp3" 1 124 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 613 0 0
"3501" "exp3" 1 125 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 748 10 1
"3501" "exp3" 1 126 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 703 0 0
"3501" "exp3" 1 127 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1016 44 1
"3501" "exp3" 1 128 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1182 0 0
"3501" "exp3" 1 129 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1135 0 0
"3501" "exp3" 1 130 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1006 13 1
"3501" "exp3" 1 131 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 657 9 1
"3501" "exp3" 1 132 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1590 19 1
"3501" "exp3" 2 1 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 827 34 1
"3501" "exp3" 2 2 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 648 31 1
"3501" "exp3" 2 3 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 559 31 1
"3501" "exp3" 2 4 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 490 9 1
"3501" "exp3" 2 5 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 814 0 0
"3501" "exp3" 2 6 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 651 0 0
"3501" "exp3" 2 7 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 806 28 1
"3501" "exp3" 2 8 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 646 0 0
"3501" "exp3" 2 9 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 773 14 1
"3501" "exp3" 2 10 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 664 23 1
"3501" "exp3" 2 11 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 821 17 1
"3501" "exp3" 2 12 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 550 22 1
"3501" "exp3" 2 13 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 879 26 1
"3501" "exp3" 2 14 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1159 0 0
"3501" "exp3" 2 15 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 777 27 1
"3501" "exp3" 2 16 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 769 41 1
"3501" "exp3" 2 17 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 623 21 1
"3501" "exp3" 2 18 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 750 4 1
"3501" "exp3" 2 19 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 850 16 1
"3501" "exp3" 2 20 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1000 31 1
"3501" "exp3" 2 21 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2139 0 0
"3501" "exp3" 2 22 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 632 0 0
"3501" "exp3" 2 23 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1098 29 1
"3501" "exp3" 2 24 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2469 13 1
"3501" "exp3" 2 25 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 961 0 0
"3501" "exp3" 2 26 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 647 32 1
"3501" "exp3" 2 27 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 553 26 1
"3501" "exp3" 2 28 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 606 40 1
"3501" "exp3" 2 29 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 855 7 1
"3501" "exp3" 2 30 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 678 39 1
"3501" "exp3" 2 31 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 587 24 1
"3501" "exp3" 2 32 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 568 0 0
"3501" "exp3" 2 33 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 610 25 1
"3501" "exp3" 2 34 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 990 0 0
"3501" "exp3" 2 35 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 806 0 0
"3501" "exp3" 2 36 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1209 0 0
"3501" "exp3" 2 37 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1908 42 1
"3501" "exp3" 2 38 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 635 10 1
"3501" "exp3" 2 39 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 692 16 1
"3501" "exp3" 2 40 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 749 37 1
"3501" "exp3" 2 41 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 858 33 1
"3501" "exp3" 2 42 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 557 0 0
"3501" "exp3" 2 43 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 600 0 0
"3501" "exp3" 2 44 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 671 24 1
"3501" "exp3" 2 45 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 753 42 1
"3501" "exp3" 2 46 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 667 0 0
"3501" "exp3" 2 47 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1317 18 1
"3501" "exp3" 2 48 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 815 24 1
"3501" "exp3" 2 49 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 693 0 0
"3501" "exp3" 2 50 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 580 11 1
"3501" "exp3" 2 51 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 673 23 1
"3501" "exp3" 2 52 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 968 0 0
"3501" "exp3" 2 53 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 919 45 1
"3501" "exp3" 2 54 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 605 0 0
"3501" "exp3" 2 55 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 626 27 1
"3501" "exp3" 2 56 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 592 15 1
"3501" "exp3" 2 57 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 497 30 1
"3501" "exp3" 2 58 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 551 37 1
"3501" "exp3" 2 59 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 560 40 1
"3501" "exp3" 2 60 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 470 0 0
"3501" "exp3" 2 61 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 942 0 0
"3501" "exp3" 2 62 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 961 6 1
"3501" "exp3" 2 63 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1124 20 1
"3501" "exp3" 2 64 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1172 0 0
"3501" "exp3" 2 65 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1031 13 1
"3501" "exp3" 2 66 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1647 25 1
"3501" "exp3" 2 67 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 846 17 1
"3501" "exp3" 2 68 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1359 23 1
"3501" "exp3" 2 69 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1297 0 0
"3501" "exp3" 2 70 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1125 26 1
"3501" "exp3" 2 71 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1195 13 1
"3501" "exp3" 2 72 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1273 22 1
"3501" "exp3" 2 73 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1920 0 0
"3501" "exp3" 2 74 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1207 0 0
"3501" "exp3" 2 75 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 926 20 1
"3501" "exp3" 2 76 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1516 36 1
"3501" "exp3" 2 77 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 789 20 1
"3501" "exp3" 2 78 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 752 21 1
"3501" "exp3" 2 79 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 657 30 1
"3501" "exp3" 2 80 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 741 43 1
"3501" "exp3" 2 81 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 998 28 1
"3501" "exp3" 2 82 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1252 0 0
"3501" "exp3" 2 83 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1130 38 1
"3501" "exp3" 2 84 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1195 0 0
"3501" "exp3" 2 85 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 714 31 1
"3501" "exp3" 2 86 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1145 12 1
"3501" "exp3" 2 87 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 1807 7 1
"3501" "exp3" 2 88 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2294 25 1
"3501" "exp3" 2 89 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 997 0 0
"3501" "exp3" 2 90 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1167 0 0
"3501" "exp3" 2 91 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 825 0 0
"3501" "exp3" 2 92 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 993 19 1
"3501" "exp3" 2 93 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 630 14 1
"3501" "exp3" 2 94 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 741 19 1
"3501" "exp3" 2 95 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 494 30 1
"3501" "exp3" 2 96 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 548 19 1
"3501" "exp3" 2 97 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 817 47 1
"3501" "exp3" 2 98 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1474 16 1
"3501" "exp3" 2 99 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 627 22 1
"3501" "exp3" 2 100 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 603 32 1
"3501" "exp3" 2 101 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 884 17 1
"3501" "exp3" 2 102 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 802 0 0
"3501" "exp3" 2 103 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 2322 33 1
"3501" "exp3" 2 104 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 1815 2 1
"3501" "exp3" 2 105 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1613 21 1
"3501" "exp3" 2 106 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 846 0 0
"3501" "exp3" 2 107 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 807 36 1
"3501" "exp3" 2 108 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 854 0 0
"3501" "exp3" 2 109 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1992 0 0
"3501" "exp3" 2 110 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 900 0 0
"3501" "exp3" 2 111 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 995 0 0
"3501" "exp3" 2 112 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1013 8 1
"3501" "exp3" 2 113 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1549 33 1
"3501" "exp3" 2 114 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 3607 0 0
"3501" "exp3" 2 115 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 988 48 1
"3501" "exp3" 2 116 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 666 0 0
"3501" "exp3" 2 117 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 811 10 1
"3501" "exp3" 2 118 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1059 17 1
"3501" "exp3" 2 119 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 1277 5 1
"3501" "exp3" 2 120 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2171 14 1
"3501" "exp3" 2 121 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1340 28 1
"3501" "exp3" 2 122 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1245 32 1
"3501" "exp3" 2 123 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 942 18 1
"3501" "exp3" 2 124 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1201 19 1
"3501" "exp3" 2 125 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1139 0 0
"3501" "exp3" 2 126 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1693 11 1
"3501" "exp3" 2 127 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1482 0 0
"3501" "exp3" 2 128 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 994 15 1
"3501" "exp3" 2 129 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 466 9 1
"3501" "exp3" 2 130 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 388 38 1
"3501" "exp3" 2 131 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 569 26 1
"3501" "exp3" 2 132 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 616 0 0
"3501" "exp3" 1 1 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1744 0 0
"3501" "exp3" 1 2 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 746 17 1
"3501" "exp3" 1 3 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 642 37 1
"3501" "exp3" 1 4 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 523 33 1
"3501" "exp3" 1 5 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 602 30 1
"3501" "exp3" 1 6 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 691 0 0
"3501" "exp3" 1 7 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 754 28 1
"3501" "exp3" 1 8 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 622 13 1
"3501" "exp3" 1 9 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1347 45 1
"3501" "exp3" 1 10 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1273 0 0
"3501" "exp3" 1 11 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 646 0 0
"3501" "exp3" 1 12 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 706 12 1
"3501" "exp3" 1 13 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 547 0 0
"3501" "exp3" 1 14 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 644 9 1
"3501" "exp3" 1 15 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 649 26 1
"3501" "exp3" 1 16 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 804 0 0
"3501" "exp3" 1 17 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 892 14 1
"3501" "exp3" 1 18 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 679 0 0
"3501" "exp3" 1 19 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 677 0 0
"3501" "exp3" 1 20 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 543 34 1
"3501" "exp3" 1 21 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 814 0 0
"3501" "exp3" 1 22 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 653 22 1
"3501" "exp3" 1 23 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1140 31 1
"3501" "exp3" 1 24 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 981 0 0
"3501" "exp3" 1 25 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1044 0 0
"3501" "exp3" 1 26 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 803 46 1
"3501" "exp3" 1 27 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 756 35 1
"3501" "exp3" 1 28 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 609 17 1
"3501" "exp3" 1 29 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 627 15 1
"3501" "exp3" 1 30 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 551 0 0
"3501" "exp3" 1 31 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1042 0 0
"3501" "exp3" 1 32 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 804 31 1
"3501" "exp3" 1 33 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 599 0 0
"3501" "exp3" 1 34 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 641 26 1
"3501" "exp3" 1 35 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 698 40 1
"3501" "exp3" 1 36 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 990 0 0
"3501" "exp3" 1 37 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 671 0 0
"3501" "exp3" 1 38 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 645 27 1
"3501" "exp3" 1 39 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 587 27 1
"3501" "exp3" 1 40 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 866 0 0
"3501" "exp3" 1 41 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 2083 37 1
"3501" "exp3" 1 42 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 782 24 1
"3501" "exp3" 1 43 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 750 21 1
"3501" "exp3" 1 44 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 609 24 1
"3501" "exp3" 1 45 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 592 41 1
"3501" "exp3" 1 46 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 510 20 1
"3501" "exp3" 1 47 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 936 0 0
"3501" "exp3" 1 48 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 754 28 1
"3501" "exp3" 1 49 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 908 0 0
"3501" "exp3" 1 50 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1112 0 0
"3501" "exp3" 1 51 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 663 0 0
"3501" "exp3" 1 52 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 685 0 0
"3501" "exp3" 1 53 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 631 27 1
"3501" "exp3" 1 54 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 613 0 0
"3501" "exp3" 1 55 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 632 24 1
"3501" "exp3" 1 56 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 737 21 1
"3501" "exp3" 1 57 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 981 0 0
"3501" "exp3" 1 58 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1223 21 1
"3501" "exp3" 1 59 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 926 19 1
"3501" "exp3" 1 60 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 590 17 1
"3501" "exp3" 1 61 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 593 32 1
"3501" "exp3" 1 62 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 761 33 1
"3501" "exp3" 1 63 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 873 10 1
"3501" "exp3" 1 64 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 516 23 1
"3501" "exp3" 1 65 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 427 14 1
"3501" "exp3" 1 66 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 517 23 1
"3501" "exp3" 1 67 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 450 3 1
"3501" "exp3" 1 68 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 554 20 1
"3501" "exp3" 1 69 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 651 34 1
"3501" "exp3" 1 70 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 674 25 1
"3501" "exp3" 1 71 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 771 0 0
"3501" "exp3" 1 72 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1413 0 0
"3501" "exp3" 1 73 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1693 0 0
"3501" "exp3" 1 74 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 677 18 1
"3501" "exp3" 1 75 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 919 0 0
"3501" "exp3" 1 76 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 962 39 1
"3501" "exp3" 1 77 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1186 29 1
"3501" "exp3" 1 78 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1211 0 0
"3501" "exp3" 1 79 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1170 0 0
"3501" "exp3" 1 80 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 915 13 1
"3501" "exp3" 1 81 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 574 0 0
"3501" "exp3" 1 82 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 929 18 1
"3501" "exp3" 1 83 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1077 42 1
"3501" "exp3" 1 84 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1645 0 0
"3501" "exp3" 1 85 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1084 16 1
"3501" "exp3" 1 86 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1855 0 0
"3501" "exp3" 1 87 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 645 0 0
"3501" "exp3" 1 88 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 633 35 1
"3501" "exp3" 1 89 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 776 0 0
"3501" "exp3" 1 90 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 861 19 1
"3501" "exp3" 1 91 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 555 33 1
"3501" "exp3" 1 92 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 682 36 1
"3501" "exp3" 1 93 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 741 13 1
"3501" "exp3" 1 94 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 801 0 0
"3501" "exp3" 1 95 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 587 0 0
"3501" "exp3" 1 96 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1252 45 1
"3501" "exp3" 1 97 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1162 0 0
"3501" "exp3" 1 98 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 815 0 0
"3501" "exp3" 1 99 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1250 33 1
"3501" "exp3" 1 100 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 648 14 1
"3501" "exp3" 1 101 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 508 7 1
"3501" "exp3" 1 102 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 560 42 1
"3501" "exp3" 1 103 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 546 29 1
"3501" "exp3" 1 104 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 559 36 1
"3501" "exp3" 1 105 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1644 32 1
"3501" "exp3" 1 106 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 564 25 1
"3501" "exp3" 1 107 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 648 0 0
"3501" "exp3" 1 108 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 511 27 1
"3501" "exp3" 1 109 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 443 16 1
"3501" "exp3" 1 110 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 541 29 1
"3501" "exp3" 1 111 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1191 59 1
"3501" "exp3" 1 112 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 614 0 0
"3501" "exp3" 1 113 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 452 0 0
"3501" "exp3" 1 114 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 466 22 1
"3501" "exp3" 1 115 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 380 24 1
"3501" "exp3" 1 116 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 506 0 0
"3501" "exp3" 1 117 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1231 0 0
"3501" "exp3" 1 118 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 667 11 1
"3501" "exp3" 1 119 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 480 6 1
"3501" "exp3" 1 120 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 482 15 1
"3501" "exp3" 1 121 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 504 23 1
"3501" "exp3" 1 122 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1208 0 0
"3501" "exp3" 1 123 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 852 17 1
"3501" "exp3" 1 124 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 526 0 0
"3501" "exp3" 1 125 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1159 0 0
"3501" "exp3" 1 126 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 580 11 1
"3501" "exp3" 1 127 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 494 0 0
"3501" "exp3" 1 128 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 427 29 1
"3501" "exp3" 1 129 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 423 19 1
"3501" "exp3" 1 130 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 447 25 1
"3501" "exp3" 1 131 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 507 18 1
"3501" "exp3" 1 132 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 657 25 1
"3501" "exp3" 2 1 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 635 18 1
"3501" "exp3" 2 2 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 499 0 0
"3501" "exp3" 2 3 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 578 0 0
"3501" "exp3" 2 4 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 601 27 1
"3501" "exp3" 2 5 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 523 20 1
"3501" "exp3" 2 6 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1197 0 0
"3501" "exp3" 2 7 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 456 14 1
"3501" "exp3" 2 8 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 495 26 1
"3501" "exp3" 2 9 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 479 31 1
"3501" "exp3" 2 10 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 479 34 1
"3501" "exp3" 2 11 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 453 15 1
"3501" "exp3" 2 12 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 444 26 1
"3501" "exp3" 2 13 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 462 19 1
"3501" "exp3" 2 14 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 456 13 1
"3501" "exp3" 2 15 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 505 29 1
"3501" "exp3" 2 16 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 424 17 1
"3501" "exp3" 2 17 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 592 14 1
"3501" "exp3" 2 18 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 492 23 1
"3501" "exp3" 2 19 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 615 22 1
"3501" "exp3" 2 20 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 661 20 1
"3501" "exp3" 2 21 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 470 23 1
"3501" "exp3" 2 22 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 443 24 1
"3501" "exp3" 2 23 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 487 16 1
"3501" "exp3" 2 24 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 571 27 1
"3501" "exp3" 2 25 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 540 41 1
"3501" "exp3" 2 26 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 665 36 1
"3501" "exp3" 2 27 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 530 32 1
"3501" "exp3" 2 28 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 461 19 1
"3501" "exp3" 2 29 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 685 30 1
"3501" "exp3" 2 30 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 754 11 1
"3501" "exp3" 2 31 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1935 97 1
"3501" "exp3" 2 32 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 873 15 1
"3501" "exp3" 2 33 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 631 27 1
"3501" "exp3" 2 34 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 843 0 0
"3501" "exp3" 2 35 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1070 0 0
"3501" "exp3" 2 36 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 859 29 1
"3501" "exp3" 2 37 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 516 16 1
"3501" "exp3" 2 38 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 913 38 1
"3501" "exp3" 2 39 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 524 0 0
"3501" "exp3" 2 40 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 629 0 0
"3501" "exp3" 2 41 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 840 0 0
"3501" "exp3" 2 42 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 660 0 0
"3501" "exp3" 2 43 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 781 0 0
"3501" "exp3" 2 44 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 785 30 1
"3501" "exp3" 2 45 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 813 30 1
"3501" "exp3" 2 46 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 702 0 0
"3501" "exp3" 2 47 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 657 42 1
"3501" "exp3" 2 48 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 688 31 1
"3501" "exp3" 2 49 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 736 47 1
"3501" "exp3" 2 50 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 502 0 0
"3501" "exp3" 2 51 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 480 0 0
"3501" "exp3" 2 52 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 780 18 1
"3501" "exp3" 2 53 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 482 28 1
"3501" "exp3" 2 54 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 513 33 1
"3501" "exp3" 2 55 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1168 45 1
"3501" "exp3" 2 56 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 765 48 1
"3501" "exp3" 2 57 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 724 0 0
"3501" "exp3" 2 58 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 503 0 0
"3501" "exp3" 2 59 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 579 0 0
"3501" "exp3" 2 60 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 553 17 1
"3501" "exp3" 2 61 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 977 33 1
"3501" "exp3" 2 62 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 523 0 0
"3501" "exp3" 2 63 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 683 0 0
"3501" "exp3" 2 64 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 610 20 1
"3501" "exp3" 2 65 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 780 0 0
"3501" "exp3" 2 66 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 529 10 1
"3501" "exp3" 2 67 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 753 21 1
"3501" "exp3" 2 68 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 470 24 1
"3501" "exp3" 2 69 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 579 12 1
"3501" "exp3" 2 70 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 603 41 1
"3501" "exp3" 2 71 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 489 31 1
"3501" "exp3" 2 72 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 512 11 1
"3501" "exp3" 2 73 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 556 37 1
"3501" "exp3" 2 74 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 826 0 0
"3501" "exp3" 2 75 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 500 35 1
"3501" "exp3" 2 76 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 843 0 0
"3501" "exp3" 2 77 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 738 23 1
"3501" "exp3" 2 78 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 739 0 0
"3501" "exp3" 2 79 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 512 0 0
"3501" "exp3" 2 80 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 617 0 0
"3501" "exp3" 2 81 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 527 21 1
"3501" "exp3" 2 82 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1040 10 1
"3501" "exp3" 2 83 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 903 0 0
"3501" "exp3" 2 84 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 561 0 0
"3501" "exp3" 2 85 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 467 19 1
"3501" "exp3" 2 86 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 423 19 1
"3501" "exp3" 2 87 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 704 34 1
"3501" "exp3" 2 88 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 467 25 1
"3501" "exp3" 2 89 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 503 26 1
"3501" "exp3" 2 90 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 593 0 0
"3501" "exp3" 2 91 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 650 35 1
"3501" "exp3" 2 92 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 755 20 1
"3501" "exp3" 2 93 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 702 44 1
"3501" "exp3" 2 94 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 773 16 1
"3501" "exp3" 2 95 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 504 28 1
"3501" "exp3" 2 96 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 792 32 1
"3501" "exp3" 2 97 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 563 39 1
"3501" "exp3" 2 98 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 516 14 1
"3501" "exp3" 2 99 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 805 0 0
"3501" "exp3" 2 100 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 670 0 0
"3501" "exp3" 2 101 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 886 44 1
"3501" "exp3" 2 102 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 577 31 1
"3501" "exp3" 2 103 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 738 22 1
"3501" "exp3" 2 104 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 793 0 0
"3501" "exp3" 2 105 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 738 28 1
"3501" "exp3" 2 106 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 513 38 1
"3501" "exp3" 2 107 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 569 25 1
"3501" "exp3" 2 108 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 804 18 1
"3501" "exp3" 2 109 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 567 17 1
"3501" "exp3" 2 110 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 554 29 1
"3501" "exp3" 2 111 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 513 0 0
"3501" "exp3" 2 112 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 550 0 0
"3501" "exp3" 2 113 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1220 0 0
"3501" "exp3" 2 114 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 921 32 1
"3501" "exp3" 2 115 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 510 18 1
"3501" "exp3" 2 116 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 624 21 1
"3501" "exp3" 2 117 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 638 12 1
"3501" "exp3" 2 118 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 794 96 1
"3501" "exp3" 2 119 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 678 23 1
"3501" "exp3" 2 120 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 627 32 1
"3501" "exp3" 2 121 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 465 13 1
"3501" "exp3" 2 122 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 840 24 1
"3501" "exp3" 2 123 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 595 13 1
"3501" "exp3" 2 124 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 727 49 1
"3501" "exp3" 2 125 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 485 25 1
"3501" "exp3" 2 126 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 796 40 1
"3501" "exp3" 2 127 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 619 28 1
"3501" "exp3" 2 128 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 631 0 0
"3501" "exp3" 2 129 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 531 7 1
"3501" "exp3" 2 130 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 558 26 1
"3501" "exp3" 2 131 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 805 17 1
"3501" "exp3" 2 132 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1307 0 0
"3501" "exp3" 1 1 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 674 17 1
"3501" "exp3" 1 2 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 625 9 1
"3501" "exp3" 1 3 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 749 25 1
"3501" "exp3" 1 4 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 775 30 1
"3501" "exp3" 1 5 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 628 24 1
"3501" "exp3" 1 6 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1138 44 1
"3501" "exp3" 1 7 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 884 26 1
"3501" "exp3" 1 8 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 904 28 1
"3501" "exp3" 1 9 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 671 22 1
"3501" "exp3" 1 10 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 696 0 0
"3501" "exp3" 1 11 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 638 9 1
"3501" "exp3" 1 12 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 665 48 1
"3501" "exp3" 1 13 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 836 16 1
"3501" "exp3" 1 14 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 754 0 0
"3501" "exp3" 1 15 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 626 40 1
"3501" "exp3" 1 16 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 849 0 0
"3501" "exp3" 1 17 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1015 65 1
"3501" "exp3" 1 18 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1012 26 1
"3501" "exp3" 1 19 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 884 0 0
"3501" "exp3" 1 20 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 753 34 1
"3501" "exp3" 1 21 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 748 33 1
"3501" "exp3" 1 22 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 713 20 1
"3501" "exp3" 1 23 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 724 0 0
"3501" "exp3" 1 24 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 695 0 0
"3501" "exp3" 1 25 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 845 38 1
"3501" "exp3" 1 26 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 696 29 1
"3501" "exp3" 1 27 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 708 41 1
"3501" "exp3" 1 28 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 738 27 1
"3501" "exp3" 1 29 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1037 14 1
"3501" "exp3" 1 30 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 647 11 1
"3501" "exp3" 1 31 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1121 19 1
"3501" "exp3" 1 32 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 733 18 1
"3501" "exp3" 1 33 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 844 34 1
"3501" "exp3" 1 34 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 588 31 1
"3501" "exp3" 1 35 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1417 0 0
"3501" "exp3" 1 36 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 820 30 1
"3501" "exp3" 1 37 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 652 18 1
"3501" "exp3" 1 38 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 787 13 1
"3501" "exp3" 1 39 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 775 29 1
"3501" "exp3" 1 40 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 768 0 0
"3501" "exp3" 1 41 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1204 19 1
"3501" "exp3" 1 42 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 677 12 1
"3501" "exp3" 1 43 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 867 0 0
"3501" "exp3" 1 44 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 700 22 1
"3501" "exp3" 1 45 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 663 38 1
"3501" "exp3" 1 46 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 733 21 1
"3501" "exp3" 1 47 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1026 0 0
"3501" "exp3" 1 48 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1274 97 1
"3501" "exp3" 1 49 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 885 35 1
"3501" "exp3" 1 50 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 680 14 1
"3501" "exp3" 1 51 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 776 30 1
"3501" "exp3" 1 52 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 724 37 1
"3501" "exp3" 1 53 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 978 22 1
"3501" "exp3" 1 54 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1042 5 1
"3501" "exp3" 1 55 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 839 31 1
"3501" "exp3" 1 56 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 674 10 1
"3501" "exp3" 1 57 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 716 34 1
"3501" "exp3" 1 58 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 798 23 1
"3501" "exp3" 1 59 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 821 0 0
"3501" "exp3" 1 60 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 935 0 0
"3501" "exp3" 1 61 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 917 26 1
"3501" "exp3" 1 62 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 671 23 1
"3501" "exp3" 1 63 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 629 16 1
"3501" "exp3" 1 64 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2361 14 1
"3501" "exp3" 1 65 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1440 0 0
"3501" "exp3" 1 66 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 857 21 1
"3501" "exp3" 1 67 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 734 29 1
"3501" "exp3" 1 68 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1046 33 1
"3501" "exp3" 1 69 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1078 0 0
"3501" "exp3" 1 70 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 974 0 0
"3501" "exp3" 1 71 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1038 28 1
"3501" "exp3" 1 72 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 942 20 1
"3501" "exp3" 1 73 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1122 0 0
"3501" "exp3" 1 74 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 689 24 1
"3501" "exp3" 1 75 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1538 17 1
"3501" "exp3" 1 76 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 992 0 0
"3501" "exp3" 1 77 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 728 0 0
"3501" "exp3" 1 78 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 635 0 0
"3501" "exp3" 1 79 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 616 43 1
"3501" "exp3" 1 80 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 524 42 1
"3501" "exp3" 1 81 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 667 28 1
"3501" "exp3" 1 82 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 626 0 0
"3501" "exp3" 1 83 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 612 45 1
"3501" "exp3" 1 84 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 663 69 1
"3501" "exp3" 1 85 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1376 25 1
"3501" "exp3" 1 86 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 913 20 1
"3501" "exp3" 1 87 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 670 0 0
"3501" "exp3" 1 88 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 621 28 1
"3501" "exp3" 1 89 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 576 0 0
"3501" "exp3" 1 90 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 611 0 0
"3501" "exp3" 1 91 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 599 0 0
"3501" "exp3" 1 92 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 576 0 0
"3501" "exp3" 1 93 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 557 35 1
"3501" "exp3" 1 94 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 985 8 1
"3501" "exp3" 1 95 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 564 15 1
"3501" "exp3" 1 96 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 566 15 1
"3501" "exp3" 1 97 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 757 0 0
"3501" "exp3" 1 98 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 930 0 0
"3501" "exp3" 1 99 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 1132 7 1
"3501" "exp3" 1 100 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 858 24 1
"3501" "exp3" 1 101 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 970 20 1
"3501" "exp3" 1 102 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 701 0 0
"3501" "exp3" 1 103 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1131 21 1
"3501" "exp3" 1 104 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 679 17 1
"3501" "exp3" 1 105 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 805 19 1
"3501" "exp3" 1 106 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 670 15 1
"3501" "exp3" 1 107 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 798 21 1
"3501" "exp3" 1 108 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 663 0 0
"3501" "exp3" 1 109 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 993 6 1
"3501" "exp3" 1 110 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 624 31 1
"3501" "exp3" 1 111 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 918 0 0
"3501" "exp3" 1 112 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1426 13 1
"3501" "exp3" 1 113 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 875 49 1
"3501" "exp3" 1 114 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 644 25 1
"3501" "exp3" 1 115 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 621 36 1
"3501" "exp3" 1 116 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 815 7 1
"3501" "exp3" 1 117 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 542 19 1
"3501" "exp3" 1 118 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 624 23 1
"3501" "exp3" 1 119 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 713 10 1
"3501" "exp3" 1 120 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 613 13 1
"3501" "exp3" 1 121 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1005 0 0
"3501" "exp3" 1 122 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1446 0 0
"3501" "exp3" 1 123 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1485 0 0
"3501" "exp3" 1 124 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 594 36 1
"3501" "exp3" 1 125 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 694 22 1
"3501" "exp3" 1 126 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 832 32 1
"3501" "exp3" 1 127 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 686 58 1
"3501" "exp3" 1 128 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 984 39 1
"3501" "exp3" 1 129 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 749 27 1
"3501" "exp3" 1 130 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 708 17 1
"3501" "exp3" 1 131 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 538 16 1
"3501" "exp3" 1 132 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 664 32 1
"3501" "exp3" 2 1 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 718 31 1
"3501" "exp3" 2 2 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 880 16 1
"3501" "exp3" 2 3 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 501 16 1
"3501" "exp3" 2 4 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 564 44 1
"3501" "exp3" 2 5 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 784 17 1
"3501" "exp3" 2 6 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 767 36 1
"3501" "exp3" 2 7 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 642 28 1
"3501" "exp3" 2 8 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 932 0 0
"3501" "exp3" 2 9 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 611 32 1
"3501" "exp3" 2 10 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 588 0 0
"3501" "exp3" 2 11 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 753 29 1
"3501" "exp3" 2 12 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 580 5 1
"3501" "exp3" 2 13 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 954 0 0
"3501" "exp3" 2 14 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 600 34 1
"3501" "exp3" 2 15 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 623 22 1
"3501" "exp3" 2 16 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 642 0 0
"3501" "exp3" 2 17 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 635 45 1
"3501" "exp3" 2 18 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 564 38 1
"3501" "exp3" 2 19 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 672 26 1
"3501" "exp3" 2 20 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 522 0 0
"3501" "exp3" 2 21 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 727 17 1
"3501" "exp3" 2 22 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 535 30 1
"3501" "exp3" 2 23 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 631 0 0
"3501" "exp3" 2 24 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 697 11 1
"3501" "exp3" 2 25 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 569 9 1
"3501" "exp3" 2 26 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 766 0 0
"3501" "exp3" 2 27 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1140 0 0
"3501" "exp3" 2 28 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 738 39 1
"3501" "exp3" 2 29 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 672 46 1
"3501" "exp3" 2 30 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 581 30 1
"3501" "exp3" 2 31 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 573 5 1
"3501" "exp3" 2 32 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 713 7 1
"3501" "exp3" 2 33 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 639 42 1
"3501" "exp3" 2 34 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 637 39 1
"3501" "exp3" 2 35 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 588 32 1
"3501" "exp3" 2 36 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 522 0 0
"3501" "exp3" 2 37 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 865 28 1
"3501" "exp3" 2 38 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 607 37 1
"3501" "exp3" 2 39 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 819 12 1
"3501" "exp3" 2 40 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 800 41 1
"3501" "exp3" 2 41 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 699 30 1
"3501" "exp3" 2 42 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 594 15 1
"3501" "exp3" 2 43 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 763 43 1
"3501" "exp3" 2 44 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 548 35 1
"3501" "exp3" 2 45 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 691 32 1
"3501" "exp3" 2 46 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 528 0 0
"3501" "exp3" 2 47 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 697 17 1
"3501" "exp3" 2 48 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 568 10 1
"3501" "exp3" 2 49 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 572 0 0
"3501" "exp3" 2 50 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 857 14 1
"3501" "exp3" 2 51 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 710 28 1
"3501" "exp3" 2 52 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 619 26 1
"3501" "exp3" 2 53 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1156 0 0
"3501" "exp3" 2 54 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 643 0 0
"3501" "exp3" 2 55 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1004 25 1
"3501" "exp3" 2 56 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 794 29 1
"3501" "exp3" 2 57 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 578 26 1
"3501" "exp3" 2 58 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 708 25 1
"3501" "exp3" 2 59 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 591 21 1
"3501" "exp3" 2 60 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 2057 0 0
"3501" "exp3" 2 61 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 803 33 1
"3501" "exp3" 2 62 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1167 4 1
"3501" "exp3" 2 63 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 849 27 1
"3501" "exp3" 2 64 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 700 22 1
"3501" "exp3" 2 65 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 658 10 1
"3501" "exp3" 2 66 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1083 0 0
"3501" "exp3" 2 67 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 818 20 1
"3501" "exp3" 2 68 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 802 0 0
"3501" "exp3" 2 69 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1554 0 0
"3501" "exp3" 2 70 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 934 31 1
"3501" "exp3" 2 71 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 818 19 1
"3501" "exp3" 2 72 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 690 29 1
"3501" "exp3" 2 73 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 540 27 1
"3501" "exp3" 2 74 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 703 0 0
"3501" "exp3" 2 75 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 532 0 0
"3501" "exp3" 2 76 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 934 47 1
"3501" "exp3" 2 77 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 680 37 1
"3501" "exp3" 2 78 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 746 0 0
"3501" "exp3" 2 79 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 701 18 1
"3501" "exp3" 2 80 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 661 0 0
"3501" "exp3" 2 81 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 701 0 0
"3501" "exp3" 2 82 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 830 23 1
"3501" "exp3" 2 83 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 646 9 1
"3501" "exp3" 2 84 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 870 30 1
"3501" "exp3" 2 85 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 572 6 1
"3501" "exp3" 2 86 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 674 0 0
"3501" "exp3" 2 87 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 787 40 1
"3501" "exp3" 2 88 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 800 0 0
"3501" "exp3" 2 89 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 834 0 0
"3501" "exp3" 2 90 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 767 0 0
"3501" "exp3" 2 91 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 661 12 1
"3501" "exp3" 2 92 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 791 0 0
"3501" "exp3" 2 93 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 949 0 0
"3501" "exp3" 2 94 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 854 36 1
"3501" "exp3" 2 95 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 876 18 1
"3501" "exp3" 2 96 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 670 35 1
"3501" "exp3" 2 97 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 709 19 1
"3501" "exp3" 2 98 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 642 0 0
"3501" "exp3" 2 99 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 915 0 0
"3501" "exp3" 2 100 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1377 0 0
"3501" "exp3" 2 101 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 560 26 1
"3501" "exp3" 2 102 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 494 40 1
"3501" "exp3" 2 103 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 590 2 1
"3501" "exp3" 2 104 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 604 23 1
"3501" "exp3" 2 105 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 912 23 1
"3501" "exp3" 2 106 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 605 48 1
"3501" "exp3" 2 107 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 748 0 0
"3501" "exp3" 2 108 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 671 11 1
"3501" "exp3" 2 109 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 758 15 1
"3501" "exp3" 2 110 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 722 44 1
"3501" "exp3" 2 111 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 531 20 1
"3501" "exp3" 2 112 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 610 0 0
"3501" "exp3" 2 113 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 600 18 1
"3501" "exp3" 2 114 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 566 0 0
"3501" "exp3" 2 115 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 763 14 1
"3501" "exp3" 2 116 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 703 41 1
"3501" "exp3" 2 117 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 693 32 1
"3501" "exp3" 2 118 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 506 45 1
"3501" "exp3" 2 119 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 590 42 1
"3501" "exp3" 2 120 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 593 17 1
"3501" "exp3" 2 121 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 594 43 1
"3501" "exp3" 2 122 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 590 0 0
"3501" "exp3" 2 123 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 610 0 0
"3501" "exp3" 2 124 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 541 33 1
"3501" "exp3" 2 125 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 584 36 1
"3501" "exp3" 2 126 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 566 24 1
"3501" "exp3" 2 127 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 527 8 1
"3501" "exp3" 2 128 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 632 24 1
"3501" "exp3" 2 129 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 523 0 0
"3501" "exp3" 2 130 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 487 14 1
"3501" "exp3" 2 131 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 520 29 1
"3501" "exp3" 2 132 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 561 0 0
"3502" "exp3" 1 1 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1060 20 1
"3502" "exp3" 1 2 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1037 0 0
"3502" "exp3" 1 3 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 2097 0 0
"3502" "exp3" 1 4 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1185 0 0
"3502" "exp3" 1 5 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1530 70 1
"3502" "exp3" 1 6 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 2351 68 1
"3502" "exp3" 1 7 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1154 0 0
"3502" "exp3" 1 8 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1339 89 1
"3502" "exp3" 1 9 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 2738 19 1
"3502" "exp3" 1 10 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 2120 42 1
"3502" "exp3" 1 11 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1514 0 0
"3502" "exp3" 1 12 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 2745 40 1
"3502" "exp3" 1 13 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 2193 0 0
"3502" "exp3" 1 14 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1332 0 0
"3502" "exp3" 1 15 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1502 0 0
"3502" "exp3" 1 16 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 3903 44 1
"3502" "exp3" 1 17 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 3301 33 1
"3502" "exp3" 1 18 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1047 0 0
"3502" "exp3" 1 19 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 2909 37 1
"3502" "exp3" 1 20 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1120 0 0
"3502" "exp3" 1 21 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1155 0 0
"3502" "exp3" 1 22 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 3330 45 1
"3502" "exp3" 1 23 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1585 0 0
"3502" "exp3" 1 24 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1534 0 0
"3502" "exp3" 1 25 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1838 0 0
"3502" "exp3" 1 26 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1113 80 1
"3502" "exp3" 1 27 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1619 0 0
"3502" "exp3" 1 28 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1085 0 0
"3502" "exp3" 1 29 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1697 24 1
"3502" "exp3" 1 30 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1949 13 1
"3502" "exp3" 1 31 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1433 0 0
"3502" "exp3" 1 32 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 2032 36 1
"3502" "exp3" 1 33 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2290 44 1
"3502" "exp3" 1 34 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1336 0 0
"3502" "exp3" 1 35 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 4222 0 0
"3502" "exp3" 1 36 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 3178 33 1
"3502" "exp3" 1 37 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1608 18 1
"3502" "exp3" 1 38 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 2822 0 0
"3502" "exp3" 1 39 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2579 0 0
"3502" "exp3" 1 40 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1564 15 1
"3502" "exp3" 1 41 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 2785 0 0
"3502" "exp3" 1 42 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 3306 26 1
"3502" "exp3" 1 43 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1078 0 0
"3502" "exp3" 1 44 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1594 0 0
"3502" "exp3" 1 45 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 4167 0 0
"3502" "exp3" 1 46 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1577 0 0
"3502" "exp3" 1 47 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 868 15 1
"3502" "exp3" 1 48 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1295 21 1
"3502" "exp3" 1 49 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 916 0 0
"3502" "exp3" 1 50 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1661 43 1
"3502" "exp3" 1 51 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1283 0 0
"3502" "exp3" 1 52 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1160 43 1
"3502" "exp3" 1 53 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 3530 0 0
"3502" "exp3" 1 54 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1544 19 1
"3502" "exp3" 1 55 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1399 0 0
"3502" "exp3" 1 56 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2155 23 1
"3502" "exp3" 1 57 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1430 0 0
"3502" "exp3" 1 58 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1324 0 0
"3502" "exp3" 1 59 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1825 26 1
"3502" "exp3" 1 60 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1266 0 0
"3502" "exp3" 1 61 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1602 0 0
"3502" "exp3" 1 62 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 2304 83 1
"3502" "exp3" 1 63 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1318 0 0
"3502" "exp3" 1 64 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 2610 0 0
"3502" "exp3" 1 65 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1635 0 0
"3502" "exp3" 1 66 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 2470 30 1
"3502" "exp3" 1 67 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1069 0 0
"3502" "exp3" 1 68 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 690 14 1
"3502" "exp3" 1 69 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 2221 35 1
"3502" "exp3" 1 70 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 6466 77 1
"3502" "exp3" 1 71 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 2107 0 0
"3502" "exp3" 1 72 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2950 0 0
"3502" "exp3" 1 73 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 921 97 1
"3502" "exp3" 1 74 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 8734 0 0
"3502" "exp3" 1 75 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1411 29 1
"3502" "exp3" 1 76 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1801 0 0
"3502" "exp3" 1 77 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 4720 0 0
"3502" "exp3" 1 78 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1654 0 0
"3502" "exp3" 1 79 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1728 27 1
"3502" "exp3" 1 80 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1126 23 1
"3502" "exp3" 1 81 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 2319 20 1
"3502" "exp3" 1 82 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1815 74 1
"3502" "exp3" 1 83 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1590 0 0
"3502" "exp3" 1 84 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 4438 22 1
"3502" "exp3" 1 85 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 6128 49 1
"3502" "exp3" 1 86 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1060 22 1
"3502" "exp3" 1 87 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1496 0 0
"3502" "exp3" 1 88 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 3168 27 1
"3502" "exp3" 1 89 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1198 0 0
"3502" "exp3" 1 90 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 2109 73 1
"3502" "exp3" 1 91 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 3339 41 1
"3502" "exp3" 1 92 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1766 86 1
"3502" "exp3" 1 93 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 2794 0 0
"3502" "exp3" 1 94 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1324 0 0
"3502" "exp3" 1 95 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1875 0 0
"3502" "exp3" 1 96 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 3562 0 0
"3502" "exp3" 1 97 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2476 72 1
"3502" "exp3" 1 98 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1024 0 0
"3502" "exp3" 1 99 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 2362 37 1
"3502" "exp3" 1 100 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1079 40 1
"3502" "exp3" 1 101 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 867 0 0
"3502" "exp3" 1 102 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 2934 0 0
"3502" "exp3" 1 103 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 2081 0 0
"3502" "exp3" 1 104 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1505 16 1
"3502" "exp3" 1 105 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 3961 0 0
"3502" "exp3" 1 106 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 4940 0 0
"3502" "exp3" 1 107 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 4111 0 0
"3502" "exp3" 1 108 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 4745 42 1
"3502" "exp3" 1 109 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1489 70 1
"3502" "exp3" 1 110 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1617 0 0
"3502" "exp3" 1 111 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1009 0 0
"3502" "exp3" 1 112 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 5832 0 0
"3502" "exp3" 1 113 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1260 0 0
"3502" "exp3" 1 114 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2590 29 1
"3502" "exp3" 1 115 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 3164 71 1
"3502" "exp3" 1 116 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1220 0 0
"3502" "exp3" 1 117 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 2135 0 0
"3502" "exp3" 1 118 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 5316 0 0
"3502" "exp3" 1 119 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1336 0 0
"3502" "exp3" 1 120 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 863 0 0
"3502" "exp3" 1 121 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 2724 25 1
"3502" "exp3" 1 122 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1285 17 1
"3502" "exp3" 1 123 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1727 18 1
"3502" "exp3" 1 124 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1006 41 1
"3502" "exp3" 1 125 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1878 45 1
"3502" "exp3" 1 126 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2247 69 1
"3502" "exp3" 1 127 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 1262 0 0
"3502" "exp3" 1 128 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 1869 0 0
"3502" "exp3" 1 129 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 7654 0 0
"3502" "exp3" 1 130 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1418 76 1
"3502" "exp3" 1 131 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 5165 21 1
"3502" "exp3" 1 132 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1381 0 0
"3502" "exp3" 2 1 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 0 17 1
"3502" "exp3" 2 2 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 2230 0 0
"3502" "exp3" 2 3 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1968 67 1
"3502" "exp3" 2 4 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 3507 38 1
"3502" "exp3" 2 5 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1700 0 0
"3502" "exp3" 2 6 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1071 33 1
"3502" "exp3" 2 7 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1299 48 1
"3502" "exp3" 2 8 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1204 0 0
"3502" "exp3" 2 9 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1150 0 0
"3502" "exp3" 2 10 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 6096 0 0
"3502" "exp3" 2 11 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 2117 37 1
"3502" "exp3" 2 12 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 2000 0 0
"3502" "exp3" 2 13 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 2755 0 0
"3502" "exp3" 2 14 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1457 0 0
"3502" "exp3" 2 15 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 975 0 0
"3502" "exp3" 2 16 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1866 45 1
"3502" "exp3" 2 17 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 2432 0 0
"3502" "exp3" 2 18 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 2584 30 1
"3502" "exp3" 2 19 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 3305 0 0
"3502" "exp3" 2 20 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 3031 0 0
"3502" "exp3" 2 21 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1274 0 0
"3502" "exp3" 2 22 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1564 27 1
"3502" "exp3" 2 23 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1370 25 1
"3502" "exp3" 2 24 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1145 0 0
"3502" "exp3" 2 25 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1453 0 0
"3502" "exp3" 2 26 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1167 0 0
"3502" "exp3" 2 27 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2595 0 0
"3502" "exp3" 2 28 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1305 0 0
"3502" "exp3" 2 29 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1753 16 1
"3502" "exp3" 2 30 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 3541 36 1
"3502" "exp3" 2 31 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1484 34 1
"3502" "exp3" 2 32 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1258 73 1
"3502" "exp3" 2 33 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 1413 0 0
"3502" "exp3" 2 34 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 2468 0 0
"3502" "exp3" 2 35 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 2797 12 1
"3502" "exp3" 2 36 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 3506 20 1
"3502" "exp3" 2 37 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1651 0 0
"3502" "exp3" 2 38 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1359 95 1
"3502" "exp3" 2 39 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 5246 65 1
"3502" "exp3" 2 40 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1425 63 1
"3502" "exp3" 2 41 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 2565 0 0
"3502" "exp3" 2 42 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 2721 71 1
"3502" "exp3" 2 43 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1757 0 0
"3502" "exp3" 2 44 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 3775 76 1
"3502" "exp3" 2 45 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1551 0 0
"3502" "exp3" 2 46 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1166 0 0
"3502" "exp3" 2 47 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 2698 44 1
"3502" "exp3" 2 48 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2005 66 1
"3502" "exp3" 2 49 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 3765 0 0
"3502" "exp3" 2 50 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1982 0 0
"3502" "exp3" 2 51 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 3393 0 0
"3502" "exp3" 2 52 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2383 17 1
"3502" "exp3" 2 53 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1543 0 0
"3502" "exp3" 2 54 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1572 0 0
"3502" "exp3" 2 55 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1865 19 1
"3502" "exp3" 2 56 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 2890 70 1
"3502" "exp3" 2 57 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1713 0 0
"3502" "exp3" 2 58 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1196 98 1
"3502" "exp3" 2 59 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 3272 49 1
"3502" "exp3" 2 60 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 2291 32 1
"3502" "exp3" 2 61 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1560 44 1
"3502" "exp3" 2 62 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1201 0 0
"3502" "exp3" 2 63 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 3646 0 0
"3502" "exp3" 2 64 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2286 0 0
"3502" "exp3" 2 65 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1731 20 1
"3502" "exp3" 2 66 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1245 87 1
"3502" "exp3" 2 67 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 1572 0 0
"3502" "exp3" 2 68 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 5045 77 1
"3502" "exp3" 2 69 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 3543 71 1
"3502" "exp3" 2 70 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 2993 36 1
"3502" "exp3" 2 71 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1924 18 1
"3502" "exp3" 2 72 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1736 0 0
"3502" "exp3" 2 73 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 2245 0 0
"3502" "exp3" 2 74 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1432 78 1
"3502" "exp3" 2 75 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1099 24 1
"3502" "exp3" 2 76 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1925 0 0
"3502" "exp3" 2 77 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2830 0 0
"3502" "exp3" 2 78 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 2671 0 0
"3502" "exp3" 2 79 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 5176 0 0
"3502" "exp3" 2 80 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2092 42 1
"3502" "exp3" 2 81 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 2622 33 1
"3502" "exp3" 2 82 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1642 46 1
"3502" "exp3" 2 83 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1349 0 0
"3502" "exp3" 2 84 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 2229 41 1
"3502" "exp3" 2 85 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1452 89 1
"3502" "exp3" 2 86 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1584 67 1
"3502" "exp3" 2 87 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1079 42 1
"3502" "exp3" 2 88 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1712 0 0
"3502" "exp3" 2 89 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 4863 37 1
"3502" "exp3" 2 90 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1212 0 0
"3502" "exp3" 2 91 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 2135 0 0
"3502" "exp3" 2 92 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1495 0 0
"3502" "exp3" 2 93 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 2288 0 0
"3502" "exp3" 2 94 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1310 0 0
"3502" "exp3" 2 95 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 2319 22 1
"3502" "exp3" 2 96 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1326 13 1
"3502" "exp3" 2 97 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 2464 0 0
"3502" "exp3" 2 98 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1493 0 0
"3502" "exp3" 2 99 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 895 0 0
"3502" "exp3" 2 100 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2229 0 0
"3502" "exp3" 2 101 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 932 0 0
"3502" "exp3" 2 102 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 2913 61 1
"3502" "exp3" 2 103 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1089 0 0
"3502" "exp3" 2 104 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 3222 29 1
"3502" "exp3" 2 105 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1978 18 1
"3502" "exp3" 2 106 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1083 0 0
"3502" "exp3" 2 107 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 6452 78 1
"3502" "exp3" 2 108 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2158 0 0
"3502" "exp3" 2 109 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 2182 85 1
"3502" "exp3" 2 110 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 1026 0 0
"3502" "exp3" 2 111 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 2921 0 0
"3502" "exp3" 2 112 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 5819 0 0
"3502" "exp3" 2 113 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1404 21 1
"3502" "exp3" 2 114 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1241 0 0
"3502" "exp3" 2 115 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 3715 0 0
"3502" "exp3" 2 116 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 3485 31 1
"3502" "exp3" 2 117 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1742 0 0
"3502" "exp3" 2 118 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2153 39 1
"3502" "exp3" 2 119 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1016 0 0
"3502" "exp3" 2 120 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1186 95 1
"3502" "exp3" 2 121 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1879 65 1
"3502" "exp3" 2 122 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1052 0 0
"3502" "exp3" 2 123 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1614 47 1
"3502" "exp3" 2 124 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1833 64 1
"3502" "exp3" 2 125 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 2001 34 1
"3502" "exp3" 2 126 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 2149 75 1
"3502" "exp3" 2 127 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 2005 32 1
"3502" "exp3" 2 128 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1043 0 0
"3502" "exp3" 2 129 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 3898 0 0
"3502" "exp3" 2 130 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1470 25 1
"3502" "exp3" 2 131 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2370 0 0
"3502" "exp3" 2 132 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1702 81 1
"3502" "exp3" 1 1 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1000 0 0
"3502" "exp3" 1 2 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1160 29 1
"3502" "exp3" 1 3 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1225 0 0
"3502" "exp3" 1 4 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1826 0 0
"3502" "exp3" 1 5 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1176 49 1
"3502" "exp3" 1 6 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2219 17 1
"3502" "exp3" 1 7 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1210 37 1
"3502" "exp3" 1 8 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1059 0 0
"3502" "exp3" 1 9 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 957 46 1
"3502" "exp3" 1 10 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 963 21 1
"3502" "exp3" 1 11 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1030 87 1
"3502" "exp3" 1 12 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 818 25 1
"3502" "exp3" 1 13 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1126 38 1
"3502" "exp3" 1 14 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 708 0 0
"3502" "exp3" 1 15 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 706 0 0
"3502" "exp3" 1 16 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1193 0 0
"3502" "exp3" 1 17 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2648 0 0
"3502" "exp3" 1 18 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1037 27 1
"3502" "exp3" 1 19 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 949 0 0
"3502" "exp3" 1 20 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 811 0 0
"3502" "exp3" 1 21 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1088 40 1
"3502" "exp3" 1 22 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 916 0 0
"3502" "exp3" 1 23 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1710 16 1
"3502" "exp3" 1 24 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 947 0 0
"3502" "exp3" 1 25 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 916 0 0
"3502" "exp3" 1 26 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 817 0 0
"3502" "exp3" 1 27 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1215 23 1
"3502" "exp3" 1 28 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 948 40 1
"3502" "exp3" 1 29 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1068 0 0
"3502" "exp3" 1 30 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 758 79 1
"3502" "exp3" 1 31 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 823 33 1
"3502" "exp3" 1 32 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1011 0 0
"3502" "exp3" 1 33 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 807 45 1
"3502" "exp3" 1 34 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 832 25 1
"3502" "exp3" 1 35 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 813 0 0
"3502" "exp3" 1 36 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1261 0 0
"3502" "exp3" 1 37 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 967 0 0
"3502" "exp3" 1 38 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1264 30 1
"3502" "exp3" 1 39 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1037 0 0
"3502" "exp3" 1 40 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 2639 0 0
"3502" "exp3" 1 41 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 945 0 0
"3502" "exp3" 1 42 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1244 36 1
"3502" "exp3" 1 43 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1303 0 0
"3502" "exp3" 1 44 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1679 77 1
"3502" "exp3" 1 45 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 963 31 1
"3502" "exp3" 1 46 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1280 0 0
"3502" "exp3" 1 47 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1009 22 1
"3502" "exp3" 1 48 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1000 0 0
"3502" "exp3" 1 49 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 919 34 1
"3502" "exp3" 1 50 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1034 0 0
"3502" "exp3" 1 51 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1492 0 0
"3502" "exp3" 1 52 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 710 0 0
"3502" "exp3" 1 53 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 977 18 1
"3502" "exp3" 1 54 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 970 31 1
"3502" "exp3" 1 55 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 909 0 0
"3502" "exp3" 1 56 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 707 95 1
"3502" "exp3" 1 57 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1590 0 0
"3502" "exp3" 1 58 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1322 0 0
"3502" "exp3" 1 59 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 920 0 0
"3502" "exp3" 1 60 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 941 24 1
"3502" "exp3" 1 61 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 696 0 0
"3502" "exp3" 1 62 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 764 35 1
"3502" "exp3" 1 63 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 666 18 1
"3502" "exp3" 1 64 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 712 0 0
"3502" "exp3" 1 65 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 900 17 1
"3502" "exp3" 1 66 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 670 0 0
"3502" "exp3" 1 67 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 826 41 1
"3502" "exp3" 1 68 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 733 0 0
"3502" "exp3" 1 69 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1105 0 0
"3502" "exp3" 1 70 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1008 0 0
"3502" "exp3" 1 71 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1151 0 0
"3502" "exp3" 1 72 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 740 0 0
"3502" "exp3" 1 73 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1112 72 1
"3502" "exp3" 1 74 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 795 0 0
"3502" "exp3" 1 75 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1182 44 1
"3502" "exp3" 1 76 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 685 77 1
"3502" "exp3" 1 77 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1049 0 0
"3502" "exp3" 1 78 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1313 0 0
"3502" "exp3" 1 79 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1681 13 1
"3502" "exp3" 1 80 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1266 23 1
"3502" "exp3" 1 81 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 921 0 0
"3502" "exp3" 1 82 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1766 0 0
"3502" "exp3" 1 83 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1889 0 0
"3502" "exp3" 1 84 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1432 0 0
"3502" "exp3" 1 85 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 809 81 1
"3502" "exp3" 1 86 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1286 0 0
"3502" "exp3" 1 87 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 757 21 1
"3502" "exp3" 1 88 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 761 0 0
"3502" "exp3" 1 89 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 936 0 0
"3502" "exp3" 1 90 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1136 0 0
"3502" "exp3" 1 91 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 753 76 1
"3502" "exp3" 1 92 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 890 89 1
"3502" "exp3" 1 93 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 773 0 0
"3502" "exp3" 1 94 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 865 26 1
"3502" "exp3" 1 95 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1146 0 0
"3502" "exp3" 1 96 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1063 19 1
"3502" "exp3" 1 97 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 849 45 1
"3502" "exp3" 1 98 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 732 28 1
"3502" "exp3" 1 99 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 644 0 0
"3502" "exp3" 1 100 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1004 22 1
"3502" "exp3" 1 101 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 587 0 0
"3502" "exp3" 1 102 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1565 0 0
"3502" "exp3" 1 103 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1551 70 1
"3502" "exp3" 1 104 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 796 0 0
"3502" "exp3" 1 105 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1056 0 0
"3502" "exp3" 1 106 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1120 29 1
"3502" "exp3" 1 107 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 822 0 0
"3502" "exp3" 1 108 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 657 0 0
"3502" "exp3" 1 109 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 798 78 1
"3502" "exp3" 1 110 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 806 0 0
"3502" "exp3" 1 111 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 777 35 1
"3502" "exp3" 1 112 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 754 85 1
"3502" "exp3" 1 113 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 756 0 0
"3502" "exp3" 1 114 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 756 0 0
"3502" "exp3" 1 115 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 666 80 1
"3502" "exp3" 1 116 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 598 0 0
"3502" "exp3" 1 117 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 690 0 0
"3502" "exp3" 1 118 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 907 0 0
"3502" "exp3" 1 119 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 873 0 0
"3502" "exp3" 1 120 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1566 0 0
"3502" "exp3" 1 121 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 700 0 0
"3502" "exp3" 1 122 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 780 0 0
"3502" "exp3" 1 123 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 759 32 1
"3502" "exp3" 1 124 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 909 0 0
"3502" "exp3" 1 125 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 1095 68 1
"3502" "exp3" 1 126 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 2229 0 0
"3502" "exp3" 1 127 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 951 79 1
"3502" "exp3" 1 128 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 748 0 0
"3502" "exp3" 1 129 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 753 15 1
"3502" "exp3" 1 130 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 931 84 1
"3502" "exp3" 1 131 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 878 37 1
"3502" "exp3" 1 132 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 734 0 0
"3502" "exp3" 2 1 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 812 0 0
"3502" "exp3" 2 2 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 892 0 0
"3502" "exp3" 2 3 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 889 0 0
"3502" "exp3" 2 4 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 884 28 1
"3502" "exp3" 2 5 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 947 13 1
"3502" "exp3" 2 6 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 921 0 0
"3502" "exp3" 2 7 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1067 36 1
"3502" "exp3" 2 8 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1221 0 0
"3502" "exp3" 2 9 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1230 19 1
"3502" "exp3" 2 10 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 689 0 0
"3502" "exp3" 2 11 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 744 73 1
"3502" "exp3" 2 12 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1357 0 0
"3502" "exp3" 2 13 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 855 0 0
"3502" "exp3" 2 14 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1028 27 1
"3502" "exp3" 2 15 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1265 49 1
"3502" "exp3" 2 16 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 930 23 1
"3502" "exp3" 2 17 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 929 38 1
"3502" "exp3" 2 18 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 972 74 1
"3502" "exp3" 2 19 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 887 0 0
"3502" "exp3" 2 20 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 813 0 0
"3502" "exp3" 2 21 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 779 0 0
"3502" "exp3" 2 22 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 747 28 1
"3502" "exp3" 2 23 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 983 23 1
"3502" "exp3" 2 24 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 647 89 1
"3502" "exp3" 2 25 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 969 21 1
"3502" "exp3" 2 26 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 954 15 1
"3502" "exp3" 2 27 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 715 0 0
"3502" "exp3" 2 28 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 785 69 1
"3502" "exp3" 2 29 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 714 0 0
"3502" "exp3" 2 30 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1093 29 1
"3502" "exp3" 2 31 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 865 20 1
"3502" "exp3" 2 32 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 838 21 1
"3502" "exp3" 2 33 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 882 0 0
"3502" "exp3" 2 34 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 788 42 1
"3502" "exp3" 2 35 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 795 0 0
"3502" "exp3" 2 36 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1248 14 1
"3502" "exp3" 2 37 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1015 0 0
"3502" "exp3" 2 38 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1138 0 0
"3502" "exp3" 2 39 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1136 0 0
"3502" "exp3" 2 40 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1645 0 0
"3502" "exp3" 2 41 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1946 0 0
"3502" "exp3" 2 42 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1729 25 1
"3502" "exp3" 2 43 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1258 34 1
"3502" "exp3" 2 44 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 905 0 0
"3502" "exp3" 2 45 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 754 0 0
"3502" "exp3" 2 46 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1249 0 0
"3502" "exp3" 2 47 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 910 36 1
"3502" "exp3" 2 48 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1281 43 1
"3502" "exp3" 2 49 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 893 0 0
"3502" "exp3" 2 50 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1298 0 0
"3502" "exp3" 2 51 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 923 0 0
"3502" "exp3" 2 52 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1185 0 0
"3502" "exp3" 2 53 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1356 33 1
"3502" "exp3" 2 54 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1059 40 1
"3502" "exp3" 2 55 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1089 41 1
"3502" "exp3" 2 56 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 910 0 0
"3502" "exp3" 2 57 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 2805 0 0
"3502" "exp3" 2 58 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1021 0 0
"3502" "exp3" 2 59 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1157 0 0
"3502" "exp3" 2 60 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 702 84 1
"3502" "exp3" 2 61 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1094 0 0
"3502" "exp3" 2 62 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2063 0 0
"3502" "exp3" 2 63 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 921 0 0
"3502" "exp3" 2 64 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1028 0 0
"3502" "exp3" 2 65 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1966 17 1
"3502" "exp3" 2 66 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1293 0 0
"3502" "exp3" 2 67 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 926 81 1
"3502" "exp3" 2 68 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 979 0 0
"3502" "exp3" 2 69 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 996 26 1
"3502" "exp3" 2 70 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 979 0 0
"3502" "exp3" 2 71 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 914 0 0
"3502" "exp3" 2 72 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 947 17 1
"3502" "exp3" 2 73 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1316 0 0
"3502" "exp3" 2 74 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 772 0 0
"3502" "exp3" 2 75 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 912 0 0
"3502" "exp3" 2 76 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 2488 74 1
"3502" "exp3" 2 77 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1060 26 1
"3502" "exp3" 2 78 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1015 0 0
"3502" "exp3" 2 79 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 962 79 1
"3502" "exp3" 2 80 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 810 0 0
"3502" "exp3" 2 81 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 888 16 1
"3502" "exp3" 2 82 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 956 0 0
"3502" "exp3" 2 83 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 804 0 0
"3502" "exp3" 2 84 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 816 0 0
"3502" "exp3" 2 85 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1230 0 0
"3502" "exp3" 2 86 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1232 0 0
"3502" "exp3" 2 87 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1100 32 1
"3502" "exp3" 2 88 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 879 30 1
"3502" "exp3" 2 89 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 999 86 1
"3502" "exp3" 2 90 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1044 46 1
"3502" "exp3" 2 91 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1193 42 1
"3502" "exp3" 2 92 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 2080 67 1
"3502" "exp3" 2 93 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 923 0 0
"3502" "exp3" 2 94 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1842 35 1
"3502" "exp3" 2 95 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 950 37 1
"3502" "exp3" 2 96 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 935 43 1
"3502" "exp3" 2 97 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 926 0 0
"3502" "exp3" 2 98 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 711 0 0
"3502" "exp3" 2 99 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 819 22 1
"3502" "exp3" 2 100 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1038 70 1
"3502" "exp3" 2 101 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 923 0 0
"3502" "exp3" 2 102 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 960 19 1
"3502" "exp3" 2 103 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1907 0 0
"3502" "exp3" 2 104 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 844 0 0
"3502" "exp3" 2 105 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 869 44 1
"3502" "exp3" 2 106 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 905 40 1
"3502" "exp3" 2 107 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 972 0 0
"3502" "exp3" 2 108 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 941 0 0
"3502" "exp3" 2 109 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1251 78 1
"3502" "exp3" 2 110 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 981 18 1
"3502" "exp3" 2 111 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 1222 0 0
"3502" "exp3" 2 112 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1483 24 1
"3502" "exp3" 2 113 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1546 0 0
"3502" "exp3" 2 114 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 801 0 0
"3502" "exp3" 2 115 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1137 0 0
"3502" "exp3" 2 116 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1140 0 0
"3502" "exp3" 2 117 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1381 24 1
"3502" "exp3" 2 118 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1113 0 0
"3502" "exp3" 2 119 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 839 38 1
"3502" "exp3" 2 120 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 884 0 0
"3502" "exp3" 2 121 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 991 0 0
"3502" "exp3" 2 122 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 876 71 1
"3502" "exp3" 2 123 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 831 0 0
"3502" "exp3" 2 124 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1088 31 1
"3502" "exp3" 2 125 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 661 0 0
"3502" "exp3" 2 126 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 611 92 1
"3502" "exp3" 2 127 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 818 25 1
"3502" "exp3" 2 128 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 674 0 0
"3502" "exp3" 2 129 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1214 18 1
"3502" "exp3" 2 130 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1085 0 0
"3502" "exp3" 2 131 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1156 27 1
"3502" "exp3" 2 132 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 853 0 0
"3502" "exp3" 1 1 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1618 0 0
"3502" "exp3" 1 2 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2319 72 1
"3502" "exp3" 1 3 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2739 0 0
"3502" "exp3" 1 4 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1725 0 0
"3502" "exp3" 1 5 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 3173 0 0
"3502" "exp3" 1 6 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 3484 25 1
"3502" "exp3" 1 7 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1969 24 1
"3502" "exp3" 1 8 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 4850 0 0
"3502" "exp3" 1 9 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 3668 27 1
"3502" "exp3" 1 10 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3859 65 1
"3502" "exp3" 1 11 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 2057 0 0
"3502" "exp3" 1 12 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1165 91 1
"3502" "exp3" 1 13 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 3901 0 0
"3502" "exp3" 1 14 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 3349 0 0
"3502" "exp3" 1 15 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 2669 17 1
"3502" "exp3" 1 16 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 4907 0 0
"3502" "exp3" 1 17 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2355 75 1
"3502" "exp3" 1 18 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1752 23 1
"3502" "exp3" 1 19 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 4187 44 1
"3502" "exp3" 1 20 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1858 0 0
"3502" "exp3" 1 21 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 4722 0 0
"3502" "exp3" 1 22 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 2300 0 0
"3502" "exp3" 1 23 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 2788 0 0
"3502" "exp3" 1 24 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1763 16 1
"3502" "exp3" 1 25 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1219 0 0
"3502" "exp3" 1 26 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 985 0 0
"3502" "exp3" 1 27 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2817 39 1
"3502" "exp3" 1 28 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1738 14 1
"3502" "exp3" 1 29 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 4679 30 1
"3502" "exp3" 1 30 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1520 35 1
"3502" "exp3" 1 31 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 3681 0 0
"3502" "exp3" 1 32 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1350 20 1
"3502" "exp3" 1 33 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1159 22 1
"3502" "exp3" 1 34 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 922 0 0
"3502" "exp3" 1 35 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1172 18 1
"3502" "exp3" 1 36 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 2664 0 0
"3502" "exp3" 1 37 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2215 48 1
"3502" "exp3" 1 38 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 2311 17 1
"3502" "exp3" 1 39 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 5664 0 0
"3502" "exp3" 1 40 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2965 0 0
"3502" "exp3" 1 41 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1449 0 0
"3502" "exp3" 1 42 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1261 0 0
"3502" "exp3" 1 43 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1601 0 0
"3502" "exp3" 1 44 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1201 0 0
"3502" "exp3" 1 45 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1975 0 0
"3502" "exp3" 1 46 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 3992 33 1
"3502" "exp3" 1 47 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1694 82 1
"3502" "exp3" 1 48 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2271 0 0
"3502" "exp3" 1 49 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1720 42 1
"3502" "exp3" 1 50 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 2343 18 1
"3502" "exp3" 1 51 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2619 40 1
"3502" "exp3" 1 52 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1807 31 1
"3502" "exp3" 1 53 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 3071 23 1
"3502" "exp3" 1 54 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 8366 0 0
"3502" "exp3" 1 55 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 2939 0 0
"3502" "exp3" 1 56 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2543 44 1
"3502" "exp3" 1 57 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1665 0 0
"3502" "exp3" 1 58 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1960 38 1
"3502" "exp3" 1 59 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1253 80 1
"3502" "exp3" 1 60 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 3147 0 0
"3502" "exp3" 1 61 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1185 0 0
"3502" "exp3" 1 62 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2205 0 0
"3502" "exp3" 1 63 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1065 0 0
"3502" "exp3" 1 64 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 2075 0 0
"3502" "exp3" 1 65 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 2079 45 1
"3502" "exp3" 1 66 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1596 39 1
"3502" "exp3" 1 67 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1735 15 1
"3502" "exp3" 1 68 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1736 23 1
"3502" "exp3" 1 69 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1648 0 0
"3502" "exp3" 1 70 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1047 0 0
"3502" "exp3" 1 71 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 7029 47 1
"3502" "exp3" 1 72 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2101 73 1
"3502" "exp3" 1 73 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 977 0 0
"3502" "exp3" 1 74 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1276 67 1
"3502" "exp3" 1 75 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1400 36 1
"3502" "exp3" 1 76 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 970 0 0
"3502" "exp3" 1 77 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1067 0 0
"3502" "exp3" 1 78 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1084 0 0
"3502" "exp3" 1 79 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2207 43 1
"3502" "exp3" 1 80 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1258 30 1
"3502" "exp3" 1 81 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1360 42 1
"3502" "exp3" 1 82 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1315 0 0
"3502" "exp3" 1 83 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2342 0 0
"3502" "exp3" 1 84 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 5985 0 0
"3502" "exp3" 1 85 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1999 0 0
"3502" "exp3" 1 86 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 995 96 1
"3502" "exp3" 1 87 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 2625 0 0
"3502" "exp3" 1 88 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1551 22 1
"3502" "exp3" 1 89 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2894 40 1
"3502" "exp3" 1 90 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 2542 33 1
"3502" "exp3" 1 91 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1044 0 0
"3502" "exp3" 1 92 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1308 0 0
"3502" "exp3" 1 93 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1127 0 0
"3502" "exp3" 1 94 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1773 0 0
"3502" "exp3" 1 95 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 767 25 1
"3502" "exp3" 1 96 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1159 43 1
"3502" "exp3" 1 97 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1084 0 0
"3502" "exp3" 1 98 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 4024 28 1
"3502" "exp3" 1 99 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 992 0 0
"3502" "exp3" 1 100 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1339 71 1
"3502" "exp3" 1 101 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1231 0 0
"3502" "exp3" 1 102 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1059 0 0
"3502" "exp3" 1 103 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 917 21 1
"3502" "exp3" 1 104 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1519 24 1
"3502" "exp3" 1 105 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 2935 0 0
"3502" "exp3" 1 106 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 5241 34 1
"3502" "exp3" 1 107 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 834 0 0
"3502" "exp3" 1 108 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1835 83 1
"3502" "exp3" 1 109 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1793 29 1
"3502" "exp3" 1 110 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1150 19 1
"3502" "exp3" 1 111 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1048 70 1
"3502" "exp3" 1 112 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1123 27 1
"3502" "exp3" 1 113 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1045 34 1
"3502" "exp3" 1 114 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1103 0 0
"3502" "exp3" 1 115 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 959 26 1
"3502" "exp3" 1 116 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1313 77 1
"3502" "exp3" 1 117 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1141 0 0
"3502" "exp3" 1 118 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 995 0 0
"3502" "exp3" 1 119 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 890 92 1
"3502" "exp3" 1 120 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1031 0 0
"3502" "exp3" 1 121 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1295 14 1
"3502" "exp3" 1 122 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 3623 20 1
"3502" "exp3" 1 123 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1728 0 0
"3502" "exp3" 1 124 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 4132 66 1
"3502" "exp3" 1 125 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1031 32 1
"3502" "exp3" 1 126 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1806 0 0
"3502" "exp3" 1 127 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1339 0 0
"3502" "exp3" 1 128 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1289 0 0
"3502" "exp3" 1 129 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1058 0 0
"3502" "exp3" 1 130 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 3831 0 0
"3502" "exp3" 1 131 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 841 0 0
"3502" "exp3" 1 132 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1037 0 0
"3502" "exp3" 2 1 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1112 20 1
"3502" "exp3" 2 2 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1111 31 1
"3502" "exp3" 2 3 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1721 25 1
"3502" "exp3" 2 4 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 858 0 0
"3502" "exp3" 2 5 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 810 73 1
"3502" "exp3" 2 6 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 887 0 0
"3502" "exp3" 2 7 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 887 0 0
"3502" "exp3" 2 8 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 3346 46 1
"3502" "exp3" 2 9 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 915 0 0
"3502" "exp3" 2 10 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1609 0 0
"3502" "exp3" 2 11 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 728 0 0
"3502" "exp3" 2 12 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 771 96 1
"3502" "exp3" 2 13 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 938 18 1
"3502" "exp3" 2 14 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1463 44 1
"3502" "exp3" 2 15 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1331 41 1
"3502" "exp3" 2 16 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1325 76 1
"3502" "exp3" 2 17 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1382 23 1
"3502" "exp3" 2 18 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1297 0 0
"3502" "exp3" 2 19 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2281 0 0
"3502" "exp3" 2 20 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1099 0 0
"3502" "exp3" 2 21 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1619 39 1
"3502" "exp3" 2 22 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 2472 0 0
"3502" "exp3" 2 23 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1308 30 1
"3502" "exp3" 2 24 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1578 0 0
"3502" "exp3" 2 25 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1056 32 1
"3502" "exp3" 2 26 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 845 89 1
"3502" "exp3" 2 27 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 2833 42 1
"3502" "exp3" 2 28 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 3066 87 1
"3502" "exp3" 2 29 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1022 89 1
"3502" "exp3" 2 30 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 969 0 0
"3502" "exp3" 2 31 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1486 0 0
"3502" "exp3" 2 32 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1669 29 1
"3502" "exp3" 2 33 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 837 0 0
"3502" "exp3" 2 34 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1197 0 0
"3502" "exp3" 2 35 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1170 0 0
"3502" "exp3" 2 36 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 899 0 0
"3502" "exp3" 2 37 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1301 44 1
"3502" "exp3" 2 38 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1175 0 0
"3502" "exp3" 2 39 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 6152 0 0
"3502" "exp3" 2 40 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1480 0 0
"3502" "exp3" 2 41 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2132 24 1
"3502" "exp3" 2 42 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1578 13 1
"3502" "exp3" 2 43 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1855 25 1
"3502" "exp3" 2 44 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1018 0 0
"3502" "exp3" 2 45 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 886 0 0
"3502" "exp3" 2 46 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2440 0 0
"3502" "exp3" 2 47 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 2856 0 0
"3502" "exp3" 2 48 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 3031 33 1
"3502" "exp3" 2 49 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 6950 0 0
"3502" "exp3" 2 50 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1744 85 1
"3502" "exp3" 2 51 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1679 19 1
"3502" "exp3" 2 52 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 4103 20 1
"3502" "exp3" 2 53 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1290 0 0
"3502" "exp3" 2 54 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1063 37 1
"3502" "exp3" 2 55 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 971 19 1
"3502" "exp3" 2 56 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 950 0 0
"3502" "exp3" 2 57 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 885 0 0
"3502" "exp3" 2 58 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1177 80 1
"3502" "exp3" 2 59 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 739 71 1
"3502" "exp3" 2 60 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2662 0 0
"3502" "exp3" 2 61 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 9820 37 1
"3502" "exp3" 2 62 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 4180 0 0
"3502" "exp3" 2 63 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 2054 0 0
"3502" "exp3" 2 64 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3126 65 1
"3502" "exp3" 2 65 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1037 22 1
"3502" "exp3" 2 66 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2324 16 1
"3502" "exp3" 2 67 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 984 80 1
"3502" "exp3" 2 68 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1470 0 0
"3502" "exp3" 2 69 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 3683 22 1
"3502" "exp3" 2 70 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 2518 0 0
"3502" "exp3" 2 71 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1865 36 1
"3502" "exp3" 2 72 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1568 0 0
"3502" "exp3" 2 73 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1229 0 0
"3502" "exp3" 2 74 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1533 0 0
"3502" "exp3" 2 75 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2748 0 0
"3502" "exp3" 2 76 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 2404 0 0
"3502" "exp3" 2 77 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1400 21 1
"3502" "exp3" 2 78 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2627 0 0
"3502" "exp3" 2 79 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 2857 69 1
"3502" "exp3" 2 80 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1844 28 1
"3502" "exp3" 2 81 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1495 33 1
"3502" "exp3" 2 82 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 3644 30 1
"3502" "exp3" 2 83 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1206 0 0
"3502" "exp3" 2 84 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1291 15 1
"3502" "exp3" 2 85 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1946 78 1
"3502" "exp3" 2 86 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1448 0 0
"3502" "exp3" 2 87 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 883 0 0
"3502" "exp3" 2 88 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1274 0 0
"3502" "exp3" 2 89 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1099 0 0
"3502" "exp3" 2 90 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 4227 0 0
"3502" "exp3" 2 91 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 986 77 1
"3502" "exp3" 2 92 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 838 67 1
"3502" "exp3" 2 93 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 808 0 0
"3502" "exp3" 2 94 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 699 17 1
"3502" "exp3" 2 95 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2101 0 0
"3502" "exp3" 2 96 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1498 48 1
"3502" "exp3" 2 97 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1415 42 1
"3502" "exp3" 2 98 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1272 98 1
"3502" "exp3" 2 99 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1534 0 0
"3502" "exp3" 2 100 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 7140 29 1
"3502" "exp3" 2 101 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1148 0 0
"3502" "exp3" 2 102 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 906 26 1
"3502" "exp3" 2 103 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 3438 47 1
"3502" "exp3" 2 104 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1620 68 1
"3502" "exp3" 2 105 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2585 34 1
"3502" "exp3" 2 106 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2811 0 0
"3502" "exp3" 2 107 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1500 45 1
"3502" "exp3" 2 108 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1018 0 0
"3502" "exp3" 2 109 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 910 0 0
"3502" "exp3" 2 110 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 966 0 0
"3502" "exp3" 2 111 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1290 28 1
"3502" "exp3" 2 112 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1144 70 1
"3502" "exp3" 2 113 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1486 0 0
"3502" "exp3" 2 114 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 940 71 1
"3502" "exp3" 2 115 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1037 18 1
"3502" "exp3" 2 116 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1178 14 1
"3502" "exp3" 2 117 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1129 0 0
"3502" "exp3" 2 118 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1178 35 1
"3502" "exp3" 2 119 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1097 34 1
"3502" "exp3" 2 120 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1089 27 1
"3502" "exp3" 2 121 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1984 0 0
"3502" "exp3" 2 122 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1372 0 0
"3502" "exp3" 2 123 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 994 0 0
"3502" "exp3" 2 124 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1151 32 1
"3502" "exp3" 2 125 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2171 0 0
"3502" "exp3" 2 126 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 2185 88 1
"3502" "exp3" 2 127 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1477 40 1
"3502" "exp3" 2 128 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 953 36 1
"3502" "exp3" 2 129 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 3007 24 1
"3502" "exp3" 2 130 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1505 26 1
"3502" "exp3" 2 131 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1400 0 0
"3502" "exp3" 2 132 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 2142 28 1
"3502" "exp3" 1 1 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2044 0 0
"3502" "exp3" 1 2 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1282 0 0
"3502" "exp3" 1 3 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 3312 0 0
"3502" "exp3" 1 4 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 3834 42 1
"3502" "exp3" 1 5 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 3934 69 1
"3502" "exp3" 1 6 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1278 0 0
"3502" "exp3" 1 7 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1361 17 1
"3502" "exp3" 1 8 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1411 19 1
"3502" "exp3" 1 9 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 896 98 1
"3502" "exp3" 1 10 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 952 0 0
"3502" "exp3" 1 11 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1777 0 0
"3502" "exp3" 1 12 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 2434 38 1
"3502" "exp3" 1 13 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1777 0 0
"3502" "exp3" 1 14 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1190 0 0
"3502" "exp3" 1 15 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2952 41 1
"3502" "exp3" 1 16 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1631 70 1
"3502" "exp3" 1 17 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 3116 42 1
"3502" "exp3" 1 18 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2826 45 1
"3502" "exp3" 1 19 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 3843 37 1
"3502" "exp3" 1 20 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1434 23 1
"3502" "exp3" 1 21 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 1657 75 1
"3502" "exp3" 1 22 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1968 0 0
"3502" "exp3" 1 23 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 3134 28 1
"3502" "exp3" 1 24 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1901 31 1
"3502" "exp3" 1 25 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 2872 77 1
"3502" "exp3" 1 26 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1290 81 1
"3502" "exp3" 1 27 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 2475 78 1
"3502" "exp3" 1 28 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1690 0 0
"3502" "exp3" 1 29 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1322 0 0
"3502" "exp3" 1 30 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1416 31 1
"3502" "exp3" 1 31 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1092 17 1
"3502" "exp3" 1 32 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1930 0 0
"3502" "exp3" 1 33 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2481 0 0
"3502" "exp3" 1 34 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1258 0 0
"3502" "exp3" 1 35 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1796 69 1
"3502" "exp3" 1 36 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 992 0 0
"3502" "exp3" 1 37 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 5508 44 1
"3502" "exp3" 1 38 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1632 0 0
"3502" "exp3" 1 39 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 3052 44 1
"3502" "exp3" 1 40 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1898 43 1
"3502" "exp3" 1 41 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1296 0 0
"3502" "exp3" 1 42 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1838 64 1
"3502" "exp3" 1 43 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1754 86 1
"3502" "exp3" 1 44 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1379 0 0
"3502" "exp3" 1 45 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 3871 33 1
"3502" "exp3" 1 46 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1707 0 0
"3502" "exp3" 1 47 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1411 88 1
"3502" "exp3" 1 48 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1367 0 0
"3502" "exp3" 1 49 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1157 24 1
"3502" "exp3" 1 50 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1223 0 0
"3502" "exp3" 1 51 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1043 0 0
"3502" "exp3" 1 52 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 3688 63 1
"3502" "exp3" 1 53 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1583 29 1
"3502" "exp3" 1 54 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1211 0 0
"3502" "exp3" 1 55 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1194 16 1
"3502" "exp3" 1 56 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2975 0 0
"3502" "exp3" 1 57 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1185 76 1
"3502" "exp3" 1 58 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1318 34 1
"3502" "exp3" 1 59 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2562 20 1
"3502" "exp3" 1 60 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1454 85 1
"3502" "exp3" 1 61 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2594 48 1
"3502" "exp3" 1 62 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1574 0 0
"3502" "exp3" 1 63 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1577 21 1
"3502" "exp3" 1 64 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1561 0 0
"3502" "exp3" 1 65 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2427 22 1
"3502" "exp3" 1 66 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1714 0 0
"3502" "exp3" 1 67 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 2077 32 1
"3502" "exp3" 1 68 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1213 73 1
"3502" "exp3" 1 69 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1057 0 0
"3502" "exp3" 1 70 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1545 0 0
"3502" "exp3" 1 71 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 2661 0 0
"3502" "exp3" 1 72 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1627 0 0
"3502" "exp3" 1 73 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 3043 0 0
"3502" "exp3" 1 74 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1620 24 1
"3502" "exp3" 1 75 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1145 0 0
"3502" "exp3" 1 76 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2627 0 0
"3502" "exp3" 1 77 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1927 0 0
"3502" "exp3" 1 78 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2553 67 1
"3502" "exp3" 1 79 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1446 0 0
"3502" "exp3" 1 80 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 3499 0 0
"3502" "exp3" 1 81 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1364 0 0
"3502" "exp3" 1 82 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1335 0 0
"3502" "exp3" 1 83 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2292 27 1
"3502" "exp3" 1 84 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1516 0 0
"3502" "exp3" 1 85 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1191 0 0
"3502" "exp3" 1 86 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2884 33 1
"3502" "exp3" 1 87 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1650 0 0
"3502" "exp3" 1 88 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2468 38 1
"3502" "exp3" 1 89 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1222 0 0
"3502" "exp3" 1 90 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2160 18 1
"3502" "exp3" 1 91 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1624 0 0
"3502" "exp3" 1 92 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 4069 0 0
"3502" "exp3" 1 93 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1881 70 1
"3502" "exp3" 1 94 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1238 25 1
"3502" "exp3" 1 95 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1648 23 1
"3502" "exp3" 1 96 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1407 78 1
"3502" "exp3" 1 97 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1651 32 1
"3502" "exp3" 1 98 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2440 0 0
"3502" "exp3" 1 99 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 974 0 0
"3502" "exp3" 1 100 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2197 43 1
"3502" "exp3" 1 101 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 2473 26 1
"3502" "exp3" 1 102 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1341 22 1
"3502" "exp3" 1 103 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 2114 83 1
"3502" "exp3" 1 104 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2116 0 0
"3502" "exp3" 1 105 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1750 0 0
"3502" "exp3" 1 106 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1843 0 0
"3502" "exp3" 1 107 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2631 27 1
"3502" "exp3" 1 108 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 4189 0 0
"3502" "exp3" 1 109 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 2061 0 0
"3502" "exp3" 1 110 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 2525 92 1
"3502" "exp3" 1 111 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1924 20 1
"3502" "exp3" 1 112 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 5933 39 1
"3502" "exp3" 1 113 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1082 0 0
"3502" "exp3" 1 114 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1004 0 0
"3502" "exp3" 1 115 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1615 36 1
"3502" "exp3" 1 116 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 2634 0 0
"3502" "exp3" 1 117 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 1876 0 0
"3502" "exp3" 1 118 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 2023 0 0
"3502" "exp3" 1 119 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1126 0 0
"3502" "exp3" 1 120 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1435 75 1
"3502" "exp3" 1 121 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1758 35 1
"3502" "exp3" 1 122 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 4288 49 1
"3502" "exp3" 1 123 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1753 30 1
"3502" "exp3" 1 124 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2437 19 1
"3502" "exp3" 1 125 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 4398 34 1
"3502" "exp3" 1 126 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1124 0 0
"3502" "exp3" 1 127 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1622 13 1
"3502" "exp3" 1 128 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1153 0 0
"3502" "exp3" 1 129 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1269 25 1
"3502" "exp3" 1 130 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2783 0 0
"3502" "exp3" 1 131 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 2414 68 1
"3502" "exp3" 1 132 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1709 21 1
"3502" "exp3" 2 1 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2328 0 0
"3502" "exp3" 2 2 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1701 0 0
"3502" "exp3" 2 3 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1756 0 0
"3502" "exp3" 2 4 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1199 26 1
"3502" "exp3" 2 5 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1339 0 0
"3502" "exp3" 2 6 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2038 0 0
"3502" "exp3" 2 7 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1137 0 0
"3502" "exp3" 2 8 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1430 30 1
"3502" "exp3" 2 9 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1524 0 0
"3502" "exp3" 2 10 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 2587 65 1
"3502" "exp3" 2 11 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1126 0 0
"3502" "exp3" 2 12 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 2661 0 0
"3502" "exp3" 2 13 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1198 19 1
"3502" "exp3" 2 14 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 3635 37 1
"3502" "exp3" 2 15 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1143 16 1
"3502" "exp3" 2 16 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 2056 72 1
"3502" "exp3" 2 17 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2238 0 0
"3502" "exp3" 2 18 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1960 0 0
"3502" "exp3" 2 19 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2015 23 1
"3502" "exp3" 2 20 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1345 0 0
"3502" "exp3" 2 21 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 5548 0 0
"3502" "exp3" 2 22 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1262 18 1
"3502" "exp3" 2 23 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1579 25 1
"3502" "exp3" 2 24 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 2026 0 0
"3502" "exp3" 2 25 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 4404 0 0
"3502" "exp3" 2 26 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1789 0 0
"3502" "exp3" 2 27 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 2342 0 0
"3502" "exp3" 2 28 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1096 0 0
"3502" "exp3" 2 29 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1287 0 0
"3502" "exp3" 2 30 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1971 89 1
"3502" "exp3" 2 31 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 5861 0 0
"3502" "exp3" 2 32 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 2531 0 0
"3502" "exp3" 2 33 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1225 17 1
"3502" "exp3" 2 34 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 3526 47 1
"3502" "exp3" 2 35 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 4311 35 1
"3502" "exp3" 2 36 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1046 0 0
"3502" "exp3" 2 37 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1803 0 0
"3502" "exp3" 2 38 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1283 0 0
"3502" "exp3" 2 39 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 4504 18 1
"3502" "exp3" 2 40 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 3680 30 1
"3502" "exp3" 2 41 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2946 39 1
"3502" "exp3" 2 42 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2651 0 0
"3502" "exp3" 2 43 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1684 20 1
"3502" "exp3" 2 44 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1839 0 0
"3502" "exp3" 2 45 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1190 34 1
"3502" "exp3" 2 46 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1276 21 1
"3502" "exp3" 2 47 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1088 22 1
"3502" "exp3" 2 48 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1938 0 0
"3502" "exp3" 2 49 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2113 37 1
"3502" "exp3" 2 50 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1617 0 0
"3502" "exp3" 2 51 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1572 0 0
"3502" "exp3" 2 52 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2251 36 1
"3502" "exp3" 2 53 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2024 0 0
"3502" "exp3" 2 54 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2057 68 1
"3502" "exp3" 2 55 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 3269 0 0
"3502" "exp3" 2 56 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1414 32 1
"3502" "exp3" 2 57 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 3511 33 1
"3502" "exp3" 2 58 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1655 0 0
"3502" "exp3" 2 59 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1351 0 0
"3502" "exp3" 2 60 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 3060 41 1
"3502" "exp3" 2 61 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2102 28 1
"3502" "exp3" 2 62 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1414 0 0
"3502" "exp3" 2 63 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1386 29 1
"3502" "exp3" 2 64 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1344 28 1
"3502" "exp3" 2 65 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1548 82 1
"3502" "exp3" 2 66 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1498 79 1
"3502" "exp3" 2 67 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2550 0 0
"3502" "exp3" 2 68 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1322 0 0
"3502" "exp3" 2 69 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1236 85 1
"3502" "exp3" 2 70 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1841 74 1
"3502" "exp3" 2 71 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1229 92 1
"3502" "exp3" 2 72 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3116 67 1
"3502" "exp3" 2 73 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 3268 0 0
"3502" "exp3" 2 74 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1704 17 1
"3502" "exp3" 2 75 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1633 0 0
"3502" "exp3" 2 76 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1960 0 0
"3502" "exp3" 2 77 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1558 0 0
"3502" "exp3" 2 78 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1223 31 1
"3502" "exp3" 2 79 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1770 0 0
"3502" "exp3" 2 80 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1577 15 1
"3502" "exp3" 2 81 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1935 21 1
"3502" "exp3" 2 82 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1255 24 1
"3502" "exp3" 2 83 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1206 0 0
"3502" "exp3" 2 84 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1554 85 1
"3502" "exp3" 2 85 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1997 33 1
"3502" "exp3" 2 86 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2943 0 0
"3502" "exp3" 2 87 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1758 0 0
"3502" "exp3" 2 88 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 3493 63 1
"3502" "exp3" 2 89 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1525 64 1
"3502" "exp3" 2 90 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 3871 40 1
"3502" "exp3" 2 91 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 3865 40 1
"3502" "exp3" 2 92 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1132 14 1
"3502" "exp3" 2 93 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 3363 43 1
"3502" "exp3" 2 94 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 3174 25 1
"3502" "exp3" 2 95 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1652 34 1
"3502" "exp3" 2 96 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1487 0 0
"3502" "exp3" 2 97 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 939 0 0
"3502" "exp3" 2 98 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1363 0 0
"3502" "exp3" 2 99 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1122 81 1
"3502" "exp3" 2 100 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 5412 19 1
"3502" "exp3" 2 101 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2381 0 0
"3502" "exp3" 2 102 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1916 72 1
"3502" "exp3" 2 103 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1301 0 0
"3502" "exp3" 2 104 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 2052 0 0
"3502" "exp3" 2 105 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 3376 38 1
"3502" "exp3" 2 106 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1826 42 1
"3502" "exp3" 2 107 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2129 0 0
"3502" "exp3" 2 108 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1543 23 1
"3502" "exp3" 2 109 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1402 0 0
"3502" "exp3" 2 110 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1359 0 0
"3502" "exp3" 2 111 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1822 0 0
"3502" "exp3" 2 112 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1337 0 0
"3502" "exp3" 2 113 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 865 20 1
"3502" "exp3" 2 114 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1548 41 1
"3502" "exp3" 2 115 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 844 0 0
"3502" "exp3" 2 116 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1986 19 1
"3502" "exp3" 2 117 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1149 83 1
"3502" "exp3" 2 118 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1857 0 0
"3502" "exp3" 2 119 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2784 48 1
"3502" "exp3" 2 120 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2526 45 1
"3502" "exp3" 2 121 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 9271 66 1
"3502" "exp3" 2 122 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 5344 24 1
"3502" "exp3" 2 123 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1437 83 1
"3502" "exp3" 2 124 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 907 0 0
"3502" "exp3" 2 125 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1284 0 0
"3502" "exp3" 2 126 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1244 0 0
"3502" "exp3" 2 127 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1794 76 1
"3502" "exp3" 2 128 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1674 0 0
"3502" "exp3" 2 129 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1988 0 0
"3502" "exp3" 2 130 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1947 0 0
"3502" "exp3" 2 131 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 989 95 1
"3502" "exp3" 2 132 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 3553 45 1
"3503" "exp3" 1 1 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 5307 0 0
"3503" "exp3" 1 2 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 2870 0 0
"3503" "exp3" 1 3 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 3349 18 1
"3503" "exp3" 1 4 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1230 33 1
"3503" "exp3" 1 5 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 2178 0 0
"3503" "exp3" 1 6 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 5931 70 1
"3503" "exp3" 1 7 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 4790 0 0
"3503" "exp3" 1 8 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1399 0 0
"3503" "exp3" 1 9 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1123 30 1
"3503" "exp3" 1 10 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1252 32 1
"3503" "exp3" 1 11 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1931 0 0
"3503" "exp3" 1 12 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 4201 39 1
"3503" "exp3" 1 13 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1752 0 0
"3503" "exp3" 1 14 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1634 0 0
"3503" "exp3" 1 15 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 12924 0 0
"3503" "exp3" 1 16 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 10291 35 1
"3503" "exp3" 1 17 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 3231 0 0
"3503" "exp3" 1 18 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 10357 0 0
"3503" "exp3" 1 19 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 6102 19 1
"3503" "exp3" 1 20 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 3183 28 1
"3503" "exp3" 1 21 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 5554 0 0
"3503" "exp3" 1 22 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1909 0 0
"3503" "exp3" 1 23 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2469 18 1
"3503" "exp3" 1 24 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1711 0 0
"3503" "exp3" 1 25 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1316 17 1
"3503" "exp3" 1 26 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1237 20 1
"3503" "exp3" 1 27 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1134 25 1
"3503" "exp3" 1 28 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1939 45 1
"3503" "exp3" 1 29 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 3364 0 0
"3503" "exp3" 1 30 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 5656 9 1
"3503" "exp3" 1 31 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 5735 25 1
"3503" "exp3" 1 32 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 2854 92 1
"3503" "exp3" 1 33 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 4611 60 1
"3503" "exp3" 1 34 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 6722 0 0
"3503" "exp3" 1 35 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 5811 0 0
"3503" "exp3" 1 36 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 4706 21 1
"3503" "exp3" 1 37 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 3416 0 0
"3503" "exp3" 1 38 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1211 0 0
"3503" "exp3" 1 39 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 2391 45 1
"3503" "exp3" 1 40 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 2017 0 0
"3503" "exp3" 1 41 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 838 18 1
"3503" "exp3" 1 42 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 11395 36 1
"3503" "exp3" 1 43 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 649 32 1
"3503" "exp3" 1 44 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1666 0 0
"3503" "exp3" 1 45 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 4068 0 0
"3503" "exp3" 1 46 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 4199 0 0
"3503" "exp3" 1 47 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 7030 0 0
"3503" "exp3" 1 48 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 6128 36 1
"3503" "exp3" 1 49 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1852 10 1
"3503" "exp3" 1 50 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 16811 25 1
"3503" "exp3" 1 51 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 7440 14 1
"3503" "exp3" 1 52 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 3149 34 1
"3503" "exp3" 1 53 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 2484 0 0
"3503" "exp3" 1 54 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1303 0 0
"3503" "exp3" 1 55 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1296 20 1
"3503" "exp3" 1 56 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 2847 35 1
"3503" "exp3" 1 57 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1922 0 0
"3503" "exp3" 1 58 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 2751 42 1
"3503" "exp3" 1 59 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 4996 29 1
"3503" "exp3" 1 60 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1646 29 1
"3503" "exp3" 1 61 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 2969 31 1
"3503" "exp3" 1 62 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 2909 0 0
"3503" "exp3" 1 63 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2317 23 1
"3503" "exp3" 1 64 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1352 0 0
"3503" "exp3" 1 65 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 4576 0 0
"3503" "exp3" 1 66 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 3995 27 1
"3503" "exp3" 1 67 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 3704 0 0
"3503" "exp3" 1 68 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 4002 37 1
"3503" "exp3" 1 69 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1701 43 1
"3503" "exp3" 1 70 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1113 0 0
"3503" "exp3" 1 71 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1546 43 1
"3503" "exp3" 1 72 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1458 44 1
"3503" "exp3" 1 73 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1266 0 0
"3503" "exp3" 1 74 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 2039 0 0
"3503" "exp3" 1 75 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 2913 78 1
"3503" "exp3" 1 76 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 985 23 1
"3503" "exp3" 1 77 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1712 0 0
"3503" "exp3" 1 78 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2037 0 0
"3503" "exp3" 1 79 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 887 27 1
"3503" "exp3" 1 80 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 1079 0 0
"3503" "exp3" 1 81 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 2380 0 0
"3503" "exp3" 1 82 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 2184 22 1
"3503" "exp3" 1 83 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1496 0 0
"3503" "exp3" 1 84 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 2873 74 1
"3503" "exp3" 1 85 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1730 0 0
"3503" "exp3" 1 86 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 2486 69 1
"3503" "exp3" 1 87 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1735 40 1
"3503" "exp3" 1 88 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1348 26 1
"3503" "exp3" 1 89 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1480 13 1
"3503" "exp3" 1 90 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 2539 36 1
"3503" "exp3" 1 91 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1935 39 1
"3503" "exp3" 1 92 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 4931 44 1
"3503" "exp3" 1 93 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1509 0 0
"3503" "exp3" 1 94 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 2616 7 1
"3503" "exp3" 1 95 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 6055 0 0
"3503" "exp3" 1 96 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 8309 0 0
"3503" "exp3" 1 97 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1414 95 1
"3503" "exp3" 1 98 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1354 73 1
"3503" "exp3" 1 99 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1418 0 0
"3503" "exp3" 1 100 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 6572 0 0
"3503" "exp3" 1 101 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 2362 0 0
"3503" "exp3" 1 102 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 8488 0 0
"3503" "exp3" 1 103 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 2436 38 1
"3503" "exp3" 1 104 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 4197 37 1
"3503" "exp3" 1 105 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 2357 0 0
"3503" "exp3" 1 106 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1524 59 1
"3503" "exp3" 1 107 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 3201 26 1
"3503" "exp3" 1 108 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1324 0 0
"3503" "exp3" 1 109 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1427 71 1
"3503" "exp3" 1 110 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1611 0 0
"3503" "exp3" 1 111 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 6203 34 1
"3503" "exp3" 1 112 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 4752 0 0
"3503" "exp3" 1 113 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1367 0 0
"3503" "exp3" 1 114 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1357 15 1
"3503" "exp3" 1 115 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 4717 0 0
"3503" "exp3" 1 116 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1786 68 1
"3503" "exp3" 1 117 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1079 0 0
"3503" "exp3" 1 118 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1233 0 0
"3503" "exp3" 1 119 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1309 0 0
"3503" "exp3" 1 120 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 1464 0 0
"3503" "exp3" 1 121 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 3212 0 0
"3503" "exp3" 1 122 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 5262 0 0
"3503" "exp3" 1 123 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 7582 0 0
"3503" "exp3" 1 124 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1247 16 1
"3503" "exp3" 1 125 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 2790 0 0
"3503" "exp3" 1 126 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1765 0 0
"3503" "exp3" 1 127 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1559 33 1
"3503" "exp3" 1 128 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 2245 0 0
"3503" "exp3" 1 129 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 4434 0 0
"3503" "exp3" 1 130 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1223 0 0
"3503" "exp3" 1 131 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1156 0 0
"3503" "exp3" 1 132 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1308 0 0
"3503" "exp3" 2 1 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 3706 82 1
"3503" "exp3" 2 2 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1454 0 0
"3503" "exp3" 2 3 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1458 0 0
"3503" "exp3" 2 4 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 4543 33 1
"3503" "exp3" 2 5 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 883 0 0
"3503" "exp3" 2 6 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1037 49 1
"3503" "exp3" 2 7 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1715 73 1
"3503" "exp3" 2 8 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 6262 0 0
"3503" "exp3" 2 9 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 2119 0 0
"3503" "exp3" 2 10 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1386 0 0
"3503" "exp3" 2 11 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 4642 0 0
"3503" "exp3" 2 12 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 4398 20 1
"3503" "exp3" 2 13 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1218 0 0
"3503" "exp3" 2 14 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 2711 0 0
"3503" "exp3" 2 15 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2059 0 0
"3503" "exp3" 2 16 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 10660 41 1
"3503" "exp3" 2 17 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 4674 45 1
"3503" "exp3" 2 18 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 2958 37 1
"3503" "exp3" 2 19 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 992 44 1
"3503" "exp3" 2 20 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 871 23 1
"3503" "exp3" 2 21 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1972 24 1
"3503" "exp3" 2 22 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1106 40 1
"3503" "exp3" 2 23 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 990 0 0
"3503" "exp3" 2 24 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1402 23 1
"3503" "exp3" 2 25 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 2301 0 0
"3503" "exp3" 2 26 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 1930 0 0
"3503" "exp3" 2 27 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1414 85 1
"3503" "exp3" 2 28 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1671 0 0
"3503" "exp3" 2 29 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1061 0 0
"3503" "exp3" 2 30 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 841 0 0
"3503" "exp3" 2 31 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1393 0 0
"3503" "exp3" 2 32 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 7223 75 1
"3503" "exp3" 2 33 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 2257 27 1
"3503" "exp3" 2 34 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1678 0 0
"3503" "exp3" 2 35 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1552 25 1
"3503" "exp3" 2 36 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1285 0 0
"3503" "exp3" 2 37 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1393 0 0
"3503" "exp3" 2 38 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 3060 0 0
"3503" "exp3" 2 39 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2343 39 1
"3503" "exp3" 2 40 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 987 28 1
"3503" "exp3" 2 41 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1248 0 0
"3503" "exp3" 2 42 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 3051 13 1
"3503" "exp3" 2 43 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 3195 0 0
"3503" "exp3" 2 44 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1947 83 1
"3503" "exp3" 2 45 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 2746 0 0
"3503" "exp3" 2 46 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1320 0 0
"3503" "exp3" 2 47 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1105 0 0
"3503" "exp3" 2 48 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 4598 0 0
"3503" "exp3" 2 49 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 3121 18 1
"3503" "exp3" 2 50 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1393 0 0
"3503" "exp3" 2 51 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1719 29 1
"3503" "exp3" 2 52 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 833 0 0
"3503" "exp3" 2 53 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1274 0 0
"3503" "exp3" 2 54 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1514 0 0
"3503" "exp3" 2 55 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 3902 47 1
"3503" "exp3" 2 56 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 7929 0 0
"3503" "exp3" 2 57 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 2651 22 1
"3503" "exp3" 2 58 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 2194 46 1
"3503" "exp3" 2 59 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1324 76 1
"3503" "exp3" 2 60 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1834 43 1
"3503" "exp3" 2 61 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1484 0 0
"3503" "exp3" 2 62 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1383 81 1
"3503" "exp3" 2 63 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 2059 17 1
"3503" "exp3" 2 64 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 905 89 1
"3503" "exp3" 2 65 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 4562 0 0
"3503" "exp3" 2 66 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2704 23 1
"3503" "exp3" 2 67 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 4877 33 1
"3503" "exp3" 2 68 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 5864 36 1
"3503" "exp3" 2 69 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 5091 0 0
"3503" "exp3" 2 70 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 3803 0 0
"3503" "exp3" 2 71 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 7511 0 0
"3503" "exp3" 2 72 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1570 0 0
"3503" "exp3" 2 73 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 2461 21 1
"3503" "exp3" 2 74 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1316 45 1
"3503" "exp3" 2 75 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1192 0 0
"3503" "exp3" 2 76 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 2377 0 0
"3503" "exp3" 2 77 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2176 0 0
"3503" "exp3" 2 78 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1603 88 1
"3503" "exp3" 2 79 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 2272 30 1
"3503" "exp3" 2 80 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 2722 78 1
"3503" "exp3" 2 81 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 5512 27 1
"3503" "exp3" 2 82 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1035 32 1
"3503" "exp3" 2 83 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 819 0 0
"3503" "exp3" 2 84 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 2055 32 1
"3503" "exp3" 2 85 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1443 42 1
"3503" "exp3" 2 86 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1062 0 0
"3503" "exp3" 2 87 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1616 74 1
"3503" "exp3" 2 88 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 2512 30 1
"3503" "exp3" 2 89 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1769 40 1
"3503" "exp3" 2 90 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 2165 0 0
"3503" "exp3" 2 91 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1804 42 1
"3503" "exp3" 2 92 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 11992 83 1
"3503" "exp3" 2 93 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 3662 71 1
"3503" "exp3" 2 94 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1973 37 1
"3503" "exp3" 2 95 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 917 38 1
"3503" "exp3" 2 96 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 2504 20 1
"3503" "exp3" 2 97 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 892 31 1
"3503" "exp3" 2 98 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 844 31 1
"3503" "exp3" 2 99 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 849 0 0
"3503" "exp3" 2 100 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 895 85 1
"3503" "exp3" 2 101 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 970 24 1
"3503" "exp3" 2 102 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1821 34 1
"3503" "exp3" 2 103 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1802 26 1
"3503" "exp3" 2 104 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1053 0 0
"3503" "exp3" 2 105 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 3526 18 1
"3503" "exp3" 2 106 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 5678 44 1
"3503" "exp3" 2 107 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1755 21 1
"3503" "exp3" 2 108 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 3699 0 0
"3503" "exp3" 2 109 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1787 77 1
"3503" "exp3" 2 110 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2554 66 1
"3503" "exp3" 2 111 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2062 19 1
"3503" "exp3" 2 112 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 3449 0 0
"3503" "exp3" 2 113 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 11062 0 0
"3503" "exp3" 2 114 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1705 19 1
"3503" "exp3" 2 115 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1167 0 0
"3503" "exp3" 2 116 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1360 34 1
"3503" "exp3" 2 117 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1283 0 0
"3503" "exp3" 2 118 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 15444 0 0
"3503" "exp3" 2 119 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1501 0 0
"3503" "exp3" 2 120 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1878 0 0
"3503" "exp3" 2 121 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 8209 35 1
"3503" "exp3" 2 122 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 2080 0 0
"3503" "exp3" 2 123 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1416 38 1
"3503" "exp3" 2 124 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1174 17 1
"3503" "exp3" 2 125 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 3057 43 1
"3503" "exp3" 2 126 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 2529 28 1
"3503" "exp3" 2 127 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1192 29 1
"3503" "exp3" 2 128 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 6071 25 1
"3503" "exp3" 2 129 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1659 73 1
"3503" "exp3" 2 130 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 942 22 1
"3503" "exp3" 2 131 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 950 0 0
"3503" "exp3" 2 132 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1110 0 0
"3503" "exp3" 1 1 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1210 0 0
"3503" "exp3" 1 2 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 902 30 1
"3503" "exp3" 1 3 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 790 0 0
"3503" "exp3" 1 4 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1097 0 0
"3503" "exp3" 1 5 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 969 0 0
"3503" "exp3" 1 6 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 4172 0 0
"3503" "exp3" 1 7 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 9816 14 1
"3503" "exp3" 1 8 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1528 31 1
"3503" "exp3" 1 9 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1566 23 1
"3503" "exp3" 1 10 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1077 0 0
"3503" "exp3" 1 11 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 995 0 0
"3503" "exp3" 1 12 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1314 69 1
"3503" "exp3" 1 13 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1374 32 1
"3503" "exp3" 1 14 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 724 96 1
"3503" "exp3" 1 15 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 4489 38 1
"3503" "exp3" 1 16 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 986 0 0
"3503" "exp3" 1 17 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 4106 37 1
"3503" "exp3" 1 18 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1992 0 0
"3503" "exp3" 1 19 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1057 19 1
"3503" "exp3" 1 20 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 956 48 1
"3503" "exp3" 1 21 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 848 20 1
"3503" "exp3" 1 22 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1169 43 1
"3503" "exp3" 1 23 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 749 0 0
"3503" "exp3" 1 24 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1234 24 1
"3503" "exp3" 1 25 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 4024 28 1
"3503" "exp3" 1 26 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1059 0 0
"3503" "exp3" 1 27 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 976 15 1
"3503" "exp3" 1 28 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1576 0 0
"3503" "exp3" 1 29 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1111 0 0
"3503" "exp3" 1 30 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 776 90 1
"3503" "exp3" 1 31 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1212 73 1
"3503" "exp3" 1 32 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1155 33 1
"3503" "exp3" 1 33 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 839 0 0
"3503" "exp3" 1 34 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1328 0 0
"3503" "exp3" 1 35 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 961 39 1
"3503" "exp3" 1 36 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1183 0 0
"3503" "exp3" 1 37 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1489 0 0
"3503" "exp3" 1 38 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 804 0 0
"3503" "exp3" 1 39 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1035 19 1
"3503" "exp3" 1 40 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1222 22 1
"3503" "exp3" 1 41 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1781 42 1
"3503" "exp3" 1 42 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 833 0 0
"3503" "exp3" 1 43 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1103 0 0
"3503" "exp3" 1 44 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1321 0 0
"3503" "exp3" 1 45 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 945 33 1
"3503" "exp3" 1 46 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 665 86 1
"3503" "exp3" 1 47 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 834 0 0
"3503" "exp3" 1 48 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 840 21 1
"3503" "exp3" 1 49 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 666 0 0
"3503" "exp3" 1 50 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 944 26 1
"3503" "exp3" 1 51 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 726 24 1
"3503" "exp3" 1 52 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 881 67 1
"3503" "exp3" 1 53 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1587 37 1
"3503" "exp3" 1 54 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 938 0 0
"3503" "exp3" 1 55 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1538 0 0
"3503" "exp3" 1 56 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1848 23 1
"3503" "exp3" 1 57 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 636 0 0
"3503" "exp3" 1 58 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 541 40 1
"3503" "exp3" 1 59 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 841 32 1
"3503" "exp3" 1 60 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 3286 92 1
"3503" "exp3" 1 61 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 789 34 1
"3503" "exp3" 1 62 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 908 28 1
"3503" "exp3" 1 63 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 802 0 0
"3503" "exp3" 1 64 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1416 0 0
"3503" "exp3" 1 65 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 758 0 0
"3503" "exp3" 1 66 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 967 43 1
"3503" "exp3" 1 67 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 815 0 0
"3503" "exp3" 1 68 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 749 0 0
"3503" "exp3" 1 69 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 603 0 0
"3503" "exp3" 1 70 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 775 0 0
"3503" "exp3" 1 71 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 866 0 0
"3503" "exp3" 1 72 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 910 0 0
"3503" "exp3" 1 73 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 905 75 1
"3503" "exp3" 1 74 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 803 30 1
"3503" "exp3" 1 75 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1011 31 1
"3503" "exp3" 1 76 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 693 78 1
"3503" "exp3" 1 77 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1203 22 1
"3503" "exp3" 1 78 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1619 29 1
"3503" "exp3" 1 79 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1250 73 1
"3503" "exp3" 1 80 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 894 0 0
"3503" "exp3" 1 81 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1775 0 0
"3503" "exp3" 1 82 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1189 18 1
"3503" "exp3" 1 83 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 5386 27 1
"3503" "exp3" 1 84 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 5938 35 1
"3503" "exp3" 1 85 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1403 11 1
"3503" "exp3" 1 86 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 988 0 0
"3503" "exp3" 1 87 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 5460 46 1
"3503" "exp3" 1 88 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 900 0 0
"3503" "exp3" 1 89 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 593 0 0
"3503" "exp3" 1 90 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1751 38 1
"3503" "exp3" 1 91 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 2821 71 1
"3503" "exp3" 1 92 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 799 36 1
"3503" "exp3" 1 93 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 791 0 0
"3503" "exp3" 1 94 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 632 20 1
"3503" "exp3" 1 95 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1183 76 1
"3503" "exp3" 1 96 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 717 0 0
"3503" "exp3" 1 97 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 816 0 0
"3503" "exp3" 1 98 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 776 89 1
"3503" "exp3" 1 99 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 950 0 0
"3503" "exp3" 1 100 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1031 18 1
"3503" "exp3" 1 101 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2966 39 1
"3503" "exp3" 1 102 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 883 44 1
"3503" "exp3" 1 103 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 778 0 0
"3503" "exp3" 1 104 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1080 26 1
"3503" "exp3" 1 105 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1040 27 1
"3503" "exp3" 1 106 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 833 0 0
"3503" "exp3" 1 107 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1595 17 1
"3503" "exp3" 1 108 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1326 0 0
"3503" "exp3" 1 109 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 929 0 0
"3503" "exp3" 1 110 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1854 71 1
"3503" "exp3" 1 111 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 3000 0 0
"3503" "exp3" 1 112 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 2792 16 1
"3503" "exp3" 1 113 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1433 0 0
"3503" "exp3" 1 114 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1446 0 0
"3503" "exp3" 1 115 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 785 0 0
"3503" "exp3" 1 116 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1591 17 1
"3503" "exp3" 1 117 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1250 0 0
"3503" "exp3" 1 118 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1579 0 0
"3503" "exp3" 1 119 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 960 93 1
"3503" "exp3" 1 120 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 735 41 1
"3503" "exp3" 1 121 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 656 66 1
"3503" "exp3" 1 122 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 3582 25 1
"3503" "exp3" 1 123 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 918 45 1
"3503" "exp3" 1 124 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1043 34 1
"3503" "exp3" 1 125 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 717 49 1
"3503" "exp3" 1 126 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 847 0 0
"3503" "exp3" 1 127 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1070 0 0
"3503" "exp3" 1 128 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1049 0 0
"3503" "exp3" 1 129 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 4086 40 1
"3503" "exp3" 1 130 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 786 0 0
"3503" "exp3" 1 131 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 678 79 1
"3503" "exp3" 1 132 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 972 95 1
"3503" "exp3" 2 1 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1123 0 0
"3503" "exp3" 2 2 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 855 0 0
"3503" "exp3" 2 3 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 711 0 0
"3503" "exp3" 2 4 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 853 0 0
"3503" "exp3" 2 5 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 614 46 1
"3503" "exp3" 2 6 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 723 0 0
"3503" "exp3" 2 7 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1409 0 0
"3503" "exp3" 2 8 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1713 27 1
"3503" "exp3" 2 9 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 616 0 0
"3503" "exp3" 2 10 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1383 0 0
"3503" "exp3" 2 11 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 623 0 0
"3503" "exp3" 2 12 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 798 26 1
"3503" "exp3" 2 13 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 680 0 0
"3503" "exp3" 2 14 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1226 0 0
"3503" "exp3" 2 15 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1056 67 1
"3503" "exp3" 2 16 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1275 0 0
"3503" "exp3" 2 17 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1232 18 1
"3503" "exp3" 2 18 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 901 0 0
"3503" "exp3" 2 19 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1263 0 0
"3503" "exp3" 2 20 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 963 78 1
"3503" "exp3" 2 21 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 827 24 1
"3503" "exp3" 2 22 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1184 38 1
"3503" "exp3" 2 23 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1339 0 0
"3503" "exp3" 2 24 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 829 0 0
"3503" "exp3" 2 25 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 791 17 1
"3503" "exp3" 2 26 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1413 44 1
"3503" "exp3" 2 27 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1747 0 0
"3503" "exp3" 2 28 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 897 27 1
"3503" "exp3" 2 29 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1873 14 1
"3503" "exp3" 2 30 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1392 0 0
"3503" "exp3" 2 31 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1470 0 0
"3503" "exp3" 2 32 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 3327 35 1
"3503" "exp3" 2 33 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 861 0 0
"3503" "exp3" 2 34 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 941 10 1
"3503" "exp3" 2 35 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 3075 0 0
"3503" "exp3" 2 36 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 6525 0 0
"3503" "exp3" 2 37 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1247 0 0
"3503" "exp3" 2 38 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 6521 39 1
"3503" "exp3" 2 39 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1103 0 0
"3503" "exp3" 2 40 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1037 0 0
"3503" "exp3" 2 41 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1435 85 1
"3503" "exp3" 2 42 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 12226 41 1
"3503" "exp3" 2 43 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 918 0 0
"3503" "exp3" 2 44 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 3150 0 0
"3503" "exp3" 2 45 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 765 87 1
"3503" "exp3" 2 46 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1072 0 0
"3503" "exp3" 2 47 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 1910 0 0
"3503" "exp3" 2 48 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1816 0 0
"3503" "exp3" 2 49 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1562 0 0
"3503" "exp3" 2 50 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 876 0 0
"3503" "exp3" 2 51 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 956 40 1
"3503" "exp3" 2 52 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 842 0 0
"3503" "exp3" 2 53 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 559 0 0
"3503" "exp3" 2 54 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 616 42 1
"3503" "exp3" 2 55 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 873 43 1
"3503" "exp3" 2 56 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1139 0 0
"3503" "exp3" 2 57 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 2076 15 1
"3503" "exp3" 2 58 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 754 28 1
"3503" "exp3" 2 59 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 717 0 0
"3503" "exp3" 2 60 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 2418 0 0
"3503" "exp3" 2 61 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1172 25 1
"3503" "exp3" 2 62 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1036 32 1
"3503" "exp3" 2 63 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 760 70 1
"3503" "exp3" 2 64 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 822 38 1
"3503" "exp3" 2 65 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 3043 23 1
"3503" "exp3" 2 66 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1886 19 1
"3503" "exp3" 2 67 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 776 0 0
"3503" "exp3" 2 68 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 718 0 0
"3503" "exp3" 2 69 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1685 64 1
"3503" "exp3" 2 70 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 2288 75 1
"3503" "exp3" 2 71 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1642 0 0
"3503" "exp3" 2 72 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 4320 0 0
"3503" "exp3" 2 73 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 4247 0 0
"3503" "exp3" 2 74 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1239 22 1
"3503" "exp3" 2 75 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1091 0 0
"3503" "exp3" 2 76 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 674 0 0
"3503" "exp3" 2 77 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1009 0 0
"3503" "exp3" 2 78 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 670 29 1
"3503" "exp3" 2 79 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 641 0 0
"3503" "exp3" 2 80 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 904 0 0
"3503" "exp3" 2 81 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1171 0 0
"3503" "exp3" 2 82 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 698 31 1
"3503" "exp3" 2 83 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 3454 0 0
"3503" "exp3" 2 84 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1404 63 1
"3503" "exp3" 2 85 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1839 0 0
"3503" "exp3" 2 86 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 16981 0 0
"3503" "exp3" 2 87 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 740 20 1
"3503" "exp3" 2 88 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 848 98 1
"3503" "exp3" 2 89 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1057 0 0
"3503" "exp3" 2 90 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 800 33 1
"3503" "exp3" 2 91 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1372 43 1
"3503" "exp3" 2 92 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 857 0 0
"3503" "exp3" 2 93 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1508 83 1
"3503" "exp3" 2 94 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 691 0 0
"3503" "exp3" 2 95 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 886 0 0
"3503" "exp3" 2 96 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 809 0 0
"3503" "exp3" 2 97 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 941 0 0
"3503" "exp3" 2 98 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1066 0 0
"3503" "exp3" 2 99 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1711 25 1
"3503" "exp3" 2 100 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 819 47 1
"3503" "exp3" 2 101 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 5678 19 1
"3503" "exp3" 2 102 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 2256 28 1
"3503" "exp3" 2 103 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2152 29 1
"3503" "exp3" 2 104 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 909 0 0
"3503" "exp3" 2 105 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1141 18 1
"3503" "exp3" 2 106 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1046 76 1
"3503" "exp3" 2 107 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 2467 0 0
"3503" "exp3" 2 108 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1362 0 0
"3503" "exp3" 2 109 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 4188 0 0
"3503" "exp3" 2 110 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2223 17 1
"3503" "exp3" 2 111 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1622 0 0
"3503" "exp3" 2 112 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 4158 27 1
"3503" "exp3" 2 113 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2970 49 1
"3503" "exp3" 2 114 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1254 31 1
"3503" "exp3" 2 115 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2653 33 1
"3503" "exp3" 2 116 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 3968 59 1
"3503" "exp3" 2 117 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 9372 0 0
"3503" "exp3" 2 118 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 714 0 0
"3503" "exp3" 2 119 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1206 93 1
"3503" "exp3" 2 120 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 887 0 0
"3503" "exp3" 2 121 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 612 21 1
"3503" "exp3" 2 122 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 797 36 1
"3503" "exp3" 2 123 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1040 48 1
"3503" "exp3" 2 124 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 867 34 1
"3503" "exp3" 2 125 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 873 32 1
"3503" "exp3" 2 126 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 652 0 0
"3503" "exp3" 2 127 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 608 0 0
"3503" "exp3" 2 128 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 837 81 1
"3503" "exp3" 2 129 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 709 36 1
"3503" "exp3" 2 130 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 595 0 0
"3503" "exp3" 2 131 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 762 0 0
"3503" "exp3" 2 132 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 752 0 0
"3503" "exp3" 1 1 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2076 75 1
"3503" "exp3" 1 2 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 6307 0 0
"3503" "exp3" 1 3 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1059 0 0
"3503" "exp3" 1 4 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1671 0 0
"3503" "exp3" 1 5 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 3420 32 1
"3503" "exp3" 1 6 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1819 0 0
"3503" "exp3" 1 7 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1949 0 0
"3503" "exp3" 1 8 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 931 0 0
"3503" "exp3" 1 9 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 4865 39 1
"3503" "exp3" 1 10 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 837 20 1
"3503" "exp3" 1 11 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 705 22 1
"3503" "exp3" 1 12 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1680 0 0
"3503" "exp3" 1 13 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 962 0 0
"3503" "exp3" 1 14 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 970 0 0
"3503" "exp3" 1 15 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 2266 81 1
"3503" "exp3" 1 16 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 965 0 0
"3503" "exp3" 1 17 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 8414 30 1
"3503" "exp3" 1 18 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1051 28 1
"3503" "exp3" 1 19 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 4069 13 1
"3503" "exp3" 1 20 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 602 10 1
"3503" "exp3" 1 21 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 740 38 1
"3503" "exp3" 1 22 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 1809 52 1
"3503" "exp3" 1 23 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1072 0 0
"3503" "exp3" 1 24 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1149 0 0
"3503" "exp3" 1 25 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 925 31 1
"3503" "exp3" 1 26 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 897 0 0
"3503" "exp3" 1 27 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1015 21 1
"3503" "exp3" 1 28 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1698 41 1
"3503" "exp3" 1 29 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2536 0 0
"3503" "exp3" 1 30 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 1113 4 1
"3503" "exp3" 1 31 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 2736 0 0
"3503" "exp3" 1 32 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 8226 24 1
"3503" "exp3" 1 33 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 20351 0 0
"3503" "exp3" 1 34 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 3332 0 0
"3503" "exp3" 1 35 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 8959 0 0
"3503" "exp3" 1 36 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 2199 56 1
"3503" "exp3" 1 37 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 5610 38 1
"3503" "exp3" 1 38 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 939 37 1
"3503" "exp3" 1 39 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 666 24 1
"3503" "exp3" 1 40 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1398 0 0
"3503" "exp3" 1 41 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2268 36 1
"3503" "exp3" 1 42 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1231 0 0
"3503" "exp3" 1 43 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 861 0 0
"3503" "exp3" 1 44 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2096 0 0
"3503" "exp3" 1 45 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 2263 0 0
"3503" "exp3" 1 46 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 906 26 1
"3503" "exp3" 1 47 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 3818 0 0
"3503" "exp3" 1 48 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 4658 17 1
"3503" "exp3" 1 49 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1491 0 0
"3503" "exp3" 1 50 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 912 0 0
"3503" "exp3" 1 51 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1012 0 0
"3503" "exp3" 1 52 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1094 40 1
"3503" "exp3" 1 53 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1284 83 1
"3503" "exp3" 1 54 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1424 18 1
"3503" "exp3" 1 55 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1869 99 1
"3503" "exp3" 1 56 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 3509 21 1
"3503" "exp3" 1 57 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 2078 32 1
"3503" "exp3" 1 58 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1696 30 1
"3503" "exp3" 1 59 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 4027 67 1
"3503" "exp3" 1 60 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1658 0 0
"3503" "exp3" 1 61 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 3767 42 1
"3503" "exp3" 1 62 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 913 70 1
"3503" "exp3" 1 63 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1193 0 0
"3503" "exp3" 1 64 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1156 0 0
"3503" "exp3" 1 65 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1729 72 1
"3503" "exp3" 1 66 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1997 0 0
"3503" "exp3" 1 67 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1480 90 1
"3503" "exp3" 1 68 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1231 0 0
"3503" "exp3" 1 69 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1146 0 0
"3503" "exp3" 1 70 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1324 25 1
"3503" "exp3" 1 71 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1304 26 1
"3503" "exp3" 1 72 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 1515 0 0
"3503" "exp3" 1 73 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 1812 0 0
"3503" "exp3" 1 74 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2084 0 0
"3503" "exp3" 1 75 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 8333 67 1
"3503" "exp3" 1 76 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1583 0 0
"3503" "exp3" 1 77 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 983 85 1
"3503" "exp3" 1 78 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1223 0 0
"3503" "exp3" 1 79 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 909 0 0
"3503" "exp3" 1 80 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1701 17 1
"3503" "exp3" 1 81 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1885 0 0
"3503" "exp3" 1 82 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 846 14 1
"3503" "exp3" 1 83 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1329 87 1
"3503" "exp3" 1 84 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 4120 84 1
"3503" "exp3" 1 85 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1333 23 1
"3503" "exp3" 1 86 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2011 82 1
"3503" "exp3" 1 87 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2288 22 1
"3503" "exp3" 1 88 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 2512 0 0
"3503" "exp3" 1 89 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 3690 0 0
"3503" "exp3" 1 90 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2515 19 1
"3503" "exp3" 1 91 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1598 37 1
"3503" "exp3" 1 92 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1698 85 1
"3503" "exp3" 1 93 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1160 19 1
"3503" "exp3" 1 94 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 3877 0 0
"3503" "exp3" 1 95 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1174 0 0
"3503" "exp3" 1 96 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 3829 0 0
"3503" "exp3" 1 97 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 2809 0 0
"3503" "exp3" 1 98 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1198 0 0
"3503" "exp3" 1 99 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 7115 0 0
"3503" "exp3" 1 100 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1804 80 1
"3503" "exp3" 1 101 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1301 0 0
"3503" "exp3" 1 102 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 7859 0 0
"3503" "exp3" 1 103 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 6147 29 1
"3503" "exp3" 1 104 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2979 0 0
"3503" "exp3" 1 105 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 7854 95 1
"3503" "exp3" 1 106 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 21665 0 0
"3503" "exp3" 1 107 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 8263 71 1
"3503" "exp3" 1 108 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1196 0 0
"3503" "exp3" 1 109 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 2210 43 1
"3503" "exp3" 1 110 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 943 0 0
"3503" "exp3" 1 111 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 894 16 1
"3503" "exp3" 1 112 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 933 46 1
"3503" "exp3" 1 113 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1009 45 1
"3503" "exp3" 1 114 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 3143 29 1
"3503" "exp3" 1 115 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1810 34 1
"3503" "exp3" 1 116 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 3704 40 1
"3503" "exp3" 1 117 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1033 0 0
"3503" "exp3" 1 118 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 4057 89 1
"3503" "exp3" 1 119 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 1873 41 1
"3503" "exp3" 1 120 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 936 0 0
"3503" "exp3" 1 121 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 5732 0 0
"3503" "exp3" 1 122 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1157 0 0
"3503" "exp3" 1 123 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 955 0 0
"3503" "exp3" 1 124 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1237 0 0
"3503" "exp3" 1 125 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1135 0 0
"3503" "exp3" 1 126 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1645 25 1
"3503" "exp3" 1 127 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1641 78 1
"3503" "exp3" 1 128 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 19184 65 1
"3503" "exp3" 1 129 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2190 0 0
"3503" "exp3" 1 130 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 2100 0 0
"3503" "exp3" 1 131 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1415 0 0
"3503" "exp3" 1 132 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1599 0 0
"3503" "exp3" 2 1 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 5375 34 1
"3503" "exp3" 2 2 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1320 0 0
"3503" "exp3" 2 3 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1221 35 1
"3503" "exp3" 2 4 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1398 21 1
"3503" "exp3" 2 5 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 3060 57 1
"3503" "exp3" 2 6 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1278 0 0
"3503" "exp3" 2 7 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 3245 89 1
"3503" "exp3" 2 8 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1518 0 0
"3503" "exp3" 2 9 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 11804 84 1
"3503" "exp3" 2 10 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1538 18 1
"3503" "exp3" 2 11 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2298 31 1
"3503" "exp3" 2 12 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1456 0 0
"3503" "exp3" 2 13 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 2249 0 0
"3503" "exp3" 2 14 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1571 0 0
"3503" "exp3" 2 15 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1421 34 1
"3503" "exp3" 2 16 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1235 0 0
"3503" "exp3" 2 17 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1749 71 1
"3503" "exp3" 2 18 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 5112 37 1
"3503" "exp3" 2 19 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1731 14 1
"3503" "exp3" 2 20 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 13783 0 0
"3503" "exp3" 2 21 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 9926 0 0
"3503" "exp3" 2 22 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1190 0 0
"3503" "exp3" 2 23 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 3324 44 1
"3503" "exp3" 2 24 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 927 0 0
"3503" "exp3" 2 25 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2925 0 0
"3503" "exp3" 2 26 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 3196 17 1
"3503" "exp3" 2 27 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 9708 26 1
"3503" "exp3" 2 28 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2194 31 1
"3503" "exp3" 2 29 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1593 24 1
"3503" "exp3" 2 30 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1432 0 0
"3503" "exp3" 2 31 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2761 49 1
"3503" "exp3" 2 32 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1604 76 1
"3503" "exp3" 2 33 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1001 0 0
"3503" "exp3" 2 34 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 5934 13 1
"3503" "exp3" 2 35 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 5573 0 0
"3503" "exp3" 2 36 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1465 23 1
"3503" "exp3" 2 37 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 5982 0 0
"3503" "exp3" 2 38 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 4212 41 1
"3503" "exp3" 2 39 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 3948 32 1
"3503" "exp3" 2 40 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 2334 86 1
"3503" "exp3" 2 41 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 4423 0 0
"3503" "exp3" 2 42 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 2334 0 0
"3503" "exp3" 2 43 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1714 0 0
"3503" "exp3" 2 44 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 7524 0 0
"3503" "exp3" 2 45 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 16182 0 0
"3503" "exp3" 2 46 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 3372 36 1
"3503" "exp3" 2 47 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2566 45 1
"3503" "exp3" 2 48 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1478 0 0
"3503" "exp3" 2 49 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1809 0 0
"3503" "exp3" 2 50 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1923 0 0
"3503" "exp3" 2 51 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 1978 75 1
"3503" "exp3" 2 52 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 881 0 0
"3503" "exp3" 2 53 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 25526 0 0
"3503" "exp3" 2 54 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 2946 0 0
"3503" "exp3" 2 55 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1308 0 0
"3503" "exp3" 2 56 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1013 0 0
"3503" "exp3" 2 57 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1613 82 1
"3503" "exp3" 2 58 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1045 0 0
"3503" "exp3" 2 59 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 5228 0 0
"3503" "exp3" 2 60 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 4671 0 0
"3503" "exp3" 2 61 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 5834 0 0
"3503" "exp3" 2 62 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1167 0 0
"3503" "exp3" 2 63 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 5876 35 1
"3503" "exp3" 2 64 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1611 0 0
"3503" "exp3" 2 65 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 3723 0 0
"3503" "exp3" 2 66 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1207 0 0
"3503" "exp3" 2 67 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1114 0 0
"3503" "exp3" 2 68 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 2897 0 0
"3503" "exp3" 2 69 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1535 38 1
"3503" "exp3" 2 70 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 9031 41 1
"3503" "exp3" 2 71 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 3664 0 0
"3503" "exp3" 2 72 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2239 36 1
"3503" "exp3" 2 73 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 993 0 0
"3503" "exp3" 2 74 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2624 20 1
"3503" "exp3" 2 75 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1396 30 1
"3503" "exp3" 2 76 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 740 0 0
"3503" "exp3" 2 77 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2527 15 1
"3503" "exp3" 2 78 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 955 21 1
"3503" "exp3" 2 79 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2304 0 0
"3503" "exp3" 2 80 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 5703 25 1
"3503" "exp3" 2 81 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 7841 0 0
"3503" "exp3" 2 82 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2197 79 1
"3503" "exp3" 2 83 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 3976 0 0
"3503" "exp3" 2 84 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1489 0 0
"3503" "exp3" 2 85 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 4834 16 1
"3503" "exp3" 2 86 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1488 68 1
"3503" "exp3" 2 87 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 9125 0 0
"3503" "exp3" 2 88 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1059 19 1
"3503" "exp3" 2 89 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2550 23 1
"3503" "exp3" 2 90 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1159 0 0
"3503" "exp3" 2 91 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1101 22 1
"3503" "exp3" 2 92 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1066 0 0
"3503" "exp3" 2 93 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1201 18 1
"3503" "exp3" 2 94 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1031 26 1
"3503" "exp3" 2 95 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 2392 0 0
"3503" "exp3" 2 96 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1314 28 1
"3503" "exp3" 2 97 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1076 0 0
"3503" "exp3" 2 98 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 2633 0 0
"3503" "exp3" 2 99 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1679 0 0
"3503" "exp3" 2 100 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 6327 0 0
"3503" "exp3" 2 101 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2242 45 1
"3503" "exp3" 2 102 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 4201 0 0
"3503" "exp3" 2 103 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 2156 0 0
"3503" "exp3" 2 104 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1226 0 0
"3503" "exp3" 2 105 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 919 71 1
"3503" "exp3" 2 106 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 689 0 0
"3503" "exp3" 2 107 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2805 0 0
"3503" "exp3" 2 108 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 6178 0 0
"3503" "exp3" 2 109 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 8301 0 0
"3503" "exp3" 2 110 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2436 0 0
"3503" "exp3" 2 111 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1587 0 0
"3503" "exp3" 2 112 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1920 74 1
"3503" "exp3" 2 113 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 2519 0 0
"3503" "exp3" 2 114 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 4696 32 1
"3503" "exp3" 2 115 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1629 0 0
"3503" "exp3" 2 116 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2762 0 0
"3503" "exp3" 2 117 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2692 19 1
"3503" "exp3" 2 118 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2526 85 1
"3503" "exp3" 2 119 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 5349 73 1
"3503" "exp3" 2 120 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 9379 0 0
"3503" "exp3" 2 121 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2262 0 0
"3503" "exp3" 2 122 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1585 17 1
"3503" "exp3" 2 123 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1518 0 0
"3503" "exp3" 2 124 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2431 29 1
"3503" "exp3" 2 125 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 2483 72 1
"3503" "exp3" 2 126 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2207 27 1
"3503" "exp3" 2 127 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1005 0 0
"3503" "exp3" 2 128 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 1391 0 0
"3503" "exp3" 2 129 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1175 20 1
"3503" "exp3" 2 130 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1259 0 0
"3503" "exp3" 2 131 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1567 40 1
"3503" "exp3" 2 132 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 786 0 0
"3503" "exp3" 1 1 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 2170 0 0
"3503" "exp3" 1 2 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1711 0 0
"3503" "exp3" 1 3 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 871 23 1
"3503" "exp3" 1 4 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1169 0 0
"3503" "exp3" 1 5 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 3422 0 0
"3503" "exp3" 1 6 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 3158 47 1
"3503" "exp3" 1 7 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1061 0 0
"3503" "exp3" 1 8 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 8974 0 0
"3503" "exp3" 1 9 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1778 85 1
"3503" "exp3" 1 10 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 2956 0 0
"3503" "exp3" 1 11 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 835 0 0
"3503" "exp3" 1 12 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 3499 83 1
"3503" "exp3" 1 13 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 3601 38 1
"3503" "exp3" 1 14 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 12674 20 1
"3503" "exp3" 1 15 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1043 97 1
"3503" "exp3" 1 16 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1032 35 1
"3503" "exp3" 1 17 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1051 0 0
"3503" "exp3" 1 18 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 884 17 1
"3503" "exp3" 1 19 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1270 0 0
"3503" "exp3" 1 20 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 6228 25 1
"3503" "exp3" 1 21 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 899 87 1
"3503" "exp3" 1 22 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1409 22 1
"3503" "exp3" 1 23 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1485 68 1
"3503" "exp3" 1 24 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 950 17 1
"3503" "exp3" 1 25 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 903 39 1
"3503" "exp3" 1 26 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 847 0 0
"3503" "exp3" 1 27 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 2200 33 1
"3503" "exp3" 1 28 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 13016 0 0
"3503" "exp3" 1 29 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 1647 0 0
"3503" "exp3" 1 30 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1181 0 0
"3503" "exp3" 1 31 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 747 65 1
"3503" "exp3" 1 32 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 772 54 1
"3503" "exp3" 1 33 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 856 0 0
"3503" "exp3" 1 34 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 547 0 0
"3503" "exp3" 1 35 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 445 0 0
"3503" "exp3" 1 36 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1002 73 1
"3503" "exp3" 1 37 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1108 32 1
"3503" "exp3" 1 38 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1142 45 1
"3503" "exp3" 1 39 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1092 25 1
"3503" "exp3" 1 40 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 3536 0 0
"3503" "exp3" 1 41 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 3518 0 0
"3503" "exp3" 1 42 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1889 42 1
"3503" "exp3" 1 43 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1835 16 1
"3503" "exp3" 1 44 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1152 21 1
"3503" "exp3" 1 45 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2511 31 1
"3503" "exp3" 1 46 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1049 49 1
"3503" "exp3" 1 47 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 2997 0 0
"3503" "exp3" 1 48 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 3519 30 1
"3503" "exp3" 1 49 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1130 0 0
"3503" "exp3" 1 50 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 888 0 0
"3503" "exp3" 1 51 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1393 20 1
"3503" "exp3" 1 52 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 712 95 1
"3503" "exp3" 1 53 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 2272 0 0
"3503" "exp3" 1 54 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1496 0 0
"3503" "exp3" 1 55 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1158 91 1
"3503" "exp3" 1 56 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1378 0 0
"3503" "exp3" 1 57 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1194 18 1
"3503" "exp3" 1 58 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1541 0 0
"3503" "exp3" 1 59 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1119 82 1
"3503" "exp3" 1 60 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1403 31 1
"3503" "exp3" 1 61 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 2013 0 0
"3503" "exp3" 1 62 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1433 24 1
"3503" "exp3" 1 63 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1782 34 1
"3503" "exp3" 1 64 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1100 0 0
"3503" "exp3" 1 65 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2606 0 0
"3503" "exp3" 1 66 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 6877 0 0
"3503" "exp3" 1 67 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 3311 45 1
"3503" "exp3" 1 68 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1325 0 0
"3503" "exp3" 1 69 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2374 0 0
"3503" "exp3" 1 70 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 3016 0 0
"3503" "exp3" 1 71 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1535 39 1
"3503" "exp3" 1 72 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 788 0 0
"3503" "exp3" 1 73 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 872 14 1
"3503" "exp3" 1 74 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1201 26 1
"3503" "exp3" 1 75 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 936 0 0
"3503" "exp3" 1 76 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 2307 0 0
"3503" "exp3" 1 77 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 2434 0 0
"3503" "exp3" 1 78 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 3812 64 1
"3503" "exp3" 1 79 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1385 69 1
"3503" "exp3" 1 80 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1465 0 0
"3503" "exp3" 1 81 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 2334 0 0
"3503" "exp3" 1 82 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1560 84 1
"3503" "exp3" 1 83 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 6312 0 0
"3503" "exp3" 1 84 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 8483 27 1
"3503" "exp3" 1 85 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1823 21 1
"3503" "exp3" 1 86 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 2270 29 1
"3503" "exp3" 1 87 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1223 18 1
"3503" "exp3" 1 88 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 5602 0 0
"3503" "exp3" 1 89 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2788 40 1
"3503" "exp3" 1 90 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 943 70 1
"3503" "exp3" 1 91 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 636 0 0
"3503" "exp3" 1 92 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 2613 79 1
"3503" "exp3" 1 93 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 4691 0 0
"3503" "exp3" 1 94 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 2696 67 1
"3503" "exp3" 1 95 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 492 0 0
"3503" "exp3" 1 96 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 315 0 0
"3503" "exp3" 1 97 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1253 0 0
"3503" "exp3" 1 98 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1617 0 0
"3503" "exp3" 1 99 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1834 0 0
"3503" "exp3" 1 100 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2603 0 0
"3503" "exp3" 1 101 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 456 0 0
"3503" "exp3" 1 102 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 538 0 0
"3503" "exp3" 1 103 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 414 0 0
"3503" "exp3" 1 104 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 744 0 0
"3503" "exp3" 1 105 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1076 0 0
"3503" "exp3" 1 106 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 192 0 0
"3503" "exp3" 1 107 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 564 0 0
"3503" "exp3" 1 108 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 279 0 0
"3503" "exp3" 1 109 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 842 65 1
"3503" "exp3" 1 110 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 324 88 1
"3503" "exp3" 1 111 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 323 0 0
"3503" "exp3" 1 112 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 210 14 1
"3503" "exp3" 1 113 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 780 0 0
"3503" "exp3" 1 114 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 520 0 0
"3503" "exp3" 1 115 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 803 0 0
"3503" "exp3" 1 116 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 531 0 0
"3503" "exp3" 1 117 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 933 0 0
"3503" "exp3" 1 118 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 778 68 1
"3503" "exp3" 1 119 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 638 0 0
"3503" "exp3" 1 120 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 471 0 0
"3503" "exp3" 1 121 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 958 67 1
"3503" "exp3" 1 122 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 999 0 0
"3503" "exp3" 1 123 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1011 0 0
"3503" "exp3" 1 124 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 614 0 0
"3503" "exp3" 1 125 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 543 77 1
"3503" "exp3" 1 126 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 294 59 1
"3503" "exp3" 1 127 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 639 0 0
"3503" "exp3" 1 128 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 573 0 0
"3503" "exp3" 1 129 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 600 56 1
"3503" "exp3" 1 130 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1508 0 0
"3503" "exp3" 1 131 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 4325 0 0
"3503" "exp3" 1 132 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 4925 71 1
"3503" "exp3" 2 1 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 541 0 0
"3503" "exp3" 2 2 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 272 0 0
"3503" "exp3" 2 3 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 363 15 1
"3503" "exp3" 2 4 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 2149 58 1
"3503" "exp3" 2 5 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 425 0 0
"3503" "exp3" 2 6 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 435 0 0
"3503" "exp3" 2 7 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 436 0 0
"3503" "exp3" 2 8 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 283 0 0
"3503" "exp3" 2 9 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 525 84 1
"3503" "exp3" 2 10 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 284 0 0
"3503" "exp3" 2 11 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 383 0 0
"3503" "exp3" 2 12 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 353 91 1
"3503" "exp3" 2 13 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 387 0 0
"3503" "exp3" 2 14 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 285 0 0
"3503" "exp3" 2 15 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 378 0 0
"3503" "exp3" 2 16 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 263 0 0
"3503" "exp3" 2 17 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 641 68 1
"3503" "exp3" 2 18 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 981 61 1
"3503" "exp3" 2 19 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 387 0 0
"3503" "exp3" 2 20 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 375 0 0
"3503" "exp3" 2 21 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 732 0 0
"3503" "exp3" 2 22 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1030 0 0
"3503" "exp3" 2 23 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 1053 0 0
"3503" "exp3" 2 24 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 556 0 0
"3503" "exp3" 2 25 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 554 0 0
"3503" "exp3" 2 26 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 683 84 1
"3503" "exp3" 2 27 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 557 0 0
"3503" "exp3" 2 28 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 636 0 0
"3503" "exp3" 2 29 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 360 0 0
"3503" "exp3" 2 30 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 350 0 0
"3503" "exp3" 2 31 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 498 0 0
"3503" "exp3" 2 32 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1001 0 0
"3503" "exp3" 2 33 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 897 76 1
"3503" "exp3" 2 34 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 670 67 1
"3503" "exp3" 2 35 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 376 0 0
"3503" "exp3" 2 36 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 234 87 1
"3503" "exp3" 2 37 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 294 0 0
"3503" "exp3" 2 38 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 305 0 0
"3503" "exp3" 2 39 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 341 68 1
"3503" "exp3" 2 40 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 214 37 1
"3503" "exp3" 2 41 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 350 66 1
"3503" "exp3" 2 42 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 397 0 0
"3503" "exp3" 2 43 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 308 0 0
"3503" "exp3" 2 44 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 601 0 0
"3503" "exp3" 2 45 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1330 0 0
"3503" "exp3" 2 46 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 544 65 1
"3503" "exp3" 2 47 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 690 0 0
"3503" "exp3" 2 48 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 734 0 0
"3503" "exp3" 2 49 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 720 0 0
"3503" "exp3" 2 50 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 681 71 1
"3503" "exp3" 2 51 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 493 0 0
"3503" "exp3" 2 52 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 508 82 1
"3503" "exp3" 2 53 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 820 0 0
"3503" "exp3" 2 54 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 576 0 0
"3503" "exp3" 2 55 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 370 0 0
"3503" "exp3" 2 56 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 737 0 0
"3503" "exp3" 2 57 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 570 73 1
"3503" "exp3" 2 58 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1690 0 0
"3503" "exp3" 2 59 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 977 0 0
"3503" "exp3" 2 60 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 2415 0 0
"3503" "exp3" 2 61 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 862 0 0
"3503" "exp3" 2 62 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 819 0 0
"3503" "exp3" 2 63 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 3887 0 0
"3503" "exp3" 2 64 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 965 85 1
"3503" "exp3" 2 65 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 2665 0 0
"3503" "exp3" 2 66 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 501 97 1
"3503" "exp3" 2 67 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 497 0 0
"3503" "exp3" 2 68 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 555 0 0
"3503" "exp3" 2 69 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 750 0 0
"3503" "exp3" 2 70 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 474 0 0
"3503" "exp3" 2 71 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 504 75 1
"3503" "exp3" 2 72 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 332 54 1
"3503" "exp3" 2 73 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 487 74 1
"3503" "exp3" 2 74 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 627 0 0
"3503" "exp3" 2 75 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 569 55 1
"3503" "exp3" 2 76 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 842 0 0
"3503" "exp3" 2 77 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 696 77 1
"3503" "exp3" 2 78 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 650 0 0
"3503" "exp3" 2 79 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 289 83 1
"3503" "exp3" 2 80 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 483 0 0
"3503" "exp3" 2 81 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 327 0 0
"3503" "exp3" 2 82 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 294 79 1
"3503" "exp3" 2 83 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 401 0 0
"3503" "exp3" 2 84 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 320 78 1
"3503" "exp3" 2 85 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 730 55 1
"3503" "exp3" 2 86 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 402 81 1
"3503" "exp3" 2 87 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3317 49 1
"3503" "exp3" 2 88 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1507 41 1
"3503" "exp3" 2 89 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 634 0 0
"3503" "exp3" 2 90 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 480 76 1
"3503" "exp3" 2 91 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 403 0 0
"3503" "exp3" 2 92 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 307 0 0
"3503" "exp3" 2 93 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 844 42 1
"3503" "exp3" 2 94 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 837 72 1
"3503" "exp3" 2 95 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 584 0 0
"3503" "exp3" 2 96 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1669 70 1
"3503" "exp3" 2 97 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 576 88 1
"3503" "exp3" 2 98 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 525 0 0
"3503" "exp3" 2 99 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 382 81 1
"3503" "exp3" 2 100 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 949 0 0
"3503" "exp3" 2 101 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 688 0 0
"3503" "exp3" 2 102 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 571 0 0
"3503" "exp3" 2 103 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 603 66 1
"3503" "exp3" 2 104 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1135 96 1
"3503" "exp3" 2 105 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 4653 0 0
"3503" "exp3" 2 106 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2750 0 0
"3503" "exp3" 2 107 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 2709 0 0
"3503" "exp3" 2 108 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 2124 20 1
"3503" "exp3" 2 109 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 428 0 0
"3503" "exp3" 2 110 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 398 0 0
"3503" "exp3" 2 111 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 501 0 0
"3503" "exp3" 2 112 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 682 0 0
"3503" "exp3" 2 113 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 371 0 0
"3503" "exp3" 2 114 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 360 0 0
"3503" "exp3" 2 115 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 447 0 0
"3503" "exp3" 2 116 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 476 0 0
"3503" "exp3" 2 117 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 481 0 0
"3503" "exp3" 2 118 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 478 77 1
"3503" "exp3" 2 119 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 391 0 0
"3503" "exp3" 2 120 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 367 0 0
"3503" "exp3" 2 121 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 418 0 0
"3503" "exp3" 2 122 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 367 69 1
"3503" "exp3" 2 123 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 598 0 0
"3503" "exp3" 2 124 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 736 0 0
"3503" "exp3" 2 125 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 505 0 0
"3503" "exp3" 2 126 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1563 43 1
"3503" "exp3" 2 127 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1156 0 0
"3503" "exp3" 2 128 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 560 0 0
"3503" "exp3" 2 129 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 532 0 0
"3503" "exp3" 2 130 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 418 0 0
"3503" "exp3" 2 131 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 671 0 0
"3503" "exp3" 2 132 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1331 67 1
"3504" "exp3" 1 1 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1616 75 1
"3504" "exp3" 1 2 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1623 20 1
"3504" "exp3" 1 3 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1959 55 1
"3504" "exp3" 1 4 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 928 19 1
"3504" "exp3" 1 5 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1068 25 1
"3504" "exp3" 1 6 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1776 6 1
"3504" "exp3" 1 7 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 1394 0 0
"3504" "exp3" 1 8 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1000 23 1
"3504" "exp3" 1 9 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1283 79 1
"3504" "exp3" 1 10 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 966 34 1
"3504" "exp3" 1 11 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1246 70 1
"3504" "exp3" 1 12 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1525 29 1
"3504" "exp3" 1 13 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1115 24 1
"3504" "exp3" 1 14 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1987 0 0
"3504" "exp3" 1 15 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 951 0 0
"3504" "exp3" 1 16 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 1708 4 1
"3504" "exp3" 1 17 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1341 0 0
"3504" "exp3" 1 18 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 2078 14 1
"3504" "exp3" 1 19 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1848 0 0
"3504" "exp3" 1 20 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1756 0 0
"3504" "exp3" 1 21 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2097 69 1
"3504" "exp3" 1 22 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1854 71 1
"3504" "exp3" 1 23 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1796 12 1
"3504" "exp3" 1 24 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1163 28 1
"3504" "exp3" 1 25 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 2660 0 0
"3504" "exp3" 1 26 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1945 0 0
"3504" "exp3" 1 27 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1920 48 1
"3504" "exp3" 1 28 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1930 0 0
"3504" "exp3" 1 29 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1481 21 1
"3504" "exp3" 1 30 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2454 0 0
"3504" "exp3" 1 31 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1671 0 0
"3504" "exp3" 1 32 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 905 33 1
"3504" "exp3" 1 33 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1009 0 0
"3504" "exp3" 1 34 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1187 0 0
"3504" "exp3" 1 35 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1453 29 1
"3504" "exp3" 1 36 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1502 0 0
"3504" "exp3" 1 37 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 2265 0 0
"3504" "exp3" 1 38 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 8956 0 0
"3504" "exp3" 1 39 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1189 23 1
"3504" "exp3" 1 40 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1760 0 0
"3504" "exp3" 1 41 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1536 23 1
"3504" "exp3" 1 42 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 2608 33 1
"3504" "exp3" 1 43 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 1758 0 0
"3504" "exp3" 1 44 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1926 0 0
"3504" "exp3" 1 45 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1370 19 1
"3504" "exp3" 1 46 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 2427 0 0
"3504" "exp3" 1 47 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2690 0 0
"3504" "exp3" 1 48 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1440 28 1
"3504" "exp3" 1 49 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1776 0 0
"3504" "exp3" 1 50 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1416 49 1
"3504" "exp3" 1 51 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 2706 10 1
"3504" "exp3" 1 52 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2345 0 0
"3504" "exp3" 1 53 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 2195 61 1
"3504" "exp3" 1 54 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1956 18 1
"3504" "exp3" 1 55 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 2687 13 1
"3504" "exp3" 1 56 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 3072 30 1
"3504" "exp3" 1 57 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1163 27 1
"3504" "exp3" 1 58 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 748 0 0
"3504" "exp3" 1 59 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1173 26 1
"3504" "exp3" 1 60 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1704 14 1
"3504" "exp3" 1 61 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1163 20 1
"3504" "exp3" 1 62 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1676 0 0
"3504" "exp3" 1 63 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1577 0 0
"3504" "exp3" 1 64 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1543 0 0
"3504" "exp3" 1 65 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1444 0 0
"3504" "exp3" 1 66 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 940 34 1
"3504" "exp3" 1 67 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1742 0 0
"3504" "exp3" 1 68 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 11941 41 1
"3504" "exp3" 1 69 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 3067 0 0
"3504" "exp3" 1 70 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1468 24 1
"3504" "exp3" 1 71 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1577 0 0
"3504" "exp3" 1 72 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 984 26 1
"3504" "exp3" 1 73 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1347 35 1
"3504" "exp3" 1 74 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1224 26 1
"3504" "exp3" 1 75 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 1718 0 0
"3504" "exp3" 1 76 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 3524 0 0
"3504" "exp3" 1 77 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 887 13 1
"3504" "exp3" 1 78 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1390 47 1
"3504" "exp3" 1 79 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1892 0 0
"3504" "exp3" 1 80 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1608 0 0
"3504" "exp3" 1 81 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1317 0 0
"3504" "exp3" 1 82 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 891 0 0
"3504" "exp3" 1 83 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 859 0 0
"3504" "exp3" 1 84 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 1007 0 0
"3504" "exp3" 1 85 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 1027 0 0
"3504" "exp3" 1 86 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 792 0 0
"3504" "exp3" 1 87 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1400 83 1
"3504" "exp3" 1 88 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1355 0 0
"3504" "exp3" 1 89 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1400 29 1
"3504" "exp3" 1 90 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1495 35 1
"3504" "exp3" 1 91 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 609 0 0
"3504" "exp3" 1 92 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 617 40 1
"3504" "exp3" 1 93 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 401 26 1
"3504" "exp3" 1 94 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 484 0 0
"3504" "exp3" 1 95 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 934 25 1
"3504" "exp3" 1 96 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 939 0 0
"3504" "exp3" 1 97 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 450 0 0
"3504" "exp3" 1 98 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 705 19 1
"3504" "exp3" 1 99 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 970 0 0
"3504" "exp3" 1 100 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1248 0 0
"3504" "exp3" 1 101 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 666 28 1
"3504" "exp3" 1 102 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 593 33 1
"3504" "exp3" 1 103 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 885 12 1
"3504" "exp3" 1 104 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 806 20 1
"3504" "exp3" 1 105 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1089 0 0
"3504" "exp3" 1 106 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1552 17 1
"3504" "exp3" 1 107 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 638 0 0
"3504" "exp3" 1 108 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 494 24 1
"3504" "exp3" 1 109 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 240 0 0
"3504" "exp3" 1 110 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 219 38 1
"3504" "exp3" 1 111 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1127 0 0
"3504" "exp3" 1 112 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1620 16 1
"3504" "exp3" 1 113 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1060 0 0
"3504" "exp3" 1 114 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 800 0 0
"3504" "exp3" 1 115 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 640 0 0
"3504" "exp3" 1 116 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 762 8 1
"3504" "exp3" 1 117 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 704 0 0
"3504" "exp3" 1 118 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 524 0 0
"3504" "exp3" 1 119 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1064 0 0
"3504" "exp3" 1 120 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 370 0 0
"3504" "exp3" 1 121 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 638 27 1
"3504" "exp3" 1 122 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 858 0 0
"3504" "exp3" 1 123 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 730 0 0
"3504" "exp3" 1 124 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 792 69 1
"3504" "exp3" 1 125 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 897 30 1
"3504" "exp3" 1 126 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 900 0 0
"3504" "exp3" 1 127 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1381 30 1
"3504" "exp3" 1 128 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 2709 0 0
"3504" "exp3" 1 129 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1413 22 1
"3504" "exp3" 1 130 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 758 16 1
"3504" "exp3" 1 131 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1828 0 0
"3504" "exp3" 1 132 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 2104 32 1
"3504" "exp3" 2 1 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 2120 16 1
"3504" "exp3" 2 2 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1134 13 1
"3504" "exp3" 2 3 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 837 7 1
"3504" "exp3" 2 4 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1667 28 1
"3504" "exp3" 2 5 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 699 0 0
"3504" "exp3" 2 6 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1288 57 1
"3504" "exp3" 2 7 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 845 0 0
"3504" "exp3" 2 8 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 567 41 1
"3504" "exp3" 2 9 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1005 23 1
"3504" "exp3" 2 10 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 718 24 1
"3504" "exp3" 2 11 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 530 14 1
"3504" "exp3" 2 12 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 467 19 1
"3504" "exp3" 2 13 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 698 34 1
"3504" "exp3" 2 14 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 361 9 1
"3504" "exp3" 2 15 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 305 0 0
"3504" "exp3" 2 16 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1354 15 1
"3504" "exp3" 2 17 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 2059 0 0
"3504" "exp3" 2 18 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1301 0 0
"3504" "exp3" 2 19 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1033 40 1
"3504" "exp3" 2 20 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1089 0 0
"3504" "exp3" 2 21 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1362 17 1
"3504" "exp3" 2 22 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1563 0 0
"3504" "exp3" 2 23 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 2014 0 0
"3504" "exp3" 2 24 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 993 27 1
"3504" "exp3" 2 25 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 826 10 1
"3504" "exp3" 2 26 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1119 21 1
"3504" "exp3" 2 27 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1212 34 1
"3504" "exp3" 2 28 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 829 33 1
"3504" "exp3" 2 29 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1336 0 0
"3504" "exp3" 2 30 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1368 42 1
"3504" "exp3" 2 31 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 593 0 0
"3504" "exp3" 2 32 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 2256 2 1
"3504" "exp3" 2 33 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 779 0 0
"3504" "exp3" 2 34 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 706 25 1
"3504" "exp3" 2 35 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 499 27 1
"3504" "exp3" 2 36 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1545 31 1
"3504" "exp3" 2 37 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 837 0 0
"3504" "exp3" 2 38 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1980 92 1
"3504" "exp3" 2 39 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1881 0 0
"3504" "exp3" 2 40 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1216 0 0
"3504" "exp3" 2 41 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 901 24 1
"3504" "exp3" 2 42 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1890 0 0
"3504" "exp3" 2 43 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 2388 0 0
"3504" "exp3" 2 44 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1146 30 1
"3504" "exp3" 2 45 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 2149 17 1
"3504" "exp3" 2 46 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 833 25 1
"3504" "exp3" 2 47 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1642 0 0
"3504" "exp3" 2 48 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1081 31 1
"3504" "exp3" 2 49 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 771 35 1
"3504" "exp3" 2 50 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1263 11 1
"3504" "exp3" 2 51 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1221 0 0
"3504" "exp3" 2 52 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1515 55 1
"3504" "exp3" 2 53 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 2049 21 1
"3504" "exp3" 2 54 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 2393 29 1
"3504" "exp3" 2 55 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 592 36 1
"3504" "exp3" 2 56 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1808 15 1
"3504" "exp3" 2 57 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1430 33 1
"3504" "exp3" 2 58 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1178 26 1
"3504" "exp3" 2 59 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 678 19 1
"3504" "exp3" 2 60 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1364 0 0
"3504" "exp3" 2 61 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1434 0 0
"3504" "exp3" 2 62 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 2129 0 0
"3504" "exp3" 2 63 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 889 37 1
"3504" "exp3" 2 64 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 850 39 1
"3504" "exp3" 2 65 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 570 9 1
"3504" "exp3" 2 66 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1612 43 1
"3504" "exp3" 2 67 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1831 0 0
"3504" "exp3" 2 68 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1064 32 1
"3504" "exp3" 2 69 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 646 20 1
"3504" "exp3" 2 70 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2122 18 1
"3504" "exp3" 2 71 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1128 21 1
"3504" "exp3" 2 72 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1539 0 0
"3504" "exp3" 2 73 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1342 0 0
"3504" "exp3" 2 74 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 927 0 0
"3504" "exp3" 2 75 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1140 28 1
"3504" "exp3" 2 76 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1170 0 0
"3504" "exp3" 2 77 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1141 0 0
"3504" "exp3" 2 78 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 917 29 1
"3504" "exp3" 2 79 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1148 38 1
"3504" "exp3" 2 80 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1590 0 0
"3504" "exp3" 2 81 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1338 67 1
"3504" "exp3" 2 82 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 829 0 0
"3504" "exp3" 2 83 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 970 30 1
"3504" "exp3" 2 84 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1112 16 1
"3504" "exp3" 2 85 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 815 37 1
"3504" "exp3" 2 86 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 807 23 1
"3504" "exp3" 2 87 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 2080 24 1
"3504" "exp3" 2 88 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 3755 31 1
"3504" "exp3" 2 89 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1165 0 0
"3504" "exp3" 2 90 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1972 14 1
"3504" "exp3" 2 91 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 886 11 1
"3504" "exp3" 2 92 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 3308 16 1
"3504" "exp3" 2 93 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 669 23 1
"3504" "exp3" 2 94 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 694 41 1
"3504" "exp3" 2 95 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 690 0 0
"3504" "exp3" 2 96 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 670 0 0
"3504" "exp3" 2 97 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 740 40 1
"3504" "exp3" 2 98 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1036 46 1
"3504" "exp3" 2 99 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1496 22 1
"3504" "exp3" 2 100 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 2819 0 0
"3504" "exp3" 2 101 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 868 88 1
"3504" "exp3" 2 102 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 810 0 0
"3504" "exp3" 2 103 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1219 69 1
"3504" "exp3" 2 104 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 548 22 1
"3504" "exp3" 2 105 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1014 19 1
"3504" "exp3" 2 106 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 662 44 1
"3504" "exp3" 2 107 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1717 78 1
"3504" "exp3" 2 108 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1365 18 1
"3504" "exp3" 2 109 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 619 38 1
"3504" "exp3" 2 110 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 573 28 1
"3504" "exp3" 2 111 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 831 25 1
"3504" "exp3" 2 112 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 796 20 1
"3504" "exp3" 2 113 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 607 19 1
"3504" "exp3" 2 114 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 933 0 0
"3504" "exp3" 2 115 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 793 35 1
"3504" "exp3" 2 116 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 583 20 1
"3504" "exp3" 2 117 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 427 13 1
"3504" "exp3" 2 118 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 499 0 0
"3504" "exp3" 2 119 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 416 4 1
"3504" "exp3" 2 120 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 546 0 0
"3504" "exp3" 2 121 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1052 26 1
"3504" "exp3" 2 122 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 813 30 1
"3504" "exp3" 2 123 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 593 36 1
"3504" "exp3" 2 124 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1225 0 0
"3504" "exp3" 2 125 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1171 0 0
"3504" "exp3" 2 126 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1044 26 1
"3504" "exp3" 2 127 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1140 0 0
"3504" "exp3" 2 128 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1065 0 0
"3504" "exp3" 2 129 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 641 28 1
"3504" "exp3" 2 130 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1487 12 1
"3504" "exp3" 2 131 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 661 14 1
"3504" "exp3" 2 132 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1206 10 1
"3504" "exp3" 1 1 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1589 21 1
"3504" "exp3" 1 2 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 2352 29 1
"3504" "exp3" 1 3 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 3292 0 0
"3504" "exp3" 1 4 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1567 0 0
"3504" "exp3" 1 5 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 788 0 0
"3504" "exp3" 1 6 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 913 0 0
"3504" "exp3" 1 7 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1540 0 0
"3504" "exp3" 1 8 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1856 28 1
"3504" "exp3" 1 9 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 926 0 0
"3504" "exp3" 1 10 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 625 4 1
"3504" "exp3" 1 11 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 864 13 1
"3504" "exp3" 1 12 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1759 25 1
"3504" "exp3" 1 13 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1193 28 1
"3504" "exp3" 1 14 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1046 26 1
"3504" "exp3" 1 15 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 3382 0 0
"3504" "exp3" 1 16 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1063 0 0
"3504" "exp3" 1 17 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 1372 61 1
"3504" "exp3" 1 18 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1208 0 0
"3504" "exp3" 1 19 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 7579 0 0
"3504" "exp3" 1 20 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1213 30 1
"3504" "exp3" 1 21 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 943 19 1
"3504" "exp3" 1 22 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 879 17 1
"3504" "exp3" 1 23 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1904 67 1
"3504" "exp3" 1 24 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1348 14 1
"3504" "exp3" 1 25 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 1612 56 1
"3504" "exp3" 1 26 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 3489 31 1
"3504" "exp3" 1 27 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1096 36 1
"3504" "exp3" 1 28 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1162 49 1
"3504" "exp3" 1 29 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1151 52 1
"3504" "exp3" 1 30 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1339 0 0
"3504" "exp3" 1 31 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 891 41 1
"3504" "exp3" 1 32 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1365 0 0
"3504" "exp3" 1 33 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1155 0 0
"3504" "exp3" 1 34 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1066 0 0
"3504" "exp3" 1 35 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1338 31 1
"3504" "exp3" 1 36 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 1658 0 0
"3504" "exp3" 1 37 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1988 21 1
"3504" "exp3" 1 38 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1658 0 0
"3504" "exp3" 1 39 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 1582 0 0
"3504" "exp3" 1 40 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 2004 0 0
"3504" "exp3" 1 41 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1880 12 1
"3504" "exp3" 1 42 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1220 0 0
"3504" "exp3" 1 43 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1750 0 0
"3504" "exp3" 1 44 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1735 22 1
"3504" "exp3" 1 45 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1009 14 1
"3504" "exp3" 1 46 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 3409 0 0
"3504" "exp3" 1 47 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 705 16 1
"3504" "exp3" 1 48 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 993 25 1
"3504" "exp3" 1 49 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 932 25 1
"3504" "exp3" 1 50 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1401 72 1
"3504" "exp3" 1 51 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 981 41 1
"3504" "exp3" 1 52 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1140 0 0
"3504" "exp3" 1 53 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 806 25 1
"3504" "exp3" 1 54 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1988 0 0
"3504" "exp3" 1 55 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1080 67 1
"3504" "exp3" 1 56 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 790 0 0
"3504" "exp3" 1 57 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1303 13 1
"3504" "exp3" 1 58 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1432 11 1
"3504" "exp3" 1 59 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1127 0 0
"3504" "exp3" 1 60 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 617 45 1
"3504" "exp3" 1 61 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1266 30 1
"3504" "exp3" 1 62 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1267 20 1
"3504" "exp3" 1 63 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 1790 66 1
"3504" "exp3" 1 64 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1244 77 1
"3504" "exp3" 1 65 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 1531 57 1
"3504" "exp3" 1 66 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 3033 0 0
"3504" "exp3" 1 67 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2021 0 0
"3504" "exp3" 1 68 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1929 0 0
"3504" "exp3" 1 69 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1650 0 0
"3504" "exp3" 1 70 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1025 18 1
"3504" "exp3" 1 71 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1239 0 0
"3504" "exp3" 1 72 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1233 5 1
"3504" "exp3" 1 73 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1021 42 1
"3504" "exp3" 1 74 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2773 0 0
"3504" "exp3" 1 75 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 5093 47 1
"3504" "exp3" 1 76 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 4056 0 0
"3504" "exp3" 1 77 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1574 24 1
"3504" "exp3" 1 78 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1157 21 1
"3504" "exp3" 1 79 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 806 17 1
"3504" "exp3" 1 80 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1004 0 0
"3504" "exp3" 1 81 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 2399 2 1
"3504" "exp3" 1 82 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1511 0 0
"3504" "exp3" 1 83 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1051 9 1
"3504" "exp3" 1 84 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 678 0 0
"3504" "exp3" 1 85 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 1161 0 0
"3504" "exp3" 1 86 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1049 73 1
"3504" "exp3" 1 87 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1461 37 1
"3504" "exp3" 1 88 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1283 30 1
"3504" "exp3" 1 89 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 847 0 0
"3504" "exp3" 1 90 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 957 0 0
"3504" "exp3" 1 91 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 972 22 1
"3504" "exp3" 1 92 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1240 46 1
"3504" "exp3" 1 93 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 2290 0 0
"3504" "exp3" 1 94 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1062 31 1
"3504" "exp3" 1 95 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 1312 0 0
"3504" "exp3" 1 96 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1190 0 0
"3504" "exp3" 1 97 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 1484 57 1
"3504" "exp3" 1 98 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 2631 0 0
"3504" "exp3" 1 99 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 3400 7 1
"3504" "exp3" 1 100 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 2141 0 0
"3504" "exp3" 1 101 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1034 34 1
"3504" "exp3" 1 102 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1432 19 1
"3504" "exp3" 1 103 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1193 15 1
"3504" "exp3" 1 104 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 2960 1 1
"3504" "exp3" 1 105 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1799 0 0
"3504" "exp3" 1 106 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 299 8 1
"3504" "exp3" 1 107 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 292 0 0
"3504" "exp3" 1 108 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 746 38 1
"3504" "exp3" 1 109 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 608 73 1
"3504" "exp3" 1 110 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 708 67 1
"3504" "exp3" 1 111 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1090 60 1
"3504" "exp3" 1 112 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1790 90 1
"3504" "exp3" 1 113 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1712 0 0
"3504" "exp3" 1 114 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 995 0 0
"3504" "exp3" 1 115 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 936 0 0
"3504" "exp3" 1 116 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 979 6 1
"3504" "exp3" 1 117 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1131 79 1
"3504" "exp3" 1 118 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 2445 0 0
"3504" "exp3" 1 119 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 708 18 1
"3504" "exp3" 1 120 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1684 26 1
"3504" "exp3" 1 121 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1488 0 0
"3504" "exp3" 1 122 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1771 24 1
"3504" "exp3" 1 123 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 977 0 0
"3504" "exp3" 1 124 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1401 36 1
"3504" "exp3" 1 125 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1271 20 1
"3504" "exp3" 1 126 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1227 65 1
"3504" "exp3" 1 127 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1157 0 0
"3504" "exp3" 1 128 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 830 0 0
"3504" "exp3" 1 129 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1119 17 1
"3504" "exp3" 1 130 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1121 10 1
"3504" "exp3" 1 131 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 3721 0 0
"3504" "exp3" 1 132 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 946 20 1
"3504" "exp3" 2 1 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 4354 54 1
"3504" "exp3" 2 2 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 2318 24 1
"3504" "exp3" 2 3 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1466 22 1
"3504" "exp3" 2 4 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1402 36 1
"3504" "exp3" 2 5 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1155 40 1
"3504" "exp3" 2 6 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1507 15 1
"3504" "exp3" 2 7 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 1381 74 1
"3504" "exp3" 2 8 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1140 31 1
"3504" "exp3" 2 9 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1142 0 0
"3504" "exp3" 2 10 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1242 30 1
"3504" "exp3" 2 11 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 2032 9 1
"3504" "exp3" 2 12 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1214 23 1
"3504" "exp3" 2 13 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 931 0 0
"3504" "exp3" 2 14 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 866 0 0
"3504" "exp3" 2 15 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 516 84 1
"3504" "exp3" 2 16 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 655 0 0
"3504" "exp3" 2 17 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1309 0 0
"3504" "exp3" 2 18 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1902 0 0
"3504" "exp3" 2 19 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1762 0 0
"3504" "exp3" 2 20 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1375 0 0
"3504" "exp3" 2 21 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1044 0 0
"3504" "exp3" 2 22 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 801 0 0
"3504" "exp3" 2 23 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1148 37 1
"3504" "exp3" 2 24 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 3141 0 0
"3504" "exp3" 2 25 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1195 29 1
"3504" "exp3" 2 26 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 873 47 1
"3504" "exp3" 2 27 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 913 19 1
"3504" "exp3" 2 28 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 768 0 0
"3504" "exp3" 2 29 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 947 0 0
"3504" "exp3" 2 30 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 987 0 0
"3504" "exp3" 2 31 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 2384 18 1
"3504" "exp3" 2 32 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1752 0 0
"3504" "exp3" 2 33 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1857 8 1
"3504" "exp3" 2 34 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 5477 0 0
"3504" "exp3" 2 35 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 919 36 1
"3504" "exp3" 2 36 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1740 17 1
"3504" "exp3" 2 37 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 6758 0 0
"3504" "exp3" 2 38 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 294 0 0
"3504" "exp3" 2 39 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 900 22 1
"3504" "exp3" 2 40 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1041 42 1
"3504" "exp3" 2 41 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1126 0 0
"3504" "exp3" 2 42 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1083 10 1
"3504" "exp3" 2 43 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1098 0 0
"3504" "exp3" 2 44 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 2838 0 0
"3504" "exp3" 2 45 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1219 18 1
"3504" "exp3" 2 46 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1408 22 1
"3504" "exp3" 2 47 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1094 0 0
"3504" "exp3" 2 48 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1056 0 0
"3504" "exp3" 2 49 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1321 59 1
"3504" "exp3" 2 50 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 2371 0 0
"3504" "exp3" 2 51 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 932 80 1
"3504" "exp3" 2 52 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 460 66 1
"3504" "exp3" 2 53 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 524 72 1
"3504" "exp3" 2 54 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 486 0 0
"3504" "exp3" 2 55 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 460 0 0
"3504" "exp3" 2 56 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2521 0 0
"3504" "exp3" 2 57 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1280 0 0
"3504" "exp3" 2 58 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1573 15 1
"3504" "exp3" 2 59 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 2475 65 1
"3504" "exp3" 2 60 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1325 0 0
"3504" "exp3" 2 61 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 722 0 0
"3504" "exp3" 2 62 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1662 4 1
"3504" "exp3" 2 63 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1159 0 0
"3504" "exp3" 2 64 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 734 0 0
"3504" "exp3" 2 65 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 936 0 0
"3504" "exp3" 2 66 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 682 13 1
"3504" "exp3" 2 67 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1456 0 0
"3504" "exp3" 2 68 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 989 0 0
"3504" "exp3" 2 69 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 618 0 0
"3504" "exp3" 2 70 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 862 0 0
"3504" "exp3" 2 71 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1354 23 1
"3504" "exp3" 2 72 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 756 23 1
"3504" "exp3" 2 73 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 456 0 0
"3504" "exp3" 2 74 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 412 0 0
"3504" "exp3" 2 75 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 853 60 1
"3504" "exp3" 2 76 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 546 0 0
"3504" "exp3" 2 77 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 663 0 0
"3504" "exp3" 2 78 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1135 48 1
"3504" "exp3" 2 79 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 782 25 1
"3504" "exp3" 2 80 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 1101 59 1
"3504" "exp3" 2 81 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 887 0 0
"3504" "exp3" 2 82 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 693 0 0
"3504" "exp3" 2 83 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1099 0 0
"3504" "exp3" 2 84 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 754 0 0
"3504" "exp3" 2 85 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 509 25 1
"3504" "exp3" 2 86 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 906 0 0
"3504" "exp3" 2 87 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 1078 2 1
"3504" "exp3" 2 88 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 880 29 1
"3504" "exp3" 2 89 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 804 0 0
"3504" "exp3" 2 90 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1196 51 1
"3504" "exp3" 2 91 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 615 0 0
"3504" "exp3" 2 92 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1584 0 0
"3504" "exp3" 2 93 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1141 65 1
"3504" "exp3" 2 94 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1273 0 0
"3504" "exp3" 2 95 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1039 80 1
"3504" "exp3" 2 96 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 1009 70 1
"3504" "exp3" 2 97 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 787 0 0
"3504" "exp3" 2 98 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 883 0 0
"3504" "exp3" 2 99 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 970 72 1
"3504" "exp3" 2 100 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1795 39 1
"3504" "exp3" 2 101 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 2418 0 0
"3504" "exp3" 2 102 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 879 0 0
"3504" "exp3" 2 103 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 477 73 1
"3504" "exp3" 2 104 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 850 0 0
"3504" "exp3" 2 105 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 647 0 0
"3504" "exp3" 2 106 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 2128 0 0
"3504" "exp3" 2 107 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1187 24 1
"3504" "exp3" 2 108 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1442 14 1
"3504" "exp3" 2 109 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 773 43 1
"3504" "exp3" 2 110 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 612 39 1
"3504" "exp3" 2 111 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1362 0 0
"3504" "exp3" 2 112 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 876 0 0
"3504" "exp3" 2 113 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 713 0 0
"3504" "exp3" 2 114 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 377 0 0
"3504" "exp3" 2 115 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 288 33 1
"3504" "exp3" 2 116 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 469 30 1
"3504" "exp3" 2 117 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 859 0 0
"3504" "exp3" 2 118 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 539 24 1
"3504" "exp3" 2 119 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 838 20 1
"3504" "exp3" 2 120 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 1589 0 0
"3504" "exp3" 2 121 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 980 45 1
"3504" "exp3" 2 122 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 999 74 1
"3504" "exp3" 2 123 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 881 21 1
"3504" "exp3" 2 124 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1190 31 1
"3504" "exp3" 2 125 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 898 17 1
"3504" "exp3" 2 126 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 757 0 0
"3504" "exp3" 2 127 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2852 14 1
"3504" "exp3" 2 128 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1317 33 1
"3504" "exp3" 2 129 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 610 6 1
"3504" "exp3" 2 130 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 731 0 0
"3504" "exp3" 2 131 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1027 19 1
"3504" "exp3" 2 132 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 731 14 1
"3504" "exp3" 1 1 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1921 18 1
"3504" "exp3" 1 2 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1718 0 0
"3504" "exp3" 1 3 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 960 22 1
"3504" "exp3" 1 4 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 1716 0 0
"3504" "exp3" 1 5 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 2819 0 0
"3504" "exp3" 1 6 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 3742 14 1
"3504" "exp3" 1 7 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 2341 0 0
"3504" "exp3" 1 8 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2824 35 1
"3504" "exp3" 1 9 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 1486 51 1
"3504" "exp3" 1 10 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1033 5 1
"3504" "exp3" 1 11 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 2938 0 0
"3504" "exp3" 1 12 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 2552 34 1
"3504" "exp3" 1 13 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1602 0 0
"3504" "exp3" 1 14 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 1698 0 0
"3504" "exp3" 1 15 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 807 27 1
"3504" "exp3" 1 16 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 900 29 1
"3504" "exp3" 1 17 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1714 12 1
"3504" "exp3" 1 18 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1181 0 0
"3504" "exp3" 1 19 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 959 39 1
"3504" "exp3" 1 20 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 717 0 0
"3504" "exp3" 1 21 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 639 27 1
"3504" "exp3" 1 22 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 642 21 1
"3504" "exp3" 1 23 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1439 0 0
"3504" "exp3" 1 24 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1073 0 0
"3504" "exp3" 1 25 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 749 41 1
"3504" "exp3" 1 26 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 531 13 1
"3504" "exp3" 1 27 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 401 9 1
"3504" "exp3" 1 28 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 347 4 1
"3504" "exp3" 1 29 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 226 0 0
"3504" "exp3" 1 30 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 412 33 1
"3504" "exp3" 1 31 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 713 28 1
"3504" "exp3" 1 32 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 495 16 1
"3504" "exp3" 1 33 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 575 0 0
"3504" "exp3" 1 34 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 502 36 1
"3504" "exp3" 1 35 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 674 24 1
"3504" "exp3" 1 36 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 500 0 0
"3504" "exp3" 1 37 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 606 0 0
"3504" "exp3" 1 38 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 461 58 1
"3504" "exp3" 1 39 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 518 21 1
"3504" "exp3" 1 40 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 412 0 0
"3504" "exp3" 1 41 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 459 13 1
"3504" "exp3" 1 42 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 450 30 1
"3504" "exp3" 1 43 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 487 26 1
"3504" "exp3" 1 44 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 558 32 1
"3504" "exp3" 1 45 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 455 10 1
"3504" "exp3" 1 46 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 521 0 0
"3504" "exp3" 1 47 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 571 15 1
"3504" "exp3" 1 48 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 711 0 0
"3504" "exp3" 1 49 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 746 19 1
"3504" "exp3" 1 50 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 768 67 1
"3504" "exp3" 1 51 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1207 0 0
"3504" "exp3" 1 52 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1484 16 1
"3504" "exp3" 1 53 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1148 0 0
"3504" "exp3" 1 54 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 891 24 1
"3504" "exp3" 1 55 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 990 25 1
"3504" "exp3" 1 56 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 752 22 1
"3504" "exp3" 1 57 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 884 48 1
"3504" "exp3" 1 58 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 839 20 1
"3504" "exp3" 1 59 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 682 23 1
"3504" "exp3" 1 60 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 758 69 1
"3504" "exp3" 1 61 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 466 72 1
"3504" "exp3" 1 62 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 347 0 0
"3504" "exp3" 1 63 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 453 0 0
"3504" "exp3" 1 64 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 519 12 1
"3504" "exp3" 1 65 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1172 42 1
"3504" "exp3" 1 66 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 736 29 1
"3504" "exp3" 1 67 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 691 0 0
"3504" "exp3" 1 68 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 885 0 0
"3504" "exp3" 1 69 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 556 0 0
"3504" "exp3" 1 70 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 963 17 1
"3504" "exp3" 1 71 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1020 75 1
"3504" "exp3" 1 72 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 784 14 1
"3504" "exp3" 1 73 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 556 17 1
"3504" "exp3" 1 74 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 491 0 0
"3504" "exp3" 1 75 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 690 2 1
"3504" "exp3" 1 76 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 676 6 1
"3504" "exp3" 1 77 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1550 0 0
"3504" "exp3" 1 78 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 861 37 1
"3504" "exp3" 1 79 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1170 29 1
"3504" "exp3" 1 80 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1089 0 0
"3504" "exp3" 1 81 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 451 33 1
"3504" "exp3" 1 82 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 824 23 1
"3504" "exp3" 1 83 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 851 44 1
"3504" "exp3" 1 84 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 912 14 1
"3504" "exp3" 1 85 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1025 19 1
"3504" "exp3" 1 86 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 923 27 1
"3504" "exp3" 1 87 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 888 18 1
"3504" "exp3" 1 88 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 996 33 1
"3504" "exp3" 1 89 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 914 39 1
"3504" "exp3" 1 90 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 593 0 0
"3504" "exp3" 1 91 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 979 35 1
"3504" "exp3" 1 92 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1078 0 0
"3504" "exp3" 1 93 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 878 0 0
"3504" "exp3" 1 94 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 663 43 1
"3504" "exp3" 1 95 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 528 27 1
"3504" "exp3" 1 96 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 866 0 0
"3504" "exp3" 1 97 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1123 0 0
"3504" "exp3" 1 98 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2378 0 0
"3504" "exp3" 1 99 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 808 38 1
"3504" "exp3" 1 100 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1080 47 1
"3504" "exp3" 1 101 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 739 22 1
"3504" "exp3" 1 102 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 904 35 1
"3504" "exp3" 1 103 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 664 0 0
"3504" "exp3" 1 104 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1258 0 0
"3504" "exp3" 1 105 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 777 11 1
"3504" "exp3" 1 106 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 1116 0 0
"3504" "exp3" 1 107 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1093 0 0
"3504" "exp3" 1 108 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 785 21 1
"3504" "exp3" 1 109 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 717 13 1
"3504" "exp3" 1 110 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 565 7 1
"3504" "exp3" 1 111 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 844 0 0
"3504" "exp3" 1 112 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 748 21 1
"3504" "exp3" 1 113 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 460 3 1
"3504" "exp3" 1 114 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 516 45 1
"3504" "exp3" 1 115 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 551 20 1
"3504" "exp3" 1 116 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 564 9 1
"3504" "exp3" 1 117 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 521 10 1
"3504" "exp3" 1 118 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 527 23 1
"3504" "exp3" 1 119 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 398 0 0
"3504" "exp3" 1 120 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 667 34 1
"3504" "exp3" 1 121 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 539 0 0
"3504" "exp3" 1 122 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 455 68 1
"3504" "exp3" 1 123 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 392 1 1
"3504" "exp3" 1 124 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 431 26 1
"3504" "exp3" 1 125 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 668 40 1
"3504" "exp3" 1 126 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 489 8 1
"3504" "exp3" 1 127 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 482 16 1
"3504" "exp3" 1 128 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 561 17 1
"3504" "exp3" 1 129 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 560 23 1
"3504" "exp3" 1 130 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 335 64 1
"3504" "exp3" 1 131 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 255 45 1
"3504" "exp3" 1 132 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 364 15 1
"3504" "exp3" 2 1 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 849 29 1
"3504" "exp3" 2 2 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 489 23 1
"3504" "exp3" 2 3 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 756 33 1
"3504" "exp3" 2 4 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 511 0 0
"3504" "exp3" 2 5 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 564 0 0
"3504" "exp3" 2 6 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 494 11 1
"3504" "exp3" 2 7 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 355 82 1
"3504" "exp3" 2 8 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 419 53 1
"3504" "exp3" 2 9 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 437 17 1
"3504" "exp3" 2 10 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 458 0 0
"3504" "exp3" 2 11 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 438 12 1
"3504" "exp3" 2 12 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 571 43 1
"3504" "exp3" 2 13 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 595 0 0
"3504" "exp3" 2 14 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 478 0 0
"3504" "exp3" 2 15 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 629 0 0
"3504" "exp3" 2 16 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 521 0 0
"3504" "exp3" 2 17 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 463 18 1
"3504" "exp3" 2 18 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 473 0 0
"3504" "exp3" 2 19 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 192 0 0
"3504" "exp3" 2 20 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 217 0 0
"3504" "exp3" 2 21 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 142 68 1
"3504" "exp3" 2 22 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 193 37 1
"3504" "exp3" 2 23 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 399 38 1
"3504" "exp3" 2 24 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 286 0 0
"3504" "exp3" 2 25 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 282 0 0
"3504" "exp3" 2 26 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 318 26 1
"3504" "exp3" 2 27 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 321 6 1
"3504" "exp3" 2 28 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 267 55 1
"3504" "exp3" 2 29 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 503 27 1
"3504" "exp3" 2 30 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 545 89 1
"3504" "exp3" 2 31 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 477 20 1
"3504" "exp3" 2 32 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 227 0 0
"3504" "exp3" 2 33 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 240 86 1
"3504" "exp3" 2 34 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 329 58 1
"3504" "exp3" 2 35 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 464 80 1
"3504" "exp3" 2 36 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 393 0 0
"3504" "exp3" 2 37 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 634 7 1
"3504" "exp3" 2 38 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 517 18 1
"3504" "exp3" 2 39 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 406 0 0
"3504" "exp3" 2 40 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 537 0 0
"3504" "exp3" 2 41 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 741 0 0
"3504" "exp3" 2 42 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 577 23 1
"3504" "exp3" 2 43 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 475 0 0
"3504" "exp3" 2 44 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 413 0 0
"3504" "exp3" 2 45 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 410 24 1
"3504" "exp3" 2 46 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 396 5 1
"3504" "exp3" 2 47 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 393 94 1
"3504" "exp3" 2 48 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 755 0 0
"3504" "exp3" 2 49 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 594 0 0
"3504" "exp3" 2 50 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 416 0 0
"3504" "exp3" 2 51 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 452 27 1
"3504" "exp3" 2 52 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 343 0 0
"3504" "exp3" 2 53 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 543 10 1
"3504" "exp3" 2 54 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 433 52 1
"3504" "exp3" 2 55 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 781 16 1
"3504" "exp3" 2 56 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 432 0 0
"3504" "exp3" 2 57 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 938 29 1
"3504" "exp3" 2 58 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 472 35 1
"3504" "exp3" 2 59 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 602 46 1
"3504" "exp3" 2 60 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 604 0 0
"3504" "exp3" 2 61 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 539 0 0
"3504" "exp3" 2 62 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 357 0 0
"3504" "exp3" 2 63 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 573 28 1
"3504" "exp3" 2 64 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 428 27 1
"3504" "exp3" 2 65 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 636 34 1
"3504" "exp3" 2 66 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 468 21 1
"3504" "exp3" 2 67 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 612 37 1
"3504" "exp3" 2 68 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 395 44 1
"3504" "exp3" 2 69 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 390 0 0
"3504" "exp3" 2 70 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 379 17 1
"3504" "exp3" 2 71 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 458 0 0
"3504" "exp3" 2 72 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 479 60 1
"3504" "exp3" 2 73 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 511 32 1
"3504" "exp3" 2 74 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 333 26 1
"3504" "exp3" 2 75 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 293 0 0
"3504" "exp3" 2 76 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 737 36 1
"3504" "exp3" 2 77 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 655 21 1
"3504" "exp3" 2 78 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 471 0 0
"3504" "exp3" 2 79 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 556 8 1
"3504" "exp3" 2 80 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 342 0 0
"3504" "exp3" 2 81 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 213 0 0
"3504" "exp3" 2 82 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 201 0 0
"3504" "exp3" 2 83 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 195 23 1
"3504" "exp3" 2 84 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 609 0 0
"3504" "exp3" 2 85 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 392 8 1
"3504" "exp3" 2 86 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 459 29 1
"3504" "exp3" 2 87 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 328 19 1
"3504" "exp3" 2 88 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 283 29 1
"3504" "exp3" 2 89 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 246 0 0
"3504" "exp3" 2 90 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 384 0 0
"3504" "exp3" 2 91 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 617 17 1
"3504" "exp3" 2 92 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 402 13 1
"3504" "exp3" 2 93 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 396 0 0
"3504" "exp3" 2 94 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 426 0 0
"3504" "exp3" 2 95 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 511 19 1
"3504" "exp3" 2 96 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 331 20 1
"3504" "exp3" 2 97 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 221 2 1
"3504" "exp3" 2 98 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 433 61 1
"3504" "exp3" 2 99 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 385 33 1
"3504" "exp3" 2 100 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 436 15 1
"3504" "exp3" 2 101 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 457 41 1
"3504" "exp3" 2 102 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 253 30 1
"3504" "exp3" 2 103 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 401 0 0
"3504" "exp3" 2 104 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 382 0 0
"3504" "exp3" 2 105 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 352 0 0
"3504" "exp3" 2 106 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 325 63 1
"3504" "exp3" 2 107 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 492 0 0
"3504" "exp3" 2 108 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 781 0 0
"3504" "exp3" 2 109 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 1046 3 1
"3504" "exp3" 2 110 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 788 35 1
"3504" "exp3" 2 111 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 765 18 1
"3504" "exp3" 2 112 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1275 0 0
"3504" "exp3" 2 113 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 665 25 1
"3504" "exp3" 2 114 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 721 0 0
"3504" "exp3" 2 115 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 733 0 0
"3504" "exp3" 2 116 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 1147 0 0
"3504" "exp3" 2 117 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1135 36 1
"3504" "exp3" 2 118 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1035 16 1
"3504" "exp3" 2 119 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 542 22 1
"3504" "exp3" 2 120 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 607 19 1
"3504" "exp3" 2 121 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1003 31 1
"3504" "exp3" 2 122 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 623 38 1
"3504" "exp3" 2 123 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1227 39 1
"3504" "exp3" 2 124 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 737 32 1
"3504" "exp3" 2 125 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 734 27 1
"3504" "exp3" 2 126 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 727 0 0
"3504" "exp3" 2 127 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 595 16 1
"3504" "exp3" 2 128 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 489 12 1
"3504" "exp3" 2 129 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 694 15 1
"3504" "exp3" 2 130 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 692 0 0
"3504" "exp3" 2 131 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 541 0 0
"3504" "exp3" 2 132 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 421 0 0
"3504" "exp3" 1 1 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1130 23 1
"3504" "exp3" 1 2 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 696 0 0
"3504" "exp3" 1 3 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 526 42 1
"3504" "exp3" 1 4 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 500 43 1
"3504" "exp3" 1 5 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 322 0 0
"3504" "exp3" 1 6 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 390 26 1
"3504" "exp3" 1 7 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 262 3 1
"3504" "exp3" 1 8 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 457 35 1
"3504" "exp3" 1 9 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 323 66 1
"3504" "exp3" 1 10 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 396 10 1
"3504" "exp3" 1 11 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 681 9 1
"3504" "exp3" 1 12 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 428 19 1
"3504" "exp3" 1 13 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 414 6 1
"3504" "exp3" 1 14 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 570 0 0
"3504" "exp3" 1 15 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 452 14 1
"3504" "exp3" 1 16 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 486 18 1
"3504" "exp3" 1 17 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 432 32 1
"3504" "exp3" 1 18 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 215 43 1
"3504" "exp3" 1 19 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 346 0 0
"3504" "exp3" 1 20 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 822 0 0
"3504" "exp3" 1 21 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 908 0 0
"3504" "exp3" 1 22 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 459 0 0
"3504" "exp3" 1 23 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 732 28 1
"3504" "exp3" 1 24 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 473 11 1
"3504" "exp3" 1 25 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 509 35 1
"3504" "exp3" 1 26 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 378 32 1
"3504" "exp3" 1 27 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 296 0 0
"3504" "exp3" 1 28 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 289 18 1
"3504" "exp3" 1 29 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 558 37 1
"3504" "exp3" 1 30 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 642 13 1
"3504" "exp3" 1 31 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 385 24 1
"3504" "exp3" 1 32 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 354 27 1
"3504" "exp3" 1 33 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 418 10 1
"3504" "exp3" 1 34 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 509 45 1
"3504" "exp3" 1 35 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 398 34 1
"3504" "exp3" 1 36 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 469 23 1
"3504" "exp3" 1 37 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 415 0 0
"3504" "exp3" 1 38 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 378 0 0
"3504" "exp3" 1 39 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 390 30 1
"3504" "exp3" 1 40 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 309 35 1
"3504" "exp3" 1 41 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 397 0 0
"3504" "exp3" 1 42 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 250 21 1
"3504" "exp3" 1 43 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 373 0 0
"3504" "exp3" 1 44 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 339 70 1
"3504" "exp3" 1 45 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 471 20 1
"3504" "exp3" 1 46 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 431 16 1
"3504" "exp3" 1 47 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 494 0 0
"3504" "exp3" 1 48 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 401 0 0
"3504" "exp3" 1 49 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 595 0 0
"3504" "exp3" 1 50 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 4841 77 1
"3504" "exp3" 1 51 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1465 14 1
"3504" "exp3" 1 52 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 502 36 1
"3504" "exp3" 1 53 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 482 14 1
"3504" "exp3" 1 54 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1283 24 1
"3504" "exp3" 1 55 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 622 12 1
"3504" "exp3" 1 56 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 481 0 0
"3504" "exp3" 1 57 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 664 0 0
"3504" "exp3" 1 58 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 502 0 0
"3504" "exp3" 1 59 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 389 26 1
"3504" "exp3" 1 60 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 467 8 1
"3504" "exp3" 1 61 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 424 7 1
"3504" "exp3" 1 62 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 496 17 1
"3504" "exp3" 1 63 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 439 2 1
"3504" "exp3" 1 64 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 553 21 1
"3504" "exp3" 1 65 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 576 26 1
"3504" "exp3" 1 66 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 459 19 1
"3504" "exp3" 1 67 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 496 25 1
"3504" "exp3" 1 68 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 502 0 0
"3504" "exp3" 1 69 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 503 0 0
"3504" "exp3" 1 70 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 402 13 1
"3504" "exp3" 1 71 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 835 0 0
"3504" "exp3" 1 72 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 567 23 1
"3504" "exp3" 1 73 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 404 25 1
"3504" "exp3" 1 74 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 376 4 1
"3504" "exp3" 1 75 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 523 6 1
"3504" "exp3" 1 76 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 645 0 0
"3504" "exp3" 1 77 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1655 38 1
"3504" "exp3" 1 78 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 400 0 0
"3504" "exp3" 1 79 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 481 39 1
"3504" "exp3" 1 80 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 422 33 1
"3504" "exp3" 1 81 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 507 25 1
"3504" "exp3" 1 82 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 751 31 1
"3504" "exp3" 1 83 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 520 0 0
"3504" "exp3" 1 84 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 426 5 1
"3504" "exp3" 1 85 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 455 38 1
"3504" "exp3" 1 86 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 372 22 1
"3504" "exp3" 1 87 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 410 25 1
"3504" "exp3" 1 88 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 351 30 1
"3504" "exp3" 1 89 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 318 0 0
"3504" "exp3" 1 90 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 347 19 1
"3504" "exp3" 1 91 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 422 0 0
"3504" "exp3" 1 92 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 364 31 1
"3504" "exp3" 1 93 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 362 0 0
"3504" "exp3" 1 94 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 220 0 0
"3504" "exp3" 1 95 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 243 0 0
"3504" "exp3" 1 96 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 403 33 1
"3504" "exp3" 1 97 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 243 0 0
"3504" "exp3" 1 98 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 213 49 1
"3504" "exp3" 1 99 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 348 0 0
"3504" "exp3" 1 100 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 298 0 0
"3504" "exp3" 1 101 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 266 40 1
"3504" "exp3" 1 102 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 317 16 1
"3504" "exp3" 1 103 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 425 29 1
"3504" "exp3" 1 104 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 269 0 0
"3504" "exp3" 1 105 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 723 42 1
"3504" "exp3" 1 106 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 396 17 1
"3504" "exp3" 1 107 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 234 33 1
"3504" "exp3" 1 108 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 456 12 1
"3504" "exp3" 1 109 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 247 59 1
"3504" "exp3" 1 110 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 367 36 1
"3504" "exp3" 1 111 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 977 20 1
"3504" "exp3" 1 112 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 467 0 0
"3504" "exp3" 1 113 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 255 24 1
"3504" "exp3" 1 114 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 301 20 1
"3504" "exp3" 1 115 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 241 39 1
"3504" "exp3" 1 116 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 156 0 0
"3504" "exp3" 1 117 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 489 29 1
"3504" "exp3" 1 118 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 188 0 0
"3504" "exp3" 1 119 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 432 22 1
"3504" "exp3" 1 120 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 322 22 1
"3504" "exp3" 1 121 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 143 0 0
"3504" "exp3" 1 122 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 230 0 0
"3504" "exp3" 1 123 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 345 0 0
"3504" "exp3" 1 124 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 237 0 0
"3504" "exp3" 1 125 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 291 11 1
"3504" "exp3" 1 126 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 219 15 1
"3504" "exp3" 1 127 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 301 19 1
"3504" "exp3" 1 128 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1029 37 1
"3504" "exp3" 1 129 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 332 0 0
"3504" "exp3" 1 130 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 327 22 1
"3504" "exp3" 1 131 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 336 0 0
"3504" "exp3" 1 132 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 79 31 1
"3504" "exp3" 2 1 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 790 0 0
"3504" "exp3" 2 2 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 473 14 1
"3504" "exp3" 2 3 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 459 20 1
"3504" "exp3" 2 4 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 503 16 1
"3504" "exp3" 2 5 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 461 25 1
"3504" "exp3" 2 6 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 440 0 0
"3504" "exp3" 2 7 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 515 44 1
"3504" "exp3" 2 8 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 528 0 0
"3504" "exp3" 2 9 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 498 0 0
"3504" "exp3" 2 10 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 446 5 1
"3504" "exp3" 2 11 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 585 24 1
"3504" "exp3" 2 12 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 989 35 1
"3504" "exp3" 2 13 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 253 0 0
"3504" "exp3" 2 14 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 401 12 1
"3504" "exp3" 2 15 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 399 0 0
"3504" "exp3" 2 16 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 326 16 1
"3504" "exp3" 2 17 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 312 0 0
"3504" "exp3" 2 18 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 314 0 0
"3504" "exp3" 2 19 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 437 19 1
"3504" "exp3" 2 20 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 412 36 1
"3504" "exp3" 2 21 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 408 9 1
"3504" "exp3" 2 22 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 411 31 1
"3504" "exp3" 2 23 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 591 24 1
"3504" "exp3" 2 24 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1456 0 0
"3504" "exp3" 2 25 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 526 0 0
"3504" "exp3" 2 26 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 511 17 1
"3504" "exp3" 2 27 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 404 10 1
"3504" "exp3" 2 28 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 613 0 0
"3504" "exp3" 2 29 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 695 39 1
"3504" "exp3" 2 30 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 422 8 1
"3504" "exp3" 2 31 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 500 27 1
"3504" "exp3" 2 32 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 466 17 1
"3504" "exp3" 2 33 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 432 0 0
"3504" "exp3" 2 34 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 559 0 0
"3504" "exp3" 2 35 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 453 28 1
"3504" "exp3" 2 36 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 605 23 1
"3504" "exp3" 2 37 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 369 0 0
"3504" "exp3" 2 38 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 507 20 1
"3504" "exp3" 2 39 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 606 39 1
"3504" "exp3" 2 40 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1014 22 1
"3504" "exp3" 2 41 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 459 29 1
"3504" "exp3" 2 42 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 502 37 1
"3504" "exp3" 2 43 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 274 9 1
"3504" "exp3" 2 44 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 314 37 1
"3504" "exp3" 2 45 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 373 49 1
"3504" "exp3" 2 46 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 629 6 1
"3504" "exp3" 2 47 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 584 42 1
"3504" "exp3" 2 48 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 623 0 0
"3504" "exp3" 2 49 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 531 31 1
"3504" "exp3" 2 50 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 381 20 1
"3504" "exp3" 2 51 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 402 7 1
"3504" "exp3" 2 52 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 373 27 1
"3504" "exp3" 2 53 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 360 43 1
"3504" "exp3" 2 54 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 319 64 1
"3504" "exp3" 2 55 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 369 27 1
"3504" "exp3" 2 56 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 504 0 0
"3504" "exp3" 2 57 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 436 23 1
"3504" "exp3" 2 58 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 448 0 0
"3504" "exp3" 2 59 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 527 30 1
"3504" "exp3" 2 60 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 3424 28 1
"3504" "exp3" 2 61 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 763 0 0
"3504" "exp3" 2 62 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 460 23 1
"3504" "exp3" 2 63 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 348 0 0
"3504" "exp3" 2 64 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 460 0 0
"3504" "exp3" 2 65 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 414 0 0
"3504" "exp3" 2 66 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 318 33 1
"3504" "exp3" 2 67 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 424 22 1
"3504" "exp3" 2 68 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 481 29 1
"3504" "exp3" 2 69 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 269 6 1
"3504" "exp3" 2 70 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 194 0 0
"3504" "exp3" 2 71 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 229 0 0
"3504" "exp3" 2 72 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 291 32 1
"3504" "exp3" 2 73 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 232 44 1
"3504" "exp3" 2 74 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 501 21 1
"3504" "exp3" 2 75 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 209 0 0
"3504" "exp3" 2 76 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 438 30 1
"3504" "exp3" 2 77 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 392 0 0
"3504" "exp3" 2 78 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 557 11 1
"3504" "exp3" 2 79 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 367 33 1
"3504" "exp3" 2 80 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 346 15 1
"3504" "exp3" 2 81 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 583 38 1
"3504" "exp3" 2 82 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 324 82 1
"3504" "exp3" 2 83 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 631 0 0
"3504" "exp3" 2 84 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 467 1 1
"3504" "exp3" 2 85 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 551 0 0
"3504" "exp3" 2 86 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 283 0 0
"3504" "exp3" 2 87 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 272 15 1
"3504" "exp3" 2 88 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 266 18 1
"3504" "exp3" 2 89 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 227 67 1
"3504" "exp3" 2 90 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 331 0 0
"3504" "exp3" 2 91 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 197 19 1
"3504" "exp3" 2 92 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 250 78 1
"3504" "exp3" 2 93 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 395 13 1
"3504" "exp3" 2 94 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 422 29 1
"3504" "exp3" 2 95 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 516 21 1
"3504" "exp3" 2 96 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 402 15 1
"3504" "exp3" 2 97 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 399 27 1
"3504" "exp3" 2 98 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 420 4 1
"3504" "exp3" 2 99 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 434 12 1
"3504" "exp3" 2 100 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 390 34 1
"3504" "exp3" 2 101 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 307 28 1
"3504" "exp3" 2 102 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 302 25 1
"3504" "exp3" 2 103 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 277 0 0
"3504" "exp3" 2 104 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 403 35 1
"3504" "exp3" 2 105 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 344 0 0
"3504" "exp3" 2 106 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 405 3 1
"3504" "exp3" 2 107 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 263 0 0
"3504" "exp3" 2 108 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 395 0 0
"3504" "exp3" 2 109 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 266 26 1
"3504" "exp3" 2 110 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 437 0 0
"3504" "exp3" 2 111 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 247 0 0
"3504" "exp3" 2 112 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 315 20 1
"3504" "exp3" 2 113 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 241 0 0
"3504" "exp3" 2 114 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 213 0 0
"3504" "exp3" 2 115 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 226 0 0
"3504" "exp3" 2 116 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 227 0 0
"3504" "exp3" 2 117 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 398 28 1
"3504" "exp3" 2 118 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 416 5 1
"3504" "exp3" 2 119 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 405 10 1
"3504" "exp3" 2 120 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 359 0 0
"3504" "exp3" 2 121 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 500 17 1
"3504" "exp3" 2 122 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 382 0 0
"3504" "exp3" 2 123 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 423 21 1
"3504" "exp3" 2 124 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 299 2 1
"3504" "exp3" 2 125 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 371 45 1
"3504" "exp3" 2 126 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 380 0 0
"3504" "exp3" 2 127 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 449 18 1
"3504" "exp3" 2 128 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 389 0 0
"3504" "exp3" 2 129 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 404 11 1
"3504" "exp3" 2 130 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 428 31 1
"3504" "exp3" 2 131 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 548 0 0
"3504" "exp3" 2 132 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 365 0 0
"3506" "exp3" 1 1 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1041 0 0
"3506" "exp3" 1 2 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 829 14 1
"3506" "exp3" 1 3 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 1302 5 1
"3506" "exp3" 1 4 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 912 0 0
"3506" "exp3" 1 5 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 615 20 1
"3506" "exp3" 1 6 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 631 19 1
"3506" "exp3" 1 7 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 988 0 0
"3506" "exp3" 1 8 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 700 59 1
"3506" "exp3" 1 9 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1115 0 0
"3506" "exp3" 1 10 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 816 32 1
"3506" "exp3" 1 11 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 892 72 1
"3506" "exp3" 1 12 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 762 22 1
"3506" "exp3" 1 13 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 754 22 1
"3506" "exp3" 1 14 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 767 41 1
"3506" "exp3" 1 15 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1060 32 1
"3506" "exp3" 1 16 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 708 13 1
"3506" "exp3" 1 17 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1048 7 1
"3506" "exp3" 1 18 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1209 0 0
"3506" "exp3" 1 19 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 781 0 0
"3506" "exp3" 1 20 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 979 18 1
"3506" "exp3" 1 21 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 915 18 1
"3506" "exp3" 1 22 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 870 0 0
"3506" "exp3" 1 23 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1163 0 0
"3506" "exp3" 1 24 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1159 0 0
"3506" "exp3" 1 25 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 992 24 1
"3506" "exp3" 1 26 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 955 16 1
"3506" "exp3" 1 27 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 973 32 1
"3506" "exp3" 1 28 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 906 0 0
"3506" "exp3" 1 29 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 892 17 1
"3506" "exp3" 1 30 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 636 23 1
"3506" "exp3" 1 31 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1120 0 0
"3506" "exp3" 1 32 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 655 14 1
"3506" "exp3" 1 33 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 781 27 1
"3506" "exp3" 1 34 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 626 1 1
"3506" "exp3" 1 35 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 731 20 1
"3506" "exp3" 1 36 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 577 30 1
"3506" "exp3" 1 37 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 660 0 0
"3506" "exp3" 1 38 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 981 66 1
"3506" "exp3" 1 39 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 630 26 1
"3506" "exp3" 1 40 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 571 17 1
"3506" "exp3" 1 41 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 1173 0 0
"3506" "exp3" 1 42 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 626 21 1
"3506" "exp3" 1 43 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 860 28 1
"3506" "exp3" 1 44 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 645 20 1
"3506" "exp3" 1 45 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 502 6 1
"3506" "exp3" 1 46 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1090 60 1
"3506" "exp3" 1 47 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 581 22 1
"3506" "exp3" 1 48 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 642 23 1
"3506" "exp3" 1 49 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1036 21 1
"3506" "exp3" 1 50 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 588 21 1
"3506" "exp3" 1 51 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 608 17 1
"3506" "exp3" 1 52 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1154 0 0
"3506" "exp3" 1 53 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1063 0 0
"3506" "exp3" 1 54 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 823 0 0
"3506" "exp3" 1 55 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 777 18 1
"3506" "exp3" 1 56 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 680 9 1
"3506" "exp3" 1 57 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 734 35 1
"3506" "exp3" 1 58 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 565 3 1
"3506" "exp3" 1 59 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 1300 0 0
"3506" "exp3" 1 60 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 881 0 0
"3506" "exp3" 1 61 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 878 61 1
"3506" "exp3" 1 62 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1313 33 1
"3506" "exp3" 1 63 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 989 64 1
"3506" "exp3" 1 64 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 711 23 1
"3506" "exp3" 1 65 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 811 0 0
"3506" "exp3" 1 66 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 689 43 1
"3506" "exp3" 1 67 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 885 0 0
"3506" "exp3" 1 68 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1613 24 1
"3506" "exp3" 1 69 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1066 51 1
"3506" "exp3" 1 70 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1190 27 1
"3506" "exp3" 1 71 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 983 20 1
"3506" "exp3" 1 72 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 2616 0 0
"3506" "exp3" 1 73 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1011 0 0
"3506" "exp3" 1 74 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 920 7 1
"3506" "exp3" 1 75 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 917 28 1
"3506" "exp3" 1 76 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1217 70 1
"3506" "exp3" 1 77 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 611 19 1
"3506" "exp3" 1 78 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 870 55 1
"3506" "exp3" 1 79 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 676 10 1
"3506" "exp3" 1 80 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 925 0 0
"3506" "exp3" 1 81 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 669 13 1
"3506" "exp3" 1 82 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 608 15 1
"3506" "exp3" 1 83 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1082 23 1
"3506" "exp3" 1 84 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1462 0 0
"3506" "exp3" 1 85 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 677 9 1
"3506" "exp3" 1 86 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 750 29 1
"3506" "exp3" 1 87 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 844 18 1
"3506" "exp3" 1 88 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 521 0 0
"3506" "exp3" 1 89 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 806 39 1
"3506" "exp3" 1 90 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 785 0 0
"3506" "exp3" 1 91 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 713 0 0
"3506" "exp3" 1 92 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 647 69 1
"3506" "exp3" 1 93 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 773 16 1
"3506" "exp3" 1 94 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 768 16 1
"3506" "exp3" 1 95 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1402 0 0
"3506" "exp3" 1 96 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 947 67 1
"3506" "exp3" 1 97 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 724 0 0
"3506" "exp3" 1 98 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 815 0 0
"3506" "exp3" 1 99 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 669 25 1
"3506" "exp3" 1 100 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 772 12 1
"3506" "exp3" 1 101 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 794 13 1
"3506" "exp3" 1 102 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 684 34 1
"3506" "exp3" 1 103 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1306 0 0
"3506" "exp3" 1 104 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 843 10 1
"3506" "exp3" 1 105 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 1155 0 0
"3506" "exp3" 1 106 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 892 35 1
"3506" "exp3" 1 107 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 592 15 1
"3506" "exp3" 1 108 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 912 0 0
"3506" "exp3" 1 109 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 773 58 1
"3506" "exp3" 1 110 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 611 14 1
"3506" "exp3" 1 111 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 547 19 1
"3506" "exp3" 1 112 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 554 15 1
"3506" "exp3" 1 113 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 891 33 1
"3506" "exp3" 1 114 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 524 8 1
"3506" "exp3" 1 115 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 854 56 1
"3506" "exp3" 1 116 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 710 2 1
"3506" "exp3" 1 117 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 830 0 0
"3506" "exp3" 1 118 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 747 17 1
"3506" "exp3" 1 119 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1328 0 0
"3506" "exp3" 1 120 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 723 24 1
"3506" "exp3" 1 121 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 986 30 1
"3506" "exp3" 1 122 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 652 11 1
"3506" "exp3" 1 123 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 696 8 1
"3506" "exp3" 1 124 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 520 4 1
"3506" "exp3" 1 125 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 530 26 1
"3506" "exp3" 1 126 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 951 40 1
"3506" "exp3" 1 127 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 691 5 1
"3506" "exp3" 1 128 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 839 36 1
"3506" "exp3" 1 129 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1367 0 0
"3506" "exp3" 1 130 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 686 30 1
"3506" "exp3" 1 131 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1363 0 0
"3506" "exp3" 1 132 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 546 26 1
"3506" "exp3" 2 1 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1038 0 0
"3506" "exp3" 2 2 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 695 19 1
"3506" "exp3" 2 3 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 831 0 0
"3506" "exp3" 2 4 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 570 7 1
"3506" "exp3" 2 5 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1081 27 1
"3506" "exp3" 2 6 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 588 9 1
"3506" "exp3" 2 7 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 576 19 1
"3506" "exp3" 2 8 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 876 31 1
"3506" "exp3" 2 9 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1059 0 0
"3506" "exp3" 2 10 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 1928 0 0
"3506" "exp3" 2 11 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1562 0 0
"3506" "exp3" 2 12 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 1288 0 0
"3506" "exp3" 2 13 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1036 32 1
"3506" "exp3" 2 14 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 894 0 0
"3506" "exp3" 2 15 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 860 25 1
"3506" "exp3" 2 16 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1481 17 1
"3506" "exp3" 2 17 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1367 0 0
"3506" "exp3" 2 18 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1894 0 0
"3506" "exp3" 2 19 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 744 0 0
"3506" "exp3" 2 20 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 633 14 1
"3506" "exp3" 2 21 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 780 18 1
"3506" "exp3" 2 22 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1360 36 1
"3506" "exp3" 2 23 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1047 37 1
"3506" "exp3" 2 24 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1210 0 0
"3506" "exp3" 2 25 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1025 47 1
"3506" "exp3" 2 26 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 2583 34 1
"3506" "exp3" 2 27 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 2826 27 1
"3506" "exp3" 2 28 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1394 49 1
"3506" "exp3" 2 29 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 2257 0 0
"3506" "exp3" 2 30 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 902 4 1
"3506" "exp3" 2 31 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1354 20 1
"3506" "exp3" 2 32 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1165 16 1
"3506" "exp3" 2 33 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 3210 26 1
"3506" "exp3" 2 34 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1933 38 1
"3506" "exp3" 2 35 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1155 0 0
"3506" "exp3" 2 36 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 991 30 1
"3506" "exp3" 2 37 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1057 15 1
"3506" "exp3" 2 38 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 1347 0 0
"3506" "exp3" 2 39 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 1347 76 1
"3506" "exp3" 2 40 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 842 7 1
"3506" "exp3" 2 41 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 2572 70 1
"3506" "exp3" 2 42 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1277 0 0
"3506" "exp3" 2 43 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 2696 0 0
"3506" "exp3" 2 44 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1175 22 1
"3506" "exp3" 2 45 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 827 11 1
"3506" "exp3" 2 46 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1444 0 0
"3506" "exp3" 2 47 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 680 18 1
"3506" "exp3" 2 48 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1303 35 1
"3506" "exp3" 2 49 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 837 25 1
"3506" "exp3" 2 50 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1470 0 0
"3506" "exp3" 2 51 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1041 0 0
"3506" "exp3" 2 52 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1179 0 0
"3506" "exp3" 2 53 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 2444 31 1
"3506" "exp3" 2 54 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1327 15 1
"3506" "exp3" 2 55 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 871 28 1
"3506" "exp3" 2 56 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1168 8 1
"3506" "exp3" 2 57 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1483 0 0
"3506" "exp3" 2 58 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 2403 0 0
"3506" "exp3" 2 59 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1200 45 1
"3506" "exp3" 2 60 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 2106 26 1
"3506" "exp3" 2 61 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2967 0 0
"3506" "exp3" 2 62 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 2316 25 1
"3506" "exp3" 2 63 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1592 0 0
"3506" "exp3" 2 64 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1781 33 1
"3506" "exp3" 2 65 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 3220 8 1
"3506" "exp3" 2 66 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1413 22 1
"3506" "exp3" 2 67 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1208 30 1
"3506" "exp3" 2 68 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1066 0 0
"3506" "exp3" 2 69 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1028 10 1
"3506" "exp3" 2 70 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 2837 74 1
"3506" "exp3" 2 71 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1331 0 0
"3506" "exp3" 2 72 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 2071 0 0
"3506" "exp3" 2 73 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1831 42 1
"3506" "exp3" 2 74 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1568 0 0
"3506" "exp3" 2 75 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 4556 39 1
"3506" "exp3" 2 76 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1534 36 1
"3506" "exp3" 2 77 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1177 12 1
"3506" "exp3" 2 78 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1146 0 0
"3506" "exp3" 2 79 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1857 40 1
"3506" "exp3" 2 80 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1389 0 0
"3506" "exp3" 2 81 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1045 46 1
"3506" "exp3" 2 82 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 3008 0 0
"3506" "exp3" 2 83 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1008 0 0
"3506" "exp3" 2 84 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1942 16 1
"3506" "exp3" 2 85 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1746 0 0
"3506" "exp3" 2 86 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2191 0 0
"3506" "exp3" 2 87 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1474 17 1
"3506" "exp3" 2 88 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 3187 0 0
"3506" "exp3" 2 89 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1570 0 0
"3506" "exp3" 2 90 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1476 31 1
"3506" "exp3" 2 91 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1890 63 1
"3506" "exp3" 2 92 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 2145 65 1
"3506" "exp3" 2 93 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1457 0 0
"3506" "exp3" 2 94 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 825 0 0
"3506" "exp3" 2 95 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1463 32 1
"3506" "exp3" 2 96 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1066 22 1
"3506" "exp3" 2 97 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 3564 66 1
"3506" "exp3" 2 98 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1280 75 1
"3506" "exp3" 2 99 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1112 16 1
"3506" "exp3" 2 100 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1100 11 1
"3506" "exp3" 2 101 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1329 0 0
"3506" "exp3" 2 102 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 988 0 0
"3506" "exp3" 2 103 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 2622 14 1
"3506" "exp3" 2 104 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2087 45 1
"3506" "exp3" 2 105 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 924 0 0
"3506" "exp3" 2 106 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 638 20 1
"3506" "exp3" 2 107 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 3192 0 0
"3506" "exp3" 2 108 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1260 40 1
"3506" "exp3" 2 109 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1432 43 1
"3506" "exp3" 2 110 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 967 28 1
"3506" "exp3" 2 111 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1293 0 0
"3506" "exp3" 2 112 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 957 17 1
"3506" "exp3" 2 113 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1429 15 1
"3506" "exp3" 2 114 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1058 21 1
"3506" "exp3" 2 115 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 969 26 1
"3506" "exp3" 2 116 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1700 29 1
"3506" "exp3" 2 117 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 827 6 1
"3506" "exp3" 2 118 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 2300 32 1
"3506" "exp3" 2 119 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1365 0 0
"3506" "exp3" 2 120 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2140 0 0
"3506" "exp3" 2 121 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1768 0 0
"3506" "exp3" 2 122 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1226 19 1
"3506" "exp3" 2 123 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1361 0 0
"3506" "exp3" 2 124 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 3048 29 1
"3506" "exp3" 2 125 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1190 22 1
"3506" "exp3" 2 126 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1376 0 0
"3506" "exp3" 2 127 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 2585 0 0
"3506" "exp3" 2 128 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 2968 0 0
"3506" "exp3" 2 129 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1986 41 1
"3506" "exp3" 2 130 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 941 21 1
"3506" "exp3" 2 131 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 909 14 1
"3506" "exp3" 2 132 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 860 13 1
"3506" "exp3" 1 1 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1604 32 1
"3506" "exp3" 1 2 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 918 0 0
"3506" "exp3" 1 3 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 2099 24 1
"3506" "exp3" 1 4 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1958 0 0
"3506" "exp3" 1 5 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 3135 40 1
"3506" "exp3" 1 6 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1843 89 1
"3506" "exp3" 1 7 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1431 0 0
"3506" "exp3" 1 8 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2251 0 0
"3506" "exp3" 1 9 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1956 68 1
"3506" "exp3" 1 10 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2072 23 1
"3506" "exp3" 1 11 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2549 14 1
"3506" "exp3" 1 12 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 1703 64 1
"3506" "exp3" 1 13 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 3181 0 0
"3506" "exp3" 1 14 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1523 0 0
"3506" "exp3" 1 15 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2321 47 1
"3506" "exp3" 1 16 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1865 32 1
"3506" "exp3" 1 17 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2034 0 0
"3506" "exp3" 1 18 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2283 0 0
"3506" "exp3" 1 19 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1957 0 0
"3506" "exp3" 1 20 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2156 21 1
"3506" "exp3" 1 21 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2025 0 0
"3506" "exp3" 1 22 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 1701 0 0
"3506" "exp3" 1 23 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1462 19 1
"3506" "exp3" 1 24 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1710 29 1
"3506" "exp3" 1 25 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1498 0 0
"3506" "exp3" 1 26 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 2883 0 0
"3506" "exp3" 1 27 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1909 34 1
"3506" "exp3" 1 28 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1768 0 0
"3506" "exp3" 1 29 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2280 29 1
"3506" "exp3" 1 30 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 2029 0 0
"3506" "exp3" 1 31 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1946 0 0
"3506" "exp3" 1 32 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2430 0 0
"3506" "exp3" 1 33 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2018 0 0
"3506" "exp3" 1 34 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1442 0 0
"3506" "exp3" 1 35 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 4464 0 0
"3506" "exp3" 1 36 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 2393 0 0
"3506" "exp3" 1 37 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 2275 0 0
"3506" "exp3" 1 38 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1934 43 1
"3506" "exp3" 1 39 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1994 30 1
"3506" "exp3" 1 40 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 3251 67 1
"3506" "exp3" 1 41 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 2122 80 1
"3506" "exp3" 1 42 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 2818 21 1
"3506" "exp3" 1 43 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 4109 0 0
"3506" "exp3" 1 44 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 2176 0 0
"3506" "exp3" 1 45 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1496 17 1
"3506" "exp3" 1 46 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1716 0 0
"3506" "exp3" 1 47 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 2310 77 1
"3506" "exp3" 1 48 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1459 90 1
"3506" "exp3" 1 49 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1439 83 1
"3506" "exp3" 1 50 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 2206 0 0
"3506" "exp3" 1 51 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1722 82 1
"3506" "exp3" 1 52 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 2157 0 0
"3506" "exp3" 1 53 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1147 0 0
"3506" "exp3" 1 54 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 2162 65 1
"3506" "exp3" 1 55 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1371 0 0
"3506" "exp3" 1 56 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 1233 0 0
"3506" "exp3" 1 57 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1827 76 1
"3506" "exp3" 1 58 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2868 33 1
"3506" "exp3" 1 59 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1861 24 1
"3506" "exp3" 1 60 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 3643 0 0
"3506" "exp3" 1 61 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1754 0 0
"3506" "exp3" 1 62 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2558 28 1
"3506" "exp3" 1 63 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1892 28 1
"3506" "exp3" 1 64 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2843 0 0
"3506" "exp3" 1 65 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1693 39 1
"3506" "exp3" 1 66 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1691 0 0
"3506" "exp3" 1 67 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1778 71 1
"3506" "exp3" 1 68 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1972 67 1
"3506" "exp3" 1 69 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1160 69 1
"3506" "exp3" 1 70 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 948 0 0
"3506" "exp3" 1 71 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2351 0 0
"3506" "exp3" 1 72 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1479 0 0
"3506" "exp3" 1 73 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 2333 0 0
"3506" "exp3" 1 74 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 2236 0 0
"3506" "exp3" 1 75 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1729 15 1
"3506" "exp3" 1 76 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1937 0 0
"3506" "exp3" 1 77 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1798 0 0
"3506" "exp3" 1 78 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 2366 38 1
"3506" "exp3" 1 79 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 2054 0 0
"3506" "exp3" 1 80 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1129 14 1
"3506" "exp3" 1 81 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2249 69 1
"3506" "exp3" 1 82 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1286 0 0
"3506" "exp3" 1 83 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1131 0 0
"3506" "exp3" 1 84 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1572 26 1
"3506" "exp3" 1 85 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1172 0 0
"3506" "exp3" 1 86 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 4153 17 1
"3506" "exp3" 1 87 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1924 0 0
"3506" "exp3" 1 88 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1512 0 0
"3506" "exp3" 1 89 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 2150 0 0
"3506" "exp3" 1 90 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 5268 0 0
"3506" "exp3" 1 91 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2278 20 1
"3506" "exp3" 1 92 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1499 0 0
"3506" "exp3" 1 93 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2649 0 0
"3506" "exp3" 1 94 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1944 66 1
"3506" "exp3" 1 95 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2092 75 1
"3506" "exp3" 1 96 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2074 0 0
"3506" "exp3" 1 97 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 2478 0 0
"3506" "exp3" 1 98 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1664 0 0
"3506" "exp3" 1 99 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 2213 0 0
"3506" "exp3" 1 100 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2216 22 1
"3506" "exp3" 1 101 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2739 38 1
"3506" "exp3" 1 102 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2767 0 0
"3506" "exp3" 1 103 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 3165 0 0
"3506" "exp3" 1 104 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2711 31 1
"3506" "exp3" 1 105 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1882 0 0
"3506" "exp3" 1 106 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 4625 0 0
"3506" "exp3" 1 107 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2592 19 1
"3506" "exp3" 1 108 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 3282 81 1
"3506" "exp3" 1 109 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 2100 0 0
"3506" "exp3" 1 110 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2743 0 0
"3506" "exp3" 1 111 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2128 20 1
"3506" "exp3" 1 112 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2115 0 0
"3506" "exp3" 1 113 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1950 27 1
"3506" "exp3" 1 114 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2233 27 1
"3506" "exp3" 1 115 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1987 49 1
"3506" "exp3" 1 116 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2665 42 1
"3506" "exp3" 1 117 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1772 0 0
"3506" "exp3" 1 118 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 4908 0 0
"3506" "exp3" 1 119 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 2851 0 0
"3506" "exp3" 1 120 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2182 0 0
"3506" "exp3" 1 121 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 3457 85 1
"3506" "exp3" 1 122 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 3255 0 0
"3506" "exp3" 1 123 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 4456 0 0
"3506" "exp3" 1 124 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1946 31 1
"3506" "exp3" 1 125 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1776 94 1
"3506" "exp3" 1 126 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 2557 0 0
"3506" "exp3" 1 127 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 2609 0 0
"3506" "exp3" 1 128 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 3950 44 1
"3506" "exp3" 1 129 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1799 0 0
"3506" "exp3" 1 130 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1696 0 0
"3506" "exp3" 1 131 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1639 0 0
"3506" "exp3" 1 132 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 2604 87 1
"3506" "exp3" 2 1 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2146 15 1
"3506" "exp3" 2 2 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 914 0 0
"3506" "exp3" 2 3 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1433 67 1
"3506" "exp3" 2 4 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1120 30 1
"3506" "exp3" 2 5 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1532 22 1
"3506" "exp3" 2 6 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1503 82 1
"3506" "exp3" 2 7 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1830 0 0
"3506" "exp3" 2 8 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1320 22 1
"3506" "exp3" 2 9 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2021 42 1
"3506" "exp3" 2 10 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1331 0 0
"3506" "exp3" 2 11 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1911 30 1
"3506" "exp3" 2 12 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1619 0 0
"3506" "exp3" 2 13 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2958 36 1
"3506" "exp3" 2 14 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1163 0 0
"3506" "exp3" 2 15 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1479 0 0
"3506" "exp3" 2 16 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1465 0 0
"3506" "exp3" 2 17 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1693 44 1
"3506" "exp3" 2 18 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1297 72 1
"3506" "exp3" 2 19 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1175 0 0
"3506" "exp3" 2 20 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1585 0 0
"3506" "exp3" 2 21 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2265 0 0
"3506" "exp3" 2 22 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1507 0 0
"3506" "exp3" 2 23 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1681 40 1
"3506" "exp3" 2 24 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1497 0 0
"3506" "exp3" 2 25 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 2482 0 0
"3506" "exp3" 2 26 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1853 13 1
"3506" "exp3" 2 27 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1826 35 1
"3506" "exp3" 2 28 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1544 0 0
"3506" "exp3" 2 29 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1224 0 0
"3506" "exp3" 2 30 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1534 0 0
"3506" "exp3" 2 31 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 2063 76 1
"3506" "exp3" 2 32 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 2237 26 1
"3506" "exp3" 2 33 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 2668 0 0
"3506" "exp3" 2 34 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1866 78 1
"3506" "exp3" 2 35 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 2642 0 0
"3506" "exp3" 2 36 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 2537 0 0
"3506" "exp3" 2 37 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1477 0 0
"3506" "exp3" 2 38 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2495 0 0
"3506" "exp3" 2 39 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 3132 0 0
"3506" "exp3" 2 40 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2648 33 1
"3506" "exp3" 2 41 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 5856 0 0
"3506" "exp3" 2 42 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 4306 0 0
"3506" "exp3" 2 43 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 3868 0 0
"3506" "exp3" 2 44 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 2594 0 0
"3506" "exp3" 2 45 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1968 32 1
"3506" "exp3" 2 46 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 5475 0 0
"3506" "exp3" 2 47 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 2610 0 0
"3506" "exp3" 2 48 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1934 0 0
"3506" "exp3" 2 49 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 3740 0 0
"3506" "exp3" 2 50 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 2603 0 0
"3506" "exp3" 2 51 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 4254 0 0
"3506" "exp3" 2 52 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 3367 0 0
"3506" "exp3" 2 53 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 3349 0 0
"3506" "exp3" 2 54 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 2662 65 1
"3506" "exp3" 2 55 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 3109 20 1
"3506" "exp3" 2 56 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 3702 34 1
"3506" "exp3" 2 57 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2998 0 0
"3506" "exp3" 2 58 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2190 0 0
"3506" "exp3" 2 59 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1976 24 1
"3506" "exp3" 2 60 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 2242 0 0
"3506" "exp3" 2 61 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1999 0 0
"3506" "exp3" 2 62 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2507 25 1
"3506" "exp3" 2 63 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1527 31 1
"3506" "exp3" 2 64 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1418 0 0
"3506" "exp3" 2 65 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1846 0 0
"3506" "exp3" 2 66 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2357 0 0
"3506" "exp3" 2 67 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1292 0 0
"3506" "exp3" 2 68 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1922 64 1
"3506" "exp3" 2 69 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1620 32 1
"3506" "exp3" 2 70 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1280 82 1
"3506" "exp3" 2 71 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1236 0 0
"3506" "exp3" 2 72 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1784 0 0
"3506" "exp3" 2 73 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1082 0 0
"3506" "exp3" 2 74 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 929 17 1
"3506" "exp3" 2 75 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2252 27 1
"3506" "exp3" 2 76 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1366 0 0
"3506" "exp3" 2 77 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 3914 73 1
"3506" "exp3" 2 78 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1921 23 1
"3506" "exp3" 2 79 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2321 0 0
"3506" "exp3" 2 80 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1472 0 0
"3506" "exp3" 2 81 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 2500 72 1
"3506" "exp3" 2 82 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1840 0 0
"3506" "exp3" 2 83 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 2109 24 1
"3506" "exp3" 2 84 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 4535 46 1
"3506" "exp3" 2 85 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 2328 0 0
"3506" "exp3" 2 86 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1418 0 0
"3506" "exp3" 2 87 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2024 0 0
"3506" "exp3" 2 88 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2149 31 1
"3506" "exp3" 2 89 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2918 0 0
"3506" "exp3" 2 90 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2601 20 1
"3506" "exp3" 2 91 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 997 0 0
"3506" "exp3" 2 92 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1561 26 1
"3506" "exp3" 2 93 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2327 25 1
"3506" "exp3" 2 94 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 2040 20 1
"3506" "exp3" 2 95 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2647 36 1
"3506" "exp3" 2 96 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 2409 21 1
"3506" "exp3" 2 97 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 3254 0 0
"3506" "exp3" 2 98 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1168 0 0
"3506" "exp3" 2 99 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 3783 0 0
"3506" "exp3" 2 100 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 5317 42 1
"3506" "exp3" 2 101 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1501 0 0
"3506" "exp3" 2 102 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1995 84 1
"3506" "exp3" 2 103 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1948 0 0
"3506" "exp3" 2 104 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 3688 69 1
"3506" "exp3" 2 105 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2303 14 1
"3506" "exp3" 2 106 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 4969 43 1
"3506" "exp3" 2 107 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 3106 0 0
"3506" "exp3" 2 108 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2019 0 0
"3506" "exp3" 2 109 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 2332 0 0
"3506" "exp3" 2 110 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1853 75 1
"3506" "exp3" 2 111 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1478 28 1
"3506" "exp3" 2 112 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 2235 47 1
"3506" "exp3" 2 113 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2214 49 1
"3506" "exp3" 2 114 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2016 0 0
"3506" "exp3" 2 115 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1393 0 0
"3506" "exp3" 2 116 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 2402 0 0
"3506" "exp3" 2 117 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2270 0 0
"3506" "exp3" 2 118 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2134 19 1
"3506" "exp3" 2 119 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2315 0 0
"3506" "exp3" 2 120 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 2969 0 0
"3506" "exp3" 2 121 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2862 35 1
"3506" "exp3" 2 122 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1897 0 0
"3506" "exp3" 2 123 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2037 18 1
"3506" "exp3" 2 124 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 2308 0 0
"3506" "exp3" 2 125 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2038 29 1
"3506" "exp3" 2 126 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2898 41 1
"3506" "exp3" 2 127 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 4429 19 1
"3506" "exp3" 2 128 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 4250 38 1
"3506" "exp3" 2 129 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1771 90 1
"3506" "exp3" 2 130 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1645 0 0
"3506" "exp3" 2 131 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2186 45 1
"3506" "exp3" 2 132 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2104 0 0
"3506" "exp3" 1 1 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1690 0 0
"3506" "exp3" 1 2 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1511 0 0
"3506" "exp3" 1 3 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1364 0 0
"3506" "exp3" 1 4 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 3181 0 0
"3506" "exp3" 1 5 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 2324 0 0
"3506" "exp3" 1 6 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 2422 0 0
"3506" "exp3" 1 7 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1448 90 1
"3506" "exp3" 1 8 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1329 32 1
"3506" "exp3" 1 9 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1494 18 1
"3506" "exp3" 1 10 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2115 22 1
"3506" "exp3" 1 11 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 2367 72 1
"3506" "exp3" 1 12 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1484 0 0
"3506" "exp3" 1 13 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1565 19 1
"3506" "exp3" 1 14 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 3143 33 1
"3506" "exp3" 1 15 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 2537 13 1
"3506" "exp3" 1 16 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1875 93 1
"3506" "exp3" 1 17 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 2079 0 0
"3506" "exp3" 1 18 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 2018 31 1
"3506" "exp3" 1 19 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 2227 0 0
"3506" "exp3" 1 20 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 2142 27 1
"3506" "exp3" 1 21 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2322 73 1
"3506" "exp3" 1 22 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 2367 67 1
"3506" "exp3" 1 23 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1712 0 0
"3506" "exp3" 1 24 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1819 25 1
"3506" "exp3" 1 25 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1208 0 0
"3506" "exp3" 1 26 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 3695 24 1
"3506" "exp3" 1 27 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1359 0 0
"3506" "exp3" 1 28 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1355 17 1
"3506" "exp3" 1 29 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1042 0 0
"3506" "exp3" 1 30 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 2070 0 0
"3506" "exp3" 1 31 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1340 15 1
"3506" "exp3" 1 32 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1479 36 1
"3506" "exp3" 1 33 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1298 0 0
"3506" "exp3" 1 34 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1597 0 0
"3506" "exp3" 1 35 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 887 0 0
"3506" "exp3" 1 36 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1783 40 1
"3506" "exp3" 1 37 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1001 0 0
"3506" "exp3" 1 38 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1852 0 0
"3506" "exp3" 1 39 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1901 30 1
"3506" "exp3" 1 40 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2438 42 1
"3506" "exp3" 1 41 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1807 0 0
"3506" "exp3" 1 42 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1924 39 1
"3506" "exp3" 1 43 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1851 80 1
"3506" "exp3" 1 44 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1386 0 0
"3506" "exp3" 1 45 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1326 16 1
"3506" "exp3" 1 46 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2226 14 1
"3506" "exp3" 1 47 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1891 0 0
"3506" "exp3" 1 48 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 2180 0 0
"3506" "exp3" 1 49 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1292 0 0
"3506" "exp3" 1 50 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2085 84 1
"3506" "exp3" 1 51 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1720 74 1
"3506" "exp3" 1 52 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1979 0 0
"3506" "exp3" 1 53 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1911 21 1
"3506" "exp3" 1 54 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1576 26 1
"3506" "exp3" 1 55 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1357 0 0
"3506" "exp3" 1 56 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1571 0 0
"3506" "exp3" 1 57 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1523 0 0
"3506" "exp3" 1 58 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1429 0 0
"3506" "exp3" 1 59 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 2005 0 0
"3506" "exp3" 1 60 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1302 43 1
"3506" "exp3" 1 61 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1914 45 1
"3506" "exp3" 1 62 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1206 0 0
"3506" "exp3" 1 63 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2544 0 0
"3506" "exp3" 1 64 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1763 0 0
"3506" "exp3" 1 65 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 1275 0 0
"3506" "exp3" 1 66 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1874 17 1
"3506" "exp3" 1 67 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2208 37 1
"3506" "exp3" 1 68 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 2248 71 1
"3506" "exp3" 1 69 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1626 0 0
"3506" "exp3" 1 70 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 3241 36 1
"3506" "exp3" 1 71 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 2144 0 0
"3506" "exp3" 1 72 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 2430 0 0
"3506" "exp3" 1 73 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1466 0 0
"3506" "exp3" 1 74 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1470 0 0
"3506" "exp3" 1 75 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 2950 0 0
"3506" "exp3" 1 76 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1734 0 0
"3506" "exp3" 1 77 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2336 48 1
"3506" "exp3" 1 78 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 2703 70 1
"3506" "exp3" 1 79 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2820 41 1
"3506" "exp3" 1 80 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1856 69 1
"3506" "exp3" 1 81 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1551 0 0
"3506" "exp3" 1 82 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2080 63 1
"3506" "exp3" 1 83 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2152 37 1
"3506" "exp3" 1 84 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1960 20 1
"3506" "exp3" 1 85 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1160 31 1
"3506" "exp3" 1 86 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1221 29 1
"3506" "exp3" 1 87 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1920 77 1
"3506" "exp3" 1 88 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1434 0 0
"3506" "exp3" 1 89 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2373 0 0
"3506" "exp3" 1 90 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1401 22 1
"3506" "exp3" 1 91 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1568 0 0
"3506" "exp3" 1 92 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 2290 28 1
"3506" "exp3" 1 93 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1475 0 0
"3506" "exp3" 1 94 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1425 75 1
"3506" "exp3" 1 95 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1441 76 1
"3506" "exp3" 1 96 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1510 0 0
"3506" "exp3" 1 97 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 986 0 0
"3506" "exp3" 1 98 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1614 0 0
"3506" "exp3" 1 99 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1486 34 1
"3506" "exp3" 1 100 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 910 0 0
"3506" "exp3" 1 101 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 6034 0 0
"3506" "exp3" 1 102 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1507 41 1
"3506" "exp3" 1 103 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1611 0 0
"3506" "exp3" 1 104 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1246 0 0
"3506" "exp3" 1 105 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1220 26 1
"3506" "exp3" 1 106 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1006 83 1
"3506" "exp3" 1 107 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1371 0 0
"3506" "exp3" 1 108 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1687 0 0
"3506" "exp3" 1 109 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2372 43 1
"3506" "exp3" 1 110 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1456 30 1
"3506" "exp3" 1 111 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 1145 80 1
"3506" "exp3" 1 112 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1844 86 1
"3506" "exp3" 1 113 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1554 0 0
"3506" "exp3" 1 114 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1000 0 0
"3506" "exp3" 1 115 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1632 0 0
"3506" "exp3" 1 116 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1510 0 0
"3506" "exp3" 1 117 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1373 44 1
"3506" "exp3" 1 118 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 2194 0 0
"3506" "exp3" 1 119 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1576 29 1
"3506" "exp3" 1 120 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1031 40 1
"3506" "exp3" 1 121 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1445 18 1
"3506" "exp3" 1 122 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1360 18 1
"3506" "exp3" 1 123 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 3763 80 1
"3506" "exp3" 1 124 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 2266 0 0
"3506" "exp3" 1 125 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1281 0 0
"3506" "exp3" 1 126 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1161 0 0
"3506" "exp3" 1 127 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1253 23 1
"3506" "exp3" 1 128 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1577 38 1
"3506" "exp3" 1 129 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1536 0 0
"3506" "exp3" 1 130 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1096 33 1
"3506" "exp3" 1 131 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1445 0 0
"3506" "exp3" 1 132 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1753 0 0
"3506" "exp3" 2 1 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1687 0 0
"3506" "exp3" 2 2 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1334 0 0
"3506" "exp3" 2 3 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1354 0 0
"3506" "exp3" 2 4 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1081 0 0
"3506" "exp3" 2 5 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1040 85 1
"3506" "exp3" 2 6 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1141 24 1
"3506" "exp3" 2 7 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 975 19 1
"3506" "exp3" 2 8 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 940 0 0
"3506" "exp3" 2 9 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1767 33 1
"3506" "exp3" 2 10 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1063 0 0
"3506" "exp3" 2 11 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1675 0 0
"3506" "exp3" 2 12 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1452 43 1
"3506" "exp3" 2 13 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1781 68 1
"3506" "exp3" 2 14 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 2111 22 1
"3506" "exp3" 2 15 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 2211 71 1
"3506" "exp3" 2 16 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 942 0 0
"3506" "exp3" 2 17 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1868 28 1
"3506" "exp3" 2 18 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1406 0 0
"3506" "exp3" 2 19 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 2389 67 1
"3506" "exp3" 2 20 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2073 64 1
"3506" "exp3" 2 21 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1798 0 0
"3506" "exp3" 2 22 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1872 69 1
"3506" "exp3" 2 23 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1299 86 1
"3506" "exp3" 2 24 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1367 0 0
"3506" "exp3" 2 25 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1431 0 0
"3506" "exp3" 2 26 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1205 13 1
"3506" "exp3" 2 27 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1834 0 0
"3506" "exp3" 2 28 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1313 0 0
"3506" "exp3" 2 29 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1436 25 1
"3506" "exp3" 2 30 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 919 0 0
"3506" "exp3" 2 31 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2147 35 1
"3506" "exp3" 2 32 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1203 23 1
"3506" "exp3" 2 33 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1304 37 1
"3506" "exp3" 2 34 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1438 77 1
"3506" "exp3" 2 35 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1060 27 1
"3506" "exp3" 2 36 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 2673 0 0
"3506" "exp3" 2 37 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1356 20 1
"3506" "exp3" 2 38 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 2394 0 0
"3506" "exp3" 2 39 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1563 43 1
"3506" "exp3" 2 40 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1023 0 0
"3506" "exp3" 2 41 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1504 0 0
"3506" "exp3" 2 42 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1184 0 0
"3506" "exp3" 2 43 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2455 21 1
"3506" "exp3" 2 44 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 2227 19 1
"3506" "exp3" 2 45 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1051 0 0
"3506" "exp3" 2 46 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1349 0 0
"3506" "exp3" 2 47 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1284 73 1
"3506" "exp3" 2 48 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1781 0 0
"3506" "exp3" 2 49 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1348 25 1
"3506" "exp3" 2 50 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1291 81 1
"3506" "exp3" 2 51 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1332 28 1
"3506" "exp3" 2 52 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1562 0 0
"3506" "exp3" 2 53 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2379 66 1
"3506" "exp3" 2 54 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1505 26 1
"3506" "exp3" 2 55 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1717 0 0
"3506" "exp3" 2 56 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1092 0 0
"3506" "exp3" 2 57 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1526 0 0
"3506" "exp3" 2 58 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1260 0 0
"3506" "exp3" 2 59 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1160 21 1
"3506" "exp3" 2 60 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1092 0 0
"3506" "exp3" 2 61 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1213 0 0
"3506" "exp3" 2 62 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1377 6 1
"3506" "exp3" 2 63 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2620 72 1
"3506" "exp3" 2 64 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1923 0 0
"3506" "exp3" 2 65 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1116 37 1
"3506" "exp3" 2 66 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1393 0 0
"3506" "exp3" 2 67 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1568 0 0
"3506" "exp3" 2 68 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1227 22 1
"3506" "exp3" 2 69 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 796 17 1
"3506" "exp3" 2 70 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1063 0 0
"3506" "exp3" 2 71 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 911 30 1
"3506" "exp3" 2 72 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1250 0 0
"3506" "exp3" 2 73 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1365 47 1
"3506" "exp3" 2 74 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1129 0 0
"3506" "exp3" 2 75 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1004 0 0
"3506" "exp3" 2 76 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 2228 65 1
"3506" "exp3" 2 77 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1980 39 1
"3506" "exp3" 2 78 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1069 15 1
"3506" "exp3" 2 79 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1024 38 1
"3506" "exp3" 2 80 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 832 0 0
"3506" "exp3" 2 81 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 2067 0 0
"3506" "exp3" 2 82 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1380 0 0
"3506" "exp3" 2 83 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1816 24 1
"3506" "exp3" 2 84 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1564 44 1
"3506" "exp3" 2 85 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1311 0 0
"3506" "exp3" 2 86 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1383 0 0
"3506" "exp3" 2 87 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1608 0 0
"3506" "exp3" 2 88 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1104 0 0
"3506" "exp3" 2 89 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 1282 0 0
"3506" "exp3" 2 90 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1176 0 0
"3506" "exp3" 2 91 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1290 0 0
"3506" "exp3" 2 92 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1646 63 1
"3506" "exp3" 2 93 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1686 17 1
"3506" "exp3" 2 94 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1171 0 0
"3506" "exp3" 2 95 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1751 91 1
"3506" "exp3" 2 96 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 854 93 1
"3506" "exp3" 2 97 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1865 0 0
"3506" "exp3" 2 98 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1280 0 0
"3506" "exp3" 2 99 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 918 18 1
"3506" "exp3" 2 100 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1189 0 0
"3506" "exp3" 2 101 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1083 0 0
"3506" "exp3" 2 102 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 2271 0 0
"3506" "exp3" 2 103 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1075 0 0
"3506" "exp3" 2 104 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1370 90 1
"3506" "exp3" 2 105 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1179 0 0
"3506" "exp3" 2 106 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1293 0 0
"3506" "exp3" 2 107 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1785 0 0
"3506" "exp3" 2 108 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1212 18 1
"3506" "exp3" 2 109 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1819 0 0
"3506" "exp3" 2 110 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 967 0 0
"3506" "exp3" 2 111 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1457 72 1
"3506" "exp3" 2 112 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1394 41 1
"3506" "exp3" 2 113 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1640 69 1
"3506" "exp3" 2 114 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1118 0 0
"3506" "exp3" 2 115 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 990 0 0
"3506" "exp3" 2 116 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 849 20 1
"3506" "exp3" 2 117 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 881 0 0
"3506" "exp3" 2 118 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1047 31 1
"3506" "exp3" 2 119 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1128 0 0
"3506" "exp3" 2 120 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1056 81 1
"3506" "exp3" 2 121 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1959 0 0
"3506" "exp3" 2 122 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1052 49 1
"3506" "exp3" 2 123 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1671 0 0
"3506" "exp3" 2 124 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1235 67 1
"3506" "exp3" 2 125 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1302 84 1
"3506" "exp3" 2 126 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1097 27 1
"3506" "exp3" 2 127 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2121 16 1
"3506" "exp3" 2 128 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1815 45 1
"3506" "exp3" 2 129 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1406 0 0
"3506" "exp3" 2 130 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1444 0 0
"3506" "exp3" 2 131 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1837 32 1
"3506" "exp3" 2 132 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1116 0 0
"3506" "exp3" 1 1 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1391 30 1
"3506" "exp3" 1 2 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1447 0 0
"3506" "exp3" 1 3 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1313 19 1
"3506" "exp3" 1 4 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1258 23 1
"3506" "exp3" 1 5 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 2020 0 0
"3506" "exp3" 1 6 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1357 0 0
"3506" "exp3" 1 7 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1210 0 0
"3506" "exp3" 1 8 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1017 0 0
"3506" "exp3" 1 9 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1656 15 1
"3506" "exp3" 1 10 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1466 0 0
"3506" "exp3" 1 11 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1190 0 0
"3506" "exp3" 1 12 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1296 47 1
"3506" "exp3" 1 13 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1262 73 1
"3506" "exp3" 1 14 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1660 36 1
"3506" "exp3" 1 15 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1412 0 0
"3506" "exp3" 1 16 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1213 83 1
"3506" "exp3" 1 17 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1438 26 1
"3506" "exp3" 1 18 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1143 16 1
"3506" "exp3" 1 19 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1276 68 1
"3506" "exp3" 1 20 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1103 0 0
"3506" "exp3" 1 21 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1384 28 1
"3506" "exp3" 1 22 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1118 26 1
"3506" "exp3" 1 23 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1938 27 1
"3506" "exp3" 1 24 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1766 0 0
"3506" "exp3" 1 25 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1093 14 1
"3506" "exp3" 1 26 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1341 21 1
"3506" "exp3" 1 27 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1694 20 1
"3506" "exp3" 1 28 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 816 0 0
"3506" "exp3" 1 29 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1428 0 0
"3506" "exp3" 1 30 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1380 22 1
"3506" "exp3" 1 31 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 960 0 0
"3506" "exp3" 1 32 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 981 42 1
"3506" "exp3" 1 33 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1264 35 1
"3506" "exp3" 1 34 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1404 29 1
"3506" "exp3" 1 35 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1185 43 1
"3506" "exp3" 1 36 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1090 0 0
"3506" "exp3" 1 37 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1431 0 0
"3506" "exp3" 1 38 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1301 40 1
"3506" "exp3" 1 39 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 934 0 0
"3506" "exp3" 1 40 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1517 0 0
"3506" "exp3" 1 41 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1405 0 0
"3506" "exp3" 1 42 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1104 21 1
"3506" "exp3" 1 43 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1686 0 0
"3506" "exp3" 1 44 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1772 67 1
"3506" "exp3" 1 45 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1302 0 0
"3506" "exp3" 1 46 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1245 0 0
"3506" "exp3" 1 47 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1172 30 1
"3506" "exp3" 1 48 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1097 0 0
"3506" "exp3" 1 49 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1302 0 0
"3506" "exp3" 1 50 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1256 37 1
"3506" "exp3" 1 51 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1139 25 1
"3506" "exp3" 1 52 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1106 38 1
"3506" "exp3" 1 53 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1223 22 1
"3506" "exp3" 1 54 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1054 0 0
"3506" "exp3" 1 55 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1139 0 0
"3506" "exp3" 1 56 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1576 36 1
"3506" "exp3" 1 57 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1162 0 0
"3506" "exp3" 1 58 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1318 0 0
"3506" "exp3" 1 59 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1172 0 0
"3506" "exp3" 1 60 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1028 20 1
"3506" "exp3" 1 61 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1113 19 1
"3506" "exp3" 1 62 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1593 0 0
"3506" "exp3" 1 63 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1016 0 0
"3506" "exp3" 1 64 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1691 17 1
"3506" "exp3" 1 65 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1403 40 1
"3506" "exp3" 1 66 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1212 24 1
"3506" "exp3" 1 67 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 900 0 0
"3506" "exp3" 1 68 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 863 41 1
"3506" "exp3" 1 69 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 847 0 0
"3506" "exp3" 1 70 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 772 35 1
"3506" "exp3" 1 71 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 847 0 0
"3506" "exp3" 1 72 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1341 27 1
"3506" "exp3" 1 73 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 979 0 0
"3506" "exp3" 1 74 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1472 69 1
"3506" "exp3" 1 75 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1049 0 0
"3506" "exp3" 1 76 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1078 0 0
"3506" "exp3" 1 77 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1376 0 0
"3506" "exp3" 1 78 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1134 25 1
"3506" "exp3" 1 79 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1084 0 0
"3506" "exp3" 1 80 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1197 18 1
"3506" "exp3" 1 81 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1188 0 0
"3506" "exp3" 1 82 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1077 0 0
"3506" "exp3" 1 83 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1197 0 0
"3506" "exp3" 1 84 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1052 0 0
"3506" "exp3" 1 85 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 774 0 0
"3506" "exp3" 1 86 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 885 0 0
"3506" "exp3" 1 87 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 821 71 1
"3506" "exp3" 1 88 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 981 23 1
"3506" "exp3" 1 89 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1138 48 1
"3506" "exp3" 1 90 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 729 0 0
"3506" "exp3" 1 91 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 890 0 0
"3506" "exp3" 1 92 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 932 28 1
"3506" "exp3" 1 93 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1107 42 1
"3506" "exp3" 1 94 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 902 0 0
"3506" "exp3" 1 95 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1324 77 1
"3506" "exp3" 1 96 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 874 17 1
"3506" "exp3" 1 97 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1243 29 1
"3506" "exp3" 1 98 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1012 44 1
"3506" "exp3" 1 99 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 777 0 0
"3506" "exp3" 1 100 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1002 0 0
"3506" "exp3" 1 101 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 939 0 0
"3506" "exp3" 1 102 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1099 32 1
"3506" "exp3" 1 103 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 949 44 1
"3506" "exp3" 1 104 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1021 0 0
"3506" "exp3" 1 105 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 930 79 1
"3506" "exp3" 1 106 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1100 0 0
"3506" "exp3" 1 107 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1180 0 0
"3506" "exp3" 1 108 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1104 0 0
"3506" "exp3" 1 109 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 956 31 1
"3506" "exp3" 1 110 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 841 45 1
"3506" "exp3" 1 111 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 839 38 1
"3506" "exp3" 1 112 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 884 0 0
"3506" "exp3" 1 113 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 830 0 0
"3506" "exp3" 1 114 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 895 39 1
"3506" "exp3" 1 115 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 836 0 0
"3506" "exp3" 1 116 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 789 0 0
"3506" "exp3" 1 117 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 997 0 0
"3506" "exp3" 1 118 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 780 34 1
"3506" "exp3" 1 119 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 840 0 0
"3506" "exp3" 1 120 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1282 0 0
"3506" "exp3" 1 121 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1417 0 0
"3506" "exp3" 1 122 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1170 13 1
"3506" "exp3" 1 123 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1594 0 0
"3506" "exp3" 1 124 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 860 43 1
"3506" "exp3" 1 125 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1995 0 0
"3506" "exp3" 1 126 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1086 39 1
"3506" "exp3" 1 127 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 664 18 1
"3506" "exp3" 1 128 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 750 49 1
"3506" "exp3" 1 129 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1068 0 0
"3506" "exp3" 1 130 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 714 24 1
"3506" "exp3" 1 131 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 893 70 1
"3506" "exp3" 1 132 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 909 0 0
"3506" "exp3" 2 1 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 893 30 1
"3506" "exp3" 2 2 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 797 0 0
"3506" "exp3" 2 3 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 731 0 0
"3506" "exp3" 2 4 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 816 37 1
"3506" "exp3" 2 5 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 682 0 0
"3506" "exp3" 2 6 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 858 0 0
"3506" "exp3" 2 7 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 648 17 1
"3506" "exp3" 2 8 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 772 0 0
"3506" "exp3" 2 9 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 775 0 0
"3506" "exp3" 2 10 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 836 0 0
"3506" "exp3" 2 11 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 721 95 1
"3506" "exp3" 2 12 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 949 0 0
"3506" "exp3" 2 13 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1013 32 1
"3506" "exp3" 2 14 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 751 67 1
"3506" "exp3" 2 15 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 722 22 1
"3506" "exp3" 2 16 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 904 32 1
"3506" "exp3" 2 17 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1064 0 0
"3506" "exp3" 2 18 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1087 48 1
"3506" "exp3" 2 19 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 891 0 0
"3506" "exp3" 2 20 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 772 67 1
"3506" "exp3" 2 21 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 703 26 1
"3506" "exp3" 2 22 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 699 0 0
"3506" "exp3" 2 23 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 766 68 1
"3506" "exp3" 2 24 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 654 0 0
"3506" "exp3" 2 25 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1143 0 0
"3506" "exp3" 2 26 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1539 0 0
"3506" "exp3" 2 27 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 862 19 1
"3506" "exp3" 2 28 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 649 0 0
"3506" "exp3" 2 29 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 733 0 0
"3506" "exp3" 2 30 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 587 40 1
"3506" "exp3" 2 31 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1026 0 0
"3506" "exp3" 2 32 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 653 0 0
"3506" "exp3" 2 33 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 816 0 0
"3506" "exp3" 2 34 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 918 21 1
"3506" "exp3" 2 35 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1075 65 1
"3506" "exp3" 2 36 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1059 25 1
"3506" "exp3" 2 37 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 830 0 0
"3506" "exp3" 2 38 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 618 0 0
"3506" "exp3" 2 39 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 750 27 1
"3506" "exp3" 2 40 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 983 25 1
"3506" "exp3" 2 41 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 722 20 1
"3506" "exp3" 2 42 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 749 0 0
"3506" "exp3" 2 43 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 915 45 1
"3506" "exp3" 2 44 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 870 33 1
"3506" "exp3" 2 45 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 741 0 0
"3506" "exp3" 2 46 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 696 0 0
"3506" "exp3" 2 47 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 628 43 1
"3506" "exp3" 2 48 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 748 80 1
"3506" "exp3" 2 49 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 749 0 0
"3506" "exp3" 2 50 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 726 0 0
"3506" "exp3" 2 51 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 696 0 0
"3506" "exp3" 2 52 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 767 0 0
"3506" "exp3" 2 53 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 715 19 1
"3506" "exp3" 2 54 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 780 0 0
"3506" "exp3" 2 55 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 665 0 0
"3506" "exp3" 2 56 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 765 0 0
"3506" "exp3" 2 57 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 838 72 1
"3506" "exp3" 2 58 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 598 0 0
"3506" "exp3" 2 59 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 891 0 0
"3506" "exp3" 2 60 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 674 0 0
"3506" "exp3" 2 61 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 987 0 0
"3506" "exp3" 2 62 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1408 0 0
"3506" "exp3" 2 63 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 742 0 0
"3506" "exp3" 2 64 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 831 0 0
"3506" "exp3" 2 65 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 722 0 0
"3506" "exp3" 2 66 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 898 0 0
"3506" "exp3" 2 67 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1221 33 1
"3506" "exp3" 2 68 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1038 44 1
"3506" "exp3" 2 69 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1113 20 1
"3506" "exp3" 2 70 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 738 0 0
"3506" "exp3" 2 71 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 870 0 0
"3506" "exp3" 2 72 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 876 0 0
"3506" "exp3" 2 73 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 790 0 0
"3506" "exp3" 2 74 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 631 26 1
"3506" "exp3" 2 75 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 565 55 1
"3506" "exp3" 2 76 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 916 27 1
"3506" "exp3" 2 77 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1007 16 1
"3506" "exp3" 2 78 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 645 0 0
"3506" "exp3" 2 79 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 525 28 1
"3506" "exp3" 2 80 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 804 42 1
"3506" "exp3" 2 81 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 543 0 0
"3506" "exp3" 2 82 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 554 94 1
"3506" "exp3" 2 83 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 764 83 1
"3506" "exp3" 2 84 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 635 0 0
"3506" "exp3" 2 85 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 599 35 1
"3506" "exp3" 2 86 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 702 0 0
"3506" "exp3" 2 87 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 874 0 0
"3506" "exp3" 2 88 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 754 25 1
"3506" "exp3" 2 89 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 736 0 0
"3506" "exp3" 2 90 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 752 76 1
"3506" "exp3" 2 91 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 745 40 1
"3506" "exp3" 2 92 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 629 0 0
"3506" "exp3" 2 93 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 653 0 0
"3506" "exp3" 2 94 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 684 23 1
"3506" "exp3" 2 95 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 588 0 0
"3506" "exp3" 2 96 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 857 21 1
"3506" "exp3" 2 97 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 760 0 0
"3506" "exp3" 2 98 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 726 82 1
"3506" "exp3" 2 99 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 685 0 0
"3506" "exp3" 2 100 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 732 0 0
"3506" "exp3" 2 101 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 632 0 0
"3506" "exp3" 2 102 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 860 31 1
"3506" "exp3" 2 103 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 713 0 0
"3506" "exp3" 2 104 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 675 14 1
"3506" "exp3" 2 105 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 702 24 1
"3506" "exp3" 2 106 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 811 39 1
"3506" "exp3" 2 107 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 788 90 1
"3506" "exp3" 2 108 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 920 19 1
"3506" "exp3" 2 109 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 757 18 1
"3506" "exp3" 2 110 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 672 0 0
"3506" "exp3" 2 111 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 615 0 0
"3506" "exp3" 2 112 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 718 29 1
"3506" "exp3" 2 113 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 846 0 0
"3506" "exp3" 2 114 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 625 24 1
"3506" "exp3" 2 115 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 891 63 1
"3506" "exp3" 2 116 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 635 23 1
"3506" "exp3" 2 117 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 844 39 1
"3506" "exp3" 2 118 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 936 13 1
"3506" "exp3" 2 119 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 994 0 0
"3506" "exp3" 2 120 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 735 0 0
"3506" "exp3" 2 121 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 748 17 1
"3506" "exp3" 2 122 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 866 0 0
"3506" "exp3" 2 123 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 776 0 0
"3506" "exp3" 2 124 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 910 18 1
"3506" "exp3" 2 125 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 690 30 1
"3506" "exp3" 2 126 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 923 0 0
"3506" "exp3" 2 127 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 824 0 0
"3506" "exp3" 2 128 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 734 0 0
"3506" "exp3" 2 129 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 647 58 1
"3506" "exp3" 2 130 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 910 15 1
"3506" "exp3" 2 131 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 737 69 1
"3506" "exp3" 2 132 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 725 88 1
"3507" "exp3" 1 1 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 985 36 1
"3507" "exp3" 1 2 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1030 8 1
"3507" "exp3" 1 3 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1205 16 1
"3507" "exp3" 1 4 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1024 23 1
"3507" "exp3" 1 5 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1125 0 0
"3507" "exp3" 1 6 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1287 0 0
"3507" "exp3" 1 7 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 874 19 1
"3507" "exp3" 1 8 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 1187 0 0
"3507" "exp3" 1 9 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1162 35 1
"3507" "exp3" 1 10 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1366 18 1
"3507" "exp3" 1 11 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 985 35 1
"3507" "exp3" 1 12 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1195 0 0
"3507" "exp3" 1 13 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 3937 63 1
"3507" "exp3" 1 14 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1095 29 1
"3507" "exp3" 1 15 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1129 20 1
"3507" "exp3" 1 16 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1096 0 0
"3507" "exp3" 1 17 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1066 31 1
"3507" "exp3" 1 18 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1142 24 1
"3507" "exp3" 1 19 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1231 15 1
"3507" "exp3" 1 20 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 2073 0 0
"3507" "exp3" 1 21 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 2751 0 0
"3507" "exp3" 1 22 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1076 13 1
"3507" "exp3" 1 23 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1234 17 1
"3507" "exp3" 1 24 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1022 24 1
"3507" "exp3" 1 25 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1222 0 0
"3507" "exp3" 1 26 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1005 0 0
"3507" "exp3" 1 27 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1338 38 1
"3507" "exp3" 1 28 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1168 0 0
"3507" "exp3" 1 29 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1396 0 0
"3507" "exp3" 1 30 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1933 41 1
"3507" "exp3" 1 31 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1299 20 1
"3507" "exp3" 1 32 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1394 19 1
"3507" "exp3" 1 33 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 1287 58 1
"3507" "exp3" 1 34 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1008 19 1
"3507" "exp3" 1 35 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1496 0 0
"3507" "exp3" 1 36 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 2361 0 0
"3507" "exp3" 1 37 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1098 22 1
"3507" "exp3" 1 38 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1749 0 0
"3507" "exp3" 1 39 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1119 11 1
"3507" "exp3" 1 40 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1163 30 1
"3507" "exp3" 1 41 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1724 26 1
"3507" "exp3" 1 42 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1278 0 0
"3507" "exp3" 1 43 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1205 0 0
"3507" "exp3" 1 44 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 1217 0 0
"3507" "exp3" 1 45 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1032 23 1
"3507" "exp3" 1 46 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 966 22 1
"3507" "exp3" 1 47 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1205 11 1
"3507" "exp3" 1 48 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1561 19 1
"3507" "exp3" 1 49 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1825 0 0
"3507" "exp3" 1 50 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 2142 0 0
"3507" "exp3" 1 51 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 2265 68 1
"3507" "exp3" 1 52 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 927 0 0
"3507" "exp3" 1 53 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 887 0 0
"3507" "exp3" 1 54 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 864 29 1
"3507" "exp3" 1 55 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1276 55 1
"3507" "exp3" 1 56 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 1425 9 1
"3507" "exp3" 1 57 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1264 0 0
"3507" "exp3" 1 58 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1243 0 0
"3507" "exp3" 1 59 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1472 0 0
"3507" "exp3" 1 60 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1618 42 1
"3507" "exp3" 1 61 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1630 44 1
"3507" "exp3" 1 62 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 904 13 1
"3507" "exp3" 1 63 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1038 0 0
"3507" "exp3" 1 64 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 1652 5 1
"3507" "exp3" 1 65 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1730 9 1
"3507" "exp3" 1 66 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1219 12 1
"3507" "exp3" 1 67 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 1501 0 0
"3507" "exp3" 1 68 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1075 27 1
"3507" "exp3" 1 69 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1464 0 0
"3507" "exp3" 1 70 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1241 0 0
"3507" "exp3" 1 71 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1247 27 1
"3507" "exp3" 1 72 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1931 14 1
"3507" "exp3" 1 73 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 2525 0 0
"3507" "exp3" 1 74 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1400 21 1
"3507" "exp3" 1 75 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 2608 21 1
"3507" "exp3" 1 76 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1461 0 0
"3507" "exp3" 1 77 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1675 28 1
"3507" "exp3" 1 78 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1181 40 1
"3507" "exp3" 1 79 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1496 67 1
"3507" "exp3" 1 80 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1589 38 1
"3507" "exp3" 1 81 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1673 31 1
"3507" "exp3" 1 82 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1419 0 0
"3507" "exp3" 1 83 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1116 25 1
"3507" "exp3" 1 84 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1052 16 1
"3507" "exp3" 1 85 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1356 75 1
"3507" "exp3" 1 86 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1352 26 1
"3507" "exp3" 1 87 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1310 0 0
"3507" "exp3" 1 88 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1240 0 0
"3507" "exp3" 1 89 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1806 0 0
"3507" "exp3" 1 90 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1152 12 1
"3507" "exp3" 1 91 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1002 18 1
"3507" "exp3" 1 92 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1826 21 1
"3507" "exp3" 1 93 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 816 23 1
"3507" "exp3" 1 94 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 1301 10 1
"3507" "exp3" 1 95 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 912 35 1
"3507" "exp3" 1 96 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1330 33 1
"3507" "exp3" 1 97 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1748 55 1
"3507" "exp3" 1 98 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1264 32 1
"3507" "exp3" 1 99 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1154 0 0
"3507" "exp3" 1 100 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2301 66 1
"3507" "exp3" 1 101 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1426 0 0
"3507" "exp3" 1 102 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2206 18 1
"3507" "exp3" 1 103 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1446 0 0
"3507" "exp3" 1 104 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1062 22 1
"3507" "exp3" 1 105 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1718 17 1
"3507" "exp3" 1 106 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1546 20 1
"3507" "exp3" 1 107 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1489 0 0
"3507" "exp3" 1 108 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1825 39 1
"3507" "exp3" 1 109 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1157 47 1
"3507" "exp3" 1 110 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 1315 7 1
"3507" "exp3" 1 111 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1813 33 1
"3507" "exp3" 1 112 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1255 17 1
"3507" "exp3" 1 113 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 757 0 0
"3507" "exp3" 1 114 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1267 16 1
"3507" "exp3" 1 115 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1172 29 1
"3507" "exp3" 1 116 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 1913 8 1
"3507" "exp3" 1 117 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 2650 6 1
"3507" "exp3" 1 118 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1455 21 1
"3507" "exp3" 1 119 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1666 57 1
"3507" "exp3" 1 120 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1223 0 0
"3507" "exp3" 1 121 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1954 28 1
"3507" "exp3" 1 122 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 2523 41 1
"3507" "exp3" 1 123 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 2448 95 1
"3507" "exp3" 1 124 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1516 0 0
"3507" "exp3" 1 125 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1388 30 1
"3507" "exp3" 1 126 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1381 15 1
"3507" "exp3" 1 127 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1308 14 1
"3507" "exp3" 1 128 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1205 0 0
"3507" "exp3" 1 129 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1686 0 0
"3507" "exp3" 1 130 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1499 0 0
"3507" "exp3" 1 131 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 2766 0 0
"3507" "exp3" 1 132 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1224 24 1
"3507" "exp3" 2 1 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1018 23 1
"3507" "exp3" 2 2 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1934 0 0
"3507" "exp3" 2 3 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1020 0 0
"3507" "exp3" 2 4 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 2099 25 1
"3507" "exp3" 2 5 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 2119 0 0
"3507" "exp3" 2 6 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 2169 28 1
"3507" "exp3" 2 7 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1541 0 0
"3507" "exp3" 2 8 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 6656 32 1
"3507" "exp3" 2 9 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1089 63 1
"3507" "exp3" 2 10 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 2534 48 1
"3507" "exp3" 2 11 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 2265 0 0
"3507" "exp3" 2 12 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 2355 39 1
"3507" "exp3" 2 13 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1470 37 1
"3507" "exp3" 2 14 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1316 18 1
"3507" "exp3" 2 15 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1111 0 0
"3507" "exp3" 2 16 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1240 0 0
"3507" "exp3" 2 17 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1585 0 0
"3507" "exp3" 2 18 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1253 0 0
"3507" "exp3" 2 19 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1119 29 1
"3507" "exp3" 2 20 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1041 23 1
"3507" "exp3" 2 21 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1226 30 1
"3507" "exp3" 2 22 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1321 37 1
"3507" "exp3" 2 23 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 2127 13 1
"3507" "exp3" 2 24 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1431 25 1
"3507" "exp3" 2 25 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 2039 0 0
"3507" "exp3" 2 26 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1342 22 1
"3507" "exp3" 2 27 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1051 0 0
"3507" "exp3" 2 28 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 895 24 1
"3507" "exp3" 2 29 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1205 17 1
"3507" "exp3" 2 30 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 860 0 0
"3507" "exp3" 2 31 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 1629 0 0
"3507" "exp3" 2 32 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1314 28 1
"3507" "exp3" 2 33 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 900 0 0
"3507" "exp3" 2 34 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 988 34 1
"3507" "exp3" 2 35 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1115 0 0
"3507" "exp3" 2 36 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1447 0 0
"3507" "exp3" 2 37 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 893 0 0
"3507" "exp3" 2 38 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1032 81 1
"3507" "exp3" 2 39 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 970 0 0
"3507" "exp3" 2 40 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1058 0 0
"3507" "exp3" 2 41 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1098 0 0
"3507" "exp3" 2 42 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 1610 53 1
"3507" "exp3" 2 43 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1438 0 0
"3507" "exp3" 2 44 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1546 0 0
"3507" "exp3" 2 45 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1265 24 1
"3507" "exp3" 2 46 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1007 32 1
"3507" "exp3" 2 47 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 1298 0 0
"3507" "exp3" 2 48 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1065 0 0
"3507" "exp3" 2 49 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1239 20 1
"3507" "exp3" 2 50 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1107 0 0
"3507" "exp3" 2 51 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1012 93 1
"3507" "exp3" 2 52 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 975 0 0
"3507" "exp3" 2 53 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1136 0 0
"3507" "exp3" 2 54 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 913 65 1
"3507" "exp3" 2 55 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1448 0 0
"3507" "exp3" 2 56 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 2064 41 1
"3507" "exp3" 2 57 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 3812 17 1
"3507" "exp3" 2 58 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1342 0 0
"3507" "exp3" 2 59 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1147 0 0
"3507" "exp3" 2 60 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1413 0 0
"3507" "exp3" 2 61 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1085 21 1
"3507" "exp3" 2 62 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1288 16 1
"3507" "exp3" 2 63 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1207 16 1
"3507" "exp3" 2 64 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 888 0 0
"3507" "exp3" 2 65 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 2693 0 0
"3507" "exp3" 2 66 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 1553 0 0
"3507" "exp3" 2 67 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 2524 0 0
"3507" "exp3" 2 68 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 2754 43 1
"3507" "exp3" 2 69 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1309 0 0
"3507" "exp3" 2 70 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2369 39 1
"3507" "exp3" 2 71 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1089 0 0
"3507" "exp3" 2 72 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1309 21 1
"3507" "exp3" 2 73 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 1517 0 0
"3507" "exp3" 2 74 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1107 0 0
"3507" "exp3" 2 75 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1342 22 1
"3507" "exp3" 2 76 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1512 0 0
"3507" "exp3" 2 77 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1528 0 0
"3507" "exp3" 2 78 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1073 31 1
"3507" "exp3" 2 79 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1184 42 1
"3507" "exp3" 2 80 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1531 21 1
"3507" "exp3" 2 81 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1363 67 1
"3507" "exp3" 2 82 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1856 55 1
"3507" "exp3" 2 83 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1505 15 1
"3507" "exp3" 2 84 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1373 33 1
"3507" "exp3" 2 85 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1270 24 1
"3507" "exp3" 2 86 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 2266 22 1
"3507" "exp3" 2 87 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 2279 12 1
"3507" "exp3" 2 88 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 1632 0 0
"3507" "exp3" 2 89 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1682 0 0
"3507" "exp3" 2 90 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 2235 0 0
"3507" "exp3" 2 91 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1531 60 1
"3507" "exp3" 2 92 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1046 0 0
"3507" "exp3" 2 93 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1428 38 1
"3507" "exp3" 2 94 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 869 0 0
"3507" "exp3" 2 95 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 3383 0 0
"3507" "exp3" 2 96 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1014 82 1
"3507" "exp3" 2 97 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1188 0 0
"3507" "exp3" 2 98 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1883 25 1
"3507" "exp3" 2 99 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 1332 64 1
"3507" "exp3" 2 100 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1094 0 0
"3507" "exp3" 2 101 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 972 22 1
"3507" "exp3" 2 102 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2277 17 1
"3507" "exp3" 2 103 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 2025 20 1
"3507" "exp3" 2 104 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1279 0 0
"3507" "exp3" 2 105 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1199 0 0
"3507" "exp3" 2 106 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1579 36 1
"3507" "exp3" 2 107 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1526 14 1
"3507" "exp3" 2 108 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1303 18 1
"3507" "exp3" 2 109 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1273 0 0
"3507" "exp3" 2 110 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1365 0 0
"3507" "exp3" 2 111 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1258 0 0
"3507" "exp3" 2 112 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1539 19 1
"3507" "exp3" 2 113 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 2114 10 1
"3507" "exp3" 2 114 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1321 15 1
"3507" "exp3" 2 115 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 2751 51 1
"3507" "exp3" 2 116 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1809 0 0
"3507" "exp3" 2 117 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 675 21 1
"3507" "exp3" 2 118 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1435 12 1
"3507" "exp3" 2 119 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1081 27 1
"3507" "exp3" 2 120 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1669 34 1
"3507" "exp3" 2 121 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1703 69 1
"3507" "exp3" 2 122 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1383 20 1
"3507" "exp3" 2 123 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1144 0 0
"3507" "exp3" 2 124 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1042 0 0
"3507" "exp3" 2 125 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1557 19 1
"3507" "exp3" 2 126 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1055 0 0
"3507" "exp3" 2 127 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1142 26 1
"3507" "exp3" 2 128 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1087 0 0
"3507" "exp3" 2 129 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 970 23 1
"3507" "exp3" 2 130 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1315 26 1
"3507" "exp3" 2 131 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1138 27 1
"3507" "exp3" 2 132 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1345 0 0
"3507" "exp3" 1 1 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2409 19 1
"3507" "exp3" 1 2 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2153 29 1
"3507" "exp3" 1 3 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1815 0 0
"3507" "exp3" 1 4 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2638 19 1
"3507" "exp3" 1 5 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1392 16 1
"3507" "exp3" 1 6 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2685 38 1
"3507" "exp3" 1 7 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1190 0 0
"3507" "exp3" 1 8 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 3472 39 1
"3507" "exp3" 1 9 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 2184 0 0
"3507" "exp3" 1 10 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 2395 0 0
"3507" "exp3" 1 11 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 5132 32 1
"3507" "exp3" 1 12 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1413 0 0
"3507" "exp3" 1 13 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 3575 23 1
"3507" "exp3" 1 14 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 3222 0 0
"3507" "exp3" 1 15 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 5550 29 1
"3507" "exp3" 1 16 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 2243 70 1
"3507" "exp3" 1 17 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1441 24 1
"3507" "exp3" 1 18 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1986 28 1
"3507" "exp3" 1 19 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 2089 28 1
"3507" "exp3" 1 20 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 5271 30 1
"3507" "exp3" 1 21 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 2614 26 1
"3507" "exp3" 1 22 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 3397 0 0
"3507" "exp3" 1 23 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2720 0 0
"3507" "exp3" 1 24 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 9063 0 0
"3507" "exp3" 1 25 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2659 29 1
"3507" "exp3" 1 26 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 3014 40 1
"3507" "exp3" 1 27 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 3726 32 1
"3507" "exp3" 1 28 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 5383 26 1
"3507" "exp3" 1 29 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 6285 43 1
"3507" "exp3" 1 30 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2431 33 1
"3507" "exp3" 1 31 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2294 0 0
"3507" "exp3" 1 32 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2199 23 1
"3507" "exp3" 1 33 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 3457 34 1
"3507" "exp3" 1 34 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2273 13 1
"3507" "exp3" 1 35 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2274 28 1
"3507" "exp3" 1 36 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 4648 37 1
"3507" "exp3" 1 37 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 4660 0 0
"3507" "exp3" 1 38 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1970 35 1
"3507" "exp3" 1 39 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1151 95 1
"3507" "exp3" 1 40 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 4464 0 0
"3507" "exp3" 1 41 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 2251 32 1
"3507" "exp3" 1 42 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2955 0 0
"3507" "exp3" 1 43 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2386 0 0
"3507" "exp3" 1 44 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 4319 17 1
"3507" "exp3" 1 45 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1835 15 1
"3507" "exp3" 1 46 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2922 43 1
"3507" "exp3" 1 47 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 3165 24 1
"3507" "exp3" 1 48 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 6567 27 1
"3507" "exp3" 1 49 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 2135 22 1
"3507" "exp3" 1 50 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 3489 15 1
"3507" "exp3" 1 51 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 4460 0 0
"3507" "exp3" 1 52 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 3033 24 1
"3507" "exp3" 1 53 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1713 0 0
"3507" "exp3" 1 54 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 8191 0 0
"3507" "exp3" 1 55 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2276 23 1
"3507" "exp3" 1 56 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1607 0 0
"3507" "exp3" 1 57 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 2007 26 1
"3507" "exp3" 1 58 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 4128 0 0
"3507" "exp3" 1 59 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 4360 56 1
"3507" "exp3" 1 60 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2306 22 1
"3507" "exp3" 1 61 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 2481 0 0
"3507" "exp3" 1 62 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 3115 27 1
"3507" "exp3" 1 63 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 3080 0 0
"3507" "exp3" 1 64 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 2260 0 0
"3507" "exp3" 1 65 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1633 0 0
"3507" "exp3" 1 66 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 11720 73 1
"3507" "exp3" 1 67 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 2052 0 0
"3507" "exp3" 1 68 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2132 0 0
"3507" "exp3" 1 69 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1457 0 0
"3507" "exp3" 1 70 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1599 0 0
"3507" "exp3" 1 71 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 3771 40 1
"3507" "exp3" 1 72 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 3484 20 1
"3507" "exp3" 1 73 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 6191 14 1
"3507" "exp3" 1 74 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 7164 0 0
"3507" "exp3" 1 75 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 3399 28 1
"3507" "exp3" 1 76 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 6391 0 0
"3507" "exp3" 1 77 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2075 18 1
"3507" "exp3" 1 78 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2621 67 1
"3507" "exp3" 1 79 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 3120 48 1
"3507" "exp3" 1 80 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1403 0 0
"3507" "exp3" 1 81 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 5726 0 0
"3507" "exp3" 1 82 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2787 0 0
"3507" "exp3" 1 83 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 3675 0 0
"3507" "exp3" 1 84 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2277 0 0
"3507" "exp3" 1 85 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 3505 21 1
"3507" "exp3" 1 86 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 5041 12 1
"3507" "exp3" 1 87 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 5680 25 1
"3507" "exp3" 1 88 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 3915 21 1
"3507" "exp3" 1 89 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1666 14 1
"3507" "exp3" 1 90 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 4256 13 1
"3507" "exp3" 1 91 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 6022 41 1
"3507" "exp3" 1 92 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 2334 0 0
"3507" "exp3" 1 93 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 2033 17 1
"3507" "exp3" 1 94 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1693 17 1
"3507" "exp3" 1 95 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 3041 0 0
"3507" "exp3" 1 96 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 2349 30 1
"3507" "exp3" 1 97 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 3409 0 0
"3507" "exp3" 1 98 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 4577 37 1
"3507" "exp3" 1 99 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 3901 19 1
"3507" "exp3" 1 100 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 2082 21 1
"3507" "exp3" 1 101 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 4825 0 0
"3507" "exp3" 1 102 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1727 16 1
"3507" "exp3" 1 103 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 3482 18 1
"3507" "exp3" 1 104 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 3012 0 0
"3507" "exp3" 1 105 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1990 38 1
"3507" "exp3" 1 106 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2574 41 1
"3507" "exp3" 1 107 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2040 35 1
"3507" "exp3" 1 108 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1933 0 0
"3507" "exp3" 1 109 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 3687 20 1
"3507" "exp3" 1 110 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1390 94 1
"3507" "exp3" 1 111 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 3965 42 1
"3507" "exp3" 1 112 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1601 33 1
"3507" "exp3" 1 113 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1959 30 1
"3507" "exp3" 1 114 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1813 98 1
"3507" "exp3" 1 115 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 7385 0 0
"3507" "exp3" 1 116 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1211 0 0
"3507" "exp3" 1 117 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 2580 10 1
"3507" "exp3" 1 118 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1955 0 0
"3507" "exp3" 1 119 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 2645 16 1
"3507" "exp3" 1 120 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1600 31 1
"3507" "exp3" 1 121 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1169 22 1
"3507" "exp3" 1 122 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 3558 0 0
"3507" "exp3" 1 123 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1820 20 1
"3507" "exp3" 1 124 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1541 36 1
"3507" "exp3" 1 125 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 2330 55 1
"3507" "exp3" 1 126 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1447 21 1
"3507" "exp3" 1 127 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1626 0 0
"3507" "exp3" 1 128 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 6325 46 1
"3507" "exp3" 1 129 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1839 0 0
"3507" "exp3" 1 130 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 3179 0 0
"3507" "exp3" 1 131 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1999 0 0
"3507" "exp3" 1 132 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1709 35 1
"3507" "exp3" 2 1 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 1704 21 1
"3507" "exp3" 2 2 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1835 0 0
"3507" "exp3" 2 3 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 3569 0 0
"3507" "exp3" 2 4 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 2569 20 1
"3507" "exp3" 2 5 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2621 31 1
"3507" "exp3" 2 6 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1731 23 1
"3507" "exp3" 2 7 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 3229 0 0
"3507" "exp3" 2 8 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 4635 22 1
"3507" "exp3" 2 9 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1582 11 1
"3507" "exp3" 2 10 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2023 18 1
"3507" "exp3" 2 11 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 5222 0 0
"3507" "exp3" 2 12 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 7052 32 1
"3507" "exp3" 2 13 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 3073 24 1
"3507" "exp3" 2 14 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 5162 30 1
"3507" "exp3" 2 15 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 17375 58 1
"3507" "exp3" 2 16 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1491 30 1
"3507" "exp3" 2 17 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1628 14 1
"3507" "exp3" 2 18 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 3000 41 1
"3507" "exp3" 2 19 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 3612 45 1
"3507" "exp3" 2 20 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1155 23 1
"3507" "exp3" 2 21 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1358 0 0
"3507" "exp3" 2 22 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 2388 0 0
"3507" "exp3" 2 23 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 771 38 1
"3507" "exp3" 2 24 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 605 44 1
"3507" "exp3" 2 25 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 782 0 0
"3507" "exp3" 2 26 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1428 9 1
"3507" "exp3" 2 27 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3056 67 1
"3507" "exp3" 2 28 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1825 93 1
"3507" "exp3" 2 29 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 804 0 0
"3507" "exp3" 2 30 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 4407 49 1
"3507" "exp3" 2 31 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1117 27 1
"3507" "exp3" 2 32 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2729 43 1
"3507" "exp3" 2 33 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1316 0 0
"3507" "exp3" 2 34 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1605 39 1
"3507" "exp3" 2 35 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 930 19 1
"3507" "exp3" 2 36 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1042 0 0
"3507" "exp3" 2 37 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1628 34 1
"3507" "exp3" 2 38 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1771 0 0
"3507" "exp3" 2 39 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1596 15 1
"3507" "exp3" 2 40 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2038 0 0
"3507" "exp3" 2 41 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1159 0 0
"3507" "exp3" 2 42 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 2593 7 1
"3507" "exp3" 2 43 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1377 0 0
"3507" "exp3" 2 44 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1655 0 0
"3507" "exp3" 2 45 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1371 26 1
"3507" "exp3" 2 46 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1178 19 1
"3507" "exp3" 2 47 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1206 0 0
"3507" "exp3" 2 48 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 3776 12 1
"3507" "exp3" 2 49 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1730 33 1
"3507" "exp3" 2 50 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1753 46 1
"3507" "exp3" 2 51 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1350 0 0
"3507" "exp3" 2 52 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 2609 64 1
"3507" "exp3" 2 53 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1575 28 1
"3507" "exp3" 2 54 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 866 23 1
"3507" "exp3" 2 55 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 851 31 1
"3507" "exp3" 2 56 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 961 20 1
"3507" "exp3" 2 57 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 2081 0 0
"3507" "exp3" 2 58 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 1570 62 1
"3507" "exp3" 2 59 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 838 40 1
"3507" "exp3" 2 60 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1916 27 1
"3507" "exp3" 2 61 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 3643 16 1
"3507" "exp3" 2 62 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2425 15 1
"3507" "exp3" 2 63 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 3870 29 1
"3507" "exp3" 2 64 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2006 0 0
"3507" "exp3" 2 65 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1281 19 1
"3507" "exp3" 2 66 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1626 12 1
"3507" "exp3" 2 67 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1676 0 0
"3507" "exp3" 2 68 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1465 29 1
"3507" "exp3" 2 69 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2242 0 0
"3507" "exp3" 2 70 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1798 0 0
"3507" "exp3" 2 71 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1502 18 1
"3507" "exp3" 2 72 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1680 17 1
"3507" "exp3" 2 73 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 2503 24 1
"3507" "exp3" 2 74 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1470 0 0
"3507" "exp3" 2 75 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1379 25 1
"3507" "exp3" 2 76 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 4183 40 1
"3507" "exp3" 2 77 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 3050 43 1
"3507" "exp3" 2 78 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 3977 17 1
"3507" "exp3" 2 79 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 3401 24 1
"3507" "exp3" 2 80 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1911 0 0
"3507" "exp3" 2 81 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 3336 0 0
"3507" "exp3" 2 82 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 3068 23 1
"3507" "exp3" 2 83 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 3433 72 1
"3507" "exp3" 2 84 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 2161 0 0
"3507" "exp3" 2 85 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1998 13 1
"3507" "exp3" 2 86 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 6640 28 1
"3507" "exp3" 2 87 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 2525 24 1
"3507" "exp3" 2 88 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1815 0 0
"3507" "exp3" 2 89 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 7289 0 0
"3507" "exp3" 2 90 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2880 0 0
"3507" "exp3" 2 91 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 4619 0 0
"3507" "exp3" 2 92 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1632 21 1
"3507" "exp3" 2 93 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1624 25 1
"3507" "exp3" 2 94 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2474 73 1
"3507" "exp3" 2 95 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1219 0 0
"3507" "exp3" 2 96 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1264 20 1
"3507" "exp3" 2 97 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1638 18 1
"3507" "exp3" 2 98 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2137 0 0
"3507" "exp3" 2 99 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 3372 68 1
"3507" "exp3" 2 100 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2963 31 1
"3507" "exp3" 2 101 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1776 91 1
"3507" "exp3" 2 102 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 1695 0 0
"3507" "exp3" 2 103 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1570 47 1
"3507" "exp3" 2 104 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 2312 16 1
"3507" "exp3" 2 105 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2204 27 1
"3507" "exp3" 2 106 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 5965 29 1
"3507" "exp3" 2 107 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 9174 48 1
"3507" "exp3" 2 108 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 3426 22 1
"3507" "exp3" 2 109 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2258 0 0
"3507" "exp3" 2 110 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1600 17 1
"3507" "exp3" 2 111 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 2329 0 0
"3507" "exp3" 2 112 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1670 0 0
"3507" "exp3" 2 113 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1690 26 1
"3507" "exp3" 2 114 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2463 0 0
"3507" "exp3" 2 115 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1670 25 1
"3507" "exp3" 2 116 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1818 30 1
"3507" "exp3" 2 117 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1105 37 1
"3507" "exp3" 2 118 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1376 29 1
"3507" "exp3" 2 119 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1410 0 0
"3507" "exp3" 2 120 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1333 13 1
"3507" "exp3" 2 121 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1409 21 1
"3507" "exp3" 2 122 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1224 0 0
"3507" "exp3" 2 123 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 1837 65 1
"3507" "exp3" 2 124 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2230 0 0
"3507" "exp3" 2 125 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 1660 0 0
"3507" "exp3" 2 126 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 742 0 0
"3507" "exp3" 2 127 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1082 32 1
"3507" "exp3" 2 128 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1246 66 1
"3507" "exp3" 2 129 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1155 22 1
"3507" "exp3" 2 130 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 699 25 1
"3507" "exp3" 2 131 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1591 14 1
"3507" "exp3" 2 132 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1996 0 0
"3507" "exp3" 1 1 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 2509 33 1
"3507" "exp3" 1 2 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1710 0 0
"3507" "exp3" 1 3 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 5982 0 0
"3507" "exp3" 1 4 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 3230 13 1
"3507" "exp3" 1 5 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 4964 13 1
"3507" "exp3" 1 6 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1953 41 1
"3507" "exp3" 1 7 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2448 37 1
"3507" "exp3" 1 8 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 3236 68 1
"3507" "exp3" 1 9 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 2467 0 0
"3507" "exp3" 1 10 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 4533 11 1
"3507" "exp3" 1 11 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2614 44 1
"3507" "exp3" 1 12 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 2505 0 0
"3507" "exp3" 1 13 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 3125 0 0
"3507" "exp3" 1 14 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1897 0 0
"3507" "exp3" 1 15 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 6840 0 0
"3507" "exp3" 1 16 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2575 34 1
"3507" "exp3" 1 17 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 2754 0 0
"3507" "exp3" 1 18 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1926 0 0
"3507" "exp3" 1 19 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2152 0 0
"3507" "exp3" 1 20 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 2909 69 1
"3507" "exp3" 1 21 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 2059 77 1
"3507" "exp3" 1 22 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2019 0 0
"3507" "exp3" 1 23 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1836 0 0
"3507" "exp3" 1 24 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 2312 74 1
"3507" "exp3" 1 25 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 2832 74 1
"3507" "exp3" 1 26 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 4708 46 1
"3507" "exp3" 1 27 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1511 0 0
"3507" "exp3" 1 28 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 3422 0 0
"3507" "exp3" 1 29 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 6146 0 0
"3507" "exp3" 1 30 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1769 41 1
"3507" "exp3" 1 31 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 3822 86 1
"3507" "exp3" 1 32 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1281 0 0
"3507" "exp3" 1 33 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 3637 0 0
"3507" "exp3" 1 34 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 3095 14 1
"3507" "exp3" 1 35 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1906 0 0
"3507" "exp3" 1 36 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 2902 0 0
"3507" "exp3" 1 37 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 2925 0 0
"3507" "exp3" 1 38 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 3175 42 1
"3507" "exp3" 1 39 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2853 21 1
"3507" "exp3" 1 40 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 2931 68 1
"3507" "exp3" 1 41 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1918 49 1
"3507" "exp3" 1 42 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 5493 0 0
"3507" "exp3" 1 43 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 3421 0 0
"3507" "exp3" 1 44 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1646 40 1
"3507" "exp3" 1 45 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1915 0 0
"3507" "exp3" 1 46 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 3131 0 0
"3507" "exp3" 1 47 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 2749 30 1
"3507" "exp3" 1 48 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 3976 26 1
"3507" "exp3" 1 49 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 3013 0 0
"3507" "exp3" 1 50 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2030 26 1
"3507" "exp3" 1 51 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 3477 0 0
"3507" "exp3" 1 52 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 2463 15 1
"3507" "exp3" 1 53 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1605 91 1
"3507" "exp3" 1 54 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 2584 0 0
"3507" "exp3" 1 55 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 4481 43 1
"3507" "exp3" 1 56 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 2126 70 1
"3507" "exp3" 1 57 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 5044 18 1
"3507" "exp3" 1 58 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2072 20 1
"3507" "exp3" 1 59 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1715 0 0
"3507" "exp3" 1 60 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 2670 0 0
"3507" "exp3" 1 61 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1759 0 0
"3507" "exp3" 1 62 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 4350 0 0
"3507" "exp3" 1 63 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 3259 0 0
"3507" "exp3" 1 64 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 2083 0 0
"3507" "exp3" 1 65 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1906 0 0
"3507" "exp3" 1 66 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1438 0 0
"3507" "exp3" 1 67 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 2224 0 0
"3507" "exp3" 1 68 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 5823 27 1
"3507" "exp3" 1 69 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2058 29 1
"3507" "exp3" 1 70 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 3803 0 0
"3507" "exp3" 1 71 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 5001 64 1
"3507" "exp3" 1 72 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2376 35 1
"3507" "exp3" 1 73 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1854 0 0
"3507" "exp3" 1 74 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1624 0 0
"3507" "exp3" 1 75 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 958 0 0
"3507" "exp3" 1 76 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 2335 0 0
"3507" "exp3" 1 77 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2004 36 1
"3507" "exp3" 1 78 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2016 20 1
"3507" "exp3" 1 79 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2131 22 1
"3507" "exp3" 1 80 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 3204 19 1
"3507" "exp3" 1 81 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1969 0 0
"3507" "exp3" 1 82 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1983 0 0
"3507" "exp3" 1 83 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1998 0 0
"3507" "exp3" 1 84 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 2047 83 1
"3507" "exp3" 1 85 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1953 0 0
"3507" "exp3" 1 86 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 3733 0 0
"3507" "exp3" 1 87 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1653 25 1
"3507" "exp3" 1 88 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1486 34 1
"3507" "exp3" 1 89 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 3157 18 1
"3507" "exp3" 1 90 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 2584 78 1
"3507" "exp3" 1 91 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2979 17 1
"3507" "exp3" 1 92 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2135 45 1
"3507" "exp3" 1 93 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 2411 0 0
"3507" "exp3" 1 94 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1380 24 1
"3507" "exp3" 1 95 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1447 19 1
"3507" "exp3" 1 96 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 3520 28 1
"3507" "exp3" 1 97 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2651 16 1
"3507" "exp3" 1 98 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 2391 27 1
"3507" "exp3" 1 99 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1624 94 1
"3507" "exp3" 1 100 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1748 0 0
"3507" "exp3" 1 101 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 940 0 0
"3507" "exp3" 1 102 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1400 39 1
"3507" "exp3" 1 103 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1005 0 0
"3507" "exp3" 1 104 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2916 0 0
"3507" "exp3" 1 105 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1239 21 1
"3507" "exp3" 1 106 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1525 37 1
"3507" "exp3" 1 107 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1578 17 1
"3507" "exp3" 1 108 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1556 38 1
"3507" "exp3" 1 109 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 2492 0 0
"3507" "exp3" 1 110 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2472 0 0
"3507" "exp3" 1 111 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 2720 0 0
"3507" "exp3" 1 112 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1945 31 1
"3507" "exp3" 1 113 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 2052 80 1
"3507" "exp3" 1 114 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1593 0 0
"3507" "exp3" 1 115 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1205 28 1
"3507" "exp3" 1 116 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1497 44 1
"3507" "exp3" 1 117 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 2222 81 1
"3507" "exp3" 1 118 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1509 23 1
"3507" "exp3" 1 119 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1138 94 1
"3507" "exp3" 1 120 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1785 85 1
"3507" "exp3" 1 121 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 4670 0 0
"3507" "exp3" 1 122 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 6087 0 0
"3507" "exp3" 1 123 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1598 0 0
"3507" "exp3" 1 124 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1433 32 1
"3507" "exp3" 1 125 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1522 0 0
"3507" "exp3" 1 126 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1261 71 1
"3507" "exp3" 1 127 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1126 0 0
"3507" "exp3" 1 128 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1161 25 1
"3507" "exp3" 1 129 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 2620 81 1
"3507" "exp3" 1 130 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1838 0 0
"3507" "exp3" 1 131 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 6202 0 0
"3507" "exp3" 1 132 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 3548 0 0
"3507" "exp3" 2 1 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1193 43 1
"3507" "exp3" 2 2 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1826 0 0
"3507" "exp3" 2 3 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1278 0 0
"3507" "exp3" 2 4 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1788 17 1
"3507" "exp3" 2 5 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1358 47 1
"3507" "exp3" 2 6 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1144 0 0
"3507" "exp3" 2 7 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1324 0 0
"3507" "exp3" 2 8 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1502 0 0
"3507" "exp3" 2 9 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1280 0 0
"3507" "exp3" 2 10 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1001 0 0
"3507" "exp3" 2 11 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1445 22 1
"3507" "exp3" 2 12 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 3296 16 1
"3507" "exp3" 2 13 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 2779 0 0
"3507" "exp3" 2 14 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1841 75 1
"3507" "exp3" 2 15 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1449 30 1
"3507" "exp3" 2 16 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 2018 0 0
"3507" "exp3" 2 17 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 4065 40 1
"3507" "exp3" 2 18 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1530 0 0
"3507" "exp3" 2 19 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1477 19 1
"3507" "exp3" 2 20 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1608 0 0
"3507" "exp3" 2 21 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1200 0 0
"3507" "exp3" 2 22 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 2640 51 1
"3507" "exp3" 2 23 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1353 0 0
"3507" "exp3" 2 24 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 4127 0 0
"3507" "exp3" 2 25 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1260 18 1
"3507" "exp3" 2 26 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1297 22 1
"3507" "exp3" 2 27 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 2292 0 0
"3507" "exp3" 2 28 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1296 31 1
"3507" "exp3" 2 29 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 3470 0 0
"3507" "exp3" 2 30 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1470 15 1
"3507" "exp3" 2 31 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1185 38 1
"3507" "exp3" 2 32 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1625 0 0
"3507" "exp3" 2 33 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 988 0 0
"3507" "exp3" 2 34 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 5713 28 1
"3507" "exp3" 2 35 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1200 0 0
"3507" "exp3" 2 36 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1703 0 0
"3507" "exp3" 2 37 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1353 75 1
"3507" "exp3" 2 38 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1664 83 1
"3507" "exp3" 2 39 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 973 23 1
"3507" "exp3" 2 40 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1491 41 1
"3507" "exp3" 2 41 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1766 21 1
"3507" "exp3" 2 42 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1352 34 1
"3507" "exp3" 2 43 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1718 0 0
"3507" "exp3" 2 44 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1449 0 0
"3507" "exp3" 2 45 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 2242 0 0
"3507" "exp3" 2 46 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1266 22 1
"3507" "exp3" 2 47 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1297 21 1
"3507" "exp3" 2 48 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 848 0 0
"3507" "exp3" 2 49 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1701 13 1
"3507" "exp3" 2 50 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 2095 0 0
"3507" "exp3" 2 51 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1150 0 0
"3507" "exp3" 2 52 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1072 80 1
"3507" "exp3" 2 53 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2144 29 1
"3507" "exp3" 2 54 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1379 0 0
"3507" "exp3" 2 55 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1772 24 1
"3507" "exp3" 2 56 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1043 0 0
"3507" "exp3" 2 57 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1407 0 0
"3507" "exp3" 2 58 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1547 42 1
"3507" "exp3" 2 59 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 5213 37 1
"3507" "exp3" 2 60 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 2792 0 0
"3507" "exp3" 2 61 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1208 0 0
"3507" "exp3" 2 62 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1007 91 1
"3507" "exp3" 2 63 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1433 20 1
"3507" "exp3" 2 64 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 1427 0 0
"3507" "exp3" 2 65 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1874 31 1
"3507" "exp3" 2 66 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1390 0 0
"3507" "exp3" 2 67 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1441 0 0
"3507" "exp3" 2 68 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1158 34 1
"3507" "exp3" 2 69 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1201 20 1
"3507" "exp3" 2 70 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1517 0 0
"3507" "exp3" 2 71 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 2200 68 1
"3507" "exp3" 2 72 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2024 0 0
"3507" "exp3" 2 73 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 4292 0 0
"3507" "exp3" 2 74 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 2004 0 0
"3507" "exp3" 2 75 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1965 0 0
"3507" "exp3" 2 76 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 2154 73 1
"3507" "exp3" 2 77 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1015 0 0
"3507" "exp3" 2 78 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 953 0 0
"3507" "exp3" 2 79 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2823 0 0
"3507" "exp3" 2 80 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1513 0 0
"3507" "exp3" 2 81 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 2938 73 1
"3507" "exp3" 2 82 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 960 70 1
"3507" "exp3" 2 83 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 2136 0 0
"3507" "exp3" 2 84 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1275 81 1
"3507" "exp3" 2 85 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1158 0 0
"3507" "exp3" 2 86 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1234 86 1
"3507" "exp3" 2 87 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1323 77 1
"3507" "exp3" 2 88 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1625 26 1
"3507" "exp3" 2 89 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1869 0 0
"3507" "exp3" 2 90 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1976 41 1
"3507" "exp3" 2 91 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1762 0 0
"3507" "exp3" 2 92 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1313 0 0
"3507" "exp3" 2 93 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1343 29 1
"3507" "exp3" 2 94 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 3202 45 1
"3507" "exp3" 2 95 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 3008 26 1
"3507" "exp3" 2 96 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1616 37 1
"3507" "exp3" 2 97 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1301 46 1
"3507" "exp3" 2 98 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1377 27 1
"3507" "exp3" 2 99 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1599 0 0
"3507" "exp3" 2 100 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1178 0 0
"3507" "exp3" 2 101 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1994 39 1
"3507" "exp3" 2 102 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1482 27 1
"3507" "exp3" 2 103 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1090 23 1
"3507" "exp3" 2 104 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1165 14 1
"3507" "exp3" 2 105 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1784 39 1
"3507" "exp3" 2 106 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 983 0 0
"3507" "exp3" 2 107 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1100 0 0
"3507" "exp3" 2 108 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1330 72 1
"3507" "exp3" 2 109 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 877 28 1
"3507" "exp3" 2 110 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1433 0 0
"3507" "exp3" 2 111 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1105 0 0
"3507" "exp3" 2 112 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1227 0 0
"3507" "exp3" 2 113 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1176 37 1
"3507" "exp3" 2 114 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 823 48 1
"3507" "exp3" 2 115 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 2689 0 0
"3507" "exp3" 2 116 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1424 0 0
"3507" "exp3" 2 117 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1174 33 1
"3507" "exp3" 2 118 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1154 0 0
"3507" "exp3" 2 119 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2284 44 1
"3507" "exp3" 2 120 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1417 32 1
"3507" "exp3" 2 121 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2467 36 1
"3507" "exp3" 2 122 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 834 0 0
"3507" "exp3" 2 123 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1789 93 1
"3507" "exp3" 2 124 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1710 25 1
"3507" "exp3" 2 125 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1174 0 0
"3507" "exp3" 2 126 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1040 19 1
"3507" "exp3" 2 127 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1322 24 1
"3507" "exp3" 2 128 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 2072 0 0
"3507" "exp3" 2 129 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1986 36 1
"3507" "exp3" 2 130 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1616 71 1
"3507" "exp3" 2 131 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 1227 0 0
"3507" "exp3" 2 132 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2158 0 0
"3507" "exp3" 1 1 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 4134 0 0
"3507" "exp3" 1 2 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1432 43 1
"3507" "exp3" 1 3 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 2092 18 1
"3507" "exp3" 1 4 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2639 31 1
"3507" "exp3" 1 5 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1292 25 1
"3507" "exp3" 1 6 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1826 30 1
"3507" "exp3" 1 7 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1200 41 1
"3507" "exp3" 1 8 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 3769 0 0
"3507" "exp3" 1 9 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1782 0 0
"3507" "exp3" 1 10 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1330 72 1
"3507" "exp3" 1 11 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1317 0 0
"3507" "exp3" 1 12 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1056 23 1
"3507" "exp3" 1 13 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1058 22 1
"3507" "exp3" 1 14 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1170 21 1
"3507" "exp3" 1 15 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 3558 87 1
"3507" "exp3" 1 16 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1818 0 0
"3507" "exp3" 1 17 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1070 45 1
"3507" "exp3" 1 18 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1827 0 0
"3507" "exp3" 1 19 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 2253 0 0
"3507" "exp3" 1 20 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1520 39 1
"3507" "exp3" 1 21 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1414 0 0
"3507" "exp3" 1 22 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2236 49 1
"3507" "exp3" 1 23 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 1972 0 0
"3507" "exp3" 1 24 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1845 33 1
"3507" "exp3" 1 25 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1178 29 1
"3507" "exp3" 1 26 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1670 92 1
"3507" "exp3" 1 27 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2311 0 0
"3507" "exp3" 1 28 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1174 38 1
"3507" "exp3" 1 29 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1263 0 0
"3507" "exp3" 1 30 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1172 0 0
"3507" "exp3" 1 31 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 886 39 1
"3507" "exp3" 1 32 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 2183 18 1
"3507" "exp3" 1 33 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1990 26 1
"3507" "exp3" 1 34 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1508 31 1
"3507" "exp3" 1 35 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1618 0 0
"3507" "exp3" 1 36 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1581 22 1
"3507" "exp3" 1 37 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 2315 19 1
"3507" "exp3" 1 38 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 6020 0 0
"3507" "exp3" 1 39 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 5122 20 1
"3507" "exp3" 1 40 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 3713 33 1
"3507" "exp3" 1 41 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2120 0 0
"3507" "exp3" 1 42 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 5201 0 0
"3507" "exp3" 1 43 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 975 32 1
"3507" "exp3" 1 44 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1055 30 1
"3507" "exp3" 1 45 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 3169 0 0
"3507" "exp3" 1 46 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1818 0 0
"3507" "exp3" 1 47 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1190 37 1
"3507" "exp3" 1 48 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1205 27 1
"3507" "exp3" 1 49 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1393 70 1
"3507" "exp3" 1 50 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1804 0 0
"3507" "exp3" 1 51 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1733 24 1
"3507" "exp3" 1 52 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1606 23 1
"3507" "exp3" 1 53 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 4214 0 0
"3507" "exp3" 1 54 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 2974 0 0
"3507" "exp3" 1 55 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 6147 17 1
"3507" "exp3" 1 56 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 3271 31 1
"3507" "exp3" 1 57 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1640 0 0
"3507" "exp3" 1 58 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 2772 0 0
"3507" "exp3" 1 59 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 3028 0 0
"3507" "exp3" 1 60 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 4048 0 0
"3507" "exp3" 1 61 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1761 83 1
"3507" "exp3" 1 62 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 2057 28 1
"3507" "exp3" 1 63 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 4705 13 1
"3507" "exp3" 1 64 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 4679 29 1
"3507" "exp3" 1 65 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 2367 0 0
"3507" "exp3" 1 66 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1716 0 0
"3507" "exp3" 1 67 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 6513 28 1
"3507" "exp3" 1 68 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1386 23 1
"3507" "exp3" 1 69 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 3176 0 0
"3507" "exp3" 1 70 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 4155 0 0
"3507" "exp3" 1 71 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1801 28 1
"3507" "exp3" 1 72 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1771 32 1
"3507" "exp3" 1 73 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 4098 0 0
"3507" "exp3" 1 74 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2565 16 1
"3507" "exp3" 1 75 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 2784 25 1
"3507" "exp3" 1 76 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 6283 26 1
"3507" "exp3" 1 77 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 3728 0 0
"3507" "exp3" 1 78 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 2889 23 1
"3507" "exp3" 1 79 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 2408 95 1
"3507" "exp3" 1 80 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 4440 31 1
"3507" "exp3" 1 81 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1716 26 1
"3507" "exp3" 1 82 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1804 0 0
"3507" "exp3" 1 83 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 4859 18 1
"3507" "exp3" 1 84 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 5446 20 1
"3507" "exp3" 1 85 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 4051 0 0
"3507" "exp3" 1 86 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 3699 0 0
"3507" "exp3" 1 87 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2718 24 1
"3507" "exp3" 1 88 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2757 34 1
"3507" "exp3" 1 89 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 3345 21 1
"3507" "exp3" 1 90 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 3497 0 0
"3507" "exp3" 1 91 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2850 14 1
"3507" "exp3" 1 92 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 2686 27 1
"3507" "exp3" 1 93 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1261 0 0
"3507" "exp3" 1 94 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3112 0 0
"3507" "exp3" 1 95 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1655 0 0
"3507" "exp3" 1 96 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1507 35 1
"3507" "exp3" 1 97 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1198 34 1
"3507" "exp3" 1 98 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 3619 0 0
"3507" "exp3" 1 99 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1503 0 0
"3507" "exp3" 1 100 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1405 0 0
"3507" "exp3" 1 101 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2230 0 0
"3507" "exp3" 1 102 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 4105 33 1
"3507" "exp3" 1 103 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1275 0 0
"3507" "exp3" 1 104 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 5881 0 0
"3507" "exp3" 1 105 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 2558 19 1
"3507" "exp3" 1 106 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1996 0 0
"3507" "exp3" 1 107 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1879 0 0
"3507" "exp3" 1 108 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2448 88 1
"3507" "exp3" 1 109 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 5217 47 1
"3507" "exp3" 1 110 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2379 0 0
"3507" "exp3" 1 111 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 3002 0 0
"3507" "exp3" 1 112 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 5185 80 1
"3507" "exp3" 1 113 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 2831 0 0
"3507" "exp3" 1 114 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1866 0 0
"3507" "exp3" 1 115 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1924 0 0
"3507" "exp3" 1 116 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 3824 0 0
"3507" "exp3" 1 117 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 3264 0 0
"3507" "exp3" 1 118 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 2553 0 0
"3507" "exp3" 1 119 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 3375 27 1
"3507" "exp3" 1 120 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 2542 29 1
"3507" "exp3" 1 121 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 3024 81 1
"3507" "exp3" 1 122 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 3271 0 0
"3507" "exp3" 1 123 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 3419 88 1
"3507" "exp3" 1 124 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1987 26 1
"3507" "exp3" 1 125 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 2847 0 0
"3507" "exp3" 1 126 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 2735 38 1
"3507" "exp3" 1 127 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1860 46 1
"3507" "exp3" 1 128 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2052 0 0
"3507" "exp3" 1 129 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1275 36 1
"3507" "exp3" 1 130 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 3203 0 0
"3507" "exp3" 1 131 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 2253 52 1
"3507" "exp3" 1 132 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2648 0 0
"3507" "exp3" 2 1 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 5501 70 1
"3507" "exp3" 2 2 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2200 97 1
"3507" "exp3" 2 3 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 3237 22 1
"3507" "exp3" 2 4 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2097 40 1
"3507" "exp3" 2 5 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 2807 80 1
"3507" "exp3" 2 6 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1980 0 0
"3507" "exp3" 2 7 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 10488 21 1
"3507" "exp3" 2 8 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1299 0 0
"3507" "exp3" 2 9 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 5445 87 1
"3507" "exp3" 2 10 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 3670 43 1
"3507" "exp3" 2 11 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 2869 0 0
"3507" "exp3" 2 12 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 8125 0 0
"3507" "exp3" 2 13 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 2639 45 1
"3507" "exp3" 2 14 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2205 0 0
"3507" "exp3" 2 15 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 3506 38 1
"3507" "exp3" 2 16 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 4617 0 0
"3507" "exp3" 2 17 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2674 0 0
"3507" "exp3" 2 18 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 2315 0 0
"3507" "exp3" 2 19 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 2877 0 0
"3507" "exp3" 2 20 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 2028 29 1
"3507" "exp3" 2 21 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 6529 0 0
"3507" "exp3" 2 22 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2540 0 0
"3507" "exp3" 2 23 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 3509 0 0
"3507" "exp3" 2 24 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2970 75 1
"3507" "exp3" 2 25 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 3470 29 1
"3507" "exp3" 2 26 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 3096 29 1
"3507" "exp3" 2 27 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 3901 0 0
"3507" "exp3" 2 28 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 3806 0 0
"3507" "exp3" 2 29 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 3559 0 0
"3507" "exp3" 2 30 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 4631 18 1
"3507" "exp3" 2 31 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1750 0 0
"3507" "exp3" 2 32 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 6527 23 1
"3507" "exp3" 2 33 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1907 44 1
"3507" "exp3" 2 34 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2536 22 1
"3507" "exp3" 2 35 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 2849 86 1
"3507" "exp3" 2 36 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 2370 0 0
"3507" "exp3" 2 37 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1653 32 1
"3507" "exp3" 2 38 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 2412 0 0
"3507" "exp3" 2 39 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 3705 0 0
"3507" "exp3" 2 40 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 2333 82 1
"3507" "exp3" 2 41 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 2221 31 1
"3507" "exp3" 2 42 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 4048 42 1
"3507" "exp3" 2 43 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 2892 15 1
"3507" "exp3" 2 44 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1817 46 1
"3507" "exp3" 2 45 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1331 0 0
"3507" "exp3" 2 46 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1849 0 0
"3507" "exp3" 2 47 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1888 0 0
"3507" "exp3" 2 48 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 2815 18 1
"3507" "exp3" 2 49 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2516 14 1
"3507" "exp3" 2 50 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1827 0 0
"3507" "exp3" 2 51 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 2371 0 0
"3507" "exp3" 2 52 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1506 30 1
"3507" "exp3" 2 53 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2170 31 1
"3507" "exp3" 2 54 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 3592 0 0
"3507" "exp3" 2 55 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1494 0 0
"3507" "exp3" 2 56 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1415 0 0
"3507" "exp3" 2 57 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 2452 17 1
"3507" "exp3" 2 58 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 2958 76 1
"3507" "exp3" 2 59 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2016 0 0
"3507" "exp3" 2 60 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 2636 0 0
"3507" "exp3" 2 61 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1926 38 1
"3507" "exp3" 2 62 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1482 0 0
"3507" "exp3" 2 63 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1763 75 1
"3507" "exp3" 2 64 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 2381 0 0
"3507" "exp3" 2 65 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 3290 0 0
"3507" "exp3" 2 66 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 2096 23 1
"3507" "exp3" 2 67 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1352 0 0
"3507" "exp3" 2 68 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1385 0 0
"3507" "exp3" 2 69 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 5229 0 0
"3507" "exp3" 2 70 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1939 17 1
"3507" "exp3" 2 71 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 2124 0 0
"3507" "exp3" 2 72 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 13271 34 1
"3507" "exp3" 2 73 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 4719 0 0
"3507" "exp3" 2 74 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 2341 0 0
"3507" "exp3" 2 75 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1228 0 0
"3507" "exp3" 2 76 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2775 37 1
"3507" "exp3" 2 77 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1499 35 1
"3507" "exp3" 2 78 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 4045 0 0
"3507" "exp3" 2 79 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 2287 13 1
"3507" "exp3" 2 80 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 2799 0 0
"3507" "exp3" 2 81 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1904 33 1
"3507" "exp3" 2 82 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2740 16 1
"3507" "exp3" 2 83 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 3641 22 1
"3507" "exp3" 2 84 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2818 0 0
"3507" "exp3" 2 85 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1980 0 0
"3507" "exp3" 2 86 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 2476 0 0
"3507" "exp3" 2 87 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 2852 0 0
"3507" "exp3" 2 88 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 2553 12 1
"3507" "exp3" 2 89 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 4893 0 0
"3507" "exp3" 2 90 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 2069 0 0
"3507" "exp3" 2 91 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2070 41 1
"3507" "exp3" 2 92 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1991 24 1
"3507" "exp3" 2 93 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 3076 25 1
"3507" "exp3" 2 94 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 2369 0 0
"3507" "exp3" 2 95 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1488 28 1
"3507" "exp3" 2 96 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1745 88 1
"3507" "exp3" 2 97 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 2599 27 1
"3507" "exp3" 2 98 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 2004 0 0
"3507" "exp3" 2 99 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 2330 33 1
"3507" "exp3" 2 100 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 2266 28 1
"3507" "exp3" 2 101 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 3126 34 1
"3507" "exp3" 2 102 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 2914 0 0
"3507" "exp3" 2 103 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 2549 26 1
"3507" "exp3" 2 104 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 2102 23 1
"3507" "exp3" 2 105 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1796 30 1
"3507" "exp3" 2 106 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 3942 0 0
"3507" "exp3" 2 107 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 4646 0 0
"3507" "exp3" 2 108 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 2056 36 1
"3507" "exp3" 2 109 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2318 41 1
"3507" "exp3" 2 110 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1666 0 0
"3507" "exp3" 2 111 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1923 27 1
"3507" "exp3" 2 112 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 4217 37 1
"3507" "exp3" 2 113 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 3647 0 0
"3507" "exp3" 2 114 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 6452 64 1
"3507" "exp3" 2 115 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 2338 0 0
"3507" "exp3" 2 116 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1506 0 0
"3507" "exp3" 2 117 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 2098 20 1
"3507" "exp3" 2 118 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2178 0 0
"3507" "exp3" 2 119 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1615 0 0
"3507" "exp3" 2 120 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 2762 0 0
"3507" "exp3" 2 121 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 2698 0 0
"3507" "exp3" 2 122 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1437 0 0
"3507" "exp3" 2 123 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1579 36 1
"3507" "exp3" 2 124 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1453 35 1
"3507" "exp3" 2 125 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 3090 26 1
"3507" "exp3" 2 126 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2069 24 1
"3507" "exp3" 2 127 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 2051 24 1
"3507" "exp3" 2 128 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 2449 0 0
"3507" "exp3" 2 129 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 2537 0 0
"3507" "exp3" 2 130 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1536 0 0
"3507" "exp3" 2 131 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1341 20 1
"3507" "exp3" 2 132 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 2631 31 1
"3508" "exp3" 1 1 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 717 25 1
"3508" "exp3" 1 2 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 797 0 0
"3508" "exp3" 1 3 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1119 0 0
"3508" "exp3" 1 4 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 867 35 1
"3508" "exp3" 1 5 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1353 34 1
"3508" "exp3" 1 6 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1402 48 1
"3508" "exp3" 1 7 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1418 0 0
"3508" "exp3" 1 8 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1307 0 0
"3508" "exp3" 1 9 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1017 0 0
"3508" "exp3" 1 10 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1101 0 0
"3508" "exp3" 1 11 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1415 0 0
"3508" "exp3" 1 12 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1574 19 1
"3508" "exp3" 1 13 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 1246 0 0
"3508" "exp3" 1 14 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1435 17 1
"3508" "exp3" 1 15 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1486 0 0
"3508" "exp3" 1 16 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 929 0 0
"3508" "exp3" 1 17 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1193 23 1
"3508" "exp3" 1 18 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1258 15 1
"3508" "exp3" 1 19 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 938 21 1
"3508" "exp3" 1 20 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1357 0 0
"3508" "exp3" 1 21 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1524 0 0
"3508" "exp3" 1 22 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 2887 0 0
"3508" "exp3" 1 23 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1107 18 1
"3508" "exp3" 1 24 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1360 34 1
"3508" "exp3" 1 25 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1606 44 1
"3508" "exp3" 1 26 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 846 17 1
"3508" "exp3" 1 27 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 713 14 1
"3508" "exp3" 1 28 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1206 43 1
"3508" "exp3" 1 29 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1091 0 0
"3508" "exp3" 1 30 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1517 0 0
"3508" "exp3" 1 31 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1626 19 1
"3508" "exp3" 1 32 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1076 31 1
"3508" "exp3" 1 33 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1051 15 1
"3508" "exp3" 1 34 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1011 28 1
"3508" "exp3" 1 35 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 895 44 1
"3508" "exp3" 1 36 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 711 40 1
"3508" "exp3" 1 37 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 911 27 1
"3508" "exp3" 1 38 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1021 22 1
"3508" "exp3" 1 39 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1121 13 1
"3508" "exp3" 1 40 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1585 0 0
"3508" "exp3" 1 41 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1697 0 0
"3508" "exp3" 1 42 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1006 0 0
"3508" "exp3" 1 43 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 915 26 1
"3508" "exp3" 1 44 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1343 41 1
"3508" "exp3" 1 45 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1242 26 1
"3508" "exp3" 1 46 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1192 23 1
"3508" "exp3" 1 47 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1217 26 1
"3508" "exp3" 1 48 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1858 37 1
"3508" "exp3" 1 49 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 3131 13 1
"3508" "exp3" 1 50 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 3059 27 1
"3508" "exp3" 1 51 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1612 0 0
"3508" "exp3" 1 52 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 874 16 1
"3508" "exp3" 1 53 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1378 0 0
"3508" "exp3" 1 54 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 937 0 0
"3508" "exp3" 1 55 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1817 0 0
"3508" "exp3" 1 56 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 931 27 1
"3508" "exp3" 1 57 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 829 20 1
"3508" "exp3" 1 58 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 998 21 1
"3508" "exp3" 1 59 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1197 38 1
"3508" "exp3" 1 60 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1371 0 0
"3508" "exp3" 1 61 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 963 0 0
"3508" "exp3" 1 62 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 863 16 1
"3508" "exp3" 1 63 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1028 0 0
"3508" "exp3" 1 64 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 828 5 1
"3508" "exp3" 1 65 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1150 0 0
"3508" "exp3" 1 66 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1867 90 1
"3508" "exp3" 1 67 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1292 27 1
"3508" "exp3" 1 68 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1976 33 1
"3508" "exp3" 1 69 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 986 17 1
"3508" "exp3" 1 70 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 916 11 1
"3508" "exp3" 1 71 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1446 0 0
"3508" "exp3" 1 72 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1062 17 1
"3508" "exp3" 1 73 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1005 7 1
"3508" "exp3" 1 74 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1822 0 0
"3508" "exp3" 1 75 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 2218 23 1
"3508" "exp3" 1 76 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1228 31 1
"3508" "exp3" 1 77 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 946 24 1
"3508" "exp3" 1 78 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1060 0 0
"3508" "exp3" 1 79 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 998 0 0
"3508" "exp3" 1 80 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 906 10 1
"3508" "exp3" 1 81 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 907 5 1
"3508" "exp3" 1 82 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1060 18 1
"3508" "exp3" 1 83 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1159 45 1
"3508" "exp3" 1 84 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 746 21 1
"3508" "exp3" 1 85 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 794 35 1
"3508" "exp3" 1 86 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 738 0 0
"3508" "exp3" 1 87 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1180 4 1
"3508" "exp3" 1 88 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 966 0 0
"3508" "exp3" 1 89 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1095 28 1
"3508" "exp3" 1 90 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 2238 36 1
"3508" "exp3" 1 91 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1296 25 1
"3508" "exp3" 1 92 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1206 9 1
"3508" "exp3" 1 93 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1690 24 1
"3508" "exp3" 1 94 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1082 6 1
"3508" "exp3" 1 95 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 973 30 1
"3508" "exp3" 1 96 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1825 0 0
"3508" "exp3" 1 97 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1653 0 0
"3508" "exp3" 1 98 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1794 0 0
"3508" "exp3" 1 99 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 871 29 1
"3508" "exp3" 1 100 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1037 22 1
"3508" "exp3" 1 101 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 734 30 1
"3508" "exp3" 1 102 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 778 33 1
"3508" "exp3" 1 103 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 765 12 1
"3508" "exp3" 1 104 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 907 0 0
"3508" "exp3" 1 105 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1979 0 0
"3508" "exp3" 1 106 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1357 0 0
"3508" "exp3" 1 107 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 667 24 1
"3508" "exp3" 1 108 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 3236 1 1
"3508" "exp3" 1 109 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1682 19 1
"3508" "exp3" 1 110 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 3135 0 0
"3508" "exp3" 1 111 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1094 42 1
"3508" "exp3" 1 112 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1542 13 1
"3508" "exp3" 1 113 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 881 39 1
"3508" "exp3" 1 114 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2581 0 0
"3508" "exp3" 1 115 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 1241 7 1
"3508" "exp3" 1 116 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1088 0 0
"3508" "exp3" 1 117 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1483 0 0
"3508" "exp3" 1 118 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 2488 6 1
"3508" "exp3" 1 119 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 910 14 1
"3508" "exp3" 1 120 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 936 18 1
"3508" "exp3" 1 121 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1204 42 1
"3508" "exp3" 1 122 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1213 0 0
"3508" "exp3" 1 123 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1460 32 1
"3508" "exp3" 1 124 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 1646 3 1
"3508" "exp3" 1 125 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 2286 0 0
"3508" "exp3" 1 126 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 3277 30 1
"3508" "exp3" 1 127 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1348 11 1
"3508" "exp3" 1 128 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 988 0 0
"3508" "exp3" 1 129 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1786 38 1
"3508" "exp3" 1 130 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 742 20 1
"3508" "exp3" 1 131 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1082 25 1
"3508" "exp3" 1 132 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1829 32 1
"3508" "exp3" 2 1 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1070 4 1
"3508" "exp3" 2 2 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 975 22 1
"3508" "exp3" 2 3 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1066 34 1
"3508" "exp3" 2 4 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1047 33 1
"3508" "exp3" 2 5 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1530 0 0
"3508" "exp3" 2 6 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1075 23 1
"3508" "exp3" 2 7 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1135 0 0
"3508" "exp3" 2 8 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1553 0 0
"3508" "exp3" 2 9 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1070 0 0
"3508" "exp3" 2 10 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1278 26 1
"3508" "exp3" 2 11 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1218 14 1
"3508" "exp3" 2 12 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1108 22 1
"3508" "exp3" 2 13 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1850 30 1
"3508" "exp3" 2 14 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1510 0 0
"3508" "exp3" 2 15 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1598 0 0
"3508" "exp3" 2 16 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1150 14 1
"3508" "exp3" 2 17 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1479 0 0
"3508" "exp3" 2 18 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1624 48 1
"3508" "exp3" 2 19 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1210 20 1
"3508" "exp3" 2 20 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1219 33 1
"3508" "exp3" 2 21 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1346 0 0
"3508" "exp3" 2 22 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1379 28 1
"3508" "exp3" 2 23 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1178 10 1
"3508" "exp3" 2 24 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 947 18 1
"3508" "exp3" 2 25 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1189 24 1
"3508" "exp3" 2 26 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1387 26 1
"3508" "exp3" 2 27 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1167 0 0
"3508" "exp3" 2 28 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2261 40 1
"3508" "exp3" 2 29 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1715 38 1
"3508" "exp3" 2 30 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1659 6 1
"3508" "exp3" 2 31 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1810 45 1
"3508" "exp3" 2 32 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1982 0 0
"3508" "exp3" 2 33 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1190 20 1
"3508" "exp3" 2 34 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 822 27 1
"3508" "exp3" 2 35 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 923 16 1
"3508" "exp3" 2 36 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1134 27 1
"3508" "exp3" 2 37 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1052 0 0
"3508" "exp3" 2 38 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1866 9 1
"3508" "exp3" 2 39 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 950 19 1
"3508" "exp3" 2 40 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1430 12 1
"3508" "exp3" 2 41 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2186 43 1
"3508" "exp3" 2 42 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1660 11 1
"3508" "exp3" 2 43 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1084 7 1
"3508" "exp3" 2 44 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1502 31 1
"3508" "exp3" 2 45 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 2146 22 1
"3508" "exp3" 2 46 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1874 18 1
"3508" "exp3" 2 47 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1918 37 1
"3508" "exp3" 2 48 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1513 13 1
"3508" "exp3" 2 49 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1836 0 0
"3508" "exp3" 2 50 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 3585 38 1
"3508" "exp3" 2 51 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3091 49 1
"3508" "exp3" 2 52 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 4024 31 1
"3508" "exp3" 2 53 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 3135 21 1
"3508" "exp3" 2 54 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 2487 30 1
"3508" "exp3" 2 55 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1368 18 1
"3508" "exp3" 2 56 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 2069 0 0
"3508" "exp3" 2 57 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1747 25 1
"3508" "exp3" 2 58 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1325 43 1
"3508" "exp3" 2 59 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1678 0 0
"3508" "exp3" 2 60 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1152 30 1
"3508" "exp3" 2 61 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1101 9 1
"3508" "exp3" 2 62 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1893 25 1
"3508" "exp3" 2 63 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1027 24 1
"3508" "exp3" 2 64 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1050 23 1
"3508" "exp3" 2 65 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1832 44 1
"3508" "exp3" 2 66 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1469 15 1
"3508" "exp3" 2 67 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1066 11 1
"3508" "exp3" 2 68 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1292 0 0
"3508" "exp3" 2 69 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 924 0 0
"3508" "exp3" 2 70 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2212 39 1
"3508" "exp3" 2 71 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2267 35 1
"3508" "exp3" 2 72 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 970 0 0
"3508" "exp3" 2 73 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1004 24 1
"3508" "exp3" 2 74 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 1073 8 1
"3508" "exp3" 2 75 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1110 16 1
"3508" "exp3" 2 76 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1168 0 0
"3508" "exp3" 2 77 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1274 41 1
"3508" "exp3" 2 78 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1980 0 0
"3508" "exp3" 2 79 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1457 29 1
"3508" "exp3" 2 80 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1279 5 1
"3508" "exp3" 2 81 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2840 41 1
"3508" "exp3" 2 82 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 2218 0 0
"3508" "exp3" 2 83 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2948 0 0
"3508" "exp3" 2 84 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 2537 20 1
"3508" "exp3" 2 85 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1389 0 0
"3508" "exp3" 2 86 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1020 0 0
"3508" "exp3" 2 87 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1483 31 1
"3508" "exp3" 2 88 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1192 40 1
"3508" "exp3" 2 89 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 2124 0 0
"3508" "exp3" 2 90 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1603 19 1
"3508" "exp3" 2 91 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1954 23 1
"3508" "exp3" 2 92 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1201 0 0
"3508" "exp3" 2 93 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 835 3 1
"3508" "exp3" 2 94 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1465 0 0
"3508" "exp3" 2 95 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 1731 5 1
"3508" "exp3" 2 96 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1921 42 1
"3508" "exp3" 2 97 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1216 0 0
"3508" "exp3" 2 98 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 912 7 1
"3508" "exp3" 2 99 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 2614 0 0
"3508" "exp3" 2 100 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 930 15 1
"3508" "exp3" 2 101 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1388 28 1
"3508" "exp3" 2 102 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1621 21 1
"3508" "exp3" 2 103 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1016 19 1
"3508" "exp3" 2 104 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1577 0 0
"3508" "exp3" 2 105 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1515 13 1
"3508" "exp3" 2 106 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 982 17 1
"3508" "exp3" 2 107 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1084 21 1
"3508" "exp3" 2 108 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 3414 1 1
"3508" "exp3" 2 109 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 5339 0 0
"3508" "exp3" 2 110 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 3607 0 0
"3508" "exp3" 2 111 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1569 20 1
"3508" "exp3" 2 112 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1558 32 1
"3508" "exp3" 2 113 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 808 22 1
"3508" "exp3" 2 114 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 940 24 1
"3508" "exp3" 2 115 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1356 36 1
"3508" "exp3" 2 116 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1165 12 1
"3508" "exp3" 2 117 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1535 33 1
"3508" "exp3" 2 118 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 975 10 1
"3508" "exp3" 2 119 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1104 23 1
"3508" "exp3" 2 120 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 987 2 1
"3508" "exp3" 2 121 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 2849 68 1
"3508" "exp3" 2 122 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 3089 32 1
"3508" "exp3" 2 123 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 2407 15 1
"3508" "exp3" 2 124 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1108 14 1
"3508" "exp3" 2 125 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1739 17 1
"3508" "exp3" 2 126 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 906 0 0
"3508" "exp3" 2 127 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 2844 0 0
"3508" "exp3" 2 128 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1499 0 0
"3508" "exp3" 2 129 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1872 0 0
"3508" "exp3" 2 130 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 964 6 1
"3508" "exp3" 2 131 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1455 0 0
"3508" "exp3" 2 132 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1112 0 0
"3508" "exp3" 1 1 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 1439 62 1
"3508" "exp3" 1 2 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 1027 0 0
"3508" "exp3" 1 3 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 1732 0 0
"3508" "exp3" 1 4 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1340 0 0
"3508" "exp3" 1 5 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 981 0 0
"3508" "exp3" 1 6 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1828 0 0
"3508" "exp3" 1 7 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 824 93 1
"3508" "exp3" 1 8 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 883 0 0
"3508" "exp3" 1 9 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 654 91 1
"3508" "exp3" 1 10 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1220 0 0
"3508" "exp3" 1 11 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1259 78 1
"3508" "exp3" 1 12 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1042 0 0
"3508" "exp3" 1 13 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 2370 0 0
"3508" "exp3" 1 14 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 815 0 0
"3508" "exp3" 1 15 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1121 0 0
"3508" "exp3" 1 16 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 990 0 0
"3508" "exp3" 1 17 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 985 0 0
"3508" "exp3" 1 18 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1012 0 0
"3508" "exp3" 1 19 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1860 34 1
"3508" "exp3" 1 20 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1059 0 0
"3508" "exp3" 1 21 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 738 0 0
"3508" "exp3" 1 22 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 1651 0 0
"3508" "exp3" 1 23 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 1029 0 0
"3508" "exp3" 1 24 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 1412 0 0
"3508" "exp3" 1 25 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 1203 0 0
"3508" "exp3" 1 26 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 742 0 0
"3508" "exp3" 1 27 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 1063 0 0
"3508" "exp3" 1 28 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 811 0 0
"3508" "exp3" 1 29 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 851 0 0
"3508" "exp3" 1 30 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 2696 0 0
"3508" "exp3" 1 31 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1000 0 0
"3508" "exp3" 1 32 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1712 73 1
"3508" "exp3" 1 33 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1604 0 0
"3508" "exp3" 1 34 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 1235 71 1
"3508" "exp3" 1 35 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1276 0 0
"3508" "exp3" 1 36 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 2922 0 0
"3508" "exp3" 1 37 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 654 0 0
"3508" "exp3" 1 38 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 874 0 0
"3508" "exp3" 1 39 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 1038 0 0
"3508" "exp3" 1 40 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 2062 67 1
"3508" "exp3" 1 41 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 949 0 0
"3508" "exp3" 1 42 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 3080 89 1
"3508" "exp3" 1 43 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1258 76 1
"3508" "exp3" 1 44 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1295 65 1
"3508" "exp3" 1 45 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1002 0 0
"3508" "exp3" 1 46 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 917 80 1
"3508" "exp3" 1 47 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1301 0 0
"3508" "exp3" 1 48 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1555 86 1
"3508" "exp3" 1 49 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 716 88 1
"3508" "exp3" 1 50 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 868 0 0
"3508" "exp3" 1 51 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1737 0 0
"3508" "exp3" 1 52 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 2638 0 0
"3508" "exp3" 1 53 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1933 57 1
"3508" "exp3" 1 54 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1018 0 0
"3508" "exp3" 1 55 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1210 0 0
"3508" "exp3" 1 56 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 897 0 0
"3508" "exp3" 1 57 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 841 0 0
"3508" "exp3" 1 58 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 787 0 0
"3508" "exp3" 1 59 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 1143 0 0
"3508" "exp3" 1 60 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1065 0 0
"3508" "exp3" 1 61 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1689 0 0
"3508" "exp3" 1 62 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 2245 0 0
"3508" "exp3" 1 63 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 2035 0 0
"3508" "exp3" 1 64 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 1023 0 0
"3508" "exp3" 1 65 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1123 0 0
"3508" "exp3" 1 66 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 845 0 0
"3508" "exp3" 1 67 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 937 0 0
"3508" "exp3" 1 68 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 932 72 1
"3508" "exp3" 1 69 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 892 0 0
"3508" "exp3" 1 70 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 1061 0 0
"3508" "exp3" 1 71 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 937 0 0
"3508" "exp3" 1 72 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1019 0 0
"3508" "exp3" 1 73 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 1544 63 1
"3508" "exp3" 1 74 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1019 0 0
"3508" "exp3" 1 75 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1301 63 1
"3508" "exp3" 1 76 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 815 0 0
"3508" "exp3" 1 77 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1044 0 0
"3508" "exp3" 1 78 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 2485 41 1
"3508" "exp3" 1 79 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1613 0 0
"3508" "exp3" 1 80 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1816 0 0
"3508" "exp3" 1 81 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 3339 70 1
"3508" "exp3" 1 82 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1917 49 1
"3508" "exp3" 1 83 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 2759 61 1
"3508" "exp3" 1 84 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 875 73 1
"3508" "exp3" 1 85 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 926 73 1
"3508" "exp3" 1 86 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1250 0 0
"3508" "exp3" 1 87 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 1686 0 0
"3508" "exp3" 1 88 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1077 0 0
"3508" "exp3" 1 89 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 928 0 0
"3508" "exp3" 1 90 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 1107 64 1
"3508" "exp3" 1 91 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 1391 0 0
"3508" "exp3" 1 92 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1333 0 0
"3508" "exp3" 1 93 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1248 0 0
"3508" "exp3" 1 94 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1332 0 0
"3508" "exp3" 1 95 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 885 0 0
"3508" "exp3" 1 96 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 1771 0 0
"3508" "exp3" 1 97 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 1078 74 1
"3508" "exp3" 1 98 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 936 0 0
"3508" "exp3" 1 99 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1244 68 1
"3508" "exp3" 1 100 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 1209 62 1
"3508" "exp3" 1 101 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 1027 0 0
"3508" "exp3" 1 102 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1542 0 0
"3508" "exp3" 1 103 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2508 47 1
"3508" "exp3" 1 104 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1293 0 0
"3508" "exp3" 1 105 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2078 72 1
"3508" "exp3" 1 106 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1000 0 0
"3508" "exp3" 1 107 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1224 0 0
"3508" "exp3" 1 108 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 893 0 0
"3508" "exp3" 1 109 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 680 0 0
"3508" "exp3" 1 110 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 785 0 0
"3508" "exp3" 1 111 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 848 0 0
"3508" "exp3" 1 112 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 797 75 1
"3508" "exp3" 1 113 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1030 0 0
"3508" "exp3" 1 114 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 941 0 0
"3508" "exp3" 1 115 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1087 0 0
"3508" "exp3" 1 116 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1411 68 1
"3508" "exp3" 1 117 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 1239 0 0
"3508" "exp3" 1 118 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1092 0 0
"3508" "exp3" 1 119 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1134 0 0
"3508" "exp3" 1 120 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1791 0 0
"3508" "exp3" 1 121 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 773 0 0
"3508" "exp3" 1 122 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 1259 0 0
"3508" "exp3" 1 123 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 956 75 1
"3508" "exp3" 1 124 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1208 0 0
"3508" "exp3" 1 125 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1209 0 0
"3508" "exp3" 1 126 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1263 0 0
"3508" "exp3" 1 127 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1243 0 0
"3508" "exp3" 1 128 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 2037 77 1
"3508" "exp3" 1 129 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1632 41 1
"3508" "exp3" 1 130 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 1568 0 0
"3508" "exp3" 1 131 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 805 80 1
"3508" "exp3" 1 132 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 2031 0 0
"3508" "exp3" 2 1 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2049 0 0
"3508" "exp3" 2 2 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 834 0 0
"3508" "exp3" 2 3 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 1024 0 0
"3508" "exp3" 2 4 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 882 74 1
"3508" "exp3" 2 5 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 842 0 0
"3508" "exp3" 2 6 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1316 0 0
"3508" "exp3" 2 7 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 1166 0 0
"3508" "exp3" 2 8 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1067 68 1
"3508" "exp3" 2 9 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 862 0 0
"3508" "exp3" 2 10 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1007 82 1
"3508" "exp3" 2 11 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 972 82 1
"3508" "exp3" 2 12 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 3680 0 0
"3508" "exp3" 2 13 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 931 0 0
"3508" "exp3" 2 14 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 2278 0 0
"3508" "exp3" 2 15 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 673 0 0
"3508" "exp3" 2 16 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 2775 0 0
"3508" "exp3" 2 17 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1797 0 0
"3508" "exp3" 2 18 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 893 0 0
"3508" "exp3" 2 19 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 754 0 0
"3508" "exp3" 2 20 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 722 79 1
"3508" "exp3" 2 21 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 759 78 1
"3508" "exp3" 2 22 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 891 0 0
"3508" "exp3" 2 23 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 947 0 0
"3508" "exp3" 2 24 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1291 73 1
"3508" "exp3" 2 25 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 940 0 0
"3508" "exp3" 2 26 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 668 0 0
"3508" "exp3" 2 27 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1591 0 0
"3508" "exp3" 2 28 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 968 0 0
"3508" "exp3" 2 29 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1802 47 1
"3508" "exp3" 2 30 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 1348 0 0
"3508" "exp3" 2 31 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 3176 38 1
"3508" "exp3" 2 32 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 2120 0 0
"3508" "exp3" 2 33 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 2316 0 0
"3508" "exp3" 2 34 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1406 0 0
"3508" "exp3" 2 35 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 954 0 0
"3508" "exp3" 2 36 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 2930 0 0
"3508" "exp3" 2 37 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 3166 65 1
"3508" "exp3" 2 38 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 1842 0 0
"3508" "exp3" 2 39 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1365 70 1
"3508" "exp3" 2 40 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 1172 69 1
"3508" "exp3" 2 41 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 878 0 0
"3508" "exp3" 2 42 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 950 75 1
"3508" "exp3" 2 43 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 2878 0 0
"3508" "exp3" 2 44 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1046 0 0
"3508" "exp3" 2 45 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 976 0 0
"3508" "exp3" 2 46 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 2160 0 0
"3508" "exp3" 2 47 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1667 0 0
"3508" "exp3" 2 48 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 3963 0 0
"3508" "exp3" 2 49 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1279 0 0
"3508" "exp3" 2 50 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 2755 58 1
"3508" "exp3" 2 51 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 2359 0 0
"3508" "exp3" 2 52 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 2052 0 0
"3508" "exp3" 2 53 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1445 69 1
"3508" "exp3" 2 54 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1159 0 0
"3508" "exp3" 2 55 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 997 0 0
"3508" "exp3" 2 56 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2016 69 1
"3508" "exp3" 2 57 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1036 0 0
"3508" "exp3" 2 58 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1235 71 1
"3508" "exp3" 2 59 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1556 0 0
"3508" "exp3" 2 60 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1229 0 0
"3508" "exp3" 2 61 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 983 0 0
"3508" "exp3" 2 62 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2159 0 0
"3508" "exp3" 2 63 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1631 48 1
"3508" "exp3" 2 64 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1081 0 0
"3508" "exp3" 2 65 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 4386 83 1
"3508" "exp3" 2 66 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 929 67 1
"3508" "exp3" 2 67 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 1429 59 1
"3508" "exp3" 2 68 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 3800 0 0
"3508" "exp3" 2 69 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 882 0 0
"3508" "exp3" 2 70 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 954 0 0
"3508" "exp3" 2 71 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 3280 68 1
"3508" "exp3" 2 72 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 739 0 0
"3508" "exp3" 2 73 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 666 0 0
"3508" "exp3" 2 74 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 2340 0 0
"3508" "exp3" 2 75 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 1184 0 0
"3508" "exp3" 2 76 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1100 0 0
"3508" "exp3" 2 77 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 1475 0 0
"3508" "exp3" 2 78 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1894 0 0
"3508" "exp3" 2 79 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 987 86 1
"3508" "exp3" 2 80 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1499 0 0
"3508" "exp3" 2 81 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 1454 0 0
"3508" "exp3" 2 82 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 1204 0 0
"3508" "exp3" 2 83 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 1887 0 0
"3508" "exp3" 2 84 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1392 0 0
"3508" "exp3" 2 85 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 918 0 0
"3508" "exp3" 2 86 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 2511 70 1
"3508" "exp3" 2 87 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1303 0 0
"3508" "exp3" 2 88 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 731 0 0
"3508" "exp3" 2 89 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 670 0 0
"3508" "exp3" 2 90 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 1775 0 0
"3508" "exp3" 2 91 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 772 67 1
"3508" "exp3" 2 92 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 883 0 0
"3508" "exp3" 2 93 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 771 0 0
"3508" "exp3" 2 94 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1680 34 1
"3508" "exp3" 2 95 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1366 78 1
"3508" "exp3" 2 96 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1414 0 0
"3508" "exp3" 2 97 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1009 0 0
"3508" "exp3" 2 98 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 991 0 0
"3508" "exp3" 2 99 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 2 1234 0 0
"3508" "exp3" 2 100 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1026 0 0
"3508" "exp3" 2 101 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1079 0 0
"3508" "exp3" 2 102 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 1205 0 0
"3508" "exp3" 2 103 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 719 0 0
"3508" "exp3" 2 104 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 1860 0 0
"3508" "exp3" 2 105 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 1337 0 0
"3508" "exp3" 2 106 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 740 0 0
"3508" "exp3" 2 107 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1514 0 0
"3508" "exp3" 2 108 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 1722 0 0
"3508" "exp3" 2 109 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 2508 0 0
"3508" "exp3" 2 110 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2072 0 0
"3508" "exp3" 2 111 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 753 0 0
"3508" "exp3" 2 112 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1834 45 1
"3508" "exp3" 2 113 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2040 95 1
"3508" "exp3" 2 114 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 2321 71 1
"3508" "exp3" 2 115 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1462 56 1
"3508" "exp3" 2 116 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1001 92 1
"3508" "exp3" 2 117 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 681 0 0
"3508" "exp3" 2 118 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 2964 44 1
"3508" "exp3" 2 119 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 2718 0 0
"3508" "exp3" 2 120 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1707 0 0
"3508" "exp3" 2 121 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1335 0 0
"3508" "exp3" 2 122 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 1253 77 1
"3508" "exp3" 2 123 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1397 0 0
"3508" "exp3" 2 124 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 861 0 0
"3508" "exp3" 2 125 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 724 81 1
"3508" "exp3" 2 126 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 953 0 0
"3508" "exp3" 2 127 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1314 0 0
"3508" "exp3" 2 128 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 795 0 0
"3508" "exp3" 2 129 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 1894 82 1
"3508" "exp3" 2 130 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 826 0 0
"3508" "exp3" 2 131 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 2316 72 1
"3508" "exp3" 2 132 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 1844 0 0
"3508" "exp3" 1 1 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1904 23 1
"3508" "exp3" 1 2 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1345 0 0
"3508" "exp3" 1 3 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1057 37 1
"3508" "exp3" 1 4 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1755 0 0
"3508" "exp3" 1 5 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 2696 23 1
"3508" "exp3" 1 6 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 2476 40 1
"3508" "exp3" 1 7 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 2702 0 0
"3508" "exp3" 1 8 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 922 11 1
"3508" "exp3" 1 9 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2719 36 1
"3508" "exp3" 1 10 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 2648 31 1
"3508" "exp3" 1 11 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 5300 0 0
"3508" "exp3" 1 12 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 2288 28 1
"3508" "exp3" 1 13 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 1005 5 1
"3508" "exp3" 1 14 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1116 38 1
"3508" "exp3" 1 15 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1223 33 1
"3508" "exp3" 1 16 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 2040 18 1
"3508" "exp3" 1 17 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1901 0 0
"3508" "exp3" 1 18 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 2444 0 0
"3508" "exp3" 1 19 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1832 25 1
"3508" "exp3" 1 20 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 831 0 0
"3508" "exp3" 1 21 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 924 15 1
"3508" "exp3" 1 22 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 2452 27 1
"3508" "exp3" 1 23 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 908 0 0
"3508" "exp3" 1 24 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 2147 30 1
"3508" "exp3" 1 25 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1761 25 1
"3508" "exp3" 1 26 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 901 0 0
"3508" "exp3" 1 27 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 775 15 1
"3508" "exp3" 1 28 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 967 30 1
"3508" "exp3" 1 29 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 784 17 1
"3508" "exp3" 1 30 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1184 19 1
"3508" "exp3" 1 31 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 606 8 1
"3508" "exp3" 1 32 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1207 31 1
"3508" "exp3" 1 33 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1278 14 1
"3508" "exp3" 1 34 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1164 31 1
"3508" "exp3" 1 35 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2465 0 0
"3508" "exp3" 1 36 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1320 16 1
"3508" "exp3" 1 37 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1705 0 0
"3508" "exp3" 1 38 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 2816 19 1
"3508" "exp3" 1 39 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 2009 4 1
"3508" "exp3" 1 40 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 2753 68 1
"3508" "exp3" 1 41 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1983 0 0
"3508" "exp3" 1 42 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2007 41 1
"3508" "exp3" 1 43 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1536 24 1
"3508" "exp3" 1 44 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 901 7 1
"3508" "exp3" 1 45 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1464 14 1
"3508" "exp3" 1 46 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1833 32 1
"3508" "exp3" 1 47 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1571 0 0
"3508" "exp3" 1 48 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 3048 29 1
"3508" "exp3" 1 49 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2167 32 1
"3508" "exp3" 1 50 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 2031 10 1
"3508" "exp3" 1 51 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 2404 18 1
"3508" "exp3" 1 52 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1129 0 0
"3508" "exp3" 1 53 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1707 21 1
"3508" "exp3" 1 54 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 2443 16 1
"3508" "exp3" 1 55 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 2992 13 1
"3508" "exp3" 1 56 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 2273 0 0
"3508" "exp3" 1 57 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 2419 0 0
"3508" "exp3" 1 58 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1084 0 0
"3508" "exp3" 1 59 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1923 43 1
"3508" "exp3" 1 60 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 2251 26 1
"3508" "exp3" 1 61 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1538 30 1
"3508" "exp3" 1 62 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 2816 33 1
"3508" "exp3" 1 63 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 3261 43 1
"3508" "exp3" 1 64 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1678 0 0
"3508" "exp3" 1 65 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 4850 9 1
"3508" "exp3" 1 66 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1315 45 1
"3508" "exp3" 1 67 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 931 1 1
"3508" "exp3" 1 68 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2007 38 1
"3508" "exp3" 1 69 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 1335 2 1
"3508" "exp3" 1 70 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 4228 35 1
"3508" "exp3" 1 71 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 769 5 1
"3508" "exp3" 1 72 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2446 20 1
"3508" "exp3" 1 73 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 3897 31 1
"3508" "exp3" 1 74 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2217 0 0
"3508" "exp3" 1 75 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1018 18 1
"3508" "exp3" 1 76 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 1584 6 1
"3508" "exp3" 1 77 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1595 7 1
"3508" "exp3" 1 78 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 4251 30 1
"3508" "exp3" 1 79 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 2518 29 1
"3508" "exp3" 1 80 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1152 17 1
"3508" "exp3" 1 81 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 2203 28 1
"3508" "exp3" 1 82 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2491 0 0
"3508" "exp3" 1 83 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1471 21 1
"3508" "exp3" 1 84 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2016 0 0
"3508" "exp3" 1 85 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 2064 48 1
"3508" "exp3" 1 86 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1601 6 1
"3508" "exp3" 1 87 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2523 39 1
"3508" "exp3" 1 88 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 983 3 1
"3508" "exp3" 1 89 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1518 19 1
"3508" "exp3" 1 90 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 2139 15 1
"3508" "exp3" 1 91 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 3822 24 1
"3508" "exp3" 1 92 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 943 9 1
"3508" "exp3" 1 93 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1576 0 0
"3508" "exp3" 1 94 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1849 37 1
"3508" "exp3" 1 95 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1572 0 0
"3508" "exp3" 1 96 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1291 17 1
"3508" "exp3" 1 97 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2409 0 0
"3508" "exp3" 1 98 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 5118 0 0
"3508" "exp3" 1 99 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 4101 0 0
"3508" "exp3" 1 100 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2066 16 1
"3508" "exp3" 1 101 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 1995 8 1
"3508" "exp3" 1 102 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 5852 21 1
"3508" "exp3" 1 103 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1412 13 1
"3508" "exp3" 1 104 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 3210 20 1
"3508" "exp3" 1 105 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1828 35 1
"3508" "exp3" 1 106 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 2971 0 0
"3508" "exp3" 1 107 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1932 0 0
"3508" "exp3" 1 108 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1346 12 1
"3508" "exp3" 1 109 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2613 22 1
"3508" "exp3" 1 110 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2623 0 0
"3508" "exp3" 1 111 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 3061 22 1
"3508" "exp3" 1 112 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2020 46 1
"3508" "exp3" 1 113 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 2835 0 0
"3508" "exp3" 1 114 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 2688 0 0
"3508" "exp3" 1 115 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 3302 21 1
"3508" "exp3" 1 116 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 3593 10 1
"3508" "exp3" 1 117 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 2720 27 1
"3508" "exp3" 1 118 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1285 19 1
"3508" "exp3" 1 119 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1619 23 1
"3508" "exp3" 1 120 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1733 36 1
"3508" "exp3" 1 121 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1557 0 0
"3508" "exp3" 1 122 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1845 20 1
"3508" "exp3" 1 123 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 925 22 1
"3508" "exp3" 1 124 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 2084 22 1
"3508" "exp3" 1 125 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 4411 14 1
"3508" "exp3" 1 126 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1943 28 1
"3508" "exp3" 1 127 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1854 0 0
"3508" "exp3" 1 128 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1847 0 0
"3508" "exp3" 1 129 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 3253 67 1
"3508" "exp3" 1 130 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 5581 25 1
"3508" "exp3" 1 131 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 3255 0 0
"3508" "exp3" 1 132 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 2528 13 1
"3508" "exp3" 2 1 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1787 5 1
"3508" "exp3" 2 2 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1180 0 0
"3508" "exp3" 2 3 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 2390 39 1
"3508" "exp3" 2 4 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 2518 28 1
"3508" "exp3" 2 5 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1469 27 1
"3508" "exp3" 2 6 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1847 29 1
"3508" "exp3" 2 7 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1544 6 1
"3508" "exp3" 2 8 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2117 0 0
"3508" "exp3" 2 9 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 2482 20 1
"3508" "exp3" 2 10 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1340 26 1
"3508" "exp3" 2 11 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 930 12 1
"3508" "exp3" 2 12 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 2047 67 1
"3508" "exp3" 2 13 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 2935 32 1
"3508" "exp3" 2 14 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 3157 0 0
"3508" "exp3" 2 15 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2795 0 0
"3508" "exp3" 2 16 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1153 0 0
"3508" "exp3" 2 17 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1563 38 1
"3508" "exp3" 2 18 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1515 18 1
"3508" "exp3" 2 19 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 2531 23 1
"3508" "exp3" 2 20 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1628 13 1
"3508" "exp3" 2 21 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1270 10 1
"3508" "exp3" 2 22 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1568 15 1
"3508" "exp3" 2 23 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 891 19 1
"3508" "exp3" 2 24 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 961 14 1
"3508" "exp3" 2 25 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2279 0 0
"3508" "exp3" 2 26 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 4029 45 1
"3508" "exp3" 2 27 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 3176 33 1
"3508" "exp3" 2 28 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2532 36 1
"3508" "exp3" 2 29 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2312 0 0
"3508" "exp3" 2 30 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 3752 17 1
"3508" "exp3" 2 31 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1543 25 1
"3508" "exp3" 2 32 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1652 0 0
"3508" "exp3" 2 33 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1482 0 0
"3508" "exp3" 2 34 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1188 29 1
"3508" "exp3" 2 35 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1301 0 0
"3508" "exp3" 2 36 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2063 20 1
"3508" "exp3" 2 37 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1362 7 1
"3508" "exp3" 2 38 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1725 35 1
"3508" "exp3" 2 39 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1250 22 1
"3508" "exp3" 2 40 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1674 23 1
"3508" "exp3" 2 41 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 2066 0 0
"3508" "exp3" 2 42 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1262 21 1
"3508" "exp3" 2 43 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 594 1 1
"3508" "exp3" 2 44 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 2814 0 0
"3508" "exp3" 2 45 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 3022 0 0
"3508" "exp3" 2 46 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1492 23 1
"3508" "exp3" 2 47 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1225 0 0
"3508" "exp3" 2 48 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 4542 15 1
"3508" "exp3" 2 49 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 2408 0 0
"3508" "exp3" 2 50 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1188 24 1
"3508" "exp3" 2 51 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2507 32 1
"3508" "exp3" 2 52 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 935 37 1
"3508" "exp3" 2 53 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 977 8 1
"3508" "exp3" 2 54 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1611 0 0
"3508" "exp3" 2 55 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 2750 25 1
"3508" "exp3" 2 56 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2162 0 0
"3508" "exp3" 2 57 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 3762 31 1
"3508" "exp3" 2 58 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 4465 5 1
"3508" "exp3" 2 59 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 3384 34 1
"3508" "exp3" 2 60 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 4852 32 1
"3508" "exp3" 2 61 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1397 19 1
"3508" "exp3" 2 62 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1507 45 1
"3508" "exp3" 2 63 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1358 14 1
"3508" "exp3" 2 64 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1721 31 1
"3508" "exp3" 2 65 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1696 0 0
"3508" "exp3" 2 66 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1485 28 1
"3508" "exp3" 2 67 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1784 0 0
"3508" "exp3" 2 68 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1839 19 1
"3508" "exp3" 2 69 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 1214 6 1
"3508" "exp3" 2 70 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2581 91 1
"3508" "exp3" 2 71 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 2924 11 1
"3508" "exp3" 2 72 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1581 19 1
"3508" "exp3" 2 73 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1540 26 1
"3508" "exp3" 2 74 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1119 0 0
"3508" "exp3" 2 75 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1082 9 1
"3508" "exp3" 2 76 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1041 0 0
"3508" "exp3" 2 77 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1742 35 1
"3508" "exp3" 2 78 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1632 0 0
"3508" "exp3" 2 79 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 3079 48 1
"3508" "exp3" 2 80 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1123 22 1
"3508" "exp3" 2 81 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1342 18 1
"3508" "exp3" 2 82 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 2812 0 0
"3508" "exp3" 2 83 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 1496 2 1
"3508" "exp3" 2 84 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1118 41 1
"3508" "exp3" 2 85 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1685 47 1
"3508" "exp3" 2 86 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1944 0 0
"3508" "exp3" 2 87 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1936 12 1
"3508" "exp3" 2 88 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1839 0 0
"3508" "exp3" 2 89 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1821 4 1
"3508" "exp3" 2 90 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 4041 16 1
"3508" "exp3" 2 91 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1619 0 0
"3508" "exp3" 2 92 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1265 20 1
"3508" "exp3" 2 93 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1233 30 1
"3508" "exp3" 2 94 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1914 0 0
"3508" "exp3" 2 95 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 2355 23 1
"3508" "exp3" 2 96 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 2208 15 1
"3508" "exp3" 2 97 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1078 16 1
"3508" "exp3" 2 98 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1333 0 0
"3508" "exp3" 2 99 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1273 13 1
"3508" "exp3" 2 100 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1576 14 1
"3508" "exp3" 2 101 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1239 26 1
"3508" "exp3" 2 102 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 1891 13 1
"3508" "exp3" 2 103 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 980 0 0
"3508" "exp3" 2 104 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 926 0 0
"3508" "exp3" 2 105 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 751 21 1
"3508" "exp3" 2 106 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 938 31 1
"3508" "exp3" 2 107 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 2185 29 1
"3508" "exp3" 2 108 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1094 25 1
"3508" "exp3" 2 109 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2445 43 1
"3508" "exp3" 2 110 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 2088 3 1
"3508" "exp3" 2 111 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1446 21 1
"3508" "exp3" 2 112 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1718 11 1
"3508" "exp3" 2 113 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1826 34 1
"3508" "exp3" 2 114 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 739 28 1
"3508" "exp3" 2 115 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1709 49 1
"3508" "exp3" 2 116 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 4916 44 1
"3508" "exp3" 2 117 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1373 17 1
"3508" "exp3" 2 118 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2659 0 0
"3508" "exp3" 2 119 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1057 7 1
"3508" "exp3" 2 120 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1507 43 1
"3508" "exp3" 2 121 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1043 17 1
"3508" "exp3" 2 122 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1583 33 1
"3508" "exp3" 2 123 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1666 24 1
"3508" "exp3" 2 124 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1007 0 0
"3508" "exp3" 2 125 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 818 0 0
"3508" "exp3" 2 126 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1375 0 0
"3508" "exp3" 2 127 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1185 40 1
"3508" "exp3" 2 128 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1771 38 1
"3508" "exp3" 2 129 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 771 17 1
"3508" "exp3" 2 130 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1214 0 0
"3508" "exp3" 2 131 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1741 0 0
"3508" "exp3" 2 132 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 822 0 0
"3508" "exp3" 1 1 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 914 21 1
"3508" "exp3" 1 2 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 678 16 1
"3508" "exp3" 1 3 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 810 0 0
"3508" "exp3" 1 4 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 1083 5 1
"3508" "exp3" 1 5 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 1176 5 1
"3508" "exp3" 1 6 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 927 46 1
"3508" "exp3" 1 7 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 712 28 1
"3508" "exp3" 1 8 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 705 33 1
"3508" "exp3" 1 9 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 759 27 1
"3508" "exp3" 1 10 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1507 0 0
"3508" "exp3" 1 11 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1718 17 1
"3508" "exp3" 1 12 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1267 20 1
"3508" "exp3" 1 13 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1199 35 1
"3508" "exp3" 1 14 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 1237 7 1
"3508" "exp3" 1 15 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2681 0 0
"3508" "exp3" 1 16 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 2399 23 1
"3508" "exp3" 1 17 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1001 14 1
"3508" "exp3" 1 18 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1805 30 1
"3508" "exp3" 1 19 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1068 0 0
"3508" "exp3" 1 20 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1190 20 1
"3508" "exp3" 1 21 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 629 22 1
"3508" "exp3" 1 22 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1473 0 0
"3508" "exp3" 1 23 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1414 0 0
"3508" "exp3" 1 24 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1583 21 1
"3508" "exp3" 1 25 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2028 0 0
"3508" "exp3" 1 26 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1650 22 1
"3508" "exp3" 1 27 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1445 31 1
"3508" "exp3" 1 28 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1433 25 1
"3508" "exp3" 1 29 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1564 37 1
"3508" "exp3" 1 30 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 3050 49 1
"3508" "exp3" 1 31 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1491 23 1
"3508" "exp3" 1 32 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2638 28 1
"3508" "exp3" 1 33 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 901 39 1
"3508" "exp3" 1 34 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1184 0 0
"3508" "exp3" 1 35 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2257 40 1
"3508" "exp3" 1 36 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 889 12 1
"3508" "exp3" 1 37 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 2486 24 1
"3508" "exp3" 1 38 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 952 0 0
"3508" "exp3" 1 39 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1041 33 1
"3508" "exp3" 1 40 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 3502 35 1
"3508" "exp3" 1 41 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 1342 6 1
"3508" "exp3" 1 42 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1215 29 1
"3508" "exp3" 1 43 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 935 14 1
"3508" "exp3" 1 44 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1309 18 1
"3508" "exp3" 1 45 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 878 3 1
"3508" "exp3" 1 46 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2344 27 1
"3508" "exp3" 1 47 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1245 36 1
"3508" "exp3" 1 48 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1411 26 1
"3508" "exp3" 1 49 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2682 42 1
"3508" "exp3" 1 50 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1174 14 1
"3508" "exp3" 1 51 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1556 41 1
"3508" "exp3" 1 52 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 780 26 1
"3508" "exp3" 1 53 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 801 39 1
"3508" "exp3" 1 54 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 3724 0 0
"3508" "exp3" 1 55 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1367 21 1
"3508" "exp3" 1 56 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1465 25 1
"3508" "exp3" 1 57 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 2297 43 1
"3508" "exp3" 1 58 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 986 40 1
"3508" "exp3" 1 59 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1164 0 0
"3508" "exp3" 1 60 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1768 0 0
"3508" "exp3" 1 61 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1170 25 1
"3508" "exp3" 1 62 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1998 17 1
"3508" "exp3" 1 63 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 2600 0 0
"3508" "exp3" 1 64 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1291 9 1
"3508" "exp3" 1 65 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 940 15 1
"3508" "exp3" 1 66 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1477 17 1
"3508" "exp3" 1 67 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1009 0 0
"3508" "exp3" 1 68 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 2516 0 0
"3508" "exp3" 1 69 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1266 19 1
"3508" "exp3" 1 70 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1573 45 1
"3508" "exp3" 1 71 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1124 18 1
"3508" "exp3" 1 72 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1537 34 1
"3508" "exp3" 1 73 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1143 23 1
"3508" "exp3" 1 74 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 963 19 1
"3508" "exp3" 1 75 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 2338 0 0
"3508" "exp3" 1 76 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 985 0 0
"3508" "exp3" 1 77 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 633 27 1
"3508" "exp3" 1 78 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1233 37 1
"3508" "exp3" 1 79 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 851 0 0
"3508" "exp3" 1 80 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1512 32 1
"3508" "exp3" 1 81 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1469 15 1
"3508" "exp3" 1 82 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 822 0 0
"3508" "exp3" 1 83 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1116 0 0
"3508" "exp3" 1 84 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 841 13 1
"3508" "exp3" 1 85 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 737 24 1
"3508" "exp3" 1 86 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 722 0 0
"3508" "exp3" 1 87 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 723 22 1
"3508" "exp3" 1 88 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1388 0 0
"3508" "exp3" 1 89 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2443 0 0
"3508" "exp3" 1 90 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1076 31 1
"3508" "exp3" 1 91 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 918 4 1
"3508" "exp3" 1 92 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1074 0 0
"3508" "exp3" 1 93 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1698 20 1
"3508" "exp3" 1 94 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1341 34 1
"3508" "exp3" 1 95 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1918 35 1
"3508" "exp3" 1 96 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1348 23 1
"3508" "exp3" 1 97 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1063 0 0
"3508" "exp3" 1 98 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 948 0 0
"3508" "exp3" 1 99 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1140 0 0
"3508" "exp3" 1 100 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 947 24 1
"3508" "exp3" 1 101 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1062 0 0
"3508" "exp3" 1 102 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 2603 2 1
"3508" "exp3" 1 103 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1617 24 1
"3508" "exp3" 1 104 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1097 11 1
"3508" "exp3" 1 105 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1103 16 1
"3508" "exp3" 1 106 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1170 0 0
"3508" "exp3" 1 107 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 917 8 1
"3508" "exp3" 1 108 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 938 13 1
"3508" "exp3" 1 109 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 824 7 1
"3508" "exp3" 1 110 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 923 13 1
"3508" "exp3" 1 111 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1406 47 1
"3508" "exp3" 1 112 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 959 41 1
"3508" "exp3" 1 113 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1287 20 1
"3508" "exp3" 1 114 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 771 19 1
"3508" "exp3" 1 115 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 789 30 1
"3508" "exp3" 1 116 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 2676 0 0
"3508" "exp3" 1 117 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1370 0 0
"3508" "exp3" 1 118 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 996 30 1
"3508" "exp3" 1 119 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1409 0 0
"3508" "exp3" 1 120 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 781 8 1
"3508" "exp3" 1 121 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2504 0 0
"3508" "exp3" 1 122 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 873 33 1
"3508" "exp3" 1 123 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1153 0 0
"3508" "exp3" 1 124 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 811 10 1
"3508" "exp3" 1 125 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 966 32 1
"3508" "exp3" 1 126 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 801 28 1
"3508" "exp3" 1 127 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1215 26 1
"3508" "exp3" 1 128 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 806 0 0
"3508" "exp3" 1 129 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 1711 17 1
"3508" "exp3" 1 130 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 760 6 1
"3508" "exp3" 1 131 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 633 12 1
"3508" "exp3" 1 132 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 938 29 1
"3508" "exp3" 2 1 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 851 25 1
"3508" "exp3" 2 2 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 752 37 1
"3508" "exp3" 2 3 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 970 0 0
"3508" "exp3" 2 4 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 1103 3 1
"3508" "exp3" 2 5 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 668 10 1
"3508" "exp3" 2 6 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1982 49 1
"3508" "exp3" 2 7 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1103 22 1
"3508" "exp3" 2 8 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1775 32 1
"3508" "exp3" 2 9 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1052 29 1
"3508" "exp3" 2 10 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 735 22 1
"3508" "exp3" 2 11 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 570 13 1
"3508" "exp3" 2 12 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1316 0 0
"3508" "exp3" 2 13 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 947 26 1
"3508" "exp3" 2 14 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 903 8 1
"3508" "exp3" 2 15 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1428 33 1
"3508" "exp3" 2 16 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 972 0 0
"3508" "exp3" 2 17 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 993 22 1
"3508" "exp3" 2 18 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 812 11 1
"3508" "exp3" 2 19 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 569 19 1
"3508" "exp3" 2 20 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 926 28 1
"3508" "exp3" 2 21 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 877 30 1
"3508" "exp3" 2 22 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 1694 5 1
"3508" "exp3" 2 23 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 850 35 1
"3508" "exp3" 2 24 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 917 36 1
"3508" "exp3" 2 25 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1593 18 1
"3508" "exp3" 2 26 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1079 30 1
"3508" "exp3" 2 27 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2145 25 1
"3508" "exp3" 2 28 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1228 0 0
"3508" "exp3" 2 29 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1544 0 0
"3508" "exp3" 2 30 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1029 0 0
"3508" "exp3" 2 31 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1253 32 1
"3508" "exp3" 2 32 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1072 39 1
"3508" "exp3" 2 33 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1516 21 1
"3508" "exp3" 2 34 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1188 0 0
"3508" "exp3" 2 35 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 805 27 1
"3508" "exp3" 2 36 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 798 6 1
"3508" "exp3" 2 37 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2573 42 1
"3508" "exp3" 2 38 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1031 43 1
"3508" "exp3" 2 39 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2335 0 0
"3508" "exp3" 2 40 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1601 0 0
"3508" "exp3" 2 41 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 915 14 1
"3508" "exp3" 2 42 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1768 24 1
"3508" "exp3" 2 43 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 1306 15 1
"3508" "exp3" 2 44 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1435 31 1
"3508" "exp3" 2 45 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1961 32 1
"3508" "exp3" 2 46 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1428 37 1
"3508" "exp3" 2 47 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1050 0 0
"3508" "exp3" 2 48 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1077 45 1
"3508" "exp3" 2 49 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 884 7 1
"3508" "exp3" 2 50 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 979 0 0
"3508" "exp3" 2 51 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 819 0 0
"3508" "exp3" 2 52 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1257 0 0
"3508" "exp3" 2 53 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1688 0 0
"3508" "exp3" 2 54 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1622 0 0
"3508" "exp3" 2 55 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1035 0 0
"3508" "exp3" 2 56 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1042 27 1
"3508" "exp3" 2 57 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1015 20 1
"3508" "exp3" 2 58 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 991 12 1
"3508" "exp3" 2 59 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 914 26 1
"3508" "exp3" 2 60 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 852 14 1
"3508" "exp3" 2 61 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 782 0 0
"3508" "exp3" 2 62 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1252 8 1
"3508" "exp3" 2 63 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1267 36 1
"3508" "exp3" 2 64 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 1780 2 1
"3508" "exp3" 2 65 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1094 0 0
"3508" "exp3" 2 66 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 731 27 1
"3508" "exp3" 2 67 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2130 46 1
"3508" "exp3" 2 68 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 811 16 1
"3508" "exp3" 2 69 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1913 30 1
"3508" "exp3" 2 70 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 883 0 0
"3508" "exp3" 2 71 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1244 10 1
"3508" "exp3" 2 72 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1335 26 1
"3508" "exp3" 2 73 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 671 21 1
"3508" "exp3" 2 74 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1491 33 1
"3508" "exp3" 2 75 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 1105 1 1
"3508" "exp3" 2 76 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 3273 0 0
"3508" "exp3" 2 77 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 882 0 0
"3508" "exp3" 2 78 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1188 0 0
"3508" "exp3" 2 79 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 915 13 1
"3508" "exp3" 2 80 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 786 22 1
"3508" "exp3" 2 81 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 904 15 1
"3508" "exp3" 2 82 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 756 39 1
"3508" "exp3" 2 83 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 668 20 1
"3508" "exp3" 2 84 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1462 9 1
"3508" "exp3" 2 85 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 757 0 0
"3508" "exp3" 2 86 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 811 4 1
"3508" "exp3" 2 87 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1244 40 1
"3508" "exp3" 2 88 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1157 25 1
"3508" "exp3" 2 89 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 991 27 1
"3508" "exp3" 2 90 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 901 21 1
"3508" "exp3" 2 91 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 2792 0 0
"3508" "exp3" 2 92 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 833 35 1
"3508" "exp3" 2 93 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 883 12 1
"3508" "exp3" 2 94 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 848 18 1
"3508" "exp3" 2 95 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 690 18 1
"3508" "exp3" 2 96 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 870 0 0
"3508" "exp3" 2 97 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 793 0 0
"3508" "exp3" 2 98 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1649 17 1
"3508" "exp3" 2 99 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 721 34 1
"3508" "exp3" 2 100 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1538 0 0
"3508" "exp3" 2 101 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 934 41 1
"3508" "exp3" 2 102 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 774 17 1
"3508" "exp3" 2 103 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1627 40 1
"3508" "exp3" 2 104 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 2355 0 0
"3508" "exp3" 2 105 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 780 24 1
"3508" "exp3" 2 106 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 980 21 1
"3508" "exp3" 2 107 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1236 19 1
"3508" "exp3" 2 108 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1424 15 1
"3508" "exp3" 2 109 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 918 32 1
"3508" "exp3" 2 110 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1010 0 0
"3508" "exp3" 2 111 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1000 0 0
"3508" "exp3" 2 112 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 924 24 1
"3508" "exp3" 2 113 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 975 17 1
"3508" "exp3" 2 114 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1170 23 1
"3508" "exp3" 2 115 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1113 0 0
"3508" "exp3" 2 116 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1207 28 1
"3508" "exp3" 2 117 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1846 43 1
"3508" "exp3" 2 118 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 1076 7 1
"3508" "exp3" 2 119 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2879 0 0
"3508" "exp3" 2 120 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 900 0 0
"3508" "exp3" 2 121 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 611 0 0
"3508" "exp3" 2 122 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1135 0 0
"3508" "exp3" 2 123 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1395 47 1
"3508" "exp3" 2 124 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 822 23 1
"3508" "exp3" 2 125 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1071 42 1
"3508" "exp3" 2 126 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 829 24 1
"3508" "exp3" 2 127 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 640 20 1
"3508" "exp3" 2 128 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 940 0 0
"3508" "exp3" 2 129 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1476 13 1
"3508" "exp3" 2 130 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 1093 5 1
"3508" "exp3" 2 131 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 2079 34 1
"3508" "exp3" 2 132 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 730 16 1
"3509" "exp3" 1 1 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 437 0 0
"3509" "exp3" 1 2 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 436 0 0
"3509" "exp3" 1 3 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 720 0 0
"3509" "exp3" 1 4 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 441 0 0
"3509" "exp3" 1 5 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 585 0 0
"3509" "exp3" 1 6 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 665 0 0
"3509" "exp3" 1 7 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 702 24 1
"3509" "exp3" 1 8 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1317 44 1
"3509" "exp3" 1 9 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 561 0 0
"3509" "exp3" 1 10 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 616 90 1
"3509" "exp3" 1 11 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 789 0 0
"3509" "exp3" 1 12 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 875 80 1
"3509" "exp3" 1 13 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 557 0 0
"3509" "exp3" 1 14 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 470 84 1
"3509" "exp3" 1 15 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 459 0 0
"3509" "exp3" 1 16 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 666 70 1
"3509" "exp3" 1 17 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 744 0 0
"3509" "exp3" 1 18 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 550 90 1
"3509" "exp3" 1 19 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 771 0 0
"3509" "exp3" 1 20 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 453 0 0
"3509" "exp3" 1 21 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 472 0 0
"3509" "exp3" 1 22 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 439 0 0
"3509" "exp3" 1 23 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 406 0 0
"3509" "exp3" 1 24 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 454 0 0
"3509" "exp3" 1 25 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 399 0 0
"3509" "exp3" 1 26 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 464 69 1
"3509" "exp3" 1 27 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 602 0 0
"3509" "exp3" 1 28 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1081 39 1
"3509" "exp3" 1 29 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1117 26 1
"3509" "exp3" 1 30 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 784 0 0
"3509" "exp3" 1 31 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1160 37 1
"3509" "exp3" 1 32 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1144 64 1
"3509" "exp3" 1 33 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 693 0 0
"3509" "exp3" 1 34 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 646 0 0
"3509" "exp3" 1 35 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 664 78 1
"3509" "exp3" 1 36 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1524 23 1
"3509" "exp3" 1 37 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 939 0 0
"3509" "exp3" 1 38 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 985 66 1
"3509" "exp3" 1 39 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 731 77 1
"3509" "exp3" 1 40 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 828 0 0
"3509" "exp3" 1 41 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 649 0 0
"3509" "exp3" 1 42 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 515 76 1
"3509" "exp3" 1 43 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 441 0 0
"3509" "exp3" 1 44 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 454 0 0
"3509" "exp3" 1 45 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 405 0 0
"3509" "exp3" 1 46 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 767 0 0
"3509" "exp3" 1 47 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 460 0 0
"3509" "exp3" 1 48 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 454 0 0
"3509" "exp3" 1 49 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 481 0 0
"3509" "exp3" 1 50 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 693 64 1
"3509" "exp3" 1 51 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 462 0 0
"3509" "exp3" 1 52 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 443 0 0
"3509" "exp3" 1 53 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 407 0 0
"3509" "exp3" 1 54 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 865 94 1
"3509" "exp3" 1 55 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1014 0 0
"3509" "exp3" 1 56 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1203 0 0
"3509" "exp3" 1 57 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1250 0 0
"3509" "exp3" 1 58 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 592 0 0
"3509" "exp3" 1 59 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 403 0 0
"3509" "exp3" 1 60 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1200 45 1
"3509" "exp3" 1 61 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 438 0 0
"3509" "exp3" 1 62 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 650 0 0
"3509" "exp3" 1 63 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 524 0 0
"3509" "exp3" 1 64 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 584 0 0
"3509" "exp3" 1 65 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 396 0 0
"3509" "exp3" 1 66 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 503 0 0
"3509" "exp3" 1 67 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 536 0 0
"3509" "exp3" 1 68 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 469 0 0
"3509" "exp3" 1 69 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 609 0 0
"3509" "exp3" 1 70 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 690 67 1
"3509" "exp3" 1 71 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 525 0 0
"3509" "exp3" 1 72 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 505 0 0
"3509" "exp3" 1 73 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1565 27 1
"3509" "exp3" 1 74 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 592 0 0
"3509" "exp3" 1 75 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1165 53 1
"3509" "exp3" 1 76 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 660 0 0
"3509" "exp3" 1 77 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 955 0 0
"3509" "exp3" 1 78 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 577 0 0
"3509" "exp3" 1 79 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 1520 0 0
"3509" "exp3" 1 80 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 606 0 0
"3509" "exp3" 1 81 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1074 0 0
"3509" "exp3" 1 82 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 418 0 0
"3509" "exp3" 1 83 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 378 0 0
"3509" "exp3" 1 84 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 532 0 0
"3509" "exp3" 1 85 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 964 57 1
"3509" "exp3" 1 86 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 450 0 0
"3509" "exp3" 1 87 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 625 63 1
"3509" "exp3" 1 88 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 630 0 0
"3509" "exp3" 1 89 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1044 0 0
"3509" "exp3" 1 90 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 1769 0 0
"3509" "exp3" 1 91 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 2144 0 0
"3509" "exp3" 1 92 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 821 0 0
"3509" "exp3" 1 93 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 824 0 0
"3509" "exp3" 1 94 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1352 88 1
"3509" "exp3" 1 95 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 959 0 0
"3509" "exp3" 1 96 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 554 0 0
"3509" "exp3" 1 97 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1222 0 0
"3509" "exp3" 1 98 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 965 0 0
"3509" "exp3" 1 99 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2628 92 1
"3509" "exp3" 1 100 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 907 0 0
"3509" "exp3" 1 101 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 771 0 0
"3509" "exp3" 1 102 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1283 70 1
"3509" "exp3" 1 103 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 929 0 0
"3509" "exp3" 1 104 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1150 0 0
"3509" "exp3" 1 105 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 749 69 1
"3509" "exp3" 1 106 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1038 0 0
"3509" "exp3" 1 107 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 990 75 1
"3509" "exp3" 1 108 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 825 64 1
"3509" "exp3" 1 109 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 993 99 1
"3509" "exp3" 1 110 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 1160 0 0
"3509" "exp3" 1 111 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 654 66 1
"3509" "exp3" 1 112 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 861 0 0
"3509" "exp3" 1 113 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1219 0 0
"3509" "exp3" 1 114 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1106 0 0
"3509" "exp3" 1 115 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1184 65 1
"3509" "exp3" 1 116 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 778 0 0
"3509" "exp3" 1 117 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 749 0 0
"3509" "exp3" 1 118 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 873 0 0
"3509" "exp3" 1 119 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1127 0 0
"3509" "exp3" 1 120 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1026 0 0
"3509" "exp3" 1 121 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 508 74 1
"3509" "exp3" 1 122 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 982 0 0
"3509" "exp3" 1 123 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 516 0 0
"3509" "exp3" 1 124 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 454 0 0
"3509" "exp3" 1 125 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1331 51 1
"3509" "exp3" 1 126 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 726 0 0
"3509" "exp3" 1 127 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 977 54 1
"3509" "exp3" 1 128 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 971 0 0
"3509" "exp3" 1 129 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 542 0 0
"3509" "exp3" 1 130 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 611 0 0
"3509" "exp3" 1 131 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 996 0 0
"3509" "exp3" 1 132 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 789 0 0
"3509" "exp3" 2 1 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 540 0 0
"3509" "exp3" 2 2 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 421 0 0
"3509" "exp3" 2 3 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 563 73 1
"3509" "exp3" 2 4 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 919 55 1
"3509" "exp3" 2 5 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 460 80 1
"3509" "exp3" 2 6 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 515 0 0
"3509" "exp3" 2 7 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 415 75 1
"3509" "exp3" 2 8 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 884 0 0
"3509" "exp3" 2 9 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 470 80 1
"3509" "exp3" 2 10 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 414 0 0
"3509" "exp3" 2 11 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 700 54 1
"3509" "exp3" 2 12 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 576 0 0
"3509" "exp3" 2 13 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 515 82 1
"3509" "exp3" 2 14 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 1058 0 0
"3509" "exp3" 2 15 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 507 0 0
"3509" "exp3" 2 16 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 443 0 0
"3509" "exp3" 2 17 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 453 0 0
"3509" "exp3" 2 18 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 423 63 1
"3509" "exp3" 2 19 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 470 0 0
"3509" "exp3" 2 20 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 442 69 1
"3509" "exp3" 2 21 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 411 0 0
"3509" "exp3" 2 22 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 465 85 1
"3509" "exp3" 2 23 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 571 0 0
"3509" "exp3" 2 24 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 401 0 0
"3509" "exp3" 2 25 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 438 0 0
"3509" "exp3" 2 26 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 352 0 0
"3509" "exp3" 2 27 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 508 0 0
"3509" "exp3" 2 28 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 700 57 1
"3509" "exp3" 2 29 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 951 0 0
"3509" "exp3" 2 30 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 645 0 0
"3509" "exp3" 2 31 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 732 79 1
"3509" "exp3" 2 32 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1576 81 1
"3509" "exp3" 2 33 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 936 68 1
"3509" "exp3" 2 34 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 570 0 0
"3509" "exp3" 2 35 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 785 0 0
"3509" "exp3" 2 36 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 1066 0 0
"3509" "exp3" 2 37 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 1504 0 0
"3509" "exp3" 2 38 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 748 0 0
"3509" "exp3" 2 39 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 1999 56 1
"3509" "exp3" 2 40 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1106 0 0
"3509" "exp3" 2 41 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 549 0 0
"3509" "exp3" 2 42 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 777 68 1
"3509" "exp3" 2 43 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 756 43 1
"3509" "exp3" 2 44 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 527 65 1
"3509" "exp3" 2 45 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 507 0 0
"3509" "exp3" 2 46 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 960 0 0
"3509" "exp3" 2 47 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 506 0 0
"3509" "exp3" 2 48 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 873 0 0
"3509" "exp3" 2 49 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 965 64 1
"3509" "exp3" 2 50 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 599 0 0
"3509" "exp3" 2 51 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 562 0 0
"3509" "exp3" 2 52 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 442 0 0
"3509" "exp3" 2 53 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 382 0 0
"3509" "exp3" 2 54 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 489 0 0
"3509" "exp3" 2 55 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 424 0 0
"3509" "exp3" 2 56 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 502 0 0
"3509" "exp3" 2 57 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 532 0 0
"3509" "exp3" 2 58 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 769 0 0
"3509" "exp3" 2 59 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 497 0 0
"3509" "exp3" 2 60 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 475 0 0
"3509" "exp3" 2 61 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 450 72 1
"3509" "exp3" 2 62 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 551 0 0
"3509" "exp3" 2 63 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 484 0 0
"3509" "exp3" 2 64 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 969 83 1
"3509" "exp3" 2 65 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 548 76 1
"3509" "exp3" 2 66 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 391 0 0
"3509" "exp3" 2 67 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 378 0 0
"3509" "exp3" 2 68 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 483 0 0
"3509" "exp3" 2 69 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 423 66 1
"3509" "exp3" 2 70 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 464 0 0
"3509" "exp3" 2 71 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 494 76 1
"3509" "exp3" 2 72 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 405 91 1
"3509" "exp3" 2 73 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 512 72 1
"3509" "exp3" 2 74 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 492 78 1
"3509" "exp3" 2 75 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 401 0 0
"3509" "exp3" 2 76 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 357 0 0
"3509" "exp3" 2 77 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 477 88 1
"3509" "exp3" 2 78 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 580 85 1
"3509" "exp3" 2 79 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 530 79 1
"3509" "exp3" 2 80 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 405 0 0
"3509" "exp3" 2 81 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 396 0 0
"3509" "exp3" 2 82 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 452 86 1
"3509" "exp3" 2 83 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 436 0 0
"3509" "exp3" 2 84 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 390 0 0
"3509" "exp3" 2 85 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 439 0 0
"3509" "exp3" 2 86 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 642 0 0
"3509" "exp3" 2 87 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 816 0 0
"3509" "exp3" 2 88 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 592 0 0
"3509" "exp3" 2 89 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 578 66 1
"3509" "exp3" 2 90 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 606 0 0
"3509" "exp3" 2 91 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 530 0 0
"3509" "exp3" 2 92 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 649 0 0
"3509" "exp3" 2 93 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 987 0 0
"3509" "exp3" 2 94 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 838 0 0
"3509" "exp3" 2 95 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 738 0 0
"3509" "exp3" 2 96 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1078 0 0
"3509" "exp3" 2 97 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 515 0 0
"3509" "exp3" 2 98 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 689 0 0
"3509" "exp3" 2 99 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 752 0 0
"3509" "exp3" 2 100 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 701 0 0
"3509" "exp3" 2 101 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 664 67 1
"3509" "exp3" 2 102 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 572 74 1
"3509" "exp3" 2 103 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 568 0 0
"3509" "exp3" 2 104 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 813 0 0
"3509" "exp3" 2 105 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 651 64 1
"3509" "exp3" 2 106 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 818 73 1
"3509" "exp3" 2 107 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 701 0 0
"3509" "exp3" 2 108 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 806 62 1
"3509" "exp3" 2 109 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 615 0 0
"3509" "exp3" 2 110 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 595 0 0
"3509" "exp3" 2 111 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 747 0 0
"3509" "exp3" 2 112 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 515 60 1
"3509" "exp3" 2 113 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 492 0 0
"3509" "exp3" 2 114 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 806 0 0
"3509" "exp3" 2 115 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 998 0 0
"3509" "exp3" 2 116 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1617 66 1
"3509" "exp3" 2 117 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 611 0 0
"3509" "exp3" 2 118 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 663 79 1
"3509" "exp3" 2 119 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 723 0 0
"3509" "exp3" 2 120 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 793 0 0
"3509" "exp3" 2 121 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 880 92 1
"3509" "exp3" 2 122 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1163 27 1
"3509" "exp3" 2 123 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 1004 68 1
"3509" "exp3" 2 124 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 641 35 1
"3509" "exp3" 2 125 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 519 0 0
"3509" "exp3" 2 126 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 834 67 1
"3509" "exp3" 2 127 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 487 78 1
"3509" "exp3" 2 128 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 713 0 0
"3509" "exp3" 2 129 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 486 0 0
"3509" "exp3" 2 130 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 849 64 1
"3509" "exp3" 2 131 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 582 58 1
"3509" "exp3" 2 132 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 586 0 0
"3509" "exp3" 1 1 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 555 21 1
"3509" "exp3" 1 2 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 471 26 1
"3509" "exp3" 1 3 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 401 24 1
"3509" "exp3" 1 4 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 405 0 0
"3509" "exp3" 1 5 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 458 26 1
"3509" "exp3" 1 6 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 476 0 0
"3509" "exp3" 1 7 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 404 36 1
"3509" "exp3" 1 8 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 434 0 0
"3509" "exp3" 1 9 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 414 0 0
"3509" "exp3" 1 10 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 341 0 0
"3509" "exp3" 1 11 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 338 17 1
"3509" "exp3" 1 12 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 784 25 1
"3509" "exp3" 1 13 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 314 23 1
"3509" "exp3" 1 14 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 491 29 1
"3509" "exp3" 1 15 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 447 32 1
"3509" "exp3" 1 16 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 425 0 0
"3509" "exp3" 1 17 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 409 7 1
"3509" "exp3" 1 18 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 476 0 0
"3509" "exp3" 1 19 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 387 25 1
"3509" "exp3" 1 20 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 448 21 1
"3509" "exp3" 1 21 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 724 46 1
"3509" "exp3" 1 22 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 712 19 1
"3509" "exp3" 1 23 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 526 22 1
"3509" "exp3" 1 24 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 664 30 1
"3509" "exp3" 1 25 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 362 0 0
"3509" "exp3" 1 26 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 382 33 1
"3509" "exp3" 1 27 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 389 22 1
"3509" "exp3" 1 28 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 373 6 1
"3509" "exp3" 1 29 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 410 18 1
"3509" "exp3" 1 30 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 447 0 0
"3509" "exp3" 1 31 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 386 0 0
"3509" "exp3" 1 32 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 414 4 1
"3509" "exp3" 1 33 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 368 6 1
"3509" "exp3" 1 34 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 414 30 1
"3509" "exp3" 1 35 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 558 12 1
"3509" "exp3" 1 36 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 551 35 1
"3509" "exp3" 1 37 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 384 17 1
"3509" "exp3" 1 38 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 586 14 1
"3509" "exp3" 1 39 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 784 45 1
"3509" "exp3" 1 40 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 444 34 1
"3509" "exp3" 1 41 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 435 0 0
"3509" "exp3" 1 42 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 470 37 1
"3509" "exp3" 1 43 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 402 0 0
"3509" "exp3" 1 44 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 412 23 1
"3509" "exp3" 1 45 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 599 41 1
"3509" "exp3" 1 46 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 513 0 0
"3509" "exp3" 1 47 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 405 7 1
"3509" "exp3" 1 48 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 450 29 1
"3509" "exp3" 1 49 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 600 45 1
"3509" "exp3" 1 50 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 409 16 1
"3509" "exp3" 1 51 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 521 0 0
"3509" "exp3" 1 52 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 556 28 1
"3509" "exp3" 1 53 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 480 13 1
"3509" "exp3" 1 54 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 917 38 1
"3509" "exp3" 1 55 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 852 32 1
"3509" "exp3" 1 56 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 477 0 0
"3509" "exp3" 1 57 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 433 20 1
"3509" "exp3" 1 58 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 469 33 1
"3509" "exp3" 1 59 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 404 29 1
"3509" "exp3" 1 60 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 479 40 1
"3509" "exp3" 1 61 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 401 30 1
"3509" "exp3" 1 62 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 430 0 0
"3509" "exp3" 1 63 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 368 36 1
"3509" "exp3" 1 64 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 357 0 0
"3509" "exp3" 1 65 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 383 10 1
"3509" "exp3" 1 66 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 392 31 1
"3509" "exp3" 1 67 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 419 0 0
"3509" "exp3" 1 68 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 392 39 1
"3509" "exp3" 1 69 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 570 41 1
"3509" "exp3" 1 70 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 352 26 1
"3509" "exp3" 1 71 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 322 11 1
"3509" "exp3" 1 72 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 372 28 1
"3509" "exp3" 1 73 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 467 9 1
"3509" "exp3" 1 74 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 736 30 1
"3509" "exp3" 1 75 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 697 18 1
"3509" "exp3" 1 76 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 471 49 1
"3509" "exp3" 1 77 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 809 0 0
"3509" "exp3" 1 78 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 698 31 1
"3509" "exp3" 1 79 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 499 40 1
"3509" "exp3" 1 80 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 468 38 1
"3509" "exp3" 1 81 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 625 0 0
"3509" "exp3" 1 82 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 469 15 1
"3509" "exp3" 1 83 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 868 0 0
"3509" "exp3" 1 84 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 564 14 1
"3509" "exp3" 1 85 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 464 18 1
"3509" "exp3" 1 86 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 613 37 1
"3509" "exp3" 1 87 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 444 33 1
"3509" "exp3" 1 88 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 414 21 1
"3509" "exp3" 1 89 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 502 43 1
"3509" "exp3" 1 90 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 526 23 1
"3509" "exp3" 1 91 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 410 44 1
"3509" "exp3" 1 92 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 420 27 1
"3509" "exp3" 1 93 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 703 0 0
"3509" "exp3" 1 94 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 423 13 1
"3509" "exp3" 1 95 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 724 0 0
"3509" "exp3" 1 96 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 426 13 1
"3509" "exp3" 1 97 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 383 19 1
"3509" "exp3" 1 98 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 451 0 0
"3509" "exp3" 1 99 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 376 0 0
"3509" "exp3" 1 100 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 402 17 1
"3509" "exp3" 1 101 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 428 12 1
"3509" "exp3" 1 102 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 339 5 1
"3509" "exp3" 1 103 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 364 29 1
"3509" "exp3" 1 104 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 385 39 1
"3509" "exp3" 1 105 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 417 0 0
"3509" "exp3" 1 106 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 452 0 0
"3509" "exp3" 1 107 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 398 0 0
"3509" "exp3" 1 108 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 390 19 1
"3509" "exp3" 1 109 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 419 44 1
"3509" "exp3" 1 110 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 352 25 1
"3509" "exp3" 1 111 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 365 27 1
"3509" "exp3" 1 112 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 390 10 1
"3509" "exp3" 1 113 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 396 0 0
"3509" "exp3" 1 114 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 440 0 0
"3509" "exp3" 1 115 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 412 0 0
"3509" "exp3" 1 116 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 400 0 0
"3509" "exp3" 1 117 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 349 42 1
"3509" "exp3" 1 118 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 340 0 0
"3509" "exp3" 1 119 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 348 0 0
"3509" "exp3" 1 120 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 353 20 1
"3509" "exp3" 1 121 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 457 0 0
"3509" "exp3" 1 122 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 387 0 0
"3509" "exp3" 1 123 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 485 24 1
"3509" "exp3" 1 124 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 388 2 1
"3509" "exp3" 1 125 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1145 19 1
"3509" "exp3" 1 126 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 301 28 1
"3509" "exp3" 1 127 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 415 0 0
"3509" "exp3" 1 128 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 366 31 1
"3509" "exp3" 1 129 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 422 9 1
"3509" "exp3" 1 130 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 390 3 1
"3509" "exp3" 1 131 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 979 34 1
"3509" "exp3" 1 132 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 440 8 1
"3509" "exp3" 2 1 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 486 30 1
"3509" "exp3" 2 2 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 369 33 1
"3509" "exp3" 2 3 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 404 19 1
"3509" "exp3" 2 4 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 393 35 1
"3509" "exp3" 2 5 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 407 25 1
"3509" "exp3" 2 6 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 339 34 1
"3509" "exp3" 2 7 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 778 19 1
"3509" "exp3" 2 8 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 337 21 1
"3509" "exp3" 2 9 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 419 13 1
"3509" "exp3" 2 10 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 449 0 0
"3509" "exp3" 2 11 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 670 25 1
"3509" "exp3" 2 12 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 334 28 1
"3509" "exp3" 2 13 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 444 0 0
"3509" "exp3" 2 14 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 326 0 0
"3509" "exp3" 2 15 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 616 36 1
"3509" "exp3" 2 16 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 556 44 1
"3509" "exp3" 2 17 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 371 15 1
"3509" "exp3" 2 18 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 352 0 0
"3509" "exp3" 2 19 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 337 18 1
"3509" "exp3" 2 20 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 434 26 1
"3509" "exp3" 2 21 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 382 2 1
"3509" "exp3" 2 22 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 373 19 1
"3509" "exp3" 2 23 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 341 17 1
"3509" "exp3" 2 24 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 386 21 1
"3509" "exp3" 2 25 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 349 0 0
"3509" "exp3" 2 26 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 447 47 1
"3509" "exp3" 2 27 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 350 22 1
"3509" "exp3" 2 28 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 438 23 1
"3509" "exp3" 2 29 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 416 43 1
"3509" "exp3" 2 30 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 394 19 1
"3509" "exp3" 2 31 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 300 27 1
"3509" "exp3" 2 32 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 397 11 1
"3509" "exp3" 2 33 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 383 12 1
"3509" "exp3" 2 34 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 372 44 1
"3509" "exp3" 2 35 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 449 22 1
"3509" "exp3" 2 36 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 362 38 1
"3509" "exp3" 2 37 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 409 14 1
"3509" "exp3" 2 38 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1118 40 1
"3509" "exp3" 2 39 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1009 0 0
"3509" "exp3" 2 40 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 455 3 1
"3509" "exp3" 2 41 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 820 15 1
"3509" "exp3" 2 42 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 722 15 1
"3509" "exp3" 2 43 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 915 0 0
"3509" "exp3" 2 44 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1491 24 1
"3509" "exp3" 2 45 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 808 34 1
"3509" "exp3" 2 46 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 721 8 1
"3509" "exp3" 2 47 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1015 23 1
"3509" "exp3" 2 48 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1240 59 1
"3509" "exp3" 2 49 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 934 0 0
"3509" "exp3" 2 50 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1045 0 0
"3509" "exp3" 2 51 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1412 0 0
"3509" "exp3" 2 52 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 837 31 1
"3509" "exp3" 2 53 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 971 0 0
"3509" "exp3" 2 54 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1782 23 1
"3509" "exp3" 2 55 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1259 28 1
"3509" "exp3" 2 56 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 732 32 1
"3509" "exp3" 2 57 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 861 20 1
"3509" "exp3" 2 58 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 783 35 1
"3509" "exp3" 2 59 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 1650 0 0
"3509" "exp3" 2 60 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1025 0 0
"3509" "exp3" 2 61 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 764 21 1
"3509" "exp3" 2 62 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1047 0 0
"3509" "exp3" 2 63 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1110 39 1
"3509" "exp3" 2 64 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 1233 0 0
"3509" "exp3" 2 65 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 867 31 1
"3509" "exp3" 2 66 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1504 0 0
"3509" "exp3" 2 67 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 3161 82 1
"3509" "exp3" 2 68 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 790 32 1
"3509" "exp3" 2 69 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 574 40 1
"3509" "exp3" 2 70 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1057 0 0
"3509" "exp3" 2 71 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1273 28 1
"3509" "exp3" 2 72 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 908 27 1
"3509" "exp3" 2 73 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 507 30 1
"3509" "exp3" 2 74 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1530 24 1
"3509" "exp3" 2 75 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1049 22 1
"3509" "exp3" 2 76 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1453 29 1
"3509" "exp3" 2 77 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1654 36 1
"3509" "exp3" 2 78 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1122 0 0
"3509" "exp3" 2 79 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 900 43 1
"3509" "exp3" 2 80 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 1023 0 0
"3509" "exp3" 2 81 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1015 31 1
"3509" "exp3" 2 82 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 637 0 0
"3509" "exp3" 2 83 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 619 0 0
"3509" "exp3" 2 84 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 842 92 1
"3509" "exp3" 2 85 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 912 0 0
"3509" "exp3" 2 86 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 689 0 0
"3509" "exp3" 2 87 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 1335 0 0
"3509" "exp3" 2 88 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 699 21 1
"3509" "exp3" 2 89 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 724 0 0
"3509" "exp3" 2 90 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1686 0 0
"3509" "exp3" 2 91 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 726 30 1
"3509" "exp3" 2 92 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 854 0 0
"3509" "exp3" 2 93 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1531 29 1
"3509" "exp3" 2 94 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1048 0 0
"3509" "exp3" 2 95 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1367 0 0
"3509" "exp3" 2 96 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1097 27 1
"3509" "exp3" 2 97 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 640 0 0
"3509" "exp3" 2 98 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 561 34 1
"3509" "exp3" 2 99 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 920 38 1
"3509" "exp3" 2 100 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1827 0 0
"3509" "exp3" 2 101 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 960 33 1
"3509" "exp3" 2 102 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1087 24 1
"3509" "exp3" 2 103 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1268 32 1
"3509" "exp3" 2 104 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 2130 0 0
"3509" "exp3" 2 105 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 954 0 0
"3509" "exp3" 2 106 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 910 22 1
"3509" "exp3" 2 107 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 888 0 0
"3509" "exp3" 2 108 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1121 0 0
"3509" "exp3" 2 109 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 992 0 0
"3509" "exp3" 2 110 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1307 45 1
"3509" "exp3" 2 111 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 952 0 0
"3509" "exp3" 2 112 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1219 27 1
"3509" "exp3" 2 113 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 826 30 1
"3509" "exp3" 2 114 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1208 0 0
"3509" "exp3" 2 115 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 983 96 1
"3509" "exp3" 2 116 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 894 36 1
"3509" "exp3" 2 117 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1144 25 1
"3509" "exp3" 2 118 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1471 42 1
"3509" "exp3" 2 119 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1262 20 1
"3509" "exp3" 2 120 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1063 33 1
"3509" "exp3" 2 121 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 962 0 0
"3509" "exp3" 2 122 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1308 35 1
"3509" "exp3" 2 123 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 910 26 1
"3509" "exp3" 2 124 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1224 0 0
"3509" "exp3" 2 125 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1342 29 1
"3509" "exp3" 2 126 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 931 25 1
"3509" "exp3" 2 127 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1019 20 1
"3509" "exp3" 2 128 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 914 0 0
"3509" "exp3" 2 129 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1906 0 0
"3509" "exp3" 2 130 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 967 0 0
"3509" "exp3" 2 131 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 930 0 0
"3509" "exp3" 2 132 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 660 10 1
"3509" "exp3" 1 1 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 954 42 1
"3509" "exp3" 1 2 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 849 0 0
"3509" "exp3" 1 3 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1003 0 0
"3509" "exp3" 1 4 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 853 16 1
"3509" "exp3" 1 5 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 893 0 0
"3509" "exp3" 1 6 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 914 28 1
"3509" "exp3" 1 7 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 818 0 0
"3509" "exp3" 1 8 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 815 0 0
"3509" "exp3" 1 9 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1374 71 1
"3509" "exp3" 1 10 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1053 0 0
"3509" "exp3" 1 11 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 986 62 1
"3509" "exp3" 1 12 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1367 30 1
"3509" "exp3" 1 13 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 870 37 1
"3509" "exp3" 1 14 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1610 0 0
"3509" "exp3" 1 15 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1269 0 0
"3509" "exp3" 1 16 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1367 36 1
"3509" "exp3" 1 17 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 992 18 1
"3509" "exp3" 1 18 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 4038 25 1
"3509" "exp3" 1 19 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1724 0 0
"3509" "exp3" 1 20 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1306 0 0
"3509" "exp3" 1 21 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 2298 32 1
"3509" "exp3" 1 22 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 4764 0 0
"3509" "exp3" 1 23 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1551 46 1
"3509" "exp3" 1 24 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 3716 0 0
"3509" "exp3" 1 25 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1454 35 1
"3509" "exp3" 1 26 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1641 21 1
"3509" "exp3" 1 27 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1511 0 0
"3509" "exp3" 1 28 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1210 42 1
"3509" "exp3" 1 29 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 998 41 1
"3509" "exp3" 1 30 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 2109 22 1
"3509" "exp3" 1 31 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1001 97 1
"3509" "exp3" 1 32 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 2319 0 0
"3509" "exp3" 1 33 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1011 0 0
"3509" "exp3" 1 34 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1671 90 1
"3509" "exp3" 1 35 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 3169 81 1
"3509" "exp3" 1 36 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 2990 0 0
"3509" "exp3" 1 37 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2139 25 1
"3509" "exp3" 1 38 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1151 37 1
"3509" "exp3" 1 39 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 803 23 1
"3509" "exp3" 1 40 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1453 0 0
"3509" "exp3" 1 41 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 995 0 0
"3509" "exp3" 1 42 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1264 0 0
"3509" "exp3" 1 43 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 4054 21 1
"3509" "exp3" 1 44 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1798 31 1
"3509" "exp3" 1 45 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1621 0 0
"3509" "exp3" 1 46 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1401 26 1
"3509" "exp3" 1 47 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 2295 24 1
"3509" "exp3" 1 48 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 1398 0 0
"3509" "exp3" 1 49 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2107 0 0
"3509" "exp3" 1 50 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1798 0 0
"3509" "exp3" 1 51 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1039 84 1
"3509" "exp3" 1 52 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1992 24 1
"3509" "exp3" 1 53 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2381 0 0
"3509" "exp3" 1 54 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1276 0 0
"3509" "exp3" 1 55 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1270 0 0
"3509" "exp3" 1 56 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1608 0 0
"3509" "exp3" 1 57 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 3162 0 0
"3509" "exp3" 1 58 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1170 0 0
"3509" "exp3" 1 59 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1234 0 0
"3509" "exp3" 1 60 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1641 33 1
"3509" "exp3" 1 61 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 950 0 0
"3509" "exp3" 1 62 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1988 0 0
"3509" "exp3" 1 63 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1249 0 0
"3509" "exp3" 1 64 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 2523 34 1
"3509" "exp3" 1 65 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1178 33 1
"3509" "exp3" 1 66 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 969 36 1
"3509" "exp3" 1 67 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 2044 20 1
"3509" "exp3" 1 68 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1015 0 0
"3509" "exp3" 1 69 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2872 20 1
"3509" "exp3" 1 70 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1608 41 1
"3509" "exp3" 1 71 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 2379 0 0
"3509" "exp3" 1 72 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1161 43 1
"3509" "exp3" 1 73 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1275 29 1
"3509" "exp3" 1 74 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 855 0 0
"3509" "exp3" 1 75 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 2245 0 0
"3509" "exp3" 1 76 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 987 26 1
"3509" "exp3" 1 77 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 1075 0 0
"3509" "exp3" 1 78 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1045 0 0
"3509" "exp3" 1 79 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1730 0 0
"3509" "exp3" 1 80 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 2047 0 0
"3509" "exp3" 1 81 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1610 44 1
"3509" "exp3" 1 82 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1160 0 0
"3509" "exp3" 1 83 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1169 23 1
"3509" "exp3" 1 84 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1325 0 0
"3509" "exp3" 1 85 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1926 0 0
"3509" "exp3" 1 86 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 964 45 1
"3509" "exp3" 1 87 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 793 0 0
"3509" "exp3" 1 88 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1671 0 0
"3509" "exp3" 1 89 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1528 0 0
"3509" "exp3" 1 90 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 745 32 1
"3509" "exp3" 1 91 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1120 0 0
"3509" "exp3" 1 92 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 967 0 0
"3509" "exp3" 1 93 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1253 0 0
"3509" "exp3" 1 94 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1868 0 0
"3509" "exp3" 1 95 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1236 31 1
"3509" "exp3" 1 96 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1136 0 0
"3509" "exp3" 1 97 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1208 0 0
"3509" "exp3" 1 98 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1096 0 0
"3509" "exp3" 1 99 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1471 0 0
"3509" "exp3" 1 100 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1170 0 0
"3509" "exp3" 1 101 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 950 0 0
"3509" "exp3" 1 102 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 765 70 1
"3509" "exp3" 1 103 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1291 22 1
"3509" "exp3" 1 104 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1391 0 0
"3509" "exp3" 1 105 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1177 29 1
"3509" "exp3" 1 106 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1398 24 1
"3509" "exp3" 1 107 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 3119 0 0
"3509" "exp3" 1 108 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1231 0 0
"3509" "exp3" 1 109 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1217 0 0
"3509" "exp3" 1 110 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 2166 0 0
"3509" "exp3" 1 111 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1434 26 1
"3509" "exp3" 1 112 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1221 27 1
"3509" "exp3" 1 113 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1063 27 1
"3509" "exp3" 1 114 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 817 0 0
"3509" "exp3" 1 115 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1830 22 1
"3509" "exp3" 1 116 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 989 0 0
"3509" "exp3" 1 117 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1216 0 0
"3509" "exp3" 1 118 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 2238 22 1
"3509" "exp3" 1 119 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1267 93 1
"3509" "exp3" 1 120 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 1974 0 0
"3509" "exp3" 1 121 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 967 0 0
"3509" "exp3" 1 122 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 852 91 1
"3509" "exp3" 1 123 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1276 35 1
"3509" "exp3" 1 124 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 776 0 0
"3509" "exp3" 1 125 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 888 87 1
"3509" "exp3" 1 126 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 974 31 1
"3509" "exp3" 1 127 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1019 28 1
"3509" "exp3" 1 128 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1168 0 0
"3509" "exp3" 1 129 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 938 21 1
"3509" "exp3" 1 130 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1754 0 0
"3509" "exp3" 1 131 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 1781 0 0
"3509" "exp3" 1 132 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1291 27 1
"3509" "exp3" 2 1 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1316 17 1
"3509" "exp3" 2 2 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1883 35 1
"3509" "exp3" 2 3 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1657 0 0
"3509" "exp3" 2 4 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1377 20 1
"3509" "exp3" 2 5 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 623 0 0
"3509" "exp3" 2 6 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1576 0 0
"3509" "exp3" 2 7 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 939 0 0
"3509" "exp3" 2 8 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1066 22 1
"3509" "exp3" 2 9 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 807 0 0
"3509" "exp3" 2 10 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1879 68 1
"3509" "exp3" 2 11 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 987 0 0
"3509" "exp3" 2 12 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 837 23 1
"3509" "exp3" 2 13 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1167 39 1
"3509" "exp3" 2 14 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 989 21 1
"3509" "exp3" 2 15 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1018 0 0
"3509" "exp3" 2 16 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1929 30 1
"3509" "exp3" 2 17 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1298 0 0
"3509" "exp3" 2 18 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 949 33 1
"3509" "exp3" 2 19 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1024 28 1
"3509" "exp3" 2 20 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1000 0 0
"3509" "exp3" 2 21 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 979 0 0
"3509" "exp3" 2 22 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 2635 0 0
"3509" "exp3" 2 23 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1154 45 1
"3509" "exp3" 2 24 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1172 82 1
"3509" "exp3" 2 25 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 867 0 0
"3509" "exp3" 2 26 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 741 0 0
"3509" "exp3" 2 27 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 669 0 0
"3509" "exp3" 2 28 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 635 0 0
"3509" "exp3" 2 29 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 642 0 0
"3509" "exp3" 2 30 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1124 40 1
"3509" "exp3" 2 31 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 855 28 1
"3509" "exp3" 2 32 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1276 0 0
"3509" "exp3" 2 33 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 925 27 1
"3509" "exp3" 2 34 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1331 37 1
"3509" "exp3" 2 35 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 905 27 1
"3509" "exp3" 2 36 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 644 0 0
"3509" "exp3" 2 37 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1835 0 0
"3509" "exp3" 2 38 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1188 0 0
"3509" "exp3" 2 39 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 915 0 0
"3509" "exp3" 2 40 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1908 20 1
"3509" "exp3" 2 41 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1089 31 1
"3509" "exp3" 2 42 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 872 0 0
"3509" "exp3" 2 43 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1203 29 1
"3509" "exp3" 2 44 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 1220 62 1
"3509" "exp3" 2 45 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1909 49 1
"3509" "exp3" 2 46 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 944 29 1
"3509" "exp3" 2 47 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 969 30 1
"3509" "exp3" 2 48 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 1004 0 0
"3509" "exp3" 2 49 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1141 36 1
"3509" "exp3" 2 50 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 898 82 1
"3509" "exp3" 2 51 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 2691 0 0
"3509" "exp3" 2 52 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1366 43 1
"3509" "exp3" 2 53 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 857 0 0
"3509" "exp3" 2 54 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 809 0 0
"3509" "exp3" 2 55 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1433 0 0
"3509" "exp3" 2 56 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 893 24 1
"3509" "exp3" 2 57 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 688 0 0
"3509" "exp3" 2 58 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 749 7 1
"3509" "exp3" 2 59 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1670 25 1
"3509" "exp3" 2 60 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 2515 0 0
"3509" "exp3" 2 61 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1360 0 0
"3509" "exp3" 2 62 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 974 0 0
"3509" "exp3" 2 63 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 910 31 1
"3509" "exp3" 2 64 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1336 0 0
"3509" "exp3" 2 65 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1114 0 0
"3509" "exp3" 2 66 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2768 85 1
"3509" "exp3" 2 67 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 873 34 1
"3509" "exp3" 2 68 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 918 36 1
"3509" "exp3" 2 69 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1135 0 0
"3509" "exp3" 2 70 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 2706 24 1
"3509" "exp3" 2 71 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 2368 25 1
"3509" "exp3" 2 72 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 1270 0 0
"3509" "exp3" 2 73 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 920 26 1
"3509" "exp3" 2 74 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1019 27 1
"3509" "exp3" 2 75 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 687 26 1
"3509" "exp3" 2 76 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 784 0 0
"3509" "exp3" 2 77 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 883 0 0
"3509" "exp3" 2 78 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 662 0 0
"3509" "exp3" 2 79 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 686 0 0
"3509" "exp3" 2 80 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 1551 0 0
"3509" "exp3" 2 81 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1512 0 0
"3509" "exp3" 2 82 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1205 0 0
"3509" "exp3" 2 83 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 949 0 0
"3509" "exp3" 2 84 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1086 22 1
"3509" "exp3" 2 85 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 597 23 1
"3509" "exp3" 2 86 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 559 37 1
"3509" "exp3" 2 87 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1277 0 0
"3509" "exp3" 2 88 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 944 33 1
"3509" "exp3" 2 89 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 632 41 1
"3509" "exp3" 2 90 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1098 0 0
"3509" "exp3" 2 91 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1103 38 1
"3509" "exp3" 2 92 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 855 0 0
"3509" "exp3" 2 93 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1002 32 1
"3509" "exp3" 2 94 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 777 0 0
"3509" "exp3" 2 95 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1064 0 0
"3509" "exp3" 2 96 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1840 20 1
"3509" "exp3" 2 97 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 667 0 0
"3509" "exp3" 2 98 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1015 45 1
"3509" "exp3" 2 99 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1124 0 0
"3509" "exp3" 2 100 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 640 35 1
"3509" "exp3" 2 101 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1946 28 1
"3509" "exp3" 2 102 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1986 21 1
"3509" "exp3" 2 103 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 706 46 1
"3509" "exp3" 2 104 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 686 0 0
"3509" "exp3" 2 105 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 988 0 0
"3509" "exp3" 2 106 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 4390 30 1
"3509" "exp3" 2 107 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 606 40 1
"3509" "exp3" 2 108 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 535 33 1
"3509" "exp3" 2 109 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 689 0 0
"3509" "exp3" 2 110 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1640 0 0
"3509" "exp3" 2 111 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1569 0 0
"3509" "exp3" 2 112 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 618 0 0
"3509" "exp3" 2 113 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 665 0 0
"3509" "exp3" 2 114 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 702 26 1
"3509" "exp3" 2 115 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 793 0 0
"3509" "exp3" 2 116 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 918 0 0
"3509" "exp3" 2 117 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1150 0 0
"3509" "exp3" 2 118 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 733 0 0
"3509" "exp3" 2 119 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 588 0 0
"3509" "exp3" 2 120 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 1303 75 1
"3509" "exp3" 2 121 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1107 0 0
"3509" "exp3" 2 122 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1210 21 1
"3509" "exp3" 2 123 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 754 0 0
"3509" "exp3" 2 124 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1325 0 0
"3509" "exp3" 2 125 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 979 0 0
"3509" "exp3" 2 126 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1066 47 1
"3509" "exp3" 2 127 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2932 0 0
"3509" "exp3" 2 128 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1262 0 0
"3509" "exp3" 2 129 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1096 42 1
"3509" "exp3" 2 130 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 637 21 1
"3509" "exp3" 2 131 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 949 23 1
"3509" "exp3" 2 132 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1028 24 1
"3509" "exp3" 1 1 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 854 35 1
"3509" "exp3" 1 2 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 972 0 0
"3509" "exp3" 1 3 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1030 29 1
"3509" "exp3" 1 4 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 715 0 0
"3509" "exp3" 1 5 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 814 17 1
"3509" "exp3" 1 6 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 654 95 1
"3509" "exp3" 1 7 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 996 0 0
"3509" "exp3" 1 8 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 756 0 0
"3509" "exp3" 1 9 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 774 0 0
"3509" "exp3" 1 10 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 670 0 0
"3509" "exp3" 1 11 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1152 0 0
"3509" "exp3" 1 12 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 2373 25 1
"3509" "exp3" 1 13 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1102 28 1
"3509" "exp3" 1 14 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1144 23 1
"3509" "exp3" 1 15 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 811 27 1
"3509" "exp3" 1 16 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 792 0 0
"3509" "exp3" 1 17 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 939 35 1
"3509" "exp3" 1 18 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 846 0 0
"3509" "exp3" 1 19 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 822 45 1
"3509" "exp3" 1 20 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 627 2 1
"3509" "exp3" 1 21 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 764 13 1
"3509" "exp3" 1 22 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 746 0 0
"3509" "exp3" 1 23 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 921 36 1
"3509" "exp3" 1 24 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1433 12 1
"3509" "exp3" 1 25 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 979 0 0
"3509" "exp3" 1 26 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 851 0 0
"3509" "exp3" 1 27 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 808 0 0
"3509" "exp3" 1 28 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1060 41 1
"3509" "exp3" 1 29 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1159 0 0
"3509" "exp3" 1 30 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 847 18 1
"3509" "exp3" 1 31 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 665 31 1
"3509" "exp3" 1 32 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1949 33 1
"3509" "exp3" 1 33 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1370 0 0
"3509" "exp3" 1 34 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 730 0 0
"3509" "exp3" 1 35 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 674 11 1
"3509" "exp3" 1 36 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 762 17 1
"3509" "exp3" 1 37 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 838 27 1
"3509" "exp3" 1 38 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 686 26 1
"3509" "exp3" 1 39 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 885 0 0
"3509" "exp3" 1 40 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 730 30 1
"3509" "exp3" 1 41 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1115 16 1
"3509" "exp3" 1 42 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1060 49 1
"3509" "exp3" 1 43 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 921 11 1
"3509" "exp3" 1 44 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 692 30 1
"3509" "exp3" 1 45 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 943 46 1
"3509" "exp3" 1 46 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 911 43 1
"3509" "exp3" 1 47 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 929 35 1
"3509" "exp3" 1 48 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 618 0 0
"3509" "exp3" 1 49 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 954 0 0
"3509" "exp3" 1 50 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 882 0 0
"3509" "exp3" 1 51 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 734 33 1
"3509" "exp3" 1 52 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 922 0 0
"3509" "exp3" 1 53 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 2076 23 1
"3509" "exp3" 1 54 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 798 15 1
"3509" "exp3" 1 55 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1738 39 1
"3509" "exp3" 1 56 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 809 32 1
"3509" "exp3" 1 57 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 834 38 1
"3509" "exp3" 1 58 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 661 25 1
"3509" "exp3" 1 59 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1236 14 1
"3509" "exp3" 1 60 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 992 0 0
"3509" "exp3" 1 61 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1085 0 0
"3509" "exp3" 1 62 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 601 31 1
"3509" "exp3" 1 63 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 854 27 1
"3509" "exp3" 1 64 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 686 41 1
"3509" "exp3" 1 65 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 753 15 1
"3509" "exp3" 1 66 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 948 0 0
"3509" "exp3" 1 67 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 523 30 1
"3509" "exp3" 1 68 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1157 21 1
"3509" "exp3" 1 69 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1367 0 0
"3509" "exp3" 1 70 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 915 33 1
"3509" "exp3" 1 71 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 711 43 1
"3509" "exp3" 1 72 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 903 32 1
"3509" "exp3" 1 73 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1097 37 1
"3509" "exp3" 1 74 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 879 27 1
"3509" "exp3" 1 75 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 527 44 1
"3509" "exp3" 1 76 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 786 0 0
"3509" "exp3" 1 77 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 809 0 0
"3509" "exp3" 1 78 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 770 23 1
"3509" "exp3" 1 79 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1091 90 1
"3509" "exp3" 1 80 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 923 29 1
"3509" "exp3" 1 81 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1142 22 1
"3509" "exp3" 1 82 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 853 0 0
"3509" "exp3" 1 83 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 485 22 1
"3509" "exp3" 1 84 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 587 40 1
"3509" "exp3" 1 85 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 786 0 0
"3509" "exp3" 1 86 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 472 14 1
"3509" "exp3" 1 87 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 456 14 1
"3509" "exp3" 1 88 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 564 20 1
"3509" "exp3" 1 89 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 515 0 0
"3509" "exp3" 1 90 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 732 0 0
"3509" "exp3" 1 91 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 760 22 1
"3509" "exp3" 1 92 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 734 0 0
"3509" "exp3" 1 93 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 664 28 1
"3509" "exp3" 1 94 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 615 34 1
"3509" "exp3" 1 95 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 485 36 1
"3509" "exp3" 1 96 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 394 23 1
"3509" "exp3" 1 97 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 422 0 0
"3509" "exp3" 1 98 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 536 0 0
"3509" "exp3" 1 99 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 531 12 1
"3509" "exp3" 1 100 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 636 0 0
"3509" "exp3" 1 101 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 704 19 1
"3509" "exp3" 1 102 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 532 0 0
"3509" "exp3" 1 103 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 814 0 0
"3509" "exp3" 1 104 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 590 21 1
"3509" "exp3" 1 105 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 699 0 0
"3509" "exp3" 1 106 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 534 0 0
"3509" "exp3" 1 107 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 546 0 0
"3509" "exp3" 1 108 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 699 29 1
"3509" "exp3" 1 109 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 630 38 1
"3509" "exp3" 1 110 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 726 0 0
"3509" "exp3" 1 111 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 786 0 0
"3509" "exp3" 1 112 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 778 0 0
"3509" "exp3" 1 113 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 448 13 1
"3509" "exp3" 1 114 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 567 18 1
"3509" "exp3" 1 115 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 441 0 0
"3509" "exp3" 1 116 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 584 6 1
"3509" "exp3" 1 117 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 964 22 1
"3509" "exp3" 1 118 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 705 37 1
"3509" "exp3" 1 119 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 557 31 1
"3509" "exp3" 1 120 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 582 16 1
"3509" "exp3" 1 121 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 755 0 0
"3509" "exp3" 1 122 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 571 16 1
"3509" "exp3" 1 123 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 572 0 0
"3509" "exp3" 1 124 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 674 21 1
"3509" "exp3" 1 125 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 583 28 1
"3509" "exp3" 1 126 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 555 21 1
"3509" "exp3" 1 127 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 531 0 0
"3509" "exp3" 1 128 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1772 0 0
"3509" "exp3" 1 129 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 634 34 1
"3509" "exp3" 1 130 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 571 20 1
"3509" "exp3" 1 131 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 541 24 1
"3509" "exp3" 1 132 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 709 32 1
"3509" "exp3" 2 1 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 857 0 0
"3509" "exp3" 2 2 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 620 0 0
"3509" "exp3" 2 3 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 736 74 1
"3509" "exp3" 2 4 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1371 0 0
"3509" "exp3" 2 5 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 833 0 0
"3509" "exp3" 2 6 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 613 0 0
"3509" "exp3" 2 7 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 920 0 0
"3509" "exp3" 2 8 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 761 57 1
"3509" "exp3" 2 9 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 530 0 0
"3509" "exp3" 2 10 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 550 0 0
"3509" "exp3" 2 11 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 446 19 1
"3509" "exp3" 2 12 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 665 0 0
"3509" "exp3" 2 13 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 724 82 1
"3509" "exp3" 2 14 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 648 60 1
"3509" "exp3" 2 15 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 958 0 0
"3509" "exp3" 2 16 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 801 0 0
"3509" "exp3" 2 17 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 752 0 0
"3509" "exp3" 2 18 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 679 0 0
"3509" "exp3" 2 19 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 974 0 0
"3509" "exp3" 2 20 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 644 0 0
"3509" "exp3" 2 21 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 706 0 0
"3509" "exp3" 2 22 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 508 0 0
"3509" "exp3" 2 23 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 850 0 0
"3509" "exp3" 2 24 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 490 83 1
"3509" "exp3" 2 25 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 472 0 0
"3509" "exp3" 2 26 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 692 0 0
"3509" "exp3" 2 27 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 2 690 0 0
"3509" "exp3" 2 28 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 494 0 0
"3509" "exp3" 2 29 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 525 0 0
"3509" "exp3" 2 30 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 556 0 0
"3509" "exp3" 2 31 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 720 0 0
"3509" "exp3" 2 32 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 670 0 0
"3509" "exp3" 2 33 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 501 0 0
"3509" "exp3" 2 34 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 743 0 0
"3509" "exp3" 2 35 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 558 80 1
"3509" "exp3" 2 36 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 477 0 0
"3509" "exp3" 2 37 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 576 71 1
"3509" "exp3" 2 38 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 521 70 1
"3509" "exp3" 2 39 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 649 0 0
"3509" "exp3" 2 40 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 747 0 0
"3509" "exp3" 2 41 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 733 0 0
"3509" "exp3" 2 42 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 507 0 0
"3509" "exp3" 2 43 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 781 0 0
"3509" "exp3" 2 44 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 468 0 0
"3509" "exp3" 2 45 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 736 0 0
"3509" "exp3" 2 46 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 777 53 1
"3509" "exp3" 2 47 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 503 0 0
"3509" "exp3" 2 48 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 839 0 0
"3509" "exp3" 2 49 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 573 0 0
"3509" "exp3" 2 50 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 465 0 0
"3509" "exp3" 2 51 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 691 0 0
"3509" "exp3" 2 52 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 524 58 1
"3509" "exp3" 2 53 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 593 0 0
"3509" "exp3" 2 54 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 519 0 0
"3509" "exp3" 2 55 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 648 0 0
"3509" "exp3" 2 56 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 446 0 0
"3509" "exp3" 2 57 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 520 0 0
"3509" "exp3" 2 58 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 638 0 0
"3509" "exp3" 2 59 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 505 0 0
"3509" "exp3" 2 60 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 408 0 0
"3509" "exp3" 2 61 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 413 69 1
"3509" "exp3" 2 62 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 534 0 0
"3509" "exp3" 2 63 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 607 73 1
"3509" "exp3" 2 64 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 483 0 0
"3509" "exp3" 2 65 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 531 59 1
"3509" "exp3" 2 66 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 487 0 0
"3509" "exp3" 2 67 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 643 0 0
"3509" "exp3" 2 68 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 470 0 0
"3509" "exp3" 2 69 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 523 5 1
"3509" "exp3" 2 70 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 808 0 0
"3509" "exp3" 2 71 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 424 0 0
"3509" "exp3" 2 72 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 389 0 0
"3509" "exp3" 2 73 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 398 0 0
"3509" "exp3" 2 74 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 472 0 0
"3509" "exp3" 2 75 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 481 0 0
"3509" "exp3" 2 76 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 584 0 0
"3509" "exp3" 2 77 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 715 0 0
"3509" "exp3" 2 78 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 514 28 1
"3509" "exp3" 2 79 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 538 0 0
"3509" "exp3" 2 80 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 473 0 0
"3509" "exp3" 2 81 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 429 0 0
"3509" "exp3" 2 82 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 427 0 0
"3509" "exp3" 2 83 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 644 65 1
"3509" "exp3" 2 84 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 422 0 0
"3509" "exp3" 2 85 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 406 71 1
"3509" "exp3" 2 86 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 364 0 0
"3509" "exp3" 2 87 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 443 83 1
"3509" "exp3" 2 88 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 441 0 0
"3509" "exp3" 2 89 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 562 0 0
"3509" "exp3" 2 90 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 529 0 0
"3509" "exp3" 2 91 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 500 75 1
"3509" "exp3" 2 92 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 341 0 0
"3509" "exp3" 2 93 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 373 39 1
"3509" "exp3" 2 94 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 512 0 0
"3509" "exp3" 2 95 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 733 64 1
"3509" "exp3" 2 96 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 409 0 0
"3509" "exp3" 2 97 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 501 0 0
"3509" "exp3" 2 98 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 498 31 1
"3509" "exp3" 2 99 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 587 0 0
"3509" "exp3" 2 100 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 597 0 0
"3509" "exp3" 2 101 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 422 0 0
"3509" "exp3" 2 102 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 455 0 0
"3509" "exp3" 2 103 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 403 69 1
"3509" "exp3" 2 104 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 1036 52 1
"3509" "exp3" 2 105 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 555 0 0
"3509" "exp3" 2 106 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 1049 0 0
"3509" "exp3" 2 107 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1123 0 0
"3509" "exp3" 2 108 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 770 0 0
"3509" "exp3" 2 109 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 693 0 0
"3509" "exp3" 2 110 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 431 0 0
"3509" "exp3" 2 111 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 368 67 1
"3509" "exp3" 2 112 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 1229 55 1
"3509" "exp3" 2 113 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 691 0 0
"3509" "exp3" 2 114 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 599 66 1
"3509" "exp3" 2 115 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 429 0 0
"3509" "exp3" 2 116 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 481 0 0
"3509" "exp3" 2 117 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 592 0 0
"3509" "exp3" 2 118 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 552 0 0
"3509" "exp3" 2 119 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 607 0 0
"3509" "exp3" 2 120 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 546 0 0
"3509" "exp3" 2 121 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 522 0 0
"3509" "exp3" 2 122 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 601 0 0
"3509" "exp3" 2 123 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 684 0 0
"3509" "exp3" 2 124 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 613 0 0
"3509" "exp3" 2 125 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 446 0 0
"3509" "exp3" 2 126 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 597 0 0
"3509" "exp3" 2 127 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 754 0 0
"3509" "exp3" 2 128 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 664 0 0
"3509" "exp3" 2 129 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 577 0 0
"3509" "exp3" 2 130 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 744 56 1
"3509" "exp3" 2 131 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 558 0 0
"3509" "exp3" 2 132 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 418 77 1
"3510" "exp3" 1 1 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1970 45 1
"3510" "exp3" 1 2 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1372 77 1
"3510" "exp3" 1 3 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1460 69 1
"3510" "exp3" 1 4 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1424 0 0
"3510" "exp3" 1 5 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1529 0 0
"3510" "exp3" 1 6 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2174 31 1
"3510" "exp3" 1 7 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1095 0 0
"3510" "exp3" 1 8 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 2183 0 0
"3510" "exp3" 1 9 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 1564 0 0
"3510" "exp3" 1 10 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1596 78 1
"3510" "exp3" 1 11 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 885 0 0
"3510" "exp3" 1 12 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 2000 0 0
"3510" "exp3" 1 13 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2764 0 0
"3510" "exp3" 1 14 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 2322 0 0
"3510" "exp3" 1 15 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 1510 0 0
"3510" "exp3" 1 16 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1734 92 1
"3510" "exp3" 1 17 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1286 0 0
"3510" "exp3" 1 18 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 2353 80 1
"3510" "exp3" 1 19 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 5557 27 1
"3510" "exp3" 1 20 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 4971 0 0
"3510" "exp3" 1 21 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1447 46 1
"3510" "exp3" 1 22 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1862 33 1
"3510" "exp3" 1 23 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 2639 0 0
"3510" "exp3" 1 24 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 3117 0 0
"3510" "exp3" 1 25 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1369 42 1
"3510" "exp3" 1 26 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1293 0 0
"3510" "exp3" 1 27 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1765 19 1
"3510" "exp3" 1 28 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 3924 0 0
"3510" "exp3" 1 29 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1939 0 0
"3510" "exp3" 1 30 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 3057 0 0
"3510" "exp3" 1 31 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1623 0 0
"3510" "exp3" 1 32 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1673 80 1
"3510" "exp3" 1 33 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1747 0 0
"3510" "exp3" 1 34 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 1301 0 0
"3510" "exp3" 1 35 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 2501 12 1
"3510" "exp3" 1 36 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1600 44 1
"3510" "exp3" 1 37 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1149 38 1
"3510" "exp3" 1 38 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 2493 0 0
"3510" "exp3" 1 39 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 2189 83 1
"3510" "exp3" 1 40 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 2730 33 1
"3510" "exp3" 1 41 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1113 0 0
"3510" "exp3" 1 42 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1310 35 1
"3510" "exp3" 1 43 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 2551 0 0
"3510" "exp3" 1 44 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1558 85 1
"3510" "exp3" 1 45 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 2099 0 0
"3510" "exp3" 1 46 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1719 0 0
"3510" "exp3" 1 47 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1113 40 1
"3510" "exp3" 1 48 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1621 0 0
"3510" "exp3" 1 49 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1391 0 0
"3510" "exp3" 1 50 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 1886 0 0
"3510" "exp3" 1 51 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1646 35 1
"3510" "exp3" 1 52 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1345 37 1
"3510" "exp3" 1 53 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1392 0 0
"3510" "exp3" 1 54 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1709 33 1
"3510" "exp3" 1 55 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2693 0 0
"3510" "exp3" 1 56 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 2635 0 0
"3510" "exp3" 1 57 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1136 31 1
"3510" "exp3" 1 58 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 4759 27 1
"3510" "exp3" 1 59 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 2104 86 1
"3510" "exp3" 1 60 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2355 75 1
"3510" "exp3" 1 61 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 2013 0 0
"3510" "exp3" 1 62 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1724 34 1
"3510" "exp3" 1 63 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1622 0 0
"3510" "exp3" 1 64 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 3075 0 0
"3510" "exp3" 1 65 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 3567 0 0
"3510" "exp3" 1 66 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 3565 0 0
"3510" "exp3" 1 67 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 2254 0 0
"3510" "exp3" 1 68 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1224 43 1
"3510" "exp3" 1 69 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1751 34 1
"3510" "exp3" 1 70 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1347 37 1
"3510" "exp3" 1 71 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1495 0 0
"3510" "exp3" 1 72 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 2168 0 0
"3510" "exp3" 1 73 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 3210 0 0
"3510" "exp3" 1 74 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2748 0 0
"3510" "exp3" 1 75 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1525 39 1
"3510" "exp3" 1 76 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 2645 0 0
"3510" "exp3" 1 77 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1724 87 1
"3510" "exp3" 1 78 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 2361 0 0
"3510" "exp3" 1 79 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 2225 24 1
"3510" "exp3" 1 80 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 4673 21 1
"3510" "exp3" 1 81 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 3242 0 0
"3510" "exp3" 1 82 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 28621 0 0
"3510" "exp3" 1 83 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 8756 76 1
"3510" "exp3" 1 84 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 5734 70 1
"3510" "exp3" 1 85 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 3784 0 0
"3510" "exp3" 1 86 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 4238 36 1
"3510" "exp3" 1 87 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 14043 75 1
"3510" "exp3" 1 88 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 3667 0 0
"3510" "exp3" 1 89 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1922 0 0
"3510" "exp3" 1 90 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 4686 42 1
"3510" "exp3" 1 91 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 3449 32 1
"3510" "exp3" 1 92 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 5470 30 1
"3510" "exp3" 1 93 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 3180 0 0
"3510" "exp3" 1 94 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 5750 8 1
"3510" "exp3" 1 95 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 5861 0 0
"3510" "exp3" 1 96 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 5454 0 0
"3510" "exp3" 1 97 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 2647 28 1
"3510" "exp3" 1 98 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 3696 0 0
"3510" "exp3" 1 99 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 4525 0 0
"3510" "exp3" 1 100 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 4153 93 1
"3510" "exp3" 1 101 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 2538 0 0
"3510" "exp3" 1 102 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 4438 0 0
"3510" "exp3" 1 103 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 3109 0 0
"3510" "exp3" 1 104 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 2091 0 0
"3510" "exp3" 1 105 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1641 37 1
"3510" "exp3" 1 106 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 6233 0 0
"3510" "exp3" 1 107 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 3070 0 0
"3510" "exp3" 1 108 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 12448 0 0
"3510" "exp3" 1 109 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 2872 57 1
"3510" "exp3" 1 110 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 4584 0 0
"3510" "exp3" 1 111 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 3569 29 1
"3510" "exp3" 1 112 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 6692 0 0
"3510" "exp3" 1 113 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 4195 31 1
"3510" "exp3" 1 114 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 6336 45 1
"3510" "exp3" 1 115 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 5460 32 1
"3510" "exp3" 1 116 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 4036 0 0
"3510" "exp3" 1 117 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1543 0 0
"3510" "exp3" 1 118 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 2128 22 1
"3510" "exp3" 1 119 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 2019 0 0
"3510" "exp3" 1 120 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 3815 25 1
"3510" "exp3" 1 121 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 6802 0 0
"3510" "exp3" 1 122 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 3808 28 1
"3510" "exp3" 1 123 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 2150 0 0
"3510" "exp3" 1 124 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 6158 49 1
"3510" "exp3" 1 125 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 4754 26 1
"3510" "exp3" 1 126 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 9738 59 1
"3510" "exp3" 1 127 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 5842 35 1
"3510" "exp3" 1 128 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 3293 0 0
"3510" "exp3" 1 129 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 4813 0 0
"3510" "exp3" 1 130 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 4600 75 1
"3510" "exp3" 1 131 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 4182 0 0
"3510" "exp3" 1 132 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 9293 0 0
"3510" "exp3" 2 1 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 3500 43 1
"3510" "exp3" 2 2 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 3641 39 1
"3510" "exp3" 2 3 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 3001 70 1
"3510" "exp3" 2 4 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 5095 0 0
"3510" "exp3" 2 5 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 6209 0 0
"3510" "exp3" 2 6 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 8171 0 0
"3510" "exp3" 2 7 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 3882 0 0
"3510" "exp3" 2 8 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 5449 0 0
"3510" "exp3" 2 9 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 5962 0 0
"3510" "exp3" 2 10 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 4311 14 1
"3510" "exp3" 2 11 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 5189 77 1
"3510" "exp3" 2 12 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 3462 0 0
"3510" "exp3" 2 13 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 6335 35 1
"3510" "exp3" 2 14 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 2768 83 1
"3510" "exp3" 2 15 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 7188 0 0
"3510" "exp3" 2 16 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2549 0 0
"3510" "exp3" 2 17 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 2159 35 1
"3510" "exp3" 2 18 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 2167 0 0
"3510" "exp3" 2 19 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2740 44 1
"3510" "exp3" 2 20 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 3357 0 0
"3510" "exp3" 2 21 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2198 41 1
"3510" "exp3" 2 22 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 2982 0 0
"3510" "exp3" 2 23 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2427 44 1
"3510" "exp3" 2 24 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 3066 0 0
"3510" "exp3" 2 25 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2761 24 1
"3510" "exp3" 2 26 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 5034 0 0
"3510" "exp3" 2 27 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 2284 19 1
"3510" "exp3" 2 28 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 8285 0 0
"3510" "exp3" 2 29 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2243 0 0
"3510" "exp3" 2 30 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 2734 84 1
"3510" "exp3" 2 31 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 4346 0 0
"3510" "exp3" 2 32 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 4024 0 0
"3510" "exp3" 2 33 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2382 72 1
"3510" "exp3" 2 34 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 2907 0 0
"3510" "exp3" 2 35 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 3299 0 0
"3510" "exp3" 2 36 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 3404 19 1
"3510" "exp3" 2 37 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 4952 0 0
"3510" "exp3" 2 38 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 3546 0 0
"3510" "exp3" 2 39 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2293 0 0
"3510" "exp3" 2 40 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 8076 89 1
"3510" "exp3" 2 41 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2751 75 1
"3510" "exp3" 2 42 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 3871 28 1
"3510" "exp3" 2 43 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3074 0 0
"3510" "exp3" 2 44 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 2226 0 0
"3510" "exp3" 2 45 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 5422 26 1
"3510" "exp3" 2 46 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 6120 0 0
"3510" "exp3" 2 47 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 5958 0 0
"3510" "exp3" 2 48 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 3889 0 0
"3510" "exp3" 2 49 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 3733 0 0
"3510" "exp3" 2 50 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 2410 0 0
"3510" "exp3" 2 51 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 4272 32 1
"3510" "exp3" 2 52 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 2858 38 1
"3510" "exp3" 2 53 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 3233 30 1
"3510" "exp3" 2 54 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 3698 20 1
"3510" "exp3" 2 55 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 8968 86 1
"3510" "exp3" 2 56 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 2281 0 0
"3510" "exp3" 2 57 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 5243 0 0
"3510" "exp3" 2 58 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 7021 0 0
"3510" "exp3" 2 59 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 3007 0 0
"3510" "exp3" 2 60 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 5490 73 1
"3510" "exp3" 2 61 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 2491 30 1
"3510" "exp3" 2 62 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 2014 45 1
"3510" "exp3" 2 63 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 4923 21 1
"3510" "exp3" 2 64 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 6552 28 1
"3510" "exp3" 2 65 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 4141 0 0
"3510" "exp3" 2 66 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 4163 0 0
"3510" "exp3" 2 67 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2499 40 1
"3510" "exp3" 2 68 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 2860 31 1
"3510" "exp3" 2 69 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 3678 0 0
"3510" "exp3" 2 70 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2101 42 1
"3510" "exp3" 2 71 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1354 35 1
"3510" "exp3" 2 72 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2184 0 0
"3510" "exp3" 2 73 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1648 38 1
"3510" "exp3" 2 74 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 3152 0 0
"3510" "exp3" 2 75 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1608 0 0
"3510" "exp3" 2 76 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 6568 0 0
"3510" "exp3" 2 77 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 5859 75 1
"3510" "exp3" 2 78 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 4702 29 1
"3510" "exp3" 2 79 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 2702 0 0
"3510" "exp3" 2 80 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 5323 18 1
"3510" "exp3" 2 81 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1859 86 1
"3510" "exp3" 2 82 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2208 31 1
"3510" "exp3" 2 83 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 5467 0 0
"3510" "exp3" 2 84 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1304 34 1
"3510" "exp3" 2 85 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2614 21 1
"3510" "exp3" 2 86 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1932 31 1
"3510" "exp3" 2 87 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 3208 0 0
"3510" "exp3" 2 88 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 2974 20 1
"3510" "exp3" 2 89 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 3725 19 1
"3510" "exp3" 2 90 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 5065 0 0
"3510" "exp3" 2 91 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2912 0 0
"3510" "exp3" 2 92 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 6699 21 1
"3510" "exp3" 2 93 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 3360 27 1
"3510" "exp3" 2 94 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 5656 0 0
"3510" "exp3" 2 95 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2932 49 1
"3510" "exp3" 2 96 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 5074 0 0
"3510" "exp3" 2 97 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 4865 0 0
"3510" "exp3" 2 98 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1815 0 0
"3510" "exp3" 2 99 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2613 0 0
"3510" "exp3" 2 100 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 4184 0 0
"3510" "exp3" 2 101 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 3152 22 1
"3510" "exp3" 2 102 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1524 37 1
"3510" "exp3" 2 103 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1961 0 0
"3510" "exp3" 2 104 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 3309 0 0
"3510" "exp3" 2 105 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1431 0 0
"3510" "exp3" 2 106 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1765 0 0
"3510" "exp3" 2 107 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 3103 87 1
"3510" "exp3" 2 108 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2903 39 1
"3510" "exp3" 2 109 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 7598 37 1
"3510" "exp3" 2 110 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 6061 0 0
"3510" "exp3" 2 111 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 2460 0 0
"3510" "exp3" 2 112 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 4251 0 0
"3510" "exp3" 2 113 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 6106 0 0
"3510" "exp3" 2 114 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 4394 34 1
"3510" "exp3" 2 115 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 4445 81 1
"3510" "exp3" 2 116 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2017 92 1
"3510" "exp3" 2 117 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 7135 0 0
"3510" "exp3" 2 118 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 2861 26 1
"3510" "exp3" 2 119 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 5115 0 0
"3510" "exp3" 2 120 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 2416 68 1
"3510" "exp3" 2 121 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 4309 0 0
"3510" "exp3" 2 122 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2242 43 1
"3510" "exp3" 2 123 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 1201 0 0
"3510" "exp3" 2 124 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 755 0 0
"3510" "exp3" 2 125 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 857 24 1
"3510" "exp3" 2 126 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 3258 25 1
"3510" "exp3" 2 127 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 3798 33 1
"3510" "exp3" 2 128 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1343 30 1
"3510" "exp3" 2 129 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 3737 0 0
"3510" "exp3" 2 130 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 2898 0 0
"3510" "exp3" 2 131 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 3718 0 0
"3510" "exp3" 2 132 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 4901 26 1
"3510" "exp3" 1 1 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1268 0 0
"3510" "exp3" 1 2 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1302 91 1
"3510" "exp3" 1 3 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1138 14 1
"3510" "exp3" 1 4 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 2703 0 0
"3510" "exp3" 1 5 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 4462 0 0
"3510" "exp3" 1 6 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1079 46 1
"3510" "exp3" 1 7 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1282 0 0
"3510" "exp3" 1 8 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1107 0 0
"3510" "exp3" 1 9 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 4034 0 0
"3510" "exp3" 1 10 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 4408 0 0
"3510" "exp3" 1 11 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 910 0 0
"3510" "exp3" 1 12 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1204 0 0
"3510" "exp3" 1 13 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 922 0 0
"3510" "exp3" 1 14 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1362 0 0
"3510" "exp3" 1 15 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1275 0 0
"3510" "exp3" 1 16 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1071 36 1
"3510" "exp3" 1 17 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 3042 0 0
"3510" "exp3" 1 18 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2423 22 1
"3510" "exp3" 1 19 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 3024 0 0
"3510" "exp3" 1 20 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 912 20 1
"3510" "exp3" 1 21 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 920 25 1
"3510" "exp3" 1 22 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1247 0 0
"3510" "exp3" 1 23 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 992 0 0
"3510" "exp3" 1 24 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1565 0 0
"3510" "exp3" 1 25 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1106 0 0
"3510" "exp3" 1 26 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1228 28 1
"3510" "exp3" 1 27 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1211 22 1
"3510" "exp3" 1 28 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 3426 0 0
"3510" "exp3" 1 29 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2726 34 1
"3510" "exp3" 1 30 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1606 0 0
"3510" "exp3" 1 31 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1289 35 1
"3510" "exp3" 1 32 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1030 76 1
"3510" "exp3" 1 33 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1109 0 0
"3510" "exp3" 1 34 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 853 0 0
"3510" "exp3" 1 35 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 991 0 0
"3510" "exp3" 1 36 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1002 24 1
"3510" "exp3" 1 37 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1117 0 0
"3510" "exp3" 1 38 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 6600 27 1
"3510" "exp3" 1 39 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1537 0 0
"3510" "exp3" 1 40 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 4668 79 1
"3510" "exp3" 1 41 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 3747 83 1
"3510" "exp3" 1 42 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 3482 40 1
"3510" "exp3" 1 43 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 4758 0 0
"3510" "exp3" 1 44 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 2235 0 0
"3510" "exp3" 1 45 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 4856 0 0
"3510" "exp3" 1 46 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 3294 0 0
"3510" "exp3" 1 47 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1058 86 1
"3510" "exp3" 1 48 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1106 0 0
"3510" "exp3" 1 49 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1197 35 1
"3510" "exp3" 1 50 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1140 31 1
"3510" "exp3" 1 51 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 819 93 1
"3510" "exp3" 1 52 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 889 0 0
"3510" "exp3" 1 53 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1481 16 1
"3510" "exp3" 1 54 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1154 93 1
"3510" "exp3" 1 55 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2556 42 1
"3510" "exp3" 1 56 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1076 23 1
"3510" "exp3" 1 57 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 5790 48 1
"3510" "exp3" 1 58 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 6804 33 1
"3510" "exp3" 1 59 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 9602 29 1
"3510" "exp3" 1 60 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 16452 0 0
"3510" "exp3" 1 61 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 4843 27 1
"3510" "exp3" 1 62 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 859 19 1
"3510" "exp3" 1 63 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 3885 0 0
"3510" "exp3" 1 64 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1291 0 0
"3510" "exp3" 1 65 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 2501 0 0
"3510" "exp3" 1 66 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 12260 0 0
"3510" "exp3" 1 67 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 4128 0 0
"3510" "exp3" 1 68 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 4960 68 1
"3510" "exp3" 1 69 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2888 0 0
"3510" "exp3" 1 70 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 2312 0 0
"3510" "exp3" 1 71 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1656 0 0
"3510" "exp3" 1 72 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1981 0 0
"3510" "exp3" 1 73 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 4587 43 1
"3510" "exp3" 1 74 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 3991 24 1
"3510" "exp3" 1 75 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 2344 0 0
"3510" "exp3" 1 76 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1802 78 1
"3510" "exp3" 1 77 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1414 18 1
"3510" "exp3" 1 78 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 4034 43 1
"3510" "exp3" 1 79 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 2706 86 1
"3510" "exp3" 1 80 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2522 37 1
"3510" "exp3" 1 81 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2594 32 1
"3510" "exp3" 1 82 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2488 41 1
"3510" "exp3" 1 83 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 4837 36 1
"3510" "exp3" 1 84 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 4202 0 0
"3510" "exp3" 1 85 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 2956 0 0
"3510" "exp3" 1 86 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 10196 75 1
"3510" "exp3" 1 87 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 4179 0 0
"3510" "exp3" 1 88 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 4690 0 0
"3510" "exp3" 1 89 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 9218 27 1
"3510" "exp3" 1 90 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2238 87 1
"3510" "exp3" 1 91 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 3494 0 0
"3510" "exp3" 1 92 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1843 0 0
"3510" "exp3" 1 93 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2260 32 1
"3510" "exp3" 1 94 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1399 31 1
"3510" "exp3" 1 95 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1701 32 1
"3510" "exp3" 1 96 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 3081 28 1
"3510" "exp3" 1 97 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 2241 0 0
"3510" "exp3" 1 98 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1617 78 1
"3510" "exp3" 1 99 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1619 0 0
"3510" "exp3" 1 100 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 4458 10 1
"3510" "exp3" 1 101 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 6284 0 0
"3510" "exp3" 1 102 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 2297 0 0
"3510" "exp3" 1 103 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1485 33 1
"3510" "exp3" 1 104 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1827 26 1
"3510" "exp3" 1 105 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1973 25 1
"3510" "exp3" 1 106 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1484 83 1
"3510" "exp3" 1 107 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 4643 13 1
"3510" "exp3" 1 108 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 4929 0 0
"3510" "exp3" 1 109 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 2606 0 0
"3510" "exp3" 1 110 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 2039 0 0
"3510" "exp3" 1 111 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 2056 0 0
"3510" "exp3" 1 112 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1292 0 0
"3510" "exp3" 1 113 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 2515 29 1
"3510" "exp3" 1 114 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1095 30 1
"3510" "exp3" 1 115 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 4337 38 1
"3510" "exp3" 1 116 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 901 0 0
"3510" "exp3" 1 117 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1504 0 0
"3510" "exp3" 1 118 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1872 0 0
"3510" "exp3" 1 119 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1371 0 0
"3510" "exp3" 1 120 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1865 26 1
"3510" "exp3" 1 121 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 1338 0 0
"3510" "exp3" 1 122 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 2378 33 1
"3510" "exp3" 1 123 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1222 26 1
"3510" "exp3" 1 124 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1077 0 0
"3510" "exp3" 1 125 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1022 0 0
"3510" "exp3" 1 126 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1274 0 0
"3510" "exp3" 1 127 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 1147 0 0
"3510" "exp3" 1 128 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 1114 0 0
"3510" "exp3" 1 129 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 1604 0 0
"3510" "exp3" 1 130 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 5419 49 1
"3510" "exp3" 1 131 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2185 29 1
"3510" "exp3" 1 132 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2623 44 1
"3510" "exp3" 2 1 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1415 79 1
"3510" "exp3" 2 2 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1102 36 1
"3510" "exp3" 2 3 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 866 0 0
"3510" "exp3" 2 4 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1085 25 1
"3510" "exp3" 2 5 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1068 39 1
"3510" "exp3" 2 6 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 958 0 0
"3510" "exp3" 2 7 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1166 0 0
"3510" "exp3" 2 8 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1271 41 1
"3510" "exp3" 2 9 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1596 27 1
"3510" "exp3" 2 10 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 4668 46 1
"3510" "exp3" 2 11 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 949 0 0
"3510" "exp3" 2 12 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 8674 0 0
"3510" "exp3" 2 13 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 910 0 0
"3510" "exp3" 2 14 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1286 0 0
"3510" "exp3" 2 15 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 1679 0 0
"3510" "exp3" 2 16 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1495 0 0
"3510" "exp3" 2 17 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 938 34 1
"3510" "exp3" 2 18 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 3127 0 0
"3510" "exp3" 2 19 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 1151 0 0
"3510" "exp3" 2 20 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1381 0 0
"3510" "exp3" 2 21 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 996 67 1
"3510" "exp3" 2 22 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 4601 0 0
"3510" "exp3" 2 23 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1314 0 0
"3510" "exp3" 2 24 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1080 85 1
"3510" "exp3" 2 25 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1611 27 1
"3510" "exp3" 2 26 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 958 0 0
"3510" "exp3" 2 27 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 747 0 0
"3510" "exp3" 2 28 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1223 0 0
"3510" "exp3" 2 29 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 1745 0 0
"3510" "exp3" 2 30 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 2390 0 0
"3510" "exp3" 2 31 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 2275 28 1
"3510" "exp3" 2 32 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1790 80 1
"3510" "exp3" 2 33 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 5157 0 0
"3510" "exp3" 2 34 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 5162 0 0
"3510" "exp3" 2 35 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 902 0 0
"3510" "exp3" 2 36 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2944 91 1
"3510" "exp3" 2 37 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1231 0 0
"3510" "exp3" 2 38 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 2060 40 1
"3510" "exp3" 2 39 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1224 0 0
"3510" "exp3" 2 40 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1047 93 1
"3510" "exp3" 2 41 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 1608 52 1
"3510" "exp3" 2 42 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1414 33 1
"3510" "exp3" 2 43 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 3098 0 0
"3510" "exp3" 2 44 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1807 0 0
"3510" "exp3" 2 45 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 3601 87 1
"3510" "exp3" 2 46 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 2503 83 1
"3510" "exp3" 2 47 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 3230 0 0
"3510" "exp3" 2 48 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 5391 0 0
"3510" "exp3" 2 49 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 2695 0 0
"3510" "exp3" 2 50 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 4296 0 0
"3510" "exp3" 2 51 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 3748 0 0
"3510" "exp3" 2 52 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 2360 0 0
"3510" "exp3" 2 53 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 4261 0 0
"3510" "exp3" 2 54 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1571 0 0
"3510" "exp3" 2 55 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 907 0 0
"3510" "exp3" 2 56 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 1437 0 0
"3510" "exp3" 2 57 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1523 0 0
"3510" "exp3" 2 58 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 2953 30 1
"3510" "exp3" 2 59 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 2488 45 1
"3510" "exp3" 2 60 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 3234 37 1
"3510" "exp3" 2 61 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1339 0 0
"3510" "exp3" 2 62 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 860 0 0
"3510" "exp3" 2 63 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1007 0 0
"3510" "exp3" 2 64 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 718 0 0
"3510" "exp3" 2 65 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1123 89 1
"3510" "exp3" 2 66 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1328 0 0
"3510" "exp3" 2 67 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 1321 0 0
"3510" "exp3" 2 68 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 2090 73 1
"3510" "exp3" 2 69 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1808 53 1
"3510" "exp3" 2 70 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 5484 0 0
"3510" "exp3" 2 71 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1504 0 0
"3510" "exp3" 2 72 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1696 44 1
"3510" "exp3" 2 73 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 920 0 0
"3510" "exp3" 2 74 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1356 29 1
"3510" "exp3" 2 75 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 3691 43 1
"3510" "exp3" 2 76 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 3115 0 0
"3510" "exp3" 2 77 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1213 28 1
"3510" "exp3" 2 78 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1754 90 1
"3510" "exp3" 2 79 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 759 0 0
"3510" "exp3" 2 80 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 2509 23 1
"3510" "exp3" 2 81 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 3255 26 1
"3510" "exp3" 2 82 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 2018 31 1
"3510" "exp3" 2 83 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1470 0 0
"3510" "exp3" 2 84 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1365 0 0
"3510" "exp3" 2 85 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 2213 45 1
"3510" "exp3" 2 86 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 847 29 1
"3510" "exp3" 2 87 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1572 0 0
"3510" "exp3" 2 88 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 2839 30 1
"3510" "exp3" 2 89 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 3643 0 0
"3510" "exp3" 2 90 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2248 44 1
"3510" "exp3" 2 91 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 5694 20 1
"3510" "exp3" 2 92 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 2796 31 1
"3510" "exp3" 2 93 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 3812 20 1
"3510" "exp3" 2 94 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1994 0 0
"3510" "exp3" 2 95 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 2693 85 1
"3510" "exp3" 2 96 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 4024 0 0
"3510" "exp3" 2 97 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 3042 0 0
"3510" "exp3" 2 98 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1481 32 1
"3510" "exp3" 2 99 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1497 29 1
"3510" "exp3" 2 100 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1406 32 1
"3510" "exp3" 2 101 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 2155 42 1
"3510" "exp3" 2 102 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1686 35 1
"3510" "exp3" 2 103 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 6761 0 0
"3510" "exp3" 2 104 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1089 0 0
"3510" "exp3" 2 105 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1509 39 1
"3510" "exp3" 2 106 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1368 0 0
"3510" "exp3" 2 107 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1795 35 1
"3510" "exp3" 2 108 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1091 12 1
"3510" "exp3" 2 109 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 4564 0 0
"3510" "exp3" 2 110 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 3697 0 0
"3510" "exp3" 2 111 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 3269 27 1
"3510" "exp3" 2 112 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1155 32 1
"3510" "exp3" 2 113 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 706 33 1
"3510" "exp3" 2 114 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1070 26 1
"3510" "exp3" 2 115 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 937 0 0
"3510" "exp3" 2 116 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 930 93 1
"3510" "exp3" 2 117 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1217 34 1
"3510" "exp3" 2 118 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 849 0 0
"3510" "exp3" 2 119 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 3287 75 1
"3510" "exp3" 2 120 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 5100 0 0
"3510" "exp3" 2 121 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 2391 0 0
"3510" "exp3" 2 122 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 2398 0 0
"3510" "exp3" 2 123 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1495 41 1
"3510" "exp3" 2 124 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 1274 0 0
"3510" "exp3" 2 125 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 5038 34 1
"3510" "exp3" 2 126 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2267 0 0
"3510" "exp3" 2 127 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 2441 25 1
"3510" "exp3" 2 128 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1885 40 1
"3510" "exp3" 2 129 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 3153 28 1
"3510" "exp3" 2 130 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1598 32 1
"3510" "exp3" 2 131 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1336 0 0
"3510" "exp3" 2 132 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1529 0 0
"3510" "exp3" 1 1 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1282 0 0
"3510" "exp3" 1 2 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1008 0 0
"3510" "exp3" 1 3 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 2623 27 1
"3510" "exp3" 1 4 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1096 82 1
"3510" "exp3" 1 5 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1733 0 0
"3510" "exp3" 1 6 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 2770 37 1
"3510" "exp3" 1 7 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 2197 0 0
"3510" "exp3" 1 8 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 3069 32 1
"3510" "exp3" 1 9 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 2106 0 0
"3510" "exp3" 1 10 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 7376 0 0
"3510" "exp3" 1 11 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1166 0 0
"3510" "exp3" 1 12 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 3339 0 0
"3510" "exp3" 1 13 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 2500 0 0
"3510" "exp3" 1 14 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 2720 37 1
"3510" "exp3" 1 15 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 3949 0 0
"3510" "exp3" 1 16 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1115 0 0
"3510" "exp3" 1 17 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2585 18 1
"3510" "exp3" 1 18 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 6164 19 1
"3510" "exp3" 1 19 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 2376 0 0
"3510" "exp3" 1 20 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 3839 28 1
"3510" "exp3" 1 21 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1575 44 1
"3510" "exp3" 1 22 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 957 33 1
"3510" "exp3" 1 23 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1334 0 0
"3510" "exp3" 1 24 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1388 0 0
"3510" "exp3" 1 25 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 2488 16 1
"3510" "exp3" 1 26 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1804 29 1
"3510" "exp3" 1 27 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1945 0 0
"3510" "exp3" 1 28 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 7024 0 0
"3510" "exp3" 1 29 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 5138 0 0
"3510" "exp3" 1 30 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 3150 28 1
"3510" "exp3" 1 31 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 2599 0 0
"3510" "exp3" 1 32 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 2075 88 1
"3510" "exp3" 1 33 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 4476 0 0
"3510" "exp3" 1 34 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1329 25 1
"3510" "exp3" 1 35 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1290 38 1
"3510" "exp3" 1 36 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 3662 0 0
"3510" "exp3" 1 37 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 2309 0 0
"3510" "exp3" 1 38 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 2344 30 1
"3510" "exp3" 1 39 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 3485 0 0
"3510" "exp3" 1 40 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 3694 0 0
"3510" "exp3" 1 41 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 3174 78 1
"3510" "exp3" 1 42 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 1575 64 1
"3510" "exp3" 1 43 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 3075 29 1
"3510" "exp3" 1 44 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1601 25 1
"3510" "exp3" 1 45 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1722 35 1
"3510" "exp3" 1 46 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 823 35 1
"3510" "exp3" 1 47 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1768 38 1
"3510" "exp3" 1 48 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1751 0 0
"3510" "exp3" 1 49 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 2004 33 1
"3510" "exp3" 1 50 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 2666 43 1
"3510" "exp3" 1 51 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1174 27 1
"3510" "exp3" 1 52 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 3429 18 1
"3510" "exp3" 1 53 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 3568 34 1
"3510" "exp3" 1 54 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2519 31 1
"3510" "exp3" 1 55 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 3208 17 1
"3510" "exp3" 1 56 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2860 0 0
"3510" "exp3" 1 57 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2006 45 1
"3510" "exp3" 1 58 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 8578 0 0
"3510" "exp3" 1 59 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 2336 34 1
"3510" "exp3" 1 60 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 2645 0 0
"3510" "exp3" 1 61 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1597 26 1
"3510" "exp3" 1 62 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1819 0 0
"3510" "exp3" 1 63 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 2755 0 0
"3510" "exp3" 1 64 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 4182 24 1
"3510" "exp3" 1 65 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 5665 0 0
"3510" "exp3" 1 66 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 4293 0 0
"3510" "exp3" 1 67 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 2713 30 1
"3510" "exp3" 1 68 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1636 0 0
"3510" "exp3" 1 69 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 3606 17 1
"3510" "exp3" 1 70 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 3885 0 0
"3510" "exp3" 1 71 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 2321 43 1
"3510" "exp3" 1 72 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 3995 0 0
"3510" "exp3" 1 73 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 2452 0 0
"3510" "exp3" 1 74 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 2044 0 0
"3510" "exp3" 1 75 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 2981 0 0
"3510" "exp3" 1 76 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 7661 26 1
"3510" "exp3" 1 77 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1242 0 0
"3510" "exp3" 1 78 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 2976 23 1
"3510" "exp3" 1 79 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 5077 0 0
"3510" "exp3" 1 80 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 2585 0 0
"3510" "exp3" 1 81 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1690 36 1
"3510" "exp3" 1 82 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 2228 28 1
"3510" "exp3" 1 83 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 4189 0 0
"3510" "exp3" 1 84 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 3462 0 0
"3510" "exp3" 1 85 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 2840 0 0
"3510" "exp3" 1 86 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 3607 0 0
"3510" "exp3" 1 87 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 10737 26 1
"3510" "exp3" 1 88 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 3851 21 1
"3510" "exp3" 1 89 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 4578 27 1
"3510" "exp3" 1 90 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 3274 0 0
"3510" "exp3" 1 91 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1078 39 1
"3510" "exp3" 1 92 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 2727 0 0
"3510" "exp3" 1 93 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 2126 0 0
"3510" "exp3" 1 94 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 3102 45 1
"3510" "exp3" 1 95 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 4021 41 1
"3510" "exp3" 1 96 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 2169 0 0
"3510" "exp3" 1 97 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 2377 30 1
"3510" "exp3" 1 98 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 3500 0 0
"3510" "exp3" 1 99 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 5959 0 0
"3510" "exp3" 1 100 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 3409 0 0
"3510" "exp3" 1 101 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2841 0 0
"3510" "exp3" 1 102 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 2462 21 1
"3510" "exp3" 1 103 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 6106 81 1
"3510" "exp3" 1 104 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 3325 32 1
"3510" "exp3" 1 105 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2161 42 1
"3510" "exp3" 1 106 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 2197 33 1
"3510" "exp3" 1 107 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 2871 0 0
"3510" "exp3" 1 108 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1666 0 0
"3510" "exp3" 1 109 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 4453 21 1
"3510" "exp3" 1 110 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1986 0 0
"3510" "exp3" 1 111 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 2615 0 0
"3510" "exp3" 1 112 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 2724 0 0
"3510" "exp3" 1 113 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 2668 0 0
"3510" "exp3" 1 114 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 4499 94 1
"3510" "exp3" 1 115 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 3269 22 1
"3510" "exp3" 1 116 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 5881 0 0
"3510" "exp3" 1 117 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 3189 25 1
"3510" "exp3" 1 118 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1667 0 0
"3510" "exp3" 1 119 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 2113 0 0
"3510" "exp3" 1 120 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 4562 0 0
"3510" "exp3" 1 121 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 3945 34 1
"3510" "exp3" 1 122 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 4240 77 1
"3510" "exp3" 1 123 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 2574 28 1
"3510" "exp3" 1 124 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1280 32 1
"3510" "exp3" 1 125 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 1651 84 1
"3510" "exp3" 1 126 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1196 31 1
"3510" "exp3" 1 127 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1906 0 0
"3510" "exp3" 1 128 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 4377 0 0
"3510" "exp3" 1 129 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 2016 0 0
"3510" "exp3" 1 130 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 8289 31 1
"3510" "exp3" 1 131 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 3343 0 0
"3510" "exp3" 1 132 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 4249 20 1
"3510" "exp3" 2 1 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1469 31 1
"3510" "exp3" 2 2 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 795 33 1
"3510" "exp3" 2 3 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2271 0 0
"3510" "exp3" 2 4 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 2106 0 0
"3510" "exp3" 2 5 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1877 0 0
"3510" "exp3" 2 6 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 2747 16 1
"3510" "exp3" 2 7 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2347 29 1
"3510" "exp3" 2 8 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 2626 13 1
"3510" "exp3" 2 9 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 2760 0 0
"3510" "exp3" 2 10 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 2017 37 1
"3510" "exp3" 2 11 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 3756 0 0
"3510" "exp3" 2 12 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1734 0 0
"3510" "exp3" 2 13 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 4560 36 1
"3510" "exp3" 2 14 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1483 26 1
"3510" "exp3" 2 15 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 977 0 0
"3510" "exp3" 2 16 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2124 0 0
"3510" "exp3" 2 17 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1572 31 1
"3510" "exp3" 2 18 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 4562 93 1
"3510" "exp3" 2 19 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1218 32 1
"3510" "exp3" 2 20 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1596 0 0
"3510" "exp3" 2 21 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 4332 78 1
"3510" "exp3" 2 22 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 3371 0 0
"3510" "exp3" 2 23 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 7284 0 0
"3510" "exp3" 2 24 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 5810 0 0
"3510" "exp3" 2 25 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 2798 0 0
"3510" "exp3" 2 26 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 24103 0 0
"3510" "exp3" 2 27 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1848 30 1
"3510" "exp3" 2 28 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 2119 0 0
"3510" "exp3" 2 29 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1209 0 0
"3510" "exp3" 2 30 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 2827 29 1
"3510" "exp3" 2 31 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 4828 28 1
"3510" "exp3" 2 32 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 2218 35 1
"3510" "exp3" 2 33 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 5892 76 1
"3510" "exp3" 2 34 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1197 46 1
"3510" "exp3" 2 35 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 3441 0 0
"3510" "exp3" 2 36 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 3319 0 0
"3510" "exp3" 2 37 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 3964 0 0
"3510" "exp3" 2 38 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 2856 29 1
"3510" "exp3" 2 39 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1216 0 0
"3510" "exp3" 2 40 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1929 0 0
"3510" "exp3" 2 41 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 4006 45 1
"3510" "exp3" 2 42 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 6011 43 1
"3510" "exp3" 2 43 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1172 43 1
"3510" "exp3" 2 44 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1697 91 1
"3510" "exp3" 2 45 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 2147 17 1
"3510" "exp3" 2 46 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1640 44 1
"3510" "exp3" 2 47 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 5246 29 1
"3510" "exp3" 2 48 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1743 0 0
"3510" "exp3" 2 49 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 2111 22 1
"3510" "exp3" 2 50 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 3848 0 0
"3510" "exp3" 2 51 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 9369 22 1
"3510" "exp3" 2 52 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 4271 34 1
"3510" "exp3" 2 53 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2446 0 0
"3510" "exp3" 2 54 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 11303 27 1
"3510" "exp3" 2 55 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 2399 0 0
"3510" "exp3" 2 56 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 2859 27 1
"3510" "exp3" 2 57 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 2640 0 0
"3510" "exp3" 2 58 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 2500 20 1
"3510" "exp3" 2 59 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 6031 25 1
"3510" "exp3" 2 60 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 4100 0 0
"3510" "exp3" 2 61 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1912 38 1
"3510" "exp3" 2 62 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 5790 18 1
"3510" "exp3" 2 63 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 7218 24 1
"3510" "exp3" 2 64 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 2134 0 0
"3510" "exp3" 2 65 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 3390 35 1
"3510" "exp3" 2 66 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 2209 25 1
"3510" "exp3" 2 67 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 3491 19 1
"3510" "exp3" 2 68 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 2732 0 0
"3510" "exp3" 2 69 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 3697 48 1
"3510" "exp3" 2 70 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1800 0 0
"3510" "exp3" 2 71 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 3113 26 1
"3510" "exp3" 2 72 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1668 0 0
"3510" "exp3" 2 73 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1061 0 0
"3510" "exp3" 2 74 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2304 31 1
"3510" "exp3" 2 75 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1382 28 1
"3510" "exp3" 2 76 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 4059 0 0
"3510" "exp3" 2 77 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1656 0 0
"3510" "exp3" 2 78 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 3269 0 0
"3510" "exp3" 2 79 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 3932 27 1
"3510" "exp3" 2 80 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 3018 28 1
"3510" "exp3" 2 81 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 2902 77 1
"3510" "exp3" 2 82 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 4154 0 0
"3510" "exp3" 2 83 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 4003 79 1
"3510" "exp3" 2 84 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 4908 19 1
"3510" "exp3" 2 85 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 2135 0 0
"3510" "exp3" 2 86 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 4671 0 0
"3510" "exp3" 2 87 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 2954 0 0
"3510" "exp3" 2 88 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1307 21 1
"3510" "exp3" 2 89 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 934 21 1
"3510" "exp3" 2 90 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 2329 0 0
"3510" "exp3" 2 91 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1372 37 1
"3510" "exp3" 2 92 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 4691 0 0
"3510" "exp3" 2 93 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 4863 0 0
"3510" "exp3" 2 94 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 2468 90 1
"3510" "exp3" 2 95 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1788 24 1
"3510" "exp3" 2 96 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 2168 0 0
"3510" "exp3" 2 97 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 8408 0 0
"3510" "exp3" 2 98 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1863 0 0
"3510" "exp3" 2 99 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1852 45 1
"3510" "exp3" 2 100 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1194 36 1
"3510" "exp3" 2 101 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 2025 15 1
"3510" "exp3" 2 102 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 3004 0 0
"3510" "exp3" 2 103 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 7733 24 1
"3510" "exp3" 2 104 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 2983 35 1
"3510" "exp3" 2 105 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 3139 0 0
"3510" "exp3" 2 106 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1054 0 0
"3510" "exp3" 2 107 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 6177 32 1
"3510" "exp3" 2 108 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1730 0 0
"3510" "exp3" 2 109 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1080 34 1
"3510" "exp3" 2 110 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1469 39 1
"3510" "exp3" 2 111 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 2193 40 1
"3510" "exp3" 2 112 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1214 33 1
"3510" "exp3" 2 113 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 899 0 0
"3510" "exp3" 2 114 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 807 0 0
"3510" "exp3" 2 115 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 2550 0 0
"3510" "exp3" 2 116 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 5599 0 0
"3510" "exp3" 2 117 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 3455 0 0
"3510" "exp3" 2 118 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1994 42 1
"3510" "exp3" 2 119 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1180 0 0
"3510" "exp3" 2 120 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 5091 32 1
"3510" "exp3" 2 121 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1922 25 1
"3510" "exp3" 2 122 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 3600 23 1
"3510" "exp3" 2 123 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 2604 0 0
"3510" "exp3" 2 124 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 2994 11 1
"3510" "exp3" 2 125 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 2021 0 0
"3510" "exp3" 2 126 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 2 1784 0 0
"3510" "exp3" 2 127 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 2317 30 1
"3510" "exp3" 2 128 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 2005 0 0
"3510" "exp3" 2 129 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 2164 0 0
"3510" "exp3" 2 130 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1248 0 0
"3510" "exp3" 2 131 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 2622 91 1
"3510" "exp3" 2 132 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 2796 0 0
"3510" "exp3" 1 1 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1618 0 0
"3510" "exp3" 1 2 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 940 95 1
"3510" "exp3" 1 3 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 899 0 0
"3510" "exp3" 1 4 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 2472 78 1
"3510" "exp3" 1 5 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1084 37 1
"3510" "exp3" 1 6 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1660 27 1
"3510" "exp3" 1 7 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 817 31 1
"3510" "exp3" 1 8 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1090 0 0
"3510" "exp3" 1 9 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1576 0 0
"3510" "exp3" 1 10 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2375 0 0
"3510" "exp3" 1 11 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3641 0 0
"3510" "exp3" 1 12 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 2214 0 0
"3510" "exp3" 1 13 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 3138 95 1
"3510" "exp3" 1 14 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 4486 0 0
"3510" "exp3" 1 15 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 4668 0 0
"3510" "exp3" 1 16 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2646 0 0
"3510" "exp3" 1 17 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 5214 47 1
"3510" "exp3" 1 18 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 7198 0 0
"3510" "exp3" 1 19 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 4364 0 0
"3510" "exp3" 1 20 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 6459 0 0
"3510" "exp3" 1 21 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 4921 0 0
"3510" "exp3" 1 22 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 4789 86 1
"3510" "exp3" 1 23 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 4125 15 1
"3510" "exp3" 1 24 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 3164 82 1
"3510" "exp3" 1 25 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 3098 0 0
"3510" "exp3" 1 26 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 4932 35 1
"3510" "exp3" 1 27 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 3675 26 1
"3510" "exp3" 1 28 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 3569 0 0
"3510" "exp3" 1 29 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2575 23 1
"3510" "exp3" 1 30 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 3165 0 0
"3510" "exp3" 1 31 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2788 19 1
"3510" "exp3" 1 32 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 8494 65 1
"3510" "exp3" 1 33 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1741 0 0
"3510" "exp3" 1 34 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2175 13 1
"3510" "exp3" 1 35 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 8345 0 0
"3510" "exp3" 1 36 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1868 24 1
"3510" "exp3" 1 37 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1649 0 0
"3510" "exp3" 1 38 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 2625 16 1
"3510" "exp3" 1 39 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 2762 0 0
"3510" "exp3" 1 40 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 4437 0 0
"3510" "exp3" 1 41 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 2102 0 0
"3510" "exp3" 1 42 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1547 96 1
"3510" "exp3" 1 43 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 4857 0 0
"3510" "exp3" 1 44 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 3596 0 0
"3510" "exp3" 1 45 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1982 0 0
"3510" "exp3" 1 46 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 3697 91 1
"3510" "exp3" 1 47 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2346 0 0
"3510" "exp3" 1 48 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 9130 0 0
"3510" "exp3" 1 49 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 11171 0 0
"3510" "exp3" 1 50 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 8547 21 1
"3510" "exp3" 1 51 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2992 0 0
"3510" "exp3" 1 52 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 2064 44 1
"3510" "exp3" 1 53 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1499 33 1
"3510" "exp3" 1 54 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1352 77 1
"3510" "exp3" 1 55 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 2321 0 0
"3510" "exp3" 1 56 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2436 36 1
"3510" "exp3" 1 57 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1276 0 0
"3510" "exp3" 1 58 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 6767 45 1
"3510" "exp3" 1 59 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 6841 71 1
"3510" "exp3" 1 60 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 5296 0 0
"3510" "exp3" 1 61 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2899 45 1
"3510" "exp3" 1 62 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 4888 22 1
"3510" "exp3" 1 63 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 6288 0 0
"3510" "exp3" 1 64 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 4306 32 1
"3510" "exp3" 1 65 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1607 0 0
"3510" "exp3" 1 66 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 5014 20 1
"3510" "exp3" 1 67 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 2283 36 1
"3510" "exp3" 1 68 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 3658 30 1
"3510" "exp3" 1 69 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2241 0 0
"3510" "exp3" 1 70 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1846 23 1
"3510" "exp3" 1 71 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 3218 41 1
"3510" "exp3" 1 72 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 3000 38 1
"3510" "exp3" 1 73 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 6941 74 1
"3510" "exp3" 1 74 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 2906 0 0
"3510" "exp3" 1 75 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1850 0 0
"3510" "exp3" 1 76 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 5641 0 0
"3510" "exp3" 1 77 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1613 26 1
"3510" "exp3" 1 78 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 4589 0 0
"3510" "exp3" 1 79 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1758 24 1
"3510" "exp3" 1 80 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 4058 0 0
"3510" "exp3" 1 81 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 6819 70 1
"3510" "exp3" 1 82 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 6404 0 0
"3510" "exp3" 1 83 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 6304 0 0
"3510" "exp3" 1 84 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 3509 0 0
"3510" "exp3" 1 85 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 2621 38 1
"3510" "exp3" 1 86 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2718 89 1
"3510" "exp3" 1 87 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 3550 25 1
"3510" "exp3" 1 88 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 7956 34 1
"3510" "exp3" 1 89 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 5160 70 1
"3510" "exp3" 1 90 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2316 68 1
"3510" "exp3" 1 91 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 3708 0 0
"3510" "exp3" 1 92 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 3654 0 0
"3510" "exp3" 1 93 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1880 0 0
"3510" "exp3" 1 94 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 3871 36 1
"3510" "exp3" 1 95 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 3055 21 1
"3510" "exp3" 1 96 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1495 25 1
"3510" "exp3" 1 97 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1978 43 1
"3510" "exp3" 1 98 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1762 84 1
"3510" "exp3" 1 99 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1702 29 1
"3510" "exp3" 1 100 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1413 17 1
"3510" "exp3" 1 101 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 12148 0 0
"3510" "exp3" 1 102 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 2353 0 0
"3510" "exp3" 1 103 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 8736 76 1
"3510" "exp3" 1 104 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 2633 0 0
"3510" "exp3" 1 105 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 4779 69 1
"3510" "exp3" 1 106 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 2808 0 0
"3510" "exp3" 1 107 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2258 0 0
"3510" "exp3" 1 108 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2461 0 0
"3510" "exp3" 1 109 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 2447 0 0
"3510" "exp3" 1 110 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 4899 0 0
"3510" "exp3" 1 111 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 5169 28 1
"3510" "exp3" 1 112 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 2430 0 0
"3510" "exp3" 1 113 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 2360 37 1
"3510" "exp3" 1 114 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1330 0 0
"3510" "exp3" 1 115 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 3258 83 1
"3510" "exp3" 1 116 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 2995 68 1
"3510" "exp3" 1 117 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1776 0 0
"3510" "exp3" 1 118 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 5060 0 0
"3510" "exp3" 1 119 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2547 35 1
"3510" "exp3" 1 120 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 3732 0 0
"3510" "exp3" 1 121 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2657 0 0
"3510" "exp3" 1 122 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1787 0 0
"3510" "exp3" 1 123 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2929 0 0
"3510" "exp3" 1 124 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 5853 0 0
"3510" "exp3" 1 125 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2285 0 0
"3510" "exp3" 1 126 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2218 0 0
"3510" "exp3" 1 127 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 4633 0 0
"3510" "exp3" 1 128 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2739 40 1
"3510" "exp3" 1 129 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 5289 19 1
"3510" "exp3" 1 130 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 6431 69 1
"3510" "exp3" 1 131 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 5103 0 0
"3510" "exp3" 1 132 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 4369 93 1
"3510" "exp3" 2 1 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1416 28 1
"3510" "exp3" 2 2 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1823 0 0
"3510" "exp3" 2 3 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1614 20 1
"3510" "exp3" 2 4 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1552 0 0
"3510" "exp3" 2 5 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1830 42 1
"3510" "exp3" 2 6 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2509 15 1
"3510" "exp3" 2 7 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 5315 0 0
"3510" "exp3" 2 8 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1572 32 1
"3510" "exp3" 2 9 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2461 0 0
"3510" "exp3" 2 10 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 4687 0 0
"3510" "exp3" 2 11 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3144 0 0
"3510" "exp3" 2 12 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 3628 0 0
"3510" "exp3" 2 13 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 6508 43 1
"3510" "exp3" 2 14 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 2096 0 0
"3510" "exp3" 2 15 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 8086 0 0
"3510" "exp3" 2 16 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 3019 33 1
"3510" "exp3" 2 17 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 2740 0 0
"3510" "exp3" 2 18 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 2327 0 0
"3510" "exp3" 2 19 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 2793 34 1
"3510" "exp3" 2 20 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2644 0 0
"3510" "exp3" 2 21 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2744 0 0
"3510" "exp3" 2 22 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 5665 0 0
"3510" "exp3" 2 23 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 3331 0 0
"3510" "exp3" 2 24 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 2513 0 0
"3510" "exp3" 2 25 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 2412 0 0
"3510" "exp3" 2 26 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 5137 0 0
"3510" "exp3" 2 27 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 3995 0 0
"3510" "exp3" 2 28 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2431 18 1
"3510" "exp3" 2 29 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 3121 26 1
"3510" "exp3" 2 30 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1732 36 1
"3510" "exp3" 2 31 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2607 29 1
"3510" "exp3" 2 32 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 4020 0 0
"3510" "exp3" 2 33 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 2650 0 0
"3510" "exp3" 2 34 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 5572 30 1
"3510" "exp3" 2 35 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 5038 41 1
"3510" "exp3" 2 36 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 3705 0 0
"3510" "exp3" 2 37 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2227 0 0
"3510" "exp3" 2 38 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 4954 0 0
"3510" "exp3" 2 39 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2092 33 1
"3510" "exp3" 2 40 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2202 0 0
"3510" "exp3" 2 41 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 4234 0 0
"3510" "exp3" 2 42 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 6561 35 1
"3510" "exp3" 2 43 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1740 92 1
"3510" "exp3" 2 44 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 10790 80 1
"3510" "exp3" 2 45 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 15203 38 1
"3510" "exp3" 2 46 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 3587 0 0
"3510" "exp3" 2 47 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 963 0 0
"3510" "exp3" 2 48 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2258 0 0
"3510" "exp3" 2 49 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 18913 47 1
"3510" "exp3" 2 50 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 6115 0 0
"3510" "exp3" 2 51 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 3787 0 0
"3510" "exp3" 2 52 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1840 0 0
"3510" "exp3" 2 53 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2982 44 1
"3510" "exp3" 2 54 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 3056 39 1
"3510" "exp3" 2 55 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2306 37 1
"3510" "exp3" 2 56 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 4087 0 0
"3510" "exp3" 2 57 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2917 0 0
"3510" "exp3" 2 58 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 5494 0 0
"3510" "exp3" 2 59 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 11855 0 0
"3510" "exp3" 2 60 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 3177 0 0
"3510" "exp3" 2 61 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 7285 49 1
"3510" "exp3" 2 62 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1687 31 1
"3510" "exp3" 2 63 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1233 0 0
"3510" "exp3" 2 64 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1493 14 1
"3510" "exp3" 2 65 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 11350 77 1
"3510" "exp3" 2 66 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 2316 0 0
"3510" "exp3" 2 67 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 7979 46 1
"3510" "exp3" 2 68 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 5040 88 1
"3510" "exp3" 2 69 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1520 0 0
"3510" "exp3" 2 70 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 3329 55 1
"3510" "exp3" 2 71 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 6252 31 1
"3510" "exp3" 2 72 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 4945 0 0
"3510" "exp3" 2 73 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 6315 0 0
"3510" "exp3" 2 74 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2764 0 0
"3510" "exp3" 2 75 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 8573 87 1
"3510" "exp3" 2 76 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 5686 27 1
"3510" "exp3" 2 77 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 9286 19 1
"3510" "exp3" 2 78 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2545 40 1
"3510" "exp3" 2 79 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2603 20 1
"3510" "exp3" 2 80 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 5896 0 0
"3510" "exp3" 2 81 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 2493 30 1
"3510" "exp3" 2 82 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2650 18 1
"3510" "exp3" 2 83 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 7222 0 0
"3510" "exp3" 2 84 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 7964 0 0
"3510" "exp3" 2 85 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 4122 0 0
"3510" "exp3" 2 86 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 4987 0 0
"3510" "exp3" 2 87 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 2011 94 1
"3510" "exp3" 2 88 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 5313 19 1
"3510" "exp3" 2 89 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1495 0 0
"3510" "exp3" 2 90 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2866 68 1
"3510" "exp3" 2 91 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 7093 45 1
"3510" "exp3" 2 92 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 5023 0 0
"3510" "exp3" 2 93 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 5013 25 1
"3510" "exp3" 2 94 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 1865 0 0
"3510" "exp3" 2 95 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2872 0 0
"3510" "exp3" 2 96 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 2021 21 1
"3510" "exp3" 2 97 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 3637 0 0
"3510" "exp3" 2 98 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 6639 0 0
"3510" "exp3" 2 99 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 2497 85 1
"3510" "exp3" 2 100 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 3279 0 0
"3510" "exp3" 2 101 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 4055 62 1
"3510" "exp3" 2 102 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 3929 0 0
"3510" "exp3" 2 103 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 3388 69 1
"3510" "exp3" 2 104 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 3426 0 0
"3510" "exp3" 2 105 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 6683 66 1
"3510" "exp3" 2 106 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1872 0 0
"3510" "exp3" 2 107 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 5209 0 0
"3510" "exp3" 2 108 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1914 0 0
"3510" "exp3" 2 109 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1691 34 1
"3510" "exp3" 2 110 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 4123 0 0
"3510" "exp3" 2 111 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1835 0 0
"3510" "exp3" 2 112 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1693 21 1
"3510" "exp3" 2 113 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 4561 0 0
"3510" "exp3" 2 114 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 5741 40 1
"3510" "exp3" 2 115 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 5573 0 0
"3510" "exp3" 2 116 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1495 0 0
"3510" "exp3" 2 117 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 4717 0 0
"3510" "exp3" 2 118 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 14203 16 1
"3510" "exp3" 2 119 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2785 36 1
"3510" "exp3" 2 120 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 4860 0 0
"3510" "exp3" 2 121 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 10336 86 1
"3510" "exp3" 2 122 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1561 22 1
"3510" "exp3" 2 123 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1788 26 1
"3510" "exp3" 2 124 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 5743 24 1
"3510" "exp3" 2 125 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 3178 0 0
"3510" "exp3" 2 126 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2417 23 1
"3510" "exp3" 2 127 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1874 0 0
"3510" "exp3" 2 128 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 3087 0 0
"3510" "exp3" 2 129 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1568 22 1
"3510" "exp3" 2 130 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1695 0 0
"3510" "exp3" 2 131 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 4015 0 0
"3510" "exp3" 2 132 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1523 25 1
"3601" "exp3" 1 1 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1218 25 1
"3601" "exp3" 1 2 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1422 22 1
"3601" "exp3" 1 3 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2581 40 1
"3601" "exp3" 1 4 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 952 17 1
"3601" "exp3" 1 5 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 2048 33 1
"3601" "exp3" 1 6 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1166 13 1
"3601" "exp3" 1 7 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 976 0 0
"3601" "exp3" 1 8 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1557 9 1
"3601" "exp3" 1 9 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 1199 6 1
"3601" "exp3" 1 10 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1632 0 0
"3601" "exp3" 1 11 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1856 0 0
"3601" "exp3" 1 12 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1170 21 1
"3601" "exp3" 1 13 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 2826 0 0
"3601" "exp3" 1 14 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 2359 0 0
"3601" "exp3" 1 15 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1161 0 0
"3601" "exp3" 1 16 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 2224 0 0
"3601" "exp3" 1 17 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 1446 0 0
"3601" "exp3" 1 18 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 935 3 1
"3601" "exp3" 1 19 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1735 0 0
"3601" "exp3" 1 20 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1035 7 1
"3601" "exp3" 1 21 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 785 14 1
"3601" "exp3" 1 22 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 939 24 1
"3601" "exp3" 1 23 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1323 0 0
"3601" "exp3" 1 24 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1019 16 1
"3601" "exp3" 1 25 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 810 14 1
"3601" "exp3" 1 26 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 930 0 0
"3601" "exp3" 1 27 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1099 73 1
"3601" "exp3" 1 28 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 925 25 1
"3601" "exp3" 1 29 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1192 16 1
"3601" "exp3" 1 30 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 2452 21 1
"3601" "exp3" 1 31 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 2496 0 0
"3601" "exp3" 1 32 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1082 37 1
"3601" "exp3" 1 33 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1308 22 1
"3601" "exp3" 1 34 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 2347 30 1
"3601" "exp3" 1 35 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 2261 0 0
"3601" "exp3" 1 36 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2668 44 1
"3601" "exp3" 1 37 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1396 40 1
"3601" "exp3" 1 38 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1029 15 1
"3601" "exp3" 1 39 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 967 19 1
"3601" "exp3" 1 40 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 2487 0 0
"3601" "exp3" 1 41 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1087 22 1
"3601" "exp3" 1 42 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1132 17 1
"3601" "exp3" 1 43 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 771 9 1
"3601" "exp3" 1 44 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 884 8 1
"3601" "exp3" 1 45 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 2380 0 0
"3601" "exp3" 1 46 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1014 20 1
"3601" "exp3" 1 47 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 2294 53 1
"3601" "exp3" 1 48 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1880 24 1
"3601" "exp3" 1 49 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1293 0 0
"3601" "exp3" 1 50 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1657 11 1
"3601" "exp3" 1 51 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 2079 23 1
"3601" "exp3" 1 52 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1355 23 1
"3601" "exp3" 1 53 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 893 18 1
"3601" "exp3" 1 54 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1517 0 0
"3601" "exp3" 1 55 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 949 71 1
"3601" "exp3" 1 56 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1124 0 0
"3601" "exp3" 1 57 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1748 31 1
"3601" "exp3" 1 58 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1624 37 1
"3601" "exp3" 1 59 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1470 34 1
"3601" "exp3" 1 60 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1735 41 1
"3601" "exp3" 1 61 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2475 0 0
"3601" "exp3" 1 62 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1447 26 1
"3601" "exp3" 1 63 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1419 0 0
"3601" "exp3" 1 64 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 2401 0 0
"3601" "exp3" 1 65 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1007 0 0
"3601" "exp3" 1 66 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 968 48 1
"3601" "exp3" 1 67 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 2199 4 1
"3601" "exp3" 1 68 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1836 62 1
"3601" "exp3" 1 69 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1539 31 1
"3601" "exp3" 1 70 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1422 36 1
"3601" "exp3" 1 71 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1165 26 1
"3601" "exp3" 1 72 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2029 73 1
"3601" "exp3" 1 73 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1121 19 1
"3601" "exp3" 1 74 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 2897 33 1
"3601" "exp3" 1 75 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 923 15 1
"3601" "exp3" 1 76 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1059 1 1
"3601" "exp3" 1 77 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 2368 19 1
"3601" "exp3" 1 78 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1712 0 0
"3601" "exp3" 1 79 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1226 17 1
"3601" "exp3" 1 80 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 2278 16 1
"3601" "exp3" 1 81 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1910 43 1
"3601" "exp3" 1 82 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1684 29 1
"3601" "exp3" 1 83 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 915 0 0
"3601" "exp3" 1 84 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 960 12 1
"3601" "exp3" 1 85 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1099 19 1
"3601" "exp3" 1 86 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1039 12 1
"3601" "exp3" 1 87 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1223 26 1
"3601" "exp3" 1 88 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1099 10 1
"3601" "exp3" 1 89 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 747 28 1
"3601" "exp3" 1 90 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 782 20 1
"3601" "exp3" 1 91 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 777 17 1
"3601" "exp3" 1 92 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1777 35 1
"3601" "exp3" 1 93 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 595 28 1
"3601" "exp3" 1 94 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 813 0 0
"3601" "exp3" 1 95 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1589 0 0
"3601" "exp3" 1 96 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 781 27 1
"3601" "exp3" 1 97 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1045 22 1
"3601" "exp3" 1 98 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1088 29 1
"3601" "exp3" 1 99 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1426 59 1
"3601" "exp3" 1 100 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 994 11 1
"3601" "exp3" 1 101 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1696 0 0
"3601" "exp3" 1 102 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1410 0 0
"3601" "exp3" 1 103 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1006 27 1
"3601" "exp3" 1 104 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 1539 0 0
"3601" "exp3" 1 105 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 956 0 0
"3601" "exp3" 1 106 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1160 5 1
"3601" "exp3" 1 107 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 2231 0 0
"3601" "exp3" 1 108 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1138 35 1
"3601" "exp3" 1 109 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1347 23 1
"3601" "exp3" 1 110 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1175 10 1
"3601" "exp3" 1 111 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1440 34 1
"3601" "exp3" 1 112 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1411 42 1
"3601" "exp3" 1 113 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1516 0 0
"3601" "exp3" 1 114 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 952 7 1
"3601" "exp3" 1 115 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1347 31 1
"3601" "exp3" 1 116 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 749 5 1
"3601" "exp3" 1 117 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 739 2 1
"3601" "exp3" 1 118 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 738 24 1
"3601" "exp3" 1 119 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1175 34 1
"3601" "exp3" 1 120 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1819 44 1
"3601" "exp3" 1 121 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 711 0 0
"3601" "exp3" 1 122 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 645 0 0
"3601" "exp3" 1 123 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 871 0 0
"3601" "exp3" 1 124 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 647 18 1
"3601" "exp3" 1 125 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 637 21 1
"3601" "exp3" 1 126 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 833 31 1
"3601" "exp3" 1 127 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 878 20 1
"3601" "exp3" 1 128 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 977 15 1
"3601" "exp3" 1 129 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 1881 0 0
"3601" "exp3" 1 130 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1164 8 1
"3601" "exp3" 1 131 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 797 14 1
"3601" "exp3" 1 132 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1845 24 1
"3601" "exp3" 2 1 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1010 25 1
"3601" "exp3" 2 2 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 915 10 1
"3601" "exp3" 2 3 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1721 44 1
"3601" "exp3" 2 4 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 774 6 1
"3601" "exp3" 2 5 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 853 21 1
"3601" "exp3" 2 6 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 856 0 0
"3601" "exp3" 2 7 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1256 31 1
"3601" "exp3" 2 8 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 657 11 1
"3601" "exp3" 2 9 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 1394 51 1
"3601" "exp3" 2 10 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1414 23 1
"3601" "exp3" 2 11 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 862 7 1
"3601" "exp3" 2 12 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 2169 0 0
"3601" "exp3" 2 13 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1945 28 1
"3601" "exp3" 2 14 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 799 21 1
"3601" "exp3" 2 15 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 682 17 1
"3601" "exp3" 2 16 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 761 12 1
"3601" "exp3" 2 17 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 502 22 1
"3601" "exp3" 2 18 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1470 32 1
"3601" "exp3" 2 19 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1530 33 1
"3601" "exp3" 2 20 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 707 23 1
"3601" "exp3" 2 21 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 998 0 0
"3601" "exp3" 2 22 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 597 0 0
"3601" "exp3" 2 23 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1011 25 1
"3601" "exp3" 2 24 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 904 27 1
"3601" "exp3" 2 25 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 2164 36 1
"3601" "exp3" 2 26 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 741 30 1
"3601" "exp3" 2 27 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 824 22 1
"3601" "exp3" 2 28 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 719 0 0
"3601" "exp3" 2 29 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 714 0 0
"3601" "exp3" 2 30 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 808 16 1
"3601" "exp3" 2 31 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 873 0 0
"3601" "exp3" 2 32 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 1244 27 1
"3601" "exp3" 2 33 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 694 13 1
"3601" "exp3" 2 34 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 789 10 1
"3601" "exp3" 2 35 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 2455 31 1
"3601" "exp3" 2 36 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 948 0 0
"3601" "exp3" 2 37 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1686 0 0
"3601" "exp3" 2 38 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1041 29 1
"3601" "exp3" 2 39 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 693 0 0
"3601" "exp3" 2 40 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1118 35 1
"3601" "exp3" 2 41 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1306 0 0
"3601" "exp3" 2 42 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1766 44 1
"3601" "exp3" 2 43 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1094 32 1
"3601" "exp3" 2 44 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1296 75 1
"3601" "exp3" 2 45 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1343 28 1
"3601" "exp3" 2 46 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 853 6 1
"3601" "exp3" 2 47 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 2283 32 1
"3601" "exp3" 2 48 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2602 0 0
"3601" "exp3" 2 49 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1979 42 1
"3601" "exp3" 2 50 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1280 29 1
"3601" "exp3" 2 51 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 652 14 1
"3601" "exp3" 2 52 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1254 9 1
"3601" "exp3" 2 53 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 663 13 1
"3601" "exp3" 2 54 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 638 0 0
"3601" "exp3" 2 55 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1442 29 1
"3601" "exp3" 2 56 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1658 28 1
"3601" "exp3" 2 57 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 807 0 0
"3601" "exp3" 2 58 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 669 24 1
"3601" "exp3" 2 59 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 2452 19 1
"3601" "exp3" 2 60 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1704 45 1
"3601" "exp3" 2 61 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 717 5 1
"3601" "exp3" 2 62 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 726 17 1
"3601" "exp3" 2 63 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 788 1 1
"3601" "exp3" 2 64 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 812 40 1
"3601" "exp3" 2 65 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1213 24 1
"3601" "exp3" 2 66 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 920 19 1
"3601" "exp3" 2 67 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 744 9 1
"3601" "exp3" 2 68 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 902 2 1
"3601" "exp3" 2 69 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 3153 11 1
"3601" "exp3" 2 70 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 970 17 1
"3601" "exp3" 2 71 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2683 40 1
"3601" "exp3" 2 72 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 2365 53 1
"3601" "exp3" 2 73 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1045 39 1
"3601" "exp3" 2 74 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 695 7 1
"3601" "exp3" 2 75 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 699 8 1
"3601" "exp3" 2 76 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1473 17 1
"3601" "exp3" 2 77 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 759 18 1
"3601" "exp3" 2 78 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1787 35 1
"3601" "exp3" 2 79 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 623 0 0
"3601" "exp3" 2 80 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 654 38 1
"3601" "exp3" 2 81 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1115 41 1
"3601" "exp3" 2 82 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 669 3 1
"3601" "exp3" 2 83 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 2073 20 1
"3601" "exp3" 2 84 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1857 0 0
"3601" "exp3" 2 85 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1718 0 0
"3601" "exp3" 2 86 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 1139 57 1
"3601" "exp3" 2 87 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 2084 0 0
"3601" "exp3" 2 88 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1232 31 1
"3601" "exp3" 2 89 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 839 0 0
"3601" "exp3" 2 90 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1255 16 1
"3601" "exp3" 2 91 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1056 0 0
"3601" "exp3" 2 92 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1434 25 1
"3601" "exp3" 2 93 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 672 15 1
"3601" "exp3" 2 94 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 834 26 1
"3601" "exp3" 2 95 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 832 26 1
"3601" "exp3" 2 96 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1854 86 1
"3601" "exp3" 2 97 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1446 0 0
"3601" "exp3" 2 98 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1567 0 0
"3601" "exp3" 2 99 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1019 26 1
"3601" "exp3" 2 100 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 681 15 1
"3601" "exp3" 2 101 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 2035 77 1
"3601" "exp3" 2 102 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1385 34 1
"3601" "exp3" 2 103 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 646 27 1
"3601" "exp3" 2 104 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 558 33 1
"3601" "exp3" 2 105 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 874 0 0
"3601" "exp3" 2 106 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2652 45 1
"3601" "exp3" 2 107 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 773 12 1
"3601" "exp3" 2 108 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 598 21 1
"3601" "exp3" 2 109 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1183 20 1
"3601" "exp3" 2 110 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1878 0 0
"3601" "exp3" 2 111 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1713 22 1
"3601" "exp3" 2 112 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 2206 22 1
"3601" "exp3" 2 113 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 2272 85 1
"3601" "exp3" 2 114 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 888 23 1
"3601" "exp3" 2 115 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2418 48 1
"3601" "exp3" 2 116 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 804 18 1
"3601" "exp3" 2 117 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1540 33 1
"3601" "exp3" 2 118 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1213 32 1
"3601" "exp3" 2 119 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1056 30 1
"3601" "exp3" 2 120 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1432 36 1
"3601" "exp3" 2 121 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1283 0 0
"3601" "exp3" 2 122 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 986 34 1
"3601" "exp3" 2 123 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 869 0 0
"3601" "exp3" 2 124 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1277 79 1
"3601" "exp3" 2 125 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 856 20 1
"3601" "exp3" 2 126 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1885 43 1
"3601" "exp3" 2 127 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 745 16 1
"3601" "exp3" 2 128 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 877 31 1
"3601" "exp3" 2 129 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 742 14 1
"3601" "exp3" 2 130 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1671 19 1
"3601" "exp3" 2 131 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 687 36 1
"3601" "exp3" 2 132 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 806 18 1
"3601" "exp3" 1 1 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 750 5 1
"3601" "exp3" 1 2 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 2137 40 1
"3601" "exp3" 1 3 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 974 29 1
"3601" "exp3" 1 4 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 2049 0 0
"3601" "exp3" 1 5 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 941 34 1
"3601" "exp3" 1 6 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1467 31 1
"3601" "exp3" 1 7 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 2267 0 0
"3601" "exp3" 1 8 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 2114 0 0
"3601" "exp3" 1 9 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 824 15 1
"3601" "exp3" 1 10 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 2349 32 1
"3601" "exp3" 1 11 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1389 0 0
"3601" "exp3" 1 12 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 2428 31 1
"3601" "exp3" 1 13 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 990 42 1
"3601" "exp3" 1 14 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 922 0 0
"3601" "exp3" 1 15 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 992 13 1
"3601" "exp3" 1 16 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2354 0 0
"3601" "exp3" 1 17 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1067 0 0
"3601" "exp3" 1 18 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 638 1 1
"3601" "exp3" 1 19 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 2150 23 1
"3601" "exp3" 1 20 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 710 26 1
"3601" "exp3" 1 21 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 912 19 1
"3601" "exp3" 1 22 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 897 20 1
"3601" "exp3" 1 23 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1331 28 1
"3601" "exp3" 1 24 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1228 0 0
"3601" "exp3" 1 25 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 843 25 1
"3601" "exp3" 1 26 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 897 33 1
"3601" "exp3" 1 27 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 643 24 1
"3601" "exp3" 1 28 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1557 0 0
"3601" "exp3" 1 29 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1042 11 1
"3601" "exp3" 1 30 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 775 18 1
"3601" "exp3" 1 31 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 687 0 0
"3601" "exp3" 1 32 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 789 17 1
"3601" "exp3" 1 33 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 837 37 1
"3601" "exp3" 1 34 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1228 48 1
"3601" "exp3" 1 35 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 794 9 1
"3601" "exp3" 1 36 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1768 41 1
"3601" "exp3" 1 37 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 868 19 1
"3601" "exp3" 1 38 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 773 32 1
"3601" "exp3" 1 39 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 1942 62 1
"3601" "exp3" 1 40 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 827 15 1
"3601" "exp3" 1 41 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 838 16 1
"3601" "exp3" 1 42 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 709 28 1
"3601" "exp3" 1 43 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 750 23 1
"3601" "exp3" 1 44 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 889 13 1
"3601" "exp3" 1 45 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1199 39 1
"3601" "exp3" 1 46 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 765 0 0
"3601" "exp3" 1 47 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1430 0 0
"3601" "exp3" 1 48 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 667 12 1
"3601" "exp3" 1 49 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 835 3 1
"3601" "exp3" 1 50 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 2289 29 1
"3601" "exp3" 1 51 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1401 0 0
"3601" "exp3" 1 52 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1858 10 1
"3601" "exp3" 1 53 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1357 28 1
"3601" "exp3" 1 54 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 960 0 0
"3601" "exp3" 1 55 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1730 37 1
"3601" "exp3" 1 56 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 2522 0 0
"3601" "exp3" 1 57 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 950 6 1
"3601" "exp3" 1 58 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1503 46 1
"3601" "exp3" 1 59 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 972 35 1
"3601" "exp3" 1 60 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 827 20 1
"3601" "exp3" 1 61 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 755 18 1
"3601" "exp3" 1 62 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1131 33 1
"3601" "exp3" 1 63 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 663 27 1
"3601" "exp3" 1 64 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1215 0 0
"3601" "exp3" 1 65 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 1007 8 1
"3601" "exp3" 1 66 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 983 32 1
"3601" "exp3" 1 67 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 897 30 1
"3601" "exp3" 1 68 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 667 6 1
"3601" "exp3" 1 69 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1081 31 1
"3601" "exp3" 1 70 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 670 29 1
"3601" "exp3" 1 71 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 588 22 1
"3601" "exp3" 1 72 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 921 0 0
"3601" "exp3" 1 73 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 1105 71 1
"3601" "exp3" 1 74 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 717 0 0
"3601" "exp3" 1 75 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 761 4 1
"3601" "exp3" 1 76 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 859 22 1
"3601" "exp3" 1 77 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1573 68 1
"3601" "exp3" 1 78 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 597 34 1
"3601" "exp3" 1 79 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 645 17 1
"3601" "exp3" 1 80 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1870 38 1
"3601" "exp3" 1 81 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 586 16 1
"3601" "exp3" 1 82 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 557 0 0
"3601" "exp3" 1 83 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 770 41 1
"3601" "exp3" 1 84 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 646 8 1
"3601" "exp3" 1 85 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 778 21 1
"3601" "exp3" 1 86 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 717 14 1
"3601" "exp3" 1 87 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 761 0 0
"3601" "exp3" 1 88 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1561 72 1
"3601" "exp3" 1 89 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 568 10 1
"3601" "exp3" 1 90 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1727 0 0
"3601" "exp3" 1 91 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 853 25 1
"3601" "exp3" 1 92 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 601 30 1
"3601" "exp3" 1 93 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 644 22 1
"3601" "exp3" 1 94 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2194 37 1
"3601" "exp3" 1 95 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 762 16 1
"3601" "exp3" 1 96 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 973 7 1
"3601" "exp3" 1 97 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1432 33 1
"3601" "exp3" 1 98 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 913 14 1
"3601" "exp3" 1 99 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 601 0 0
"3601" "exp3" 1 100 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 669 17 1
"3601" "exp3" 1 101 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 597 7 1
"3601" "exp3" 1 102 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1270 0 0
"3601" "exp3" 1 103 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1466 0 0
"3601" "exp3" 1 104 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1077 0 0
"3601" "exp3" 1 105 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 868 0 0
"3601" "exp3" 1 106 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 607 26 1
"3601" "exp3" 1 107 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1042 44 1
"3601" "exp3" 1 108 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1567 0 0
"3601" "exp3" 1 109 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 680 0 0
"3601" "exp3" 1 110 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 607 5 1
"3601" "exp3" 1 111 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1213 0 0
"3601" "exp3" 1 112 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 906 13 1
"3601" "exp3" 1 113 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1463 0 0
"3601" "exp3" 1 114 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 931 11 1
"3601" "exp3" 1 115 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 638 19 1
"3601" "exp3" 1 116 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1316 21 1
"3601" "exp3" 1 117 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1548 36 1
"3601" "exp3" 1 118 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1907 39 1
"3601" "exp3" 1 119 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 674 0 0
"3601" "exp3" 1 120 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 678 23 1
"3601" "exp3" 1 121 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 884 26 1
"3601" "exp3" 1 122 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 872 26 1
"3601" "exp3" 1 123 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 860 12 1
"3601" "exp3" 1 124 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 718 24 1
"3601" "exp3" 1 125 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 594 0 0
"3601" "exp3" 1 126 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 980 9 1
"3601" "exp3" 1 127 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 731 0 0
"3601" "exp3" 1 128 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 721 18 1
"3601" "exp3" 1 129 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1023 0 0
"3601" "exp3" 1 130 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 743 18 1
"3601" "exp3" 1 131 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 530 24 1
"3601" "exp3" 1 132 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 855 19 1
"3601" "exp3" 2 1 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 817 19 1
"3601" "exp3" 2 2 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 727 27 1
"3601" "exp3" 2 3 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 529 0 0
"3601" "exp3" 2 4 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 518 22 1
"3601" "exp3" 2 5 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1061 0 0
"3601" "exp3" 2 6 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 779 27 1
"3601" "exp3" 2 7 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1095 0 0
"3601" "exp3" 2 8 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 682 0 0
"3601" "exp3" 2 9 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 1150 0 0
"3601" "exp3" 2 10 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 629 28 1
"3601" "exp3" 2 11 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 2214 63 1
"3601" "exp3" 2 12 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 686 15 1
"3601" "exp3" 2 13 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1012 0 0
"3601" "exp3" 2 14 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 634 31 1
"3601" "exp3" 2 15 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 512 5 1
"3601" "exp3" 2 16 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 675 21 1
"3601" "exp3" 2 17 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 929 0 0
"3601" "exp3" 2 18 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 748 45 1
"3601" "exp3" 2 19 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 762 18 1
"3601" "exp3" 2 20 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 930 26 1
"3601" "exp3" 2 21 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 993 20 1
"3601" "exp3" 2 22 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 856 36 1
"3601" "exp3" 2 23 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 851 17 1
"3601" "exp3" 2 24 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 902 17 1
"3601" "exp3" 2 25 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 594 0 0
"3601" "exp3" 2 26 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 881 20 1
"3601" "exp3" 2 27 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 564 20 1
"3601" "exp3" 2 28 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 467 8 1
"3601" "exp3" 2 29 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 979 33 1
"3601" "exp3" 2 30 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 474 24 1
"3601" "exp3" 2 31 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 1209 0 0
"3601" "exp3" 2 32 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 576 14 1
"3601" "exp3" 2 33 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 591 7 1
"3601" "exp3" 2 34 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 2651 0 0
"3601" "exp3" 2 35 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1417 40 1
"3601" "exp3" 2 36 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1358 31 1
"3601" "exp3" 2 37 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 2289 0 0
"3601" "exp3" 2 38 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 675 26 1
"3601" "exp3" 2 39 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1417 29 1
"3601" "exp3" 2 40 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 779 29 1
"3601" "exp3" 2 41 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 2689 0 0
"3601" "exp3" 2 42 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 609 27 1
"3601" "exp3" 2 43 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 925 41 1
"3601" "exp3" 2 44 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 1105 6 1
"3601" "exp3" 2 45 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 3463 0 0
"3601" "exp3" 2 46 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 808 0 0
"3601" "exp3" 2 47 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 676 21 1
"3601" "exp3" 2 48 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 606 0 0
"3601" "exp3" 2 49 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 598 21 1
"3601" "exp3" 2 50 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 891 49 1
"3601" "exp3" 2 51 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 630 15 1
"3601" "exp3" 2 52 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1199 48 1
"3601" "exp3" 2 53 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1156 0 0
"3601" "exp3" 2 54 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 751 36 1
"3601" "exp3" 2 55 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 664 30 1
"3601" "exp3" 2 56 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1002 18 1
"3601" "exp3" 2 57 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 807 16 1
"3601" "exp3" 2 58 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1925 25 1
"3601" "exp3" 2 59 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 766 89 1
"3601" "exp3" 2 60 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1426 23 1
"3601" "exp3" 2 61 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 805 11 1
"3601" "exp3" 2 62 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 659 19 1
"3601" "exp3" 2 63 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1439 0 0
"3601" "exp3" 2 64 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 659 1 1
"3601" "exp3" 2 65 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 2945 33 1
"3601" "exp3" 2 66 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 2437 72 1
"3601" "exp3" 2 67 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 642 23 1
"3601" "exp3" 2 68 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 668 12 1
"3601" "exp3" 2 69 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 644 6 1
"3601" "exp3" 2 70 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1527 0 0
"3601" "exp3" 2 71 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1061 22 1
"3601" "exp3" 2 72 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 874 24 1
"3601" "exp3" 2 73 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 939 0 0
"3601" "exp3" 2 74 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 825 29 1
"3601" "exp3" 2 75 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 726 3 1
"3601" "exp3" 2 76 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 813 14 1
"3601" "exp3" 2 77 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1574 35 1
"3601" "exp3" 2 78 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1605 35 1
"3601" "exp3" 2 79 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1034 38 1
"3601" "exp3" 2 80 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 704 38 1
"3601" "exp3" 2 81 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 734 9 1
"3601" "exp3" 2 82 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1020 31 1
"3601" "exp3" 2 83 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1356 20 1
"3601" "exp3" 2 84 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1914 0 0
"3601" "exp3" 2 85 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1534 35 1
"3601" "exp3" 2 86 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 886 0 0
"3601" "exp3" 2 87 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1425 28 1
"3601" "exp3" 2 88 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 922 24 1
"3601" "exp3" 2 89 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1290 0 0
"3601" "exp3" 2 90 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 697 13 1
"3601" "exp3" 2 91 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 578 18 1
"3601" "exp3" 2 92 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 665 0 0
"3601" "exp3" 2 93 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1835 45 1
"3601" "exp3" 2 94 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 724 15 1
"3601" "exp3" 2 95 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 951 33 1
"3601" "exp3" 2 96 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1712 84 1
"3601" "exp3" 2 97 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 674 22 1
"3601" "exp3" 2 98 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1057 29 1
"3601" "exp3" 2 99 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 519 23 1
"3601" "exp3" 2 100 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 926 5 1
"3601" "exp3" 2 101 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 2621 2 1
"3601" "exp3" 2 102 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1065 21 1
"3601" "exp3" 2 103 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1674 13 1
"3601" "exp3" 2 104 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1067 8 1
"3601" "exp3" 2 105 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1336 17 1
"3601" "exp3" 2 106 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1825 34 1
"3601" "exp3" 2 107 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 946 0 0
"3601" "exp3" 2 108 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 610 0 0
"3601" "exp3" 2 109 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 779 16 1
"3601" "exp3" 2 110 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 851 22 1
"3601" "exp3" 2 111 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 1908 0 0
"3601" "exp3" 2 112 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1287 17 1
"3601" "exp3" 2 113 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1903 0 0
"3601" "exp3" 2 114 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1591 19 1
"3601" "exp3" 2 115 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 714 32 1
"3601" "exp3" 2 116 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 789 18 1
"3601" "exp3" 2 117 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1034 37 1
"3601" "exp3" 2 118 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1033 36 1
"3601" "exp3" 2 119 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1584 33 1
"3601" "exp3" 2 120 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1409 7 1
"3601" "exp3" 2 121 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1995 24 1
"3601" "exp3" 2 122 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 2013 0 0
"3601" "exp3" 2 123 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1427 27 1
"3601" "exp3" 2 124 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1142 0 0
"3601" "exp3" 2 125 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 2940 19 1
"3601" "exp3" 2 126 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1221 12 1
"3601" "exp3" 2 127 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1816 4 1
"3601" "exp3" 2 128 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2654 0 0
"3601" "exp3" 2 129 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 930 28 1
"3601" "exp3" 2 130 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 805 26 1
"3601" "exp3" 2 131 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 931 14 1
"3601" "exp3" 2 132 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1968 75 1
"3601" "exp3" 1 1 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 448 0 0
"3601" "exp3" 1 2 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1013 0 0
"3601" "exp3" 1 3 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 717 17 1
"3601" "exp3" 1 4 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 638 0 0
"3601" "exp3" 1 5 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 463 0 0
"3601" "exp3" 1 6 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 684 0 0
"3601" "exp3" 1 7 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 832 22 1
"3601" "exp3" 1 8 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 693 31 1
"3601" "exp3" 1 9 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 731 25 1
"3601" "exp3" 1 10 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 879 0 0
"3601" "exp3" 1 11 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 794 32 1
"3601" "exp3" 1 12 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 853 40 1
"3601" "exp3" 1 13 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1083 0 0
"3601" "exp3" 1 14 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 884 31 1
"3601" "exp3" 1 15 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 999 17 1
"3601" "exp3" 1 16 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 910 30 1
"3601" "exp3" 1 17 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 900 21 1
"3601" "exp3" 1 18 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 711 0 0
"3601" "exp3" 1 19 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 632 24 1
"3601" "exp3" 1 20 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1061 0 0
"3601" "exp3" 1 21 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 434 0 0
"3601" "exp3" 1 22 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 514 19 1
"3601" "exp3" 1 23 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 900 19 1
"3601" "exp3" 1 24 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 677 4 1
"3601" "exp3" 1 25 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 820 11 1
"3601" "exp3" 1 26 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 564 0 0
"3601" "exp3" 1 27 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1797 0 0
"3601" "exp3" 1 28 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 692 0 0
"3601" "exp3" 1 29 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 661 24 1
"3601" "exp3" 1 30 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 525 17 1
"3601" "exp3" 1 31 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 802 32 1
"3601" "exp3" 1 32 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 727 35 1
"3601" "exp3" 1 33 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 782 18 1
"3601" "exp3" 1 34 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 937 0 0
"3601" "exp3" 1 35 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1470 11 1
"3601" "exp3" 1 36 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 746 21 1
"3601" "exp3" 1 37 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 2220 0 0
"3601" "exp3" 1 38 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 2006 0 0
"3601" "exp3" 1 39 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 604 20 1
"3601" "exp3" 1 40 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1077 35 1
"3601" "exp3" 1 41 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2469 0 0
"3601" "exp3" 1 42 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 877 23 1
"3601" "exp3" 1 43 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 690 0 0
"3601" "exp3" 1 44 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 637 0 0
"3601" "exp3" 1 45 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 550 31 1
"3601" "exp3" 1 46 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 2111 16 1
"3601" "exp3" 1 47 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1636 86 1
"3601" "exp3" 1 48 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 694 19 1
"3601" "exp3" 1 49 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 549 15 1
"3601" "exp3" 1 50 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 641 0 0
"3601" "exp3" 1 51 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1074 19 1
"3601" "exp3" 1 52 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1383 37 1
"3601" "exp3" 1 53 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1281 8 1
"3601" "exp3" 1 54 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2201 49 1
"3601" "exp3" 1 55 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 915 26 1
"3601" "exp3" 1 56 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 713 30 1
"3601" "exp3" 1 57 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 843 30 1
"3601" "exp3" 1 58 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 605 0 0
"3601" "exp3" 1 59 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1089 23 1
"3601" "exp3" 1 60 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 765 0 0
"3601" "exp3" 1 61 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 1062 6 1
"3601" "exp3" 1 62 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 2440 9 1
"3601" "exp3" 1 63 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 551 22 1
"3601" "exp3" 1 64 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 919 27 1
"3601" "exp3" 1 65 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 945 38 1
"3601" "exp3" 1 66 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 571 18 1
"3601" "exp3" 1 67 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 535 0 0
"3601" "exp3" 1 68 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 956 0 0
"3601" "exp3" 1 69 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 514 0 0
"3601" "exp3" 1 70 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 561 15 1
"3601" "exp3" 1 71 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 525 10 1
"3601" "exp3" 1 72 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 864 12 1
"3601" "exp3" 1 73 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 757 16 1
"3601" "exp3" 1 74 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 613 0 0
"3601" "exp3" 1 75 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 542 29 1
"3601" "exp3" 1 76 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 973 0 0
"3601" "exp3" 1 77 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 729 7 1
"3601" "exp3" 1 78 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 546 0 0
"3601" "exp3" 1 79 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 675 0 0
"3601" "exp3" 1 80 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 613 22 1
"3601" "exp3" 1 81 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 560 0 0
"3601" "exp3" 1 82 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 548 47 1
"3601" "exp3" 1 83 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 623 0 0
"3601" "exp3" 1 84 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 688 8 1
"3601" "exp3" 1 85 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 565 1 1
"3601" "exp3" 1 86 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 683 0 0
"3601" "exp3" 1 87 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 769 13 1
"3601" "exp3" 1 88 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1073 26 1
"3601" "exp3" 1 89 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 887 43 1
"3601" "exp3" 1 90 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 594 0 0
"3601" "exp3" 1 91 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1097 28 1
"3601" "exp3" 1 92 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 552 28 1
"3601" "exp3" 1 93 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 799 0 0
"3601" "exp3" 1 94 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 515 7 1
"3601" "exp3" 1 95 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 805 0 0
"3601" "exp3" 1 96 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 608 25 1
"3601" "exp3" 1 97 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 582 13 1
"3601" "exp3" 1 98 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1230 29 1
"3601" "exp3" 1 99 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 868 18 1
"3601" "exp3" 1 100 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 780 18 1
"3601" "exp3" 1 101 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 805 17 1
"3601" "exp3" 1 102 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1196 42 1
"3601" "exp3" 1 103 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 771 0 0
"3601" "exp3" 1 104 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 918 0 0
"3601" "exp3" 1 105 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 581 26 1
"3601" "exp3" 1 106 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 690 0 0
"3601" "exp3" 1 107 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 592 0 0
"3601" "exp3" 1 108 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 896 9 1
"3601" "exp3" 1 109 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 516 6 1
"3601" "exp3" 1 110 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 840 44 1
"3601" "exp3" 1 111 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 493 0 0
"3601" "exp3" 1 112 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 673 0 0
"3601" "exp3" 1 113 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 572 26 1
"3601" "exp3" 1 114 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 845 23 1
"3601" "exp3" 1 115 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 536 20 1
"3601" "exp3" 1 116 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 467 14 1
"3601" "exp3" 1 117 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 932 42 1
"3601" "exp3" 1 118 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 496 0 0
"3601" "exp3" 1 119 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 530 34 1
"3601" "exp3" 1 120 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 548 15 1
"3601" "exp3" 1 121 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 681 27 1
"3601" "exp3" 1 122 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 655 41 1
"3601" "exp3" 1 123 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 626 39 1
"3601" "exp3" 1 124 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 519 0 0
"3601" "exp3" 1 125 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 428 45 1
"3601" "exp3" 1 126 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 658 0 0
"3601" "exp3" 1 127 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 520 32 1
"3601" "exp3" 1 128 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 594 2 1
"3601" "exp3" 1 129 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 579 25 1
"3601" "exp3" 1 130 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 837 0 0
"3601" "exp3" 1 131 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 501 0 0
"3601" "exp3" 1 132 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 423 0 0
"3601" "exp3" 2 1 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 568 15 1
"3601" "exp3" 2 2 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 390 5 1
"3601" "exp3" 2 3 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 757 26 1
"3601" "exp3" 2 4 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 376 8 1
"3601" "exp3" 2 5 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1004 33 1
"3601" "exp3" 2 6 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 505 23 1
"3601" "exp3" 2 7 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 912 0 0
"3601" "exp3" 2 8 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 427 25 1
"3601" "exp3" 2 9 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 506 29 1
"3601" "exp3" 2 10 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 503 20 1
"3601" "exp3" 2 11 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 619 41 1
"3601" "exp3" 2 12 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 551 22 1
"3601" "exp3" 2 13 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 374 17 1
"3601" "exp3" 2 14 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 496 7 1
"3601" "exp3" 2 15 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 510 0 0
"3601" "exp3" 2 16 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 600 25 1
"3601" "exp3" 2 17 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 394 24 1
"3601" "exp3" 2 18 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 517 0 0
"3601" "exp3" 2 19 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 414 1 1
"3601" "exp3" 2 20 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 333 12 1
"3601" "exp3" 2 21 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 333 0 0
"3601" "exp3" 2 22 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 522 43 1
"3601" "exp3" 2 23 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 652 0 0
"3601" "exp3" 2 24 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 697 0 0
"3601" "exp3" 2 25 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 587 44 1
"3601" "exp3" 2 26 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 518 29 1
"3601" "exp3" 2 27 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 764 0 0
"3601" "exp3" 2 28 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 1420 7 1
"3601" "exp3" 2 29 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 757 21 1
"3601" "exp3" 2 30 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 803 0 0
"3601" "exp3" 2 31 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1154 18 1
"3601" "exp3" 2 32 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 960 0 0
"3601" "exp3" 2 33 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 681 17 1
"3601" "exp3" 2 34 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 629 22 1
"3601" "exp3" 2 35 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1636 34 1
"3601" "exp3" 2 36 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 606 23 1
"3601" "exp3" 2 37 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 644 0 0
"3601" "exp3" 2 38 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1196 10 1
"3601" "exp3" 2 39 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1774 0 0
"3601" "exp3" 2 40 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 666 42 1
"3601" "exp3" 2 41 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 528 39 1
"3601" "exp3" 2 42 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 951 18 1
"3601" "exp3" 2 43 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1770 13 1
"3601" "exp3" 2 44 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1155 43 1
"3601" "exp3" 2 45 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1170 0 0
"3601" "exp3" 2 46 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 777 4 1
"3601" "exp3" 2 47 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 628 0 0
"3601" "exp3" 2 48 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 477 30 1
"3601" "exp3" 2 49 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1378 0 0
"3601" "exp3" 2 50 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 421 31 1
"3601" "exp3" 2 51 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1268 33 1
"3601" "exp3" 2 52 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 911 32 1
"3601" "exp3" 2 53 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1037 20 1
"3601" "exp3" 2 54 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2105 49 1
"3601" "exp3" 2 55 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 615 33 1
"3601" "exp3" 2 56 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 556 6 1
"3601" "exp3" 2 57 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 769 24 1
"3601" "exp3" 2 58 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 545 28 1
"3601" "exp3" 2 59 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 641 13 1
"3601" "exp3" 2 60 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 656 28 1
"3601" "exp3" 2 61 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 672 0 0
"3601" "exp3" 2 62 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 541 0 0
"3601" "exp3" 2 63 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 502 12 1
"3601" "exp3" 2 64 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 428 19 1
"3601" "exp3" 2 65 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 337 0 0
"3601" "exp3" 2 66 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 404 0 0
"3601" "exp3" 2 67 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 984 16 1
"3601" "exp3" 2 68 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 599 41 1
"3601" "exp3" 2 69 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 801 0 0
"3601" "exp3" 2 70 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 558 15 1
"3601" "exp3" 2 71 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 697 35 1
"3601" "exp3" 2 72 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1354 0 0
"3601" "exp3" 2 73 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 531 0 0
"3601" "exp3" 2 74 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 665 9 1
"3601" "exp3" 2 75 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 572 21 1
"3601" "exp3" 2 76 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1132 25 1
"3601" "exp3" 2 77 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1072 31 1
"3601" "exp3" 2 78 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1298 14 1
"3601" "exp3" 2 79 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1089 0 0
"3601" "exp3" 2 80 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 732 2 1
"3601" "exp3" 2 81 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 676 16 1
"3601" "exp3" 2 82 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 562 17 1
"3601" "exp3" 2 83 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 757 24 1
"3601" "exp3" 2 84 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 707 0 0
"3601" "exp3" 2 85 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 756 26 1
"3601" "exp3" 2 86 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 937 22 1
"3601" "exp3" 2 87 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1480 0 0
"3601" "exp3" 2 88 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 729 25 1
"3601" "exp3" 2 89 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 672 24 1
"3601" "exp3" 2 90 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 2763 0 0
"3601" "exp3" 2 91 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 617 5 1
"3601" "exp3" 2 92 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 518 19 1
"3601" "exp3" 2 93 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 479 29 1
"3601" "exp3" 2 94 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1433 42 1
"3601" "exp3" 2 95 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 567 18 1
"3601" "exp3" 2 96 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 703 46 1
"3601" "exp3" 2 97 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 749 13 1
"3601" "exp3" 2 98 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 493 6 1
"3601" "exp3" 2 99 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 569 36 1
"3601" "exp3" 2 100 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 627 38 1
"3601" "exp3" 2 101 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 511 0 0
"3601" "exp3" 2 102 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1172 0 0
"3601" "exp3" 2 103 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 800 0 0
"3601" "exp3" 2 104 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 597 10 1
"3601" "exp3" 2 105 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 770 33 1
"3601" "exp3" 2 106 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 589 0 0
"3601" "exp3" 2 107 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1404 0 0
"3601" "exp3" 2 108 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 725 27 1
"3601" "exp3" 2 109 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1071 35 1
"3601" "exp3" 2 110 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1498 79 1
"3601" "exp3" 2 111 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1285 34 1
"3601" "exp3" 2 112 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 570 0 0
"3601" "exp3" 2 113 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 986 40 1
"3601" "exp3" 2 114 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 560 3 1
"3601" "exp3" 2 115 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 792 32 1
"3601" "exp3" 2 116 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1026 0 0
"3601" "exp3" 2 117 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 769 16 1
"3601" "exp3" 2 118 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1148 37 1
"3601" "exp3" 2 119 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1066 26 1
"3601" "exp3" 2 120 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1160 9 1
"3601" "exp3" 2 121 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 656 11 1
"3601" "exp3" 2 122 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 876 30 1
"3601" "exp3" 2 123 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1229 11 1
"3601" "exp3" 2 124 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 619 22 1
"3601" "exp3" 2 125 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 892 0 0
"3601" "exp3" 2 126 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 516 14 1
"3601" "exp3" 2 127 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 820 28 1
"3601" "exp3" 2 128 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 773 35 1
"3601" "exp3" 2 129 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 600 0 0
"3601" "exp3" 2 130 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 542 15 1
"3601" "exp3" 2 131 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 600 8 1
"3601" "exp3" 2 132 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 924 36 1
"3601" "exp3" 1 1 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 597 10 1
"3601" "exp3" 1 2 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1995 45 1
"3601" "exp3" 1 3 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 541 0 0
"3601" "exp3" 1 4 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 442 22 1
"3601" "exp3" 1 5 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 487 20 1
"3601" "exp3" 1 6 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 422 17 1
"3601" "exp3" 1 7 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 448 0 0
"3601" "exp3" 1 8 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 657 0 0
"3601" "exp3" 1 9 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 841 25 1
"3601" "exp3" 1 10 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 778 0 0
"3601" "exp3" 1 11 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 771 32 1
"3601" "exp3" 1 12 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 564 13 1
"3601" "exp3" 1 13 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1369 0 0
"3601" "exp3" 1 14 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 726 0 0
"3601" "exp3" 1 15 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 730 39 1
"3601" "exp3" 1 16 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 498 31 1
"3601" "exp3" 1 17 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 481 14 1
"3601" "exp3" 1 18 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 544 0 0
"3601" "exp3" 1 19 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 454 22 1
"3601" "exp3" 1 20 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 732 46 1
"3601" "exp3" 1 21 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 915 23 1
"3601" "exp3" 1 22 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 511 0 0
"3601" "exp3" 1 23 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 472 0 0
"3601" "exp3" 1 24 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 450 13 1
"3601" "exp3" 1 25 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 504 8 1
"3601" "exp3" 1 26 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 412 19 1
"3601" "exp3" 1 27 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 771 25 1
"3601" "exp3" 1 28 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 784 49 1
"3601" "exp3" 1 29 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 625 29 1
"3601" "exp3" 1 30 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 792 11 1
"3601" "exp3" 1 31 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 480 8 1
"3601" "exp3" 1 32 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 989 21 1
"3601" "exp3" 1 33 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 598 0 0
"3601" "exp3" 1 34 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 778 14 1
"3601" "exp3" 1 35 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 622 34 1
"3601" "exp3" 1 36 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 518 28 1
"3601" "exp3" 1 37 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1206 39 1
"3601" "exp3" 1 38 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 855 24 1
"3601" "exp3" 1 39 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 717 15 1
"3601" "exp3" 1 40 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 795 0 0
"3601" "exp3" 1 41 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 858 41 1
"3601" "exp3" 1 42 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 773 0 0
"3601" "exp3" 1 43 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 800 23 1
"3601" "exp3" 1 44 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 422 17 1
"3601" "exp3" 1 45 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 633 33 1
"3601" "exp3" 1 46 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 495 0 0
"3601" "exp3" 1 47 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 483 15 1
"3601" "exp3" 1 48 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 548 17 1
"3601" "exp3" 1 49 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 579 6 1
"3601" "exp3" 1 50 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 861 22 1
"3601" "exp3" 1 51 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 609 18 1
"3601" "exp3" 1 52 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 508 30 1
"3601" "exp3" 1 53 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 608 11 1
"3601" "exp3" 1 54 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 1481 0 0
"3601" "exp3" 1 55 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 578 25 1
"3601" "exp3" 1 56 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1297 31 1
"3601" "exp3" 1 57 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 665 21 1
"3601" "exp3" 1 58 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 627 30 1
"3601" "exp3" 1 59 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 770 0 0
"3601" "exp3" 1 60 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 659 0 0
"3601" "exp3" 1 61 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 748 0 0
"3601" "exp3" 1 62 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 786 0 0
"3601" "exp3" 1 63 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 643 24 1
"3601" "exp3" 1 64 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 702 10 1
"3601" "exp3" 1 65 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 646 21 1
"3601" "exp3" 1 66 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 864 9 1
"3601" "exp3" 1 67 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 625 37 1
"3601" "exp3" 1 68 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 621 33 1
"3601" "exp3" 1 69 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 804 16 1
"3601" "exp3" 1 70 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 620 0 0
"3601" "exp3" 1 71 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1042 35 1
"3601" "exp3" 1 72 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 941 0 0
"3601" "exp3" 1 73 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 634 27 1
"3601" "exp3" 1 74 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 570 0 0
"3601" "exp3" 1 75 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 656 31 1
"3601" "exp3" 1 76 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 578 26 1
"3601" "exp3" 1 77 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 801 12 1
"3601" "exp3" 1 78 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 847 0 0
"3601" "exp3" 1 79 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 641 36 1
"3601" "exp3" 1 80 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 819 7 1
"3601" "exp3" 1 81 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 561 7 1
"3601" "exp3" 1 82 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 490 0 0
"3601" "exp3" 1 83 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1200 33 1
"3601" "exp3" 1 84 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 679 40 1
"3601" "exp3" 1 85 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 690 34 1
"3601" "exp3" 1 86 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 652 16 1
"3601" "exp3" 1 87 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 619 5 1
"3601" "exp3" 1 88 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1282 43 1
"3601" "exp3" 1 89 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 673 17 1
"3601" "exp3" 1 90 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 780 29 1
"3601" "exp3" 1 91 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 846 0 0
"3601" "exp3" 1 92 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 637 18 1
"3601" "exp3" 1 93 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1219 67 1
"3601" "exp3" 1 94 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 601 26 1
"3601" "exp3" 1 95 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 508 0 0
"3601" "exp3" 1 96 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 472 26 1
"3601" "exp3" 1 97 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 636 0 0
"3601" "exp3" 1 98 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 619 0 0
"3601" "exp3" 1 99 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 484 23 1
"3601" "exp3" 1 100 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1751 44 1
"3601" "exp3" 1 101 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 632 16 1
"3601" "exp3" 1 102 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 681 3 1
"3601" "exp3" 1 103 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 706 21 1
"3601" "exp3" 1 104 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 752 38 1
"3601" "exp3" 1 105 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 611 24 1
"3601" "exp3" 1 106 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 818 0 0
"3601" "exp3" 1 107 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 527 6 1
"3601" "exp3" 1 108 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 536 25 1
"3601" "exp3" 1 109 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 483 20 1
"3601" "exp3" 1 110 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 717 26 1
"3601" "exp3" 1 111 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 519 28 1
"3601" "exp3" 1 112 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 969 29 1
"3601" "exp3" 1 113 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 584 0 0
"3601" "exp3" 1 114 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 662 27 1
"3601" "exp3" 1 115 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 721 0 0
"3601" "exp3" 1 116 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 612 9 1
"3601" "exp3" 1 117 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 832 0 0
"3601" "exp3" 1 118 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1325 72 1
"3601" "exp3" 1 119 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 769 4 1
"3601" "exp3" 1 120 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 656 36 1
"3601" "exp3" 1 121 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 771 0 0
"3601" "exp3" 1 122 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1246 42 1
"3601" "exp3" 1 123 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 728 35 1
"3601" "exp3" 1 124 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 593 23 1
"3601" "exp3" 1 125 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 519 0 0
"3601" "exp3" 1 126 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 659 5 1
"3601" "exp3" 1 127 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 746 22 1
"3601" "exp3" 1 128 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1674 0 0
"3601" "exp3" 1 129 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 552 18 1
"3601" "exp3" 1 130 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 865 27 1
"3601" "exp3" 1 131 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 564 18 1
"3601" "exp3" 1 132 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 515 12 1
"3601" "exp3" 2 1 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 468 20 1
"3601" "exp3" 2 2 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 448 15 1
"3601" "exp3" 2 3 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 555 0 0
"3601" "exp3" 2 4 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 524 0 0
"3601" "exp3" 2 5 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 560 29 1
"3601" "exp3" 2 6 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 572 26 1
"3601" "exp3" 2 7 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 547 0 0
"3601" "exp3" 2 8 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 635 28 1
"3601" "exp3" 2 9 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 564 0 0
"3601" "exp3" 2 10 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 617 25 1
"3601" "exp3" 2 11 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 543 6 1
"3601" "exp3" 2 12 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 927 21 1
"3601" "exp3" 2 13 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 572 32 1
"3601" "exp3" 2 14 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 825 25 1
"3601" "exp3" 2 15 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 546 0 0
"3601" "exp3" 2 16 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 684 0 0
"3601" "exp3" 2 17 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 495 0 0
"3601" "exp3" 2 18 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 588 0 0
"3601" "exp3" 2 19 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 422 1 1
"3601" "exp3" 2 20 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 543 35 1
"3601" "exp3" 2 21 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 617 41 1
"3601" "exp3" 2 22 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 519 13 1
"3601" "exp3" 2 23 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 529 14 1
"3601" "exp3" 2 24 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1027 16 1
"3601" "exp3" 2 25 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 641 0 0
"3601" "exp3" 2 26 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 493 18 1
"3601" "exp3" 2 27 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 486 3 1
"3601" "exp3" 2 28 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 723 0 0
"3601" "exp3" 2 29 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 681 18 1
"3601" "exp3" 2 30 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 473 5 1
"3601" "exp3" 2 31 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 539 19 1
"3601" "exp3" 2 32 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 481 11 1
"3601" "exp3" 2 33 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1181 31 1
"3601" "exp3" 2 34 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 567 34 1
"3601" "exp3" 2 35 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 472 23 1
"3601" "exp3" 2 36 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1500 43 1
"3601" "exp3" 2 37 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 597 0 0
"3601" "exp3" 2 38 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 2345 51 1
"3601" "exp3" 2 39 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 650 28 1
"3601" "exp3" 2 40 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 640 18 1
"3601" "exp3" 2 41 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 873 17 1
"3601" "exp3" 2 42 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1280 0 0
"3601" "exp3" 2 43 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 565 28 1
"3601" "exp3" 2 44 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 650 0 0
"3601" "exp3" 2 45 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 737 20 1
"3601" "exp3" 2 46 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 650 33 1
"3601" "exp3" 2 47 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 595 0 0
"3601" "exp3" 2 48 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 476 0 0
"3601" "exp3" 2 49 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 475 16 1
"3601" "exp3" 2 50 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 515 23 1
"3601" "exp3" 2 51 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 2045 61 1
"3601" "exp3" 2 52 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 781 46 1
"3601" "exp3" 2 53 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 548 37 1
"3601" "exp3" 2 54 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 534 19 1
"3601" "exp3" 2 55 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 520 23 1
"3601" "exp3" 2 56 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 501 8 1
"3601" "exp3" 2 57 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 766 20 1
"3601" "exp3" 2 58 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 581 22 1
"3601" "exp3" 2 59 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1059 0 0
"3601" "exp3" 2 60 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 450 20 1
"3601" "exp3" 2 61 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1692 69 1
"3601" "exp3" 2 62 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 700 33 1
"3601" "exp3" 2 63 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 662 42 1
"3601" "exp3" 2 64 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 463 71 1
"3601" "exp3" 2 65 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 769 15 1
"3601" "exp3" 2 66 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 557 27 1
"3601" "exp3" 2 67 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 842 0 0
"3601" "exp3" 2 68 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 491 19 1
"3601" "exp3" 2 69 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 528 8 1
"3601" "exp3" 2 70 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 452 0 0
"3601" "exp3" 2 71 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 414 0 0
"3601" "exp3" 2 72 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 617 35 1
"3601" "exp3" 2 73 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 744 38 1
"3601" "exp3" 2 74 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 552 25 1
"3601" "exp3" 2 75 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1076 27 1
"3601" "exp3" 2 76 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 503 14 1
"3601" "exp3" 2 77 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 582 4 1
"3601" "exp3" 2 78 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 498 0 0
"3601" "exp3" 2 79 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 726 5 1
"3601" "exp3" 2 80 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 861 0 0
"3601" "exp3" 2 81 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 495 21 1
"3601" "exp3" 2 82 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 967 0 0
"3601" "exp3" 2 83 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 539 13 1
"3601" "exp3" 2 84 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 913 0 0
"3601" "exp3" 2 85 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 2302 36 1
"3601" "exp3" 2 86 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 549 10 1
"3601" "exp3" 2 87 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 516 24 1
"3601" "exp3" 2 88 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 637 26 1
"3601" "exp3" 2 89 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 516 9 1
"3601" "exp3" 2 90 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 491 24 1
"3601" "exp3" 2 91 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1504 0 0
"3601" "exp3" 2 92 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1016 26 1
"3601" "exp3" 2 93 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 535 15 1
"3601" "exp3" 2 94 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 532 27 1
"3601" "exp3" 2 95 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 495 21 1
"3601" "exp3" 2 96 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 548 35 1
"3601" "exp3" 2 97 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 530 0 0
"3601" "exp3" 2 98 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 667 47 1
"3601" "exp3" 2 99 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 516 0 0
"3601" "exp3" 2 100 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 688 10 1
"3601" "exp3" 2 101 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 491 6 1
"3601" "exp3" 2 102 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1158 32 1
"3601" "exp3" 2 103 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1901 0 0
"3601" "exp3" 2 104 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 884 32 1
"3601" "exp3" 2 105 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 681 22 1
"3601" "exp3" 2 106 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 628 0 0
"3601" "exp3" 2 107 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2141 0 0
"3601" "exp3" 2 108 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 995 43 1
"3601" "exp3" 2 109 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 598 16 1
"3601" "exp3" 2 110 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 527 0 0
"3601" "exp3" 2 111 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1244 36 1
"3601" "exp3" 2 112 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 933 48 1
"3601" "exp3" 2 113 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 620 0 0
"3601" "exp3" 2 114 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 711 17 1
"3601" "exp3" 2 115 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 814 29 1
"3601" "exp3" 2 116 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 454 9 1
"3601" "exp3" 2 117 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 604 30 1
"3601" "exp3" 2 118 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 863 24 1
"3601" "exp3" 2 119 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 957 25 1
"3601" "exp3" 2 120 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 488 31 1
"3601" "exp3" 2 121 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 629 0 0
"3601" "exp3" 2 122 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 764 0 0
"3601" "exp3" 2 123 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 527 40 1
"3601" "exp3" 2 124 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 579 40 1
"3601" "exp3" 2 125 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 560 12 1
"3601" "exp3" 2 126 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 460 27 1
"3601" "exp3" 2 127 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 446 7 1
"3601" "exp3" 2 128 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 683 26 1
"3601" "exp3" 2 129 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 519 45 1
"3601" "exp3" 2 130 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 898 41 1
"3601" "exp3" 2 131 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1008 0 0
"3601" "exp3" 2 132 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 664 0 0
"3602" "exp3" 1 1 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 630 27 1
"3602" "exp3" 1 2 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1037 0 0
"3602" "exp3" 1 3 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 679 14 1
"3602" "exp3" 1 4 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1060 0 0
"3602" "exp3" 1 5 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 926 0 0
"3602" "exp3" 1 6 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 769 0 0
"3602" "exp3" 1 7 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 683 8 1
"3602" "exp3" 1 8 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 981 16 1
"3602" "exp3" 1 9 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 662 0 0
"3602" "exp3" 1 10 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 905 33 1
"3602" "exp3" 1 11 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 961 23 1
"3602" "exp3" 1 12 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 691 24 1
"3602" "exp3" 1 13 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 628 75 1
"3602" "exp3" 1 14 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 697 0 0
"3602" "exp3" 1 15 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 828 0 0
"3602" "exp3" 1 16 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 549 92 1
"3602" "exp3" 1 17 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 553 0 0
"3602" "exp3" 1 18 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 778 0 0
"3602" "exp3" 1 19 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1120 0 0
"3602" "exp3" 1 20 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 710 0 0
"3602" "exp3" 1 21 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 717 26 1
"3602" "exp3" 1 22 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 703 38 1
"3602" "exp3" 1 23 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 802 18 1
"3602" "exp3" 1 24 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 605 42 1
"3602" "exp3" 1 25 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 698 45 1
"3602" "exp3" 1 26 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 578 11 1
"3602" "exp3" 1 27 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 659 0 0
"3602" "exp3" 1 28 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 506 0 0
"3602" "exp3" 1 29 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 788 46 1
"3602" "exp3" 1 30 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 609 22 1
"3602" "exp3" 1 31 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 722 44 1
"3602" "exp3" 1 32 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 830 45 1
"3602" "exp3" 1 33 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 834 0 0
"3602" "exp3" 1 34 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 665 0 0
"3602" "exp3" 1 35 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 904 0 0
"3602" "exp3" 1 36 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 584 83 1
"3602" "exp3" 1 37 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 675 30 1
"3602" "exp3" 1 38 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1007 34 1
"3602" "exp3" 1 39 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 698 17 1
"3602" "exp3" 1 40 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 457 0 0
"3602" "exp3" 1 41 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 571 0 0
"3602" "exp3" 1 42 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 856 0 0
"3602" "exp3" 1 43 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 699 0 0
"3602" "exp3" 1 44 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 723 18 1
"3602" "exp3" 1 45 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 669 0 0
"3602" "exp3" 1 46 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 685 15 1
"3602" "exp3" 1 47 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 717 13 1
"3602" "exp3" 1 48 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 573 63 1
"3602" "exp3" 1 49 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 666 82 1
"3602" "exp3" 1 50 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 598 0 0
"3602" "exp3" 1 51 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 434 0 0
"3602" "exp3" 1 52 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 423 0 0
"3602" "exp3" 1 53 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 395 0 0
"3602" "exp3" 1 54 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 520 0 0
"3602" "exp3" 1 55 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 544 12 1
"3602" "exp3" 1 56 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 558 4 1
"3602" "exp3" 1 57 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 496 0 0
"3602" "exp3" 1 58 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 570 3 1
"3602" "exp3" 1 59 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 780 0 0
"3602" "exp3" 1 60 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 540 94 1
"3602" "exp3" 1 61 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 516 0 0
"3602" "exp3" 1 62 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 378 0 0
"3602" "exp3" 1 63 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 429 0 0
"3602" "exp3" 1 64 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 454 29 1
"3602" "exp3" 1 65 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 672 0 0
"3602" "exp3" 1 66 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 726 22 1
"3602" "exp3" 1 67 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 452 0 0
"3602" "exp3" 1 68 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 562 0 0
"3602" "exp3" 1 69 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 719 25 1
"3602" "exp3" 1 70 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 728 31 1
"3602" "exp3" 1 71 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 756 26 1
"3602" "exp3" 1 72 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 664 0 0
"3602" "exp3" 1 73 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 665 29 1
"3602" "exp3" 1 74 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 880 0 0
"3602" "exp3" 1 75 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 614 53 1
"3602" "exp3" 1 76 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 756 0 0
"3602" "exp3" 1 77 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 880 0 0
"3602" "exp3" 1 78 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 555 0 0
"3602" "exp3" 1 79 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 643 31 1
"3602" "exp3" 1 80 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 720 13 1
"3602" "exp3" 1 81 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 611 17 1
"3602" "exp3" 1 82 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 532 0 0
"3602" "exp3" 1 83 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 627 21 1
"3602" "exp3" 1 84 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 690 0 0
"3602" "exp3" 1 85 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 625 0 0
"3602" "exp3" 1 86 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 501 0 0
"3602" "exp3" 1 87 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 650 28 1
"3602" "exp3" 1 88 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 499 20 1
"3602" "exp3" 1 89 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 487 22 1
"3602" "exp3" 1 90 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 1117 0 0
"3602" "exp3" 1 91 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 844 32 1
"3602" "exp3" 1 92 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 685 0 0
"3602" "exp3" 1 93 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 713 48 1
"3602" "exp3" 1 94 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 497 0 0
"3602" "exp3" 1 95 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 618 0 0
"3602" "exp3" 1 96 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 963 0 0
"3602" "exp3" 1 97 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 552 18 1
"3602" "exp3" 1 98 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 597 0 0
"3602" "exp3" 1 99 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 614 0 0
"3602" "exp3" 1 100 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 575 0 0
"3602" "exp3" 1 101 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1286 0 0
"3602" "exp3" 1 102 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 952 41 1
"3602" "exp3" 1 103 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 850 35 1
"3602" "exp3" 1 104 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 835 0 0
"3602" "exp3" 1 105 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 601 0 0
"3602" "exp3" 1 106 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 899 24 1
"3602" "exp3" 1 107 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 825 42 1
"3602" "exp3" 1 108 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 807 0 0
"3602" "exp3" 1 109 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 730 27 1
"3602" "exp3" 1 110 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 1316 5 1
"3602" "exp3" 1 111 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 869 0 0
"3602" "exp3" 1 112 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 687 21 1
"3602" "exp3" 1 113 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 402 0 0
"3602" "exp3" 1 114 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 653 0 0
"3602" "exp3" 1 115 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 872 0 0
"3602" "exp3" 1 116 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 883 10 1
"3602" "exp3" 1 117 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1294 13 1
"3602" "exp3" 1 118 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 819 66 1
"3602" "exp3" 1 119 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 415 49 1
"3602" "exp3" 1 120 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 665 76 1
"3602" "exp3" 1 121 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 845 44 1
"3602" "exp3" 1 122 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 514 19 1
"3602" "exp3" 1 123 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 534 32 1
"3602" "exp3" 1 124 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 795 19 1
"3602" "exp3" 1 125 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1280 0 0
"3602" "exp3" 1 126 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 713 0 0
"3602" "exp3" 1 127 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 927 20 1
"3602" "exp3" 1 128 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1262 0 0
"3602" "exp3" 1 129 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 662 32 1
"3602" "exp3" 1 130 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 1130 6 1
"3602" "exp3" 1 131 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 591 0 0
"3602" "exp3" 1 132 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 712 0 0
"3602" "exp3" 2 1 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1002 0 0
"3602" "exp3" 2 2 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 693 0 0
"3602" "exp3" 2 3 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 892 18 1
"3602" "exp3" 2 4 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 831 30 1
"3602" "exp3" 2 5 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 847 16 1
"3602" "exp3" 2 6 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 582 0 0
"3602" "exp3" 2 7 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 724 19 1
"3602" "exp3" 2 8 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 900 54 1
"3602" "exp3" 2 9 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 624 75 1
"3602" "exp3" 2 10 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 978 0 0
"3602" "exp3" 2 11 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 971 0 0
"3602" "exp3" 2 12 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 496 0 0
"3602" "exp3" 2 13 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 653 33 1
"3602" "exp3" 2 14 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 698 7 1
"3602" "exp3" 2 15 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 707 31 1
"3602" "exp3" 2 16 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 759 0 0
"3602" "exp3" 2 17 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 621 0 0
"3602" "exp3" 2 18 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 542 24 1
"3602" "exp3" 2 19 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 718 29 1
"3602" "exp3" 2 20 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 503 16 1
"3602" "exp3" 2 21 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 998 0 0
"3602" "exp3" 2 22 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 492 32 1
"3602" "exp3" 2 23 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 896 15 1
"3602" "exp3" 2 24 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 834 29 1
"3602" "exp3" 2 25 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 642 0 0
"3602" "exp3" 2 26 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 892 0 0
"3602" "exp3" 2 27 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 892 0 0
"3602" "exp3" 2 28 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 644 0 0
"3602" "exp3" 2 29 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 987 0 0
"3602" "exp3" 2 30 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 812 32 1
"3602" "exp3" 2 31 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 544 17 1
"3602" "exp3" 2 32 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 804 0 0
"3602" "exp3" 2 33 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 512 0 0
"3602" "exp3" 2 34 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 550 35 1
"3602" "exp3" 2 35 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 576 3 1
"3602" "exp3" 2 36 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 554 16 1
"3602" "exp3" 2 37 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 646 55 1
"3602" "exp3" 2 38 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 604 67 1
"3602" "exp3" 2 39 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 889 26 1
"3602" "exp3" 2 40 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 664 33 1
"3602" "exp3" 2 41 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 703 0 0
"3602" "exp3" 2 42 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 952 69 1
"3602" "exp3" 2 43 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 898 10 1
"3602" "exp3" 2 44 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 705 30 1
"3602" "exp3" 2 45 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 657 31 1
"3602" "exp3" 2 46 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 556 27 1
"3602" "exp3" 2 47 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 778 0 0
"3602" "exp3" 2 48 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 694 29 1
"3602" "exp3" 2 49 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 708 36 1
"3602" "exp3" 2 50 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 503 27 1
"3602" "exp3" 2 51 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 646 0 0
"3602" "exp3" 2 52 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 534 12 1
"3602" "exp3" 2 53 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 578 28 1
"3602" "exp3" 2 54 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 574 0 0
"3602" "exp3" 2 55 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 637 0 0
"3602" "exp3" 2 56 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 552 0 0
"3602" "exp3" 2 57 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 882 21 1
"3602" "exp3" 2 58 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 490 0 0
"3602" "exp3" 2 59 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 743 0 0
"3602" "exp3" 2 60 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 1368 0 0
"3602" "exp3" 2 61 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 731 18 1
"3602" "exp3" 2 62 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 593 8 1
"3602" "exp3" 2 63 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 750 0 0
"3602" "exp3" 2 64 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 596 14 1
"3602" "exp3" 2 65 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 675 0 0
"3602" "exp3" 2 66 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 585 21 1
"3602" "exp3" 2 67 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 570 23 1
"3602" "exp3" 2 68 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 678 17 1
"3602" "exp3" 2 69 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 551 25 1
"3602" "exp3" 2 70 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 914 11 1
"3602" "exp3" 2 71 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 523 42 1
"3602" "exp3" 2 72 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 716 17 1
"3602" "exp3" 2 73 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 532 19 1
"3602" "exp3" 2 74 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 957 14 1
"3602" "exp3" 2 75 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 444 8 1
"3602" "exp3" 2 76 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 824 40 1
"3602" "exp3" 2 77 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 809 0 0
"3602" "exp3" 2 78 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 816 82 1
"3602" "exp3" 2 79 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 801 0 0
"3602" "exp3" 2 80 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 690 76 1
"3602" "exp3" 2 81 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 838 0 0
"3602" "exp3" 2 82 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 908 0 0
"3602" "exp3" 2 83 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 785 6 1
"3602" "exp3" 2 84 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 759 36 1
"3602" "exp3" 2 85 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 2 837 0 0
"3602" "exp3" 2 86 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1037 0 0
"3602" "exp3" 2 87 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 558 30 1
"3602" "exp3" 2 88 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 536 0 0
"3602" "exp3" 2 89 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 582 0 0
"3602" "exp3" 2 90 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 531 13 1
"3602" "exp3" 2 91 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 522 1 1
"3602" "exp3" 2 92 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 790 19 1
"3602" "exp3" 2 93 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1035 75 1
"3602" "exp3" 2 94 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 944 0 0
"3602" "exp3" 2 95 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 623 44 1
"3602" "exp3" 2 96 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 905 18 1
"3602" "exp3" 2 97 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 890 0 0
"3602" "exp3" 2 98 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 693 73 1
"3602" "exp3" 2 99 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 406 0 0
"3602" "exp3" 2 100 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 538 0 0
"3602" "exp3" 2 101 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 847 14 1
"3602" "exp3" 2 102 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 520 0 0
"3602" "exp3" 2 103 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 769 31 1
"3602" "exp3" 2 104 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 620 78 1
"3602" "exp3" 2 105 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 558 5 1
"3602" "exp3" 2 106 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 615 6 1
"3602" "exp3" 2 107 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 796 47 1
"3602" "exp3" 2 108 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 644 0 0
"3602" "exp3" 2 109 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 658 0 0
"3602" "exp3" 2 110 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 708 0 0
"3602" "exp3" 2 111 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 689 0 0
"3602" "exp3" 2 112 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 675 35 1
"3602" "exp3" 2 113 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 519 2 1
"3602" "exp3" 2 114 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 705 20 1
"3602" "exp3" 2 115 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 601 72 1
"3602" "exp3" 2 116 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 763 59 1
"3602" "exp3" 2 117 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1001 0 0
"3602" "exp3" 2 118 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 562 25 1
"3602" "exp3" 2 119 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 491 9 1
"3602" "exp3" 2 120 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 809 10 1
"3602" "exp3" 2 121 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 993 52 1
"3602" "exp3" 2 122 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 951 0 0
"3602" "exp3" 2 123 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1084 0 0
"3602" "exp3" 2 124 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 779 20 1
"3602" "exp3" 2 125 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 814 9 1
"3602" "exp3" 2 126 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 910 5 1
"3602" "exp3" 2 127 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 776 0 0
"3602" "exp3" 2 128 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 808 0 0
"3602" "exp3" 2 129 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 462 13 1
"3602" "exp3" 2 130 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 548 36 1
"3602" "exp3" 2 131 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1031 0 0
"3602" "exp3" 2 132 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 891 0 0
"3602" "exp3" 1 1 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 494 26 1
"3602" "exp3" 1 2 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 367 0 0
"3602" "exp3" 1 3 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 402 23 1
"3602" "exp3" 1 4 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 328 36 1
"3602" "exp3" 1 5 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 368 42 1
"3602" "exp3" 1 6 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 323 19 1
"3602" "exp3" 1 7 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 302 0 0
"3602" "exp3" 1 8 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 357 8 1
"3602" "exp3" 1 9 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 364 41 1
"3602" "exp3" 1 10 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 505 0 0
"3602" "exp3" 1 11 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 349 38 1
"3602" "exp3" 1 12 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 479 39 1
"3602" "exp3" 1 13 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 455 0 0
"3602" "exp3" 1 14 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 369 45 1
"3602" "exp3" 1 15 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 394 18 1
"3602" "exp3" 1 16 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 534 0 0
"3602" "exp3" 1 17 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 383 14 1
"3602" "exp3" 1 18 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 398 31 1
"3602" "exp3" 1 19 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 511 10 1
"3602" "exp3" 1 20 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 590 0 0
"3602" "exp3" 1 21 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 388 16 1
"3602" "exp3" 1 22 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 424 40 1
"3602" "exp3" 1 23 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 507 22 1
"3602" "exp3" 1 24 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 372 34 1
"3602" "exp3" 1 25 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 449 0 0
"3602" "exp3" 1 26 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 424 2 1
"3602" "exp3" 1 27 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 519 0 0
"3602" "exp3" 1 28 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 679 0 0
"3602" "exp3" 1 29 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 353 0 0
"3602" "exp3" 1 30 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 555 13 1
"3602" "exp3" 1 31 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 324 19 1
"3602" "exp3" 1 32 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 329 0 0
"3602" "exp3" 1 33 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 342 23 1
"3602" "exp3" 1 34 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 383 27 1
"3602" "exp3" 1 35 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 484 0 0
"3602" "exp3" 1 36 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 384 38 1
"3602" "exp3" 1 37 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 623 0 0
"3602" "exp3" 1 38 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 436 0 0
"3602" "exp3" 1 39 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 637 0 0
"3602" "exp3" 1 40 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 523 0 0
"3602" "exp3" 1 41 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 471 0 0
"3602" "exp3" 1 42 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 396 14 1
"3602" "exp3" 1 43 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 356 36 1
"3602" "exp3" 1 44 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 410 44 1
"3602" "exp3" 1 45 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 839 19 1
"3602" "exp3" 1 46 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 416 12 1
"3602" "exp3" 1 47 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 383 33 1
"3602" "exp3" 1 48 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 360 23 1
"3602" "exp3" 1 49 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 374 37 1
"3602" "exp3" 1 50 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 486 17 1
"3602" "exp3" 1 51 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 502 0 0
"3602" "exp3" 1 52 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 438 28 1
"3602" "exp3" 1 53 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 379 33 1
"3602" "exp3" 1 54 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 381 40 1
"3602" "exp3" 1 55 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 470 10 1
"3602" "exp3" 1 56 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 426 35 1
"3602" "exp3" 1 57 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 457 35 1
"3602" "exp3" 1 58 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 360 18 1
"3602" "exp3" 1 59 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 401 30 1
"3602" "exp3" 1 60 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 574 0 0
"3602" "exp3" 1 61 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 449 0 0
"3602" "exp3" 1 62 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 293 0 0
"3602" "exp3" 1 63 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 423 0 0
"3602" "exp3" 1 64 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 373 0 0
"3602" "exp3" 1 65 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 353 0 0
"3602" "exp3" 1 66 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 452 0 0
"3602" "exp3" 1 67 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 417 46 1
"3602" "exp3" 1 68 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 515 36 1
"3602" "exp3" 1 69 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 397 0 0
"3602" "exp3" 1 70 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 359 0 0
"3602" "exp3" 1 71 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 394 4 1
"3602" "exp3" 1 72 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 568 0 0
"3602" "exp3" 1 73 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 332 9 1
"3602" "exp3" 1 74 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 395 29 1
"3602" "exp3" 1 75 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 482 31 1
"3602" "exp3" 1 76 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 627 29 1
"3602" "exp3" 1 77 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 438 22 1
"3602" "exp3" 1 78 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 359 21 1
"3602" "exp3" 1 79 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 366 20 1
"3602" "exp3" 1 80 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 468 37 1
"3602" "exp3" 1 81 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 411 28 1
"3602" "exp3" 1 82 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 437 0 0
"3602" "exp3" 1 83 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 351 0 0
"3602" "exp3" 1 84 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 262 9 1
"3602" "exp3" 1 85 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 345 13 1
"3602" "exp3" 1 86 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 307 0 0
"3602" "exp3" 1 87 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 729 0 0
"3602" "exp3" 1 88 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 356 17 1
"3602" "exp3" 1 89 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 378 6 1
"3602" "exp3" 1 90 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 463 0 0
"3602" "exp3" 1 91 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 397 30 1
"3602" "exp3" 1 92 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 383 5 1
"3602" "exp3" 1 93 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 303 8 1
"3602" "exp3" 1 94 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 329 5 1
"3602" "exp3" 1 95 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 324 43 1
"3602" "exp3" 1 96 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 365 1 1
"3602" "exp3" 1 97 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 322 18 1
"3602" "exp3" 1 98 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 399 0 0
"3602" "exp3" 1 99 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 393 0 0
"3602" "exp3" 1 100 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 368 25 1
"3602" "exp3" 1 101 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 279 7 1
"3602" "exp3" 1 102 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 346 15 1
"3602" "exp3" 1 103 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 365 24 1
"3602" "exp3" 1 104 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 366 20 1
"3602" "exp3" 1 105 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 577 0 0
"3602" "exp3" 1 106 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 341 0 0
"3602" "exp3" 1 107 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 391 20 1
"3602" "exp3" 1 108 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 419 27 1
"3602" "exp3" 1 109 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 408 21 1
"3602" "exp3" 1 110 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 456 37 1
"3602" "exp3" 1 111 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 509 76 1
"3602" "exp3" 1 112 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 365 20 1
"3602" "exp3" 1 113 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 349 26 1
"3602" "exp3" 1 114 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 357 0 0
"3602" "exp3" 1 115 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 376 7 1
"3602" "exp3" 1 116 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 344 49 1
"3602" "exp3" 1 117 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 384 0 0
"3602" "exp3" 1 118 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 339 0 0
"3602" "exp3" 1 119 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 372 32 1
"3602" "exp3" 1 120 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 349 12 1
"3602" "exp3" 1 121 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 455 97 1
"3602" "exp3" 1 122 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 492 39 1
"3602" "exp3" 1 123 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 320 6 1
"3602" "exp3" 1 124 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 346 0 0
"3602" "exp3" 1 125 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 364 0 0
"3602" "exp3" 1 126 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 326 30 1
"3602" "exp3" 1 127 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 315 16 1
"3602" "exp3" 1 128 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 400 29 1
"3602" "exp3" 1 129 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 456 0 0
"3602" "exp3" 1 130 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 386 0 0
"3602" "exp3" 1 131 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 345 34 1
"3602" "exp3" 1 132 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 415 0 0
"3602" "exp3" 2 1 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 491 30 1
"3602" "exp3" 2 2 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 400 34 1
"3602" "exp3" 2 3 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 331 26 1
"3602" "exp3" 2 4 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 397 0 0
"3602" "exp3" 2 5 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 331 0 0
"3602" "exp3" 2 6 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 356 15 1
"3602" "exp3" 2 7 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 356 39 1
"3602" "exp3" 2 8 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 361 0 0
"3602" "exp3" 2 9 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 488 74 1
"3602" "exp3" 2 10 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 432 21 1
"3602" "exp3" 2 11 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 295 0 0
"3602" "exp3" 2 12 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 293 1 1
"3602" "exp3" 2 13 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 338 44 1
"3602" "exp3" 2 14 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 466 0 0
"3602" "exp3" 2 15 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 409 29 1
"3602" "exp3" 2 16 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 331 23 1
"3602" "exp3" 2 17 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 248 24 1
"3602" "exp3" 2 18 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 338 16 1
"3602" "exp3" 2 19 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 346 12 1
"3602" "exp3" 2 20 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 586 0 0
"3602" "exp3" 2 21 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 336 31 1
"3602" "exp3" 2 22 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 328 22 1
"3602" "exp3" 2 23 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 325 48 1
"3602" "exp3" 2 24 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 358 27 1
"3602" "exp3" 2 25 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 343 0 0
"3602" "exp3" 2 26 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 458 11 1
"3602" "exp3" 2 27 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 349 0 0
"3602" "exp3" 2 28 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 453 0 0
"3602" "exp3" 2 29 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 329 25 1
"3602" "exp3" 2 30 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 291 18 1
"3602" "exp3" 2 31 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 377 27 1
"3602" "exp3" 2 32 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 366 0 0
"3602" "exp3" 2 33 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 344 13 1
"3602" "exp3" 2 34 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 364 0 0
"3602" "exp3" 2 35 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 436 0 0
"3602" "exp3" 2 36 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 330 29 1
"3602" "exp3" 2 37 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 413 17 1
"3602" "exp3" 2 38 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 359 59 1
"3602" "exp3" 2 39 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 380 0 0
"3602" "exp3" 2 40 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 544 42 1
"3602" "exp3" 2 41 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 365 13 1
"3602" "exp3" 2 42 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 392 0 0
"3602" "exp3" 2 43 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 354 33 1
"3602" "exp3" 2 44 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 384 37 1
"3602" "exp3" 2 45 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 408 31 1
"3602" "exp3" 2 46 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 386 24 1
"3602" "exp3" 2 47 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 519 20 1
"3602" "exp3" 2 48 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 566 0 0
"3602" "exp3" 2 49 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 360 34 1
"3602" "exp3" 2 50 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 407 44 1
"3602" "exp3" 2 51 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 329 30 1
"3602" "exp3" 2 52 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 323 22 1
"3602" "exp3" 2 53 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 400 2 1
"3602" "exp3" 2 54 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 362 0 0
"3602" "exp3" 2 55 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 484 17 1
"3602" "exp3" 2 56 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 675 0 0
"3602" "exp3" 2 57 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 387 34 1
"3602" "exp3" 2 58 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 381 36 1
"3602" "exp3" 2 59 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 532 0 0
"3602" "exp3" 2 60 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 483 45 1
"3602" "exp3" 2 61 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 455 39 1
"3602" "exp3" 2 62 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 458 14 1
"3602" "exp3" 2 63 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 882 5 1
"3602" "exp3" 2 64 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 485 26 1
"3602" "exp3" 2 65 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 359 21 1
"3602" "exp3" 2 66 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 426 14 1
"3602" "exp3" 2 67 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 409 12 1
"3602" "exp3" 2 68 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 468 19 1
"3602" "exp3" 2 69 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 504 17 1
"3602" "exp3" 2 70 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 345 36 1
"3602" "exp3" 2 71 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 378 9 1
"3602" "exp3" 2 72 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 364 42 1
"3602" "exp3" 2 73 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 382 19 1
"3602" "exp3" 2 74 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 505 27 1
"3602" "exp3" 2 75 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 515 0 0
"3602" "exp3" 2 76 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 444 20 1
"3602" "exp3" 2 77 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 489 18 1
"3602" "exp3" 2 78 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 344 6 1
"3602" "exp3" 2 79 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 330 0 0
"3602" "exp3" 2 80 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 401 69 1
"3602" "exp3" 2 81 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 420 0 0
"3602" "exp3" 2 82 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 627 0 0
"3602" "exp3" 2 83 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 345 0 0
"3602" "exp3" 2 84 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 387 35 1
"3602" "exp3" 2 85 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 523 0 0
"3602" "exp3" 2 86 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 287 3 1
"3602" "exp3" 2 87 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 361 43 1
"3602" "exp3" 2 88 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 370 16 1
"3602" "exp3" 2 89 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 687 0 0
"3602" "exp3" 2 90 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 542 16 1
"3602" "exp3" 2 91 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 624 0 0
"3602" "exp3" 2 92 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 446 0 0
"3602" "exp3" 2 93 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 504 29 1
"3602" "exp3" 2 94 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 469 7 1
"3602" "exp3" 2 95 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 388 0 0
"3602" "exp3" 2 96 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 414 0 0
"3602" "exp3" 2 97 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 416 20 1
"3602" "exp3" 2 98 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 579 0 0
"3602" "exp3" 2 99 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 687 38 1
"3602" "exp3" 2 100 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 454 22 1
"3602" "exp3" 2 101 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 404 37 1
"3602" "exp3" 2 102 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 421 25 1
"3602" "exp3" 2 103 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 606 0 0
"3602" "exp3" 2 104 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 438 4 1
"3602" "exp3" 2 105 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 438 25 1
"3602" "exp3" 2 106 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 589 6 1
"3602" "exp3" 2 107 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 542 22 1
"3602" "exp3" 2 108 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 469 0 0
"3602" "exp3" 2 109 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 542 15 1
"3602" "exp3" 2 110 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 430 13 1
"3602" "exp3" 2 111 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 405 41 1
"3602" "exp3" 2 112 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 579 0 0
"3602" "exp3" 2 113 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 405 46 1
"3602" "exp3" 2 114 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 730 0 0
"3602" "exp3" 2 115 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 425 10 1
"3602" "exp3" 2 116 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 517 0 0
"3602" "exp3" 2 117 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 605 0 0
"3602" "exp3" 2 118 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 427 29 1
"3602" "exp3" 2 119 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 416 23 1
"3602" "exp3" 2 120 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 376 18 1
"3602" "exp3" 2 121 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 381 45 1
"3602" "exp3" 2 122 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 454 0 0
"3602" "exp3" 2 123 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 373 21 1
"3602" "exp3" 2 124 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 611 18 1
"3602" "exp3" 2 125 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 297 7 1
"3602" "exp3" 2 126 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 460 21 1
"3602" "exp3" 2 127 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 653 73 1
"3602" "exp3" 2 128 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 353 25 1
"3602" "exp3" 2 129 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 393 33 1
"3602" "exp3" 2 130 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 406 24 1
"3602" "exp3" 2 131 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 462 57 1
"3602" "exp3" 2 132 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 328 0 0
"3602" "exp3" 1 1 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 553 22 1
"3602" "exp3" 1 2 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 719 54 1
"3602" "exp3" 1 3 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 556 61 1
"3602" "exp3" 1 4 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 463 6 1
"3602" "exp3" 1 5 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 531 21 1
"3602" "exp3" 1 6 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 442 19 1
"3602" "exp3" 1 7 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 729 69 1
"3602" "exp3" 1 8 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 732 0 0
"3602" "exp3" 1 9 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 737 0 0
"3602" "exp3" 1 10 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 564 9 1
"3602" "exp3" 1 11 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 430 25 1
"3602" "exp3" 1 12 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 404 36 1
"3602" "exp3" 1 13 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 680 75 1
"3602" "exp3" 1 14 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 481 0 0
"3602" "exp3" 1 15 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 480 0 0
"3602" "exp3" 1 16 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 639 10 1
"3602" "exp3" 1 17 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 581 17 1
"3602" "exp3" 1 18 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 737 18 1
"3602" "exp3" 1 19 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 502 17 1
"3602" "exp3" 1 20 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 513 0 0
"3602" "exp3" 1 21 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 523 33 1
"3602" "exp3" 1 22 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 710 27 1
"3602" "exp3" 1 23 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 782 27 1
"3602" "exp3" 1 24 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 707 0 0
"3602" "exp3" 1 25 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 617 26 1
"3602" "exp3" 1 26 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 460 26 1
"3602" "exp3" 1 27 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 553 0 0
"3602" "exp3" 1 28 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 682 0 0
"3602" "exp3" 1 29 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 428 3 1
"3602" "exp3" 1 30 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 464 7 1
"3602" "exp3" 1 31 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 918 59 1
"3602" "exp3" 1 32 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 668 73 1
"3602" "exp3" 1 33 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 601 23 1
"3602" "exp3" 1 34 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 592 33 1
"3602" "exp3" 1 35 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 693 64 1
"3602" "exp3" 1 36 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 654 16 1
"3602" "exp3" 1 37 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 656 37 1
"3602" "exp3" 1 38 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 903 34 1
"3602" "exp3" 1 39 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 713 32 1
"3602" "exp3" 1 40 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 569 0 0
"3602" "exp3" 1 41 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 450 0 0
"3602" "exp3" 1 42 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 671 0 0
"3602" "exp3" 1 43 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 469 0 0
"3602" "exp3" 1 44 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 588 0 0
"3602" "exp3" 1 45 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 557 18 1
"3602" "exp3" 1 46 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 622 26 1
"3602" "exp3" 1 47 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 562 0 0
"3602" "exp3" 1 48 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 558 61 1
"3602" "exp3" 1 49 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 439 14 1
"3602" "exp3" 1 50 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 590 0 0
"3602" "exp3" 1 51 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 552 0 0
"3602" "exp3" 1 52 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 686 0 0
"3602" "exp3" 1 53 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 643 0 0
"3602" "exp3" 1 54 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 651 5 1
"3602" "exp3" 1 55 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 498 18 1
"3602" "exp3" 1 56 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 470 55 1
"3602" "exp3" 1 57 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 646 0 0
"3602" "exp3" 1 58 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 503 5 1
"3602" "exp3" 1 59 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 560 11 1
"3602" "exp3" 1 60 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 811 0 0
"3602" "exp3" 1 61 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 499 23 1
"3602" "exp3" 1 62 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 510 37 1
"3602" "exp3" 1 63 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 668 0 0
"3602" "exp3" 1 64 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 923 0 0
"3602" "exp3" 1 65 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 525 1 1
"3602" "exp3" 1 66 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 478 2 1
"3602" "exp3" 1 67 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 715 0 0
"3602" "exp3" 1 68 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 852 0 0
"3602" "exp3" 1 69 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 701 28 1
"3602" "exp3" 1 70 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 479 35 1
"3602" "exp3" 1 71 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 876 0 0
"3602" "exp3" 1 72 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 716 11 1
"3602" "exp3" 1 73 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 701 0 0
"3602" "exp3" 1 74 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 560 16 1
"3602" "exp3" 1 75 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 708 0 0
"3602" "exp3" 1 76 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 604 13 1
"3602" "exp3" 1 77 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 829 0 0
"3602" "exp3" 1 78 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 712 63 1
"3602" "exp3" 1 79 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 460 0 0
"3602" "exp3" 1 80 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 612 17 1
"3602" "exp3" 1 81 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 469 20 1
"3602" "exp3" 1 82 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 486 0 0
"3602" "exp3" 1 83 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 513 49 1
"3602" "exp3" 1 84 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 554 0 0
"3602" "exp3" 1 85 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 876 0 0
"3602" "exp3" 1 86 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 527 0 0
"3602" "exp3" 1 87 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 581 27 1
"3602" "exp3" 1 88 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 724 22 1
"3602" "exp3" 1 89 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 602 14 1
"3602" "exp3" 1 90 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 467 0 0
"3602" "exp3" 1 91 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 427 25 1
"3602" "exp3" 1 92 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 484 0 0
"3602" "exp3" 1 93 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 606 24 1
"3602" "exp3" 1 94 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 592 16 1
"3602" "exp3" 1 95 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 486 10 1
"3602" "exp3" 1 96 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 488 77 1
"3602" "exp3" 1 97 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 463 7 1
"3602" "exp3" 1 98 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 472 30 1
"3602" "exp3" 1 99 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 473 12 1
"3602" "exp3" 1 100 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 528 38 1
"3602" "exp3" 1 101 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 575 20 1
"3602" "exp3" 1 102 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 495 22 1
"3602" "exp3" 1 103 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 563 0 0
"3602" "exp3" 1 104 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 533 56 1
"3602" "exp3" 1 105 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 496 15 1
"3602" "exp3" 1 106 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 633 28 1
"3602" "exp3" 1 107 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 678 0 0
"3602" "exp3" 1 108 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 686 60 1
"3602" "exp3" 1 109 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 627 14 1
"3602" "exp3" 1 110 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 481 30 1
"3602" "exp3" 1 111 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 595 0 0
"3602" "exp3" 1 112 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 560 30 1
"3602" "exp3" 1 113 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 551 23 1
"3602" "exp3" 1 114 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 624 31 1
"3602" "exp3" 1 115 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 588 20 1
"3602" "exp3" 1 116 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 759 0 0
"3602" "exp3" 1 117 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 554 19 1
"3602" "exp3" 1 118 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 605 53 1
"3602" "exp3" 1 119 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 485 21 1
"3602" "exp3" 1 120 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 424 24 1
"3602" "exp3" 1 121 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 425 6 1
"3602" "exp3" 1 122 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 613 15 1
"3602" "exp3" 1 123 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 497 8 1
"3602" "exp3" 1 124 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 681 0 0
"3602" "exp3" 1 125 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 441 68 1
"3602" "exp3" 1 126 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 557 15 1
"3602" "exp3" 1 127 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 518 30 1
"3602" "exp3" 1 128 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 501 20 1
"3602" "exp3" 1 129 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 610 59 1
"3602" "exp3" 1 130 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 669 0 0
"3602" "exp3" 1 131 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 612 0 0
"3602" "exp3" 1 132 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 467 29 1
"3602" "exp3" 2 1 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 617 15 1
"3602" "exp3" 2 2 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 467 14 1
"3602" "exp3" 2 3 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 559 42 1
"3602" "exp3" 2 4 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 414 0 0
"3602" "exp3" 2 5 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 436 31 1
"3602" "exp3" 2 6 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 699 16 1
"3602" "exp3" 2 7 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 758 43 1
"3602" "exp3" 2 8 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 542 0 0
"3602" "exp3" 2 9 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 547 0 0
"3602" "exp3" 2 10 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 488 29 1
"3602" "exp3" 2 11 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 621 55 1
"3602" "exp3" 2 12 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 656 0 0
"3602" "exp3" 2 13 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 423 16 1
"3602" "exp3" 2 14 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 550 29 1
"3602" "exp3" 2 15 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 483 8 1
"3602" "exp3" 2 16 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 485 33 1
"3602" "exp3" 2 17 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 587 0 0
"3602" "exp3" 2 18 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 577 0 0
"3602" "exp3" 2 19 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 528 26 1
"3602" "exp3" 2 20 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 474 7 1
"3602" "exp3" 2 21 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 665 5 1
"3602" "exp3" 2 22 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 441 32 1
"3602" "exp3" 2 23 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 583 22 1
"3602" "exp3" 2 24 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 555 63 1
"3602" "exp3" 2 25 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 383 0 0
"3602" "exp3" 2 26 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 631 74 1
"3602" "exp3" 2 27 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 500 0 0
"3602" "exp3" 2 28 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 648 27 1
"3602" "exp3" 2 29 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 687 0 0
"3602" "exp3" 2 30 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 678 30 1
"3602" "exp3" 2 31 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 546 19 1
"3602" "exp3" 2 32 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 504 5 1
"3602" "exp3" 2 33 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 447 13 1
"3602" "exp3" 2 34 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 538 0 0
"3602" "exp3" 2 35 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 588 14 1
"3602" "exp3" 2 36 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 444 32 1
"3602" "exp3" 2 37 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 433 0 0
"3602" "exp3" 2 38 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 592 0 0
"3602" "exp3" 2 39 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 529 0 0
"3602" "exp3" 2 40 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 525 4 1
"3602" "exp3" 2 41 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 425 18 1
"3602" "exp3" 2 42 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 600 20 1
"3602" "exp3" 2 43 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 575 34 1
"3602" "exp3" 2 44 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 601 17 1
"3602" "exp3" 2 45 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 604 30 1
"3602" "exp3" 2 46 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 558 2 1
"3602" "exp3" 2 47 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 437 17 1
"3602" "exp3" 2 48 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 404 25 1
"3602" "exp3" 2 49 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 470 0 0
"3602" "exp3" 2 50 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 629 11 1
"3602" "exp3" 2 51 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 504 0 0
"3602" "exp3" 2 52 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 438 24 1
"3602" "exp3" 2 53 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 755 0 0
"3602" "exp3" 2 54 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 480 0 0
"3602" "exp3" 2 55 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 637 23 1
"3602" "exp3" 2 56 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 585 27 1
"3602" "exp3" 2 57 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 607 0 0
"3602" "exp3" 2 58 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 435 25 1
"3602" "exp3" 2 59 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 892 0 0
"3602" "exp3" 2 60 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 460 24 1
"3602" "exp3" 2 61 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 552 22 1
"3602" "exp3" 2 62 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 626 0 0
"3602" "exp3" 2 63 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 712 18 1
"3602" "exp3" 2 64 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 504 6 1
"3602" "exp3" 2 65 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 452 19 1
"3602" "exp3" 2 66 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 623 0 0
"3602" "exp3" 2 67 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 461 19 1
"3602" "exp3" 2 68 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 525 20 1
"3602" "exp3" 2 69 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 461 0 0
"3602" "exp3" 2 70 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 610 0 0
"3602" "exp3" 2 71 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 574 25 1
"3602" "exp3" 2 72 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 522 34 1
"3602" "exp3" 2 73 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 625 17 1
"3602" "exp3" 2 74 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 2 521 0 0
"3602" "exp3" 2 75 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 493 0 0
"3602" "exp3" 2 76 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 506 17 1
"3602" "exp3" 2 77 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 669 18 1
"3602" "exp3" 2 78 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 563 59 1
"3602" "exp3" 2 79 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 509 36 1
"3602" "exp3" 2 80 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 630 0 0
"3602" "exp3" 2 81 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 590 15 1
"3602" "exp3" 2 82 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 663 31 1
"3602" "exp3" 2 83 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 490 11 1
"3602" "exp3" 2 84 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 623 9 1
"3602" "exp3" 2 85 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 580 0 0
"3602" "exp3" 2 86 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 630 33 1
"3602" "exp3" 2 87 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 852 0 0
"3602" "exp3" 2 88 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 418 19 1
"3602" "exp3" 2 89 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 519 23 1
"3602" "exp3" 2 90 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 583 22 1
"3602" "exp3" 2 91 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 545 21 1
"3602" "exp3" 2 92 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 438 20 1
"3602" "exp3" 2 93 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 592 35 1
"3602" "exp3" 2 94 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 466 10 1
"3602" "exp3" 2 95 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 433 45 1
"3602" "exp3" 2 96 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 714 18 1
"3602" "exp3" 2 97 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 725 0 0
"3602" "exp3" 2 98 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 457 28 1
"3602" "exp3" 2 99 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 448 28 1
"3602" "exp3" 2 100 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 496 14 1
"3602" "exp3" 2 101 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 862 0 0
"3602" "exp3" 2 102 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 505 15 1
"3602" "exp3" 2 103 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 726 0 0
"3602" "exp3" 2 104 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 465 36 1
"3602" "exp3" 2 105 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 530 28 1
"3602" "exp3" 2 106 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 465 0 0
"3602" "exp3" 2 107 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 455 3 1
"3602" "exp3" 2 108 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 522 23 1
"3602" "exp3" 2 109 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 510 0 0
"3602" "exp3" 2 110 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 551 20 1
"3602" "exp3" 2 111 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 421 13 1
"3602" "exp3" 2 112 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 629 30 1
"3602" "exp3" 2 113 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 673 0 0
"3602" "exp3" 2 114 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 476 24 1
"3602" "exp3" 2 115 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 435 42 1
"3602" "exp3" 2 116 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1030 0 0
"3602" "exp3" 2 117 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 555 12 1
"3602" "exp3" 2 118 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 518 31 1
"3602" "exp3" 2 119 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 797 54 1
"3602" "exp3" 2 120 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 740 0 0
"3602" "exp3" 2 121 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 495 31 1
"3602" "exp3" 2 122 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 554 35 1
"3602" "exp3" 2 123 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 521 0 0
"3602" "exp3" 2 124 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 747 0 0
"3602" "exp3" 2 125 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 465 0 0
"3602" "exp3" 2 126 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 600 0 0
"3602" "exp3" 2 127 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 590 27 1
"3602" "exp3" 2 128 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 566 38 1
"3602" "exp3" 2 129 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 445 0 0
"3602" "exp3" 2 130 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 498 13 1
"3602" "exp3" 2 131 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 557 6 1
"3602" "exp3" 2 132 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 424 8 1
"3602" "exp3" 1 1 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 322 16 1
"3602" "exp3" 1 2 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 338 40 1
"3602" "exp3" 1 3 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 372 37 1
"3602" "exp3" 1 4 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 371 0 0
"3602" "exp3" 1 5 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 386 0 0
"3602" "exp3" 1 6 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 368 20 1
"3602" "exp3" 1 7 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 322 22 1
"3602" "exp3" 1 8 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 360 31 1
"3602" "exp3" 1 9 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 378 18 1
"3602" "exp3" 1 10 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 342 0 0
"3602" "exp3" 1 11 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 374 0 0
"3602" "exp3" 1 12 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 316 23 1
"3602" "exp3" 1 13 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 351 35 1
"3602" "exp3" 1 14 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 369 13 1
"3602" "exp3" 1 15 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 352 27 1
"3602" "exp3" 1 16 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 418 0 0
"3602" "exp3" 1 17 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 362 0 0
"3602" "exp3" 1 18 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 452 0 0
"3602" "exp3" 1 19 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 380 40 1
"3602" "exp3" 1 20 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 400 0 0
"3602" "exp3" 1 21 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 328 16 1
"3602" "exp3" 1 22 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 336 17 1
"3602" "exp3" 1 23 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 354 3 1
"3602" "exp3" 1 24 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 351 47 1
"3602" "exp3" 1 25 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 367 26 1
"3602" "exp3" 1 26 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 509 0 0
"3602" "exp3" 1 27 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 366 9 1
"3602" "exp3" 1 28 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 567 33 1
"3602" "exp3" 1 29 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 342 0 0
"3602" "exp3" 1 30 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 346 0 0
"3602" "exp3" 1 31 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 351 17 1
"3602" "exp3" 1 32 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 310 23 1
"3602" "exp3" 1 33 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 319 9 1
"3602" "exp3" 1 34 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 391 55 1
"3602" "exp3" 1 35 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 374 31 1
"3602" "exp3" 1 36 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 352 0 0
"3602" "exp3" 1 37 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 361 0 0
"3602" "exp3" 1 38 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 328 28 1
"3602" "exp3" 1 39 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 316 44 1
"3602" "exp3" 1 40 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 353 0 0
"3602" "exp3" 1 41 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 326 42 1
"3602" "exp3" 1 42 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 355 29 1
"3602" "exp3" 1 43 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 347 17 1
"3602" "exp3" 1 44 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 344 29 1
"3602" "exp3" 1 45 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 385 32 1
"3602" "exp3" 1 46 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 345 0 0
"3602" "exp3" 1 47 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 355 46 1
"3602" "exp3" 1 48 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 362 0 0
"3602" "exp3" 1 49 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 375 20 1
"3602" "exp3" 1 50 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 372 0 0
"3602" "exp3" 1 51 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 479 8 1
"3602" "exp3" 1 52 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 391 11 1
"3602" "exp3" 1 53 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 367 0 0
"3602" "exp3" 1 54 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 361 22 1
"3602" "exp3" 1 55 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 534 68 1
"3602" "exp3" 1 56 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 400 25 1
"3602" "exp3" 1 57 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 448 0 0
"3602" "exp3" 1 58 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 359 26 1
"3602" "exp3" 1 59 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 361 22 1
"3602" "exp3" 1 60 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 407 18 1
"3602" "exp3" 1 61 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 332 0 0
"3602" "exp3" 1 62 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 356 39 1
"3602" "exp3" 1 63 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 472 0 0
"3602" "exp3" 1 64 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 746 0 0
"3602" "exp3" 1 65 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 314 24 1
"3602" "exp3" 1 66 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 311 0 0
"3602" "exp3" 1 67 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 349 0 0
"3602" "exp3" 1 68 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 391 32 1
"3602" "exp3" 1 69 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 575 0 0
"3602" "exp3" 1 70 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 360 33 1
"3602" "exp3" 1 71 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 380 10 1
"3602" "exp3" 1 72 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 357 21 1
"3602" "exp3" 1 73 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 308 75 1
"3602" "exp3" 1 74 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 332 0 0
"3602" "exp3" 1 75 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 315 0 0
"3602" "exp3" 1 76 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 355 0 0
"3602" "exp3" 1 77 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 336 27 1
"3602" "exp3" 1 78 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 362 0 0
"3602" "exp3" 1 79 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 376 21 1
"3602" "exp3" 1 80 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 338 0 0
"3602" "exp3" 1 81 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 402 4 1
"3602" "exp3" 1 82 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 362 0 0
"3602" "exp3" 1 83 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 417 21 1
"3602" "exp3" 1 84 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 404 24 1
"3602" "exp3" 1 85 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 378 12 1
"3602" "exp3" 1 86 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 342 0 0
"3602" "exp3" 1 87 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 312 13 1
"3602" "exp3" 1 88 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 434 0 0
"3602" "exp3" 1 89 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 372 5 1
"3602" "exp3" 1 90 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 334 14 1
"3602" "exp3" 1 91 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 328 0 0
"3602" "exp3" 1 92 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 382 12 1
"3602" "exp3" 1 93 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 385 28 1
"3602" "exp3" 1 94 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 337 24 1
"3602" "exp3" 1 95 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 361 25 1
"3602" "exp3" 1 96 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 518 0 0
"3602" "exp3" 1 97 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 490 35 1
"3602" "exp3" 1 98 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 359 5 1
"3602" "exp3" 1 99 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 327 0 0
"3602" "exp3" 1 100 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 334 8 1
"3602" "exp3" 1 101 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 323 29 1
"3602" "exp3" 1 102 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 328 7 1
"3602" "exp3" 1 103 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 385 0 0
"3602" "exp3" 1 104 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 371 1 1
"3602" "exp3" 1 105 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 656 52 1
"3602" "exp3" 1 106 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 355 19 1
"3602" "exp3" 1 107 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 341 16 1
"3602" "exp3" 1 108 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 358 15 1
"3602" "exp3" 1 109 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 366 0 0
"3602" "exp3" 1 110 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 413 14 1
"3602" "exp3" 1 111 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 366 49 1
"3602" "exp3" 1 112 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 360 7 1
"3602" "exp3" 1 113 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 348 36 1
"3602" "exp3" 1 114 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 407 58 1
"3602" "exp3" 1 115 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 382 10 1
"3602" "exp3" 1 116 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 417 26 1
"3602" "exp3" 1 117 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 395 15 1
"3602" "exp3" 1 118 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 360 6 1
"3602" "exp3" 1 119 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 351 30 1
"3602" "exp3" 1 120 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 548 0 0
"3602" "exp3" 1 121 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 505 70 1
"3602" "exp3" 1 122 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 427 43 1
"3602" "exp3" 1 123 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 394 2 1
"3602" "exp3" 1 124 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 335 18 1
"3602" "exp3" 1 125 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 357 13 1
"3602" "exp3" 1 126 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 324 0 0
"3602" "exp3" 1 127 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 348 24 1
"3602" "exp3" 1 128 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 345 36 1
"3602" "exp3" 1 129 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 554 19 1
"3602" "exp3" 1 130 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 239 20 1
"3602" "exp3" 1 131 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 331 0 0
"3602" "exp3" 1 132 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 255 25 1
"3602" "exp3" 2 1 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 486 36 1
"3602" "exp3" 2 2 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 324 20 1
"3602" "exp3" 2 3 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 319 19 1
"3602" "exp3" 2 4 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 338 5 1
"3602" "exp3" 2 5 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 315 17 1
"3602" "exp3" 2 6 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 305 15 1
"3602" "exp3" 2 7 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 559 0 0
"3602" "exp3" 2 8 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 305 0 0
"3602" "exp3" 2 9 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 310 0 0
"3602" "exp3" 2 10 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 307 16 1
"3602" "exp3" 2 11 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 340 19 1
"3602" "exp3" 2 12 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 300 11 1
"3602" "exp3" 2 13 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 235 24 1
"3602" "exp3" 2 14 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 348 28 1
"3602" "exp3" 2 15 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 364 0 0
"3602" "exp3" 2 16 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 356 2 1
"3602" "exp3" 2 17 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 350 0 0
"3602" "exp3" 2 18 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 390 66 1
"3602" "exp3" 2 19 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 327 33 1
"3602" "exp3" 2 20 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 468 0 0
"3602" "exp3" 2 21 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 362 0 0
"3602" "exp3" 2 22 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 374 23 1
"3602" "exp3" 2 23 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 406 13 1
"3602" "exp3" 2 24 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 366 12 1
"3602" "exp3" 2 25 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 338 27 1
"3602" "exp3" 2 26 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 347 44 1
"3602" "exp3" 2 27 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 546 26 1
"3602" "exp3" 2 28 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 345 0 0
"3602" "exp3" 2 29 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 301 31 1
"3602" "exp3" 2 30 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 349 0 0
"3602" "exp3" 2 31 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 357 29 1
"3602" "exp3" 2 32 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 276 17 1
"3602" "exp3" 2 33 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 351 28 1
"3602" "exp3" 2 34 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 384 0 0
"3602" "exp3" 2 35 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 321 0 0
"3602" "exp3" 2 36 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 329 22 1
"3602" "exp3" 2 37 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 329 33 1
"3602" "exp3" 2 38 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 338 9 1
"3602" "exp3" 2 39 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 329 35 1
"3602" "exp3" 2 40 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 322 0 0
"3602" "exp3" 2 41 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 456 0 0
"3602" "exp3" 2 42 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 498 0 0
"3602" "exp3" 2 43 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 376 0 0
"3602" "exp3" 2 44 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 314 0 0
"3602" "exp3" 2 45 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 520 61 1
"3602" "exp3" 2 46 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 321 18 1
"3602" "exp3" 2 47 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 365 32 1
"3602" "exp3" 2 48 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 302 11 1
"3602" "exp3" 2 49 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 347 0 0
"3602" "exp3" 2 50 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 317 42 1
"3602" "exp3" 2 51 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 338 6 1
"3602" "exp3" 2 52 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 336 32 1
"3602" "exp3" 2 53 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 351 18 1
"3602" "exp3" 2 54 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 313 21 1
"3602" "exp3" 2 55 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 305 20 1
"3602" "exp3" 2 56 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 297 34 1
"3602" "exp3" 2 57 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 342 0 0
"3602" "exp3" 2 58 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 408 0 0
"3602" "exp3" 2 59 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 423 47 1
"3602" "exp3" 2 60 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 303 16 1
"3602" "exp3" 2 61 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 331 0 0
"3602" "exp3" 2 62 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 401 37 1
"3602" "exp3" 2 63 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 406 30 1
"3602" "exp3" 2 64 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 465 65 1
"3602" "exp3" 2 65 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 397 14 1
"3602" "exp3" 2 66 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 348 7 1
"3602" "exp3" 2 67 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 342 14 1
"3602" "exp3" 2 68 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 323 0 0
"3602" "exp3" 2 69 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 356 15 1
"3602" "exp3" 2 70 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 323 20 1
"3602" "exp3" 2 71 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 349 38 1
"3602" "exp3" 2 72 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 360 16 1
"3602" "exp3" 2 73 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 314 41 1
"3602" "exp3" 2 74 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 329 0 0
"3602" "exp3" 2 75 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 353 18 1
"3602" "exp3" 2 76 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 379 30 1
"3602" "exp3" 2 77 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 385 10 1
"3602" "exp3" 2 78 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 312 24 1
"3602" "exp3" 2 79 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 314 0 0
"3602" "exp3" 2 80 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 359 36 1
"3602" "exp3" 2 81 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 394 14 1
"3602" "exp3" 2 82 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 480 0 0
"3602" "exp3" 2 83 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 364 30 1
"3602" "exp3" 2 84 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 313 17 1
"3602" "exp3" 2 85 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 302 12 1
"3602" "exp3" 2 86 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 334 0 0
"3602" "exp3" 2 87 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 415 0 0
"3602" "exp3" 2 88 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 369 0 0
"3602" "exp3" 2 89 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 344 4 1
"3602" "exp3" 2 90 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 378 0 0
"3602" "exp3" 2 91 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 351 24 1
"3602" "exp3" 2 92 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 370 0 0
"3602" "exp3" 2 93 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 492 0 0
"3602" "exp3" 2 94 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 320 21 1
"3602" "exp3" 2 95 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 315 0 0
"3602" "exp3" 2 96 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 330 38 1
"3602" "exp3" 2 97 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 332 22 1
"3602" "exp3" 2 98 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 326 0 0
"3602" "exp3" 2 99 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 358 3 1
"3602" "exp3" 2 100 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 333 27 1
"3602" "exp3" 2 101 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 348 13 1
"3602" "exp3" 2 102 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 324 28 1
"3602" "exp3" 2 103 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 330 0 0
"3602" "exp3" 2 104 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 403 23 1
"3602" "exp3" 2 105 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 311 26 1
"3602" "exp3" 2 106 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 554 31 1
"3602" "exp3" 2 107 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 328 15 1
"3602" "exp3" 2 108 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 368 0 0
"3602" "exp3" 2 109 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 353 0 0
"3602" "exp3" 2 110 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 297 27 1
"3602" "exp3" 2 111 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 352 45 1
"3602" "exp3" 2 112 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 349 0 0
"3602" "exp3" 2 113 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 339 32 1
"3602" "exp3" 2 114 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 306 29 1
"3602" "exp3" 2 115 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 307 8 1
"3602" "exp3" 2 116 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 336 18 1
"3602" "exp3" 2 117 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 327 20 1
"3602" "exp3" 2 118 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 354 0 0
"3602" "exp3" 2 119 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 391 23 1
"3602" "exp3" 2 120 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 324 6 1
"3602" "exp3" 2 121 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 329 48 1
"3602" "exp3" 2 122 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 353 54 1
"3602" "exp3" 2 123 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 341 27 1
"3602" "exp3" 2 124 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 328 30 1
"3602" "exp3" 2 125 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 326 5 1
"3602" "exp3" 2 126 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 401 45 1
"3602" "exp3" 2 127 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 371 25 1
"3602" "exp3" 2 128 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 433 13 1
"3602" "exp3" 2 129 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 395 0 0
"3602" "exp3" 2 130 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 398 0 0
"3602" "exp3" 2 131 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 469 0 0
"3602" "exp3" 2 132 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 306 0 0
"3603" "exp3" 1 1 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 954 13 1
"3603" "exp3" 1 2 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1162 30 1
"3603" "exp3" 1 3 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 1321 9 1
"3603" "exp3" 1 4 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 2605 67 1
"3603" "exp3" 1 5 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1257 0 0
"3603" "exp3" 1 6 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1283 13 1
"3603" "exp3" 1 7 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1142 34 1
"3603" "exp3" 1 8 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1033 0 0
"3603" "exp3" 1 9 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 2 635 0 0
"3603" "exp3" 1 10 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 936 31 1
"3603" "exp3" 1 11 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 910 20 1
"3603" "exp3" 1 12 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1211 0 0
"3603" "exp3" 1 13 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1056 83 1
"3603" "exp3" 1 14 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1089 0 0
"3603" "exp3" 1 15 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1578 0 0
"3603" "exp3" 1 16 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 929 24 1
"3603" "exp3" 1 17 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1702 0 0
"3603" "exp3" 1 18 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1280 22 1
"3603" "exp3" 1 19 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 763 0 0
"3603" "exp3" 1 20 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 881 38 1
"3603" "exp3" 1 21 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 719 47 1
"3603" "exp3" 1 22 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 822 24 1
"3603" "exp3" 1 23 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 638 15 1
"3603" "exp3" 1 24 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 862 12 1
"3603" "exp3" 1 25 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1084 45 1
"3603" "exp3" 1 26 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 762 23 1
"3603" "exp3" 1 27 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 1577 0 0
"3603" "exp3" 1 28 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 944 49 1
"3603" "exp3" 1 29 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1189 0 0
"3603" "exp3" 1 30 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 2108 14 1
"3603" "exp3" 1 31 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1146 9 1
"3603" "exp3" 1 32 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1109 95 1
"3603" "exp3" 1 33 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 789 0 0
"3603" "exp3" 1 34 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1301 0 0
"3603" "exp3" 1 35 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 945 44 1
"3603" "exp3" 1 36 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1177 0 0
"3603" "exp3" 1 37 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1072 25 1
"3603" "exp3" 1 38 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1294 0 0
"3603" "exp3" 1 39 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 898 28 1
"3603" "exp3" 1 40 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1030 32 1
"3603" "exp3" 1 41 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 965 0 0
"3603" "exp3" 1 42 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1578 0 0
"3603" "exp3" 1 43 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 2049 29 1
"3603" "exp3" 1 44 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1245 28 1
"3603" "exp3" 1 45 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 886 46 1
"3603" "exp3" 1 46 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1822 0 0
"3603" "exp3" 1 47 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 1093 7 1
"3603" "exp3" 1 48 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1959 21 1
"3603" "exp3" 1 49 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1430 0 0
"3603" "exp3" 1 50 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1615 41 1
"3603" "exp3" 1 51 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1547 32 1
"3603" "exp3" 1 52 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 1614 0 0
"3603" "exp3" 1 53 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1163 19 1
"3603" "exp3" 1 54 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1429 0 0
"3603" "exp3" 1 55 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 922 0 0
"3603" "exp3" 1 56 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1069 0 0
"3603" "exp3" 1 57 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1356 19 1
"3603" "exp3" 1 58 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 2074 0 0
"3603" "exp3" 1 59 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1051 43 1
"3603" "exp3" 1 60 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1421 20 1
"3603" "exp3" 1 61 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 1336 0 0
"3603" "exp3" 1 62 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1402 22 1
"3603" "exp3" 1 63 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 799 0 0
"3603" "exp3" 1 64 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 877 0 0
"3603" "exp3" 1 65 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 619 0 0
"3603" "exp3" 1 66 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 898 0 0
"3603" "exp3" 1 67 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1734 32 1
"3603" "exp3" 1 68 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2745 0 0
"3603" "exp3" 1 69 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1071 0 0
"3603" "exp3" 1 70 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 907 31 1
"3603" "exp3" 1 71 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 911 0 0
"3603" "exp3" 1 72 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1087 24 1
"3603" "exp3" 1 73 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1479 0 0
"3603" "exp3" 1 74 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1366 0 0
"3603" "exp3" 1 75 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1085 13 1
"3603" "exp3" 1 76 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1205 17 1
"3603" "exp3" 1 77 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 2042 6 1
"3603" "exp3" 1 78 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1629 39 1
"3603" "exp3" 1 79 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1440 14 1
"3603" "exp3" 1 80 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 905 0 0
"3603" "exp3" 1 81 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 732 16 1
"3603" "exp3" 1 82 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1266 0 0
"3603" "exp3" 1 83 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 897 17 1
"3603" "exp3" 1 84 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 802 35 1
"3603" "exp3" 1 85 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 920 27 1
"3603" "exp3" 1 86 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 656 37 1
"3603" "exp3" 1 87 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1335 0 0
"3603" "exp3" 1 88 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1775 0 0
"3603" "exp3" 1 89 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1290 30 1
"3603" "exp3" 1 90 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 1986 15 1
"3603" "exp3" 1 91 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 894 0 0
"3603" "exp3" 1 92 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2718 0 0
"3603" "exp3" 1 93 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 2278 0 0
"3603" "exp3" 1 94 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1411 36 1
"3603" "exp3" 1 95 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1007 39 1
"3603" "exp3" 1 96 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 852 14 1
"3603" "exp3" 1 97 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 738 34 1
"3603" "exp3" 1 98 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1099 33 1
"3603" "exp3" 1 99 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1184 0 0
"3603" "exp3" 1 100 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1367 18 1
"3603" "exp3" 1 101 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1730 33 1
"3603" "exp3" 1 102 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 579 0 0
"3603" "exp3" 1 103 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 807 28 1
"3603" "exp3" 1 104 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1023 27 1
"3603" "exp3" 1 105 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 695 33 1
"3603" "exp3" 1 106 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 776 34 1
"3603" "exp3" 1 107 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1176 25 1
"3603" "exp3" 1 108 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 615 0 0
"3603" "exp3" 1 109 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 867 20 1
"3603" "exp3" 1 110 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1578 18 1
"3603" "exp3" 1 111 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 805 0 0
"3603" "exp3" 1 112 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1089 0 0
"3603" "exp3" 1 113 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1170 42 1
"3603" "exp3" 1 114 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 946 31 1
"3603" "exp3" 1 115 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1916 17 1
"3603" "exp3" 1 116 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1100 25 1
"3603" "exp3" 1 117 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 1617 7 1
"3603" "exp3" 1 118 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2518 0 0
"3603" "exp3" 1 119 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1606 23 1
"3603" "exp3" 1 120 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 2134 0 0
"3603" "exp3" 1 121 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 923 21 1
"3603" "exp3" 1 122 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1013 22 1
"3603" "exp3" 1 123 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1877 0 0
"3603" "exp3" 1 124 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 2697 35 1
"3603" "exp3" 1 125 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2565 0 0
"3603" "exp3" 1 126 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1120 30 1
"3603" "exp3" 1 127 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 1042 0 0
"3603" "exp3" 1 128 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1034 21 1
"3603" "exp3" 1 129 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1379 74 1
"3603" "exp3" 1 130 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 870 0 0
"3603" "exp3" 1 131 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 870 20 1
"3603" "exp3" 1 132 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 876 37 1
"3603" "exp3" 2 1 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1479 15 1
"3603" "exp3" 2 2 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 1039 0 0
"3603" "exp3" 2 3 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 708 35 1
"3603" "exp3" 2 4 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 1572 7 1
"3603" "exp3" 2 5 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 1486 33 1
"3603" "exp3" 2 6 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1237 26 1
"3603" "exp3" 2 7 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 900 14 1
"3603" "exp3" 2 8 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1148 34 1
"3603" "exp3" 2 9 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 760 28 1
"3603" "exp3" 2 10 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1003 27 1
"3603" "exp3" 2 11 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2005 31 1
"3603" "exp3" 2 12 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1628 0 0
"3603" "exp3" 2 13 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 878 38 1
"3603" "exp3" 2 14 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 2071 0 0
"3603" "exp3" 2 15 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1268 23 1
"3603" "exp3" 2 16 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1075 21 1
"3603" "exp3" 2 17 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1518 27 1
"3603" "exp3" 2 18 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 2949 0 0
"3603" "exp3" 2 19 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 1552 0 0
"3603" "exp3" 2 20 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 914 0 0
"3603" "exp3" 2 21 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 706 31 1
"3603" "exp3" 2 22 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1427 0 0
"3603" "exp3" 2 23 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1664 0 0
"3603" "exp3" 2 24 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1263 16 1
"3603" "exp3" 2 25 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1422 0 0
"3603" "exp3" 2 26 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1342 25 1
"3603" "exp3" 2 27 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 915 0 0
"3603" "exp3" 2 28 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1346 0 0
"3603" "exp3" 2 29 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1597 0 0
"3603" "exp3" 2 30 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 937 13 1
"3603" "exp3" 2 31 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 925 24 1
"3603" "exp3" 2 32 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1504 45 1
"3603" "exp3" 2 33 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1072 16 1
"3603" "exp3" 2 34 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1383 38 1
"3603" "exp3" 2 35 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 969 35 1
"3603" "exp3" 2 36 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1062 21 1
"3603" "exp3" 2 37 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 912 17 1
"3603" "exp3" 2 38 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1564 0 0
"3603" "exp3" 2 39 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1615 14 1
"3603" "exp3" 2 40 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1139 8 1
"3603" "exp3" 2 41 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1877 29 1
"3603" "exp3" 2 42 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 855 7 1
"3603" "exp3" 2 43 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1613 42 1
"3603" "exp3" 2 44 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 2022 29 1
"3603" "exp3" 2 45 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1754 45 1
"3603" "exp3" 2 46 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 2845 0 0
"3603" "exp3" 2 47 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1744 19 1
"3603" "exp3" 2 48 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1887 46 1
"3603" "exp3" 2 49 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 2494 0 0
"3603" "exp3" 2 50 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1291 20 1
"3603" "exp3" 2 51 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 688 11 1
"3603" "exp3" 2 52 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 1702 17 1
"3603" "exp3" 2 53 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 869 0 0
"3603" "exp3" 2 54 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 847 76 1
"3603" "exp3" 2 55 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1131 16 1
"3603" "exp3" 2 56 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1718 0 0
"3603" "exp3" 2 57 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1461 41 1
"3603" "exp3" 2 58 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1131 36 1
"3603" "exp3" 2 59 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 2115 8 1
"3603" "exp3" 2 60 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 2806 71 1
"3603" "exp3" 2 61 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1521 23 1
"3603" "exp3" 2 62 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1642 30 1
"3603" "exp3" 2 63 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1351 0 0
"3603" "exp3" 2 64 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 989 37 1
"3603" "exp3" 2 65 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1106 24 1
"3603" "exp3" 2 66 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 990 0 0
"3603" "exp3" 2 67 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 949 18 1
"3603" "exp3" 2 68 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1409 41 1
"3603" "exp3" 2 69 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 2507 0 0
"3603" "exp3" 2 70 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 1996 0 0
"3603" "exp3" 2 71 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1093 33 1
"3603" "exp3" 2 72 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 2530 5 1
"3603" "exp3" 2 73 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 1622 22 1
"3603" "exp3" 2 74 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2208 88 1
"3603" "exp3" 2 75 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1346 25 1
"3603" "exp3" 2 76 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1285 36 1
"3603" "exp3" 2 77 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1005 14 1
"3603" "exp3" 2 78 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 632 22 1
"3603" "exp3" 2 79 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1504 13 1
"3603" "exp3" 2 80 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1811 0 0
"3603" "exp3" 2 81 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 1080 0 0
"3603" "exp3" 2 82 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 886 0 0
"3603" "exp3" 2 83 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 794 0 0
"3603" "exp3" 2 84 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 712 0 0
"3603" "exp3" 2 85 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 726 0 0
"3603" "exp3" 2 86 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 930 0 0
"3603" "exp3" 2 87 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 1516 10 1
"3603" "exp3" 2 88 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 986 28 1
"3603" "exp3" 2 89 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1160 26 1
"3603" "exp3" 2 90 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 1340 12 1
"3603" "exp3" 2 91 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1680 0 0
"3603" "exp3" 2 92 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2326 97 1
"3603" "exp3" 2 93 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1755 32 1
"3603" "exp3" 2 94 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1178 0 0
"3603" "exp3" 2 95 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 2629 36 1
"3603" "exp3" 2 96 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1190 32 1
"3603" "exp3" 2 97 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 3552 0 0
"3603" "exp3" 2 98 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2931 44 1
"3603" "exp3" 2 99 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 3146 6 1
"3603" "exp3" 2 100 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1443 0 0
"3603" "exp3" 2 101 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1017 20 1
"3603" "exp3" 2 102 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 2359 0 0
"3603" "exp3" 2 103 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1318 0 0
"3603" "exp3" 2 104 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1300 0 0
"3603" "exp3" 2 105 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1780 49 1
"3603" "exp3" 2 106 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1534 31 1
"3603" "exp3" 2 107 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 799 25 1
"3603" "exp3" 2 108 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1258 30 1
"3603" "exp3" 2 109 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 883 18 1
"3603" "exp3" 2 110 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1085 37 1
"3603" "exp3" 2 111 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 975 34 1
"3603" "exp3" 2 112 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1231 0 0
"3603" "exp3" 2 113 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 953 32 1
"3603" "exp3" 2 114 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1059 22 1
"3603" "exp3" 2 115 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1640 0 0
"3603" "exp3" 2 116 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1258 15 1
"3603" "exp3" 2 117 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 1055 18 1
"3603" "exp3" 2 118 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 856 19 1
"3603" "exp3" 2 119 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 2088 23 1
"3603" "exp3" 2 120 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1045 37 1
"3603" "exp3" 2 121 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 1 2479 0 0
"3603" "exp3" 2 122 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1208 0 0
"3603" "exp3" 2 123 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 1228 0 0
"3603" "exp3" 2 124 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 2006 0 0
"3603" "exp3" 2 125 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 2346 26 1
"3603" "exp3" 2 126 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1272 0 0
"3603" "exp3" 2 127 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1401 0 0
"3603" "exp3" 2 128 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1168 33 1
"3603" "exp3" 2 129 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1973 0 0
"3603" "exp3" 2 130 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1026 0 0
"3603" "exp3" 2 131 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 823 0 0
"3603" "exp3" 2 132 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 831 28 1
"3603" "exp3" 1 1 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 1076 3 1
"3603" "exp3" 1 2 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1432 17 1
"3603" "exp3" 1 3 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 858 43 1
"3603" "exp3" 1 4 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 866 0 0
"3603" "exp3" 1 5 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1051 19 1
"3603" "exp3" 1 6 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1966 0 0
"3603" "exp3" 1 7 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 1950 0 0
"3603" "exp3" 1 8 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1364 30 1
"3603" "exp3" 1 9 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1906 33 1
"3603" "exp3" 1 10 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1412 40 1
"3603" "exp3" 1 11 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1008 29 1
"3603" "exp3" 1 12 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1404 0 0
"3603" "exp3" 1 13 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1479 15 1
"3603" "exp3" 1 14 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 983 0 0
"3603" "exp3" 1 15 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1105 15 1
"3603" "exp3" 1 16 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 784 34 1
"3603" "exp3" 1 17 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 723 36 1
"3603" "exp3" 1 18 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1629 0 0
"3603" "exp3" 1 19 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1471 24 1
"3603" "exp3" 1 20 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 984 0 0
"3603" "exp3" 1 21 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 680 0 0
"3603" "exp3" 1 22 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 1057 0 0
"3603" "exp3" 1 23 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1356 28 1
"3603" "exp3" 1 24 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 2668 10 1
"3603" "exp3" 1 25 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1250 0 0
"3603" "exp3" 1 26 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1323 83 1
"3603" "exp3" 1 27 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1674 0 0
"3603" "exp3" 1 28 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 1562 0 0
"3603" "exp3" 1 29 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 1231 0 0
"3603" "exp3" 1 30 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1325 0 0
"3603" "exp3" 1 31 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1545 14 1
"3603" "exp3" 1 32 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 4040 13 1
"3603" "exp3" 1 33 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 1152 78 1
"3603" "exp3" 1 34 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1066 0 0
"3603" "exp3" 1 35 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 788 73 1
"3603" "exp3" 1 36 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 2537 0 0
"3603" "exp3" 1 37 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 738 74 1
"3603" "exp3" 1 38 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1301 0 0
"3603" "exp3" 1 39 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 819 0 0
"3603" "exp3" 1 40 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1022 23 1
"3603" "exp3" 1 41 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 949 0 0
"3603" "exp3" 1 42 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1024 0 0
"3603" "exp3" 1 43 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1098 0 0
"3603" "exp3" 1 44 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1470 30 1
"3603" "exp3" 1 45 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1676 39 1
"3603" "exp3" 1 46 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1189 87 1
"3603" "exp3" 1 47 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 2353 69 1
"3603" "exp3" 1 48 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 772 75 1
"3603" "exp3" 1 49 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 711 0 0
"3603" "exp3" 1 50 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1363 0 0
"3603" "exp3" 1 51 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 2428 31 1
"3603" "exp3" 1 52 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1739 44 1
"3603" "exp3" 1 53 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1530 0 0
"3603" "exp3" 1 54 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1920 0 0
"3603" "exp3" 1 55 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1550 0 0
"3603" "exp3" 1 56 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 1041 0 0
"3603" "exp3" 1 57 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 1660 61 1
"3603" "exp3" 1 58 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 1900 0 0
"3603" "exp3" 1 59 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1673 45 1
"3603" "exp3" 1 60 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1167 0 0
"3603" "exp3" 1 61 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 2017 0 0
"3603" "exp3" 1 62 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1477 68 1
"3603" "exp3" 1 63 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1259 69 1
"3603" "exp3" 1 64 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 777 0 0
"3603" "exp3" 1 65 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 703 0 0
"3603" "exp3" 1 66 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1663 37 1
"3603" "exp3" 1 67 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1943 21 1
"3603" "exp3" 1 68 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1040 0 0
"3603" "exp3" 1 69 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1715 35 1
"3603" "exp3" 1 70 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1383 0 0
"3603" "exp3" 1 71 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1554 0 0
"3603" "exp3" 1 72 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1738 0 0
"3603" "exp3" 1 73 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1785 20 1
"3603" "exp3" 1 74 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1344 40 1
"3603" "exp3" 1 75 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1617 23 1
"3603" "exp3" 1 76 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1365 0 0
"3603" "exp3" 1 77 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 2038 0 0
"3603" "exp3" 1 78 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1452 0 0
"3603" "exp3" 1 79 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1896 30 1
"3603" "exp3" 1 80 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1147 38 1
"3603" "exp3" 1 81 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1188 22 1
"3603" "exp3" 1 82 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1395 0 0
"3603" "exp3" 1 83 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1417 81 1
"3603" "exp3" 1 84 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 881 0 0
"3603" "exp3" 1 85 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1259 27 1
"3603" "exp3" 1 86 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 693 37 1
"3603" "exp3" 1 87 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 998 27 1
"3603" "exp3" 1 88 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 744 0 0
"3603" "exp3" 1 89 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1298 82 1
"3603" "exp3" 1 90 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 939 0 0
"3603" "exp3" 1 91 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1903 0 0
"3603" "exp3" 1 92 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1346 44 1
"3603" "exp3" 1 93 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 919 0 0
"3603" "exp3" 1 94 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1891 27 1
"3603" "exp3" 1 95 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 993 33 1
"3603" "exp3" 1 96 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 646 42 1
"3603" "exp3" 1 97 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 2131 0 0
"3603" "exp3" 1 98 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 996 29 1
"3603" "exp3" 1 99 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 785 0 0
"3603" "exp3" 1 100 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 2466 28 1
"3603" "exp3" 1 101 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 815 32 1
"3603" "exp3" 1 102 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 868 42 1
"3603" "exp3" 1 103 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1212 41 1
"3603" "exp3" 1 104 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1457 25 1
"3603" "exp3" 1 105 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1428 18 1
"3603" "exp3" 1 106 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 868 26 1
"3603" "exp3" 1 107 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1796 23 1
"3603" "exp3" 1 108 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2378 49 1
"3603" "exp3" 1 109 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 2532 0 0
"3603" "exp3" 1 110 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1787 0 0
"3603" "exp3" 1 111 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1585 0 0
"3603" "exp3" 1 112 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1204 45 1
"3603" "exp3" 1 113 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 2038 0 0
"3603" "exp3" 1 114 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1132 0 0
"3603" "exp3" 1 115 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1475 24 1
"3603" "exp3" 1 116 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1121 0 0
"3603" "exp3" 1 117 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1970 48 1
"3603" "exp3" 1 118 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1233 0 0
"3603" "exp3" 1 119 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1565 0 0
"3603" "exp3" 1 120 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1407 0 0
"3603" "exp3" 1 121 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1243 32 1
"3603" "exp3" 1 122 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 951 32 1
"3603" "exp3" 1 123 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1019 35 1
"3603" "exp3" 1 124 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 792 31 1
"3603" "exp3" 1 125 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1586 0 0
"3603" "exp3" 1 126 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1714 83 1
"3603" "exp3" 1 127 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 3902 21 1
"3603" "exp3" 1 128 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1956 0 0
"3603" "exp3" 1 129 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2306 0 0
"3603" "exp3" 1 130 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1545 46 1
"3603" "exp3" 1 131 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1179 0 0
"3603" "exp3" 1 132 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2139 0 0
"3603" "exp3" 2 1 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1374 0 0
"3603" "exp3" 2 2 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1319 0 0
"3603" "exp3" 2 3 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 922 0 0
"3603" "exp3" 2 4 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 1129 30 1
"3603" "exp3" 2 5 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1091 0 0
"3603" "exp3" 2 6 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 1154 66 1
"3603" "exp3" 2 7 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1018 32 1
"3603" "exp3" 2 8 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1426 0 0
"3603" "exp3" 2 9 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1507 42 1
"3603" "exp3" 2 10 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1394 0 0
"3603" "exp3" 2 11 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 703 0 0
"3603" "exp3" 2 12 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1207 30 1
"3603" "exp3" 2 13 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1158 22 1
"3603" "exp3" 2 14 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 1375 0 0
"3603" "exp3" 2 15 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1527 23 1
"3603" "exp3" 2 16 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1148 34 1
"3603" "exp3" 2 17 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1243 0 0
"3603" "exp3" 2 18 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 795 31 1
"3603" "exp3" 2 19 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 921 26 1
"3603" "exp3" 2 20 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2216 18 1
"3603" "exp3" 2 21 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 2629 69 1
"3603" "exp3" 2 22 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1554 88 1
"3603" "exp3" 2 23 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 2037 0 0
"3603" "exp3" 2 24 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1684 0 0
"3603" "exp3" 2 25 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1014 24 1
"3603" "exp3" 2 26 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 919 0 0
"3603" "exp3" 2 27 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1127 10 1
"3603" "exp3" 2 28 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1099 31 1
"3603" "exp3" 2 29 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1418 15 1
"3603" "exp3" 2 30 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1230 0 0
"3603" "exp3" 2 31 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1741 0 0
"3603" "exp3" 2 32 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1482 30 1
"3603" "exp3" 2 33 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1827 0 0
"3603" "exp3" 2 34 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1442 0 0
"3603" "exp3" 2 35 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 789 33 1
"3603" "exp3" 2 36 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1794 0 0
"3603" "exp3" 2 37 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 865 27 1
"3603" "exp3" 2 38 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 1075 0 0
"3603" "exp3" 2 39 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 1205 0 0
"3603" "exp3" 2 40 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 729 25 1
"3603" "exp3" 2 41 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1218 35 1
"3603" "exp3" 2 42 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 2325 0 0
"3603" "exp3" 2 43 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1512 36 1
"3603" "exp3" 2 44 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1035 0 0
"3603" "exp3" 2 45 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 806 21 1
"3603" "exp3" 2 46 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 782 14 1
"3603" "exp3" 2 47 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1067 39 1
"3603" "exp3" 2 48 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 2380 32 1
"3603" "exp3" 2 49 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 961 0 0
"3603" "exp3" 2 50 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1030 28 1
"3603" "exp3" 2 51 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1338 0 0
"3603" "exp3" 2 52 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 902 19 1
"3603" "exp3" 2 53 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1080 0 0
"3603" "exp3" 2 54 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 922 24 1
"3603" "exp3" 2 55 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 906 38 1
"3603" "exp3" 2 56 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 610 37 1
"3603" "exp3" 2 57 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 680 0 0
"3603" "exp3" 2 58 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 543 0 0
"3603" "exp3" 2 59 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 2259 0 0
"3603" "exp3" 2 60 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 1107 37 1
"3603" "exp3" 2 61 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 2184 0 0
"3603" "exp3" 2 62 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2071 0 0
"3603" "exp3" 2 63 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1741 83 1
"3603" "exp3" 2 64 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1286 36 1
"3603" "exp3" 2 65 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 948 0 0
"3603" "exp3" 2 66 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1010 0 0
"3603" "exp3" 2 67 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2049 0 0
"3603" "exp3" 2 68 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1920 61 1
"3603" "exp3" 2 69 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 1035 0 0
"3603" "exp3" 2 70 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1060 24 1
"3603" "exp3" 2 71 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 891 18 1
"3603" "exp3" 2 72 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 658 0 0
"3603" "exp3" 2 73 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 887 33 1
"3603" "exp3" 2 74 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 823 25 1
"3603" "exp3" 2 75 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 792 28 1
"3603" "exp3" 2 76 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 667 26 1
"3603" "exp3" 2 77 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 941 0 0
"3603" "exp3" 2 78 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1111 0 0
"3603" "exp3" 2 79 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 798 0 0
"3603" "exp3" 2 80 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 665 29 1
"3603" "exp3" 2 81 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 845 35 1
"3603" "exp3" 2 82 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 867 46 1
"3603" "exp3" 2 83 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1163 14 1
"3603" "exp3" 2 84 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 793 32 1
"3603" "exp3" 2 85 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1235 28 1
"3603" "exp3" 2 86 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 973 26 1
"3603" "exp3" 2 87 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 1128 0 0
"3603" "exp3" 2 88 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1153 18 1
"3603" "exp3" 2 89 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 1388 0 0
"3603" "exp3" 2 90 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1432 11 1
"3603" "exp3" 2 91 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1609 0 0
"3603" "exp3" 2 92 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 835 22 1
"3603" "exp3" 2 93 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1264 0 0
"3603" "exp3" 2 94 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1484 0 0
"3603" "exp3" 2 95 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2980 49 1
"3603" "exp3" 2 96 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 1606 84 1
"3603" "exp3" 2 97 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1299 44 1
"3603" "exp3" 2 98 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1329 0 0
"3603" "exp3" 2 99 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 1051 62 1
"3603" "exp3" 2 100 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 723 0 0
"3603" "exp3" 2 101 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 929 22 1
"3603" "exp3" 2 102 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1232 21 1
"3603" "exp3" 2 103 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1377 0 0
"3603" "exp3" 2 104 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1136 0 0
"3603" "exp3" 2 105 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1341 0 0
"3603" "exp3" 2 106 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 1997 0 0
"3603" "exp3" 2 107 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1508 93 1
"3603" "exp3" 2 108 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1350 41 1
"3603" "exp3" 2 109 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 1730 0 0
"3603" "exp3" 2 110 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1263 20 1
"3603" "exp3" 2 111 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1033 20 1
"3603" "exp3" 2 112 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 938 0 0
"3603" "exp3" 2 113 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1068 0 0
"3603" "exp3" 2 114 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1132 27 1
"3603" "exp3" 2 115 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 995 43 1
"3603" "exp3" 2 116 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1457 36 1
"3603" "exp3" 2 117 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1238 19 1
"3603" "exp3" 2 118 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1789 20 1
"3603" "exp3" 2 119 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 1511 66 1
"3603" "exp3" 2 120 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1428 0 0
"3603" "exp3" 2 121 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 821 31 1
"3603" "exp3" 2 122 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 801 26 1
"3603" "exp3" 2 123 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 882 0 0
"3603" "exp3" 2 124 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 724 47 1
"3603" "exp3" 2 125 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1769 0 0
"3603" "exp3" 2 126 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1342 0 0
"3603" "exp3" 2 127 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1378 48 1
"3603" "exp3" 2 128 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 798 22 1
"3603" "exp3" 2 129 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1353 83 1
"3603" "exp3" 2 130 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 2327 29 1
"3603" "exp3" 2 131 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 939 23 1
"3603" "exp3" 2 132 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1019 0 0
"3603" "exp3" 1 1 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1059 47 1
"3603" "exp3" 1 2 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 937 16 1
"3603" "exp3" 1 3 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1227 0 0
"3603" "exp3" 1 4 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 2090 28 1
"3603" "exp3" 1 5 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1361 0 0
"3603" "exp3" 1 6 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1170 38 1
"3603" "exp3" 1 7 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1659 0 0
"3603" "exp3" 1 8 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1568 23 1
"3603" "exp3" 1 9 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1605 0 0
"3603" "exp3" 1 10 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1189 0 0
"3603" "exp3" 1 11 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 2073 13 1
"3603" "exp3" 1 12 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1074 20 1
"3603" "exp3" 1 13 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1681 0 0
"3603" "exp3" 1 14 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1043 26 1
"3603" "exp3" 1 15 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1274 0 0
"3603" "exp3" 1 16 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1598 27 1
"3603" "exp3" 1 17 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1396 29 1
"3603" "exp3" 1 18 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 858 24 1
"3603" "exp3" 1 19 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 852 0 0
"3603" "exp3" 1 20 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1717 20 1
"3603" "exp3" 1 21 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1202 32 1
"3603" "exp3" 1 22 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1603 23 1
"3603" "exp3" 1 23 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1134 39 1
"3603" "exp3" 1 24 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 706 36 1
"3603" "exp3" 1 25 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 1509 0 0
"3603" "exp3" 1 26 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1251 37 1
"3603" "exp3" 1 27 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 668 0 0
"3603" "exp3" 1 28 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 2152 0 0
"3603" "exp3" 1 29 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1144 0 0
"3603" "exp3" 1 30 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1154 0 0
"3603" "exp3" 1 31 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1015 30 1
"3603" "exp3" 1 32 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 2279 0 0
"3603" "exp3" 1 33 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1143 0 0
"3603" "exp3" 1 34 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 1187 33 1
"3603" "exp3" 1 35 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1340 0 0
"3603" "exp3" 1 36 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 874 92 1
"3603" "exp3" 1 37 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1033 22 1
"3603" "exp3" 1 38 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1309 19 1
"3603" "exp3" 1 39 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1341 18 1
"3603" "exp3" 1 40 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1440 26 1
"3603" "exp3" 1 41 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1179 0 0
"3603" "exp3" 1 42 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1177 33 1
"3603" "exp3" 1 43 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1100 37 1
"3603" "exp3" 1 44 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 873 0 0
"3603" "exp3" 1 45 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 582 27 1
"3603" "exp3" 1 46 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 656 26 1
"3603" "exp3" 1 47 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 822 0 0
"3603" "exp3" 1 48 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1983 48 1
"3603" "exp3" 1 49 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 752 38 1
"3603" "exp3" 1 50 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1175 29 1
"3603" "exp3" 1 51 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 1326 37 1
"3603" "exp3" 1 52 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2146 19 1
"3603" "exp3" 1 53 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1597 45 1
"3603" "exp3" 1 54 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 1599 0 0
"3603" "exp3" 1 55 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1231 33 1
"3603" "exp3" 1 56 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 2753 0 0
"3603" "exp3" 1 57 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1023 40 1
"3603" "exp3" 1 58 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1489 0 0
"3603" "exp3" 1 59 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1240 86 1
"3603" "exp3" 1 60 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 852 34 1
"3603" "exp3" 1 61 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1378 0 0
"3603" "exp3" 1 62 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1041 0 0
"3603" "exp3" 1 63 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1216 31 1
"3603" "exp3" 1 64 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1739 0 0
"3603" "exp3" 1 65 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 2260 21 1
"3603" "exp3" 1 66 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1071 0 0
"3603" "exp3" 1 67 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1001 0 0
"3603" "exp3" 1 68 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 1439 31 1
"3603" "exp3" 1 69 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 669 21 1
"3603" "exp3" 1 70 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 908 0 0
"3603" "exp3" 1 71 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 905 0 0
"3603" "exp3" 1 72 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 931 40 1
"3603" "exp3" 1 73 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 519 0 0
"3603" "exp3" 1 74 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 552 28 1
"3603" "exp3" 1 75 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 529 15 1
"3603" "exp3" 1 76 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 877 41 1
"3603" "exp3" 1 77 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 516 24 1
"3603" "exp3" 1 78 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 931 0 0
"3603" "exp3" 1 79 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1510 21 1
"3603" "exp3" 1 80 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 1621 0 0
"3603" "exp3" 1 81 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1652 17 1
"3603" "exp3" 1 82 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 822 0 0
"3603" "exp3" 1 83 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1265 0 0
"3603" "exp3" 1 84 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1543 14 1
"3603" "exp3" 1 85 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1849 30 1
"3603" "exp3" 1 86 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 783 0 0
"3603" "exp3" 1 87 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1623 0 0
"3603" "exp3" 1 88 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1101 0 0
"3603" "exp3" 1 89 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 2435 0 0
"3603" "exp3" 1 90 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 661 0 0
"3603" "exp3" 1 91 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 752 27 1
"3603" "exp3" 1 92 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 681 0 0
"3603" "exp3" 1 93 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 679 99 1
"3603" "exp3" 1 94 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 2194 29 1
"3603" "exp3" 1 95 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1320 24 1
"3603" "exp3" 1 96 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 668 17 1
"3603" "exp3" 1 97 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1237 0 0
"3603" "exp3" 1 98 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 3772 0 0
"3603" "exp3" 1 99 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1302 25 1
"3603" "exp3" 1 100 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1181 0 0
"3603" "exp3" 1 101 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1027 42 1
"3603" "exp3" 1 102 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1056 0 0
"3603" "exp3" 1 103 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1205 22 1
"3603" "exp3" 1 104 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 2079 77 1
"3603" "exp3" 1 105 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1483 35 1
"3603" "exp3" 1 106 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1709 31 1
"3603" "exp3" 1 107 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1249 46 1
"3603" "exp3" 1 108 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1143 22 1
"3603" "exp3" 1 109 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1253 0 0
"3603" "exp3" 1 110 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 2525 81 1
"3603" "exp3" 1 111 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 932 0 0
"3603" "exp3" 1 112 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1013 0 0
"3603" "exp3" 1 113 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1381 0 0
"3603" "exp3" 1 114 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 956 42 1
"3603" "exp3" 1 115 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 627 20 1
"3603" "exp3" 1 116 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1042 28 1
"3603" "exp3" 1 117 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 659 0 0
"3603" "exp3" 1 118 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 2247 25 1
"3603" "exp3" 1 119 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1065 22 1
"3603" "exp3" 1 120 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 822 0 0
"3603" "exp3" 1 121 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 811 0 0
"3603" "exp3" 1 122 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1326 85 1
"3603" "exp3" 1 123 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 766 0 0
"3603" "exp3" 1 124 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1208 35 1
"3603" "exp3" 1 125 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 667 27 1
"3603" "exp3" 1 126 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 1204 32 1
"3603" "exp3" 1 127 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1272 0 0
"3603" "exp3" 1 128 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 925 0 0
"3603" "exp3" 1 129 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1789 25 1
"3603" "exp3" 1 130 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1068 0 0
"3603" "exp3" 1 131 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 844 21 1
"3603" "exp3" 1 132 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 909 20 1
"3603" "exp3" 2 1 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 1316 0 0
"3603" "exp3" 2 2 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1163 0 0
"3603" "exp3" 2 3 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 689 0 0
"3603" "exp3" 2 4 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 962 0 0
"3603" "exp3" 2 5 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 563 20 1
"3603" "exp3" 2 6 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 987 0 0
"3603" "exp3" 2 7 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 616 34 1
"3603" "exp3" 2 8 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 738 0 0
"3603" "exp3" 2 9 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1152 0 0
"3603" "exp3" 2 10 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1701 82 1
"3603" "exp3" 2 11 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 648 0 0
"3603" "exp3" 2 12 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 895 0 0
"3603" "exp3" 2 13 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1084 0 0
"3603" "exp3" 2 14 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 886 15 1
"3603" "exp3" 2 15 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1065 24 1
"3603" "exp3" 2 16 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1103 46 1
"3603" "exp3" 2 17 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1092 16 1
"3603" "exp3" 2 18 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 689 42 1
"3603" "exp3" 2 19 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 561 22 1
"3603" "exp3" 2 20 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 853 0 0
"3603" "exp3" 2 21 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1415 28 1
"3603" "exp3" 2 22 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 639 70 1
"3603" "exp3" 2 23 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1668 0 0
"3603" "exp3" 2 24 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1339 85 1
"3603" "exp3" 2 25 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 915 0 0
"3603" "exp3" 2 26 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1489 29 1
"3603" "exp3" 2 27 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 788 33 1
"3603" "exp3" 2 28 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 1084 0 0
"3603" "exp3" 2 29 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 806 0 0
"3603" "exp3" 2 30 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 950 28 1
"3603" "exp3" 2 31 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1005 0 0
"3603" "exp3" 2 32 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 3146 45 1
"3603" "exp3" 2 33 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 921 0 0
"3603" "exp3" 2 34 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 2475 28 1
"3603" "exp3" 2 35 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 978 20 1
"3603" "exp3" 2 36 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2591 23 1
"3603" "exp3" 2 37 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1246 0 0
"3603" "exp3" 2 38 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 3063 22 1
"3603" "exp3" 2 39 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 929 35 1
"3603" "exp3" 2 40 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 730 30 1
"3603" "exp3" 2 41 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 842 0 0
"3603" "exp3" 2 42 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1331 0 0
"3603" "exp3" 2 43 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 1222 29 1
"3603" "exp3" 2 44 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 735 22 1
"3603" "exp3" 2 45 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 767 0 0
"3603" "exp3" 2 46 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1077 0 0
"3603" "exp3" 2 47 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1232 0 0
"3603" "exp3" 2 48 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1442 0 0
"3603" "exp3" 2 49 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 2859 38 1
"3603" "exp3" 2 50 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1433 0 0
"3603" "exp3" 2 51 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 833 0 0
"3603" "exp3" 2 52 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 725 42 1
"3603" "exp3" 2 53 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 555 0 0
"3603" "exp3" 2 54 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 647 33 1
"3603" "exp3" 2 55 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 730 93 1
"3603" "exp3" 2 56 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 955 18 1
"3603" "exp3" 2 57 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 894 31 1
"3603" "exp3" 2 58 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 714 28 1
"3603" "exp3" 2 59 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 592 40 1
"3603" "exp3" 2 60 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 725 36 1
"3603" "exp3" 2 61 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1023 39 1
"3603" "exp3" 2 62 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 655 35 1
"3603" "exp3" 2 63 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1196 0 0
"3603" "exp3" 2 64 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1207 26 1
"3603" "exp3" 2 65 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 807 0 0
"3603" "exp3" 2 66 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1187 0 0
"3603" "exp3" 2 67 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2260 17 1
"3603" "exp3" 2 68 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 1155 0 0
"3603" "exp3" 2 69 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 887 0 0
"3603" "exp3" 2 70 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 981 31 1
"3603" "exp3" 2 71 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 950 0 0
"3603" "exp3" 2 72 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1224 0 0
"3603" "exp3" 2 73 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1425 0 0
"3603" "exp3" 2 74 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 887 23 1
"3603" "exp3" 2 75 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 699 0 0
"3603" "exp3" 2 76 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1122 21 1
"3603" "exp3" 2 77 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1425 83 1
"3603" "exp3" 2 78 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1508 44 1
"3603" "exp3" 2 79 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 995 0 0
"3603" "exp3" 2 80 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 960 24 1
"3603" "exp3" 2 81 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 647 26 1
"3603" "exp3" 2 82 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 698 31 1
"3603" "exp3" 2 83 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 931 0 0
"3603" "exp3" 2 84 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 1060 32 1
"3603" "exp3" 2 85 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1320 0 0
"3603" "exp3" 2 86 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1447 0 0
"3603" "exp3" 2 87 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1491 0 0
"3603" "exp3" 2 88 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 830 0 0
"3603" "exp3" 2 89 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1162 38 1
"3603" "exp3" 2 90 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1413 0 0
"3603" "exp3" 2 91 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1112 0 0
"3603" "exp3" 2 92 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 925 37 1
"3603" "exp3" 2 93 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1548 0 0
"3603" "exp3" 2 94 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1200 81 1
"3603" "exp3" 2 95 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1334 0 0
"3603" "exp3" 2 96 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 953 0 0
"3603" "exp3" 2 97 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 1186 0 0
"3603" "exp3" 2 98 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 892 41 1
"3603" "exp3" 2 99 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1455 0 0
"3603" "exp3" 2 100 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1461 24 1
"3603" "exp3" 2 101 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 824 34 1
"3603" "exp3" 2 102 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1878 0 0
"3603" "exp3" 2 103 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 2571 39 1
"3603" "exp3" 2 104 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 1438 33 1
"3603" "exp3" 2 105 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 994 0 0
"3603" "exp3" 2 106 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 2359 0 0
"3603" "exp3" 2 107 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 913 30 1
"3603" "exp3" 2 108 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 809 0 0
"3603" "exp3" 2 109 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 873 0 0
"3603" "exp3" 2 110 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1146 0 0
"3603" "exp3" 2 111 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 604 44 1
"3603" "exp3" 2 112 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 1614 0 0
"3603" "exp3" 2 113 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1177 0 0
"3603" "exp3" 2 114 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 1187 0 0
"3603" "exp3" 2 115 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 1032 0 0
"3603" "exp3" 2 116 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 850 0 0
"3603" "exp3" 2 117 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 776 0 0
"3603" "exp3" 2 118 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 809 33 1
"3603" "exp3" 2 119 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 612 32 1
"3603" "exp3" 2 120 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 882 49 1
"3603" "exp3" 2 121 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1490 0 0
"3603" "exp3" 2 122 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 813 0 0
"3603" "exp3" 2 123 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 3139 0 0
"3603" "exp3" 2 124 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1126 40 1
"3603" "exp3" 2 125 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1049 0 0
"3603" "exp3" 2 126 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 848 27 1
"3603" "exp3" 2 127 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 1140 0 0
"3603" "exp3" 2 128 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 749 81 1
"3603" "exp3" 2 129 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 811 0 0
"3603" "exp3" 2 130 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 2326 76 1
"3603" "exp3" 2 131 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1067 26 1
"3603" "exp3" 2 132 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1016 43 1
"3603" "exp3" 1 1 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1086 0 0
"3603" "exp3" 1 2 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 894 35 1
"3603" "exp3" 1 3 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1062 21 1
"3603" "exp3" 1 4 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 1864 0 0
"3603" "exp3" 1 5 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 856 28 1
"3603" "exp3" 1 6 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 706 35 1
"3603" "exp3" 1 7 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 602 40 1
"3603" "exp3" 1 8 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 608 25 1
"3603" "exp3" 1 9 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 761 14 1
"3603" "exp3" 1 10 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1083 30 1
"3603" "exp3" 1 11 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 748 13 1
"3603" "exp3" 1 12 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1195 45 1
"3603" "exp3" 1 13 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2173 17 1
"3603" "exp3" 1 14 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 2507 49 1
"3603" "exp3" 1 15 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1302 26 1
"3603" "exp3" 1 16 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 788 19 1
"3603" "exp3" 1 17 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1073 0 0
"3603" "exp3" 1 18 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1196 36 1
"3603" "exp3" 1 19 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2083 46 1
"3603" "exp3" 1 20 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1038 0 0
"3603" "exp3" 1 21 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1013 14 1
"3603" "exp3" 1 22 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1425 34 1
"3603" "exp3" 1 23 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 1525 30 1
"3603" "exp3" 1 24 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1093 19 1
"3603" "exp3" 1 25 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2241 0 0
"3603" "exp3" 1 26 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1786 0 0
"3603" "exp3" 1 27 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1428 10 1
"3603" "exp3" 1 28 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1405 0 0
"3603" "exp3" 1 29 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 771 0 0
"3603" "exp3" 1 30 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1102 17 1
"3603" "exp3" 1 31 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 875 31 1
"3603" "exp3" 1 32 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 832 21 1
"3603" "exp3" 1 33 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 923 16 1
"3603" "exp3" 1 34 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1482 35 1
"3603" "exp3" 1 35 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1823 27 1
"3603" "exp3" 1 36 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1865 39 1
"3603" "exp3" 1 37 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1239 0 0
"3603" "exp3" 1 38 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1105 41 1
"3603" "exp3" 1 39 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1273 24 1
"3603" "exp3" 1 40 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 2285 22 1
"3603" "exp3" 1 41 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1508 0 0
"3603" "exp3" 1 42 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1857 0 0
"3603" "exp3" 1 43 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 2701 19 1
"3603" "exp3" 1 44 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1544 0 0
"3603" "exp3" 1 45 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1328 48 1
"3603" "exp3" 1 46 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1505 32 1
"3603" "exp3" 1 47 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1742 25 1
"3603" "exp3" 1 48 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 2477 23 1
"3603" "exp3" 1 49 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1003 0 0
"3603" "exp3" 1 50 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 2230 30 1
"3603" "exp3" 1 51 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1014 29 1
"3603" "exp3" 1 52 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1324 0 0
"3603" "exp3" 1 53 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1943 43 1
"3603" "exp3" 1 54 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1953 21 1
"3603" "exp3" 1 55 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1134 24 1
"3603" "exp3" 1 56 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1301 24 1
"3603" "exp3" 1 57 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1268 27 1
"3603" "exp3" 1 58 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 941 37 1
"3603" "exp3" 1 59 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1327 0 0
"3603" "exp3" 1 60 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1568 0 0
"3603" "exp3" 1 61 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1115 17 1
"3603" "exp3" 1 62 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1271 45 1
"3603" "exp3" 1 63 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 3121 22 1
"3603" "exp3" 1 64 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1495 16 1
"3603" "exp3" 1 65 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1019 42 1
"3603" "exp3" 1 66 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 869 0 0
"3603" "exp3" 1 67 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1562 22 1
"3603" "exp3" 1 68 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1082 34 1
"3603" "exp3" 1 69 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1069 95 1
"3603" "exp3" 1 70 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1242 36 1
"3603" "exp3" 1 71 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1194 36 1
"3603" "exp3" 1 72 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1233 14 1
"3603" "exp3" 1 73 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 3042 16 1
"3603" "exp3" 1 74 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1217 0 0
"3603" "exp3" 1 75 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1402 18 1
"3603" "exp3" 1 76 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 2019 0 0
"3603" "exp3" 1 77 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 2966 85 1
"3603" "exp3" 1 78 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1883 0 0
"3603" "exp3" 1 79 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1020 0 0
"3603" "exp3" 1 80 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1245 0 0
"3603" "exp3" 1 81 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 2075 29 1
"3603" "exp3" 1 82 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 2151 0 0
"3603" "exp3" 1 83 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1356 28 1
"3603" "exp3" 1 84 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1674 38 1
"3603" "exp3" 1 85 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1660 0 0
"3603" "exp3" 1 86 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2812 41 1
"3603" "exp3" 1 87 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 2246 18 1
"3603" "exp3" 1 88 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 837 0 0
"3603" "exp3" 1 89 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1152 0 0
"3603" "exp3" 1 90 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1614 20 1
"3603" "exp3" 1 91 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1914 53 1
"3603" "exp3" 1 92 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 2072 0 0
"3603" "exp3" 1 93 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 3434 23 1
"3603" "exp3" 1 94 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2019 38 1
"3603" "exp3" 1 95 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1462 32 1
"3603" "exp3" 1 96 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2113 37 1
"3603" "exp3" 1 97 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1821 43 1
"3603" "exp3" 1 98 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2134 30 1
"3603" "exp3" 1 99 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 2017 0 0
"3603" "exp3" 1 100 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 2723 29 1
"3603" "exp3" 1 101 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1826 44 1
"3603" "exp3" 1 102 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1364 25 1
"3603" "exp3" 1 103 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1164 42 1
"3603" "exp3" 1 104 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 2234 0 0
"3603" "exp3" 1 105 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 1860 0 0
"3603" "exp3" 1 106 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1432 83 1
"3603" "exp3" 1 107 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 1577 0 0
"3603" "exp3" 1 108 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1134 24 1
"3603" "exp3" 1 109 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1358 20 1
"3603" "exp3" 1 110 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1182 0 0
"3603" "exp3" 1 111 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1733 15 1
"3603" "exp3" 1 112 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1506 32 1
"3603" "exp3" 1 113 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 2079 77 1
"3603" "exp3" 1 114 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1173 26 1
"3603" "exp3" 1 115 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 939 40 1
"3603" "exp3" 1 116 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 872 33 1
"3603" "exp3" 1 117 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1716 0 0
"3603" "exp3" 1 118 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1348 0 0
"3603" "exp3" 1 119 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1427 0 0
"3603" "exp3" 1 120 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1092 21 1
"3603" "exp3" 1 121 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1585 20 1
"3603" "exp3" 1 122 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 773 12 1
"3603" "exp3" 1 123 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1156 0 0
"3603" "exp3" 1 124 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 2309 0 0
"3603" "exp3" 1 125 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1279 0 0
"3603" "exp3" 1 126 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1570 19 1
"3603" "exp3" 1 127 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1199 91 1
"3603" "exp3" 1 128 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 3055 28 1
"3603" "exp3" 1 129 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1427 0 0
"3603" "exp3" 1 130 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1222 31 1
"3603" "exp3" 1 131 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1091 33 1
"3603" "exp3" 1 132 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1411 0 0
"3603" "exp3" 2 1 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1902 0 0
"3603" "exp3" 2 2 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 936 0 0
"3603" "exp3" 2 3 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1211 35 1
"3603" "exp3" 2 4 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 697 31 1
"3603" "exp3" 2 5 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1064 26 1
"3603" "exp3" 2 6 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 932 44 1
"3603" "exp3" 2 7 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 929 0 0
"3603" "exp3" 2 8 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 940 0 0
"3603" "exp3" 2 9 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 953 29 1
"3603" "exp3" 2 10 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1399 20 1
"3603" "exp3" 2 11 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 1100 31 1
"3603" "exp3" 2 12 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 765 10 1
"3603" "exp3" 2 13 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 2104 20 1
"3603" "exp3" 2 14 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 942 22 1
"3603" "exp3" 2 15 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 944 32 1
"3603" "exp3" 2 16 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 964 0 0
"3603" "exp3" 2 17 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1309 26 1
"3603" "exp3" 2 18 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1632 0 0
"3603" "exp3" 2 19 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1171 25 1
"3603" "exp3" 2 20 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 2760 33 1
"3603" "exp3" 2 21 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 2099 30 1
"3603" "exp3" 2 22 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1204 24 1
"3603" "exp3" 2 23 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1846 24 1
"3603" "exp3" 2 24 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1965 21 1
"3603" "exp3" 2 25 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1263 0 0
"3603" "exp3" 2 26 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 2520 19 1
"3603" "exp3" 2 27 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1081 0 0
"3603" "exp3" 2 28 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1472 0 0
"3603" "exp3" 2 29 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1398 45 1
"3603" "exp3" 2 30 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1063 0 0
"3603" "exp3" 2 31 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1083 93 1
"3603" "exp3" 2 32 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1704 0 0
"3603" "exp3" 2 33 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1424 17 1
"3603" "exp3" 2 34 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1286 0 0
"3603" "exp3" 2 35 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1124 0 0
"3603" "exp3" 2 36 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1419 0 0
"3603" "exp3" 2 37 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1068 21 1
"3603" "exp3" 2 38 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1052 0 0
"3603" "exp3" 2 39 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1385 33 1
"3603" "exp3" 2 40 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1380 43 1
"3603" "exp3" 2 41 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1292 0 0
"3603" "exp3" 2 42 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 2443 0 0
"3603" "exp3" 2 43 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1269 28 1
"3603" "exp3" 2 44 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 933 26 1
"3603" "exp3" 2 45 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 2157 0 0
"3603" "exp3" 2 46 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 2350 14 1
"3603" "exp3" 2 47 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2827 29 1
"3603" "exp3" 2 48 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1229 0 0
"3603" "exp3" 2 49 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 758 31 1
"3603" "exp3" 2 50 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1156 0 0
"3603" "exp3" 2 51 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 760 24 1
"3603" "exp3" 2 52 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 1003 0 0
"3603" "exp3" 2 53 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 877 16 1
"3603" "exp3" 2 54 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1568 21 1
"3603" "exp3" 2 55 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1751 19 1
"3603" "exp3" 2 56 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1718 12 1
"3603" "exp3" 2 57 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1879 22 1
"3603" "exp3" 2 58 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 2020 29 1
"3603" "exp3" 2 59 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1604 0 0
"3603" "exp3" 2 60 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 3241 30 1
"3603" "exp3" 2 61 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1911 83 1
"3603" "exp3" 2 62 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 2786 0 0
"3603" "exp3" 2 63 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2048 46 1
"3603" "exp3" 2 64 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1563 33 1
"3603" "exp3" 2 65 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2033 38 1
"3603" "exp3" 2 66 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1108 0 0
"3603" "exp3" 2 67 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 846 28 1
"3603" "exp3" 2 68 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 817 0 0
"3603" "exp3" 2 69 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1197 96 1
"3603" "exp3" 2 70 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1119 31 1
"3603" "exp3" 2 71 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 2760 0 0
"3603" "exp3" 2 72 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1740 0 0
"3603" "exp3" 2 73 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1072 34 1
"3603" "exp3" 2 74 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1261 25 1
"3603" "exp3" 2 75 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1235 27 1
"3603" "exp3" 2 76 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1617 37 1
"3603" "exp3" 2 77 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1018 39 1
"3603" "exp3" 2 78 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1368 0 0
"3603" "exp3" 2 79 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1169 23 1
"3603" "exp3" 2 80 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1576 15 1
"3603" "exp3" 2 81 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 2989 0 0
"3603" "exp3" 2 82 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1547 28 1
"3603" "exp3" 2 83 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1091 0 0
"3603" "exp3" 2 84 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 2 1591 0 0
"3603" "exp3" 2 85 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1225 0 0
"3603" "exp3" 2 86 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 2625 18 1
"3603" "exp3" 2 87 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1769 83 1
"3603" "exp3" 2 88 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 2337 0 0
"3603" "exp3" 2 89 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1012 36 1
"3603" "exp3" 2 90 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 2777 0 0
"3603" "exp3" 2 91 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1597 36 1
"3603" "exp3" 2 92 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1295 0 0
"3603" "exp3" 2 93 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1833 0 0
"3603" "exp3" 2 94 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1408 0 0
"3603" "exp3" 2 95 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1142 0 0
"3603" "exp3" 2 96 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1112 0 0
"3603" "exp3" 2 97 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 823 42 1
"3603" "exp3" 2 98 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1497 0 0
"3603" "exp3" 2 99 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1027 23 1
"3603" "exp3" 2 100 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1029 0 0
"3603" "exp3" 2 101 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 756 15 1
"3603" "exp3" 2 102 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1800 20 1
"3603" "exp3" 2 103 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1463 45 1
"3603" "exp3" 2 104 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 1223 0 0
"3603" "exp3" 2 105 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 750 0 0
"3603" "exp3" 2 106 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 740 20 1
"3603" "exp3" 2 107 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 702 0 0
"3603" "exp3" 2 108 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1231 0 0
"3603" "exp3" 2 109 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 979 32 1
"3603" "exp3" 2 110 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1679 18 1
"3603" "exp3" 2 111 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1025 28 1
"3603" "exp3" 2 112 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1041 41 1
"3603" "exp3" 2 113 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1604 0 0
"3603" "exp3" 2 114 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1598 0 0
"3603" "exp3" 2 115 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1840 25 1
"3603" "exp3" 2 116 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1836 24 1
"3603" "exp3" 2 117 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 2666 0 0
"3603" "exp3" 2 118 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1509 0 0
"3603" "exp3" 2 119 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 866 0 0
"3603" "exp3" 2 120 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 944 42 1
"3603" "exp3" 2 121 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 647 34 1
"3603" "exp3" 2 122 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1821 93 1
"3603" "exp3" 2 123 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1006 18 1
"3603" "exp3" 2 124 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 739 39 1
"3603" "exp3" 2 125 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 601 25 1
"3603" "exp3" 2 126 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 1787 0 0
"3603" "exp3" 2 127 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1028 49 1
"3603" "exp3" 2 128 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 924 32 1
"3603" "exp3" 2 129 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 935 23 1
"3603" "exp3" 2 130 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 831 35 1
"3603" "exp3" 2 131 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 922 27 1
"3603" "exp3" 2 132 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1156 23 1
"3604" "exp3" 1 1 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 532 39 1
"3604" "exp3" 1 2 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 391 0 0
"3604" "exp3" 1 3 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 581 0 0
"3604" "exp3" 1 4 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 536 23 1
"3604" "exp3" 1 5 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 580 28 1
"3604" "exp3" 1 6 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 891 0 0
"3604" "exp3" 1 7 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 520 63 1
"3604" "exp3" 1 8 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 636 0 0
"3604" "exp3" 1 9 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 734 0 0
"3604" "exp3" 1 10 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 692 47 1
"3604" "exp3" 1 11 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 651 30 1
"3604" "exp3" 1 12 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 759 40 1
"3604" "exp3" 1 13 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 647 89 1
"3604" "exp3" 1 14 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 580 2 1
"3604" "exp3" 1 15 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 833 0 0
"3604" "exp3" 1 16 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 478 42 1
"3604" "exp3" 1 17 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 566 0 0
"3604" "exp3" 1 18 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 707 57 1
"3604" "exp3" 1 19 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1050 80 1
"3604" "exp3" 1 20 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 737 0 0
"3604" "exp3" 1 21 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1078 15 1
"3604" "exp3" 1 22 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 618 0 0
"3604" "exp3" 1 23 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 746 14 1
"3604" "exp3" 1 24 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 821 0 0
"3604" "exp3" 1 25 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 941 0 0
"3604" "exp3" 1 26 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 997 20 1
"3604" "exp3" 1 27 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 856 0 0
"3604" "exp3" 1 28 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 834 21 1
"3604" "exp3" 1 29 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1237 0 0
"3604" "exp3" 1 30 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 895 0 0
"3604" "exp3" 1 31 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 904 83 1
"3604" "exp3" 1 32 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 645 0 0
"3604" "exp3" 1 33 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 744 30 1
"3604" "exp3" 1 34 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1164 0 0
"3604" "exp3" 1 35 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 761 17 1
"3604" "exp3" 1 36 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 505 16 1
"3604" "exp3" 1 37 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1023 0 0
"3604" "exp3" 1 38 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 574 0 0
"3604" "exp3" 1 39 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 783 24 1
"3604" "exp3" 1 40 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 560 0 0
"3604" "exp3" 1 41 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 821 31 1
"3604" "exp3" 1 42 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1032 33 1
"3604" "exp3" 1 43 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 742 48 1
"3604" "exp3" 1 44 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 771 84 1
"3604" "exp3" 1 45 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 1343 0 0
"3604" "exp3" 1 46 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 911 0 0
"3604" "exp3" 1 47 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 775 0 0
"3604" "exp3" 1 48 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 572 36 1
"3604" "exp3" 1 49 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1001 0 0
"3604" "exp3" 1 50 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 784 32 1
"3604" "exp3" 1 51 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 653 0 0
"3604" "exp3" 1 52 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 711 0 0
"3604" "exp3" 1 53 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 737 59 1
"3604" "exp3" 1 54 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 756 29 1
"3604" "exp3" 1 55 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 910 0 0
"3604" "exp3" 1 56 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 813 44 1
"3604" "exp3" 1 57 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 681 18 1
"3604" "exp3" 1 58 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 749 0 0
"3604" "exp3" 1 59 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 1023 0 0
"3604" "exp3" 1 60 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 723 20 1
"3604" "exp3" 1 61 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 823 22 1
"3604" "exp3" 1 62 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 813 0 0
"3604" "exp3" 1 63 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 669 88 1
"3604" "exp3" 1 64 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 958 0 0
"3604" "exp3" 1 65 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 779 45 1
"3604" "exp3" 1 66 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 724 0 0
"3604" "exp3" 1 67 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 770 0 0
"3604" "exp3" 1 68 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 627 27 1
"3604" "exp3" 1 69 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 918 0 0
"3604" "exp3" 1 70 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 788 0 0
"3604" "exp3" 1 71 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 747 0 0
"3604" "exp3" 1 72 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 797 25 1
"3604" "exp3" 1 73 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 722 0 0
"3604" "exp3" 1 74 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 627 0 0
"3604" "exp3" 1 75 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 466 0 0
"3604" "exp3" 1 76 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 648 3 1
"3604" "exp3" 1 77 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 733 21 1
"3604" "exp3" 1 78 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 507 0 0
"3604" "exp3" 1 79 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 558 0 0
"3604" "exp3" 1 80 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 1115 14 1
"3604" "exp3" 1 81 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 708 0 0
"3604" "exp3" 1 82 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 619 91 1
"3604" "exp3" 1 83 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 401 72 1
"3604" "exp3" 1 84 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 461 81 1
"3604" "exp3" 1 85 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 698 0 0
"3604" "exp3" 1 86 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 627 0 0
"3604" "exp3" 1 87 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 352 67 1
"3604" "exp3" 1 88 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 367 0 0
"3604" "exp3" 1 89 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 420 18 1
"3604" "exp3" 1 90 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 449 0 0
"3604" "exp3" 1 91 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 451 32 1
"3604" "exp3" 1 92 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 795 27 1
"3604" "exp3" 1 93 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 422 0 0
"3604" "exp3" 1 94 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 548 0 0
"3604" "exp3" 1 95 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 453 49 1
"3604" "exp3" 1 96 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 391 0 0
"3604" "exp3" 1 97 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 536 0 0
"3604" "exp3" 1 98 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 396 45 1
"3604" "exp3" 1 99 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 822 7 1
"3604" "exp3" 1 100 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 501 0 0
"3604" "exp3" 1 101 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 454 0 0
"3604" "exp3" 1 102 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 143 0 0
"3604" "exp3" 1 103 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 590 0 0
"3604" "exp3" 1 104 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 399 44 1
"3604" "exp3" 1 105 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 650 10 1
"3604" "exp3" 1 106 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 841 0 0
"3604" "exp3" 1 107 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 461 0 0
"3604" "exp3" 1 108 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 352 0 0
"3604" "exp3" 1 109 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 490 76 1
"3604" "exp3" 1 110 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 303 75 1
"3604" "exp3" 1 111 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 852 0 0
"3604" "exp3" 1 112 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 438 0 0
"3604" "exp3" 1 113 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 819 81 1
"3604" "exp3" 1 114 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 665 0 0
"3604" "exp3" 1 115 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 1037 0 0
"3604" "exp3" 1 116 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 497 38 1
"3604" "exp3" 1 117 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 590 19 1
"3604" "exp3" 1 118 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 754 0 0
"3604" "exp3" 1 119 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 731 0 0
"3604" "exp3" 1 120 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 969 24 1
"3604" "exp3" 1 121 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1253 0 0
"3604" "exp3" 1 122 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 796 0 0
"3604" "exp3" 1 123 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1025 31 1
"3604" "exp3" 1 124 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 540 73 1
"3604" "exp3" 1 125 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 991 0 0
"3604" "exp3" 1 126 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 697 0 0
"3604" "exp3" 1 127 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1046 71 1
"3604" "exp3" 1 128 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1068 39 1
"3604" "exp3" 1 129 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 846 16 1
"3604" "exp3" 1 130 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 938 71 1
"3604" "exp3" 1 131 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 882 14 1
"3604" "exp3" 1 132 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1190 0 0
"3604" "exp3" 2 1 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 570 0 0
"3604" "exp3" 2 2 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 499 0 0
"3604" "exp3" 2 3 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 762 0 0
"3604" "exp3" 2 4 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 555 0 0
"3604" "exp3" 2 5 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 556 0 0
"3604" "exp3" 2 6 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 622 94 1
"3604" "exp3" 2 7 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 750 55 1
"3604" "exp3" 2 8 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 639 0 0
"3604" "exp3" 2 9 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 537 98 1
"3604" "exp3" 2 10 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 686 21 1
"3604" "exp3" 2 11 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 748 0 0
"3604" "exp3" 2 12 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 487 0 0
"3604" "exp3" 2 13 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 478 0 0
"3604" "exp3" 2 14 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 645 65 1
"3604" "exp3" 2 15 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 583 39 1
"3604" "exp3" 2 16 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 622 0 0
"3604" "exp3" 2 17 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 529 81 1
"3604" "exp3" 2 18 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 466 0 0
"3604" "exp3" 2 19 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 660 0 0
"3604" "exp3" 2 20 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 674 0 0
"3604" "exp3" 2 21 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 997 0 0
"3604" "exp3" 2 22 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 663 79 1
"3604" "exp3" 2 23 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 506 68 1
"3604" "exp3" 2 24 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 650 77 1
"3604" "exp3" 2 25 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 494 0 0
"3604" "exp3" 2 26 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1054 18 1
"3604" "exp3" 2 27 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 562 0 0
"3604" "exp3" 2 28 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 715 0 0
"3604" "exp3" 2 29 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 433 81 1
"3604" "exp3" 2 30 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 670 0 0
"3604" "exp3" 2 31 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 696 36 1
"3604" "exp3" 2 32 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 919 0 0
"3604" "exp3" 2 33 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 552 57 1
"3604" "exp3" 2 34 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 629 33 1
"3604" "exp3" 2 35 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 662 0 0
"3604" "exp3" 2 36 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 613 0 0
"3604" "exp3" 2 37 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 865 19 1
"3604" "exp3" 2 38 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 568 0 0
"3604" "exp3" 2 39 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 2 474 0 0
"3604" "exp3" 2 40 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 526 0 0
"3604" "exp3" 2 41 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 338 89 1
"3604" "exp3" 2 42 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 423 0 0
"3604" "exp3" 2 43 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 228 0 0
"3604" "exp3" 2 44 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 228 20 1
"3604" "exp3" 2 45 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 399 0 0
"3604" "exp3" 2 46 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 509 0 0
"3604" "exp3" 2 47 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 174 24 1
"3604" "exp3" 2 48 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 330 0 0
"3604" "exp3" 2 49 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 613 0 0
"3604" "exp3" 2 50 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 342 9 1
"3604" "exp3" 2 51 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 222 0 0
"3604" "exp3" 2 52 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 432 0 0
"3604" "exp3" 2 53 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 513 38 1
"3604" "exp3" 2 54 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 515 0 0
"3604" "exp3" 2 55 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 614 0 0
"3604" "exp3" 2 56 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 844 12 1
"3604" "exp3" 2 57 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 391 88 1
"3604" "exp3" 2 58 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 446 0 0
"3604" "exp3" 2 59 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 643 0 0
"3604" "exp3" 2 60 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 292 0 0
"3604" "exp3" 2 61 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 390 0 0
"3604" "exp3" 2 62 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 498 0 0
"3604" "exp3" 2 63 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 413 57 1
"3604" "exp3" 2 64 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 466 71 1
"3604" "exp3" 2 65 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 390 0 0
"3604" "exp3" 2 66 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 280 0 0
"3604" "exp3" 2 67 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 284 28 1
"3604" "exp3" 2 68 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 442 0 0
"3604" "exp3" 2 69 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 795 0 0
"3604" "exp3" 2 70 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 424 0 0
"3604" "exp3" 2 71 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 459 0 0
"3604" "exp3" 2 72 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 283 0 0
"3604" "exp3" 2 73 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 564 33 1
"3604" "exp3" 2 74 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 523 0 0
"3604" "exp3" 2 75 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 454 93 1
"3604" "exp3" 2 76 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 2 360 0 0
"3604" "exp3" 2 77 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 758 0 0
"3604" "exp3" 2 78 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 207 8 1
"3604" "exp3" 2 79 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 454 0 0
"3604" "exp3" 2 80 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 513 0 0
"3604" "exp3" 2 81 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 435 0 0
"3604" "exp3" 2 82 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 343 0 0
"3604" "exp3" 2 83 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 450 0 0
"3604" "exp3" 2 84 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 431 75 1
"3604" "exp3" 2 85 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 508 0 0
"3604" "exp3" 2 86 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 668 0 0
"3604" "exp3" 2 87 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 533 0 0
"3604" "exp3" 2 88 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 497 0 0
"3604" "exp3" 2 89 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 512 0 0
"3604" "exp3" 2 90 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 497 0 0
"3604" "exp3" 2 91 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 460 0 0
"3604" "exp3" 2 92 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 489 0 0
"3604" "exp3" 2 93 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 470 0 0
"3604" "exp3" 2 94 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 718 33 1
"3604" "exp3" 2 95 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 669 0 0
"3604" "exp3" 2 96 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 291 4 1
"3604" "exp3" 2 97 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 412 0 0
"3604" "exp3" 2 98 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1087 66 1
"3604" "exp3" 2 99 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 549 0 0
"3604" "exp3" 2 100 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 583 0 0
"3604" "exp3" 2 101 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 418 0 0
"3604" "exp3" 2 102 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 441 0 0
"3604" "exp3" 2 103 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 453 0 0
"3604" "exp3" 2 104 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 421 0 0
"3604" "exp3" 2 105 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 665 0 0
"3604" "exp3" 2 106 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 590 21 1
"3604" "exp3" 2 107 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 807 30 1
"3604" "exp3" 2 108 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 567 78 1
"3604" "exp3" 2 109 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 572 37 1
"3604" "exp3" 2 110 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 302 0 0
"3604" "exp3" 2 111 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 270 90 1
"3604" "exp3" 2 112 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 391 59 1
"3604" "exp3" 2 113 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 561 26 1
"3604" "exp3" 2 114 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 194 0 0
"3604" "exp3" 2 115 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 437 0 0
"3604" "exp3" 2 116 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 430 77 1
"3604" "exp3" 2 117 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 452 70 1
"3604" "exp3" 2 118 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 328 0 0
"3604" "exp3" 2 119 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 460 0 0
"3604" "exp3" 2 120 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 326 30 1
"3604" "exp3" 2 121 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 641 0 0
"3604" "exp3" 2 122 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 343 0 0
"3604" "exp3" 2 123 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 398 0 0
"3604" "exp3" 2 124 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 594 73 1
"3604" "exp3" 2 125 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 407 0 0
"3604" "exp3" 2 126 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 608 0 0
"3604" "exp3" 2 127 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 513 45 1
"3604" "exp3" 2 128 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 571 37 1
"3604" "exp3" 2 129 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 524 35 1
"3604" "exp3" 2 130 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 700 0 0
"3604" "exp3" 2 131 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 244 0 0
"3604" "exp3" 2 132 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 415 0 0
"3604" "exp3" 1 1 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 811 0 0
"3604" "exp3" 1 2 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 529 25 1
"3604" "exp3" 1 3 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 731 24 1
"3604" "exp3" 1 4 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 980 0 0
"3604" "exp3" 1 5 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1078 38 1
"3604" "exp3" 1 6 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1160 0 0
"3604" "exp3" 1 7 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 1220 23 1
"3604" "exp3" 1 8 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1126 0 0
"3604" "exp3" 1 9 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 737 10 1
"3604" "exp3" 1 10 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1099 42 1
"3604" "exp3" 1 11 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 904 41 1
"3604" "exp3" 1 12 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1025 0 0
"3604" "exp3" 1 13 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 802 39 1
"3604" "exp3" 1 14 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 1099 2 1
"3604" "exp3" 1 15 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 655 18 1
"3604" "exp3" 1 16 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 650 4 1
"3604" "exp3" 1 17 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1275 16 1
"3604" "exp3" 1 18 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1016 19 1
"3604" "exp3" 1 19 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 1159 0 0
"3604" "exp3" 1 20 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1336 19 1
"3604" "exp3" 1 21 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 905 0 0
"3604" "exp3" 1 22 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1112 0 0
"3604" "exp3" 1 23 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1319 0 0
"3604" "exp3" 1 24 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1216 28 1
"3604" "exp3" 1 25 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1268 0 0
"3604" "exp3" 1 26 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1362 40 1
"3604" "exp3" 1 27 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1081 0 0
"3604" "exp3" 1 28 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 761 0 0
"3604" "exp3" 1 29 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1520 0 0
"3604" "exp3" 1 30 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 1740 0 0
"3604" "exp3" 1 31 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 1240 0 0
"3604" "exp3" 1 32 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 784 32 1
"3604" "exp3" 1 33 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1054 0 0
"3604" "exp3" 1 34 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1209 0 0
"3604" "exp3" 1 35 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1031 0 0
"3604" "exp3" 1 36 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1165 43 1
"3604" "exp3" 1 37 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1269 35 1
"3604" "exp3" 1 38 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 678 37 1
"3604" "exp3" 1 39 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 897 63 1
"3604" "exp3" 1 40 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 618 0 0
"3604" "exp3" 1 41 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 528 26 1
"3604" "exp3" 1 42 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 426 0 0
"3604" "exp3" 1 43 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 444 15 1
"3604" "exp3" 1 44 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 685 0 0
"3604" "exp3" 1 45 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1565 0 0
"3604" "exp3" 1 46 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1419 36 1
"3604" "exp3" 1 47 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1266 0 0
"3604" "exp3" 1 48 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1473 11 1
"3604" "exp3" 1 49 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 756 21 1
"3604" "exp3" 1 50 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 462 0 0
"3604" "exp3" 1 51 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 544 0 0
"3604" "exp3" 1 52 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 600 20 1
"3604" "exp3" 1 53 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 912 0 0
"3604" "exp3" 1 54 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1314 82 1
"3604" "exp3" 1 55 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 593 1 1
"3604" "exp3" 1 56 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1149 14 1
"3604" "exp3" 1 57 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 1116 7 1
"3604" "exp3" 1 58 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 638 5 1
"3604" "exp3" 1 59 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 1003 67 1
"3604" "exp3" 1 60 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 963 27 1
"3604" "exp3" 1 61 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 824 0 0
"3604" "exp3" 1 62 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1246 23 1
"3604" "exp3" 1 63 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1297 44 1
"3604" "exp3" 1 64 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 2 1752 74 1
"3604" "exp3" 1 65 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1101 0 0
"3604" "exp3" 1 66 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 513 27 1
"3604" "exp3" 1 67 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 762 0 0
"3604" "exp3" 1 68 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 803 0 0
"3604" "exp3" 1 69 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 926 42 1
"3604" "exp3" 1 70 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 864 18 1
"3604" "exp3" 1 71 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 328 34 1
"3604" "exp3" 1 72 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 600 21 1
"3604" "exp3" 1 73 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 261 0 0
"3604" "exp3" 1 74 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1023 0 0
"3604" "exp3" 1 75 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1123 0 0
"3604" "exp3" 1 76 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 968 0 0
"3604" "exp3" 1 77 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 648 30 1
"3604" "exp3" 1 78 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 580 8 1
"3604" "exp3" 1 79 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 878 0 0
"3604" "exp3" 1 80 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 799 0 0
"3604" "exp3" 1 81 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 526 0 0
"3604" "exp3" 1 82 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 727 80 1
"3604" "exp3" 1 83 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 851 13 1
"3604" "exp3" 1 84 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 559 26 1
"3604" "exp3" 1 85 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 937 68 1
"3604" "exp3" 1 86 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 978 0 0
"3604" "exp3" 1 87 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1055 26 1
"3604" "exp3" 1 88 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 569 13 1
"3604" "exp3" 1 89 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1314 0 0
"3604" "exp3" 1 90 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 763 0 0
"3604" "exp3" 1 91 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 891 0 0
"3604" "exp3" 1 92 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 947 29 1
"3604" "exp3" 1 93 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 716 0 0
"3604" "exp3" 1 94 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 802 21 1
"3604" "exp3" 1 95 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 776 27 1
"3604" "exp3" 1 96 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1110 14 1
"3604" "exp3" 1 97 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1256 0 0
"3604" "exp3" 1 98 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 660 17 1
"3604" "exp3" 1 99 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 1021 0 0
"3604" "exp3" 1 100 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 927 0 0
"3604" "exp3" 1 101 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 382 32 1
"3604" "exp3" 1 102 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 295 31 1
"3604" "exp3" 1 103 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 717 80 1
"3604" "exp3" 1 104 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 435 0 0
"3604" "exp3" 1 105 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 399 12 1
"3604" "exp3" 1 106 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 721 40 1
"3604" "exp3" 1 107 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1072 72 1
"3604" "exp3" 1 108 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 728 0 0
"3604" "exp3" 1 109 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 752 0 0
"3604" "exp3" 1 110 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 942 52 1
"3604" "exp3" 1 111 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 932 0 0
"3604" "exp3" 1 112 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 754 70 1
"3604" "exp3" 1 113 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 896 0 0
"3604" "exp3" 1 114 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 619 0 0
"3604" "exp3" 1 115 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 724 17 1
"3604" "exp3" 1 116 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 1147 9 1
"3604" "exp3" 1 117 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 863 0 0
"3604" "exp3" 1 118 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 743 0 0
"3604" "exp3" 1 119 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 437 18 1
"3604" "exp3" 1 120 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 509 19 1
"3604" "exp3" 1 121 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1237 0 0
"3604" "exp3" 1 122 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1041 0 0
"3604" "exp3" 1 123 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 915 0 0
"3604" "exp3" 1 124 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 752 33 1
"3604" "exp3" 1 125 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1077 36 1
"3604" "exp3" 1 126 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 885 27 1
"3604" "exp3" 1 127 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1005 0 0
"3604" "exp3" 1 128 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 587 20 1
"3604" "exp3" 1 129 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 524 0 0
"3604" "exp3" 1 130 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 778 29 1
"3604" "exp3" 1 131 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1043 0 0
"3604" "exp3" 1 132 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 854 0 0
"3604" "exp3" 2 1 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 866 0 0
"3604" "exp3" 2 2 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 463 27 1
"3604" "exp3" 2 3 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 1068 35 1
"3604" "exp3" 2 4 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 635 20 1
"3604" "exp3" 2 5 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 934 0 0
"3604" "exp3" 2 6 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 650 21 1
"3604" "exp3" 2 7 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 815 84 1
"3604" "exp3" 2 8 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 708 24 1
"3604" "exp3" 2 9 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1016 0 0
"3604" "exp3" 2 10 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 956 24 1
"3604" "exp3" 2 11 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 630 34 1
"3604" "exp3" 2 12 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 663 37 1
"3604" "exp3" 2 13 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 835 0 0
"3604" "exp3" 2 14 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1001 0 0
"3604" "exp3" 2 15 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1622 0 0
"3604" "exp3" 2 16 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 961 0 0
"3604" "exp3" 2 17 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1990 0 0
"3604" "exp3" 2 18 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 845 0 0
"3604" "exp3" 2 19 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 696 28 1
"3604" "exp3" 2 20 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 798 28 1
"3604" "exp3" 2 21 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 655 0 0
"3604" "exp3" 2 22 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1265 0 0
"3604" "exp3" 2 23 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 641 29 1
"3604" "exp3" 2 24 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1182 0 0
"3604" "exp3" 2 25 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 554 23 1
"3604" "exp3" 2 26 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 650 44 1
"3604" "exp3" 2 27 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 538 26 1
"3604" "exp3" 2 28 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 674 9 1
"3604" "exp3" 2 29 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 483 21 1
"3604" "exp3" 2 30 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 861 41 1
"3604" "exp3" 2 31 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 585 23 1
"3604" "exp3" 2 32 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1236 69 1
"3604" "exp3" 2 33 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 733 17 1
"3604" "exp3" 2 34 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 949 75 1
"3604" "exp3" 2 35 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 614 0 0
"3604" "exp3" 2 36 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 533 0 0
"3604" "exp3" 2 37 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 682 0 0
"3604" "exp3" 2 38 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 580 0 0
"3604" "exp3" 2 39 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 711 0 0
"3604" "exp3" 2 40 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 595 1 1
"3604" "exp3" 2 41 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 502 34 1
"3604" "exp3" 2 42 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 568 40 1
"3604" "exp3" 2 43 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 564 25 1
"3604" "exp3" 2 44 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 619 26 1
"3604" "exp3" 2 45 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 508 39 1
"3604" "exp3" 2 46 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 455 42 1
"3604" "exp3" 2 47 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 487 14 1
"3604" "exp3" 2 48 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 188 0 0
"3604" "exp3" 2 49 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 556 28 1
"3604" "exp3" 2 50 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 490 32 1
"3604" "exp3" 2 51 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 873 0 0
"3604" "exp3" 2 52 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 633 0 0
"3604" "exp3" 2 53 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 769 0 0
"3604" "exp3" 2 54 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 470 31 1
"3604" "exp3" 2 55 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 492 29 1
"3604" "exp3" 2 56 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 441 0 0
"3604" "exp3" 2 57 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 454 38 1
"3604" "exp3" 2 58 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 429 32 1
"3604" "exp3" 2 59 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 254 0 0
"3604" "exp3" 2 60 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 35 80 1
"3604" "exp3" 2 61 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 247 19 1
"3604" "exp3" 2 62 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 434 39 1
"3604" "exp3" 2 63 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 316 10 1
"3604" "exp3" 2 64 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 476 8 1
"3604" "exp3" 2 65 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 388 36 1
"3604" "exp3" 2 66 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 446 15 1
"3604" "exp3" 2 67 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 878 37 1
"3604" "exp3" 2 68 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 944 0 0
"3604" "exp3" 2 69 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 2 779 0 0
"3604" "exp3" 2 70 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 668 27 1
"3604" "exp3" 2 71 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 914 0 0
"3604" "exp3" 2 72 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 915 0 0
"3604" "exp3" 2 73 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 987 55 1
"3604" "exp3" 2 74 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 957 18 1
"3604" "exp3" 2 75 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 1013 22 1
"3604" "exp3" 2 76 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1247 21 1
"3604" "exp3" 2 77 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 542 22 1
"3604" "exp3" 2 78 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1072 0 0
"3604" "exp3" 2 79 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1404 16 1
"3604" "exp3" 2 80 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 861 0 0
"3604" "exp3" 2 81 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1234 0 0
"3604" "exp3" 2 82 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 882 23 1
"3604" "exp3" 2 83 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 537 43 1
"3604" "exp3" 2 84 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1278 67 1
"3604" "exp3" 2 85 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 960 9 1
"3604" "exp3" 2 86 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 756 25 1
"3604" "exp3" 2 87 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 559 31 1
"3604" "exp3" 2 88 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 690 29 1
"3604" "exp3" 2 89 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 688 12 1
"3604" "exp3" 2 90 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 697 13 1
"3604" "exp3" 2 91 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 715 0 0
"3604" "exp3" 2 92 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 500 30 1
"3604" "exp3" 2 93 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 494 0 0
"3604" "exp3" 2 94 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 799 47 1
"3604" "exp3" 2 95 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 675 30 1
"3604" "exp3" 2 96 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 811 43 1
"3604" "exp3" 2 97 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 550 0 0
"3604" "exp3" 2 98 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 607 21 1
"3604" "exp3" 2 99 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 870 2 1
"3604" "exp3" 2 100 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 653 0 0
"3604" "exp3" 2 101 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1097 7 1
"3604" "exp3" 2 102 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 651 11 1
"3604" "exp3" 2 103 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 446 11 1
"3604" "exp3" 2 104 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 620 20 1
"3604" "exp3" 2 105 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 755 0 0
"3604" "exp3" 2 106 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1114 0 0
"3604" "exp3" 2 107 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 811 32 1
"3604" "exp3" 2 108 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 894 18 1
"3604" "exp3" 2 109 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 579 6 1
"3604" "exp3" 2 110 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 316 17 1
"3604" "exp3" 2 111 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 638 4 1
"3604" "exp3" 2 112 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 590 23 1
"3604" "exp3" 2 113 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 630 0 0
"3604" "exp3" 2 114 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 557 18 1
"3604" "exp3" 2 115 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 562 24 1
"3604" "exp3" 2 116 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 659 0 0
"3604" "exp3" 2 117 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 842 0 0
"3604" "exp3" 2 118 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 877 29 1
"3604" "exp3" 2 119 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 502 20 1
"3604" "exp3" 2 120 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 484 16 1
"3604" "exp3" 2 121 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 803 0 0
"3604" "exp3" 2 122 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 514 25 1
"3604" "exp3" 2 123 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 512 18 1
"3604" "exp3" 2 124 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 473 28 1
"3604" "exp3" 2 125 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 461 0 0
"3604" "exp3" 2 126 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 490 12 1
"3604" "exp3" 2 127 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 278 0 0
"3604" "exp3" 2 128 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 505 0 0
"3604" "exp3" 2 129 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 729 19 1
"3604" "exp3" 2 130 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 562 0 0
"3604" "exp3" 2 131 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 523 33 1
"3604" "exp3" 2 132 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 440 0 0
"3604" "exp3" 1 1 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1144 16 1
"3604" "exp3" 1 2 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 906 0 0
"3604" "exp3" 1 3 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 1221 0 0
"3604" "exp3" 1 4 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 1175 0 0
"3604" "exp3" 1 5 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 762 0 0
"3604" "exp3" 1 6 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1074 0 0
"3604" "exp3" 1 7 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1031 0 0
"3604" "exp3" 1 8 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 3171 0 0
"3604" "exp3" 1 9 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1476 0 0
"3604" "exp3" 1 10 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 844 83 1
"3604" "exp3" 1 11 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1174 46 1
"3604" "exp3" 1 12 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 885 0 0
"3604" "exp3" 1 13 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 967 40 1
"3604" "exp3" 1 14 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 848 0 0
"3604" "exp3" 1 15 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3089 0 0
"3604" "exp3" 1 16 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 868 0 0
"3604" "exp3" 1 17 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 750 0 0
"3604" "exp3" 1 18 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 952 27 1
"3604" "exp3" 1 19 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 668 0 0
"3604" "exp3" 1 20 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1440 25 1
"3604" "exp3" 1 21 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 670 34 1
"3604" "exp3" 1 22 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 710 17 1
"3604" "exp3" 1 23 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 2042 0 0
"3604" "exp3" 1 24 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1102 0 0
"3604" "exp3" 1 25 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1005 0 0
"3604" "exp3" 1 26 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1105 0 0
"3604" "exp3" 1 27 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 491 0 0
"3604" "exp3" 1 28 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1284 47 1
"3604" "exp3" 1 29 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 945 0 0
"3604" "exp3" 1 30 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 1335 34 1
"3604" "exp3" 1 31 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 756 0 0
"3604" "exp3" 1 32 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1101 0 0
"3604" "exp3" 1 33 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1309 76 1
"3604" "exp3" 1 34 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1723 24 1
"3604" "exp3" 1 35 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1190 79 1
"3604" "exp3" 1 36 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 896 0 0
"3604" "exp3" 1 37 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 832 0 0
"3604" "exp3" 1 38 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 568 0 0
"3604" "exp3" 1 39 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1001 70 1
"3604" "exp3" 1 40 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1102 31 1
"3604" "exp3" 1 41 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 749 0 0
"3604" "exp3" 1 42 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 1212 29 1
"3604" "exp3" 1 43 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1353 29 1
"3604" "exp3" 1 44 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1234 0 0
"3604" "exp3" 1 45 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1505 25 1
"3604" "exp3" 1 46 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 1420 8 1
"3604" "exp3" 1 47 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1492 0 0
"3604" "exp3" 1 48 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1113 0 0
"3604" "exp3" 1 49 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 709 97 1
"3604" "exp3" 1 50 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 504 0 0
"3604" "exp3" 1 51 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1064 0 0
"3604" "exp3" 1 52 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 700 0 0
"3604" "exp3" 1 53 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 431 68 1
"3604" "exp3" 1 54 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 470 0 0
"3604" "exp3" 1 55 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 259 28 1
"3604" "exp3" 1 56 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 482 0 0
"3604" "exp3" 1 57 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 393 0 0
"3604" "exp3" 1 58 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 800 0 0
"3604" "exp3" 1 59 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 582 0 0
"3604" "exp3" 1 60 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1216 0 0
"3604" "exp3" 1 61 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1177 0 0
"3604" "exp3" 1 62 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1029 0 0
"3604" "exp3" 1 63 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 695 52 1
"3604" "exp3" 1 64 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 637 36 1
"3604" "exp3" 1 65 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 1009 0 0
"3604" "exp3" 1 66 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 524 86 1
"3604" "exp3" 1 67 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 766 80 1
"3604" "exp3" 1 68 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 500 0 0
"3604" "exp3" 1 69 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 440 0 0
"3604" "exp3" 1 70 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1111 86 1
"3604" "exp3" 1 71 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1133 77 1
"3604" "exp3" 1 72 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 540 0 0
"3604" "exp3" 1 73 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1474 0 0
"3604" "exp3" 1 74 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 556 23 1
"3604" "exp3" 1 75 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 716 0 0
"3604" "exp3" 1 76 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 766 75 1
"3604" "exp3" 1 77 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1131 40 1
"3604" "exp3" 1 78 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 1718 0 0
"3604" "exp3" 1 79 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 763 0 0
"3604" "exp3" 1 80 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 797 38 1
"3604" "exp3" 1 81 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1407 0 0
"3604" "exp3" 1 82 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1106 0 0
"3604" "exp3" 1 83 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 850 26 1
"3604" "exp3" 1 84 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1026 43 1
"3604" "exp3" 1 85 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 631 0 0
"3604" "exp3" 1 86 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 536 0 0
"3604" "exp3" 1 87 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1401 0 0
"3604" "exp3" 1 88 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 834 0 0
"3604" "exp3" 1 89 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 614 0 0
"3604" "exp3" 1 90 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 429 0 0
"3604" "exp3" 1 91 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 421 0 0
"3604" "exp3" 1 92 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 590 82 1
"3604" "exp3" 1 93 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 580 0 0
"3604" "exp3" 1 94 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 948 89 1
"3604" "exp3" 1 95 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 1097 0 0
"3604" "exp3" 1 96 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 684 0 0
"3604" "exp3" 1 97 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 826 0 0
"3604" "exp3" 1 98 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 1797 71 1
"3604" "exp3" 1 99 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1244 0 0
"3604" "exp3" 1 100 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 992 18 1
"3604" "exp3" 1 101 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1492 64 1
"3604" "exp3" 1 102 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1469 0 0
"3604" "exp3" 1 103 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 1487 0 0
"3604" "exp3" 1 104 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1322 33 1
"3604" "exp3" 1 105 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1214 41 1
"3604" "exp3" 1 106 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 1079 0 0
"3604" "exp3" 1 107 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1539 35 1
"3604" "exp3" 1 108 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 1262 0 0
"3604" "exp3" 1 109 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1418 64 1
"3604" "exp3" 1 110 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 841 88 1
"3604" "exp3" 1 111 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1126 0 0
"3604" "exp3" 1 112 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1200 44 1
"3604" "exp3" 1 113 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1430 81 1
"3604" "exp3" 1 114 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 935 75 1
"3604" "exp3" 1 115 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 905 0 0
"3604" "exp3" 1 116 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 868 39 1
"3604" "exp3" 1 117 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 808 45 1
"3604" "exp3" 1 118 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 998 0 0
"3604" "exp3" 1 119 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1360 0 0
"3604" "exp3" 1 120 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 694 0 0
"3604" "exp3" 1 121 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 951 78 1
"3604" "exp3" 1 122 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 741 0 0
"3604" "exp3" 1 123 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 904 28 1
"3604" "exp3" 1 124 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 842 0 0
"3604" "exp3" 1 125 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 830 26 1
"3604" "exp3" 1 126 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 690 27 1
"3604" "exp3" 1 127 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 671 28 1
"3604" "exp3" 1 128 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1101 0 0
"3604" "exp3" 1 129 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1255 49 1
"3604" "exp3" 1 130 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 716 23 1
"3604" "exp3" 1 131 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 606 0 0
"3604" "exp3" 1 132 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1064 90 1
"3604" "exp3" 2 1 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1356 0 0
"3604" "exp3" 2 2 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 2 560 0 0
"3604" "exp3" 2 3 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 792 0 0
"3604" "exp3" 2 4 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 731 0 0
"3604" "exp3" 2 5 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 724 27 1
"3604" "exp3" 2 6 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 930 34 1
"3604" "exp3" 2 7 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1054 77 1
"3604" "exp3" 2 8 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 869 0 0
"3604" "exp3" 2 9 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1045 43 1
"3604" "exp3" 2 10 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 768 65 1
"3604" "exp3" 2 11 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 666 39 1
"3604" "exp3" 2 12 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 595 0 0
"3604" "exp3" 2 13 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 655 0 0
"3604" "exp3" 2 14 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 520 0 0
"3604" "exp3" 2 15 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 396 0 0
"3604" "exp3" 2 16 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 425 0 0
"3604" "exp3" 2 17 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 272 10 1
"3604" "exp3" 2 18 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 551 81 1
"3604" "exp3" 2 19 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 448 0 0
"3604" "exp3" 2 20 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 883 37 1
"3604" "exp3" 2 21 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 793 43 1
"3604" "exp3" 2 22 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 451 0 0
"3604" "exp3" 2 23 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 496 86 1
"3604" "exp3" 2 24 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 503 0 0
"3604" "exp3" 2 25 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 908 82 1
"3604" "exp3" 2 26 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 813 34 1
"3604" "exp3" 2 27 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 396 0 0
"3604" "exp3" 2 28 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 423 0 0
"3604" "exp3" 2 29 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 526 79 1
"3604" "exp3" 2 30 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 486 0 0
"3604" "exp3" 2 31 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 788 45 1
"3604" "exp3" 2 32 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 660 0 0
"3604" "exp3" 2 33 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 308 0 0
"3604" "exp3" 2 34 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 682 84 1
"3604" "exp3" 2 35 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 945 67 1
"3604" "exp3" 2 36 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 457 0 0
"3604" "exp3" 2 37 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1065 0 0
"3604" "exp3" 2 38 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 460 0 0
"3604" "exp3" 2 39 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 507 0 0
"3604" "exp3" 2 40 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1047 33 1
"3604" "exp3" 2 41 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 794 0 0
"3604" "exp3" 2 42 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 445 0 0
"3604" "exp3" 2 43 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 757 0 0
"3604" "exp3" 2 44 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1073 44 1
"3604" "exp3" 2 45 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 666 0 0
"3604" "exp3" 2 46 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 368 0 0
"3604" "exp3" 2 47 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 520 0 0
"3604" "exp3" 2 48 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 906 22 1
"3604" "exp3" 2 49 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 578 0 0
"3604" "exp3" 2 50 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 731 0 0
"3604" "exp3" 2 51 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1729 68 1
"3604" "exp3" 2 52 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 1104 0 0
"3604" "exp3" 2 53 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 813 0 0
"3604" "exp3" 2 54 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 779 80 1
"3604" "exp3" 2 55 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 735 0 0
"3604" "exp3" 2 56 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 548 83 1
"3604" "exp3" 2 57 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 716 0 0
"3604" "exp3" 2 58 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 753 0 0
"3604" "exp3" 2 59 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1132 0 0
"3604" "exp3" 2 60 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1087 40 1
"3604" "exp3" 2 61 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 789 0 0
"3604" "exp3" 2 62 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 998 19 1
"3604" "exp3" 2 63 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 995 76 1
"3604" "exp3" 2 64 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 745 0 0
"3604" "exp3" 2 65 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1013 36 1
"3604" "exp3" 2 66 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 554 82 1
"3604" "exp3" 2 67 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 945 74 1
"3604" "exp3" 2 68 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1015 0 0
"3604" "exp3" 2 69 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 923 0 0
"3604" "exp3" 2 70 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 1224 0 0
"3604" "exp3" 2 71 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1476 91 1
"3604" "exp3" 2 72 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1183 0 0
"3604" "exp3" 2 73 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1417 0 0
"3604" "exp3" 2 74 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1403 31 1
"3604" "exp3" 2 75 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 943 19 1
"3604" "exp3" 2 76 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1537 72 1
"3604" "exp3" 2 77 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 885 85 1
"3604" "exp3" 2 78 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1155 0 0
"3604" "exp3" 2 79 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2864 40 1
"3604" "exp3" 2 80 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1038 88 1
"3604" "exp3" 2 81 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 2 1618 74 1
"3604" "exp3" 2 82 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 3252 0 0
"3604" "exp3" 2 83 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 657 0 0
"3604" "exp3" 2 84 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1119 0 0
"3604" "exp3" 2 85 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1549 0 0
"3604" "exp3" 2 86 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1432 0 0
"3604" "exp3" 2 87 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1295 0 0
"3604" "exp3" 2 88 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1666 0 0
"3604" "exp3" 2 89 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1765 0 0
"3604" "exp3" 2 90 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1207 0 0
"3604" "exp3" 2 91 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1058 0 0
"3604" "exp3" 2 92 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1737 12 1
"3604" "exp3" 2 93 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1153 46 1
"3604" "exp3" 2 94 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1315 14 1
"3604" "exp3" 2 95 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 1224 47 1
"3604" "exp3" 2 96 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 934 0 0
"3604" "exp3" 2 97 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 685 0 0
"3604" "exp3" 2 98 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 518 77 1
"3604" "exp3" 2 99 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 467 0 0
"3604" "exp3" 2 100 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 429 0 0
"3604" "exp3" 2 101 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 700 0 0
"3604" "exp3" 2 102 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 637 34 1
"3604" "exp3" 2 103 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 833 0 0
"3604" "exp3" 2 104 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 852 25 1
"3604" "exp3" 2 105 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 905 0 0
"3604" "exp3" 2 106 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 946 0 0
"3604" "exp3" 2 107 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1080 0 0
"3604" "exp3" 2 108 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1149 0 0
"3604" "exp3" 2 109 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 902 42 1
"3604" "exp3" 2 110 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1218 0 0
"3604" "exp3" 2 111 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1563 0 0
"3604" "exp3" 2 112 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 833 30 1
"3604" "exp3" 2 113 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1029 0 0
"3604" "exp3" 2 114 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 825 0 0
"3604" "exp3" 2 115 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 959 23 1
"3604" "exp3" 2 116 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1035 13 1
"3604" "exp3" 2 117 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 787 17 1
"3604" "exp3" 2 118 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1406 89 1
"3604" "exp3" 2 119 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 625 0 0
"3604" "exp3" 2 120 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 917 31 1
"3604" "exp3" 2 121 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 618 41 1
"3604" "exp3" 2 122 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 601 0 0
"3604" "exp3" 2 123 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 586 0 0
"3604" "exp3" 2 124 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 617 26 1
"3604" "exp3" 2 125 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 674 0 0
"3604" "exp3" 2 126 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 632 32 1
"3604" "exp3" 2 127 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 629 0 0
"3604" "exp3" 2 128 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 687 0 0
"3604" "exp3" 2 129 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 981 0 0
"3604" "exp3" 2 130 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 560 25 1
"3604" "exp3" 2 131 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 644 0 0
"3604" "exp3" 2 132 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 539 0 0
"3604" "exp3" 1 1 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2013 0 0
"3604" "exp3" 1 2 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1581 22 1
"3604" "exp3" 1 3 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 2167 15 1
"3604" "exp3" 1 4 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1595 0 0
"3604" "exp3" 1 5 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 1768 0 0
"3604" "exp3" 1 6 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1601 48 1
"3604" "exp3" 1 7 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 2746 30 1
"3604" "exp3" 1 8 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 3503 38 1
"3604" "exp3" 1 9 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 2290 0 0
"3604" "exp3" 1 10 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 4471 24 1
"3604" "exp3" 1 11 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 2311 57 1
"3604" "exp3" 1 12 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 3231 0 0
"3604" "exp3" 1 13 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1712 76 1
"3604" "exp3" 1 14 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1354 0 0
"3604" "exp3" 1 15 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 3152 0 0
"3604" "exp3" 1 16 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1533 0 0
"3604" "exp3" 1 17 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1889 26 1
"3604" "exp3" 1 18 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1299 36 1
"3604" "exp3" 1 19 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1469 0 0
"3604" "exp3" 1 20 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 2 890 0 0
"3604" "exp3" 1 21 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1366 21 1
"3604" "exp3" 1 22 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 2729 44 1
"3604" "exp3" 1 23 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1852 43 1
"3604" "exp3" 1 24 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 2231 0 0
"3604" "exp3" 1 25 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 2342 31 1
"3604" "exp3" 1 26 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1491 0 0
"3604" "exp3" 1 27 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 1588 0 0
"3604" "exp3" 1 28 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1625 0 0
"3604" "exp3" 1 29 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 1833 0 0
"3604" "exp3" 1 30 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1791 0 0
"3604" "exp3" 1 31 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1471 0 0
"3604" "exp3" 1 32 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1407 83 1
"3604" "exp3" 1 33 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1591 0 0
"3604" "exp3" 1 34 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 2747 0 0
"3604" "exp3" 1 35 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1522 0 0
"3604" "exp3" 1 36 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1200 26 1
"3604" "exp3" 1 37 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1296 0 0
"3604" "exp3" 1 38 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1177 90 1
"3604" "exp3" 1 39 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1097 0 0
"3604" "exp3" 1 40 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1035 0 0
"3604" "exp3" 1 41 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1117 16 1
"3604" "exp3" 1 42 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 949 0 0
"3604" "exp3" 1 43 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1454 16 1
"3604" "exp3" 1 44 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1023 12 1
"3604" "exp3" 1 45 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1210 29 1
"3604" "exp3" 1 46 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1110 0 0
"3604" "exp3" 1 47 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1138 18 1
"3604" "exp3" 1 48 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 636 0 0
"3604" "exp3" 1 49 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 491 0 0
"3604" "exp3" 1 50 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 895 0 0
"3604" "exp3" 1 51 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 876 0 0
"3604" "exp3" 1 52 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 505 0 0
"3604" "exp3" 1 53 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 893 0 0
"3604" "exp3" 1 54 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 1534 0 0
"3604" "exp3" 1 55 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 857 45 1
"3604" "exp3" 1 56 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 529 0 0
"3604" "exp3" 1 57 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 700 24 1
"3604" "exp3" 1 58 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 630 34 1
"3604" "exp3" 1 59 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 733 17 1
"3604" "exp3" 1 60 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 721 0 0
"3604" "exp3" 1 61 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 619 45 1
"3604" "exp3" 1 62 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 542 36 1
"3604" "exp3" 1 63 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 639 0 0
"3604" "exp3" 1 64 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 735 0 0
"3604" "exp3" 1 65 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 686 82 1
"3604" "exp3" 1 66 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 565 0 0
"3604" "exp3" 1 67 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 478 76 1
"3604" "exp3" 1 68 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 162 35 1
"3604" "exp3" 1 69 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 840 0 0
"3604" "exp3" 1 70 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 1091 0 0
"3604" "exp3" 1 71 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 1261 0 0
"3604" "exp3" 1 72 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 666 19 1
"3604" "exp3" 1 73 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 491 65 1
"3604" "exp3" 1 74 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 878 0 0
"3604" "exp3" 1 75 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 291 26 1
"3604" "exp3" 1 76 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 202 0 0
"3604" "exp3" 1 77 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 325 0 0
"3604" "exp3" 1 78 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 416 0 0
"3604" "exp3" 1 79 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 513 39 1
"3604" "exp3" 1 80 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 256 85 1
"3604" "exp3" 1 81 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 335 0 0
"3604" "exp3" 1 82 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 229 47 1
"3604" "exp3" 1 83 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 187 0 0
"3604" "exp3" 1 84 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 470 0 0
"3604" "exp3" 1 85 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 381 28 1
"3604" "exp3" 1 86 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 298 0 0
"3604" "exp3" 1 87 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 179 38 1
"3604" "exp3" 1 88 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 124 0 0
"3604" "exp3" 1 89 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 777 0 0
"3604" "exp3" 1 90 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 751 0 0
"3604" "exp3" 1 91 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 786 32 1
"3604" "exp3" 1 92 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 563 0 0
"3604" "exp3" 1 93 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 730 79 1
"3604" "exp3" 1 94 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 713 78 1
"3604" "exp3" 1 95 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 997 0 0
"3604" "exp3" 1 96 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1013 0 0
"3604" "exp3" 1 97 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1176 0 0
"3604" "exp3" 1 98 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1137 0 0
"3604" "exp3" 1 99 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1706 0 0
"3604" "exp3" 1 100 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 884 0 0
"3604" "exp3" 1 101 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1383 0 0
"3604" "exp3" 1 102 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 961 77 1
"3604" "exp3" 1 103 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1558 0 0
"3604" "exp3" 1 104 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 851 0 0
"3604" "exp3" 1 105 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 970 0 0
"3604" "exp3" 1 106 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 600 0 0
"3604" "exp3" 1 107 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 681 0 0
"3604" "exp3" 1 108 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 573 0 0
"3604" "exp3" 1 109 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 507 0 0
"3604" "exp3" 1 110 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 522 0 0
"3604" "exp3" 1 111 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 577 30 1
"3604" "exp3" 1 112 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 671 42 1
"3604" "exp3" 1 113 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1382 0 0
"3604" "exp3" 1 114 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 630 20 1
"3604" "exp3" 1 115 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 783 0 0
"3604" "exp3" 1 116 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1199 32 1
"3604" "exp3" 1 117 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 678 20 1
"3604" "exp3" 1 118 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 543 0 0
"3604" "exp3" 1 119 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 352 0 0
"3604" "exp3" 1 120 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 400 29 1
"3604" "exp3" 1 121 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 759 0 0
"3604" "exp3" 1 122 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 1320 0 0
"3604" "exp3" 1 123 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 595 27 1
"3604" "exp3" 1 124 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 748 25 1
"3604" "exp3" 1 125 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 576 0 0
"3604" "exp3" 1 126 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 584 0 0
"3604" "exp3" 1 127 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 681 51 1
"3604" "exp3" 1 128 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 736 0 0
"3604" "exp3" 1 129 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 759 36 1
"3604" "exp3" 1 130 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1080 22 1
"3604" "exp3" 1 131 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 925 0 0
"3604" "exp3" 1 132 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1168 0 0
"3604" "exp3" 2 1 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 1034 0 0
"3604" "exp3" 2 2 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 679 0 0
"3604" "exp3" 2 3 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 546 30 1
"3604" "exp3" 2 4 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 340 14 1
"3604" "exp3" 2 5 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 541 0 0
"3604" "exp3" 2 6 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 551 34 1
"3604" "exp3" 2 7 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 524 29 1
"3604" "exp3" 2 8 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 617 21 1
"3604" "exp3" 2 9 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 544 62 1
"3604" "exp3" 2 10 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 894 30 1
"3604" "exp3" 2 11 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 900 0 0
"3604" "exp3" 2 12 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 785 20 1
"3604" "exp3" 2 13 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 957 18 1
"3604" "exp3" 2 14 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 889 13 1
"3604" "exp3" 2 15 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 860 17 1
"3604" "exp3" 2 16 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 783 35 1
"3604" "exp3" 2 17 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 701 0 0
"3604" "exp3" 2 18 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1550 0 0
"3604" "exp3" 2 19 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 603 0 0
"3604" "exp3" 2 20 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 2 713 0 0
"3604" "exp3" 2 21 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 1100 58 1
"3604" "exp3" 2 22 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 1182 64 1
"3604" "exp3" 2 23 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 887 0 0
"3604" "exp3" 2 24 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 907 48 1
"3604" "exp3" 2 25 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 2083 54 1
"3604" "exp3" 2 26 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 935 0 0
"3604" "exp3" 2 27 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 938 0 0
"3604" "exp3" 2 28 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 2 725 0 0
"3604" "exp3" 2 29 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 672 36 1
"3604" "exp3" 2 30 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 773 0 0
"3604" "exp3" 2 31 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 723 0 0
"3604" "exp3" 2 32 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 425 49 1
"3604" "exp3" 2 33 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 809 0 0
"3604" "exp3" 2 34 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 567 0 0
"3604" "exp3" 2 35 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 362 0 0
"3604" "exp3" 2 36 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 743 0 0
"3604" "exp3" 2 37 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 531 37 1
"3604" "exp3" 2 38 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 428 19 1
"3604" "exp3" 2 39 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 456 0 0
"3604" "exp3" 2 40 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 274 6 1
"3604" "exp3" 2 41 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 590 20 1
"3604" "exp3" 2 42 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 530 0 0
"3604" "exp3" 2 43 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 185 0 0
"3604" "exp3" 2 44 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 526 30 1
"3604" "exp3" 2 45 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 443 10 1
"3604" "exp3" 2 46 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 226 7 1
"3604" "exp3" 2 47 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 618 0 0
"3604" "exp3" 2 48 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 681 0 0
"3604" "exp3" 2 49 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 930 0 0
"3604" "exp3" 2 50 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 813 0 0
"3604" "exp3" 2 51 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 742 25 1
"3604" "exp3" 2 52 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 2 548 0 0
"3604" "exp3" 2 53 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1467 19 1
"3604" "exp3" 2 54 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 803 0 0
"3604" "exp3" 2 55 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 818 92 1
"3604" "exp3" 2 56 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 933 0 0
"3604" "exp3" 2 57 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 807 0 0
"3604" "exp3" 2 58 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1263 91 1
"3604" "exp3" 2 59 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 1169 0 0
"3604" "exp3" 2 60 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 853 0 0
"3604" "exp3" 2 61 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 962 0 0
"3604" "exp3" 2 62 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 722 0 0
"3604" "exp3" 2 63 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 945 0 0
"3604" "exp3" 2 64 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 712 0 0
"3604" "exp3" 2 65 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 939 45 1
"3604" "exp3" 2 66 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 897 0 0
"3604" "exp3" 2 67 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 1094 0 0
"3604" "exp3" 2 68 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 920 25 1
"3604" "exp3" 2 69 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1237 0 0
"3604" "exp3" 2 70 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1300 0 0
"3604" "exp3" 2 71 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1960 75 1
"3604" "exp3" 2 72 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1353 17 1
"3604" "exp3" 2 73 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 1354 0 0
"3604" "exp3" 2 74 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1072 15 1
"3604" "exp3" 2 75 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 2325 19 1
"3604" "exp3" 2 76 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1390 0 0
"3604" "exp3" 2 77 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 548 67 1
"3604" "exp3" 2 78 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 580 27 1
"3604" "exp3" 2 79 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 587 22 1
"3604" "exp3" 2 80 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 711 0 0
"3604" "exp3" 2 81 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 875 86 1
"3604" "exp3" 2 82 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 947 0 0
"3604" "exp3" 2 83 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 801 73 1
"3604" "exp3" 2 84 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 597 65 1
"3604" "exp3" 2 85 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 628 32 1
"3604" "exp3" 2 86 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 731 93 1
"3604" "exp3" 2 87 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 704 0 0
"3604" "exp3" 2 88 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 547 0 0
"3604" "exp3" 2 89 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 719 66 1
"3604" "exp3" 2 90 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 688 20 1
"3604" "exp3" 2 91 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 822 0 0
"3604" "exp3" 2 92 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 767 0 0
"3604" "exp3" 2 93 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 578 0 0
"3604" "exp3" 2 94 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 517 0 0
"3604" "exp3" 2 95 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1520 0 0
"3604" "exp3" 2 96 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 833 89 1
"3604" "exp3" 2 97 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 879 0 0
"3604" "exp3" 2 98 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 606 0 0
"3604" "exp3" 2 99 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 704 0 0
"3604" "exp3" 2 100 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 692 39 1
"3604" "exp3" 2 101 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 1316 0 0
"3604" "exp3" 2 102 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1243 0 0
"3604" "exp3" 2 103 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 841 76 1
"3604" "exp3" 2 104 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1033 0 0
"3604" "exp3" 2 105 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 2 1185 0 0
"3604" "exp3" 2 106 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1210 37 1
"3604" "exp3" 2 107 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1113 0 0
"3604" "exp3" 2 108 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 934 0 0
"3604" "exp3" 2 109 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 949 0 0
"3604" "exp3" 2 110 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 966 44 1
"3604" "exp3" 2 111 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 541 0 0
"3604" "exp3" 2 112 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 682 0 0
"3604" "exp3" 2 113 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 739 0 0
"3604" "exp3" 2 114 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 563 28 1
"3604" "exp3" 2 115 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 602 0 0
"3604" "exp3" 2 116 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 873 0 0
"3604" "exp3" 2 117 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 524 39 1
"3604" "exp3" 2 118 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 674 0 0
"3604" "exp3" 2 119 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 430 0 0
"3604" "exp3" 2 120 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 491 0 0
"3604" "exp3" 2 121 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 644 0 0
"3604" "exp3" 2 122 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 352 10 1
"3604" "exp3" 2 123 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 487 71 1
"3604" "exp3" 2 124 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 732 0 0
"3604" "exp3" 2 125 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 843 0 0
"3604" "exp3" 2 126 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1022 0 0
"3604" "exp3" 2 127 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 838 0 0
"3604" "exp3" 2 128 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 783 60 1
"3604" "exp3" 2 129 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1237 68 1
"3604" "exp3" 2 130 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 795 0 0
"3604" "exp3" 2 131 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1245 0 0
"3604" "exp3" 2 132 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 3356 0 0
"3605" "exp3" 1 1 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1938 0 0
"3605" "exp3" 1 2 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2286 25 1
"3605" "exp3" 1 3 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2870 0 0
"3605" "exp3" 1 4 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 3514 64 1
"3605" "exp3" 1 5 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2360 0 0
"3605" "exp3" 1 6 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2298 0 0
"3605" "exp3" 1 7 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2329 15 1
"3605" "exp3" 1 8 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 2781 0 0
"3605" "exp3" 1 9 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2245 68 1
"3605" "exp3" 1 10 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 3212 25 1
"3605" "exp3" 1 11 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 3867 0 0
"3605" "exp3" 1 12 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1799 29 1
"3605" "exp3" 1 13 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1694 0 0
"3605" "exp3" 1 14 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 2942 0 0
"3605" "exp3" 1 15 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2850 42 1
"3605" "exp3" 1 16 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1914 17 1
"3605" "exp3" 1 17 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 2164 0 0
"3605" "exp3" 1 18 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1604 0 0
"3605" "exp3" 1 19 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 3499 34 1
"3605" "exp3" 1 20 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 2762 73 1
"3605" "exp3" 1 21 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1878 20 1
"3605" "exp3" 1 22 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 4094 0 0
"3605" "exp3" 1 23 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1859 87 1
"3605" "exp3" 1 24 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1869 22 1
"3605" "exp3" 1 25 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2223 0 0
"3605" "exp3" 1 26 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2156 0 0
"3605" "exp3" 1 27 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1899 0 0
"3605" "exp3" 1 28 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 2588 0 0
"3605" "exp3" 1 29 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 2066 0 0
"3605" "exp3" 1 30 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2027 0 0
"3605" "exp3" 1 31 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 1809 23 1
"3605" "exp3" 1 32 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 2090 0 0
"3605" "exp3" 1 33 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1222 32 1
"3605" "exp3" 1 34 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2007 18 1
"3605" "exp3" 1 35 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2775 0 0
"3605" "exp3" 1 36 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1536 0 0
"3605" "exp3" 1 37 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 2277 69 1
"3605" "exp3" 1 38 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1716 0 0
"3605" "exp3" 1 39 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 2937 0 0
"3605" "exp3" 1 40 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2448 0 0
"3605" "exp3" 1 41 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 2373 0 0
"3605" "exp3" 1 42 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1578 85 1
"3605" "exp3" 1 43 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 2165 26 1
"3605" "exp3" 1 44 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1781 0 0
"3605" "exp3" 1 45 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 3049 0 0
"3605" "exp3" 1 46 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 3034 32 1
"3605" "exp3" 1 47 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2926 31 1
"3605" "exp3" 1 48 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2356 40 1
"3605" "exp3" 1 49 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1847 14 1
"3605" "exp3" 1 50 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 2806 0 0
"3605" "exp3" 1 51 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2954 22 1
"3605" "exp3" 1 52 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 3591 41 1
"3605" "exp3" 1 53 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 5223 44 1
"3605" "exp3" 1 54 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 4060 0 0
"3605" "exp3" 1 55 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 3055 33 1
"3605" "exp3" 1 56 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 3127 79 1
"3605" "exp3" 1 57 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1897 21 1
"3605" "exp3" 1 58 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1853 91 1
"3605" "exp3" 1 59 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1624 0 0
"3605" "exp3" 1 60 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 3448 0 0
"3605" "exp3" 1 61 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 7110 37 1
"3605" "exp3" 1 62 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1617 13 1
"3605" "exp3" 1 63 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 3521 0 0
"3605" "exp3" 1 64 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1499 94 1
"3605" "exp3" 1 65 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 5468 0 0
"3605" "exp3" 1 66 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 2893 24 1
"3605" "exp3" 1 67 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 2808 0 0
"3605" "exp3" 1 68 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1369 0 0
"3605" "exp3" 1 69 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1134 0 0
"3605" "exp3" 1 70 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 4080 40 1
"3605" "exp3" 1 71 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2603 43 1
"3605" "exp3" 1 72 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 2273 0 0
"3605" "exp3" 1 73 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 2947 65 1
"3605" "exp3" 1 74 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 2955 30 1
"3605" "exp3" 1 75 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 2144 0 0
"3605" "exp3" 1 76 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 5287 35 1
"3605" "exp3" 1 77 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1886 0 0
"3605" "exp3" 1 78 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1826 86 1
"3605" "exp3" 1 79 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 2403 28 1
"3605" "exp3" 1 80 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 4096 0 0
"3605" "exp3" 1 81 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2684 48 1
"3605" "exp3" 1 82 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 3860 0 0
"3605" "exp3" 1 83 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 2152 70 1
"3605" "exp3" 1 84 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 4827 30 1
"3605" "exp3" 1 85 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1361 36 1
"3605" "exp3" 1 86 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 2628 0 0
"3605" "exp3" 1 87 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 3778 0 0
"3605" "exp3" 1 88 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2053 89 1
"3605" "exp3" 1 89 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1399 16 1
"3605" "exp3" 1 90 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3826 0 0
"3605" "exp3" 1 91 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 2666 37 1
"3605" "exp3" 1 92 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1235 0 0
"3605" "exp3" 1 93 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 6151 45 1
"3605" "exp3" 1 94 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1966 31 1
"3605" "exp3" 1 95 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 4963 39 1
"3605" "exp3" 1 96 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1411 90 1
"3605" "exp3" 1 97 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 3084 0 0
"3605" "exp3" 1 98 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 5741 33 1
"3605" "exp3" 1 99 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1397 0 0
"3605" "exp3" 1 100 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 6958 42 1
"3605" "exp3" 1 101 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1287 0 0
"3605" "exp3" 1 102 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1567 0 0
"3605" "exp3" 1 103 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 3125 45 1
"3605" "exp3" 1 104 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2365 20 1
"3605" "exp3" 1 105 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 3202 74 1
"3605" "exp3" 1 106 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 6962 0 0
"3605" "exp3" 1 107 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 4178 43 1
"3605" "exp3" 1 108 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 2536 19 1
"3605" "exp3" 1 109 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 4873 0 0
"3605" "exp3" 1 110 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1429 0 0
"3605" "exp3" 1 111 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 3737 36 1
"3605" "exp3" 1 112 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1655 23 1
"3605" "exp3" 1 113 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1409 27 1
"3605" "exp3" 1 114 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1729 27 1
"3605" "exp3" 1 115 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1595 0 0
"3605" "exp3" 1 116 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1166 0 0
"3605" "exp3" 1 117 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1264 80 1
"3605" "exp3" 1 118 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1050 17 1
"3605" "exp3" 1 119 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 2346 44 1
"3605" "exp3" 1 120 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2838 0 0
"3605" "exp3" 1 121 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 2549 0 0
"3605" "exp3" 1 122 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 4139 0 0
"3605" "exp3" 1 123 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1840 0 0
"3605" "exp3" 1 124 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 4028 69 1
"3605" "exp3" 1 125 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1489 29 1
"3605" "exp3" 1 126 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 2772 38 1
"3605" "exp3" 1 127 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1696 19 1
"3605" "exp3" 1 128 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 2844 21 1
"3605" "exp3" 1 129 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1692 0 0
"3605" "exp3" 1 130 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 3575 47 1
"3605" "exp3" 1 131 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2651 25 1
"3605" "exp3" 1 132 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1541 0 0
"3605" "exp3" 2 1 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2520 41 1
"3605" "exp3" 2 2 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 2634 70 1
"3605" "exp3" 2 3 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1518 0 0
"3605" "exp3" 2 4 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1175 91 1
"3605" "exp3" 2 5 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 2939 31 1
"3605" "exp3" 2 6 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1316 0 0
"3605" "exp3" 2 7 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2956 23 1
"3605" "exp3" 2 8 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1654 0 0
"3605" "exp3" 2 9 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2013 33 1
"3605" "exp3" 2 10 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1164 0 0
"3605" "exp3" 2 11 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2412 85 1
"3605" "exp3" 2 12 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 2686 0 0
"3605" "exp3" 2 13 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1772 30 1
"3605" "exp3" 2 14 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2057 23 1
"3605" "exp3" 2 15 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 3367 76 1
"3605" "exp3" 2 16 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 3288 34 1
"3605" "exp3" 2 17 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1913 0 0
"3605" "exp3" 2 18 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1157 0 0
"3605" "exp3" 2 19 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 2305 26 1
"3605" "exp3" 2 20 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 3025 0 0
"3605" "exp3" 2 21 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1152 0 0
"3605" "exp3" 2 22 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1327 0 0
"3605" "exp3" 2 23 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 3509 14 1
"3605" "exp3" 2 24 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2694 31 1
"3605" "exp3" 2 25 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1495 0 0
"3605" "exp3" 2 26 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1177 29 1
"3605" "exp3" 2 27 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 3977 18 1
"3605" "exp3" 2 28 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 2906 0 0
"3605" "exp3" 2 29 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1473 0 0
"3605" "exp3" 2 30 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 4297 46 1
"3605" "exp3" 2 31 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 1259 0 0
"3605" "exp3" 2 32 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1991 0 0
"3605" "exp3" 2 33 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 2027 82 1
"3605" "exp3" 2 34 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1684 0 0
"3605" "exp3" 2 35 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 3588 0 0
"3605" "exp3" 2 36 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 855 0 0
"3605" "exp3" 2 37 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 3505 0 0
"3605" "exp3" 2 38 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 3841 0 0
"3605" "exp3" 2 39 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1591 81 1
"3605" "exp3" 2 40 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1581 0 0
"3605" "exp3" 2 41 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3200 67 1
"3605" "exp3" 2 42 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 3205 73 1
"3605" "exp3" 2 43 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 2095 0 0
"3605" "exp3" 2 44 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2159 22 1
"3605" "exp3" 2 45 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1143 92 1
"3605" "exp3" 2 46 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 2593 0 0
"3605" "exp3" 2 47 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1836 0 0
"3605" "exp3" 2 48 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2918 0 0
"3605" "exp3" 2 49 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 2256 37 1
"3605" "exp3" 2 50 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 2145 21 1
"3605" "exp3" 2 51 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 6943 49 1
"3605" "exp3" 2 52 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 989 13 1
"3605" "exp3" 2 53 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1398 83 1
"3605" "exp3" 2 54 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1241 0 0
"3605" "exp3" 2 55 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 1349 15 1
"3605" "exp3" 2 56 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 2218 78 1
"3605" "exp3" 2 57 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1999 39 1
"3605" "exp3" 2 58 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 2363 0 0
"3605" "exp3" 2 59 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1072 0 0
"3605" "exp3" 2 60 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1458 0 0
"3605" "exp3" 2 61 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 3273 77 1
"3605" "exp3" 2 62 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 1270 0 0
"3605" "exp3" 2 63 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1357 0 0
"3605" "exp3" 2 64 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 6249 35 1
"3605" "exp3" 2 65 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 5255 0 0
"3605" "exp3" 2 66 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 11498 65 1
"3605" "exp3" 2 67 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2218 44 1
"3605" "exp3" 2 68 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1118 16 1
"3605" "exp3" 2 69 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1763 0 0
"3605" "exp3" 2 70 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 3680 0 0
"3605" "exp3" 2 71 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1370 17 1
"3605" "exp3" 2 72 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 3562 0 0
"3605" "exp3" 2 73 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 2096 0 0
"3605" "exp3" 2 74 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 2093 0 0
"3605" "exp3" 2 75 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1943 0 0
"3605" "exp3" 2 76 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1309 28 1
"3605" "exp3" 2 77 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 3160 0 0
"3605" "exp3" 2 78 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1539 0 0
"3605" "exp3" 2 79 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 3534 42 1
"3605" "exp3" 2 80 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1275 0 0
"3605" "exp3" 2 81 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 2663 0 0
"3605" "exp3" 2 82 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2216 27 1
"3605" "exp3" 2 83 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1516 0 0
"3605" "exp3" 2 84 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 3759 0 0
"3605" "exp3" 2 85 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1082 0 0
"3605" "exp3" 2 86 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1025 38 1
"3605" "exp3" 2 87 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 2419 41 1
"3605" "exp3" 2 88 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1138 0 0
"3605" "exp3" 2 89 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1372 77 1
"3605" "exp3" 2 90 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1070 0 0
"3605" "exp3" 2 91 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 3012 0 0
"3605" "exp3" 2 92 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2672 0 0
"3605" "exp3" 2 93 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 1089 0 0
"3605" "exp3" 2 94 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1172 24 1
"3605" "exp3" 2 95 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 5410 43 1
"3605" "exp3" 2 96 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1711 0 0
"3605" "exp3" 2 97 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1874 37 1
"3605" "exp3" 2 98 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1553 44 1
"3605" "exp3" 2 99 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1217 0 0
"3605" "exp3" 2 100 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 915 19 1
"3605" "exp3" 2 101 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2016 29 1
"3605" "exp3" 2 102 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1988 21 1
"3605" "exp3" 2 103 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1436 74 1
"3605" "exp3" 2 104 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1758 0 0
"3605" "exp3" 2 105 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 3517 0 0
"3605" "exp3" 2 106 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1015 24 1
"3605" "exp3" 2 107 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1248 0 0
"3605" "exp3" 2 108 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 847 18 1
"3605" "exp3" 2 109 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1400 40 1
"3605" "exp3" 2 110 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1788 0 0
"3605" "exp3" 2 111 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1643 0 0
"3605" "exp3" 2 112 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 2035 0 0
"3605" "exp3" 2 113 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1620 32 1
"3605" "exp3" 2 114 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 4249 38 1
"3605" "exp3" 2 115 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1782 0 0
"3605" "exp3" 2 116 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 2104 22 1
"3605" "exp3" 2 117 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 3655 65 1
"3605" "exp3" 2 118 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 1134 0 0
"3605" "exp3" 2 119 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 2310 0 0
"3605" "exp3" 2 120 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1570 0 0
"3605" "exp3" 2 121 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 792 0 0
"3605" "exp3" 2 122 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 2232 0 0
"3605" "exp3" 2 123 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1319 0 0
"3605" "exp3" 2 124 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 926 0 0
"3605" "exp3" 2 125 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 3576 36 1
"3605" "exp3" 2 126 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1284 20 1
"3605" "exp3" 2 127 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 3934 0 0
"3605" "exp3" 2 128 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1285 87 1
"3605" "exp3" 2 129 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2684 39 1
"3605" "exp3" 2 130 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1317 0 0
"3605" "exp3" 2 131 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 946 96 1
"3605" "exp3" 2 132 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1935 25 1
"3605" "exp3" 1 1 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 2460 0 0
"3605" "exp3" 1 2 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1497 0 0
"3605" "exp3" 1 3 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1419 0 0
"3605" "exp3" 1 4 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 2022 71 1
"3605" "exp3" 1 5 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1055 0 0
"3605" "exp3" 1 6 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 1732 0 0
"3605" "exp3" 1 7 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 4426 0 0
"3605" "exp3" 1 8 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 868 19 1
"3605" "exp3" 1 9 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 861 0 0
"3605" "exp3" 1 10 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 2576 0 0
"3605" "exp3" 1 11 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 5360 0 0
"3605" "exp3" 1 12 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1973 69 1
"3605" "exp3" 1 13 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 3388 65 1
"3605" "exp3" 1 14 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1671 15 1
"3605" "exp3" 1 15 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 8203 28 1
"3605" "exp3" 1 16 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1902 0 0
"3605" "exp3" 1 17 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 4199 0 0
"3605" "exp3" 1 18 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1930 0 0
"3605" "exp3" 1 19 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 3097 0 0
"3605" "exp3" 1 20 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1715 77 1
"3605" "exp3" 1 21 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1551 0 0
"3605" "exp3" 1 22 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1171 0 0
"3605" "exp3" 1 23 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1701 0 0
"3605" "exp3" 1 24 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 3986 27 1
"3605" "exp3" 1 25 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2150 19 1
"3605" "exp3" 1 26 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 2219 20 1
"3605" "exp3" 1 27 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1677 0 0
"3605" "exp3" 1 28 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1884 0 0
"3605" "exp3" 1 29 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 2222 0 0
"3605" "exp3" 1 30 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 2145 0 0
"3605" "exp3" 1 31 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1226 14 1
"3605" "exp3" 1 32 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 3241 0 0
"3605" "exp3" 1 33 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 2285 0 0
"3605" "exp3" 1 34 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 2259 0 0
"3605" "exp3" 1 35 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 4580 39 1
"3605" "exp3" 1 36 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1570 0 0
"3605" "exp3" 1 37 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 4301 63 1
"3605" "exp3" 1 38 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1542 30 1
"3605" "exp3" 1 39 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 4519 0 0
"3605" "exp3" 1 40 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 4858 22 1
"3605" "exp3" 1 41 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1935 0 0
"3605" "exp3" 1 42 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1773 23 1
"3605" "exp3" 1 43 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 2451 20 1
"3605" "exp3" 1 44 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1393 89 1
"3605" "exp3" 1 45 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1574 0 0
"3605" "exp3" 1 46 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 4624 0 0
"3605" "exp3" 1 47 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 936 0 0
"3605" "exp3" 1 48 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 4518 0 0
"3605" "exp3" 1 49 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 2513 0 0
"3605" "exp3" 1 50 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 2754 81 1
"3605" "exp3" 1 51 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 11454 0 0
"3605" "exp3" 1 52 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 5814 0 0
"3605" "exp3" 1 53 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 2805 17 1
"3605" "exp3" 1 54 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1924 13 1
"3605" "exp3" 1 55 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 2437 0 0
"3605" "exp3" 1 56 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 2165 38 1
"3605" "exp3" 1 57 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 2777 71 1
"3605" "exp3" 1 58 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1351 80 1
"3605" "exp3" 1 59 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 2770 30 1
"3605" "exp3" 1 60 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 4808 0 0
"3605" "exp3" 1 61 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 8777 67 1
"3605" "exp3" 1 62 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1391 0 0
"3605" "exp3" 1 63 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2429 0 0
"3605" "exp3" 1 64 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 5110 0 0
"3605" "exp3" 1 65 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 2528 25 1
"3605" "exp3" 1 66 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 2823 0 0
"3605" "exp3" 1 67 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1383 22 1
"3605" "exp3" 1 68 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1018 0 0
"3605" "exp3" 1 69 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 2101 43 1
"3605" "exp3" 1 70 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2787 47 1
"3605" "exp3" 1 71 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1767 0 0
"3605" "exp3" 1 72 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 2280 0 0
"3605" "exp3" 1 73 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 2277 37 1
"3605" "exp3" 1 74 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1769 18 1
"3605" "exp3" 1 75 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1714 0 0
"3605" "exp3" 1 76 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1927 0 0
"3605" "exp3" 1 77 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 5467 34 1
"3605" "exp3" 1 78 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1664 35 1
"3605" "exp3" 1 79 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1237 0 0
"3605" "exp3" 1 80 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 2611 73 1
"3605" "exp3" 1 81 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2441 29 1
"3605" "exp3" 1 82 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 4491 0 0
"3605" "exp3" 1 83 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1828 0 0
"3605" "exp3" 1 84 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1513 0 0
"3605" "exp3" 1 85 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 4242 0 0
"3605" "exp3" 1 86 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 3932 18 1
"3605" "exp3" 1 87 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1768 70 1
"3605" "exp3" 1 88 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1703 23 1
"3605" "exp3" 1 89 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 5931 49 1
"3605" "exp3" 1 90 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1497 25 1
"3605" "exp3" 1 91 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1201 0 0
"3605" "exp3" 1 92 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 2858 78 1
"3605" "exp3" 1 93 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1394 0 0
"3605" "exp3" 1 94 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 2682 32 1
"3605" "exp3" 1 95 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1432 21 1
"3605" "exp3" 1 96 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 909 0 0
"3605" "exp3" 1 97 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1305 0 0
"3605" "exp3" 1 98 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 6628 0 0
"3605" "exp3" 1 99 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2525 0 0
"3605" "exp3" 1 100 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 2559 31 1
"3605" "exp3" 1 101 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 2784 36 1
"3605" "exp3" 1 102 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 2939 0 0
"3605" "exp3" 1 103 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 2522 76 1
"3605" "exp3" 1 104 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 2399 0 0
"3605" "exp3" 1 105 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 884 17 1
"3605" "exp3" 1 106 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 977 0 0
"3605" "exp3" 1 107 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 2142 0 0
"3605" "exp3" 1 108 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1793 29 1
"3605" "exp3" 1 109 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1364 0 0
"3605" "exp3" 1 110 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 3440 16 1
"3605" "exp3" 1 111 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 2966 0 0
"3605" "exp3" 1 112 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2501 68 1
"3605" "exp3" 1 113 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 2668 0 0
"3605" "exp3" 1 114 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1472 0 0
"3605" "exp3" 1 115 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 4620 45 1
"3605" "exp3" 1 116 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2554 44 1
"3605" "exp3" 1 117 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1513 0 0
"3605" "exp3" 1 118 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1781 34 1
"3605" "exp3" 1 119 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1816 0 0
"3605" "exp3" 1 120 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 2039 42 1
"3605" "exp3" 1 121 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1688 40 1
"3605" "exp3" 1 122 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 2856 0 0
"3605" "exp3" 1 123 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1920 39 1
"3605" "exp3" 1 124 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1292 24 1
"3605" "exp3" 1 125 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 2279 0 0
"3605" "exp3" 1 126 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 2964 42 1
"3605" "exp3" 1 127 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 3188 0 0
"3605" "exp3" 1 128 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 5269 0 0
"3605" "exp3" 1 129 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 2630 0 0
"3605" "exp3" 1 130 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1273 0 0
"3605" "exp3" 1 131 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 5760 0 0
"3605" "exp3" 1 132 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1597 27 1
"3605" "exp3" 2 1 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1271 16 1
"3605" "exp3" 2 2 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 3173 0 0
"3605" "exp3" 2 3 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 2402 0 0
"3605" "exp3" 2 4 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1870 70 1
"3605" "exp3" 2 5 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1987 21 1
"3605" "exp3" 2 6 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 865 13 1
"3605" "exp3" 2 7 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 2296 0 0
"3605" "exp3" 2 8 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 3512 41 1
"3605" "exp3" 2 9 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 7156 44 1
"3605" "exp3" 2 10 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1202 0 0
"3605" "exp3" 2 11 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 963 0 0
"3605" "exp3" 2 12 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 868 0 0
"3605" "exp3" 2 13 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1241 0 0
"3605" "exp3" 2 14 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 3830 0 0
"3605" "exp3" 2 15 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1687 0 0
"3605" "exp3" 2 16 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1187 0 0
"3605" "exp3" 2 17 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 865 22 1
"3605" "exp3" 2 18 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1320 92 1
"3605" "exp3" 2 19 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1002 0 0
"3605" "exp3" 2 20 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2073 0 0
"3605" "exp3" 2 21 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1511 0 0
"3605" "exp3" 2 22 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1472 20 1
"3605" "exp3" 2 23 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 3044 26 1
"3605" "exp3" 2 24 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 2814 67 1
"3605" "exp3" 2 25 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1261 0 0
"3605" "exp3" 2 26 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1395 18 1
"3605" "exp3" 2 27 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1375 34 1
"3605" "exp3" 2 28 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 2002 35 1
"3605" "exp3" 2 29 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1075 27 1
"3605" "exp3" 2 30 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1035 0 0
"3605" "exp3" 2 31 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2164 39 1
"3605" "exp3" 2 32 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1054 0 0
"3605" "exp3" 2 33 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 3845 66 1
"3605" "exp3" 2 34 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1804 26 1
"3605" "exp3" 2 35 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1994 0 0
"3605" "exp3" 2 36 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1692 81 1
"3605" "exp3" 2 37 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1068 0 0
"3605" "exp3" 2 38 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 2004 17 1
"3605" "exp3" 2 39 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1362 20 1
"3605" "exp3" 2 40 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 2944 73 1
"3605" "exp3" 2 41 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 2334 0 0
"3605" "exp3" 2 42 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1340 0 0
"3605" "exp3" 2 43 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1213 40 1
"3605" "exp3" 2 44 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1027 0 0
"3605" "exp3" 2 45 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1093 28 1
"3605" "exp3" 2 46 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1313 36 1
"3605" "exp3" 2 47 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 2637 40 1
"3605" "exp3" 2 48 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 2003 0 0
"3605" "exp3" 2 49 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 2908 19 1
"3605" "exp3" 2 50 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 841 0 0
"3605" "exp3" 2 51 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1525 30 1
"3605" "exp3" 2 52 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1801 23 1
"3605" "exp3" 2 53 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 2053 33 1
"3605" "exp3" 2 54 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1775 32 1
"3605" "exp3" 2 55 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 2204 70 1
"3605" "exp3" 2 56 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 3847 0 0
"3605" "exp3" 2 57 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 2444 0 0
"3605" "exp3" 2 58 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1362 24 1
"3605" "exp3" 2 59 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 2957 18 1
"3605" "exp3" 2 60 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1816 0 0
"3605" "exp3" 2 61 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 3069 0 0
"3605" "exp3" 2 62 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1041 19 1
"3605" "exp3" 2 63 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 2049 0 0
"3605" "exp3" 2 64 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 4669 0 0
"3605" "exp3" 2 65 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 2772 0 0
"3605" "exp3" 2 66 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 801 0 0
"3605" "exp3" 2 67 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 2142 0 0
"3605" "exp3" 2 68 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 2236 0 0
"3605" "exp3" 2 69 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1827 42 1
"3605" "exp3" 2 70 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 2215 0 0
"3605" "exp3" 2 71 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 722 0 0
"3605" "exp3" 2 72 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1751 46 1
"3605" "exp3" 2 73 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1777 49 1
"3605" "exp3" 2 74 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 955 14 1
"3605" "exp3" 2 75 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 2009 21 1
"3605" "exp3" 2 76 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 976 0 0
"3605" "exp3" 2 77 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1117 0 0
"3605" "exp3" 2 78 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2254 45 1
"3605" "exp3" 2 79 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1389 0 0
"3605" "exp3" 2 80 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1726 0 0
"3605" "exp3" 2 81 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 1758 0 0
"3605" "exp3" 2 82 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2245 0 0
"3605" "exp3" 2 83 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 3112 74 1
"3605" "exp3" 2 84 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 2710 0 0
"3605" "exp3" 2 85 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 3582 0 0
"3605" "exp3" 2 86 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 2001 0 0
"3605" "exp3" 2 87 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1340 23 1
"3605" "exp3" 2 88 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 4437 0 0
"3605" "exp3" 2 89 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 974 0 0
"3605" "exp3" 2 90 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 979 0 0
"3605" "exp3" 2 91 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1246 0 0
"3605" "exp3" 2 92 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1579 0 0
"3605" "exp3" 2 93 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1341 0 0
"3605" "exp3" 2 94 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1524 22 1
"3605" "exp3" 2 95 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2623 29 1
"3605" "exp3" 2 96 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1747 36 1
"3605" "exp3" 2 97 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1675 0 0
"3605" "exp3" 2 98 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1228 0 0
"3605" "exp3" 2 99 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1116 0 0
"3605" "exp3" 2 100 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1517 29 1
"3605" "exp3" 2 101 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 7205 0 0
"3605" "exp3" 2 102 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 2116 43 1
"3605" "exp3" 2 103 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 5979 0 0
"3605" "exp3" 2 104 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 2897 0 0
"3605" "exp3" 2 105 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1499 0 0
"3605" "exp3" 2 106 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1256 0 0
"3605" "exp3" 2 107 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1225 0 0
"3605" "exp3" 2 108 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 6077 41 1
"3605" "exp3" 2 109 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 3278 38 1
"3605" "exp3" 2 110 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1896 32 1
"3605" "exp3" 2 111 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 2914 37 1
"3605" "exp3" 2 112 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 3139 33 1
"3605" "exp3" 2 113 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1624 28 1
"3605" "exp3" 2 114 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1514 0 0
"3605" "exp3" 2 115 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 2111 0 0
"3605" "exp3" 2 116 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1938 39 1
"3605" "exp3" 2 117 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1356 0 0
"3605" "exp3" 2 118 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 3569 72 1
"3605" "exp3" 2 119 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 4078 0 0
"3605" "exp3" 2 120 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1180 38 1
"3605" "exp3" 2 121 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1261 0 0
"3605" "exp3" 2 122 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1111 0 0
"3605" "exp3" 2 123 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1214 15 1
"3605" "exp3" 2 124 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 2957 79 1
"3605" "exp3" 2 125 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1088 0 0
"3605" "exp3" 2 126 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1508 0 0
"3605" "exp3" 2 127 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1717 0 0
"3605" "exp3" 2 128 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 2204 27 1
"3605" "exp3" 2 129 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1704 0 0
"3605" "exp3" 2 130 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 3582 47 1
"3605" "exp3" 2 131 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 7022 0 0
"3605" "exp3" 2 132 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 2452 43 1
"3605" "exp3" 1 1 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1721 34 1
"3605" "exp3" 1 2 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1129 0 0
"3605" "exp3" 1 3 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 999 0 0
"3605" "exp3" 1 4 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 996 0 0
"3605" "exp3" 1 5 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 894 0 0
"3605" "exp3" 1 6 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1295 70 1
"3605" "exp3" 1 7 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1371 33 1
"3605" "exp3" 1 8 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1069 0 0
"3605" "exp3" 1 9 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1067 0 0
"3605" "exp3" 1 10 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1366 23 1
"3605" "exp3" 1 11 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2287 35 1
"3605" "exp3" 1 12 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1127 30 1
"3605" "exp3" 1 13 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2233 41 1
"3605" "exp3" 1 14 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1302 29 1
"3605" "exp3" 1 15 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2580 46 1
"3605" "exp3" 1 16 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1857 0 0
"3605" "exp3" 1 17 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 954 23 1
"3605" "exp3" 1 18 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1487 65 1
"3605" "exp3" 1 19 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2093 33 1
"3605" "exp3" 1 20 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1337 17 1
"3605" "exp3" 1 21 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1077 0 0
"3605" "exp3" 1 22 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 2058 73 1
"3605" "exp3" 1 23 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1042 0 0
"3605" "exp3" 1 24 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1044 0 0
"3605" "exp3" 1 25 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1045 25 1
"3605" "exp3" 1 26 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1114 0 0
"3605" "exp3" 1 27 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1352 34 1
"3605" "exp3" 1 28 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1101 45 1
"3605" "exp3" 1 29 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1255 27 1
"3605" "exp3" 1 30 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 955 0 0
"3605" "exp3" 1 31 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 877 19 1
"3605" "exp3" 1 32 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1963 29 1
"3605" "exp3" 1 33 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 996 17 1
"3605" "exp3" 1 34 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 2443 67 1
"3605" "exp3" 1 35 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 2728 38 1
"3605" "exp3" 1 36 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 937 0 0
"3605" "exp3" 1 37 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 959 0 0
"3605" "exp3" 1 38 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1266 0 0
"3605" "exp3" 1 39 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1089 82 1
"3605" "exp3" 1 40 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1080 83 1
"3605" "exp3" 1 41 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 871 31 1
"3605" "exp3" 1 42 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1119 0 0
"3605" "exp3" 1 43 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 853 0 0
"3605" "exp3" 1 44 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1227 0 0
"3605" "exp3" 1 45 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 793 0 0
"3605" "exp3" 1 46 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 5029 0 0
"3605" "exp3" 1 47 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2990 36 1
"3605" "exp3" 1 48 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 934 25 1
"3605" "exp3" 1 49 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 3511 32 1
"3605" "exp3" 1 50 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1693 49 1
"3605" "exp3" 1 51 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 921 74 1
"3605" "exp3" 1 52 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1355 0 0
"3605" "exp3" 1 53 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1290 18 1
"3605" "exp3" 1 54 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1280 0 0
"3605" "exp3" 1 55 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1442 40 1
"3605" "exp3" 1 56 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1807 21 1
"3605" "exp3" 1 57 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1798 0 0
"3605" "exp3" 1 58 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2202 0 0
"3605" "exp3" 1 59 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 2320 0 0
"3605" "exp3" 1 60 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1738 0 0
"3605" "exp3" 1 61 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1661 0 0
"3605" "exp3" 1 62 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1622 0 0
"3605" "exp3" 1 63 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1534 0 0
"3605" "exp3" 1 64 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 2244 0 0
"3605" "exp3" 1 65 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 3876 69 1
"3605" "exp3" 1 66 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1803 0 0
"3605" "exp3" 1 67 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1004 15 1
"3605" "exp3" 1 68 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 886 35 1
"3605" "exp3" 1 69 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1135 0 0
"3605" "exp3" 1 70 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1367 0 0
"3605" "exp3" 1 71 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1426 67 1
"3605" "exp3" 1 72 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1161 0 0
"3605" "exp3" 1 73 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1219 0 0
"3605" "exp3" 1 74 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1027 0 0
"3605" "exp3" 1 75 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1062 26 1
"3605" "exp3" 1 76 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 814 22 1
"3605" "exp3" 1 77 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 748 0 0
"3605" "exp3" 1 78 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1675 63 1
"3605" "exp3" 1 79 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1290 93 1
"3605" "exp3" 1 80 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 906 73 1
"3605" "exp3" 1 81 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 837 64 1
"3605" "exp3" 1 82 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1131 20 1
"3605" "exp3" 1 83 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2359 47 1
"3605" "exp3" 1 84 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1496 0 0
"3605" "exp3" 1 85 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 977 14 1
"3605" "exp3" 1 86 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 718 0 0
"3605" "exp3" 1 87 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1136 77 1
"3605" "exp3" 1 88 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 933 0 0
"3605" "exp3" 1 89 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1196 48 1
"3605" "exp3" 1 90 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 2123 0 0
"3605" "exp3" 1 91 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1565 0 0
"3605" "exp3" 1 92 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1099 0 0
"3605" "exp3" 1 93 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 744 0 0
"3605" "exp3" 1 94 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1246 0 0
"3605" "exp3" 1 95 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 812 87 1
"3605" "exp3" 1 96 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1232 0 0
"3605" "exp3" 1 97 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 701 0 0
"3605" "exp3" 1 98 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 2070 0 0
"3605" "exp3" 1 99 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2347 43 1
"3605" "exp3" 1 100 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1818 76 1
"3605" "exp3" 1 101 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1318 0 0
"3605" "exp3" 1 102 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 2036 0 0
"3605" "exp3" 1 103 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1366 86 1
"3605" "exp3" 1 104 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1153 28 1
"3605" "exp3" 1 105 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 2227 0 0
"3605" "exp3" 1 106 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1676 0 0
"3605" "exp3" 1 107 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 944 0 0
"3605" "exp3" 1 108 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 2086 0 0
"3605" "exp3" 1 109 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 946 38 1
"3605" "exp3" 1 110 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 761 0 0
"3605" "exp3" 1 111 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1143 0 0
"3605" "exp3" 1 112 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1188 0 0
"3605" "exp3" 1 113 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 773 0 0
"3605" "exp3" 1 114 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1134 24 1
"3605" "exp3" 1 115 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1019 13 1
"3605" "exp3" 1 116 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2656 16 1
"3605" "exp3" 1 117 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1570 21 1
"3605" "exp3" 1 118 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 3200 81 1
"3605" "exp3" 1 119 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1679 0 0
"3605" "exp3" 1 120 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1634 75 1
"3605" "exp3" 1 121 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1695 0 0
"3605" "exp3" 1 122 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1384 0 0
"3605" "exp3" 1 123 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 829 0 0
"3605" "exp3" 1 124 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1141 0 0
"3605" "exp3" 1 125 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1018 0 0
"3605" "exp3" 1 126 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 2307 0 0
"3605" "exp3" 1 127 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1766 41 1
"3605" "exp3" 1 128 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1990 0 0
"3605" "exp3" 1 129 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 809 71 1
"3605" "exp3" 1 130 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1037 0 0
"3605" "exp3" 1 131 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 703 92 1
"3605" "exp3" 1 132 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 922 0 0
"3605" "exp3" 2 1 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2812 33 1
"3605" "exp3" 2 2 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1554 46 1
"3605" "exp3" 2 3 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 829 0 0
"3605" "exp3" 2 4 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1298 68 1
"3605" "exp3" 2 5 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 848 0 0
"3605" "exp3" 2 6 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1076 0 0
"3605" "exp3" 2 7 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 881 0 0
"3605" "exp3" 2 8 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 908 93 1
"3605" "exp3" 2 9 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1436 29 1
"3605" "exp3" 2 10 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 4946 63 1
"3605" "exp3" 2 11 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 955 0 0
"3605" "exp3" 2 12 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 830 20 1
"3605" "exp3" 2 13 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1498 0 0
"3605" "exp3" 2 14 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1213 34 1
"3605" "exp3" 2 15 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1691 45 1
"3605" "exp3" 2 16 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1221 36 1
"3605" "exp3" 2 17 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1009 29 1
"3605" "exp3" 2 18 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1127 0 0
"3605" "exp3" 2 19 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 840 0 0
"3605" "exp3" 2 20 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1223 0 0
"3605" "exp3" 2 21 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1260 35 1
"3605" "exp3" 2 22 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1294 0 0
"3605" "exp3" 2 23 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1575 39 1
"3605" "exp3" 2 24 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 2947 41 1
"3605" "exp3" 2 25 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1128 0 0
"3605" "exp3" 2 26 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1247 0 0
"3605" "exp3" 2 27 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1498 36 1
"3605" "exp3" 2 28 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 973 83 1
"3605" "exp3" 2 29 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 911 0 0
"3605" "exp3" 2 30 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 946 17 1
"3605" "exp3" 2 31 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1711 0 0
"3605" "exp3" 2 32 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1179 33 1
"3605" "exp3" 2 33 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 986 49 1
"3605" "exp3" 2 34 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 946 0 0
"3605" "exp3" 2 35 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 871 28 1
"3605" "exp3" 2 36 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1268 0 0
"3605" "exp3" 2 37 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1075 79 1
"3605" "exp3" 2 38 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1315 0 0
"3605" "exp3" 2 39 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 912 19 1
"3605" "exp3" 2 40 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 871 0 0
"3605" "exp3" 2 41 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 834 0 0
"3605" "exp3" 2 42 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1834 27 1
"3605" "exp3" 2 43 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1698 0 0
"3605" "exp3" 2 44 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 690 0 0
"3605" "exp3" 2 45 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1698 0 0
"3605" "exp3" 2 46 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2814 0 0
"3605" "exp3" 2 47 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1252 66 1
"3605" "exp3" 2 48 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1165 0 0
"3605" "exp3" 2 49 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 969 32 1
"3605" "exp3" 2 50 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 865 41 1
"3605" "exp3" 2 51 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1183 23 1
"3605" "exp3" 2 52 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2535 28 1
"3605" "exp3" 2 53 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1013 32 1
"3605" "exp3" 2 54 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 766 40 1
"3605" "exp3" 2 55 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 897 0 0
"3605" "exp3" 2 56 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 656 0 0
"3605" "exp3" 2 57 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 620 94 1
"3605" "exp3" 2 58 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 751 16 1
"3605" "exp3" 2 59 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 714 19 1
"3605" "exp3" 2 60 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 925 0 0
"3605" "exp3" 2 61 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 728 0 0
"3605" "exp3" 2 62 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1297 18 1
"3605" "exp3" 2 63 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 936 0 0
"3605" "exp3" 2 64 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 607 0 0
"3605" "exp3" 2 65 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 896 47 1
"3605" "exp3" 2 66 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1124 83 1
"3605" "exp3" 2 67 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 713 0 0
"3605" "exp3" 2 68 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 816 0 0
"3605" "exp3" 2 69 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1006 84 1
"3605" "exp3" 2 70 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 979 0 0
"3605" "exp3" 2 71 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 2624 17 1
"3605" "exp3" 2 72 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1075 30 1
"3605" "exp3" 2 73 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 993 0 0
"3605" "exp3" 2 74 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1300 24 1
"3605" "exp3" 2 75 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1173 0 0
"3605" "exp3" 2 76 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1268 44 1
"3605" "exp3" 2 77 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 854 0 0
"3605" "exp3" 2 78 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 805 25 1
"3605" "exp3" 2 79 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1027 0 0
"3605" "exp3" 2 80 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 989 37 1
"3605" "exp3" 2 81 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 823 30 1
"3605" "exp3" 2 82 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 967 26 1
"3605" "exp3" 2 83 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 929 35 1
"3605" "exp3" 2 84 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 674 0 0
"3605" "exp3" 2 85 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1094 69 1
"3605" "exp3" 2 86 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 2395 0 0
"3605" "exp3" 2 87 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1057 0 0
"3605" "exp3" 2 88 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 828 0 0
"3605" "exp3" 2 89 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1083 0 0
"3605" "exp3" 2 90 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 957 21 1
"3605" "exp3" 2 91 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1421 29 1
"3605" "exp3" 2 92 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 902 31 1
"3605" "exp3" 2 93 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 896 20 1
"3605" "exp3" 2 94 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 864 0 0
"3605" "exp3" 2 95 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1004 0 0
"3605" "exp3" 2 96 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1193 0 0
"3605" "exp3" 2 97 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1114 68 1
"3605" "exp3" 2 98 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1507 0 0
"3605" "exp3" 2 99 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 715 0 0
"3605" "exp3" 2 100 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 996 0 0
"3605" "exp3" 2 101 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1518 0 0
"3605" "exp3" 2 102 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1430 43 1
"3605" "exp3" 2 103 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 914 14 1
"3605" "exp3" 2 104 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 705 0 0
"3605" "exp3" 2 105 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 862 0 0
"3605" "exp3" 2 106 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1170 23 1
"3605" "exp3" 2 107 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1212 80 1
"3605" "exp3" 2 108 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 728 13 1
"3605" "exp3" 2 109 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1197 44 1
"3605" "exp3" 2 110 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 948 0 0
"3605" "exp3" 2 111 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1339 0 0
"3605" "exp3" 2 112 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1039 24 1
"3605" "exp3" 2 113 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1180 40 1
"3605" "exp3" 2 114 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1318 42 1
"3605" "exp3" 2 115 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 3128 0 0
"3605" "exp3" 2 116 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 999 0 0
"3605" "exp3" 2 117 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1063 0 0
"3605" "exp3" 2 118 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1161 39 1
"3605" "exp3" 2 119 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 3576 0 0
"3605" "exp3" 2 120 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 3673 25 1
"3605" "exp3" 2 121 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 3414 79 1
"3605" "exp3" 2 122 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 2441 0 0
"3605" "exp3" 2 123 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 2587 0 0
"3605" "exp3" 2 124 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 3826 48 1
"3605" "exp3" 2 125 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 3687 26 1
"3605" "exp3" 2 126 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1158 0 0
"3605" "exp3" 2 127 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1432 31 1
"3605" "exp3" 2 128 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 2590 78 1
"3605" "exp3" 2 129 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1183 74 1
"3605" "exp3" 2 130 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1544 0 0
"3605" "exp3" 2 131 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1098 97 1
"3605" "exp3" 2 132 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1397 22 1
"3605" "exp3" 1 1 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 3044 0 0
"3605" "exp3" 1 2 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 3195 0 0
"3605" "exp3" 1 3 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1657 0 0
"3605" "exp3" 1 4 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1441 84 1
"3605" "exp3" 1 5 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1393 0 0
"3605" "exp3" 1 6 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1344 17 1
"3605" "exp3" 1 7 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1257 0 0
"3605" "exp3" 1 8 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1093 23 1
"3605" "exp3" 1 9 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1810 22 1
"3605" "exp3" 1 10 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1100 0 0
"3605" "exp3" 1 11 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1056 80 1
"3605" "exp3" 1 12 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1117 22 1
"3605" "exp3" 1 13 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 903 13 1
"3605" "exp3" 1 14 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1728 28 1
"3605" "exp3" 1 15 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1876 48 1
"3605" "exp3" 1 16 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2908 44 1
"3605" "exp3" 1 17 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1526 79 1
"3605" "exp3" 1 18 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1183 20 1
"3605" "exp3" 1 19 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1414 0 0
"3605" "exp3" 1 20 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 850 14 1
"3605" "exp3" 1 21 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 1165 39 1
"3605" "exp3" 1 22 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1108 0 0
"3605" "exp3" 1 23 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 891 87 1
"3605" "exp3" 1 24 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1104 82 1
"3605" "exp3" 1 25 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1754 0 0
"3605" "exp3" 1 26 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1941 0 0
"3605" "exp3" 1 27 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1856 0 0
"3605" "exp3" 1 28 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2799 42 1
"3605" "exp3" 1 29 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 924 0 0
"3605" "exp3" 1 30 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 3473 38 1
"3605" "exp3" 1 31 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1513 0 0
"3605" "exp3" 1 32 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1983 34 1
"3605" "exp3" 1 33 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3467 0 0
"3605" "exp3" 1 34 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1798 74 1
"3605" "exp3" 1 35 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1245 87 1
"3605" "exp3" 1 36 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1789 25 1
"3605" "exp3" 1 37 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1818 24 1
"3605" "exp3" 1 38 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1723 0 0
"3605" "exp3" 1 39 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 2021 32 1
"3605" "exp3" 1 40 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1144 64 1
"3605" "exp3" 1 41 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 3154 35 1
"3605" "exp3" 1 42 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2003 0 0
"3605" "exp3" 1 43 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1256 21 1
"3605" "exp3" 1 44 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1486 17 1
"3605" "exp3" 1 45 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 4328 0 0
"3605" "exp3" 1 46 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1231 23 1
"3605" "exp3" 1 47 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 2053 25 1
"3605" "exp3" 1 48 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 2352 0 0
"3605" "exp3" 1 49 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1418 28 1
"3605" "exp3" 1 50 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1733 70 1
"3605" "exp3" 1 51 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1236 33 1
"3605" "exp3" 1 52 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1334 40 1
"3605" "exp3" 1 53 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1256 94 1
"3605" "exp3" 1 54 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 2322 63 1
"3605" "exp3" 1 55 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1556 30 1
"3605" "exp3" 1 56 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 808 0 0
"3605" "exp3" 1 57 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 968 0 0
"3605" "exp3" 1 58 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1083 92 1
"3605" "exp3" 1 59 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 2501 0 0
"3605" "exp3" 1 60 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 2730 15 1
"3605" "exp3" 1 61 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1144 0 0
"3605" "exp3" 1 62 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 2134 0 0
"3605" "exp3" 1 63 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 3720 0 0
"3605" "exp3" 1 64 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1698 0 0
"3605" "exp3" 1 65 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 2740 0 0
"3605" "exp3" 1 66 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 2319 42 1
"3605" "exp3" 1 67 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 5388 36 1
"3605" "exp3" 1 68 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1024 0 0
"3605" "exp3" 1 69 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1295 0 0
"3605" "exp3" 1 70 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2023 16 1
"3605" "exp3" 1 71 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 3139 0 0
"3605" "exp3" 1 72 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 884 93 1
"3605" "exp3" 1 73 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 3077 0 0
"3605" "exp3" 1 74 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 3246 0 0
"3605" "exp3" 1 75 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 795 0 0
"3605" "exp3" 1 76 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 5684 45 1
"3605" "exp3" 1 77 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1200 0 0
"3605" "exp3" 1 78 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 878 0 0
"3605" "exp3" 1 79 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1155 0 0
"3605" "exp3" 1 80 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1786 67 1
"3605" "exp3" 1 81 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1999 68 1
"3605" "exp3" 1 82 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2151 31 1
"3605" "exp3" 1 83 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 3778 18 1
"3605" "exp3" 1 84 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1001 0 0
"3605" "exp3" 1 85 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1272 0 0
"3605" "exp3" 1 86 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1662 43 1
"3605" "exp3" 1 87 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 2522 26 1
"3605" "exp3" 1 88 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1857 0 0
"3605" "exp3" 1 89 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 997 89 1
"3605" "exp3" 1 90 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1174 0 0
"3605" "exp3" 1 91 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2401 40 1
"3605" "exp3" 1 92 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 894 19 1
"3605" "exp3" 1 93 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1305 0 0
"3605" "exp3" 1 94 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1438 18 1
"3605" "exp3" 1 95 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1492 85 1
"3605" "exp3" 1 96 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 4158 41 1
"3605" "exp3" 1 97 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1107 0 0
"3605" "exp3" 1 98 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 2056 27 1
"3605" "exp3" 1 99 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 3072 0 0
"3605" "exp3" 1 100 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 886 0 0
"3605" "exp3" 1 101 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1216 0 0
"3605" "exp3" 1 102 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 2689 34 1
"3605" "exp3" 1 103 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 4855 82 1
"3605" "exp3" 1 104 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 5889 0 0
"3605" "exp3" 1 105 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1685 32 1
"3605" "exp3" 1 106 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1346 38 1
"3605" "exp3" 1 107 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3253 65 1
"3605" "exp3" 1 108 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 3813 44 1
"3605" "exp3" 1 109 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1042 30 1
"3605" "exp3" 1 110 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1359 75 1
"3605" "exp3" 1 111 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1323 0 0
"3605" "exp3" 1 112 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1510 0 0
"3605" "exp3" 1 113 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2704 43 1
"3605" "exp3" 1 114 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1392 24 1
"3605" "exp3" 1 115 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1431 36 1
"3605" "exp3" 1 116 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1430 0 0
"3605" "exp3" 1 117 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 3066 37 1
"3605" "exp3" 1 118 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1299 29 1
"3605" "exp3" 1 119 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 1132 0 0
"3605" "exp3" 1 120 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1164 20 1
"3605" "exp3" 1 121 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 826 0 0
"3605" "exp3" 1 122 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 959 0 0
"3605" "exp3" 1 123 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 946 10 1
"3605" "exp3" 1 124 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2862 0 0
"3605" "exp3" 1 125 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1536 0 0
"3605" "exp3" 1 126 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 3330 35 1
"3605" "exp3" 1 127 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2098 0 0
"3605" "exp3" 1 128 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1352 0 0
"3605" "exp3" 1 129 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1278 27 1
"3605" "exp3" 1 130 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1253 21 1
"3605" "exp3" 1 131 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1292 0 0
"3605" "exp3" 1 132 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1471 0 0
"3605" "exp3" 2 1 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1909 0 0
"3605" "exp3" 2 2 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2444 44 1
"3605" "exp3" 2 3 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1114 91 1
"3605" "exp3" 2 4 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1167 0 0
"3605" "exp3" 2 5 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1865 65 1
"3605" "exp3" 2 6 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 3183 37 1
"3605" "exp3" 2 7 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1991 19 1
"3605" "exp3" 2 8 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1268 0 0
"3605" "exp3" 2 9 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 865 0 0
"3605" "exp3" 2 10 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1053 0 0
"3605" "exp3" 2 11 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1196 28 1
"3605" "exp3" 2 12 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1526 78 1
"3605" "exp3" 2 13 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 954 17 1
"3605" "exp3" 2 14 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 2517 0 0
"3605" "exp3" 2 15 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 1606 0 0
"3605" "exp3" 2 16 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 914 0 0
"3605" "exp3" 2 17 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1250 70 1
"3605" "exp3" 2 18 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1232 13 1
"3605" "exp3" 2 19 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1010 0 0
"3605" "exp3" 2 20 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1281 0 0
"3605" "exp3" 2 21 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1112 22 1
"3605" "exp3" 2 22 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1613 0 0
"3605" "exp3" 2 23 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 893 21 1
"3605" "exp3" 2 24 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1640 18 1
"3605" "exp3" 2 25 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1253 0 0
"3605" "exp3" 2 26 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1449 72 1
"3605" "exp3" 2 27 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2959 0 0
"3605" "exp3" 2 28 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1131 18 1
"3605" "exp3" 2 29 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1448 0 0
"3605" "exp3" 2 30 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1147 31 1
"3605" "exp3" 2 31 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1882 0 0
"3605" "exp3" 2 32 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1190 0 0
"3605" "exp3" 2 33 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1283 0 0
"3605" "exp3" 2 34 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1017 34 1
"3605" "exp3" 2 35 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1161 73 1
"3605" "exp3" 2 36 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 3491 27 1
"3605" "exp3" 2 37 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 963 19 1
"3605" "exp3" 2 38 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 3296 47 1
"3605" "exp3" 2 39 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1323 29 1
"3605" "exp3" 2 40 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1310 27 1
"3605" "exp3" 2 41 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 946 32 1
"3605" "exp3" 2 42 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 972 26 1
"3605" "exp3" 2 43 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 965 23 1
"3605" "exp3" 2 44 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1079 0 0
"3605" "exp3" 2 45 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 962 0 0
"3605" "exp3" 2 46 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 716 0 0
"3605" "exp3" 2 47 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1147 33 1
"3605" "exp3" 2 48 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1218 0 0
"3605" "exp3" 2 49 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 905 0 0
"3605" "exp3" 2 50 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1129 30 1
"3605" "exp3" 2 51 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 1884 0 0
"3605" "exp3" 2 52 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1432 41 1
"3605" "exp3" 2 53 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1268 66 1
"3605" "exp3" 2 54 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1162 0 0
"3605" "exp3" 2 55 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1939 76 1
"3605" "exp3" 2 56 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 932 32 1
"3605" "exp3" 2 57 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 880 0 0
"3605" "exp3" 2 58 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 953 0 0
"3605" "exp3" 2 59 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1323 38 1
"3605" "exp3" 2 60 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 1199 0 0
"3605" "exp3" 2 61 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 837 0 0
"3605" "exp3" 2 62 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1190 0 0
"3605" "exp3" 2 63 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1143 33 1
"3605" "exp3" 2 64 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 979 71 1
"3605" "exp3" 2 65 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 5453 45 1
"3605" "exp3" 2 66 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1070 35 1
"3605" "exp3" 2 67 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 5848 0 0
"3605" "exp3" 2 68 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 937 0 0
"3605" "exp3" 2 69 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1922 23 1
"3605" "exp3" 2 70 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1484 0 0
"3605" "exp3" 2 71 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 970 0 0
"3605" "exp3" 2 72 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1163 16 1
"3605" "exp3" 2 73 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1508 32 1
"3605" "exp3" 2 74 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1058 31 1
"3605" "exp3" 2 75 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 887 0 0
"3605" "exp3" 2 76 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1557 29 1
"3605" "exp3" 2 77 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 853 22 1
"3605" "exp3" 2 78 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1194 83 1
"3605" "exp3" 2 79 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1316 30 1
"3605" "exp3" 2 80 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 754 0 0
"3605" "exp3" 2 81 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1881 0 0
"3605" "exp3" 2 82 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1350 42 1
"3605" "exp3" 2 83 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 852 0 0
"3605" "exp3" 2 84 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1131 73 1
"3605" "exp3" 2 85 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 1520 0 0
"3605" "exp3" 2 86 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1093 26 1
"3605" "exp3" 2 87 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 3880 0 0
"3605" "exp3" 2 88 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1675 0 0
"3605" "exp3" 2 89 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 1359 0 0
"3605" "exp3" 2 90 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1516 0 0
"3605" "exp3" 2 91 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 2597 0 0
"3605" "exp3" 2 92 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 2193 0 0
"3605" "exp3" 2 93 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1232 17 1
"3605" "exp3" 2 94 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1216 14 1
"3605" "exp3" 2 95 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 2029 0 0
"3605" "exp3" 2 96 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 4341 41 1
"3605" "exp3" 2 97 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1115 0 0
"3605" "exp3" 2 98 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1751 0 0
"3605" "exp3" 2 99 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1297 35 1
"3605" "exp3" 2 100 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1111 24 1
"3605" "exp3" 2 101 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1619 0 0
"3605" "exp3" 2 102 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 3162 0 0
"3605" "exp3" 2 103 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 2572 64 1
"3605" "exp3" 2 104 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1272 0 0
"3605" "exp3" 2 105 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 900 28 1
"3605" "exp3" 2 106 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1043 0 0
"3605" "exp3" 2 107 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1627 80 1
"3605" "exp3" 2 108 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1091 74 1
"3605" "exp3" 2 109 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1088 92 1
"3605" "exp3" 2 110 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1951 0 0
"3605" "exp3" 2 111 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 936 0 0
"3605" "exp3" 2 112 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1905 48 1
"3605" "exp3" 2 113 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1127 0 0
"3605" "exp3" 2 114 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 937 21 1
"3605" "exp3" 2 115 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1092 0 0
"3605" "exp3" 2 116 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 828 0 0
"3605" "exp3" 2 117 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1295 0 0
"3605" "exp3" 2 118 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1563 0 0
"3605" "exp3" 2 119 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 888 0 0
"3605" "exp3" 2 120 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1847 0 0
"3605" "exp3" 2 121 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1421 0 0
"3605" "exp3" 2 122 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 6917 0 0
"3605" "exp3" 2 123 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 4353 74 1
"3605" "exp3" 2 124 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2736 39 1
"3605" "exp3" 2 125 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 2825 44 1
"3605" "exp3" 2 126 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1499 69 1
"3605" "exp3" 2 127 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1177 20 1
"3605" "exp3" 2 128 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1105 70 1
"3605" "exp3" 2 129 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 798 0 0
"3605" "exp3" 2 130 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1189 0 0
"3605" "exp3" 2 131 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 958 24 1
"3605" "exp3" 2 132 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 958 36 1
"3606" "exp3" 1 1 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 568 0 0
"3606" "exp3" 1 2 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 1004 70 1
"3606" "exp3" 1 3 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 1060 9 1
"3606" "exp3" 1 4 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 763 67 1
"3606" "exp3" 1 5 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 551 0 0
"3606" "exp3" 1 6 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1543 13 1
"3606" "exp3" 1 7 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1043 66 1
"3606" "exp3" 1 8 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 684 0 0
"3606" "exp3" 1 9 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 402 0 0
"3606" "exp3" 1 10 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 643 69 1
"3606" "exp3" 1 11 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 703 0 0
"3606" "exp3" 1 12 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1090 0 0
"3606" "exp3" 1 13 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 904 83 1
"3606" "exp3" 1 14 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 234 0 0
"3606" "exp3" 1 15 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 2 627 0 0
"3606" "exp3" 1 16 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 665 0 0
"3606" "exp3" 1 17 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 460 0 0
"3606" "exp3" 1 18 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 2 539 78 1
"3606" "exp3" 1 19 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 428 0 0
"3606" "exp3" 1 20 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 953 38 1
"3606" "exp3" 1 21 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 564 53 1
"3606" "exp3" 1 22 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 563 0 0
"3606" "exp3" 1 23 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 354 0 0
"3606" "exp3" 1 24 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 609 0 0
"3606" "exp3" 1 25 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 1269 0 0
"3606" "exp3" 1 26 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 864 23 1
"3606" "exp3" 1 27 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 2 617 0 0
"3606" "exp3" 1 28 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 372 51 1
"3606" "exp3" 1 29 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1251 0 0
"3606" "exp3" 1 30 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 829 14 1
"3606" "exp3" 1 31 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 4242 0 0
"3606" "exp3" 1 32 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 513 95 1
"3606" "exp3" 1 33 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 923 0 0
"3606" "exp3" 1 34 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 2325 0 0
"3606" "exp3" 1 35 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 811 44 1
"3606" "exp3" 1 36 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1078 29 1
"3606" "exp3" 1 37 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 1959 0 0
"3606" "exp3" 1 38 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1714 0 0
"3606" "exp3" 1 39 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1183 28 1
"3606" "exp3" 1 40 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1074 68 1
"3606" "exp3" 1 41 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 2537 0 0
"3606" "exp3" 1 42 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 679 0 0
"3606" "exp3" 1 43 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 632 71 1
"3606" "exp3" 1 44 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2326 28 1
"3606" "exp3" 1 45 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 651 46 1
"3606" "exp3" 1 46 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 1678 0 0
"3606" "exp3" 1 47 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1208 0 0
"3606" "exp3" 1 48 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 952 21 1
"3606" "exp3" 1 49 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1371 0 0
"3606" "exp3" 1 50 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1239 0 0
"3606" "exp3" 1 51 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1250 32 1
"3606" "exp3" 1 52 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1388 0 0
"3606" "exp3" 1 53 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 604 19 1
"3606" "exp3" 1 54 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 480 8 1
"3606" "exp3" 1 55 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 756 0 0
"3606" "exp3" 1 56 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 965 0 0
"3606" "exp3" 1 57 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1095 0 0
"3606" "exp3" 1 58 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1315 0 0
"3606" "exp3" 1 59 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 1311 0 0
"3606" "exp3" 1 60 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 1950 80 1
"3606" "exp3" 1 61 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 769 0 0
"3606" "exp3" 1 62 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1906 22 1
"3606" "exp3" 1 63 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1504 0 0
"3606" "exp3" 1 64 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 2895 10 1
"3606" "exp3" 1 65 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 527 0 0
"3606" "exp3" 1 66 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1092 0 0
"3606" "exp3" 1 67 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1279 32 1
"3606" "exp3" 1 68 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1409 0 0
"3606" "exp3" 1 69 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 1249 0 0
"3606" "exp3" 1 70 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 808 31 1
"3606" "exp3" 1 71 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 982 0 0
"3606" "exp3" 1 72 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1516 0 0
"3606" "exp3" 1 73 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 327 5 1
"3606" "exp3" 1 74 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 2910 10 1
"3606" "exp3" 1 75 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 4625 0 0
"3606" "exp3" 1 76 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 875 17 1
"3606" "exp3" 1 77 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 6494 6 1
"3606" "exp3" 1 78 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 2855 0 0
"3606" "exp3" 1 79 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 3584 86 1
"3606" "exp3" 1 80 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 706 0 0
"3606" "exp3" 1 81 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 502 0 0
"3606" "exp3" 1 82 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2798 0 0
"3606" "exp3" 1 83 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 3222 83 1
"3606" "exp3" 1 84 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 477 35 1
"3606" "exp3" 1 85 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 4141 27 1
"3606" "exp3" 1 86 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 1751 0 0
"3606" "exp3" 1 87 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1276 0 0
"3606" "exp3" 1 88 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 2312 0 0
"3606" "exp3" 1 89 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 3987 30 1
"3606" "exp3" 1 90 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1474 15 1
"3606" "exp3" 1 91 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 707 0 0
"3606" "exp3" 1 92 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2087 0 0
"3606" "exp3" 1 93 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 9348 0 0
"3606" "exp3" 1 94 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 1052 36 1
"3606" "exp3" 1 95 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 2 1089 0 0
"3606" "exp3" 1 96 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 2742 0 0
"3606" "exp3" 1 97 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 5940 0 0
"3606" "exp3" 1 98 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1117 33 1
"3606" "exp3" 1 99 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 573 0 0
"3606" "exp3" 1 100 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 2 2222 0 0
"3606" "exp3" 1 101 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 2 3641 0 0
"3606" "exp3" 1 102 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 654 0 0
"3606" "exp3" 1 103 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 1730 72 1
"3606" "exp3" 1 104 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 942 0 0
"3606" "exp3" 1 105 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1055 33 1
"3606" "exp3" 1 106 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 2286 66 1
"3606" "exp3" 1 107 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1838 25 1
"3606" "exp3" 1 108 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 1140 0 0
"3606" "exp3" 1 109 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 3758 0 0
"3606" "exp3" 1 110 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 1513 0 0
"3606" "exp3" 1 111 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 1839 0 0
"3606" "exp3" 1 112 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2828 0 0
"3606" "exp3" 1 113 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1689 42 1
"3606" "exp3" 1 114 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2839 31 1
"3606" "exp3" 1 115 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 2537 0 0
"3606" "exp3" 1 116 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1226 25 1
"3606" "exp3" 1 117 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 2214 0 0
"3606" "exp3" 1 118 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 3278 0 0
"3606" "exp3" 1 119 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 2610 0 0
"3606" "exp3" 1 120 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1574 0 0
"3606" "exp3" 1 121 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1416 21 1
"3606" "exp3" 1 122 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 987 22 1
"3606" "exp3" 1 123 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 7790 0 0
"3606" "exp3" 1 124 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1284 35 1
"3606" "exp3" 1 125 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 1317 0 0
"3606" "exp3" 1 126 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 2238 30 1
"3606" "exp3" 1 127 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2161 0 0
"3606" "exp3" 1 128 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 834 0 0
"3606" "exp3" 1 129 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 547 74 1
"3606" "exp3" 1 130 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 4876 0 0
"3606" "exp3" 1 131 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 1418 0 0
"3606" "exp3" 1 132 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 1618 63 1
"3606" "exp3" 2 1 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 3132 85 1
"3606" "exp3" 2 2 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1040 0 0
"3606" "exp3" 2 3 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 612 65 1
"3606" "exp3" 2 4 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 778 0 0
"3606" "exp3" 2 5 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1186 67 1
"3606" "exp3" 2 6 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 3696 26 1
"3606" "exp3" 2 7 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1896 14 1
"3606" "exp3" 2 8 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 2 1523 0 0
"3606" "exp3" 2 9 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 2 2120 0 0
"3606" "exp3" 2 10 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 3763 0 0
"3606" "exp3" 2 11 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 712 31 1
"3606" "exp3" 2 12 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2217 0 0
"3606" "exp3" 2 13 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 789 62 1
"3606" "exp3" 2 14 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 2229 0 0
"3606" "exp3" 2 15 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 3854 23 1
"3606" "exp3" 2 16 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 2 3701 0 0
"3606" "exp3" 2 17 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 1616 27 1
"3606" "exp3" 2 18 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 2196 0 0
"3606" "exp3" 2 19 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2837 0 0
"3606" "exp3" 2 20 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 2 1345 0 0
"3606" "exp3" 2 21 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 2 1365 0 0
"3606" "exp3" 2 22 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 3486 0 0
"3606" "exp3" 2 23 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2138 0 0
"3606" "exp3" 2 24 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 3056 84 1
"3606" "exp3" 2 25 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1092 0 0
"3606" "exp3" 2 26 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1926 25 1
"3606" "exp3" 2 27 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 910 0 0
"3606" "exp3" 2 28 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 765 0 0
"3606" "exp3" 2 29 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1717 0 0
"3606" "exp3" 2 30 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 4352 0 0
"3606" "exp3" 2 31 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 838 76 1
"3606" "exp3" 2 32 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 2 578 0 0
"3606" "exp3" 2 33 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1110 16 1
"3606" "exp3" 2 34 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 3684 38 1
"3606" "exp3" 2 35 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1303 35 1
"3606" "exp3" 2 36 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1222 21 1
"3606" "exp3" 2 37 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1775 0 0
"3606" "exp3" 2 38 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 909 0 0
"3606" "exp3" 2 39 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 448 0 0
"3606" "exp3" 2 40 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 2254 92 1
"3606" "exp3" 2 41 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 2081 29 1
"3606" "exp3" 2 42 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 594 93 1
"3606" "exp3" 2 43 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 1964 42 1
"3606" "exp3" 2 44 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 2 1251 0 0
"3606" "exp3" 2 45 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1552 45 1
"3606" "exp3" 2 46 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 3451 0 0
"3606" "exp3" 2 47 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 5679 19 1
"3606" "exp3" 2 48 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 1438 54 1
"3606" "exp3" 2 49 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1372 0 0
"3606" "exp3" 2 50 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 3773 20 1
"3606" "exp3" 2 51 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1280 89 1
"3606" "exp3" 2 52 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 2836 83 1
"3606" "exp3" 2 53 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 7129 0 0
"3606" "exp3" 2 54 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1183 24 1
"3606" "exp3" 2 55 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 643 0 0
"3606" "exp3" 2 56 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 865 0 0
"3606" "exp3" 2 57 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 819 59 1
"3606" "exp3" 2 58 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 604 0 0
"3606" "exp3" 2 59 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 1013 8 1
"3606" "exp3" 2 60 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1331 71 1
"3606" "exp3" 2 61 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2147 23 1
"3606" "exp3" 2 62 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1404 30 1
"3606" "exp3" 2 63 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 922 0 0
"3606" "exp3" 2 64 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 3685 63 1
"3606" "exp3" 2 65 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 2 1055 0 0
"3606" "exp3" 2 66 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 2 2560 0 0
"3606" "exp3" 2 67 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1617 18 1
"3606" "exp3" 2 68 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 968 41 1
"3606" "exp3" 2 69 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 4555 0 0
"3606" "exp3" 2 70 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1892 0 0
"3606" "exp3" 2 71 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 4337 0 0
"3606" "exp3" 2 72 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1878 0 0
"3606" "exp3" 2 73 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 865 22 1
"3606" "exp3" 2 74 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 689 12 1
"3606" "exp3" 2 75 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 2 1105 0 0
"3606" "exp3" 2 76 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 2152 36 1
"3606" "exp3" 2 77 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 2401 0 0
"3606" "exp3" 2 78 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 6044 0 0
"3606" "exp3" 2 79 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 3851 87 1
"3606" "exp3" 2 80 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 4050 0 0
"3606" "exp3" 2 81 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 2907 0 0
"3606" "exp3" 2 82 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1013 0 0
"3606" "exp3" 2 83 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 571 0 0
"3606" "exp3" 2 84 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 495 0 0
"3606" "exp3" 2 85 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 963 0 0
"3606" "exp3" 2 86 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 886 0 0
"3606" "exp3" 2 87 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 2400 0 0
"3606" "exp3" 2 88 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 1579 0 0
"3606" "exp3" 2 89 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 643 74 1
"3606" "exp3" 2 90 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 2369 0 0
"3606" "exp3" 2 91 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 2951 0 0
"3606" "exp3" 2 92 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1421 97 1
"3606" "exp3" 2 93 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 864 32 1
"3606" "exp3" 2 94 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 3083 0 0
"3606" "exp3" 2 95 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 865 0 0
"3606" "exp3" 2 96 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 2 2348 0 0
"3606" "exp3" 2 97 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 958 0 0
"3606" "exp3" 2 98 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 2481 44 1
"3606" "exp3" 2 99 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 4279 0 0
"3606" "exp3" 2 100 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 494 0 0
"3606" "exp3" 2 101 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 2 2515 0 0
"3606" "exp3" 2 102 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 1117 0 0
"3606" "exp3" 2 103 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1353 0 0
"3606" "exp3" 2 104 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 1975 0 0
"3606" "exp3" 2 105 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2634 49 1
"3606" "exp3" 2 106 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 715 69 1
"3606" "exp3" 2 107 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 2 1218 75 1
"3606" "exp3" 2 108 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 846 70 1
"3606" "exp3" 2 109 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 2 2094 0 0
"3606" "exp3" 2 110 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 403 63 1
"3606" "exp3" 2 111 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 672 0 0
"3606" "exp3" 2 112 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1220 0 0
"3606" "exp3" 2 113 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 483 32 1
"3606" "exp3" 2 114 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 978 22 1
"3606" "exp3" 2 115 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 535 0 0
"3606" "exp3" 2 116 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 547 0 0
"3606" "exp3" 2 117 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1030 0 0
"3606" "exp3" 2 118 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1945 0 0
"3606" "exp3" 2 119 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 421 0 0
"3606" "exp3" 2 120 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 1396 63 1
"3606" "exp3" 2 121 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1033 0 0
"3606" "exp3" 2 122 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1896 0 0
"3606" "exp3" 2 123 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 780 0 0
"3606" "exp3" 2 124 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1581 0 0
"3606" "exp3" 2 125 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 565 74 1
"3606" "exp3" 2 126 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 273 0 0
"3606" "exp3" 2 127 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 933 0 0
"3606" "exp3" 2 128 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1393 33 1
"3606" "exp3" 2 129 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 642 0 0
"3606" "exp3" 2 130 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 813 0 0
"3606" "exp3" 2 131 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 737 0 0
"3606" "exp3" 2 132 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 785 0 0
"3606" "exp3" 1 1 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 585 0 0
"3606" "exp3" 1 2 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 719 17 1
"3606" "exp3" 1 3 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 455 57 1
"3606" "exp3" 1 4 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 760 0 0
"3606" "exp3" 1 5 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 1484 0 0
"3606" "exp3" 1 6 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1317 0 0
"3606" "exp3" 1 7 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 638 0 0
"3606" "exp3" 1 8 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 540 30 1
"3606" "exp3" 1 9 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 624 0 0
"3606" "exp3" 1 10 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 2 930 60 1
"3606" "exp3" 1 11 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1072 29 1
"3606" "exp3" 1 12 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 697 0 0
"3606" "exp3" 1 13 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1065 85 1
"3606" "exp3" 1 14 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 507 0 0
"3606" "exp3" 1 15 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 561 0 0
"3606" "exp3" 1 16 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 2 664 0 0
"3606" "exp3" 1 17 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 596 64 1
"3606" "exp3" 1 18 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1228 0 0
"3606" "exp3" 1 19 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 2343 0 0
"3606" "exp3" 1 20 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 994 19 1
"3606" "exp3" 1 21 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 916 0 0
"3606" "exp3" 1 22 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 585 0 0
"3606" "exp3" 1 23 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1185 72 1
"3606" "exp3" 1 24 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1256 90 1
"3606" "exp3" 1 25 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 795 0 0
"3606" "exp3" 1 26 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1180 83 1
"3606" "exp3" 1 27 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1966 0 0
"3606" "exp3" 1 28 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 960 18 1
"3606" "exp3" 1 29 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 647 34 1
"3606" "exp3" 1 30 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 522 24 1
"3606" "exp3" 1 31 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 753 86 1
"3606" "exp3" 1 32 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1079 13 1
"3606" "exp3" 1 33 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 837 22 1
"3606" "exp3" 1 34 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 680 34 1
"3606" "exp3" 1 35 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 622 27 1
"3606" "exp3" 1 36 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 409 0 0
"3606" "exp3" 1 37 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 478 74 1
"3606" "exp3" 1 38 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 551 0 0
"3606" "exp3" 1 39 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 475 0 0
"3606" "exp3" 1 40 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 690 0 0
"3606" "exp3" 1 41 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 760 28 1
"3606" "exp3" 1 42 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 398 0 0
"3606" "exp3" 1 43 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 416 0 0
"3606" "exp3" 1 44 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 1247 30 1
"3606" "exp3" 1 45 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 624 39 1
"3606" "exp3" 1 46 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 1342 13 1
"3606" "exp3" 1 47 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 2 615 69 1
"3606" "exp3" 1 48 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 782 25 1
"3606" "exp3" 1 49 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 521 0 0
"3606" "exp3" 1 50 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 840 0 0
"3606" "exp3" 1 51 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 587 69 1
"3606" "exp3" 1 52 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 669 56 1
"3606" "exp3" 1 53 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 579 0 0
"3606" "exp3" 1 54 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 511 0 0
"3606" "exp3" 1 55 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1115 0 0
"3606" "exp3" 1 56 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 2 561 0 0
"3606" "exp3" 1 57 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 589 61 1
"3606" "exp3" 1 58 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 876 0 0
"3606" "exp3" 1 59 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 424 45 1
"3606" "exp3" 1 60 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 627 0 0
"3606" "exp3" 1 61 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1213 0 0
"3606" "exp3" 1 62 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 556 32 1
"3606" "exp3" 1 63 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 584 31 1
"3606" "exp3" 1 64 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 708 0 0
"3606" "exp3" 1 65 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 621 0 0
"3606" "exp3" 1 66 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 550 37 1
"3606" "exp3" 1 67 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 653 21 1
"3606" "exp3" 1 68 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 715 0 0
"3606" "exp3" 1 69 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 580 35 1
"3606" "exp3" 1 70 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 666 0 0
"3606" "exp3" 1 71 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 515 0 0
"3606" "exp3" 1 72 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 648 0 0
"3606" "exp3" 1 73 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 984 0 0
"3606" "exp3" 1 74 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 819 40 1
"3606" "exp3" 1 75 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 942 77 1
"3606" "exp3" 1 76 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 900 0 0
"3606" "exp3" 1 77 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 634 0 0
"3606" "exp3" 1 78 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 677 0 0
"3606" "exp3" 1 79 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 549 0 0
"3606" "exp3" 1 80 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 552 0 0
"3606" "exp3" 1 81 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 771 0 0
"3606" "exp3" 1 82 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 561 0 0
"3606" "exp3" 1 83 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 1214 19 1
"3606" "exp3" 1 84 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 502 0 0
"3606" "exp3" 1 85 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 941 73 1
"3606" "exp3" 1 86 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 784 37 1
"3606" "exp3" 1 87 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 459 27 1
"3606" "exp3" 1 88 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 573 0 0
"3606" "exp3" 1 89 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 605 82 1
"3606" "exp3" 1 90 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 822 0 0
"3606" "exp3" 1 91 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 2 1058 0 0
"3606" "exp3" 1 92 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 530 44 1
"3606" "exp3" 1 93 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 975 0 0
"3606" "exp3" 1 94 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1078 0 0
"3606" "exp3" 1 95 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 533 33 1
"3606" "exp3" 1 96 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1025 42 1
"3606" "exp3" 1 97 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 662 0 0
"3606" "exp3" 1 98 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1072 29 1
"3606" "exp3" 1 99 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 597 0 0
"3606" "exp3" 1 100 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 601 28 1
"3606" "exp3" 1 101 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 507 32 1
"3606" "exp3" 1 102 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 557 42 1
"3606" "exp3" 1 103 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 616 0 0
"3606" "exp3" 1 104 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1280 25 1
"3606" "exp3" 1 105 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 592 0 0
"3606" "exp3" 1 106 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 749 26 1
"3606" "exp3" 1 107 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 621 77 1
"3606" "exp3" 1 108 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 2333 49 1
"3606" "exp3" 1 109 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 540 0 0
"3606" "exp3" 1 110 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 2 726 0 0
"3606" "exp3" 1 111 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 390 0 0
"3606" "exp3" 1 112 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 433 45 1
"3606" "exp3" 1 113 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 507 0 0
"3606" "exp3" 1 114 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 463 0 0
"3606" "exp3" 1 115 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 951 24 1
"3606" "exp3" 1 116 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 719 0 0
"3606" "exp3" 1 117 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 634 48 1
"3606" "exp3" 1 118 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 851 0 0
"3606" "exp3" 1 119 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 707 0 0
"3606" "exp3" 1 120 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 622 0 0
"3606" "exp3" 1 121 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 664 0 0
"3606" "exp3" 1 122 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 828 32 1
"3606" "exp3" 1 123 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 736 35 1
"3606" "exp3" 1 124 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 734 31 1
"3606" "exp3" 1 125 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1101 0 0
"3606" "exp3" 1 126 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 967 83 1
"3606" "exp3" 1 127 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1882 21 1
"3606" "exp3" 1 128 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 904 0 0
"3606" "exp3" 1 129 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 487 0 0
"3606" "exp3" 1 130 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 611 46 1
"3606" "exp3" 1 131 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 681 0 0
"3606" "exp3" 1 132 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1489 25 1
"3606" "exp3" 2 1 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 797 0 0
"3606" "exp3" 2 2 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 611 0 0
"3606" "exp3" 2 3 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 326 0 0
"3606" "exp3" 2 4 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1304 0 0
"3606" "exp3" 2 5 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 483 0 0
"3606" "exp3" 2 6 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 829 34 1
"3606" "exp3" 2 7 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1415 32 1
"3606" "exp3" 2 8 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 509 0 0
"3606" "exp3" 2 9 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1212 42 1
"3606" "exp3" 2 10 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1482 0 0
"3606" "exp3" 2 11 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 377 0 0
"3606" "exp3" 2 12 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 890 0 0
"3606" "exp3" 2 13 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1202 0 0
"3606" "exp3" 2 14 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1142 0 0
"3606" "exp3" 2 15 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1207 23 1
"3606" "exp3" 2 16 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 965 66 1
"3606" "exp3" 2 17 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 855 0 0
"3606" "exp3" 2 18 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 660 0 0
"3606" "exp3" 2 19 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1040 74 1
"3606" "exp3" 2 20 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 934 0 0
"3606" "exp3" 2 21 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 908 31 1
"3606" "exp3" 2 22 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 898 88 1
"3606" "exp3" 2 23 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 341 0 0
"3606" "exp3" 2 24 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 912 0 0
"3606" "exp3" 2 25 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1219 0 0
"3606" "exp3" 2 26 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 851 0 0
"3606" "exp3" 2 27 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 1798 90 1
"3606" "exp3" 2 28 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1253 31 1
"3606" "exp3" 2 29 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 579 0 0
"3606" "exp3" 2 30 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1419 0 0
"3606" "exp3" 2 31 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 766 0 0
"3606" "exp3" 2 32 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 853 30 1
"3606" "exp3" 2 33 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 810 0 0
"3606" "exp3" 2 34 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1979 9 1
"3606" "exp3" 2 35 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 615 33 1
"3606" "exp3" 2 36 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 738 0 0
"3606" "exp3" 2 37 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 2 523 0 0
"3606" "exp3" 2 38 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 520 0 0
"3606" "exp3" 2 39 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 751 0 0
"3606" "exp3" 2 40 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 995 25 1
"3606" "exp3" 2 41 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 871 35 1
"3606" "exp3" 2 42 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 775 0 0
"3606" "exp3" 2 43 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 579 36 1
"3606" "exp3" 2 44 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 695 0 0
"3606" "exp3" 2 45 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 2 1457 0 0
"3606" "exp3" 2 46 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 865 0 0
"3606" "exp3" 2 47 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 768 61 1
"3606" "exp3" 2 48 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 957 32 1
"3606" "exp3" 2 49 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 2 747 0 0
"3606" "exp3" 2 50 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1062 0 0
"3606" "exp3" 2 51 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 983 0 0
"3606" "exp3" 2 52 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 1132 0 0
"3606" "exp3" 2 53 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1846 0 0
"3606" "exp3" 2 54 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 1189 0 0
"3606" "exp3" 2 55 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 1152 0 0
"3606" "exp3" 2 56 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 1008 0 0
"3606" "exp3" 2 57 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 754 0 0
"3606" "exp3" 2 58 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 582 0 0
"3606" "exp3" 2 59 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 2935 0 0
"3606" "exp3" 2 60 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 649 37 1
"3606" "exp3" 2 61 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 259 0 0
"3606" "exp3" 2 62 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 482 0 0
"3606" "exp3" 2 63 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 729 17 1
"3606" "exp3" 2 64 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 652 64 1
"3606" "exp3" 2 65 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 687 0 0
"3606" "exp3" 2 66 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 377 0 0
"3606" "exp3" 2 67 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 653 0 0
"3606" "exp3" 2 68 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1228 39 1
"3606" "exp3" 2 69 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 530 0 0
"3606" "exp3" 2 70 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 690 24 1
"3606" "exp3" 2 71 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 752 18 1
"3606" "exp3" 2 72 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 910 0 0
"3606" "exp3" 2 73 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 748 33 1
"3606" "exp3" 2 74 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 495 25 1
"3606" "exp3" 2 75 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 713 28 1
"3606" "exp3" 2 76 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 573 26 1
"3606" "exp3" 2 77 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 908 0 0
"3606" "exp3" 2 78 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1114 0 0
"3606" "exp3" 2 79 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 640 0 0
"3606" "exp3" 2 80 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 2 731 0 0
"3606" "exp3" 2 81 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 917 35 1
"3606" "exp3" 2 82 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 712 46 1
"3606" "exp3" 2 83 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 657 0 0
"3606" "exp3" 2 84 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 772 32 1
"3606" "exp3" 2 85 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 603 28 1
"3606" "exp3" 2 86 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 714 26 1
"3606" "exp3" 2 87 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 792 40 1
"3606" "exp3" 2 88 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 841 82 1
"3606" "exp3" 2 89 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 791 0 0
"3606" "exp3" 2 90 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 701 0 0
"3606" "exp3" 2 91 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 815 6 1
"3606" "exp3" 2 92 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 487 22 1
"3606" "exp3" 2 93 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 2 968 0 0
"3606" "exp3" 2 94 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1539 0 0
"3606" "exp3" 2 95 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 2053 0 0
"3606" "exp3" 2 96 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 3552 84 1
"3606" "exp3" 2 97 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1096 44 1
"3606" "exp3" 2 98 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 999 0 0
"3606" "exp3" 2 99 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 731 38 1
"3606" "exp3" 2 100 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 574 0 0
"3606" "exp3" 2 101 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1063 0 0
"3606" "exp3" 2 102 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 769 0 0
"3606" "exp3" 2 103 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 598 0 0
"3606" "exp3" 2 104 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 886 0 0
"3606" "exp3" 2 105 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 745 0 0
"3606" "exp3" 2 106 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 622 0 0
"3606" "exp3" 2 107 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 816 93 1
"3606" "exp3" 2 108 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 835 41 1
"3606" "exp3" 2 109 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 833 14 1
"3606" "exp3" 2 110 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 999 20 1
"3606" "exp3" 2 111 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 1327 0 0
"3606" "exp3" 2 112 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 610 0 0
"3606" "exp3" 2 113 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2085 0 0
"3606" "exp3" 2 114 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 635 73 1
"3606" "exp3" 2 115 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 666 57 1
"3606" "exp3" 2 116 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 665 36 1
"3606" "exp3" 2 117 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 892 0 0
"3606" "exp3" 2 118 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 873 0 0
"3606" "exp3" 2 119 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1016 34 1
"3606" "exp3" 2 120 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 2028 0 0
"3606" "exp3" 2 121 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 648 31 1
"3606" "exp3" 2 122 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 2 1066 0 0
"3606" "exp3" 2 123 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 559 0 0
"3606" "exp3" 2 124 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 611 47 1
"3606" "exp3" 2 125 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 610 0 0
"3606" "exp3" 2 126 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 854 0 0
"3606" "exp3" 2 127 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 853 48 1
"3606" "exp3" 2 128 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 627 0 0
"3606" "exp3" 2 129 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 924 83 1
"3606" "exp3" 2 130 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 271 29 1
"3606" "exp3" 2 131 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 929 0 0
"3606" "exp3" 2 132 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 605 0 0
"3606" "exp3" 1 1 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 56 53 1
"3606" "exp3" 1 2 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 665 16 1
"3606" "exp3" 1 3 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 703 5 1
"3606" "exp3" 1 4 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 838 28 1
"3606" "exp3" 1 5 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 594 0 0
"3606" "exp3" 1 6 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 980 62 1
"3606" "exp3" 1 7 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 720 0 0
"3606" "exp3" 1 8 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 462 23 1
"3606" "exp3" 1 9 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 475 10 1
"3606" "exp3" 1 10 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 876 9 1
"3606" "exp3" 1 11 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 570 13 1
"3606" "exp3" 1 12 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 422 0 0
"3606" "exp3" 1 13 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 862 0 0
"3606" "exp3" 1 14 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1357 0 0
"3606" "exp3" 1 15 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 857 7 1
"3606" "exp3" 1 16 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1028 27 1
"3606" "exp3" 1 17 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 652 29 1
"3606" "exp3" 1 18 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 690 0 0
"3606" "exp3" 1 19 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 2 602 0 0
"3606" "exp3" 1 20 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 585 20 1
"3606" "exp3" 1 21 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 891 32 1
"3606" "exp3" 1 22 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 624 23 1
"3606" "exp3" 1 23 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 740 61 1
"3606" "exp3" 1 24 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 602 64 1
"3606" "exp3" 1 25 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 536 15 1
"3606" "exp3" 1 26 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 784 37 1
"3606" "exp3" 1 27 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 645 0 0
"3606" "exp3" 1 28 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 628 0 0
"3606" "exp3" 1 29 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 683 0 0
"3606" "exp3" 1 30 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 979 0 0
"3606" "exp3" 1 31 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1062 70 1
"3606" "exp3" 1 32 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 774 18 1
"3606" "exp3" 1 33 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 786 0 0
"3606" "exp3" 1 34 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 642 33 1
"3606" "exp3" 1 35 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 488 12 1
"3606" "exp3" 1 36 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 390 8 1
"3606" "exp3" 1 37 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 552 22 1
"3606" "exp3" 1 38 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 990 19 1
"3606" "exp3" 1 39 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1046 18 1
"3606" "exp3" 1 40 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 737 0 0
"3606" "exp3" 1 41 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 553 0 0
"3606" "exp3" 1 42 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 588 33 1
"3606" "exp3" 1 43 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 2 1661 63 1
"3606" "exp3" 1 44 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 863 0 0
"3606" "exp3" 1 45 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 642 27 1
"3606" "exp3" 1 46 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 673 26 1
"3606" "exp3" 1 47 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 930 0 0
"3606" "exp3" 1 48 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 623 52 1
"3606" "exp3" 1 49 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 574 62 1
"3606" "exp3" 1 50 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 786 29 1
"3606" "exp3" 1 51 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 622 63 1
"3606" "exp3" 1 52 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 648 19 1
"3606" "exp3" 1 53 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 566 45 1
"3606" "exp3" 1 54 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 855 16 1
"3606" "exp3" 1 55 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 416 67 1
"3606" "exp3" 1 56 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 834 0 0
"3606" "exp3" 1 57 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 968 60 1
"3606" "exp3" 1 58 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 864 13 1
"3606" "exp3" 1 59 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1595 14 1
"3606" "exp3" 1 60 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1179 0 0
"3606" "exp3" 1 61 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1016 0 0
"3606" "exp3" 1 62 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1153 0 0
"3606" "exp3" 1 63 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 453 69 1
"3606" "exp3" 1 64 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 794 13 1
"3606" "exp3" 1 65 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 946 0 0
"3606" "exp3" 1 66 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 629 8 1
"3606" "exp3" 1 67 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 409 25 1
"3606" "exp3" 1 68 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 389 31 1
"3606" "exp3" 1 69 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 487 21 1
"3606" "exp3" 1 70 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 513 0 0
"3606" "exp3" 1 71 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 520 14 1
"3606" "exp3" 1 72 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 518 40 1
"3606" "exp3" 1 73 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 780 0 0
"3606" "exp3" 1 74 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 943 0 0
"3606" "exp3" 1 75 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 1243 15 1
"3606" "exp3" 1 76 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 596 41 1
"3606" "exp3" 1 77 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 725 24 1
"3606" "exp3" 1 78 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 1514 2 1
"3606" "exp3" 1 79 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1033 21 1
"3606" "exp3" 1 80 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1113 0 0
"3606" "exp3" 1 81 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1685 0 0
"3606" "exp3" 1 82 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 615 0 0
"3606" "exp3" 1 83 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 611 0 0
"3606" "exp3" 1 84 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 2 1107 0 0
"3606" "exp3" 1 85 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 410 30 1
"3606" "exp3" 1 86 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 312 5 1
"3606" "exp3" 1 87 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 421 0 0
"3606" "exp3" 1 88 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 624 0 0
"3606" "exp3" 1 89 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 642 0 0
"3606" "exp3" 1 90 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 463 0 0
"3606" "exp3" 1 91 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 717 73 1
"3606" "exp3" 1 92 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 825 0 0
"3606" "exp3" 1 93 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 827 99 1
"3606" "exp3" 1 94 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 899 71 1
"3606" "exp3" 1 95 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 852 24 1
"3606" "exp3" 1 96 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 372 17 1
"3606" "exp3" 1 97 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 413 0 0
"3606" "exp3" 1 98 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 548 0 0
"3606" "exp3" 1 99 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 945 25 1
"3606" "exp3" 1 100 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 428 3 1
"3606" "exp3" 1 101 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 495 58 1
"3606" "exp3" 1 102 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 699 0 0
"3606" "exp3" 1 103 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 906 0 0
"3606" "exp3" 1 104 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 811 77 1
"3606" "exp3" 1 105 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 706 65 1
"3606" "exp3" 1 106 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 852 69 1
"3606" "exp3" 1 107 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 1001 0 0
"3606" "exp3" 1 108 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 584 22 1
"3606" "exp3" 1 109 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 651 0 0
"3606" "exp3" 1 110 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 565 19 1
"3606" "exp3" 1 111 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 1380 4 1
"3606" "exp3" 1 112 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 548 0 0
"3606" "exp3" 1 113 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 568 0 0
"3606" "exp3" 1 114 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 631 58 1
"3606" "exp3" 1 115 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 809 20 1
"3606" "exp3" 1 116 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 601 0 0
"3606" "exp3" 1 117 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 788 9 1
"3606" "exp3" 1 118 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 570 25 1
"3606" "exp3" 1 119 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 886 0 0
"3606" "exp3" 1 120 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 542 0 0
"3606" "exp3" 1 121 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 301 0 0
"3606" "exp3" 1 122 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 674 85 1
"3606" "exp3" 1 123 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 737 0 0
"3606" "exp3" 1 124 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 478 35 1
"3606" "exp3" 1 125 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 973 27 1
"3606" "exp3" 1 126 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 714 68 1
"3606" "exp3" 1 127 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1157 0 0
"3606" "exp3" 1 128 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1546 6 1
"3606" "exp3" 1 129 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 570 0 0
"3606" "exp3" 1 130 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 956 0 0
"3606" "exp3" 1 131 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 572 21 1
"3606" "exp3" 1 132 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 569 20 1
"3606" "exp3" 2 1 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1096 0 0
"3606" "exp3" 2 2 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 317 0 0
"3606" "exp3" 2 3 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 407 0 0
"3606" "exp3" 2 4 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 656 8 1
"3606" "exp3" 2 5 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 502 20 1
"3606" "exp3" 2 6 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 1272 0 0
"3606" "exp3" 2 7 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 460 0 0
"3606" "exp3" 2 8 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 567 7 1
"3606" "exp3" 2 9 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 587 10 1
"3606" "exp3" 2 10 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 594 18 1
"3606" "exp3" 2 11 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 492 6 1
"3606" "exp3" 2 12 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 854 0 0
"3606" "exp3" 2 13 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 843 15 1
"3606" "exp3" 2 14 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1311 15 1
"3606" "exp3" 2 15 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 677 0 0
"3606" "exp3" 2 16 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 2 671 0 0
"3606" "exp3" 2 17 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 713 16 1
"3606" "exp3" 2 18 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 658 58 1
"3606" "exp3" 2 19 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 517 0 0
"3606" "exp3" 2 20 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 730 0 0
"3606" "exp3" 2 21 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 2 969 72 1
"3606" "exp3" 2 22 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 593 70 1
"3606" "exp3" 2 23 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 506 0 0
"3606" "exp3" 2 24 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 599 15 1
"3606" "exp3" 2 25 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 431 9 1
"3606" "exp3" 2 26 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 751 29 1
"3606" "exp3" 2 27 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 450 33 1
"3606" "exp3" 2 28 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 761 0 0
"3606" "exp3" 2 29 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 628 18 1
"3606" "exp3" 2 30 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 795 72 1
"3606" "exp3" 2 31 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 874 13 1
"3606" "exp3" 2 32 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 1149 55 1
"3606" "exp3" 2 33 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 791 5 1
"3606" "exp3" 2 34 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 639 72 1
"3606" "exp3" 2 35 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 608 20 1
"3606" "exp3" 2 36 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 660 23 1
"3606" "exp3" 2 37 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 560 13 1
"3606" "exp3" 2 38 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1075 22 1
"3606" "exp3" 2 39 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 585 0 0
"3606" "exp3" 2 40 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 2 537 0 0
"3606" "exp3" 2 41 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 620 0 0
"3606" "exp3" 2 42 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 657 14 1
"3606" "exp3" 2 43 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 801 71 1
"3606" "exp3" 2 44 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 576 22 1
"3606" "exp3" 2 45 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 345 0 0
"3606" "exp3" 2 46 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 615 18 1
"3606" "exp3" 2 47 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 689 6 1
"3606" "exp3" 2 48 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 408 0 0
"3606" "exp3" 2 49 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 365 38 1
"3606" "exp3" 2 50 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 765 16 1
"3606" "exp3" 2 51 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 819 12 1
"3606" "exp3" 2 52 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 804 58 1
"3606" "exp3" 2 53 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 2 666 0 0
"3606" "exp3" 2 54 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 869 0 0
"3606" "exp3" 2 55 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 877 7 1
"3606" "exp3" 2 56 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 2 1107 82 1
"3606" "exp3" 2 57 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 781 0 0
"3606" "exp3" 2 58 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 2 594 0 0
"3606" "exp3" 2 59 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 512 40 1
"3606" "exp3" 2 60 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 605 64 1
"3606" "exp3" 2 61 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 631 39 1
"3606" "exp3" 2 62 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 516 35 1
"3606" "exp3" 2 63 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 509 0 0
"3606" "exp3" 2 64 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 810 26 1
"3606" "exp3" 2 65 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 579 23 1
"3606" "exp3" 2 66 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 667 14 1
"3606" "exp3" 2 67 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 679 17 1
"3606" "exp3" 2 68 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 529 13 1
"3606" "exp3" 2 69 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 533 9 1
"3606" "exp3" 2 70 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 999 31 1
"3606" "exp3" 2 71 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 581 3 1
"3606" "exp3" 2 72 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 646 21 1
"3606" "exp3" 2 73 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 511 0 0
"3606" "exp3" 2 74 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1163 23 1
"3606" "exp3" 2 75 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 847 0 0
"3606" "exp3" 2 76 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 858 21 1
"3606" "exp3" 2 77 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1037 83 1
"3606" "exp3" 2 78 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 524 44 1
"3606" "exp3" 2 79 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 2 1162 0 0
"3606" "exp3" 2 80 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 1224 0 0
"3606" "exp3" 2 81 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1473 26 1
"3606" "exp3" 2 82 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 775 31 1
"3606" "exp3" 2 83 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 791 5 1
"3606" "exp3" 2 84 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 846 68 1
"3606" "exp3" 2 85 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 2 1096 0 0
"3606" "exp3" 2 86 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 2466 0 0
"3606" "exp3" 2 87 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 789 14 1
"3606" "exp3" 2 88 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 2473 1 1
"3606" "exp3" 2 89 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 1165 0 0
"3606" "exp3" 2 90 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 657 0 0
"3606" "exp3" 2 91 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 615 0 0
"3606" "exp3" 2 92 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1339 37 1
"3606" "exp3" 2 93 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 620 0 0
"3606" "exp3" 2 94 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1448 81 1
"3606" "exp3" 2 95 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 653 0 0
"3606" "exp3" 2 96 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 523 0 0
"3606" "exp3" 2 97 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 769 0 0
"3606" "exp3" 2 98 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 1151 0 0
"3606" "exp3" 2 99 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1187 0 0
"3606" "exp3" 2 100 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 726 0 0
"3606" "exp3" 2 101 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 841 66 1
"3606" "exp3" 2 102 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 545 11 1
"3606" "exp3" 2 103 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 924 61 1
"3606" "exp3" 2 104 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 726 33 1
"3606" "exp3" 2 105 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 623 0 0
"3606" "exp3" 2 106 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 766 0 0
"3606" "exp3" 2 107 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 465 0 0
"3606" "exp3" 2 108 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 946 0 0
"3606" "exp3" 2 109 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 895 0 0
"3606" "exp3" 2 110 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 774 0 0
"3606" "exp3" 2 111 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 686 44 1
"3606" "exp3" 2 112 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 664 19 1
"3606" "exp3" 2 113 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 554 0 0
"3606" "exp3" 2 114 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 705 19 1
"3606" "exp3" 2 115 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 504 0 0
"3606" "exp3" 2 116 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 460 0 0
"3606" "exp3" 2 117 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 791 0 0
"3606" "exp3" 2 118 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 650 0 0
"3606" "exp3" 2 119 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 502 68 1
"3606" "exp3" 2 120 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 500 0 0
"3606" "exp3" 2 121 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 649 0 0
"3606" "exp3" 2 122 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 863 0 0
"3606" "exp3" 2 123 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 589 0 0
"3606" "exp3" 2 124 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 2 808 0 0
"3606" "exp3" 2 125 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 620 0 0
"3606" "exp3" 2 126 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 2 1064 0 0
"3606" "exp3" 2 127 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 869 0 0
"3606" "exp3" 2 128 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 945 19 1
"3606" "exp3" 2 129 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 1215 2 1
"3606" "exp3" 2 130 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 619 24 1
"3606" "exp3" 2 131 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1402 26 1
"3606" "exp3" 2 132 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 1048 0 0
"3606" "exp3" 1 1 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 2296 0 0
"3606" "exp3" 1 2 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1467 35 1
"3606" "exp3" 1 3 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 2388 21 1
"3606" "exp3" 1 4 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 921 0 0
"3606" "exp3" 1 5 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1713 28 1
"3606" "exp3" 1 6 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 803 0 0
"3606" "exp3" 1 7 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1173 40 1
"3606" "exp3" 1 8 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1212 25 1
"3606" "exp3" 1 9 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1258 0 0
"3606" "exp3" 1 10 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 988 30 1
"3606" "exp3" 1 11 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 899 13 1
"3606" "exp3" 1 12 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 2 2222 0 0
"3606" "exp3" 1 13 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1802 0 0
"3606" "exp3" 1 14 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 778 49 1
"3606" "exp3" 1 15 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1251 26 1
"3606" "exp3" 1 16 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 879 19 1
"3606" "exp3" 1 17 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 631 8 1
"3606" "exp3" 1 18 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1107 36 1
"3606" "exp3" 1 19 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1170 46 1
"3606" "exp3" 1 20 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1097 0 0
"3606" "exp3" 1 21 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1349 14 1
"3606" "exp3" 1 22 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 827 34 1
"3606" "exp3" 1 23 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 812 30 1
"3606" "exp3" 1 24 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 833 19 1
"3606" "exp3" 1 25 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 465 0 0
"3606" "exp3" 1 26 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 761 0 0
"3606" "exp3" 1 27 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1677 0 0
"3606" "exp3" 1 28 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1901 0 0
"3606" "exp3" 1 29 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 2076 0 0
"3606" "exp3" 1 30 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 532 17 1
"3606" "exp3" 1 31 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 571 31 1
"3606" "exp3" 1 32 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 591 21 1
"3606" "exp3" 1 33 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 970 16 1
"3606" "exp3" 1 34 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 953 35 1
"3606" "exp3" 1 35 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1366 27 1
"3606" "exp3" 1 36 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 703 39 1
"3606" "exp3" 1 37 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 642 8 1
"3606" "exp3" 1 38 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1206 41 1
"3606" "exp3" 1 39 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1635 24 1
"3606" "exp3" 1 40 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 750 22 1
"3606" "exp3" 1 41 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 849 0 0
"3606" "exp3" 1 42 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 2187 4 1
"3606" "exp3" 1 43 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 813 19 1
"3606" "exp3" 1 44 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1104 0 0
"3606" "exp3" 1 45 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 714 48 1
"3606" "exp3" 1 46 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 1051 0 0
"3606" "exp3" 1 47 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1456 25 1
"3606" "exp3" 1 48 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 671 23 1
"3606" "exp3" 1 49 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 933 13 1
"3606" "exp3" 1 50 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 339 70 1
"3606" "exp3" 1 51 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 744 29 1
"3606" "exp3" 1 52 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 873 0 0
"3606" "exp3" 1 53 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 956 57 1
"3606" "exp3" 1 54 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 2 1893 0 0
"3606" "exp3" 1 55 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1100 24 1
"3606" "exp3" 1 56 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 700 24 1
"3606" "exp3" 1 57 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 781 27 1
"3606" "exp3" 1 58 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 990 37 1
"3606" "exp3" 1 59 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 658 9 1
"3606" "exp3" 1 60 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 752 0 0
"3606" "exp3" 1 61 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 876 17 1
"3606" "exp3" 1 62 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 737 45 1
"3606" "exp3" 1 63 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 1178 78 1
"3606" "exp3" 1 64 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 5822 16 1
"3606" "exp3" 1 65 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 909 42 1
"3606" "exp3" 1 66 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 851 0 0
"3606" "exp3" 1 67 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 2925 0 0
"3606" "exp3" 1 68 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 836 66 1
"3606" "exp3" 1 69 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1599 5 1
"3606" "exp3" 1 70 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 3353 64 1
"3606" "exp3" 1 71 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 1435 64 1
"3606" "exp3" 1 72 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 2561 0 0
"3606" "exp3" 1 73 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 797 16 1
"3606" "exp3" 1 74 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 525 6 1
"3606" "exp3" 1 75 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1174 18 1
"3606" "exp3" 1 76 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 3786 0 0
"3606" "exp3" 1 77 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 782 85 1
"3606" "exp3" 1 78 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 794 0 0
"3606" "exp3" 1 79 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 925 5 1
"3606" "exp3" 1 80 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1083 0 0
"3606" "exp3" 1 81 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 674 29 1
"3606" "exp3" 1 82 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 836 0 0
"3606" "exp3" 1 83 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 359 0 0
"3606" "exp3" 1 84 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 1451 62 1
"3606" "exp3" 1 85 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 657 1 1
"3606" "exp3" 1 86 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 7268 59 1
"3606" "exp3" 1 87 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 2860 0 0
"3606" "exp3" 1 88 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 2 1139 0 0
"3606" "exp3" 1 89 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1978 0 0
"3606" "exp3" 1 90 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2211 20 1
"3606" "exp3" 1 91 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 633 47 1
"3606" "exp3" 1 92 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 637 0 0
"3606" "exp3" 1 93 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 2 808 77 1
"3606" "exp3" 1 94 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 896 38 1
"3606" "exp3" 1 95 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 2 936 0 0
"3606" "exp3" 1 96 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 645 63 1
"3606" "exp3" 1 97 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 2 1138 57 1
"3606" "exp3" 1 98 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 2 869 0 0
"3606" "exp3" 1 99 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 899 0 0
"3606" "exp3" 1 100 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 994 29 1
"3606" "exp3" 1 101 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 544 44 1
"3606" "exp3" 1 102 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 618 25 1
"3606" "exp3" 1 103 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 783 42 1
"3606" "exp3" 1 104 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 778 0 0
"3606" "exp3" 1 105 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1208 15 1
"3606" "exp3" 1 106 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 827 83 1
"3606" "exp3" 1 107 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1126 18 1
"3606" "exp3" 1 108 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 819 0 0
"3606" "exp3" 1 109 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 764 0 0
"3606" "exp3" 1 110 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 1258 6 1
"3606" "exp3" 1 111 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 2256 15 1
"3606" "exp3" 1 112 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1155 68 1
"3606" "exp3" 1 113 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 884 77 1
"3606" "exp3" 1 114 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 970 26 1
"3606" "exp3" 1 115 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 877 40 1
"3606" "exp3" 1 116 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 829 33 1
"3606" "exp3" 1 117 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 730 0 0
"3606" "exp3" 1 118 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1155 0 0
"3606" "exp3" 1 119 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 2707 0 0
"3606" "exp3" 1 120 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 2412 79 1
"3606" "exp3" 1 121 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 3235 0 0
"3606" "exp3" 1 122 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1916 0 0
"3606" "exp3" 1 123 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 584 0 0
"3606" "exp3" 1 124 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 612 0 0
"3606" "exp3" 1 125 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1189 0 0
"3606" "exp3" 1 126 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1552 19 1
"3606" "exp3" 1 127 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 867 91 1
"3606" "exp3" 1 128 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 881 28 1
"3606" "exp3" 1 129 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 870 0 0
"3606" "exp3" 1 130 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 620 31 1
"3606" "exp3" 1 131 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 939 67 1
"3606" "exp3" 1 132 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 2950 0 0
"3606" "exp3" 2 1 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 2 654 0 0
"3606" "exp3" 2 2 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1029 0 0
"3606" "exp3" 2 3 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 714 35 1
"3606" "exp3" 2 4 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 424 31 1
"3606" "exp3" 2 5 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 659 26 1
"3606" "exp3" 2 6 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 897 44 1
"3606" "exp3" 2 7 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 510 0 0
"3606" "exp3" 2 8 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 1256 8 1
"3606" "exp3" 2 9 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 1028 0 0
"3606" "exp3" 2 10 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 481 20 1
"3606" "exp3" 2 11 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 692 69 1
"3606" "exp3" 2 12 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 720 0 0
"3606" "exp3" 2 13 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 546 0 0
"3606" "exp3" 2 14 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 689 22 1
"3606" "exp3" 2 15 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 714 68 1
"3606" "exp3" 2 16 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 746 0 0
"3606" "exp3" 2 17 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1233 74 1
"3606" "exp3" 2 18 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 756 14 1
"3606" "exp3" 2 19 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 890 25 1
"3606" "exp3" 2 20 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1152 33 1
"3606" "exp3" 2 21 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1155 70 1
"3606" "exp3" 2 22 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 770 24 1
"3606" "exp3" 2 23 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 2 1366 76 1
"3606" "exp3" 2 24 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 831 21 1
"3606" "exp3" 2 25 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 923 5 1
"3606" "exp3" 2 26 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 939 19 1
"3606" "exp3" 2 27 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 2 1335 0 0
"3606" "exp3" 2 28 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 656 0 0
"3606" "exp3" 2 29 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 990 55 1
"3606" "exp3" 2 30 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 2 834 0 0
"3606" "exp3" 2 31 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 905 7 1
"3606" "exp3" 2 32 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1316 8 1
"3606" "exp3" 2 33 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 792 17 1
"3606" "exp3" 2 34 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 835 11 1
"3606" "exp3" 2 35 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 1008 2 1
"3606" "exp3" 2 36 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 696 0 0
"3606" "exp3" 2 37 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1180 21 1
"3606" "exp3" 2 38 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 1049 0 0
"3606" "exp3" 2 39 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 1411 33 1
"3606" "exp3" 2 40 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 747 43 1
"3606" "exp3" 2 41 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 929 0 0
"3606" "exp3" 2 42 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1026 0 0
"3606" "exp3" 2 43 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 2 834 0 0
"3606" "exp3" 2 44 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 531 26 1
"3606" "exp3" 2 45 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1101 13 1
"3606" "exp3" 2 46 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1239 14 1
"3606" "exp3" 2 47 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 894 29 1
"3606" "exp3" 2 48 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1416 0 0
"3606" "exp3" 2 49 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 934 0 0
"3606" "exp3" 2 50 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 830 0 0
"3606" "exp3" 2 51 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 739 0 0
"3606" "exp3" 2 52 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 888 0 0
"3606" "exp3" 2 53 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 828 16 1
"3606" "exp3" 2 54 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1143 21 1
"3606" "exp3" 2 55 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 1330 19 1
"3606" "exp3" 2 56 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 741 0 0
"3606" "exp3" 2 57 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 632 22 1
"3606" "exp3" 2 58 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 721 29 1
"3606" "exp3" 2 59 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 892 0 0
"3606" "exp3" 2 60 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 743 30 1
"3606" "exp3" 2 61 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 676 17 1
"3606" "exp3" 2 62 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 1301 0 0
"3606" "exp3" 2 63 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 961 54 1
"3606" "exp3" 2 64 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1216 67 1
"3606" "exp3" 2 65 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1962 38 1
"3606" "exp3" 2 66 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 664 0 0
"3606" "exp3" 2 67 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1244 0 0
"3606" "exp3" 2 68 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 2 1021 0 0
"3606" "exp3" 2 69 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 889 96 1
"3606" "exp3" 2 70 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 383 31 1
"3606" "exp3" 2 71 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 705 15 1
"3606" "exp3" 2 72 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 861 9 1
"3606" "exp3" 2 73 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 1084 0 0
"3606" "exp3" 2 74 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1155 25 1
"3606" "exp3" 2 75 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 693 27 1
"3606" "exp3" 2 76 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 667 37 1
"3606" "exp3" 2 77 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 1138 0 0
"3606" "exp3" 2 78 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1976 11 1
"3606" "exp3" 2 79 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1305 23 1
"3606" "exp3" 2 80 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 666 15 1
"3606" "exp3" 2 81 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 845 9 1
"3606" "exp3" 2 82 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 817 28 1
"3606" "exp3" 2 83 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 1077 0 0
"3606" "exp3" 2 84 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 782 19 1
"3606" "exp3" 2 85 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 680 6 1
"3606" "exp3" 2 86 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 2 704 0 0
"3606" "exp3" 2 87 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 1200 17 1
"3606" "exp3" 2 88 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 706 0 0
"3606" "exp3" 2 89 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 710 36 1
"3606" "exp3" 2 90 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 1663 5 1
"3606" "exp3" 2 91 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 742 36 1
"3606" "exp3" 2 92 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 632 18 1
"3606" "exp3" 2 93 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 1463 6 1
"3606" "exp3" 2 94 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1181 0 0
"3606" "exp3" 2 95 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 807 0 0
"3606" "exp3" 2 96 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 879 0 0
"3606" "exp3" 2 97 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 563 42 1
"3606" "exp3" 2 98 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 698 0 0
"3606" "exp3" 2 99 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 896 23 1
"3606" "exp3" 2 100 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1128 0 0
"3606" "exp3" 2 101 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 1977 15 1
"3606" "exp3" 2 102 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 646 20 1
"3606" "exp3" 2 103 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 988 45 1
"3606" "exp3" 2 104 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1785 0 0
"3606" "exp3" 2 105 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 645 0 0
"3606" "exp3" 2 106 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 830 80 1
"3606" "exp3" 2 107 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 579 0 0
"3606" "exp3" 2 108 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 629 0 0
"3606" "exp3" 2 109 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 642 68 1
"3606" "exp3" 2 110 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 630 0 0
"3606" "exp3" 2 111 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 612 0 0
"3606" "exp3" 2 112 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 667 0 0
"3606" "exp3" 2 113 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 709 14 1
"3606" "exp3" 2 114 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 856 0 0
"3606" "exp3" 2 115 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 850 25 1
"3606" "exp3" 2 116 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 661 0 0
"3606" "exp3" 2 117 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 661 13 1
"3606" "exp3" 2 118 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 2 632 0 0
"3606" "exp3" 2 119 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 489 0 0
"3606" "exp3" 2 120 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 499 42 1
"3606" "exp3" 2 121 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 772 34 1
"3606" "exp3" 2 122 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 660 7 1
"3606" "exp3" 2 123 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1002 0 0
"3606" "exp3" 2 124 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1015 39 1
"3606" "exp3" 2 125 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 852 25 1
"3606" "exp3" 2 126 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 695 16 1
"3606" "exp3" 2 127 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1029 49 1
"3606" "exp3" 2 128 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1109 32 1
"3606" "exp3" 2 129 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 556 23 1
"3606" "exp3" 2 130 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 640 35 1
"3606" "exp3" 2 131 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 1639 0 0
"3606" "exp3" 2 132 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 620 0 0
"3608" "exp3" 1 1 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 714 0 0
"3608" "exp3" 1 2 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 680 14 1
"3608" "exp3" 1 3 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 695 0 0
"3608" "exp3" 1 4 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 599 0 0
"3608" "exp3" 1 5 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 839 0 0
"3608" "exp3" 1 6 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 703 14 1
"3608" "exp3" 1 7 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 608 30 1
"3608" "exp3" 1 8 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 775 0 0
"3608" "exp3" 1 9 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 920 0 0
"3608" "exp3" 1 10 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 923 17 1
"3608" "exp3" 1 11 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 931 0 0
"3608" "exp3" 1 12 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 949 98 1
"3608" "exp3" 1 13 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 552 17 1
"3608" "exp3" 1 14 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 652 76 1
"3608" "exp3" 1 15 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 1080 0 0
"3608" "exp3" 1 16 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 1062 0 0
"3608" "exp3" 1 17 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 2 789 0 0
"3608" "exp3" 1 18 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 695 27 1
"3608" "exp3" 1 19 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 831 15 1
"3608" "exp3" 1 20 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 768 34 1
"3608" "exp3" 1 21 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 734 15 1
"3608" "exp3" 1 22 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 847 29 1
"3608" "exp3" 1 23 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1077 38 1
"3608" "exp3" 1 24 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 979 0 0
"3608" "exp3" 1 25 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 895 0 0
"3608" "exp3" 1 26 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1546 0 0
"3608" "exp3" 1 27 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 840 44 1
"3608" "exp3" 1 28 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1360 0 0
"3608" "exp3" 1 29 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 1015 0 0
"3608" "exp3" 1 30 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1187 43 1
"3608" "exp3" 1 31 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 1 872 5 1
"3608" "exp3" 1 32 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 1606 68 1
"3608" "exp3" 1 33 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 1424 7 1
"3608" "exp3" 1 34 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 1257 0 0
"3608" "exp3" 1 35 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1116 29 1
"3608" "exp3" 1 36 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 726 9 1
"3608" "exp3" 1 37 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 879 23 1
"3608" "exp3" 1 38 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 792 20 1
"3608" "exp3" 1 39 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1141 31 1
"3608" "exp3" 1 40 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 700 0 0
"3608" "exp3" 1 41 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 806 0 0
"3608" "exp3" 1 42 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1030 41 1
"3608" "exp3" 1 43 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 537 20 1
"3608" "exp3" 1 44 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 1227 0 0
"3608" "exp3" 1 45 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 1511 0 0
"3608" "exp3" 1 46 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1217 27 1
"3608" "exp3" 1 47 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1813 13 1
"3608" "exp3" 1 48 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 1397 0 0
"3608" "exp3" 1 49 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1021 16 1
"3608" "exp3" 1 50 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 754 37 1
"3608" "exp3" 1 51 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1078 73 1
"3608" "exp3" 1 52 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1015 0 0
"3608" "exp3" 1 53 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1607 0 0
"3608" "exp3" 1 54 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1290 31 1
"3608" "exp3" 1 55 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 2 1049 65 1
"3608" "exp3" 1 56 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 710 0 0
"3608" "exp3" 1 57 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1573 0 0
"3608" "exp3" 1 58 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 1064 26 1
"3608" "exp3" 1 59 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 791 22 1
"3608" "exp3" 1 60 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 870 26 1
"3608" "exp3" 1 61 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 833 17 1
"3608" "exp3" 1 62 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 583 32 1
"3608" "exp3" 1 63 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 636 28 1
"3608" "exp3" 1 64 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 600 19 1
"3608" "exp3" 1 65 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 799 19 1
"3608" "exp3" 1 66 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 576 23 1
"3608" "exp3" 1 67 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 1094 0 0
"3608" "exp3" 1 68 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 790 8 1
"3608" "exp3" 1 69 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1223 25 1
"3608" "exp3" 1 70 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1698 0 0
"3608" "exp3" 1 71 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 2320 80 1
"3608" "exp3" 1 72 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 1239 35 1
"3608" "exp3" 1 73 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 2 1616 0 0
"3608" "exp3" 1 74 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 1269 0 0
"3608" "exp3" 1 75 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 1027 63 1
"3608" "exp3" 1 76 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 2 997 0 0
"3608" "exp3" 1 77 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 956 11 1
"3608" "exp3" 1 78 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 2 1904 61 1
"3608" "exp3" 1 79 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 1015 5 1
"3608" "exp3" 1 80 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 1302 26 1
"3608" "exp3" 1 81 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1111 0 0
"3608" "exp3" 1 82 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 1137 25 1
"3608" "exp3" 1 83 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 933 24 1
"3608" "exp3" 1 84 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 1215 0 0
"3608" "exp3" 1 85 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1038 0 0
"3608" "exp3" 1 86 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 926 32 1
"3608" "exp3" 1 87 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 1089 78 1
"3608" "exp3" 1 88 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 860 0 0
"3608" "exp3" 1 89 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1468 31 1
"3608" "exp3" 1 90 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1047 23 1
"3608" "exp3" 1 91 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 2 1214 0 0
"3608" "exp3" 1 92 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 943 29 1
"3608" "exp3" 1 93 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1164 45 1
"3608" "exp3" 1 94 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 656 45 1
"3608" "exp3" 1 95 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 865 33 1
"3608" "exp3" 1 96 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1190 18 1
"3608" "exp3" 1 97 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 2019 11 1
"3608" "exp3" 1 98 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1856 0 0
"3608" "exp3" 1 99 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 1690 0 0
"3608" "exp3" 1 100 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1465 0 0
"3608" "exp3" 1 101 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 4608 19 1
"3608" "exp3" 1 102 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1409 0 0
"3608" "exp3" 1 103 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 2 1462 52 1
"3608" "exp3" 1 104 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 2468 0 0
"3608" "exp3" 1 105 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1491 84 1
"3608" "exp3" 1 106 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 2171 0 0
"3608" "exp3" 1 107 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 2 1488 58 1
"3608" "exp3" 1 108 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 2 1726 0 0
"3608" "exp3" 1 109 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 1183 0 0
"3608" "exp3" 1 110 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1534 0 0
"3608" "exp3" 1 111 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1586 21 1
"3608" "exp3" 1 112 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1396 17 1
"3608" "exp3" 1 113 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2949 0 0
"3608" "exp3" 1 114 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 2 1639 0 0
"3608" "exp3" 1 115 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 2142 0 0
"3608" "exp3" 1 116 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1476 13 1
"3608" "exp3" 1 117 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1571 0 0
"3608" "exp3" 1 118 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1441 18 1
"3608" "exp3" 1 119 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 1316 30 1
"3608" "exp3" 1 120 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1158 10 1
"3608" "exp3" 1 121 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1591 0 0
"3608" "exp3" 1 122 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1063 33 1
"3608" "exp3" 1 123 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 1538 0 0
"3608" "exp3" 1 124 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1545 43 1
"3608" "exp3" 1 125 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1659 82 1
"3608" "exp3" 1 126 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1345 0 0
"3608" "exp3" 1 127 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1425 33 1
"3608" "exp3" 1 128 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 964 25 1
"3608" "exp3" 1 129 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1287 0 0
"3608" "exp3" 1 130 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 938 0 0
"3608" "exp3" 1 131 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1262 0 0
"3608" "exp3" 1 132 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 2 1144 0 0
"3608" "exp3" 2 1 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 748 35 1
"3608" "exp3" 2 2 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 912 62 1
"3608" "exp3" 2 3 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 1051 85 1
"3608" "exp3" 2 4 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 2 864 0 0
"3608" "exp3" 2 5 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 2 1168 0 0
"3608" "exp3" 2 6 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1728 17 1
"3608" "exp3" 2 7 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 1162 0 0
"3608" "exp3" 2 8 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 1189 0 0
"3608" "exp3" 2 9 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1040 20 1
"3608" "exp3" 2 10 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1514 31 1
"3608" "exp3" 2 11 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 1048 0 0
"3608" "exp3" 2 12 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 1253 0 0
"3608" "exp3" 2 13 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1484 0 0
"3608" "exp3" 2 14 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1733 0 0
"3608" "exp3" 2 15 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 2652 39 1
"3608" "exp3" 2 16 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 1183 0 0
"3608" "exp3" 2 17 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1184 0 0
"3608" "exp3" 2 18 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1490 29 1
"3608" "exp3" 2 19 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 2 1820 0 0
"3608" "exp3" 2 20 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 2 1914 0 0
"3608" "exp3" 2 21 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 1545 43 1
"3608" "exp3" 2 22 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 1954 0 0
"3608" "exp3" 2 23 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 2 2077 0 0
"3608" "exp3" 2 24 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1131 32 1
"3608" "exp3" 2 25 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1834 0 0
"3608" "exp3" 2 26 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 2 1545 55 1
"3608" "exp3" 2 27 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1582 24 1
"3608" "exp3" 2 28 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 1482 32 1
"3608" "exp3" 2 29 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1281 0 0
"3608" "exp3" 2 30 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 1543 76 1
"3608" "exp3" 2 31 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1130 24 1
"3608" "exp3" 2 32 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 1249 67 1
"3608" "exp3" 2 33 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1188 27 1
"3608" "exp3" 2 34 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 1336 0 0
"3608" "exp3" 2 35 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1550 0 0
"3608" "exp3" 2 36 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 731 23 1
"3608" "exp3" 2 37 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 1196 9 1
"3608" "exp3" 2 38 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 2 1114 0 0
"3608" "exp3" 2 39 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1251 94 1
"3608" "exp3" 2 40 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 1018 36 1
"3608" "exp3" 2 41 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 893 35 1
"3608" "exp3" 2 42 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 931 0 0
"3608" "exp3" 2 43 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 819 37 1
"3608" "exp3" 2 44 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 1116 0 0
"3608" "exp3" 2 45 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 986 0 0
"3608" "exp3" 2 46 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 1512 0 0
"3608" "exp3" 2 47 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1225 0 0
"3608" "exp3" 2 48 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 2205 2 1
"3608" "exp3" 2 49 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 2307 0 0
"3608" "exp3" 2 50 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1890 0 0
"3608" "exp3" 2 51 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1631 24 1
"3608" "exp3" 2 52 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1111 22 1
"3608" "exp3" 2 53 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 814 0 0
"3608" "exp3" 2 54 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1960 22 1
"3608" "exp3" 2 55 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 1344 0 0
"3608" "exp3" 2 56 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1122 17 1
"3608" "exp3" 2 57 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 2250 0 0
"3608" "exp3" 2 58 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 1228 0 0
"3608" "exp3" 2 59 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1974 0 0
"3608" "exp3" 2 60 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 1531 0 0
"3608" "exp3" 2 61 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1368 0 0
"3608" "exp3" 2 62 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 2 1985 0 0
"3608" "exp3" 2 63 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 2 1062 0 0
"3608" "exp3" 2 64 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1580 26 1
"3608" "exp3" 2 65 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 674 30 1
"3608" "exp3" 2 66 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 735 0 0
"3608" "exp3" 2 67 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 922 18 1
"3608" "exp3" 2 68 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 690 25 1
"3608" "exp3" 2 69 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 483 21 1
"3608" "exp3" 2 70 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 995 4 1
"3608" "exp3" 2 71 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1415 16 1
"3608" "exp3" 2 72 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 676 13 1
"3608" "exp3" 2 73 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1157 49 1
"3608" "exp3" 2 74 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 775 0 0
"3608" "exp3" 2 75 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 2138 0 0
"3608" "exp3" 2 76 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1899 0 0
"3608" "exp3" 2 77 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 2 1230 0 0
"3608" "exp3" 2 78 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 906 0 0
"3608" "exp3" 2 79 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 793 83 1
"3608" "exp3" 2 80 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 819 36 1
"3608" "exp3" 2 81 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 761 30 1
"3608" "exp3" 2 82 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 1056 0 0
"3608" "exp3" 2 83 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 941 0 0
"3608" "exp3" 2 84 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 793 34 1
"3608" "exp3" 2 85 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 2 765 0 0
"3608" "exp3" 2 86 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 795 0 0
"3608" "exp3" 2 87 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 848 21 1
"3608" "exp3" 2 88 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 939 0 0
"3608" "exp3" 2 89 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 787 19 1
"3608" "exp3" 2 90 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 1072 43 1
"3608" "exp3" 2 91 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 975 36 1
"3608" "exp3" 2 92 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 2 1133 0 0
"3608" "exp3" 2 93 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 786 0 0
"3608" "exp3" 2 94 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 748 48 1
"3608" "exp3" 2 95 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1087 0 0
"3608" "exp3" 2 96 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1954 0 0
"3608" "exp3" 2 97 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 675 14 1
"3608" "exp3" 2 98 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 748 37 1
"3608" "exp3" 2 99 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 912 32 1
"3608" "exp3" 2 100 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 758 18 1
"3608" "exp3" 2 101 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1292 0 0
"3608" "exp3" 2 102 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 928 0 0
"3608" "exp3" 2 103 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 1526 65 1
"3608" "exp3" 2 104 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1674 0 0
"3608" "exp3" 2 105 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1456 0 0
"3608" "exp3" 2 106 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1699 0 0
"3608" "exp3" 2 107 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 2 1720 0 0
"3608" "exp3" 2 108 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 2 1938 0 0
"3608" "exp3" 2 109 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1309 28 1
"3608" "exp3" 2 110 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1231 0 0
"3608" "exp3" 2 111 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 1106 0 0
"3608" "exp3" 2 112 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1056 0 0
"3608" "exp3" 2 113 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 1082 0 0
"3608" "exp3" 2 114 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1039 0 0
"3608" "exp3" 2 115 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 898 46 1
"3608" "exp3" 2 116 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 832 28 1
"3608" "exp3" 2 117 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 495 25 1
"3608" "exp3" 2 118 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 552 30 1
"3608" "exp3" 2 119 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 808 15 1
"3608" "exp3" 2 120 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 1364 0 0
"3608" "exp3" 2 121 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 794 80 1
"3608" "exp3" 2 122 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1430 0 0
"3608" "exp3" 2 123 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 869 38 1
"3608" "exp3" 2 124 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1040 27 1
"3608" "exp3" 2 125 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 962 0 0
"3608" "exp3" 2 126 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 2 1005 0 0
"3608" "exp3" 2 127 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 723 0 0
"3608" "exp3" 2 128 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1068 0 0
"3608" "exp3" 2 129 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 867 0 0
"3608" "exp3" 2 130 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 905 19 1
"3608" "exp3" 2 131 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 770 0 0
"3608" "exp3" 2 132 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 881 0 0
"3608" "exp3" 1 1 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 2 663 0 0
"3608" "exp3" 1 2 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 511 24 1
"3608" "exp3" 1 3 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 497 34 1
"3608" "exp3" 1 4 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 532 0 0
"3608" "exp3" 1 5 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 650 0 0
"3608" "exp3" 1 6 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 825 21 1
"3608" "exp3" 1 7 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 539 0 0
"3608" "exp3" 1 8 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 663 40 1
"3608" "exp3" 1 9 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 670 8 1
"3608" "exp3" 1 10 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 738 0 0
"3608" "exp3" 1 11 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 568 25 1
"3608" "exp3" 1 12 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 620 49 1
"3608" "exp3" 1 13 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 812 0 0
"3608" "exp3" 1 14 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 517 0 0
"3608" "exp3" 1 15 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 758 0 0
"3608" "exp3" 1 16 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 2 890 0 0
"3608" "exp3" 1 17 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 814 73 1
"3608" "exp3" 1 18 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 521 22 1
"3608" "exp3" 1 19 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 629 0 0
"3608" "exp3" 1 20 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 574 0 0
"3608" "exp3" 1 21 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 702 41 1
"3608" "exp3" 1 22 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1081 0 0
"3608" "exp3" 1 23 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1186 26 1
"3608" "exp3" 1 24 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 841 18 1
"3608" "exp3" 1 25 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 2097 24 1
"3608" "exp3" 1 26 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1503 69 1
"3608" "exp3" 1 27 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 1386 4 1
"3608" "exp3" 1 28 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1186 19 1
"3608" "exp3" 1 29 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1547 71 1
"3608" "exp3" 1 30 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 1103 57 1
"3608" "exp3" 1 31 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 859 15 1
"3608" "exp3" 1 32 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1011 0 0
"3608" "exp3" 1 33 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1159 29 1
"3608" "exp3" 1 34 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 968 0 0
"3608" "exp3" 1 35 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1743 65 1
"3608" "exp3" 1 36 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1601 69 1
"3608" "exp3" 1 37 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1204 40 1
"3608" "exp3" 1 38 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1117 34 1
"3608" "exp3" 1 39 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1118 28 1
"3608" "exp3" 1 40 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1410 0 0
"3608" "exp3" 1 41 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 1275 0 0
"3608" "exp3" 1 42 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 2615 0 0
"3608" "exp3" 1 43 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1296 0 0
"3608" "exp3" 1 44 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 947 8 1
"3608" "exp3" 1 45 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1134 36 1
"3608" "exp3" 1 46 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 919 20 1
"3608" "exp3" 1 47 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1049 0 0
"3608" "exp3" 1 48 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1241 0 0
"3608" "exp3" 1 49 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 1029 0 0
"3608" "exp3" 1 50 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 2 1249 0 0
"3608" "exp3" 1 51 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 1263 0 0
"3608" "exp3" 1 52 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1566 21 1
"3608" "exp3" 1 53 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1196 25 1
"3608" "exp3" 1 54 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1116 7 1
"3608" "exp3" 1 55 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 2 992 0 0
"3608" "exp3" 1 56 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 960 0 0
"3608" "exp3" 1 57 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 968 24 1
"3608" "exp3" 1 58 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 1003 0 0
"3608" "exp3" 1 59 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 710 37 1
"3608" "exp3" 1 60 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1004 0 0
"3608" "exp3" 1 61 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 938 20 1
"3608" "exp3" 1 62 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1009 21 1
"3608" "exp3" 1 63 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 691 0 0
"3608" "exp3" 1 64 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 659 0 0
"3608" "exp3" 1 65 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1162 0 0
"3608" "exp3" 1 66 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 1049 2 1
"3608" "exp3" 1 67 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1352 17 1
"3608" "exp3" 1 68 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1182 45 1
"3608" "exp3" 1 69 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1378 84 1
"3608" "exp3" 1 70 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 1887 0 0
"3608" "exp3" 1 71 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1161 16 1
"3608" "exp3" 1 72 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 939 17 1
"3608" "exp3" 1 73 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1211 18 1
"3608" "exp3" 1 74 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1236 0 0
"3608" "exp3" 1 75 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 2 1373 0 0
"3608" "exp3" 1 76 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1085 18 1
"3608" "exp3" 1 77 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 2 1385 0 0
"3608" "exp3" 1 78 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1111 31 1
"3608" "exp3" 1 79 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 732 16 1
"3608" "exp3" 1 80 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 783 27 1
"3608" "exp3" 1 81 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 719 14 1
"3608" "exp3" 1 82 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 751 12 1
"3608" "exp3" 1 83 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 1001 5 1
"3608" "exp3" 1 84 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1070 25 1
"3608" "exp3" 1 85 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1139 37 1
"3608" "exp3" 1 86 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1191 32 1
"3608" "exp3" 1 87 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 1536 0 0
"3608" "exp3" 1 88 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 1059 0 0
"3608" "exp3" 1 89 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1130 99 1
"3608" "exp3" 1 90 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1486 74 1
"3608" "exp3" 1 91 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1059 13 1
"3608" "exp3" 1 92 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1101 28 1
"3608" "exp3" 1 93 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 959 23 1
"3608" "exp3" 1 94 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 657 6 1
"3608" "exp3" 1 95 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 811 0 0
"3608" "exp3" 1 96 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 873 0 0
"3608" "exp3" 1 97 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 814 0 0
"3608" "exp3" 1 98 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 1657 0 0
"3608" "exp3" 1 99 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1174 0 0
"3608" "exp3" 1 100 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 933 0 0
"3608" "exp3" 1 101 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 841 30 1
"3608" "exp3" 1 102 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 865 0 0
"3608" "exp3" 1 103 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 712 11 1
"3608" "exp3" 1 104 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 855 12 1
"3608" "exp3" 1 105 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 887 45 1
"3608" "exp3" 1 106 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 986 9 1
"3608" "exp3" 1 107 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 2 1697 0 0
"3608" "exp3" 1 108 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1348 0 0
"3608" "exp3" 1 109 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1822 0 0
"3608" "exp3" 1 110 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1355 11 1
"3608" "exp3" 1 111 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 1391 0 0
"3608" "exp3" 1 112 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1232 17 1
"3608" "exp3" 1 113 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 2 1265 52 1
"3608" "exp3" 1 114 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 1095 0 0
"3608" "exp3" 1 115 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1016 14 1
"3608" "exp3" 1 116 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1915 68 1
"3608" "exp3" 1 117 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 2 1501 0 0
"3608" "exp3" 1 118 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1295 31 1
"3608" "exp3" 1 119 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1014 24 1
"3608" "exp3" 1 120 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1192 38 1
"3608" "exp3" 1 121 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1060 27 1
"3608" "exp3" 1 122 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1276 0 0
"3608" "exp3" 1 123 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1193 0 0
"3608" "exp3" 1 124 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1033 7 1
"3608" "exp3" 1 125 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1937 44 1
"3608" "exp3" 1 126 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 1 1169 10 1
"3608" "exp3" 1 127 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 757 26 1
"3608" "exp3" 1 128 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 941 75 1
"3608" "exp3" 1 129 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 1174 0 0
"3608" "exp3" 1 130 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 809 20 1
"3608" "exp3" 1 131 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 990 15 1
"3608" "exp3" 1 132 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 929 0 0
"3608" "exp3" 2 1 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1271 34 1
"3608" "exp3" 2 2 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 922 36 1
"3608" "exp3" 2 3 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 955 0 0
"3608" "exp3" 2 4 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 918 22 1
"3608" "exp3" 2 5 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 550 0 0
"3608" "exp3" 2 6 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 632 17 1
"3608" "exp3" 2 7 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1396 0 0
"3608" "exp3" 2 8 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 739 0 0
"3608" "exp3" 2 9 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 828 30 1
"3608" "exp3" 2 10 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 701 2 1
"3608" "exp3" 2 11 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1338 27 1
"3608" "exp3" 2 12 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 814 0 0
"3608" "exp3" 2 13 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1236 23 1
"3608" "exp3" 2 14 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 912 0 0
"3608" "exp3" 2 15 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 856 21 1
"3608" "exp3" 2 16 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 600 20 1
"3608" "exp3" 2 17 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 792 33 1
"3608" "exp3" 2 18 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1701 31 1
"3608" "exp3" 2 19 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 2 1509 0 0
"3608" "exp3" 2 20 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 1651 0 0
"3608" "exp3" 2 21 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1554 0 0
"3608" "exp3" 2 22 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1120 20 1
"3608" "exp3" 2 23 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 1704 0 0
"3608" "exp3" 2 24 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1028 0 0
"3608" "exp3" 2 25 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1184 0 0
"3608" "exp3" 2 26 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 1859 7 1
"3608" "exp3" 2 27 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1340 21 1
"3608" "exp3" 2 28 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1523 95 1
"3608" "exp3" 2 29 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1608 0 0
"3608" "exp3" 2 30 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1156 0 0
"3608" "exp3" 2 31 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 1818 0 0
"3608" "exp3" 2 32 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 970 26 1
"3608" "exp3" 2 33 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1455 0 0
"3608" "exp3" 2 34 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1431 0 0
"3608" "exp3" 2 35 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 1635 8 1
"3608" "exp3" 2 36 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 860 39 1
"3608" "exp3" 2 37 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 807 28 1
"3608" "exp3" 2 38 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 895 0 0
"3608" "exp3" 2 39 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 1 711 6 1
"3608" "exp3" 2 40 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 771 22 1
"3608" "exp3" 2 41 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 723 9 1
"3608" "exp3" 2 42 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 981 14 1
"3608" "exp3" 2 43 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 671 13 1
"3608" "exp3" 2 44 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 794 0 0
"3608" "exp3" 2 45 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 693 18 1
"3608" "exp3" 2 46 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 751 20 1
"3608" "exp3" 2 47 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 957 35 1
"3608" "exp3" 2 48 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 792 35 1
"3608" "exp3" 2 49 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 855 0 0
"3608" "exp3" 2 50 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 770 13 1
"3608" "exp3" 2 51 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 856 0 0
"3608" "exp3" 2 52 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 518 38 1
"3608" "exp3" 2 53 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 621 8 1
"3608" "exp3" 2 54 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 681 28 1
"3608" "exp3" 2 55 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 493 25 1
"3608" "exp3" 2 56 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 785 33 1
"3608" "exp3" 2 57 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 818 30 1
"3608" "exp3" 2 58 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 709 25 1
"3608" "exp3" 2 59 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 668 20 1
"3608" "exp3" 2 60 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 562 32 1
"3608" "exp3" 2 61 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 527 19 1
"3608" "exp3" 2 62 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 662 28 1
"3608" "exp3" 2 63 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 866 0 0
"3608" "exp3" 2 64 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 591 65 1
"3608" "exp3" 2 65 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 621 26 1
"3608" "exp3" 2 66 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 690 0 0
"3608" "exp3" 2 67 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 722 0 0
"3608" "exp3" 2 68 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 582 0 0
"3608" "exp3" 2 69 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 680 3 1
"3608" "exp3" 2 70 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 964 42 1
"3608" "exp3" 2 71 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 695 47 1
"3608" "exp3" 2 72 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 750 16 1
"3608" "exp3" 2 73 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 696 0 0
"3608" "exp3" 2 74 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 821 22 1
"3608" "exp3" 2 75 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 816 29 1
"3608" "exp3" 2 76 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 934 45 1
"3608" "exp3" 2 77 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 862 5 1
"3608" "exp3" 2 78 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 1058 0 0
"3608" "exp3" 2 79 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1290 81 1
"3608" "exp3" 2 80 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1307 33 1
"3608" "exp3" 2 81 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 647 14 1
"3608" "exp3" 2 82 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 573 15 1
"3608" "exp3" 2 83 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1092 18 1
"3608" "exp3" 2 84 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 1165 11 1
"3608" "exp3" 2 85 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 877 46 1
"3608" "exp3" 2 86 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1269 0 0
"3608" "exp3" 2 87 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 1348 43 1
"3608" "exp3" 2 88 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 815 28 1
"3608" "exp3" 2 89 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 710 10 1
"3608" "exp3" 2 90 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 756 32 1
"3608" "exp3" 2 91 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1215 41 1
"3608" "exp3" 2 92 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 963 12 1
"3608" "exp3" 2 93 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1297 0 0
"3608" "exp3" 2 94 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 2 1705 0 0
"3608" "exp3" 2 95 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 1433 17 1
"3608" "exp3" 2 96 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 884 0 0
"3608" "exp3" 2 97 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 613 24 1
"3608" "exp3" 2 98 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 650 0 0
"3608" "exp3" 2 99 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 928 27 1
"3608" "exp3" 2 100 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 978 0 0
"3608" "exp3" 2 101 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 781 40 1
"3608" "exp3" 2 102 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 634 19 1
"3608" "exp3" 2 103 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 625 30 1
"3608" "exp3" 2 104 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 619 18 1
"3608" "exp3" 2 105 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 757 12 1
"3608" "exp3" 2 106 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 859 15 1
"3608" "exp3" 2 107 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 525 33 1
"3608" "exp3" 2 108 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 892 14 1
"3608" "exp3" 2 109 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 1307 29 1
"3608" "exp3" 2 110 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 646 0 0
"3608" "exp3" 2 111 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1781 0 0
"3608" "exp3" 2 112 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 934 15 1
"3608" "exp3" 2 113 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 1598 26 1
"3608" "exp3" 2 114 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 2 1558 63 1
"3608" "exp3" 2 115 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 1472 0 0
"3608" "exp3" 2 116 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1189 29 1
"3608" "exp3" 2 117 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1111 0 0
"3608" "exp3" 2 118 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 902 0 0
"3608" "exp3" 2 119 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1222 0 0
"3608" "exp3" 2 120 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 2 1131 0 0
"3608" "exp3" 2 121 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1137 17 1
"3608" "exp3" 2 122 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 934 38 1
"3608" "exp3" 2 123 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 562 31 1
"3608" "exp3" 2 124 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 985 29 1
"3608" "exp3" 2 125 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 874 42 1
"3608" "exp3" 2 126 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1289 0 0
"3608" "exp3" 2 127 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1515 0 0
"3608" "exp3" 2 128 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1170 23 1
"3608" "exp3" 2 129 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1044 0 0
"3608" "exp3" 2 130 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1073 0 0
"3608" "exp3" 2 131 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1113 7 1
"3608" "exp3" 2 132 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 2 1034 60 1
"3608" "exp3" 1 1 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 108 20 1
"3608" "exp3" 1 2 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 2 782 0 0
"3608" "exp3" 1 3 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 600 18 1
"3608" "exp3" 1 4 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 564 21 1
"3608" "exp3" 1 5 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1281 86 1
"3608" "exp3" 1 6 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 938 92 1
"3608" "exp3" 1 7 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 814 0 0
"3608" "exp3" 1 8 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 2 1242 0 0
"3608" "exp3" 1 9 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 754 0 0
"3608" "exp3" 1 10 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1005 30 1
"3608" "exp3" 1 11 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 624 35 1
"3608" "exp3" 1 12 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 569 26 1
"3608" "exp3" 1 13 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 588 15 1
"3608" "exp3" 1 14 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 559 18 1
"3608" "exp3" 1 15 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 905 0 0
"3608" "exp3" 1 16 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 2 1057 0 0
"3608" "exp3" 1 17 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 832 21 1
"3608" "exp3" 1 18 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 675 2 1
"3608" "exp3" 1 19 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 769 0 0
"3608" "exp3" 1 20 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 663 22 1
"3608" "exp3" 1 21 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 549 0 0
"3608" "exp3" 1 22 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 480 5 1
"3608" "exp3" 1 23 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 802 19 1
"3608" "exp3" 1 24 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 498 11 1
"3608" "exp3" 1 25 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 672 0 0
"3608" "exp3" 1 26 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 693 0 0
"3608" "exp3" 1 27 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 968 0 0
"3608" "exp3" 1 28 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 714 0 0
"3608" "exp3" 1 29 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1051 0 0
"3608" "exp3" 1 30 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 775 0 0
"3608" "exp3" 1 31 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1706 0 0
"3608" "exp3" 1 32 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 707 0 0
"3608" "exp3" 1 33 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 955 17 1
"3608" "exp3" 1 34 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 544 4 1
"3608" "exp3" 1 35 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 484 17 1
"3608" "exp3" 1 36 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 447 24 1
"3608" "exp3" 1 37 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 658 32 1
"3608" "exp3" 1 38 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 814 75 1
"3608" "exp3" 1 39 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1517 0 0
"3608" "exp3" 1 40 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 2 990 0 0
"3608" "exp3" 1 41 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 582 29 1
"3608" "exp3" 1 42 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 546 22 1
"3608" "exp3" 1 43 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 912 45 1
"3608" "exp3" 1 44 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 755 0 0
"3608" "exp3" 1 45 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 793 25 1
"3608" "exp3" 1 46 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 575 0 0
"3608" "exp3" 1 47 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 638 0 0
"3608" "exp3" 1 48 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 756 19 1
"3608" "exp3" 1 49 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 781 0 0
"3608" "exp3" 1 50 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 822 32 1
"3608" "exp3" 1 51 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 1127 58 1
"3608" "exp3" 1 52 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 877 25 1
"3608" "exp3" 1 53 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 763 31 1
"3608" "exp3" 1 54 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 790 0 0
"3608" "exp3" 1 55 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 694 28 1
"3608" "exp3" 1 56 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 587 26 1
"3608" "exp3" 1 57 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 1189 0 0
"3608" "exp3" 1 58 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 780 0 0
"3608" "exp3" 1 59 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 794 0 0
"3608" "exp3" 1 60 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 2 900 0 0
"3608" "exp3" 1 61 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1364 42 1
"3608" "exp3" 1 62 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1124 0 0
"3608" "exp3" 1 63 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 975 34 1
"3608" "exp3" 1 64 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1217 87 1
"3608" "exp3" 1 65 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 954 27 1
"3608" "exp3" 1 66 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 798 38 1
"3608" "exp3" 1 67 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 609 31 1
"3608" "exp3" 1 68 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 788 40 1
"3608" "exp3" 1 69 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1177 24 1
"3608" "exp3" 1 70 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1116 33 1
"3608" "exp3" 1 71 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1105 0 0
"3608" "exp3" 1 72 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 1255 0 0
"3608" "exp3" 1 73 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 1026 18 1
"3608" "exp3" 1 74 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1349 35 1
"3608" "exp3" 1 75 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 1 682 6 1
"3608" "exp3" 1 76 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1158 0 0
"3608" "exp3" 1 77 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 776 23 1
"3608" "exp3" 1 78 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 987 0 0
"3608" "exp3" 1 79 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1180 27 1
"3608" "exp3" 1 80 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1109 80 1
"3608" "exp3" 1 81 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1309 16 1
"3608" "exp3" 1 82 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 1103 36 1
"3608" "exp3" 1 83 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 912 0 0
"3608" "exp3" 1 84 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 828 34 1
"3608" "exp3" 1 85 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1026 0 0
"3608" "exp3" 1 86 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1416 36 1
"3608" "exp3" 1 87 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1524 0 0
"3608" "exp3" 1 88 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 986 69 1
"3608" "exp3" 1 89 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 858 11 1
"3608" "exp3" 1 90 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 796 9 1
"3608" "exp3" 1 91 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 982 0 0
"3608" "exp3" 1 92 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1041 0 0
"3608" "exp3" 1 93 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 775 31 1
"3608" "exp3" 1 94 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 970 13 1
"3608" "exp3" 1 95 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 876 19 1
"3608" "exp3" 1 96 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 950 13 1
"3608" "exp3" 1 97 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 897 0 0
"3608" "exp3" 1 98 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 853 0 0
"3608" "exp3" 1 99 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1049 0 0
"3608" "exp3" 1 100 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 1146 0 0
"3608" "exp3" 1 101 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1228 73 1
"3608" "exp3" 1 102 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 2005 47 1
"3608" "exp3" 1 103 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 947 7 1
"3608" "exp3" 1 104 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 1399 23 1
"3608" "exp3" 1 105 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 938 9 1
"3608" "exp3" 1 106 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1107 0 0
"3608" "exp3" 1 107 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1368 1 1
"3608" "exp3" 1 108 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1748 0 0
"3608" "exp3" 1 109 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1406 0 0
"3608" "exp3" 1 110 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 975 0 0
"3608" "exp3" 1 111 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1095 26 1
"3608" "exp3" 1 112 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 832 32 1
"3608" "exp3" 1 113 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 622 75 1
"3608" "exp3" 1 114 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1050 14 1
"3608" "exp3" 1 115 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 793 48 1
"3608" "exp3" 1 116 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 657 44 1
"3608" "exp3" 1 117 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 744 0 0
"3608" "exp3" 1 118 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 897 0 0
"3608" "exp3" 1 119 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 923 94 1
"3608" "exp3" 1 120 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 2 954 0 0
"3608" "exp3" 1 121 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 928 90 1
"3608" "exp3" 1 122 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 950 67 1
"3608" "exp3" 1 123 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 560 83 1
"3608" "exp3" 1 124 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 903 0 0
"3608" "exp3" 1 125 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 674 16 1
"3608" "exp3" 1 126 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 972 28 1
"3608" "exp3" 1 127 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 571 34 1
"3608" "exp3" 1 128 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 403 33 1
"3608" "exp3" 1 129 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 483 23 1
"3608" "exp3" 1 130 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 420 43 1
"3608" "exp3" 1 131 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 411 0 0
"3608" "exp3" 1 132 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 641 23 1
"3608" "exp3" 2 1 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 924 14 1
"3608" "exp3" 2 2 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 857 45 1
"3608" "exp3" 2 3 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 842 26 1
"3608" "exp3" 2 4 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 597 0 0
"3608" "exp3" 2 5 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 761 0 0
"3608" "exp3" 2 6 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1309 0 0
"3608" "exp3" 2 7 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 781 0 0
"3608" "exp3" 2 8 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 614 58 1
"3608" "exp3" 2 9 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 738 0 0
"3608" "exp3" 2 10 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 726 0 0
"3608" "exp3" 2 11 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 758 9 1
"3608" "exp3" 2 12 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 668 0 0
"3608" "exp3" 2 13 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1003 0 0
"3608" "exp3" 2 14 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 982 27 1
"3608" "exp3" 2 15 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 902 0 0
"3608" "exp3" 2 16 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 965 29 1
"3608" "exp3" 2 17 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 1178 0 0
"3608" "exp3" 2 18 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1056 32 1
"3608" "exp3" 2 19 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1084 0 0
"3608" "exp3" 2 20 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 843 68 1
"3608" "exp3" 2 21 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 1 1143 1 1
"3608" "exp3" 2 22 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 1427 0 0
"3608" "exp3" 2 23 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1300 0 0
"3608" "exp3" 2 24 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1061 0 0
"3608" "exp3" 2 25 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 1189 14 1
"3608" "exp3" 2 26 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 926 0 0
"3608" "exp3" 2 27 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1403 16 1
"3608" "exp3" 2 28 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 918 21 1
"3608" "exp3" 2 29 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 605 0 0
"3608" "exp3" 2 30 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 988 37 1
"3608" "exp3" 2 31 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 922 0 0
"3608" "exp3" 2 32 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 832 76 1
"3608" "exp3" 2 33 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 852 0 0
"3608" "exp3" 2 34 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 2 767 70 1
"3608" "exp3" 2 35 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 943 22 1
"3608" "exp3" 2 36 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 1 364 0 0
"3608" "exp3" 2 37 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 567 22 1
"3608" "exp3" 2 38 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 411 11 1
"3608" "exp3" 2 39 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 566 34 1
"3608" "exp3" 2 40 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 507 0 0
"3608" "exp3" 2 41 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 2 619 0 0
"3608" "exp3" 2 42 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 540 19 1
"3608" "exp3" 2 43 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 488 12 1
"3608" "exp3" 2 44 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 567 24 1
"3608" "exp3" 2 45 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 459 0 0
"3608" "exp3" 2 46 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 477 0 0
"3608" "exp3" 2 47 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 483 18 1
"3608" "exp3" 2 48 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 511 4 1
"3608" "exp3" 2 49 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 2 739 0 0
"3608" "exp3" 2 50 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 783 22 1
"3608" "exp3" 2 51 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 565 26 1
"3608" "exp3" 2 52 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 462 39 1
"3608" "exp3" 2 53 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 860 33 1
"3608" "exp3" 2 54 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 1 546 8 1
"3608" "exp3" 2 55 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 503 13 1
"3608" "exp3" 2 56 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 771 32 1
"3608" "exp3" 2 57 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 1 581 7 1
"3608" "exp3" 2 58 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 639 27 1
"3608" "exp3" 2 59 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 390 17 1
"3608" "exp3" 2 60 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 513 26 1
"3608" "exp3" 2 61 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 1 468 0 0
"3608" "exp3" 2 62 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 409 13 1
"3608" "exp3" 2 63 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 2 516 0 0
"3608" "exp3" 2 64 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 742 0 0
"3608" "exp3" 2 65 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 510 34 1
"3608" "exp3" 2 66 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 413 0 0
"3608" "exp3" 2 67 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 434 19 1
"3608" "exp3" 2 68 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 528 0 0
"3608" "exp3" 2 69 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 709 0 0
"3608" "exp3" 2 70 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 648 37 1
"3608" "exp3" 2 71 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 873 29 1
"3608" "exp3" 2 72 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 539 7 1
"3608" "exp3" 2 73 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 393 6 1
"3608" "exp3" 2 74 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 353 18 1
"3608" "exp3" 2 75 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 516 20 1
"3608" "exp3" 2 76 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 819 10 1
"3608" "exp3" 2 77 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 614 28 1
"3608" "exp3" 2 78 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 677 30 1
"3608" "exp3" 2 79 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 517 0 0
"3608" "exp3" 2 80 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 610 25 1
"3608" "exp3" 2 81 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 546 29 1
"3608" "exp3" 2 82 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 537 24 1
"3608" "exp3" 2 83 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 589 0 0
"3608" "exp3" 2 84 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 454 70 1
"3608" "exp3" 2 85 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 623 20 1
"3608" "exp3" 2 86 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 1 442 8 1
"3608" "exp3" 2 87 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 519 0 0
"3608" "exp3" 2 88 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 438 19 1
"3608" "exp3" 2 89 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 986 0 0
"3608" "exp3" 2 90 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 727 0 0
"3608" "exp3" 2 91 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 2 669 0 0
"3608" "exp3" 2 92 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 746 32 1
"3608" "exp3" 2 93 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 738 20 1
"3608" "exp3" 2 94 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 613 21 1
"3608" "exp3" 2 95 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 557 0 0
"3608" "exp3" 2 96 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 706 0 0
"3608" "exp3" 2 97 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 741 0 0
"3608" "exp3" 2 98 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 860 0 0
"3608" "exp3" 2 99 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 637 0 0
"3608" "exp3" 2 100 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 2 1116 67 1
"3608" "exp3" 2 101 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 1 615 12 1
"3608" "exp3" 2 102 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 492 25 1
"3608" "exp3" 2 103 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 468 31 1
"3608" "exp3" 2 104 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 400 31 1
"3608" "exp3" 2 105 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 677 0 0
"3608" "exp3" 2 106 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 472 0 0
"3608" "exp3" 2 107 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 680 25 1
"3608" "exp3" 2 108 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 732 11 1
"3608" "exp3" 2 109 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 698 64 1
"3608" "exp3" 2 110 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 699 0 0
"3608" "exp3" 2 111 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 663 0 0
"3608" "exp3" 2 112 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 699 28 1
"3608" "exp3" 2 113 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 582 0 0
"3608" "exp3" 2 114 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 800 37 1
"3608" "exp3" 2 115 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 995 0 0
"3608" "exp3" 2 116 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 725 0 0
"3608" "exp3" 2 117 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 558 0 0
"3608" "exp3" 2 118 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 2 570 0 0
"3608" "exp3" 2 119 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 926 0 0
"3608" "exp3" 2 120 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 569 5 1
"3608" "exp3" 2 121 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 719 0 0
"3608" "exp3" 2 122 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 869 2 1
"3608" "exp3" 2 123 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 950 21 1
"3608" "exp3" 2 124 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 691 14 1
"3608" "exp3" 2 125 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 674 24 1
"3608" "exp3" 2 126 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 563 16 1
"3608" "exp3" 2 127 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 564 18 1
"3608" "exp3" 2 128 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 637 26 1
"3608" "exp3" 2 129 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 798 48 1
"3608" "exp3" 2 130 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 759 0 0
"3608" "exp3" 2 131 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 801 36 1
"3608" "exp3" 2 132 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 803 9 1
"3608" "exp3" 1 1 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 677 31 1
"3608" "exp3" 1 2 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 297 14 1
"3608" "exp3" 1 3 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 391 11 1
"3608" "exp3" 1 4 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 221 11 1
"3608" "exp3" 1 5 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 406 43 1
"3608" "exp3" 1 6 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 203 23 1
"3608" "exp3" 1 7 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 294 71 1
"3608" "exp3" 1 8 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 219 0 0
"3608" "exp3" 1 9 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 445 23 1
"3608" "exp3" 1 10 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 303 25 1
"3608" "exp3" 1 11 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 440 4 1
"3608" "exp3" 1 12 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 439 0 0
"3608" "exp3" 1 13 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 552 21 1
"3608" "exp3" 1 14 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 466 0 0
"3608" "exp3" 1 15 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 382 16 1
"3608" "exp3" 1 16 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 401 34 1
"3608" "exp3" 1 17 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 380 33 1
"3608" "exp3" 1 18 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 320 27 1
"3608" "exp3" 1 19 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 380 0 0
"3608" "exp3" 1 20 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 372 6 1
"3608" "exp3" 1 21 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 480 7 1
"3608" "exp3" 1 22 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 700 22 1
"3608" "exp3" 1 23 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 319 24 1
"3608" "exp3" 1 24 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 308 33 1
"3608" "exp3" 1 25 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 436 28 1
"3608" "exp3" 1 26 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 534 20 1
"3608" "exp3" 1 27 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 365 0 0
"3608" "exp3" 1 28 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 631 0 0
"3608" "exp3" 1 29 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 469 3 1
"3608" "exp3" 1 30 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 590 23 1
"3608" "exp3" 1 31 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 701 0 0
"3608" "exp3" 1 32 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 461 44 1
"3608" "exp3" 1 33 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 548 0 0
"3608" "exp3" 1 34 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 477 0 0
"3608" "exp3" 1 35 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 571 35 1
"3608" "exp3" 1 36 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 463 38 1
"3608" "exp3" 1 37 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 723 0 0
"3608" "exp3" 1 38 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 1134 21 1
"3608" "exp3" 1 39 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 717 32 1
"3608" "exp3" 1 40 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 779 0 0
"3608" "exp3" 1 41 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 832 0 0
"3608" "exp3" 1 42 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 814 29 1
"3608" "exp3" 1 43 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 510 33 1
"3608" "exp3" 1 44 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 496 0 0
"3608" "exp3" 1 45 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 628 72 1
"3608" "exp3" 1 46 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 543 13 1
"3608" "exp3" 1 47 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 559 16 1
"3608" "exp3" 1 48 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 298 5 1
"3608" "exp3" 1 49 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 361 22 1
"3608" "exp3" 1 50 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 396 0 0
"3608" "exp3" 1 51 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 368 20 1
"3608" "exp3" 1 52 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 255 20 1
"3608" "exp3" 1 53 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 421 0 0
"3608" "exp3" 1 54 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 361 32 1
"3608" "exp3" 1 55 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 318 40 1
"3608" "exp3" 1 56 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 308 0 0
"3608" "exp3" 1 57 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 400 0 0
"3608" "exp3" 1 58 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 357 18 1
"3608" "exp3" 1 59 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 356 10 1
"3608" "exp3" 1 60 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 350 0 0
"3608" "exp3" 1 61 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 387 15 1
"3608" "exp3" 1 62 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 424 26 1
"3608" "exp3" 1 63 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 528 17 1
"3608" "exp3" 1 64 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 405 12 1
"3608" "exp3" 1 65 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 425 17 1
"3608" "exp3" 1 66 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 339 20 1
"3608" "exp3" 1 67 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 405 0 0
"3608" "exp3" 1 68 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 414 15 1
"3608" "exp3" 1 69 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 306 25 1
"3608" "exp3" 1 70 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 519 17 1
"3608" "exp3" 1 71 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 587 0 0
"3608" "exp3" 1 72 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 350 30 1
"3608" "exp3" 1 73 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 354 23 1
"3608" "exp3" 1 74 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 322 43 1
"3608" "exp3" 1 75 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 540 41 1
"3608" "exp3" 1 76 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 533 39 1
"3608" "exp3" 1 77 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 358 49 1
"3608" "exp3" 1 78 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 456 18 1
"3608" "exp3" 1 79 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 353 29 1
"3608" "exp3" 1 80 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 360 12 1
"3608" "exp3" 1 81 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 461 16 1
"3608" "exp3" 1 82 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 362 21 1
"3608" "exp3" 1 83 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 402 30 1
"3608" "exp3" 1 84 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 496 0 0
"3608" "exp3" 1 85 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 736 37 1
"3608" "exp3" 1 86 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 526 41 1
"3608" "exp3" 1 87 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 564 0 0
"3608" "exp3" 1 88 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1053 0 0
"3608" "exp3" 1 89 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1055 0 0
"3608" "exp3" 1 90 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1022 92 1
"3608" "exp3" 1 91 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1107 0 0
"3608" "exp3" 1 92 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 770 0 0
"3608" "exp3" 1 93 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1104 24 1
"3608" "exp3" 1 94 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1120 0 0
"3608" "exp3" 1 95 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 796 0 0
"3608" "exp3" 1 96 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 931 0 0
"3608" "exp3" 1 97 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 672 32 1
"3608" "exp3" 1 98 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1134 0 0
"3608" "exp3" 1 99 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 873 0 0
"3608" "exp3" 1 100 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1391 27 1
"3608" "exp3" 1 101 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 678 5 1
"3608" "exp3" 1 102 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 938 1 1
"3608" "exp3" 1 103 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1492 0 0
"3608" "exp3" 1 104 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 580 0 0
"3608" "exp3" 1 105 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 967 22 1
"3608" "exp3" 1 106 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 441 0 0
"3608" "exp3" 1 107 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 405 24 1
"3608" "exp3" 1 108 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1070 10 1
"3608" "exp3" 1 109 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 740 27 1
"3608" "exp3" 1 110 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 687 14 1
"3608" "exp3" 1 111 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 530 35 1
"3608" "exp3" 1 112 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 543 0 0
"3608" "exp3" 1 113 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 728 18 1
"3608" "exp3" 1 114 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 422 0 0
"3608" "exp3" 1 115 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 405 0 0
"3608" "exp3" 1 116 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 2 406 61 1
"3608" "exp3" 1 117 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 376 18 1
"3608" "exp3" 1 118 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 316 0 0
"3608" "exp3" 1 119 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 409 40 1
"3608" "exp3" 1 120 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 298 42 1
"3608" "exp3" 1 121 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 613 47 1
"3608" "exp3" 1 122 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 689 0 0
"3608" "exp3" 1 123 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 856 0 0
"3608" "exp3" 1 124 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 627 22 1
"3608" "exp3" 1 125 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 1694 75 1
"3608" "exp3" 1 126 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 779 0 0
"3608" "exp3" 1 127 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 621 34 1
"3608" "exp3" 1 128 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 553 9 1
"3608" "exp3" 1 129 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 839 24 1
"3608" "exp3" 1 130 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 914 0 0
"3608" "exp3" 1 131 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 682 13 1
"3608" "exp3" 1 132 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 791 26 1
"3608" "exp3" 2 1 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 867 71 1
"3608" "exp3" 2 2 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 394 76 1
"3608" "exp3" 2 3 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 361 0 0
"3608" "exp3" 2 4 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 2 426 0 0
"3608" "exp3" 2 5 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 465 10 1
"3608" "exp3" 2 6 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 206 0 0
"3608" "exp3" 2 7 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 292 0 0
"3608" "exp3" 2 8 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 469 0 0
"3608" "exp3" 2 9 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 260 14 1
"3608" "exp3" 2 10 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 360 7 1
"3608" "exp3" 2 11 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 271 0 0
"3608" "exp3" 2 12 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 240 33 1
"3608" "exp3" 2 13 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 650 21 1
"3608" "exp3" 2 14 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 529 30 1
"3608" "exp3" 2 15 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 442 0 0
"3608" "exp3" 2 16 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 754 2 1
"3608" "exp3" 2 17 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 870 0 0
"3608" "exp3" 2 18 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 627 0 0
"3608" "exp3" 2 19 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 761 30 1
"3608" "exp3" 2 20 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 819 0 0
"3608" "exp3" 2 21 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 785 0 0
"3608" "exp3" 2 22 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1063 22 1
"3608" "exp3" 2 23 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 991 0 0
"3608" "exp3" 2 24 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1073 0 0
"3608" "exp3" 2 25 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 942 0 0
"3608" "exp3" 2 26 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 528 0 0
"3608" "exp3" 2 27 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 1 500 17 1
"3608" "exp3" 2 28 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 436 0 0
"3608" "exp3" 2 29 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 467 0 0
"3608" "exp3" 2 30 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 748 36 1
"3608" "exp3" 2 31 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 578 25 1
"3608" "exp3" 2 32 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 434 18 1
"3608" "exp3" 2 33 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 478 0 0
"3608" "exp3" 2 34 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 378 0 0
"3608" "exp3" 2 35 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1111 59 1
"3608" "exp3" 2 36 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 975 0 0
"3608" "exp3" 2 37 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 743 32 1
"3608" "exp3" 2 38 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 975 17 1
"3608" "exp3" 2 39 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 422 1 1
"3608" "exp3" 2 40 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 976 16 1
"3608" "exp3" 2 41 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 865 19 1
"3608" "exp3" 2 42 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 841 24 1
"3608" "exp3" 2 43 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1222 13 1
"3608" "exp3" 2 44 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 391 0 0
"3608" "exp3" 2 45 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 425 8 1
"3608" "exp3" 2 46 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 643 32 1
"3608" "exp3" 2 47 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 784 45 1
"3608" "exp3" 2 48 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 642 0 0
"3608" "exp3" 2 49 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 639 30 1
"3608" "exp3" 2 50 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 519 0 0
"3608" "exp3" 2 51 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 402 12 1
"3608" "exp3" 2 52 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 504 11 1
"3608" "exp3" 2 53 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 744 32 1
"3608" "exp3" 2 54 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 484 0 0
"3608" "exp3" 2 55 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 564 40 1
"3608" "exp3" 2 56 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 634 0 0
"3608" "exp3" 2 57 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 516 0 0
"3608" "exp3" 2 58 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 511 26 1
"3608" "exp3" 2 59 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 614 25 1
"3608" "exp3" 2 60 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 461 9 1
"3608" "exp3" 2 61 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 489 37 1
"3608" "exp3" 2 62 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 408 21 1
"3608" "exp3" 2 63 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 573 15 1
"3608" "exp3" 2 64 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 482 31 1
"3608" "exp3" 2 65 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 828 0 0
"3608" "exp3" 2 66 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 544 16 1
"3608" "exp3" 2 67 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 441 3 1
"3608" "exp3" 2 68 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 436 28 1
"3608" "exp3" 2 69 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 412 24 1
"3608" "exp3" 2 70 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 283 36 1
"3608" "exp3" 2 71 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 688 15 1
"3608" "exp3" 2 72 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 468 0 0
"3608" "exp3" 2 73 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 393 0 0
"3608" "exp3" 2 74 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 412 0 0
"3608" "exp3" 2 75 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 360 26 1
"3608" "exp3" 2 76 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 809 21 1
"3608" "exp3" 2 77 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 819 65 1
"3608" "exp3" 2 78 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 757 14 1
"3608" "exp3" 2 79 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 715 0 0
"3608" "exp3" 2 80 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 378 48 1
"3608" "exp3" 2 81 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 743 75 1
"3608" "exp3" 2 82 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 658 67 1
"3608" "exp3" 2 83 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 726 0 0
"3608" "exp3" 2 84 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 564 13 1
"3608" "exp3" 2 85 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 698 39 1
"3608" "exp3" 2 86 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 387 18 1
"3608" "exp3" 2 87 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 384 12 1
"3608" "exp3" 2 88 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 413 23 1
"3608" "exp3" 2 89 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 259 0 0
"3608" "exp3" 2 90 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 451 31 1
"3608" "exp3" 2 91 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 314 42 1
"3608" "exp3" 2 92 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 506 21 1
"3608" "exp3" 2 93 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 324 41 1
"3608" "exp3" 2 94 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 310 44 1
"3608" "exp3" 2 95 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 417 0 0
"3608" "exp3" 2 96 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 525 0 0
"3608" "exp3" 2 97 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 487 29 1
"3608" "exp3" 2 98 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 326 18 1
"3608" "exp3" 2 99 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 411 5 1
"3608" "exp3" 2 100 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 491 0 0
"3608" "exp3" 2 101 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 450 0 0
"3608" "exp3" 2 102 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 577 39 1
"3608" "exp3" 2 103 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 502 6 1
"3608" "exp3" 2 104 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 682 35 1
"3608" "exp3" 2 105 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 370 22 1
"3608" "exp3" 2 106 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 368 6 1
"3608" "exp3" 2 107 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 393 0 0
"3608" "exp3" 2 108 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 443 34 1
"3608" "exp3" 2 109 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 452 19 1
"3608" "exp3" 2 110 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 507 38 1
"3608" "exp3" 2 111 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 566 0 0
"3608" "exp3" 2 112 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 697 8 1
"3608" "exp3" 2 113 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 523 40 1
"3608" "exp3" 2 114 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 654 0 0
"3608" "exp3" 2 115 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 749 20 1
"3608" "exp3" 2 116 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 926 81 1
"3608" "exp3" 2 117 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 758 7 1
"3608" "exp3" 2 118 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 618 43 1
"3608" "exp3" 2 119 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 689 28 1
"3608" "exp3" 2 120 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 693 14 1
"3608" "exp3" 2 121 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 622 0 0
"3608" "exp3" 2 122 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 410 33 1
"3608" "exp3" 2 123 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 487 27 1
"3608" "exp3" 2 124 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 484 5 1
"3608" "exp3" 2 125 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 539 30 1
"3608" "exp3" 2 126 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 488 17 1
"3608" "exp3" 2 127 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 409 0 0
"3608" "exp3" 2 128 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 1038 0 0
"3608" "exp3" 2 129 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 2 820 63 1
"3608" "exp3" 2 130 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 639 69 1
"3608" "exp3" 2 131 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1139 19 1
"3608" "exp3" 2 132 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 821 0 0
"3609" "exp3" 1 1 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 1 604 7 1
"3609" "exp3" 1 2 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 722 17 1
"3609" "exp3" 1 3 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 873 0 0
"3609" "exp3" 1 4 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 795 38 1
"3609" "exp3" 1 5 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 900 18 1
"3609" "exp3" 1 6 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 809 0 0
"3609" "exp3" 1 7 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 866 0 0
"3609" "exp3" 1 8 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 821 0 0
"3609" "exp3" 1 9 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1210 15 1
"3609" "exp3" 1 10 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 907 81 1
"3609" "exp3" 1 11 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 713 16 1
"3609" "exp3" 1 12 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 786 0 0
"3609" "exp3" 1 13 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 677 16 1
"3609" "exp3" 1 14 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 996 0 0
"3609" "exp3" 1 15 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 916 26 1
"3609" "exp3" 1 16 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 743 35 1
"3609" "exp3" 1 17 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1054 82 1
"3609" "exp3" 1 18 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 910 21 1
"3609" "exp3" 1 19 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 560 24 1
"3609" "exp3" 1 20 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 930 0 0
"3609" "exp3" 1 21 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 1229 32 1
"3609" "exp3" 1 22 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 924 73 1
"3609" "exp3" 1 23 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 892 24 1
"3609" "exp3" 1 24 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 888 80 1
"3609" "exp3" 1 25 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 1063 16 1
"3609" "exp3" 1 26 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 865 45 1
"3609" "exp3" 1 27 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 697 32 1
"3609" "exp3" 1 28 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1172 34 1
"3609" "exp3" 1 29 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 1244 0 0
"3609" "exp3" 1 30 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 1267 0 0
"3609" "exp3" 1 31 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 636 0 0
"3609" "exp3" 1 32 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 1072 0 0
"3609" "exp3" 1 33 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 765 40 1
"3609" "exp3" 1 34 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1365 44 1
"3609" "exp3" 1 35 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1123 0 0
"3609" "exp3" 1 36 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 1 692 7 1
"3609" "exp3" 1 37 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 775 25 1
"3609" "exp3" 1 38 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 679 28 1
"3609" "exp3" 1 39 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 780 41 1
"3609" "exp3" 1 40 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1626 13 1
"3609" "exp3" 1 41 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1124 0 0
"3609" "exp3" 1 42 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 590 17 1
"3609" "exp3" 1 43 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 958 8 1
"3609" "exp3" 1 44 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1187 0 0
"3609" "exp3" 1 45 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 773 45 1
"3609" "exp3" 1 46 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 600 42 1
"3609" "exp3" 1 47 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 579 48 1
"3609" "exp3" 1 48 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 921 1 1
"3609" "exp3" 1 49 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 1505 35 1
"3609" "exp3" 1 50 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 2 820 0 0
"3609" "exp3" 1 51 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1631 28 1
"3609" "exp3" 1 52 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 776 0 0
"3609" "exp3" 1 53 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 975 25 1
"3609" "exp3" 1 54 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 823 0 0
"3609" "exp3" 1 55 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 583 37 1
"3609" "exp3" 1 56 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 646 36 1
"3609" "exp3" 1 57 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1646 19 1
"3609" "exp3" 1 58 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 603 34 1
"3609" "exp3" 1 59 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1454 0 0
"3609" "exp3" 1 60 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 925 0 0
"3609" "exp3" 1 61 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 586 0 0
"3609" "exp3" 1 62 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 1402 0 0
"3609" "exp3" 1 63 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 840 0 0
"3609" "exp3" 1 64 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 603 31 1
"3609" "exp3" 1 65 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 904 46 1
"3609" "exp3" 1 66 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 677 20 1
"3609" "exp3" 1 67 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 678 12 1
"3609" "exp3" 1 68 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 639 14 1
"3609" "exp3" 1 69 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 589 23 1
"3609" "exp3" 1 70 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 539 0 0
"3609" "exp3" 1 71 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 563 0 0
"3609" "exp3" 1 72 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 556 18 1
"3609" "exp3" 1 73 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 737 0 0
"3609" "exp3" 1 74 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 1 1264 2 1
"3609" "exp3" 1 75 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1195 0 0
"3609" "exp3" 1 76 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 1086 22 1
"3609" "exp3" 1 77 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 647 0 0
"3609" "exp3" 1 78 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 484 25 1
"3609" "exp3" 1 79 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 587 29 1
"3609" "exp3" 1 80 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 593 31 1
"3609" "exp3" 1 81 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 963 21 1
"3609" "exp3" 1 82 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 507 28 1
"3609" "exp3" 1 83 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 845 29 1
"3609" "exp3" 1 84 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 535 20 1
"3609" "exp3" 1 85 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 576 33 1
"3609" "exp3" 1 86 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 609 0 0
"3609" "exp3" 1 87 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 865 0 0
"3609" "exp3" 1 88 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1274 0 0
"3609" "exp3" 1 89 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 622 36 1
"3609" "exp3" 1 90 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 487 0 0
"3609" "exp3" 1 91 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 592 0 0
"3609" "exp3" 1 92 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 517 30 1
"3609" "exp3" 1 93 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 589 0 0
"3609" "exp3" 1 94 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 528 6 1
"3609" "exp3" 1 95 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 2 1136 0 0
"3609" "exp3" 1 96 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 640 24 1
"3609" "exp3" 1 97 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 564 0 0
"3609" "exp3" 1 98 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1189 22 1
"3609" "exp3" 1 99 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 725 33 1
"3609" "exp3" 1 100 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 801 28 1
"3609" "exp3" 1 101 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 517 21 1
"3609" "exp3" 1 102 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 1352 0 0
"3609" "exp3" 1 103 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 1600 95 1
"3609" "exp3" 1 104 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1718 0 0
"3609" "exp3" 1 105 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 575 22 1
"3609" "exp3" 1 106 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 605 0 0
"3609" "exp3" 1 107 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 1908 0 0
"3609" "exp3" 1 108 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 727 0 0
"3609" "exp3" 1 109 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1266 0 0
"3609" "exp3" 1 110 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1144 11 1
"3609" "exp3" 1 111 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1566 0 0
"3609" "exp3" 1 112 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 2 2454 0 0
"3609" "exp3" 1 113 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 855 80 1
"3609" "exp3" 1 114 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 1488 31 1
"3609" "exp3" 1 115 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 1481 11 1
"3609" "exp3" 1 116 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1023 41 1
"3609" "exp3" 1 117 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 1207 70 1
"3609" "exp3" 1 118 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 2 945 0 0
"3609" "exp3" 1 119 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 2 1887 0 0
"3609" "exp3" 1 120 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 680 0 0
"3609" "exp3" 1 121 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1561 0 0
"3609" "exp3" 1 122 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1072 34 1
"3609" "exp3" 1 123 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 1 910 3 1
"3609" "exp3" 1 124 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 634 23 1
"3609" "exp3" 1 125 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1352 30 1
"3609" "exp3" 1 126 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 933 15 1
"3609" "exp3" 1 127 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 415 33 1
"3609" "exp3" 1 128 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 524 27 1
"3609" "exp3" 1 129 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 619 12 1
"3609" "exp3" 1 130 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 465 27 1
"3609" "exp3" 1 131 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 666 0 0
"3609" "exp3" 1 132 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 504 44 1
"3609" "exp3" 2 1 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 928 0 0
"3609" "exp3" 2 2 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 2 542 0 0
"3609" "exp3" 2 3 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 879 46 1
"3609" "exp3" 2 4 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 980 18 1
"3609" "exp3" 2 5 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 1433 0 0
"3609" "exp3" 2 6 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 625 0 0
"3609" "exp3" 2 7 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 2 506 62 1
"3609" "exp3" 2 8 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 1842 0 0
"3609" "exp3" 2 9 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1240 0 0
"3609" "exp3" 2 10 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 1734 0 0
"3609" "exp3" 2 11 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 599 13 1
"3609" "exp3" 2 12 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 1800 10 1
"3609" "exp3" 2 13 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 941 44 1
"3609" "exp3" 2 14 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 739 17 1
"3609" "exp3" 2 15 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 1 690 1 1
"3609" "exp3" 2 16 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1207 27 1
"3609" "exp3" 2 17 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 836 11 1
"3609" "exp3" 2 18 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 781 75 1
"3609" "exp3" 2 19 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 2 945 0 0
"3609" "exp3" 2 20 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 817 90 1
"3609" "exp3" 2 21 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1942 24 1
"3609" "exp3" 2 22 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 920 24 1
"3609" "exp3" 2 23 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 1 2027 4 1
"3609" "exp3" 2 24 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 2829 30 1
"3609" "exp3" 2 25 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1383 33 1
"3609" "exp3" 2 26 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 1 755 6 1
"3609" "exp3" 2 27 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 520 26 1
"3609" "exp3" 2 28 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 1 468 8 1
"3609" "exp3" 2 29 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 479 12 1
"3609" "exp3" 2 30 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 880 0 0
"3609" "exp3" 2 31 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 2 1292 0 0
"3609" "exp3" 2 32 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 1687 0 0
"3609" "exp3" 2 33 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 1226 30 1
"3609" "exp3" 2 34 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 640 20 1
"3609" "exp3" 2 35 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 623 44 1
"3609" "exp3" 2 36 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 714 19 1
"3609" "exp3" 2 37 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 587 0 0
"3609" "exp3" 2 38 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 702 0 0
"3609" "exp3" 2 39 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1066 0 0
"3609" "exp3" 2 40 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 2228 21 1
"3609" "exp3" 2 41 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1077 31 1
"3609" "exp3" 2 42 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 1370 23 1
"3609" "exp3" 2 43 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 652 22 1
"3609" "exp3" 2 44 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 789 26 1
"3609" "exp3" 2 45 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 471 36 1
"3609" "exp3" 2 46 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 490 28 1
"3609" "exp3" 2 47 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 532 26 1
"3609" "exp3" 2 48 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1018 45 1
"3609" "exp3" 2 49 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 604 21 1
"3609" "exp3" 2 50 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 654 36 1
"3609" "exp3" 2 51 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 602 0 0
"3609" "exp3" 2 52 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 591 30 1
"3609" "exp3" 2 53 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 670 21 1
"3609" "exp3" 2 54 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 557 0 0
"3609" "exp3" 2 55 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 1 476 5 1
"3609" "exp3" 2 56 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 739 34 1
"3609" "exp3" 2 57 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1018 31 1
"3609" "exp3" 2 58 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 615 0 0
"3609" "exp3" 2 59 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 2 784 0 0
"3609" "exp3" 2 60 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 2 1015 0 0
"3609" "exp3" 2 61 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1300 33 1
"3609" "exp3" 2 62 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 651 0 0
"3609" "exp3" 2 63 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 588 0 0
"3609" "exp3" 2 64 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 576 0 0
"3609" "exp3" 2 65 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 954 0 0
"3609" "exp3" 2 66 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 406 0 0
"3609" "exp3" 2 67 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 808 23 1
"3609" "exp3" 2 68 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 583 0 0
"3609" "exp3" 2 69 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 587 19 1
"3609" "exp3" 2 70 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 1 626 15 1
"3609" "exp3" 2 71 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 565 23 1
"3609" "exp3" 2 72 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 510 20 1
"3609" "exp3" 2 73 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1128 34 1
"3609" "exp3" 2 74 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1874 28 1
"3609" "exp3" 2 75 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 1 530 9 1
"3609" "exp3" 2 76 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 891 0 0
"3609" "exp3" 2 77 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 972 0 0
"3609" "exp3" 2 78 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 574 18 1
"3609" "exp3" 2 79 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 697 32 1
"3609" "exp3" 2 80 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 659 19 1
"3609" "exp3" 2 81 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 857 0 0
"3609" "exp3" 2 82 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 644 0 0
"3609" "exp3" 2 83 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 413 0 0
"3609" "exp3" 2 84 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 434 0 0
"3609" "exp3" 2 85 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 840 0 0
"3609" "exp3" 2 86 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 707 43 1
"3609" "exp3" 2 87 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 689 0 0
"3609" "exp3" 2 88 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 506 0 0
"3609" "exp3" 2 89 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 678 0 0
"3609" "exp3" 2 90 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 451 14 1
"3609" "exp3" 2 91 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 549 0 0
"3609" "exp3" 2 92 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 576 41 1
"3609" "exp3" 2 93 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 495 6 1
"3609" "exp3" 2 94 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 563 17 1
"3609" "exp3" 2 95 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 1 550 8 1
"3609" "exp3" 2 96 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 632 25 1
"3609" "exp3" 2 97 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 584 39 1
"3609" "exp3" 2 98 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 1548 0 0
"3609" "exp3" 2 99 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 569 0 0
"3609" "exp3" 2 100 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 395 0 0
"3609" "exp3" 2 101 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 463 43 1
"3609" "exp3" 2 102 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 538 20 1
"3609" "exp3" 2 103 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 510 0 0
"3609" "exp3" 2 104 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 453 0 0
"3609" "exp3" 2 105 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 429 0 0
"3609" "exp3" 2 106 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 604 0 0
"3609" "exp3" 2 107 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 467 47 1
"3609" "exp3" 2 108 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 583 21 1
"3609" "exp3" 2 109 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 506 28 1
"3609" "exp3" 2 110 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 519 31 1
"3609" "exp3" 2 111 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 902 33 1
"3609" "exp3" 2 112 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 2 874 0 0
"3609" "exp3" 2 113 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1171 0 0
"3609" "exp3" 2 114 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 881 20 1
"3609" "exp3" 2 115 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 1343 0 0
"3609" "exp3" 2 116 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 563 49 1
"3609" "exp3" 2 117 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 2 2026 0 0
"3609" "exp3" 2 118 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 947 45 1
"3609" "exp3" 2 119 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 692 24 1
"3609" "exp3" 2 120 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1317 29 1
"3609" "exp3" 2 121 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1095 12 1
"3609" "exp3" 2 122 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 590 29 1
"3609" "exp3" 2 123 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 872 0 0
"3609" "exp3" 2 124 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 405 34 1
"3609" "exp3" 2 125 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 1537 0 0
"3609" "exp3" 2 126 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 678 0 0
"3609" "exp3" 2 127 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 680 22 1
"3609" "exp3" 2 128 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 506 32 1
"3609" "exp3" 2 129 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 707 9 1
"3609" "exp3" 2 130 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 847 0 0
"3609" "exp3" 2 131 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 995 14 1
"3609" "exp3" 2 132 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 688 24 1
"3609" "exp3" 1 1 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 714 0 0
"3609" "exp3" 1 2 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 599 45 1
"3609" "exp3" 1 3 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 631 5 1
"3609" "exp3" 1 4 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 677 37 1
"3609" "exp3" 1 5 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 526 15 1
"3609" "exp3" 1 6 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 661 20 1
"3609" "exp3" 1 7 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 585 35 1
"3609" "exp3" 1 8 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 514 0 0
"3609" "exp3" 1 9 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 501 0 0
"3609" "exp3" 1 10 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 645 0 0
"3609" "exp3" 1 11 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 659 19 1
"3609" "exp3" 1 12 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 544 34 1
"3609" "exp3" 1 13 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 473 0 0
"3609" "exp3" 1 14 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1262 0 0
"3609" "exp3" 1 15 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 604 29 1
"3609" "exp3" 1 16 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 707 7 1
"3609" "exp3" 1 17 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 757 33 1
"3609" "exp3" 1 18 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 661 0 0
"3609" "exp3" 1 19 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 929 36 1
"3609" "exp3" 1 20 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 569 12 1
"3609" "exp3" 1 21 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 717 0 0
"3609" "exp3" 1 22 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1149 0 0
"3609" "exp3" 1 23 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1709 0 0
"3609" "exp3" 1 24 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 1523 24 1
"3609" "exp3" 1 25 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 1 768 8 1
"3609" "exp3" 1 26 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1057 0 0
"3609" "exp3" 1 27 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 995 26 1
"3609" "exp3" 1 28 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 767 22 1
"3609" "exp3" 1 29 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 820 33 1
"3609" "exp3" 1 30 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 732 0 0
"3609" "exp3" 1 31 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 1 834 4 1
"3609" "exp3" 1 32 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1053 48 1
"3609" "exp3" 1 33 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 3277 0 0
"3609" "exp3" 1 34 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 5175 17 1
"3609" "exp3" 1 35 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 684 24 1
"3609" "exp3" 1 36 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 691 32 1
"3609" "exp3" 1 37 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 516 24 1
"3609" "exp3" 1 38 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 560 0 0
"3609" "exp3" 1 39 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 567 11 1
"3609" "exp3" 1 40 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 681 33 1
"3609" "exp3" 1 41 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 1015 0 0
"3609" "exp3" 1 42 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1858 27 1
"3609" "exp3" 1 43 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1025 0 0
"3609" "exp3" 1 44 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1315 27 1
"3609" "exp3" 1 45 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 1 898 10 1
"3609" "exp3" 1 46 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 859 0 0
"3609" "exp3" 1 47 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 872 0 0
"3609" "exp3" 1 48 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 792 43 1
"3609" "exp3" 1 49 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1365 0 0
"3609" "exp3" 1 50 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1020 0 0
"3609" "exp3" 1 51 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1569 0 0
"3609" "exp3" 1 52 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 1 1687 33 1
"3609" "exp3" 1 53 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1028 0 0
"3609" "exp3" 1 54 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 893 32 1
"3609" "exp3" 1 55 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1159 0 0
"3609" "exp3" 1 56 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2203 47 1
"3609" "exp3" 1 57 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1272 13 1
"3609" "exp3" 1 58 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 2125 20 1
"3609" "exp3" 1 59 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1233 0 0
"3609" "exp3" 1 60 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 1260 0 0
"3609" "exp3" 1 61 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1544 18 1
"3609" "exp3" 1 62 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 837 26 1
"3609" "exp3" 1 63 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 677 0 0
"3609" "exp3" 1 64 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 861 11 1
"3609" "exp3" 1 65 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1494 25 1
"3609" "exp3" 1 66 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 2 795 51 1
"3609" "exp3" 1 67 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 736 0 0
"3609" "exp3" 1 68 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1020 17 1
"3609" "exp3" 1 69 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 1184 7 1
"3609" "exp3" 1 70 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 1803 34 1
"3609" "exp3" 1 71 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 2255 6 1
"3609" "exp3" 1 72 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1897 0 0
"3609" "exp3" 1 73 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1019 0 0
"3609" "exp3" 1 74 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1159 44 1
"3609" "exp3" 1 75 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 740 0 0
"3609" "exp3" 1 76 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 2 932 0 0
"3609" "exp3" 1 77 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 922 38 1
"3609" "exp3" 1 78 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1644 79 1
"3609" "exp3" 1 79 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1350 0 0
"3609" "exp3" 1 80 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1545 0 0
"3609" "exp3" 1 81 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1158 28 1
"3609" "exp3" 1 82 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1341 41 1
"3609" "exp3" 1 83 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1321 26 1
"3609" "exp3" 1 84 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1133 30 1
"3609" "exp3" 1 85 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 1528 0 0
"3609" "exp3" 1 86 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1593 45 1
"3609" "exp3" 1 87 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2043 17 1
"3609" "exp3" 1 88 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1614 21 1
"3609" "exp3" 1 89 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1266 0 0
"3609" "exp3" 1 90 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 1 1133 20 1
"3609" "exp3" 1 91 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1745 39 1
"3609" "exp3" 1 92 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 1629 9 1
"3609" "exp3" 1 93 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 3111 72 1
"3609" "exp3" 1 94 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1074 0 0
"3609" "exp3" 1 95 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 2 1298 0 0
"3609" "exp3" 1 96 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1429 16 1
"3609" "exp3" 1 97 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 725 15 1
"3609" "exp3" 1 98 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1531 0 0
"3609" "exp3" 1 99 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 744 14 1
"3609" "exp3" 1 100 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 942 21 1
"3609" "exp3" 1 101 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1131 0 0
"3609" "exp3" 1 102 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1832 31 1
"3609" "exp3" 1 103 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1296 18 1
"3609" "exp3" 1 104 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1268 0 0
"3609" "exp3" 1 105 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1405 0 0
"3609" "exp3" 1 106 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1382 27 1
"3609" "exp3" 1 107 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1272 26 1
"3609" "exp3" 1 108 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 2571 0 0
"3609" "exp3" 1 109 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1716 34 1
"3609" "exp3" 1 110 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 2121 0 0
"3609" "exp3" 1 111 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1972 0 0
"3609" "exp3" 1 112 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1341 0 0
"3609" "exp3" 1 113 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1900 25 1
"3609" "exp3" 1 114 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1153 0 0
"3609" "exp3" 1 115 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1355 31 1
"3609" "exp3" 1 116 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1970 29 1
"3609" "exp3" 1 117 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1299 0 0
"3609" "exp3" 1 118 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1794 72 1
"3609" "exp3" 1 119 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1980 76 1
"3609" "exp3" 1 120 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1166 69 1
"3609" "exp3" 1 121 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1506 83 1
"3609" "exp3" 1 122 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 970 35 1
"3609" "exp3" 1 123 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 2248 41 1
"3609" "exp3" 1 124 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 1190 0 0
"3609" "exp3" 1 125 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1073 0 0
"3609" "exp3" 1 126 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1438 70 1
"3609" "exp3" 1 127 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 1337 77 1
"3609" "exp3" 1 128 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 792 0 0
"3609" "exp3" 1 129 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1992 23 1
"3609" "exp3" 1 130 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 2 1694 0 0
"3609" "exp3" 1 131 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1010 0 0
"3609" "exp3" 1 132 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 499 32 1
"3609" "exp3" 2 1 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 1661 0 0
"3609" "exp3" 2 2 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1372 41 1
"3609" "exp3" 2 3 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1214 13 1
"3609" "exp3" 2 4 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1515 27 1
"3609" "exp3" 2 5 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 813 31 1
"3609" "exp3" 2 6 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1500 0 0
"3609" "exp3" 2 7 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 3599 0 0
"3609" "exp3" 2 8 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1303 41 1
"3609" "exp3" 2 9 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 1189 22 1
"3609" "exp3" 2 10 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1711 0 0
"3609" "exp3" 2 11 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 2038 26 1
"3609" "exp3" 2 12 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1232 18 1
"3609" "exp3" 2 13 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 2001 23 1
"3609" "exp3" 2 14 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1270 0 0
"3609" "exp3" 2 15 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 2 1593 71 1
"3609" "exp3" 2 16 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1256 45 1
"3609" "exp3" 2 17 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 1669 72 1
"3609" "exp3" 2 18 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 2141 28 1
"3609" "exp3" 2 19 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1537 0 0
"3609" "exp3" 2 20 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 1507 0 0
"3609" "exp3" 2 21 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1155 24 1
"3609" "exp3" 2 22 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 1 1802 5 1
"3609" "exp3" 2 23 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 2136 21 1
"3609" "exp3" 2 24 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1255 0 0
"3609" "exp3" 2 25 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1171 0 0
"3609" "exp3" 2 26 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 1610 0 0
"3609" "exp3" 2 27 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1162 23 1
"3609" "exp3" 2 28 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 547 26 1
"3609" "exp3" 2 29 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1569 28 1
"3609" "exp3" 2 30 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1600 0 0
"3609" "exp3" 2 31 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1318 0 0
"3609" "exp3" 2 32 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1674 0 0
"3609" "exp3" 2 33 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 1317 0 0
"3609" "exp3" 2 34 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1472 30 1
"3609" "exp3" 2 35 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1678 46 1
"3609" "exp3" 2 36 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1518 0 0
"3609" "exp3" 2 37 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 2281 84 1
"3609" "exp3" 2 38 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1938 18 1
"3609" "exp3" 2 39 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 2072 86 1
"3609" "exp3" 2 40 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 3726 39 1
"3609" "exp3" 2 41 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 2676 0 0
"3609" "exp3" 2 42 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1733 0 0
"3609" "exp3" 2 43 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1836 85 1
"3609" "exp3" 2 44 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 2299 22 1
"3609" "exp3" 2 45 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 3272 26 1
"3609" "exp3" 2 46 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 2454 0 0
"3609" "exp3" 2 47 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1144 0 0
"3609" "exp3" 2 48 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1420 35 1
"3609" "exp3" 2 49 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1121 0 0
"3609" "exp3" 2 50 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1918 0 0
"3609" "exp3" 2 51 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1358 39 1
"3609" "exp3" 2 52 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1318 0 0
"3609" "exp3" 2 53 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1651 0 0
"3609" "exp3" 2 54 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 2426 0 0
"3609" "exp3" 2 55 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1255 69 1
"3609" "exp3" 2 56 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 2 1268 0 0
"3609" "exp3" 2 57 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1365 0 0
"3609" "exp3" 2 58 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1564 29 1
"3609" "exp3" 2 59 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 2072 34 1
"3609" "exp3" 2 60 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1280 0 0
"3609" "exp3" 2 61 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1958 0 0
"3609" "exp3" 2 62 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1276 0 0
"3609" "exp3" 2 63 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 2 1191 0 0
"3609" "exp3" 2 64 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1554 0 0
"3609" "exp3" 2 65 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1167 97 1
"3609" "exp3" 2 66 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1095 0 0
"3609" "exp3" 2 67 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1187 0 0
"3609" "exp3" 2 68 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 2106 19 1
"3609" "exp3" 2 69 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 957 40 1
"3609" "exp3" 2 70 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1578 25 1
"3609" "exp3" 2 71 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 1029 36 1
"3609" "exp3" 2 72 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1910 0 0
"3609" "exp3" 2 73 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1594 0 0
"3609" "exp3" 2 74 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 984 42 1
"3609" "exp3" 2 75 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1168 79 1
"3609" "exp3" 2 76 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 2 1348 67 1
"3609" "exp3" 2 77 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 797 0 0
"3609" "exp3" 2 78 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 819 0 0
"3609" "exp3" 2 79 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1177 49 1
"3609" "exp3" 2 80 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1401 0 0
"3609" "exp3" 2 81 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1506 0 0
"3609" "exp3" 2 82 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 1438 28 1
"3609" "exp3" 2 83 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1380 67 1
"3609" "exp3" 2 84 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1685 17 1
"3609" "exp3" 2 85 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1844 75 1
"3609" "exp3" 2 86 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 2 1742 0 0
"3609" "exp3" 2 87 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2033 43 1
"3609" "exp3" 2 88 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 2 1462 0 0
"3609" "exp3" 2 89 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1622 0 0
"3609" "exp3" 2 90 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1442 30 1
"3609" "exp3" 2 91 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 3077 34 1
"3609" "exp3" 2 92 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1298 0 0
"3609" "exp3" 2 93 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1719 0 0
"3609" "exp3" 2 94 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1470 37 1
"3609" "exp3" 2 95 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1276 0 0
"3609" "exp3" 2 96 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1255 16 1
"3609" "exp3" 2 97 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1347 27 1
"3609" "exp3" 2 98 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1292 45 1
"3609" "exp3" 2 99 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1193 0 0
"3609" "exp3" 2 100 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1291 0 0
"3609" "exp3" 2 101 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 878 67 1
"3609" "exp3" 2 102 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 987 0 0
"3609" "exp3" 2 103 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1328 32 1
"3609" "exp3" 2 104 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1098 74 1
"3609" "exp3" 2 105 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 1923 0 0
"3609" "exp3" 2 106 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 836 82 1
"3609" "exp3" 2 107 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1016 0 0
"3609" "exp3" 2 108 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 719 0 0
"3609" "exp3" 2 109 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 2 1179 80 1
"3609" "exp3" 2 110 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1474 36 1
"3609" "exp3" 2 111 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 951 43 1
"3609" "exp3" 2 112 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 672 68 1
"3609" "exp3" 2 113 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 666 88 1
"3609" "exp3" 2 114 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 966 30 1
"3609" "exp3" 2 115 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1040 34 1
"3609" "exp3" 2 116 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 885 0 0
"3609" "exp3" 2 117 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1541 0 0
"3609" "exp3" 2 118 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 2156 36 1
"3609" "exp3" 2 119 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1065 14 1
"3609" "exp3" 2 120 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 984 0 0
"3609" "exp3" 2 121 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 1 1542 32 1
"3609" "exp3" 2 122 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1531 0 0
"3609" "exp3" 2 123 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1847 13 1
"3609" "exp3" 2 124 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2283 65 1
"3609" "exp3" 2 125 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1302 0 0
"3609" "exp3" 2 126 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1287 0 0
"3609" "exp3" 2 127 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1203 90 1
"3609" "exp3" 2 128 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 933 0 0
"3609" "exp3" 2 129 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1495 0 0
"3609" "exp3" 2 130 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1572 0 0
"3609" "exp3" 2 131 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1221 40 1
"3609" "exp3" 2 132 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1374 0 0
"3609" "exp3" 1 1 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 888 30 1
"3609" "exp3" 1 2 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 541 28 1
"3609" "exp3" 1 3 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 633 31 1
"3609" "exp3" 1 4 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 698 0 0
"3609" "exp3" 1 5 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 729 11 1
"3609" "exp3" 1 6 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 663 0 0
"3609" "exp3" 1 7 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1581 32 1
"3609" "exp3" 1 8 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 789 5 1
"3609" "exp3" 1 9 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 856 35 1
"3609" "exp3" 1 10 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 2 987 0 0
"3609" "exp3" 1 11 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1254 0 0
"3609" "exp3" 1 12 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 2 1813 0 0
"3609" "exp3" 1 13 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 732 0 0
"3609" "exp3" 1 14 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 1116 0 0
"3609" "exp3" 1 15 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 742 0 0
"3609" "exp3" 1 16 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1116 0 0
"3609" "exp3" 1 17 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 2 1462 79 1
"3609" "exp3" 1 18 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1428 0 0
"3609" "exp3" 1 19 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 785 43 1
"3609" "exp3" 1 20 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 1999 0 0
"3609" "exp3" 1 21 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1448 20 1
"3609" "exp3" 1 22 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1358 15 1
"3609" "exp3" 1 23 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1466 18 1
"3609" "exp3" 1 24 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 735 0 0
"3609" "exp3" 1 25 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 776 23 1
"3609" "exp3" 1 26 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 926 0 0
"3609" "exp3" 1 27 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 2 1270 56 1
"3609" "exp3" 1 28 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 783 0 0
"3609" "exp3" 1 29 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 1 579 13 1
"3609" "exp3" 1 30 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 623 27 1
"3609" "exp3" 1 31 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 958 18 1
"3609" "exp3" 1 32 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 639 26 1
"3609" "exp3" 1 33 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1223 0 0
"3609" "exp3" 1 34 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 1 1038 9 1
"3609" "exp3" 1 35 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 631 0 0
"3609" "exp3" 1 36 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1122 43 1
"3609" "exp3" 1 37 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 687 47 1
"3609" "exp3" 1 38 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 1483 0 0
"3609" "exp3" 1 39 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 999 0 0
"3609" "exp3" 1 40 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1042 23 1
"3609" "exp3" 1 41 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 694 30 1
"3609" "exp3" 1 42 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 2388 1 1
"3609" "exp3" 1 43 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 2 1574 0 0
"3609" "exp3" 1 44 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 1099 30 1
"3609" "exp3" 1 45 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 1 761 0 0
"3609" "exp3" 1 46 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 546 0 0
"3609" "exp3" 1 47 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 913 31 1
"3609" "exp3" 1 48 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 842 35 1
"3609" "exp3" 1 49 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 2104 0 0
"3609" "exp3" 1 50 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 899 23 1
"3609" "exp3" 1 51 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 720 12 1
"3609" "exp3" 1 52 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 639 46 1
"3609" "exp3" 1 53 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 583 19 1
"3609" "exp3" 1 54 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 649 0 0
"3609" "exp3" 1 55 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 606 22 1
"3609" "exp3" 1 56 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 689 16 1
"3609" "exp3" 1 57 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 565 33 1
"3609" "exp3" 1 58 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 566 0 0
"3609" "exp3" 1 59 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 576 10 1
"3609" "exp3" 1 60 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 1 478 0 0
"3609" "exp3" 1 61 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 573 6 1
"3609" "exp3" 1 62 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 751 17 1
"3609" "exp3" 1 63 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 463 0 0
"3609" "exp3" 1 64 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 540 0 0
"3609" "exp3" 1 65 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 398 18 1
"3609" "exp3" 1 66 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 1254 0 0
"3609" "exp3" 1 67 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 2 748 66 1
"3609" "exp3" 1 68 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 2 1004 51 1
"3609" "exp3" 1 69 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 666 76 1
"3609" "exp3" 1 70 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1132 0 0
"3609" "exp3" 1 71 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 867 25 1
"3609" "exp3" 1 72 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 668 45 1
"3609" "exp3" 1 73 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 584 26 1
"3609" "exp3" 1 74 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 481 21 1
"3609" "exp3" 1 75 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 607 6 1
"3609" "exp3" 1 76 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1384 12 1
"3609" "exp3" 1 77 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 822 9 1
"3609" "exp3" 1 78 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1512 20 1
"3609" "exp3" 1 79 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1487 0 0
"3609" "exp3" 1 80 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1269 24 1
"3609" "exp3" 1 81 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 655 28 1
"3609" "exp3" 1 82 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 1 686 29 1
"3609" "exp3" 1 83 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 534 37 1
"3609" "exp3" 1 84 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 636 17 1
"3609" "exp3" 1 85 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 515 0 0
"3609" "exp3" 1 86 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 437 21 1
"3609" "exp3" 1 87 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 584 0 0
"3609" "exp3" 1 88 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 644 0 0
"3609" "exp3" 1 89 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 697 29 1
"3609" "exp3" 1 90 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 931 40 1
"3609" "exp3" 1 91 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 528 0 0
"3609" "exp3" 1 92 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 535 39 1
"3609" "exp3" 1 93 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 590 33 1
"3609" "exp3" 1 94 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 538 19 1
"3609" "exp3" 1 95 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 1 744 5 1
"3609" "exp3" 1 96 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 2 895 0 0
"3609" "exp3" 1 97 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1129 0 0
"3609" "exp3" 1 98 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1253 0 0
"3609" "exp3" 1 99 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 2 984 0 0
"3609" "exp3" 1 100 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1024 0 0
"3609" "exp3" 1 101 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 1624 0 0
"3609" "exp3" 1 102 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 829 4 1
"3609" "exp3" 1 103 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1249 0 0
"3609" "exp3" 1 104 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 2 1349 0 0
"3609" "exp3" 1 105 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 1303 0 0
"3609" "exp3" 1 106 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 1225 0 0
"3609" "exp3" 1 107 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 1168 0 0
"3609" "exp3" 1 108 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1355 7 1
"3609" "exp3" 1 109 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1489 32 1
"3609" "exp3" 1 110 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 871 0 0
"3609" "exp3" 1 111 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1012 0 0
"3609" "exp3" 1 112 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1174 27 1
"3609" "exp3" 1 113 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1013 0 0
"3609" "exp3" 1 114 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 832 0 0
"3609" "exp3" 1 115 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 2 783 0 0
"3609" "exp3" 1 116 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 704 0 0
"3609" "exp3" 1 117 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 817 0 0
"3609" "exp3" 1 118 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 1 1095 8 1
"3609" "exp3" 1 119 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 609 15 1
"3609" "exp3" 1 120 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 592 40 1
"3609" "exp3" 1 121 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 609 0 0
"3609" "exp3" 1 122 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 676 63 1
"3609" "exp3" 1 123 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 1 813 10 1
"3609" "exp3" 1 124 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1465 0 0
"3609" "exp3" 1 125 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 2 1198 66 1
"3609" "exp3" 1 126 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 866 8 1
"3609" "exp3" 1 127 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1122 0 0
"3609" "exp3" 1 128 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 985 13 1
"3609" "exp3" 1 129 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 725 26 1
"3609" "exp3" 1 130 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 710 0 0
"3609" "exp3" 1 131 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 2 1021 0 0
"3609" "exp3" 1 132 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 757 0 0
"3609" "exp3" 2 1 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 923 21 1
"3609" "exp3" 2 2 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 742 26 1
"3609" "exp3" 2 3 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 773 28 1
"3609" "exp3" 2 4 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1102 0 0
"3609" "exp3" 2 5 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1092 0 0
"3609" "exp3" 2 6 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 743 0 0
"3609" "exp3" 2 7 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 813 70 1
"3609" "exp3" 2 8 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 835 0 0
"3609" "exp3" 2 9 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 850 0 0
"3609" "exp3" 2 10 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 872 0 0
"3609" "exp3" 2 11 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 859 22 1
"3609" "exp3" 2 12 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 1030 12 1
"3609" "exp3" 2 13 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 666 0 0
"3609" "exp3" 2 14 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 673 0 0
"3609" "exp3" 2 15 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 635 0 0
"3609" "exp3" 2 16 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 762 0 0
"3609" "exp3" 2 17 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 750 0 0
"3609" "exp3" 2 18 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 674 49 1
"3609" "exp3" 2 19 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 764 0 0
"3609" "exp3" 2 20 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 690 0 0
"3609" "exp3" 2 21 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 741 27 1
"3609" "exp3" 2 22 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1503 0 0
"3609" "exp3" 2 23 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 2 961 65 1
"3609" "exp3" 2 24 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 2 965 0 0
"3609" "exp3" 2 25 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 965 29 1
"3609" "exp3" 2 26 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 748 76 1
"3609" "exp3" 2 27 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1290 39 1
"3609" "exp3" 2 28 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 603 14 1
"3609" "exp3" 2 29 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 846 32 1
"3609" "exp3" 2 30 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 736 13 1
"3609" "exp3" 2 31 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 1 598 0 0
"3609" "exp3" 2 32 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 813 16 1
"3609" "exp3" 2 33 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 610 37 1
"3609" "exp3" 2 34 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 500 42 1
"3609" "exp3" 2 35 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 528 32 1
"3609" "exp3" 2 36 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 1 737 1 1
"3609" "exp3" 2 37 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 1 755 25 1
"3609" "exp3" 2 38 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 736 22 1
"3609" "exp3" 2 39 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 607 34 1
"3609" "exp3" 2 40 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 1 554 29 1
"3609" "exp3" 2 41 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 1 440 0 0
"3609" "exp3" 2 42 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 650 11 1
"3609" "exp3" 2 43 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 513 40 1
"3609" "exp3" 2 44 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1184 45 1
"3609" "exp3" 2 45 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 775 0 0
"3609" "exp3" 2 46 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 698 69 1
"3609" "exp3" 2 47 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 2 585 0 0
"3609" "exp3" 2 48 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 2 978 0 0
"3609" "exp3" 2 49 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 961 19 1
"3609" "exp3" 2 50 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1874 0 0
"3609" "exp3" 2 51 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1422 0 0
"3609" "exp3" 2 52 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 2 1042 0 0
"3609" "exp3" 2 53 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 2 700 67 1
"3609" "exp3" 2 54 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 623 33 1
"3609" "exp3" 2 55 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 2 720 59 1
"3609" "exp3" 2 56 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 774 0 0
"3609" "exp3" 2 57 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 945 34 1
"3609" "exp3" 2 58 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 817 15 1
"3609" "exp3" 2 59 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 765 42 1
"3609" "exp3" 2 60 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1125 0 0
"3609" "exp3" 2 61 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 685 27 1
"3609" "exp3" 2 62 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 907 20 1
"3609" "exp3" 2 63 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 1 968 0 0
"3609" "exp3" 2 64 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1784 18 1
"3609" "exp3" 2 65 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 1071 18 1
"3609" "exp3" 2 66 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 1 1929 6 1
"3609" "exp3" 2 67 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 1 690 4 1
"3609" "exp3" 2 68 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 2 922 0 0
"3609" "exp3" 2 69 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 615 31 1
"3609" "exp3" 2 70 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 548 0 0
"3609" "exp3" 2 71 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 2 969 0 0
"3609" "exp3" 2 72 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1211 0 0
"3609" "exp3" 2 73 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1131 0 0
"3609" "exp3" 2 74 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 1 1449 7 1
"3609" "exp3" 2 75 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 2 1442 67 1
"3609" "exp3" 2 76 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 722 9 1
"3609" "exp3" 2 77 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1126 0 0
"3609" "exp3" 2 78 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 587 20 1
"3609" "exp3" 2 79 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1240 0 0
"3609" "exp3" 2 80 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 1 639 6 1
"3609" "exp3" 2 81 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 686 44 1
"3609" "exp3" 2 82 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 541 27 1
"3609" "exp3" 2 83 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 675 37 1
"3609" "exp3" 2 84 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 1 796 3 1
"3609" "exp3" 2 85 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 2 1690 0 0
"3609" "exp3" 2 86 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 2 1176 69 1
"3609" "exp3" 2 87 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 751 19 1
"3609" "exp3" 2 88 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 800 18 1
"3609" "exp3" 2 89 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 542 23 1
"3609" "exp3" 2 90 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 689 35 1
"3609" "exp3" 2 91 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 820 14 1
"3609" "exp3" 2 92 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 578 30 1
"3609" "exp3" 2 93 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 586 14 1
"3609" "exp3" 2 94 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 2 1289 56 1
"3609" "exp3" 2 95 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1135 74 1
"3609" "exp3" 2 96 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 856 0 0
"3609" "exp3" 2 97 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 900 0 0
"3609" "exp3" 2 98 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 2 964 62 1
"3609" "exp3" 2 99 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 2 727 0 0
"3609" "exp3" 2 100 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 884 0 0
"3609" "exp3" 2 101 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 2 676 0 0
"3609" "exp3" 2 102 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1201 21 1
"3609" "exp3" 2 103 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 2 850 0 0
"3609" "exp3" 2 104 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 2 1437 61 1
"3609" "exp3" 2 105 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 2 700 0 0
"3609" "exp3" 2 106 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 573 0 0
"3609" "exp3" 2 107 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 2 601 0 0
"3609" "exp3" 2 108 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 1 1101 10 1
"3609" "exp3" 2 109 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 1 1263 5 1
"3609" "exp3" 2 110 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 774 68 1
"3609" "exp3" 2 111 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 987 40 1
"3609" "exp3" 2 112 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 720 23 1
"3609" "exp3" 2 113 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 2 790 0 0
"3609" "exp3" 2 114 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 1 974 2 1
"3609" "exp3" 2 115 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 665 89 1
"3609" "exp3" 2 116 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 2 576 0 0
"3609" "exp3" 2 117 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 671 0 0
"3609" "exp3" 2 118 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 914 76 1
"3609" "exp3" 2 119 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 743 0 0
"3609" "exp3" 2 120 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1258 0 0
"3609" "exp3" 2 121 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 845 17 1
"3609" "exp3" 2 122 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 2 767 0 0
"3609" "exp3" 2 123 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 570 30 1
"3609" "exp3" 2 124 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 796 0 0
"3609" "exp3" 2 125 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 686 0 0
"3609" "exp3" 2 126 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1014 15 1
"3609" "exp3" 2 127 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 1 816 7 1
"3609" "exp3" 2 128 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 2 1032 0 0
"3609" "exp3" 2 129 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 967 0 0
"3609" "exp3" 2 130 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1020 0 0
"3609" "exp3" 2 131 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 2 1198 0 0
"3609" "exp3" 2 132 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1989 0 0
"3609" "exp3" 1 1 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 724 18 1
"3609" "exp3" 1 2 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 781 40 1
"3609" "exp3" 1 3 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 750 0 0
"3609" "exp3" 1 4 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1940 0 0
"3609" "exp3" 1 5 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 2238 15 1
"3609" "exp3" 1 6 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 2938 20 1
"3609" "exp3" 1 7 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 1 937 6 1
"3609" "exp3" 1 8 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1891 0 0
"3609" "exp3" 1 9 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1764 26 1
"3609" "exp3" 1 10 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 1 1499 2 1
"3609" "exp3" 1 11 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 848 0 0
"3609" "exp3" 1 12 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 965 0 0
"3609" "exp3" 1 13 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 1136 0 0
"3609" "exp3" 1 14 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1287 26 1
"3609" "exp3" 1 15 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 1 804 7 1
"3609" "exp3" 1 16 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 924 0 0
"3609" "exp3" 1 17 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1298 0 0
"3609" "exp3" 1 18 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1522 0 0
"3609" "exp3" 1 19 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 2871 16 1
"3609" "exp3" 1 20 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1052 0 0
"3609" "exp3" 1 21 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1468 0 0
"3609" "exp3" 1 22 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1685 0 0
"3609" "exp3" 1 23 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 937 0 0
"3609" "exp3" 1 24 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 2 1054 0 0
"3609" "exp3" 1 25 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1790 0 0
"3609" "exp3" 1 26 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1187 28 1
"3609" "exp3" 1 27 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1543 29 1
"3609" "exp3" 1 28 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 802 0 0
"3609" "exp3" 1 29 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 2 1672 0 0
"3609" "exp3" 1 30 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1134 32 1
"3609" "exp3" 1 31 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 776 0 0
"3609" "exp3" 1 32 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 1544 26 1
"3609" "exp3" 1 33 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 784 0 0
"3609" "exp3" 1 34 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 1440 0 0
"3609" "exp3" 1 35 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 709 58 1
"3609" "exp3" 1 36 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 1304 0 0
"3609" "exp3" 1 37 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 1508 0 0
"3609" "exp3" 1 38 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1098 42 1
"3609" "exp3" 1 39 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1295 23 1
"3609" "exp3" 1 40 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1191 0 0
"3609" "exp3" 1 41 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1007 0 0
"3609" "exp3" 1 42 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 2331 0 0
"3609" "exp3" 1 43 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 2279 22 1
"3609" "exp3" 1 44 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 2 1473 0 0
"3609" "exp3" 1 45 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 2 1322 0 0
"3609" "exp3" 1 46 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 2 1460 60 1
"3609" "exp3" 1 47 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 2095 0 0
"3609" "exp3" 1 48 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1969 0 0
"3609" "exp3" 1 49 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 845 0 0
"3609" "exp3" 1 50 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1180 0 0
"3609" "exp3" 1 51 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 661 17 1
"3609" "exp3" 1 52 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 1 1075 14 1
"3609" "exp3" 1 53 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 1 669 17 1
"3609" "exp3" 1 54 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1208 21 1
"3609" "exp3" 1 55 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 1649 13 1
"3609" "exp3" 1 56 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 2433 0 0
"3609" "exp3" 1 57 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1368 31 1
"3609" "exp3" 1 58 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1335 0 0
"3609" "exp3" 1 59 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 1941 0 0
"3609" "exp3" 1 60 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 2 1129 0 0
"3609" "exp3" 1 61 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1046 20 1
"3609" "exp3" 1 62 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 778 16 1
"3609" "exp3" 1 63 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1422 0 0
"3609" "exp3" 1 64 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1635 0 0
"3609" "exp3" 1 65 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1862 0 0
"3609" "exp3" 1 66 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1420 0 0
"3609" "exp3" 1 67 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 1152 0 0
"3609" "exp3" 1 68 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 976 38 1
"3609" "exp3" 1 69 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 861 0 0
"3609" "exp3" 1 70 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1942 31 1
"3609" "exp3" 1 71 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1196 30 1
"3609" "exp3" 1 72 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 994 0 0
"3609" "exp3" 1 73 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 750 77 1
"3609" "exp3" 1 74 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 941 47 1
"3609" "exp3" 1 75 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1369 0 0
"3609" "exp3" 1 76 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 861 0 0
"3609" "exp3" 1 77 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 2929 0 0
"3609" "exp3" 1 78 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1195 83 1
"3609" "exp3" 1 79 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1727 25 1
"3609" "exp3" 1 80 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1203 30 1
"3609" "exp3" 1 81 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 919 0 0
"3609" "exp3" 1 82 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 858 0 0
"3609" "exp3" 1 83 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 843 27 1
"3609" "exp3" 1 84 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 853 0 0
"3609" "exp3" 1 85 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 568 29 1
"3609" "exp3" 1 86 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 1 875 13 1
"3609" "exp3" 1 87 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 710 0 0
"3609" "exp3" 1 88 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 973 0 0
"3609" "exp3" 1 89 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 1055 12 1
"3609" "exp3" 1 90 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1249 44 1
"3609" "exp3" 1 91 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1186 0 0
"3609" "exp3" 1 92 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1014 0 0
"3609" "exp3" 1 93 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 1 1336 18 1
"3609" "exp3" 1 94 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 663 0 0
"3609" "exp3" 1 95 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 875 24 1
"3609" "exp3" 1 96 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 682 39 1
"3609" "exp3" 1 97 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 2 596 0 0
"3609" "exp3" 1 98 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 991 0 0
"3609" "exp3" 1 99 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 821 0 0
"3609" "exp3" 1 100 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 787 0 0
"3609" "exp3" 1 101 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 839 43 1
"3609" "exp3" 1 102 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 724 0 0
"3609" "exp3" 1 103 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1279 0 0
"3609" "exp3" 1 104 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 825 0 0
"3609" "exp3" 1 105 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1107 27 1
"3609" "exp3" 1 106 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 748 0 0
"3609" "exp3" 1 107 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 1194 0 0
"3609" "exp3" 1 108 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 714 0 0
"3609" "exp3" 1 109 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 651 28 1
"3609" "exp3" 1 110 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 1298 0 0
"3609" "exp3" 1 111 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1043 0 0
"3609" "exp3" 1 112 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 2615 0 0
"3609" "exp3" 1 113 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 967 11 1
"3609" "exp3" 1 114 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 900 35 1
"3609" "exp3" 1 115 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1726 0 0
"3609" "exp3" 1 116 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1056 0 0
"3609" "exp3" 1 117 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 1752 31 1
"3609" "exp3" 1 118 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 932 0 0
"3609" "exp3" 1 119 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 686 26 1
"3609" "exp3" 1 120 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 1514 80 1
"3609" "exp3" 1 121 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 882 0 0
"3609" "exp3" 1 122 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 2042 90 1
"3609" "exp3" 1 123 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1145 19 1
"3609" "exp3" 1 124 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 1604 0 0
"3609" "exp3" 1 125 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 584 19 1
"3609" "exp3" 1 126 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 937 41 1
"3609" "exp3" 1 127 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 715 32 1
"3609" "exp3" 1 128 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1598 0 0
"3609" "exp3" 1 129 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 1 1403 27 1
"3609" "exp3" 1 130 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 1505 0 0
"3609" "exp3" 1 131 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 2 1815 0 0
"3609" "exp3" 1 132 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 1492 24 1
"3609" "exp3" 2 1 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 1169 39 1
"3609" "exp3" 2 2 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 901 20 1
"3609" "exp3" 2 3 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1128 0 0
"3609" "exp3" 2 4 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1076 33 1
"3609" "exp3" 2 5 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1267 0 0
"3609" "exp3" 2 6 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 883 30 1
"3609" "exp3" 2 7 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 1 509 23 1
"3609" "exp3" 2 8 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1017 0 0
"3609" "exp3" 2 9 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 771 0 0
"3609" "exp3" 2 10 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 752 0 0
"3609" "exp3" 2 11 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 940 0 0
"3609" "exp3" 2 12 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 716 0 0
"3609" "exp3" 2 13 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 1534 0 0
"3609" "exp3" 2 14 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 1670 9 1
"3609" "exp3" 2 15 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 955 25 1
"3609" "exp3" 2 16 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 1 655 22 1
"3609" "exp3" 2 17 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 1 1387 24 1
"3609" "exp3" 2 18 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1055 42 1
"3609" "exp3" 2 19 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 2092 24 1
"3609" "exp3" 2 20 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1205 25 1
"3609" "exp3" 2 21 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 1 969 34 1
"3609" "exp3" 2 22 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 2 741 61 1
"3609" "exp3" 2 23 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1239 34 1
"3609" "exp3" 2 24 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 878 19 1
"3609" "exp3" 2 25 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 713 47 1
"3609" "exp3" 2 26 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1266 19 1
"3609" "exp3" 2 27 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 913 40 1
"3609" "exp3" 2 28 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 785 0 0
"3609" "exp3" 2 29 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 690 30 1
"3609" "exp3" 2 30 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 787 0 0
"3609" "exp3" 2 31 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 562 44 1
"3609" "exp3" 2 32 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 710 21 1
"3609" "exp3" 2 33 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 807 46 1
"3609" "exp3" 2 34 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1184 20 1
"3609" "exp3" 2 35 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1520 26 1
"3609" "exp3" 2 36 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1202 0 0
"3609" "exp3" 2 37 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 1 2476 4 1
"3609" "exp3" 2 38 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 1 917 0 0
"3609" "exp3" 2 39 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 784 21 1
"3609" "exp3" 2 40 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 2228 14 1
"3609" "exp3" 2 41 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 544 23 1
"3609" "exp3" 2 42 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1048 23 1
"3609" "exp3" 2 43 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 971 29 1
"3609" "exp3" 2 44 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 1 675 26 1
"3609" "exp3" 2 45 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 1 814 0 0
"3609" "exp3" 2 46 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1013 0 0
"3609" "exp3" 2 47 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 751 24 1
"3609" "exp3" 2 48 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1068 18 1
"3609" "exp3" 2 49 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 811 0 0
"3609" "exp3" 2 50 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 742 0 0
"3609" "exp3" 2 51 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 1057 35 1
"3609" "exp3" 2 52 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 753 36 1
"3609" "exp3" 2 53 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 1 1281 35 1
"3609" "exp3" 2 54 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 2837 0 0
"3609" "exp3" 2 55 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 906 0 0
"3609" "exp3" 2 56 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 1129 0 0
"3609" "exp3" 2 57 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1276 0 0
"3609" "exp3" 2 58 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1776 0 0
"3609" "exp3" 2 59 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 1 1399 16 1
"3609" "exp3" 2 60 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2673 37 1
"3609" "exp3" 2 61 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 2 3479 62 1
"3609" "exp3" 2 62 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 4305 31 1
"3609" "exp3" 2 63 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1685 21 1
"3609" "exp3" 2 64 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1328 83 1
"3609" "exp3" 2 65 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 1768 28 1
"3609" "exp3" 2 66 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 2643 35 1
"3609" "exp3" 2 67 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1862 0 0
"3609" "exp3" 2 68 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 998 0 0
"3609" "exp3" 2 69 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1406 37 1
"3609" "exp3" 2 70 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 707 16 1
"3609" "exp3" 2 71 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 732 30 1
"3609" "exp3" 2 72 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1248 0 0
"3609" "exp3" 2 73 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 696 19 1
"3609" "exp3" 2 74 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1860 0 0
"3609" "exp3" 2 75 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 1 771 33 1
"3609" "exp3" 2 76 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 985 86 1
"3609" "exp3" 2 77 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 1 1126 0 0
"3609" "exp3" 2 78 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 1517 68 1
"3609" "exp3" 2 79 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 1 1466 31 1
"3609" "exp3" 2 80 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 2104 28 1
"3609" "exp3" 2 81 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 674 0 0
"3609" "exp3" 2 82 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 852 45 1
"3609" "exp3" 2 83 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 752 36 1
"3609" "exp3" 2 84 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 852 0 0
"3609" "exp3" 2 85 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 623 26 1
"3609" "exp3" 2 86 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 616 27 1
"3609" "exp3" 2 87 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1094 0 0
"3609" "exp3" 2 88 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 701 0 0
"3609" "exp3" 2 89 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 2 585 0 0
"3609" "exp3" 2 90 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 2 749 0 0
"3609" "exp3" 2 91 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 666 43 1
"3609" "exp3" 2 92 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1381 0 0
"3609" "exp3" 2 93 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 2 1080 0 0
"3609" "exp3" 2 94 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 2 903 0 0
"3609" "exp3" 2 95 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 855 32 1
"3609" "exp3" 2 96 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 564 0 0
"3609" "exp3" 2 97 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 873 0 0
"3609" "exp3" 2 98 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 524 27 1
"3609" "exp3" 2 99 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 683 0 0
"3609" "exp3" 2 100 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1078 0 0
"3609" "exp3" 2 101 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 910 83 1
"3609" "exp3" 2 102 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 731 0 0
"3609" "exp3" 2 103 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 760 82 1
"3609" "exp3" 2 104 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 1 816 9 1
"3609" "exp3" 2 105 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 883 42 1
"3609" "exp3" 2 106 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 1 641 28 1
"3609" "exp3" 2 107 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 978 0 0
"3609" "exp3" 2 108 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 615 24 1
"3609" "exp3" 2 109 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 1 674 32 1
"3609" "exp3" 2 110 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 2 1117 0 0
"3609" "exp3" 2 111 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 847 0 0
"3609" "exp3" 2 112 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 749 0 0
"3609" "exp3" 2 113 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 929 0 0
"3609" "exp3" 2 114 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 1 1260 29 1
"3609" "exp3" 2 115 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 709 13 1
"3609" "exp3" 2 116 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 851 25 1
"3609" "exp3" 2 117 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 892 0 0
"3609" "exp3" 2 118 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 896 20 1
"3609" "exp3" 2 119 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 906 49 1
"3609" "exp3" 2 120 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 1 985 5 1
"3609" "exp3" 2 121 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 1046 37 1
"3609" "exp3" 2 122 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 1 726 0 0
"3609" "exp3" 2 123 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 1 984 5 1
"3609" "exp3" 2 124 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1083 22 1
"3609" "exp3" 2 125 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 1 924 0 0
"3609" "exp3" 2 126 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 698 34 1
"3609" "exp3" 2 127 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1174 0 0
"3609" "exp3" 2 128 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1152 43 1
"3609" "exp3" 2 129 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1079 23 1
"3609" "exp3" 2 130 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 738 0 0
"3609" "exp3" 2 131 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1077 25 1
"3609" "exp3" 2 132 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 1 3517 11 1
"3610" "exp3" 1 1 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 1 13601 18 1
"3610" "exp3" 1 2 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 2976 19 1
"3610" "exp3" 1 3 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 2363 23 1
"3610" "exp3" 1 4 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 3245 0 0
"3610" "exp3" 1 5 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 5635 0 0
"3610" "exp3" 1 6 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 3590 0 0
"3610" "exp3" 1 7 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 2604 0 0
"3610" "exp3" 1 8 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 1 1500 24 1
"3610" "exp3" 1 9 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 2078 36 1
"3610" "exp3" 1 10 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 3153 0 0
"3610" "exp3" 1 11 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1574 26 1
"3610" "exp3" 1 12 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 2089 24 1
"3610" "exp3" 1 13 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 3955 63 1
"3610" "exp3" 1 14 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 3096 17 1
"3610" "exp3" 1 15 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1766 0 0
"3610" "exp3" 1 16 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1621 16 1
"3610" "exp3" 1 17 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 3034 0 0
"3610" "exp3" 1 18 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 3957 37 1
"3610" "exp3" 1 19 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1768 0 0
"3610" "exp3" 1 20 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 1 3893 31 1
"3610" "exp3" 1 21 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1542 18 1
"3610" "exp3" 1 22 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1892 71 1
"3610" "exp3" 1 23 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1383 25 1
"3610" "exp3" 1 24 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1022 14 1
"3610" "exp3" 1 25 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1608 0 0
"3610" "exp3" 1 26 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1290 28 1
"3610" "exp3" 1 27 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1303 0 0
"3610" "exp3" 1 28 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1309 0 0
"3610" "exp3" 1 29 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 2134 0 0
"3610" "exp3" 1 30 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 2515 0 0
"3610" "exp3" 1 31 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 1 4136 11 1
"3610" "exp3" 1 32 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1957 19 1
"3610" "exp3" 1 33 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1190 0 0
"3610" "exp3" 1 34 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 3864 35 1
"3610" "exp3" 1 35 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 3724 24 1
"3610" "exp3" 1 36 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1302 0 0
"3610" "exp3" 1 37 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 2540 0 0
"3610" "exp3" 1 38 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1244 15 1
"3610" "exp3" 1 39 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 1 1415 26 1
"3610" "exp3" 1 40 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 5304 43 1
"3610" "exp3" 1 41 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 1 2596 26 1
"3610" "exp3" 1 42 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1327 18 1
"3610" "exp3" 1 43 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1009 25 1
"3610" "exp3" 1 44 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1612 0 0
"3610" "exp3" 1 45 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 2555 14 1
"3610" "exp3" 1 46 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 2353 0 0
"3610" "exp3" 1 47 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 1398 19 1
"3610" "exp3" 1 48 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1379 0 0
"3610" "exp3" 1 49 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1481 0 0
"3610" "exp3" 1 50 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1896 20 1
"3610" "exp3" 1 51 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 841 17 1
"3610" "exp3" 1 52 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2639 0 0
"3610" "exp3" 1 53 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 1 2038 30 1
"3610" "exp3" 1 54 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1418 0 0
"3610" "exp3" 1 55 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1442 0 0
"3610" "exp3" 1 56 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1448 43 1
"3610" "exp3" 1 57 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 1 3080 12 1
"3610" "exp3" 1 58 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1799 0 0
"3610" "exp3" 1 59 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 1 3091 0 0
"3610" "exp3" 1 60 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 2311 72 1
"3610" "exp3" 1 61 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 939 0 0
"3610" "exp3" 1 62 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 2408 0 0
"3610" "exp3" 1 63 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1046 0 0
"3610" "exp3" 1 64 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1613 29 1
"3610" "exp3" 1 65 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1555 0 0
"3610" "exp3" 1 66 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 2419 27 1
"3610" "exp3" 1 67 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1191 0 0
"3610" "exp3" 1 68 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 4434 39 1
"3610" "exp3" 1 69 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 2291 34 1
"3610" "exp3" 1 70 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 3264 0 0
"3610" "exp3" 1 71 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 2039 32 1
"3610" "exp3" 1 72 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 969 0 0
"3610" "exp3" 1 73 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1606 11 1
"3610" "exp3" 1 74 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1940 46 1
"3610" "exp3" 1 75 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2373 68 1
"3610" "exp3" 1 76 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1373 0 0
"3610" "exp3" 1 77 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1990 41 1
"3610" "exp3" 1 78 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 908 42 1
"3610" "exp3" 1 79 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1361 17 1
"3610" "exp3" 1 80 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1987 34 1
"3610" "exp3" 1 81 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1059 27 1
"3610" "exp3" 1 82 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 1538 0 0
"3610" "exp3" 1 83 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 2723 0 0
"3610" "exp3" 1 84 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1281 0 0
"3610" "exp3" 1 85 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 2095 15 1
"3610" "exp3" 1 86 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1519 0 0
"3610" "exp3" 1 87 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1484 32 1
"3610" "exp3" 1 88 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1191 22 1
"3610" "exp3" 1 89 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 2385 33 1
"3610" "exp3" 1 90 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 1231 41 1
"3610" "exp3" 1 91 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2337 0 0
"3610" "exp3" 1 92 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 2033 0 0
"3610" "exp3" 1 93 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 3209 0 0
"3610" "exp3" 1 94 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1155 35 1
"3610" "exp3" 1 95 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 2323 0 0
"3610" "exp3" 1 96 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1354 38 1
"3610" "exp3" 1 97 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 2256 0 0
"3610" "exp3" 1 98 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1271 36 1
"3610" "exp3" 1 99 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1302 45 1
"3610" "exp3" 1 100 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 1591 23 1
"3610" "exp3" 1 101 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 1869 14 1
"3610" "exp3" 1 102 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1529 29 1
"3610" "exp3" 1 103 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 1 3462 0 0
"3610" "exp3" 1 104 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 2641 20 1
"3610" "exp3" 1 105 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1065 20 1
"3610" "exp3" 1 106 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 1 3312 0 0
"3610" "exp3" 1 107 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 3105 0 0
"3610" "exp3" 1 108 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 2137 13 1
"3610" "exp3" 1 109 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 1 1980 0 0
"3610" "exp3" 1 110 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2633 45 1
"3610" "exp3" 1 111 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1306 42 1
"3610" "exp3" 1 112 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 1651 13 1
"3610" "exp3" 1 113 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1109 0 0
"3610" "exp3" 1 114 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 4239 21 1
"3610" "exp3" 1 115 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1172 26 1
"3610" "exp3" 1 116 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1165 47 1
"3610" "exp3" 1 117 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1621 0 0
"3610" "exp3" 1 118 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 965 24 1
"3610" "exp3" 1 119 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1773 20 1
"3610" "exp3" 1 120 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 816 30 1
"3610" "exp3" 1 121 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1086 31 1
"3610" "exp3" 1 122 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 2130 16 1
"3610" "exp3" 1 123 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 874 0 0
"3610" "exp3" 1 124 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2100 0 0
"3610" "exp3" 1 125 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 1361 16 1
"3610" "exp3" 1 126 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 1059 12 1
"3610" "exp3" 1 127 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 3619 77 1
"3610" "exp3" 1 128 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1165 30 1
"3610" "exp3" 1 129 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 2842 0 0
"3610" "exp3" 1 130 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 631 40 1
"3610" "exp3" 1 131 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 930 22 1
"3610" "exp3" 1 132 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1334 18 1
"3610" "exp3" 2 1 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 772 37 1
"3610" "exp3" 2 2 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1490 0 0
"3610" "exp3" 2 3 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 2263 0 0
"3610" "exp3" 2 4 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 959 23 1
"3610" "exp3" 2 5 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 1 2900 0 0
"3610" "exp3" 2 6 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 1 1140 28 1
"3610" "exp3" 2 7 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1374 17 1
"3610" "exp3" 2 8 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 2762 75 1
"3610" "exp3" 2 9 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1133 20 1
"3610" "exp3" 2 10 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1046 0 0
"3610" "exp3" 2 11 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 1 2248 28 1
"3610" "exp3" 2 12 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 859 13 1
"3610" "exp3" 2 13 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 1 1254 18 1
"3610" "exp3" 2 14 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1267 31 1
"3610" "exp3" 2 15 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 2368 0 0
"3610" "exp3" 2 16 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 1031 0 0
"3610" "exp3" 2 17 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1160 70 1
"3610" "exp3" 2 18 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 1046 36 1
"3610" "exp3" 2 19 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1063 0 0
"3610" "exp3" 2 20 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 1 2197 0 0
"3610" "exp3" 2 21 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 2912 15 1
"3610" "exp3" 2 22 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1234 0 0
"3610" "exp3" 2 23 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 3146 67 1
"3610" "exp3" 2 24 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1295 0 0
"3610" "exp3" 2 25 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 2105 0 0
"3610" "exp3" 2 26 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1605 0 0
"3610" "exp3" 2 27 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 909 0 0
"3610" "exp3" 2 28 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 2048 88 1
"3610" "exp3" 2 29 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 972 70 1
"3610" "exp3" 2 30 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 1 1479 27 1
"3610" "exp3" 2 31 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 1 719 32 1
"3610" "exp3" 2 32 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 1974 0 0
"3610" "exp3" 2 33 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 1 1606 21 1
"3610" "exp3" 2 34 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 873 30 1
"3610" "exp3" 2 35 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 1 1409 0 0
"3610" "exp3" 2 36 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 1 1655 0 0
"3610" "exp3" 2 37 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1050 25 1
"3610" "exp3" 2 38 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 1670 21 1
"3610" "exp3" 2 39 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 1 1918 19 1
"3610" "exp3" 2 40 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1037 29 1
"3610" "exp3" 2 41 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 1249 21 1
"3610" "exp3" 2 42 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 561 22 1
"3610" "exp3" 2 43 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1102 29 1
"3610" "exp3" 2 44 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1690 0 0
"3610" "exp3" 2 45 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1718 18 1
"3610" "exp3" 2 46 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 1 1668 0 0
"3610" "exp3" 2 47 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 673 37 1
"3610" "exp3" 2 48 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 2623 43 1
"3610" "exp3" 2 49 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1747 44 1
"3610" "exp3" 2 50 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1154 28 1
"3610" "exp3" 2 51 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1678 0 0
"3610" "exp3" 2 52 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 3870 0 0
"3610" "exp3" 2 53 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 956 31 1
"3610" "exp3" 2 54 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1284 22 1
"3610" "exp3" 2 55 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1148 14 1
"3610" "exp3" 2 56 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1718 0 0
"3610" "exp3" 2 57 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1045 0 0
"3610" "exp3" 2 58 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 2 1441 0 0
"3610" "exp3" 2 59 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 965 0 0
"3610" "exp3" 2 60 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 1 1416 14 1
"3610" "exp3" 2 61 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1268 92 1
"3610" "exp3" 2 62 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1717 0 0
"3610" "exp3" 2 63 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 1 1124 24 1
"3610" "exp3" 2 64 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1408 0 0
"3610" "exp3" 2 65 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 1708 0 0
"3610" "exp3" 2 66 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 1 1218 11 1
"3610" "exp3" 2 67 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1204 26 1
"3610" "exp3" 2 68 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1394 0 0
"3610" "exp3" 2 69 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 929 26 1
"3610" "exp3" 2 70 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 806 82 1
"3610" "exp3" 2 71 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 2 923 0 0
"3610" "exp3" 2 72 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 1108 42 1
"3610" "exp3" 2 73 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2391 0 0
"3610" "exp3" 2 74 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 2113 32 1
"3610" "exp3" 2 75 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 2176 0 0
"3610" "exp3" 2 76 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 970 0 0
"3610" "exp3" 2 77 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1229 0 0
"3610" "exp3" 2 78 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1834 24 1
"3610" "exp3" 2 79 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 1 1800 17 1
"3610" "exp3" 2 80 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 1 1024 0 0
"3610" "exp3" 2 81 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 1 2823 12 1
"3610" "exp3" 2 82 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 3218 0 0
"3610" "exp3" 2 83 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1955 0 0
"3610" "exp3" 2 84 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 1 1454 23 1
"3610" "exp3" 2 85 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1398 0 0
"3610" "exp3" 2 86 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 2 1360 0 0
"3610" "exp3" 2 87 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 2 1458 60 1
"3610" "exp3" 2 88 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1920 64 1
"3610" "exp3" 2 89 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1134 0 0
"3610" "exp3" 2 90 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 1 1579 0 0
"3610" "exp3" 2 91 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 2 952 55 1
"3610" "exp3" 2 92 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 1 2808 16 1
"3610" "exp3" 2 93 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 994 19 1
"3610" "exp3" 2 94 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 1 1503 16 1
"3610" "exp3" 2 95 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 3533 0 0
"3610" "exp3" 2 96 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 1 794 33 1
"3610" "exp3" 2 97 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1018 0 0
"3610" "exp3" 2 98 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1565 24 1
"3610" "exp3" 2 99 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1472 0 0
"3610" "exp3" 2 100 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1095 0 0
"3610" "exp3" 2 101 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 2339 63 1
"3610" "exp3" 2 102 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1018 0 0
"3610" "exp3" 2 103 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1614 40 1
"3610" "exp3" 2 104 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1207 33 1
"3610" "exp3" 2 105 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 981 0 0
"3610" "exp3" 2 106 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1233 0 0
"3610" "exp3" 2 107 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 1 2187 0 0
"3610" "exp3" 2 108 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1299 39 1
"3610" "exp3" 2 109 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1227 19 1
"3610" "exp3" 2 110 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1030 0 0
"3610" "exp3" 2 111 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 3229 35 1
"3610" "exp3" 2 112 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 921 36 1
"3610" "exp3" 2 113 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 784 0 0
"3610" "exp3" 2 114 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 2921 15 1
"3610" "exp3" 2 115 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 1 892 23 1
"3610" "exp3" 2 116 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 779 20 1
"3610" "exp3" 2 117 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 1 1931 19 1
"3610" "exp3" 2 118 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 1 1570 0 0
"3610" "exp3" 2 119 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 2037 68 1
"3610" "exp3" 2 120 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1190 46 1
"3610" "exp3" 2 121 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1618 34 1
"3610" "exp3" 2 122 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 767 0 0
"3610" "exp3" 2 123 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 2425 0 0
"3610" "exp3" 2 124 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 1 2056 0 0
"3610" "exp3" 2 125 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 1 692 22 1
"3610" "exp3" 2 126 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 2884 0 0
"3610" "exp3" 2 127 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 981 0 0
"3610" "exp3" 2 128 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 2754 30 1
"3610" "exp3" 2 129 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 1 993 14 1
"3610" "exp3" 2 130 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1113 0 0
"3610" "exp3" 2 131 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1448 27 1
"3610" "exp3" 2 132 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 806 32 1
"3610" "exp3" 1 1 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 5456 0 0
"3610" "exp3" 1 2 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 3112 0 0
"3610" "exp3" 1 3 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1948 29 1
"3610" "exp3" 1 4 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1827 38 1
"3610" "exp3" 1 5 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 2116 46 1
"3610" "exp3" 1 6 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 1 4228 11 1
"3610" "exp3" 1 7 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 1 3852 28 1
"3610" "exp3" 1 8 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1987 33 1
"3610" "exp3" 1 9 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 2769 0 0
"3610" "exp3" 1 10 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 4029 18 1
"3610" "exp3" 1 11 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 1 6587 31 1
"3610" "exp3" 1 12 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 3645 58 1
"3610" "exp3" 1 13 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 2130 0 0
"3610" "exp3" 1 14 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 2 6491 0 0
"3610" "exp3" 1 15 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1342 19 1
"3610" "exp3" 1 16 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 1 3590 9 1
"3610" "exp3" 1 17 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 4054 23 1
"3610" "exp3" 1 18 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1729 0 0
"3610" "exp3" 1 19 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 4023 0 0
"3610" "exp3" 1 20 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 2929 18 1
"3610" "exp3" 1 21 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 2 2686 0 0
"3610" "exp3" 1 22 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 2088 0 0
"3610" "exp3" 1 23 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 3147 0 0
"3610" "exp3" 1 24 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 3134 71 1
"3610" "exp3" 1 25 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1965 33 1
"3610" "exp3" 1 26 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1827 0 0
"3610" "exp3" 1 27 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1586 76 1
"3610" "exp3" 1 28 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 2 1350 0 0
"3610" "exp3" 1 29 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1634 82 1
"3610" "exp3" 1 30 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 2 1727 0 0
"3610" "exp3" 1 31 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 3009 0 0
"3610" "exp3" 1 32 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 3102 31 1
"3610" "exp3" 1 33 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1850 0 0
"3610" "exp3" 1 34 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 1 1724 19 1
"3610" "exp3" 1 35 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2817 0 0
"3610" "exp3" 1 36 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1224 25 1
"3610" "exp3" 1 37 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 711 17 1
"3610" "exp3" 1 38 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 2070 0 0
"3610" "exp3" 1 39 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1871 45 1
"3610" "exp3" 1 40 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 3338 0 0
"3610" "exp3" 1 41 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2148 21 1
"3610" "exp3" 1 42 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1580 0 0
"3610" "exp3" 1 43 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 1 1470 0 0
"3610" "exp3" 1 44 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 5590 0 0
"3610" "exp3" 1 45 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 3110 40 1
"3610" "exp3" 1 46 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1694 26 1
"3610" "exp3" 1 47 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1488 22 1
"3610" "exp3" 1 48 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1004 24 1
"3610" "exp3" 1 49 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 3340 43 1
"3610" "exp3" 1 50 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 2487 0 0
"3610" "exp3" 1 51 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 4418 39 1
"3610" "exp3" 1 52 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1856 0 0
"3610" "exp3" 1 53 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 2609 19 1
"3610" "exp3" 1 54 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 3772 0 0
"3610" "exp3" 1 55 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 3606 24 1
"3610" "exp3" 1 56 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 2204 40 1
"3610" "exp3" 1 57 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1900 0 0
"3610" "exp3" 1 58 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3679 49 1
"3610" "exp3" 1 59 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 2145 0 0
"3610" "exp3" 1 60 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 2382 0 0
"3610" "exp3" 1 61 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 1 2208 12 1
"3610" "exp3" 1 62 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1905 0 0
"3610" "exp3" 1 63 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2187 41 1
"3610" "exp3" 1 64 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 1 2492 30 1
"3610" "exp3" 1 65 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 4156 26 1
"3610" "exp3" 1 66 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2175 0 0
"3610" "exp3" 1 67 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 1744 0 0
"3610" "exp3" 1 68 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 3087 17 1
"3610" "exp3" 1 69 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1423 32 1
"3610" "exp3" 1 70 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 2741 20 1
"3610" "exp3" 1 71 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 2019 20 1
"3610" "exp3" 1 72 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 1680 0 0
"3610" "exp3" 1 73 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1515 30 1
"3610" "exp3" 1 74 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 2 3102 59 1
"3610" "exp3" 1 75 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 2 1891 0 0
"3610" "exp3" 1 76 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 2839 34 1
"3610" "exp3" 1 77 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 3710 0 0
"3610" "exp3" 1 78 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1598 20 1
"3610" "exp3" 1 79 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1710 27 1
"3610" "exp3" 1 80 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1056 65 1
"3610" "exp3" 1 81 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 670 0 0
"3610" "exp3" 1 82 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 2476 45 1
"3610" "exp3" 1 83 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 2605 79 1
"3610" "exp3" 1 84 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1860 0 0
"3610" "exp3" 1 85 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 2 1909 0 0
"3610" "exp3" 1 86 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 648 67 1
"3610" "exp3" 1 87 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1211 37 1
"3610" "exp3" 1 88 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 2531 0 0
"3610" "exp3" 1 89 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 2 1270 0 0
"3610" "exp3" 1 90 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1314 77 1
"3610" "exp3" 1 91 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 2 1317 0 0
"3610" "exp3" 1 92 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 886 77 1
"3610" "exp3" 1 93 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 1664 66 1
"3610" "exp3" 1 94 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1876 15 1
"3610" "exp3" 1 95 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 1 2533 18 1
"3610" "exp3" 1 96 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 704 0 0
"3610" "exp3" 1 97 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 2817 30 1
"3610" "exp3" 1 98 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 4084 35 1
"3610" "exp3" 1 99 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1824 0 0
"3610" "exp3" 1 100 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1675 0 0
"3610" "exp3" 1 101 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 2446 0 0
"3610" "exp3" 1 102 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2162 0 0
"3610" "exp3" 1 103 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1551 21 1
"3610" "exp3" 1 104 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1914 0 0
"3610" "exp3" 1 105 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 1 3041 14 1
"3610" "exp3" 1 106 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1431 0 0
"3610" "exp3" 1 107 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1927 0 0
"3610" "exp3" 1 108 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 1 1992 0 0
"3610" "exp3" 1 109 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 3006 15 1
"3610" "exp3" 1 110 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1775 0 0
"3610" "exp3" 1 111 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 2722 25 1
"3610" "exp3" 1 112 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 1170 29 1
"3610" "exp3" 1 113 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2258 0 0
"3610" "exp3" 1 114 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1629 85 1
"3610" "exp3" 1 115 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 2002 0 0
"3610" "exp3" 1 116 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1310 0 0
"3610" "exp3" 1 117 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1231 0 0
"3610" "exp3" 1 118 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 2 2873 0 0
"3610" "exp3" 1 119 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1404 0 0
"3610" "exp3" 1 120 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1455 23 1
"3610" "exp3" 1 121 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 2426 68 1
"3610" "exp3" 1 122 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 868 0 0
"3610" "exp3" 1 123 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1330 0 0
"3610" "exp3" 1 124 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 1199 43 1
"3610" "exp3" 1 125 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 960 0 0
"3610" "exp3" 1 126 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 695 25 1
"3610" "exp3" 1 127 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1421 16 1
"3610" "exp3" 1 128 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1042 27 1
"3610" "exp3" 1 129 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 1 2371 33 1
"3610" "exp3" 1 130 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1290 0 0
"3610" "exp3" 1 131 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 993 28 1
"3610" "exp3" 1 132 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1119 69 1
"3610" "exp3" 2 1 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 1 991 20 1
"3610" "exp3" 2 2 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 1 1465 0 0
"3610" "exp3" 2 3 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 2016 19 1
"3610" "exp3" 2 4 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 2254 42 1
"3610" "exp3" 2 5 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1274 0 0
"3610" "exp3" 2 6 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 1761 0 0
"3610" "exp3" 2 7 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 2985 0 0
"3610" "exp3" 2 8 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 1 2019 10 1
"3610" "exp3" 2 9 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 1 1716 20 1
"3610" "exp3" 2 10 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 1554 0 0
"3610" "exp3" 2 11 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3523 49 1
"3610" "exp3" 2 12 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 3026 33 1
"3610" "exp3" 2 13 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 1 1964 26 1
"3610" "exp3" 2 14 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 1663 48 1
"3610" "exp3" 2 15 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 3214 35 1
"3610" "exp3" 2 16 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 992 31 1
"3610" "exp3" 2 17 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 1 1883 15 1
"3610" "exp3" 2 18 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 1849 0 0
"3610" "exp3" 2 19 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 2559 0 0
"3610" "exp3" 2 20 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 1 2271 13 1
"3610" "exp3" 2 21 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 1972 35 1
"3610" "exp3" 2 22 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 2760 41 1
"3610" "exp3" 2 23 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 951 32 1
"3610" "exp3" 2 24 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 982 0 0
"3610" "exp3" 2 25 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1681 22 1
"3610" "exp3" 2 26 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 1625 44 1
"3610" "exp3" 2 27 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1308 26 1
"3610" "exp3" 2 28 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 1475 26 1
"3610" "exp3" 2 29 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1166 17 1
"3610" "exp3" 2 30 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1396 0 0
"3610" "exp3" 2 31 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1550 22 1
"3610" "exp3" 2 32 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 1 1382 25 1
"3610" "exp3" 2 33 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 1764 0 0
"3610" "exp3" 2 34 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 2941 18 1
"3610" "exp3" 2 35 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2791 0 0
"3610" "exp3" 2 36 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1384 0 0
"3610" "exp3" 2 37 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 1 1641 0 0
"3610" "exp3" 2 38 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 1 1905 16 1
"3610" "exp3" 2 39 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1861 81 1
"3610" "exp3" 2 40 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 2 1843 73 1
"3610" "exp3" 2 41 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2399 66 1
"3610" "exp3" 2 42 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 1 1333 30 1
"3610" "exp3" 2 43 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 2 1897 0 0
"3610" "exp3" 2 44 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 4183 0 0
"3610" "exp3" 2 45 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 3841 13 1
"3610" "exp3" 2 46 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1511 33 1
"3610" "exp3" 2 47 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 2074 29 1
"3610" "exp3" 2 48 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 2642 36 1
"3610" "exp3" 2 49 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 1959 21 1
"3610" "exp3" 2 50 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 1810 68 1
"3610" "exp3" 2 51 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 2082 29 1
"3610" "exp3" 2 52 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1744 98 1
"3610" "exp3" 2 53 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 1 2098 22 1
"3610" "exp3" 2 54 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1418 96 1
"3610" "exp3" 2 55 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1126 25 1
"3610" "exp3" 2 56 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 1309 0 0
"3610" "exp3" 2 57 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 994 0 0
"3610" "exp3" 2 58 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 2836 0 0
"3610" "exp3" 2 59 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 2773 0 0
"3610" "exp3" 2 60 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 3633 0 0
"3610" "exp3" 2 61 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 2664 0 0
"3610" "exp3" 2 62 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1215 20 1
"3610" "exp3" 2 63 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1315 64 1
"3610" "exp3" 2 64 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1717 24 1
"3610" "exp3" 2 65 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 4346 0 0
"3610" "exp3" 2 66 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 3327 63 1
"3610" "exp3" 2 67 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 1230 97 1
"3610" "exp3" 2 68 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 753 0 0
"3610" "exp3" 2 69 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 1375 0 0
"3610" "exp3" 2 70 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 915 0 0
"3610" "exp3" 2 71 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 2 980 58 1
"3610" "exp3" 2 72 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 1044 0 0
"3610" "exp3" 2 73 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1206 72 1
"3610" "exp3" 2 74 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 1616 0 0
"3610" "exp3" 2 75 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 641 0 0
"3610" "exp3" 2 76 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 2918 91 1
"3610" "exp3" 2 77 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1118 0 0
"3610" "exp3" 2 78 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1027 0 0
"3610" "exp3" 2 79 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1451 72 1
"3610" "exp3" 2 80 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 2 2111 0 0
"3610" "exp3" 2 81 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 1629 41 1
"3610" "exp3" 2 82 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1500 27 1
"3610" "exp3" 2 83 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2548 75 1
"3610" "exp3" 2 84 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1001 23 1
"3610" "exp3" 2 85 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1390 0 0
"3610" "exp3" 2 86 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 2429 0 0
"3610" "exp3" 2 87 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1518 24 1
"3610" "exp3" 2 88 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1267 38 1
"3610" "exp3" 2 89 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 1298 0 0
"3610" "exp3" 2 90 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 2504 86 1
"3610" "exp3" 2 91 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 1 999 24 1
"3610" "exp3" 2 92 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 1857 0 0
"3610" "exp3" 2 93 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 2010 20 1
"3610" "exp3" 2 94 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 1043 30 1
"3610" "exp3" 2 95 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 1 3346 17 1
"3610" "exp3" 2 96 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1516 73 1
"3610" "exp3" 2 97 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1091 28 1
"3610" "exp3" 2 98 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1824 0 0
"3610" "exp3" 2 99 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1213 0 0
"3610" "exp3" 2 100 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 1073 0 0
"3610" "exp3" 2 101 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 1175 0 0
"3610" "exp3" 2 102 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 2 1585 0 0
"3610" "exp3" 2 103 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 2 823 0 0
"3610" "exp3" 2 104 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 2572 0 0
"3610" "exp3" 2 105 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 983 95 1
"3610" "exp3" 2 106 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1231 0 0
"3610" "exp3" 2 107 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 924 0 0
"3610" "exp3" 2 108 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1083 0 0
"3610" "exp3" 2 109 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1509 0 0
"3610" "exp3" 2 110 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 2 1030 0 0
"3610" "exp3" 2 111 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1774 14 1
"3610" "exp3" 2 112 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 2150 0 0
"3610" "exp3" 2 113 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 2 1178 0 0
"3610" "exp3" 2 114 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2013 0 0
"3610" "exp3" 2 115 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 883 37 1
"3610" "exp3" 2 116 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 1030 34 1
"3610" "exp3" 2 117 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 1 1240 21 1
"3610" "exp3" 2 118 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 984 0 0
"3610" "exp3" 2 119 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 2 2619 68 1
"3610" "exp3" 2 120 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1375 0 0
"3610" "exp3" 2 121 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1354 0 0
"3610" "exp3" 2 122 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 1216 71 1
"3610" "exp3" 2 123 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1308 0 0
"3610" "exp3" 2 124 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 2 1282 0 0
"3610" "exp3" 2 125 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1742 0 0
"3610" "exp3" 2 126 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 1714 0 0
"3610" "exp3" 2 127 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1273 0 0
"3610" "exp3" 2 128 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1614 0 0
"3610" "exp3" 2 129 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1852 17 1
"3610" "exp3" 2 130 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 1397 0 0
"3610" "exp3" 2 131 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 1225 21 1
"3610" "exp3" 2 132 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 1680 0 0
"3610" "exp3" 1 1 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2269 0 0
"3610" "exp3" 1 2 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 2749 0 0
"3610" "exp3" 1 3 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 931 18 1
"3610" "exp3" 1 4 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 1926 14 1
"3610" "exp3" 1 5 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1103 13 1
"3610" "exp3" 1 6 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 3784 0 0
"3610" "exp3" 1 7 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 1 1335 0 0
"3610" "exp3" 1 8 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 3977 0 0
"3610" "exp3" 1 9 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 1365 38 1
"3610" "exp3" 1 10 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 995 0 0
"3610" "exp3" 1 11 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 1843 11 1
"3610" "exp3" 1 12 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 1 3674 0 0
"3610" "exp3" 1 13 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 1084 29 1
"3610" "exp3" 1 14 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1262 39 1
"3610" "exp3" 1 15 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 1126 44 1
"3610" "exp3" 1 16 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1432 25 1
"3610" "exp3" 1 17 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 974 21 1
"3610" "exp3" 1 18 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 2077 16 1
"3610" "exp3" 1 19 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 2698 0 0
"3610" "exp3" 1 20 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1579 25 1
"3610" "exp3" 1 21 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 1 1443 12 1
"3610" "exp3" 1 22 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 2934 27 1
"3610" "exp3" 1 23 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 3319 17 1
"3610" "exp3" 1 24 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 2343 0 0
"3610" "exp3" 1 25 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 2526 49 1
"3610" "exp3" 1 26 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 2238 0 0
"3610" "exp3" 1 27 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 2336 0 0
"3610" "exp3" 1 28 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 4301 28 1
"3610" "exp3" 1 29 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 2420 0 0
"3610" "exp3" 1 30 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1732 44 1
"3610" "exp3" 1 31 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 1901 18 1
"3610" "exp3" 1 32 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 1 4763 10 1
"3610" "exp3" 1 33 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 889 19 1
"3610" "exp3" 1 34 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 772 14 1
"3610" "exp3" 1 35 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1085 0 0
"3610" "exp3" 1 36 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 2928 85 1
"3610" "exp3" 1 37 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2090 0 0
"3610" "exp3" 1 38 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 2659 35 1
"3610" "exp3" 1 39 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 1356 46 1
"3610" "exp3" 1 40 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 1734 31 1
"3610" "exp3" 1 41 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 3495 0 0
"3610" "exp3" 1 42 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 3968 0 0
"3610" "exp3" 1 43 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 2489 32 1
"3610" "exp3" 1 44 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1568 41 1
"3610" "exp3" 1 45 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1609 21 1
"3610" "exp3" 1 46 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1351 20 1
"3610" "exp3" 1 47 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 755 20 1
"3610" "exp3" 1 48 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1698 92 1
"3610" "exp3" 1 49 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 2766 25 1
"3610" "exp3" 1 50 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1665 0 0
"3610" "exp3" 1 51 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 1961 0 0
"3610" "exp3" 1 52 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 1294 0 0
"3610" "exp3" 1 53 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 789 36 1
"3610" "exp3" 1 54 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2977 0 0
"3610" "exp3" 1 55 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 2109 0 0
"3610" "exp3" 1 56 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1618 0 0
"3610" "exp3" 1 57 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 1882 33 1
"3610" "exp3" 1 58 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 2743 18 1
"3610" "exp3" 1 59 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 1432 0 0
"3610" "exp3" 1 60 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 4131 22 1
"3610" "exp3" 1 61 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1062 0 0
"3610" "exp3" 1 62 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 2092 24 1
"3610" "exp3" 1 63 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1753 12 1
"3610" "exp3" 1 64 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 2156 0 0
"3610" "exp3" 1 65 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 835 31 1
"3610" "exp3" 1 66 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 654 29 1
"3610" "exp3" 1 67 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1948 19 1
"3610" "exp3" 1 68 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 2229 16 1
"3610" "exp3" 1 69 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 2 4829 63 1
"3610" "exp3" 1 70 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 1024 0 0
"3610" "exp3" 1 71 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 3618 40 1
"3610" "exp3" 1 72 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 2 1367 0 0
"3610" "exp3" 1 73 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 2 1346 0 0
"3610" "exp3" 1 74 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 1113 37 1
"3610" "exp3" 1 75 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 1 488 26 1
"3610" "exp3" 1 76 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 538 38 1
"3610" "exp3" 1 77 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2339 15 1
"3610" "exp3" 1 78 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 1241 33 1
"3610" "exp3" 1 79 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 907 0 0
"3610" "exp3" 1 80 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 936 30 1
"3610" "exp3" 1 81 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 803 0 0
"3610" "exp3" 1 82 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 1 1807 13 1
"3610" "exp3" 1 83 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 781 24 1
"3610" "exp3" 1 84 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 989 16 1
"3610" "exp3" 1 85 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 1 635 6 1
"3610" "exp3" 1 86 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 1861 24 1
"3610" "exp3" 1 87 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 3442 0 0
"3610" "exp3" 1 88 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 2452 41 1
"3610" "exp3" 1 89 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2437 27 1
"3610" "exp3" 1 90 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1609 40 1
"3610" "exp3" 1 91 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1115 34 1
"3610" "exp3" 1 92 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 2990 19 1
"3610" "exp3" 1 93 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 644 0 0
"3610" "exp3" 1 94 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 2 1619 53 1
"3610" "exp3" 1 95 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 3047 0 0
"3610" "exp3" 1 96 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 746 35 1
"3610" "exp3" 1 97 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 1546 26 1
"3610" "exp3" 1 98 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 1058 36 1
"3610" "exp3" 1 99 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 1538 34 1
"3610" "exp3" 1 100 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1711 48 1
"3610" "exp3" 1 101 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 2740 17 1
"3610" "exp3" 1 102 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1132 0 0
"3610" "exp3" 1 103 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 893 34 1
"3610" "exp3" 1 104 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 2157 18 1
"3610" "exp3" 1 105 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 1 638 0 0
"3610" "exp3" 1 106 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 886 35 1
"3610" "exp3" 1 107 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1564 0 0
"3610" "exp3" 1 108 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 5319 31 1
"3610" "exp3" 1 109 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 688 30 1
"3610" "exp3" 1 110 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 733 0 0
"3610" "exp3" 1 111 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 858 36 1
"3610" "exp3" 1 112 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1852 21 1
"3610" "exp3" 1 113 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1931 0 0
"3610" "exp3" 1 114 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2473 0 0
"3610" "exp3" 1 115 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 802 0 0
"3610" "exp3" 1 116 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 1680 39 1
"3610" "exp3" 1 117 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1961 0 0
"3610" "exp3" 1 118 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 1023 0 0
"3610" "exp3" 1 119 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 2045 26 1
"3610" "exp3" 1 120 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 3338 0 0
"3610" "exp3" 1 121 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 1599 28 1
"3610" "exp3" 1 122 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1133 0 0
"3610" "exp3" 1 123 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 2143 0 0
"3610" "exp3" 1 124 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 2137 32 1
"3610" "exp3" 1 125 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2408 13 1
"3610" "exp3" 1 126 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1013 27 1
"3610" "exp3" 1 127 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 3492 0 0
"3610" "exp3" 1 128 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 1322 0 0
"3610" "exp3" 1 129 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1110 0 0
"3610" "exp3" 1 130 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1039 0 0
"3610" "exp3" 1 131 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 1 4868 22 1
"3610" "exp3" 1 132 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 2873 0 0
"3610" "exp3" 2 1 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 2285 0 0
"3610" "exp3" 2 2 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 1 782 0 0
"3610" "exp3" 2 3 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 713 43 1
"3610" "exp3" 2 4 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 979 22 1
"3610" "exp3" 2 5 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 1358 26 1
"3610" "exp3" 2 6 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1556 0 0
"3610" "exp3" 2 7 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 741 0 0
"3610" "exp3" 2 8 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 643 37 1
"3610" "exp3" 2 9 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 553 0 0
"3610" "exp3" 2 10 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 1 1690 16 1
"3610" "exp3" 2 11 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 1019 0 0
"3610" "exp3" 2 12 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 1 1315 19 1
"3610" "exp3" 2 13 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 1 1117 34 1
"3610" "exp3" 2 14 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 696 32 1
"3610" "exp3" 2 15 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 1 3556 11 1
"3610" "exp3" 2 16 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 1570 38 1
"3610" "exp3" 2 17 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 3189 0 0
"3610" "exp3" 2 18 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 1 1772 22 1
"3610" "exp3" 2 19 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 1 1907 0 0
"3610" "exp3" 2 20 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 1 2830 0 0
"3610" "exp3" 2 21 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 723 32 1
"3610" "exp3" 2 22 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 1555 17 1
"3610" "exp3" 2 23 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 1 1688 27 1
"3610" "exp3" 2 24 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 1427 31 1
"3610" "exp3" 2 25 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 1 868 0 0
"3610" "exp3" 2 26 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1382 21 1
"3610" "exp3" 2 27 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 494 33 1
"3610" "exp3" 2 28 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 831 0 0
"3610" "exp3" 2 29 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 1902 0 0
"3610" "exp3" 2 30 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2037 0 0
"3610" "exp3" 2 31 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 918 20 1
"3610" "exp3" 2 32 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 787 0 0
"3610" "exp3" 2 33 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 2976 36 1
"3610" "exp3" 2 34 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 4354 0 0
"3610" "exp3" 2 35 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1319 0 0
"3610" "exp3" 2 36 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 1 3246 30 1
"3610" "exp3" 2 37 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 1 5805 10 1
"3610" "exp3" 2 38 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 1 1136 21 1
"3610" "exp3" 2 39 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 838 26 1
"3610" "exp3" 2 40 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 1036 34 1
"3610" "exp3" 2 41 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 1678 27 1
"3610" "exp3" 2 42 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 6606 0 0
"3610" "exp3" 2 43 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 1 2642 18 1
"3610" "exp3" 2 44 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 1493 0 0
"3610" "exp3" 2 45 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 2495 43 1
"3610" "exp3" 2 46 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2375 0 0
"3610" "exp3" 2 47 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 881 18 1
"3610" "exp3" 2 48 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 1 3670 0 0
"3610" "exp3" 2 49 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 2758 87 1
"3610" "exp3" 2 50 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 4121 0 0
"3610" "exp3" 2 51 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1325 0 0
"3610" "exp3" 2 52 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 4041 0 0
"3610" "exp3" 2 53 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 3060 37 1
"3610" "exp3" 2 54 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2431 0 0
"3610" "exp3" 2 55 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 799 36 1
"3610" "exp3" 2 56 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1200 97 1
"3610" "exp3" 2 57 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 1 1442 23 1
"3610" "exp3" 2 58 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 2328 30 1
"3610" "exp3" 2 59 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 3233 14 1
"3610" "exp3" 2 60 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 1047 13 1
"3610" "exp3" 2 61 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 4116 0 0
"3610" "exp3" 2 62 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 1107 45 1
"3610" "exp3" 2 63 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 1517 0 0
"3610" "exp3" 2 64 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 3521 16 1
"3610" "exp3" 2 65 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 1455 19 1
"3610" "exp3" 2 66 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 2705 0 0
"3610" "exp3" 2 67 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 4190 19 1
"3610" "exp3" 2 68 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 1998 25 1
"3610" "exp3" 2 69 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 1314 0 0
"3610" "exp3" 2 70 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 1174 29 1
"3610" "exp3" 2 71 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 2502 0 0
"3610" "exp3" 2 72 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 1 3432 31 1
"3610" "exp3" 2 73 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 2718 93 1
"3610" "exp3" 2 74 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 1 2390 0 0
"3610" "exp3" 2 75 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 1 2505 17 1
"3610" "exp3" 2 76 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 3498 0 0
"3610" "exp3" 2 77 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 7055 0 0
"3610" "exp3" 2 78 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 4792 0 0
"3610" "exp3" 2 79 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 1 3002 0 0
"3610" "exp3" 2 80 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 1 1508 13 1
"3610" "exp3" 2 81 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 1 1273 33 1
"3610" "exp3" 2 82 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1685 0 0
"3610" "exp3" 2 83 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 1982 0 0
"3610" "exp3" 2 84 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 1 1563 0 0
"3610" "exp3" 2 85 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 823 0 0
"3610" "exp3" 2 86 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 1452 44 1
"3610" "exp3" 2 87 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 1 1686 19 1
"3610" "exp3" 2 88 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 1 1291 29 1
"3610" "exp3" 2 89 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 5027 0 0
"3610" "exp3" 2 90 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 1311 40 1
"3610" "exp3" 2 91 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 1 768 36 1
"3610" "exp3" 2 92 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1206 0 0
"3610" "exp3" 2 93 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2236 0 0
"3610" "exp3" 2 94 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 1 1297 0 0
"3610" "exp3" 2 95 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1026 24 1
"3610" "exp3" 2 96 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 583 0 0
"3610" "exp3" 2 97 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 597 0 0
"3610" "exp3" 2 98 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 1390 0 0
"3610" "exp3" 2 99 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 1575 18 1
"3610" "exp3" 2 100 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1980 94 1
"3610" "exp3" 2 101 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 622 0 0
"3610" "exp3" 2 102 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 1 1199 15 1
"3610" "exp3" 2 103 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 1 1268 25 1
"3610" "exp3" 2 104 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 1 1322 14 1
"3610" "exp3" 2 105 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 973 0 0
"3610" "exp3" 2 106 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 775 0 0
"3610" "exp3" 2 107 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 1 1259 24 1
"3610" "exp3" 2 108 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 1 2067 14 1
"3610" "exp3" 2 109 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 740 23 1
"3610" "exp3" 2 110 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 627 26 1
"3610" "exp3" 2 111 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 795 0 0
"3610" "exp3" 2 112 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 1 868 30 1
"3610" "exp3" 2 113 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 1 687 28 1
"3610" "exp3" 2 114 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 631 29 1
"3610" "exp3" 2 115 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 1021 22 1
"3610" "exp3" 2 116 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 524 25 1
"3610" "exp3" 2 117 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 541 33 1
"3610" "exp3" 2 118 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 1 1025 12 1
"3610" "exp3" 2 119 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 2 917 0 0
"3610" "exp3" 2 120 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 781 38 1
"3610" "exp3" 2 121 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 656 35 1
"3610" "exp3" 2 122 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 729 0 0
"3610" "exp3" 2 123 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 653 34 1
"3610" "exp3" 2 124 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 1 572 0 0
"3610" "exp3" 2 125 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 1514 17 1
"3610" "exp3" 2 126 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 856 42 1
"3610" "exp3" 2 127 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 1 683 31 1
"3610" "exp3" 2 128 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 675 15 1
"3610" "exp3" 2 129 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 1 968 33 1
"3610" "exp3" 2 130 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1337 0 0
"3610" "exp3" 2 131 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 1052 40 1
"3610" "exp3" 2 132 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 1 1697 20 1
"3610" "exp3" 1 1 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 4280 0 0
"3610" "exp3" 1 2 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 1 1242 13 1
"3610" "exp3" 1 3 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2071 43 1
"3610" "exp3" 1 4 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 2257 16 1
"3610" "exp3" 1 5 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 1054 0 0
"3610" "exp3" 1 6 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 779 49 1
"3610" "exp3" 1 7 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 1 1337 22 1
"3610" "exp3" 1 8 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 1 973 7 1
"3610" "exp3" 1 9 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 2871 0 0
"3610" "exp3" 1 10 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1855 20 1
"3610" "exp3" 1 11 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 2301 0 0
"3610" "exp3" 1 12 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 1435 0 0
"3610" "exp3" 1 13 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 2174 17 1
"3610" "exp3" 1 14 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 2556 0 0
"3610" "exp3" 1 15 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1033 26 1
"3610" "exp3" 1 16 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 805 17 1
"3610" "exp3" 1 17 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1157 28 1
"3610" "exp3" 1 18 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 1 1044 16 1
"3610" "exp3" 1 19 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 1541 39 1
"3610" "exp3" 1 20 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 1791 23 1
"3610" "exp3" 1 21 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1123 25 1
"3610" "exp3" 1 22 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 960 18 1
"3610" "exp3" 1 23 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 1 1706 12 1
"3610" "exp3" 1 24 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1973 44 1
"3610" "exp3" 1 25 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 825 0 0
"3610" "exp3" 1 26 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1046 31 1
"3610" "exp3" 1 27 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 763 0 0
"3610" "exp3" 1 28 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 747 0 0
"3610" "exp3" 1 29 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 1454 0 0
"3610" "exp3" 1 30 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1564 24 1
"3610" "exp3" 1 31 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 848 0 0
"3610" "exp3" 1 32 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1208 20 1
"3610" "exp3" 1 33 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 1 934 31 1
"3610" "exp3" 1 34 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 878 0 0
"3610" "exp3" 1 35 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 878 0 0
"3610" "exp3" 1 36 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 814 0 0
"3610" "exp3" 1 37 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 768 32 1
"3610" "exp3" 1 38 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 854 36 1
"3610" "exp3" 1 39 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1538 14 1
"3610" "exp3" 1 40 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1539 0 0
"3610" "exp3" 1 41 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1385 0 0
"3610" "exp3" 1 42 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1831 16 1
"3610" "exp3" 1 43 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1053 39 1
"3610" "exp3" 1 44 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 1075 0 0
"3610" "exp3" 1 45 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 1137 24 1
"3610" "exp3" 1 46 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1418 0 0
"3610" "exp3" 1 47 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 1 1461 25 1
"3610" "exp3" 1 48 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 1519 27 1
"3610" "exp3" 1 49 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 1 1673 0 0
"3610" "exp3" 1 50 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 624 0 0
"3610" "exp3" 1 51 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1730 0 0
"3610" "exp3" 1 52 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 499 29 1
"3610" "exp3" 1 53 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 615 30 1
"3610" "exp3" 1 54 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 276 0 0
"3610" "exp3" 1 55 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 393 0 0
"3610" "exp3" 1 56 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 536 0 0
"3610" "exp3" 1 57 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1327 23 1
"3610" "exp3" 1 58 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 827 0 0
"3610" "exp3" 1 59 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 579 24 1
"3610" "exp3" 1 60 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 921 26 1
"3610" "exp3" 1 61 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 612 18 1
"3610" "exp3" 1 62 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 972 46 1
"3610" "exp3" 1 63 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 475 25 1
"3610" "exp3" 1 64 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 1 807 35 1
"3610" "exp3" 1 65 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 520 33 1
"3610" "exp3" 1 66 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 705 45 1
"3610" "exp3" 1 67 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 1 615 0 0
"3610" "exp3" 1 68 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 1 509 6 1
"3610" "exp3" 1 69 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 693 0 0
"3610" "exp3" 1 70 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 491 35 1
"3610" "exp3" 1 71 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 809 45 1
"3610" "exp3" 1 72 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 685 0 0
"3610" "exp3" 1 73 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 444 15 1
"3610" "exp3" 1 74 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 2 198 0 0
"3610" "exp3" 1 75 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 156 22 1
"3610" "exp3" 1 76 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 352 27 1
"3610" "exp3" 1 77 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 1127 0 0
"3610" "exp3" 1 78 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 1429 70 1
"3610" "exp3" 1 79 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 2077 0 0
"3610" "exp3" 1 80 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 699 0 0
"3610" "exp3" 1 81 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1439 0 0
"3610" "exp3" 1 82 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1627 48 1
"3610" "exp3" 1 83 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 950 90 1
"3610" "exp3" 1 84 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 2 811 0 0
"3610" "exp3" 1 85 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 310 0 0
"3610" "exp3" 1 86 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 179 27 1
"3610" "exp3" 1 87 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 2 559 0 0
"3610" "exp3" 1 88 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 767 19 1
"3610" "exp3" 1 89 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 586 18 1
"3610" "exp3" 1 90 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 609 0 0
"3610" "exp3" 1 91 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 778 18 1
"3610" "exp3" 1 92 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 600 27 1
"3610" "exp3" 1 93 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1212 0 0
"3610" "exp3" 1 94 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1008 0 0
"3610" "exp3" 1 95 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1814 81 1
"3610" "exp3" 1 96 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 599 0 0
"3610" "exp3" 1 97 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 1905 11 1
"3610" "exp3" 1 98 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 929 0 0
"3610" "exp3" 1 99 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 571 0 0
"3610" "exp3" 1 100 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 794 21 1
"3610" "exp3" 1 101 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 564 38 1
"3610" "exp3" 1 102 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 536 0 0
"3610" "exp3" 1 103 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 602 0 0
"3610" "exp3" 1 104 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 544 19 1
"3610" "exp3" 1 105 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 1 370 1 1
"3610" "exp3" 1 106 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 669 0 0
"3610" "exp3" 1 107 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 744 0 0
"3610" "exp3" 1 108 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 1 489 0 0
"3610" "exp3" 1 109 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 826 0 0
"3610" "exp3" 1 110 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 459 20 1
"3610" "exp3" 1 111 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 538 17 1
"3610" "exp3" 1 112 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 851 21 1
"3610" "exp3" 1 113 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 848 22 1
"3610" "exp3" 1 114 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 806 30 1
"3610" "exp3" 1 115 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 992 0 0
"3610" "exp3" 1 116 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 659 13 1
"3610" "exp3" 1 117 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 570 29 1
"3610" "exp3" 1 118 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 1 657 0 0
"3610" "exp3" 1 119 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 1288 15 1
"3610" "exp3" 1 120 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1231 0 0
"3610" "exp3" 1 121 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 659 12 1
"3610" "exp3" 1 122 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1001 21 1
"3610" "exp3" 1 123 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 977 0 0
"3610" "exp3" 1 124 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1028 32 1
"3610" "exp3" 1 125 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 1 2223 32 1
"3610" "exp3" 1 126 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 1 703 7 1
"3610" "exp3" 1 127 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1544 0 0
"3610" "exp3" 1 128 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1409 0 0
"3610" "exp3" 1 129 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 843 26 1
"3610" "exp3" 1 130 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 895 33 1
"3610" "exp3" 1 131 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 1231 31 1
"3610" "exp3" 1 132 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 596 0 0
"3610" "exp3" 2 1 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 2101 18 1
"3610" "exp3" 2 2 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1195 19 1
"3610" "exp3" 2 3 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 1 1063 0 0
"3610" "exp3" 2 4 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 1 955 0 0
"3610" "exp3" 2 5 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 1 619 29 1
"3610" "exp3" 2 6 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 849 0 0
"3610" "exp3" 2 7 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 1 1398 0 0
"3610" "exp3" 2 8 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1421 16 1
"3610" "exp3" 2 9 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 1 789 0 0
"3610" "exp3" 2 10 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 1 466 5 1
"3610" "exp3" 2 11 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1028 44 1
"3610" "exp3" 2 12 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1813 0 0
"3610" "exp3" 2 13 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 1 1439 20 1
"3610" "exp3" 2 14 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1516 94 1
"3610" "exp3" 2 15 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 1 1923 26 1
"3610" "exp3" 2 16 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1086 0 0
"3610" "exp3" 2 17 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1248 0 0
"3610" "exp3" 2 18 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 1204 0 0
"3610" "exp3" 2 19 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 1 949 22 1
"3610" "exp3" 2 20 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 734 27 1
"3610" "exp3" 2 21 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1028 0 0
"3610" "exp3" 2 22 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1499 45 1
"3610" "exp3" 2 23 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 1 696 27 1
"3610" "exp3" 2 24 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 818 44 1
"3610" "exp3" 2 25 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 653 39 1
"3610" "exp3" 2 26 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 1 3623 28 1
"3610" "exp3" 2 27 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 1 716 0 0
"3610" "exp3" 2 28 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 746 35 1
"3610" "exp3" 2 29 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 2247 0 0
"3610" "exp3" 2 30 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 2753 0 0
"3610" "exp3" 2 31 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 989 0 0
"3610" "exp3" 2 32 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 975 0 0
"3610" "exp3" 2 33 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 330 0 0
"3610" "exp3" 2 34 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 298 43 1
"3610" "exp3" 2 35 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 2 209 67 1
"3610" "exp3" 2 36 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 260 30 1
"3610" "exp3" 2 37 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 336 93 1
"3610" "exp3" 2 38 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 512 34 1
"3610" "exp3" 2 39 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 1 703 11 1
"3610" "exp3" 2 40 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 1 576 0 0
"3610" "exp3" 2 41 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 2 168 53 1
"3610" "exp3" 2 42 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 299 28 1
"3610" "exp3" 2 43 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 1 648 0 0
"3610" "exp3" 2 44 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 1 742 2 1
"3610" "exp3" 2 45 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1305 26 1
"3610" "exp3" 2 46 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 714 64 1
"3610" "exp3" 2 47 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 245 0 0
"3610" "exp3" 2 48 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1531 0 0
"3610" "exp3" 2 49 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1006 0 0
"3610" "exp3" 2 50 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 627 0 0
"3610" "exp3" 2 51 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 1632 31 1
"3610" "exp3" 2 52 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 1 1071 18 1
"3610" "exp3" 2 53 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 1 1531 18 1
"3610" "exp3" 2 54 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 1018 23 1
"3610" "exp3" 2 55 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 1 801 34 1
"3610" "exp3" 2 56 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 725 24 1
"3610" "exp3" 2 57 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 2 682 68 1
"3610" "exp3" 2 58 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 194 0 0
"3610" "exp3" 2 59 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 522 40 1
"3610" "exp3" 2 60 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 474 36 1
"3610" "exp3" 2 61 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 801 31 1
"3610" "exp3" 2 62 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 1 495 19 1
"3610" "exp3" 2 63 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 469 17 1
"3610" "exp3" 2 64 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1226 28 1
"3610" "exp3" 2 65 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 748 42 1
"3610" "exp3" 2 66 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 784 38 1
"3610" "exp3" 2 67 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 541 0 0
"3610" "exp3" 2 68 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 644 27 1
"3610" "exp3" 2 69 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 1 606 15 1
"3610" "exp3" 2 70 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 1 956 16 1
"3610" "exp3" 2 71 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 489 25 1
"3610" "exp3" 2 72 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 611 35 1
"3610" "exp3" 2 73 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 1 295 12 1
"3610" "exp3" 2 74 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 1 752 17 1
"3610" "exp3" 2 75 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 697 32 1
"3610" "exp3" 2 76 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 605 0 0
"3610" "exp3" 2 77 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 729 25 1
"3610" "exp3" 2 78 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 546 0 0
"3610" "exp3" 2 79 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 1 305 25 1
"3610" "exp3" 2 80 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 1289 0 0
"3610" "exp3" 2 81 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 762 23 1
"3610" "exp3" 2 82 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 2 1633 86 1
"3610" "exp3" 2 83 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 2 1032 0 0
"3610" "exp3" 2 84 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1203 0 0
"3610" "exp3" 2 85 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 860 21 1
"3610" "exp3" 2 86 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 228 68 1
"3610" "exp3" 2 87 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 2 276 0 0
"3610" "exp3" 2 88 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 1 377 0 0
"3610" "exp3" 2 89 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 1 518 21 1
"3610" "exp3" 2 90 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 607 69 1
"3610" "exp3" 2 91 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 728 0 0
"3610" "exp3" 2 92 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 424 0 0
"3610" "exp3" 2 93 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 2 648 0 0
"3610" "exp3" 2 94 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 762 22 1
"3610" "exp3" 2 95 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 559 30 1
"3610" "exp3" 2 96 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 1 406 15 1
"3610" "exp3" 2 97 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 1 432 30 1
"3610" "exp3" 2 98 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 2 245 0 0
"3610" "exp3" 2 99 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 546 19 1
"3610" "exp3" 2 100 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 1 459 0 0
"3610" "exp3" 2 101 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 653 26 1
"3610" "exp3" 2 102 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 1 520 0 0
"3610" "exp3" 2 103 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 1 536 9 1
"3610" "exp3" 2 104 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 553 13 1
"3610" "exp3" 2 105 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 1360 0 0
"3610" "exp3" 2 106 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 2 837 80 1
"3610" "exp3" 2 107 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 2 787 63 1
"3610" "exp3" 2 108 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 1549 45 1
"3610" "exp3" 2 109 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 965 0 0
"3610" "exp3" 2 110 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 1 645 0 0
"3610" "exp3" 2 111 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 762 0 0
"3610" "exp3" 2 112 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 1 1837 0 0
"3610" "exp3" 2 113 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 1 1284 21 1
"3610" "exp3" 2 114 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 1 655 29 1
"3610" "exp3" 2 115 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 1 430 9 1
"3610" "exp3" 2 116 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 1 728 28 1
"3610" "exp3" 2 117 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 508 20 1
"3610" "exp3" 2 118 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1508 43 1
"3610" "exp3" 2 119 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 506 0 0
"3610" "exp3" 2 120 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 1 549 3 1
"3610" "exp3" 2 121 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 630 29 1
"3610" "exp3" 2 122 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 242 21 1
"3610" "exp3" 2 123 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 249 64 1
"3610" "exp3" 2 124 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 204 0 0
"3610" "exp3" 2 125 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 1 167 0 0
"3610" "exp3" 2 126 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1209 0 0
"3610" "exp3" 2 127 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 631 33 1
"3610" "exp3" 2 128 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 2 466 0 0
"3610" "exp3" 2 129 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 235 0 0
"3610" "exp3" 2 130 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 251 24 1
"3610" "exp3" 2 131 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 189 0 0
"3610" "exp3" 2 132 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 2 248 77 1
"3701" "exp3" 1 1 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 5407 0 0
"3701" "exp3" 1 2 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 3516 44 1
"3701" "exp3" 1 3 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 4068 0 0
"3701" "exp3" 1 4 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 8782 17 1
"3701" "exp3" 1 5 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 4057 0 0
"3701" "exp3" 1 6 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 21212 28 1
"3701" "exp3" 1 7 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 1 11888 21 1
"3701" "exp3" 1 8 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 5703 28 1
"3701" "exp3" 1 9 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 1 5217 9 1
"3701" "exp3" 1 10 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 10368 0 0
"3701" "exp3" 1 11 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 1 6896 0 0
"3701" "exp3" 1 12 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 5440 17 1
"3701" "exp3" 1 13 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 1 9033 18 1
"3701" "exp3" 1 14 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 5840 0 0
"3701" "exp3" 1 15 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 7988 0 0
"3701" "exp3" 1 16 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 6258 0 0
"3701" "exp3" 1 17 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 3807 47 1
"3701" "exp3" 1 18 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 7403 0 0
"3701" "exp3" 1 19 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 17043 75 1
"3701" "exp3" 1 20 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 1 13089 26 1
"3701" "exp3" 1 21 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 7591 19 1
"3701" "exp3" 1 22 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 5875 0 0
"3701" "exp3" 1 23 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 3959 21 1
"3701" "exp3" 1 24 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 14231 0 0
"3701" "exp3" 1 25 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 6949 0 0
"3701" "exp3" 1 26 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 5602 30 1
"3701" "exp3" 1 27 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 5499 0 0
"3701" "exp3" 1 28 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 2782 91 1
"3701" "exp3" 1 29 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 19951 36 1
"3701" "exp3" 1 30 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 4099 31 1
"3701" "exp3" 1 31 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 6280 34 1
"3701" "exp3" 1 32 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 18951 43 1
"3701" "exp3" 1 33 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 10629 0 0
"3701" "exp3" 1 34 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 9439 0 0
"3701" "exp3" 1 35 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 12709 39 1
"3701" "exp3" 1 36 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 3394 88 1
"3701" "exp3" 1 37 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 3268 0 0
"3701" "exp3" 1 38 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 5729 0 0
"3701" "exp3" 1 39 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 5909 46 1
"3701" "exp3" 1 40 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 2622 30 1
"3701" "exp3" 1 41 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 2225 80 1
"3701" "exp3" 1 42 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 2143 0 0
"3701" "exp3" 1 43 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 3100 0 0
"3701" "exp3" 1 44 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 3421 0 0
"3701" "exp3" 1 45 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2822 27 1
"3701" "exp3" 1 46 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 7085 0 0
"3701" "exp3" 1 47 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 3318 0 0
"3701" "exp3" 1 48 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 5357 0 0
"3701" "exp3" 1 49 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 9498 44 1
"3701" "exp3" 1 50 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 3860 27 1
"3701" "exp3" 1 51 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 4387 70 1
"3701" "exp3" 1 52 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 2089 0 0
"3701" "exp3" 1 53 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 3482 16 1
"3701" "exp3" 1 54 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 11340 0 0
"3701" "exp3" 1 55 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 2487 0 0
"3701" "exp3" 1 56 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 2100 92 1
"3701" "exp3" 1 57 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 6697 18 1
"3701" "exp3" 1 58 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 4634 0 0
"3701" "exp3" 1 59 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 9248 69 1
"3701" "exp3" 1 60 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2281 25 1
"3701" "exp3" 1 61 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 5314 32 1
"3701" "exp3" 1 62 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 3343 0 0
"3701" "exp3" 1 63 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 18200 45 1
"3701" "exp3" 1 64 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2064 13 1
"3701" "exp3" 1 65 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 4172 0 0
"3701" "exp3" 1 66 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2110 33 1
"3701" "exp3" 1 67 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1966 0 0
"3701" "exp3" 1 68 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 3523 21 1
"3701" "exp3" 1 69 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 5243 0 0
"3701" "exp3" 1 70 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 10151 0 0
"3701" "exp3" 1 71 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 3917 23 1
"3701" "exp3" 1 72 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 8552 0 0
"3701" "exp3" 1 73 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 9823 0 0
"3701" "exp3" 1 74 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 4664 36 1
"3701" "exp3" 1 75 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 5970 0 0
"3701" "exp3" 1 76 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 11584 43 1
"3701" "exp3" 1 77 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2625 25 1
"3701" "exp3" 1 78 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 3761 29 1
"3701" "exp3" 1 79 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 3344 0 0
"3701" "exp3" 1 80 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 13113 41 1
"3701" "exp3" 1 81 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 4081 0 0
"3701" "exp3" 1 82 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 5345 0 0
"3701" "exp3" 1 83 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 2910 0 0
"3701" "exp3" 1 84 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 2596 0 0
"3701" "exp3" 1 85 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 9329 0 0
"3701" "exp3" 1 86 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 6218 0 0
"3701" "exp3" 1 87 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 2772 0 0
"3701" "exp3" 1 88 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 7394 0 0
"3701" "exp3" 1 89 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 2145 0 0
"3701" "exp3" 1 90 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 1722 0 0
"3701" "exp3" 1 91 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2467 0 0
"3701" "exp3" 1 92 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 4952 0 0
"3701" "exp3" 1 93 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 2722 0 0
"3701" "exp3" 1 94 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 7081 0 0
"3701" "exp3" 1 95 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 7115 40 1
"3701" "exp3" 1 96 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 4291 0 0
"3701" "exp3" 1 97 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 2358 14 1
"3701" "exp3" 1 98 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 5846 63 1
"3701" "exp3" 1 99 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 2234 0 0
"3701" "exp3" 1 100 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 2328 18 1
"3701" "exp3" 1 101 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 2069 0 0
"3701" "exp3" 1 102 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 13742 35 1
"3701" "exp3" 1 103 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2551 0 0
"3701" "exp3" 1 104 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 4162 0 0
"3701" "exp3" 1 105 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 2687 0 0
"3701" "exp3" 1 106 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 8858 0 0
"3701" "exp3" 1 107 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 4245 0 0
"3701" "exp3" 1 108 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 11593 0 0
"3701" "exp3" 1 109 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 3074 0 0
"3701" "exp3" 1 110 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 3073 68 1
"3701" "exp3" 1 111 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 4155 0 0
"3701" "exp3" 1 112 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 7297 48 1
"3701" "exp3" 1 113 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 3515 0 0
"3701" "exp3" 1 114 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1857 0 0
"3701" "exp3" 1 115 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 2090 0 0
"3701" "exp3" 1 116 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 2363 22 1
"3701" "exp3" 1 117 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1595 0 0
"3701" "exp3" 1 118 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1709 96 1
"3701" "exp3" 1 119 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 4933 0 0
"3701" "exp3" 1 120 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 5244 0 0
"3701" "exp3" 1 121 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 2524 0 0
"3701" "exp3" 1 122 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 5892 0 0
"3701" "exp3" 1 123 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 4869 72 1
"3701" "exp3" 1 124 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 5149 0 0
"3701" "exp3" 1 125 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2192 23 1
"3701" "exp3" 1 126 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 5600 29 1
"3701" "exp3" 1 127 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 1357 0 0
"3701" "exp3" 1 128 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 9256 0 0
"3701" "exp3" 1 129 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 3926 0 0
"3701" "exp3" 1 130 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 5517 0 0
"3701" "exp3" 1 131 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 5610 0 0
"3701" "exp3" 1 132 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 8193 0 0
"3701" "exp3" 2 1 "all-graphed" "pro-out" 72 28 24 76 72 28 24 76 2 4299 0 0
"3701" "exp3" 2 2 "all-graphed" "pro-out" 59 41 33 67 59 41 33 67 2 2631 67 1
"3701" "exp3" 2 3 "all-graphed" "pro-out" 91 9 1 99 91 9 1 99 2 1287 0 0
"3701" "exp3" 2 4 "all-graphed" "pro-prob" 70 30 38 62 70 30 38 62 1 3334 38 1
"3701" "exp3" 2 5 "all-graphed" "pro-out" 73 27 23 77 73 27 23 77 2 2476 0 0
"3701" "exp3" 2 6 "all-graphed" "pro-prob" 82 18 22 78 82 18 22 78 1 3142 22 1
"3701" "exp3" 2 7 "all-graphed" "pro-out" 74 26 18 82 74 26 18 82 2 2880 0 0
"3701" "exp3" 2 8 "all-graphed" "pro-prob" 60 40 48 52 60 40 48 52 1 3653 48 1
"3701" "exp3" 2 9 "all-graphed" "pro-out" 87 13 5 95 87 13 5 95 2 2207 95 1
"3701" "exp3" 2 10 "all-graphed" "pro-prob" 73 27 31 69 73 27 31 69 1 8133 0 0
"3701" "exp3" 2 11 "all-graphed" "pro-prob" 75 25 33 67 75 25 33 67 1 2439 33 1
"3701" "exp3" 2 12 "all-graphed" "pro-out" 62 38 30 70 62 38 30 70 2 3828 0 0
"3701" "exp3" 2 13 "all-graphed" "pro-prob" 79 21 25 75 79 21 25 75 1 2728 25 1
"3701" "exp3" 2 14 "all-graphed" "pro-prob" 80 20 24 76 80 20 24 76 1 1872 24 1
"3701" "exp3" 2 15 "all-graphed" "pro-out" 76 24 20 80 76 24 20 80 2 2825 0 0
"3701" "exp3" 2 16 "all-graphed" "pro-out" 78 22 18 82 78 22 18 82 2 2064 0 0
"3701" "exp3" 2 17 "all-graphed" "pro-prob" 71 29 33 67 71 29 33 67 1 2851 0 0
"3701" "exp3" 2 18 "all-graphed" "pro-prob" 76 24 32 68 76 24 32 68 1 2682 0 0
"3701" "exp3" 2 19 "all-graphed" "pro-out" 61 39 35 65 61 39 35 65 2 4620 0 0
"3701" "exp3" 2 20 "all-graphed" "pro-prob" 61 39 43 57 61 39 43 57 1 5211 0 0
"3701" "exp3" 2 21 "all-graphed" "pro-out" 68 32 28 72 68 32 28 72 2 3969 72 1
"3701" "exp3" 2 22 "all-graphed" "pro-out" 88 12 8 92 88 12 8 92 2 2689 0 0
"3701" "exp3" 2 23 "all-graphed" "pro-out" 89 11 3 97 89 11 3 97 2 1348 0 0
"3701" "exp3" 2 24 "all-graphed" "pro-prob" 71 29 37 63 71 29 37 63 1 3189 37 1
"3701" "exp3" 2 25 "all-graphed" "pro-out" 72 28 20 80 72 28 20 80 2 2307 0 0
"3701" "exp3" 2 26 "all-graphed" "pro-out" 85 15 11 89 85 15 11 89 2 4975 89 1
"3701" "exp3" 2 27 "all-graphed" "pro-out" 89 11 7 93 89 11 7 93 2 3561 0 0
"3701" "exp3" 2 28 "all-graphed" "pro-out" 60 40 32 68 60 40 32 68 2 3492 68 1
"3701" "exp3" 2 29 "all-graphed" "pro-out" 68 32 24 76 68 32 24 76 2 2363 0 0
"3701" "exp3" 2 30 "all-graphed" "pro-out" 70 30 26 74 70 30 26 74 2 2418 0 0
"3701" "exp3" 2 31 "all-graphed" "pro-prob" 78 22 30 70 78 22 30 70 1 2227 30 1
"3701" "exp3" 2 32 "all-graphed" "pro-prob" 81 19 27 73 81 19 27 73 1 2416 27 1
"3701" "exp3" 2 33 "all-graphed" "pro-out" 83 17 13 87 83 17 13 87 2 2955 0 0
"3701" "exp3" 2 34 "all-graphed" "pro-out" 75 25 21 79 75 25 21 79 2 2508 0 0
"3701" "exp3" 2 35 "all-graphed" "pro-prob" 76 24 28 72 76 24 28 72 1 3171 0 0
"3701" "exp3" 2 36 "all-graphed" "pro-out" 78 22 14 86 78 22 14 86 2 4341 0 0
"3701" "exp3" 2 37 "all-graphed" "pro-prob" 68 32 36 64 68 32 36 64 1 16706 0 0
"3701" "exp3" 2 38 "all-graphed" "pro-prob" 85 15 23 77 85 15 23 77 1 3693 23 1
"3701" "exp3" 2 39 "all-graphed" "pro-out" 77 23 15 85 77 23 15 85 2 2097 0 0
"3701" "exp3" 2 40 "all-graphed" "pro-prob" 69 31 39 61 69 31 39 61 1 2336 39 1
"3701" "exp3" 2 41 "all-graphed" "pro-out" 69 31 23 77 69 31 23 77 2 2479 77 1
"3701" "exp3" 2 42 "all-graphed" "pro-prob" 89 11 15 85 89 11 15 85 1 2382 15 1
"3701" "exp3" 2 43 "all-graphed" "pro-out" 91 9 5 95 91 9 5 95 2 1665 0 0
"3701" "exp3" 2 44 "all-graphed" "pro-prob" 59 41 49 51 59 41 49 51 1 5792 0 0
"3701" "exp3" 2 45 "all-graphed" "pro-prob" 68 32 40 60 68 32 40 60 1 2818 40 1
"3701" "exp3" 2 46 "all-graphed" "pro-prob" 73 27 35 65 73 27 35 65 1 4788 0 0
"3701" "exp3" 2 47 "all-graphed" "pro-out" 64 36 32 68 64 36 32 68 2 4349 0 0
"3701" "exp3" 2 48 "all-graphed" "pro-prob" 86 14 18 82 86 14 18 82 1 8223 18 1
"3701" "exp3" 2 49 "all-graphed" "pro-prob" 77 23 31 69 77 23 31 69 1 2186 0 0
"3701" "exp3" 2 50 "all-graphed" "pro-prob" 84 16 20 80 84 16 20 80 1 1975 20 1
"3701" "exp3" 2 51 "all-graphed" "pro-prob" 90 10 14 86 90 10 14 86 1 4374 14 1
"3701" "exp3" 2 52 "all-graphed" "pro-prob" 72 28 32 68 72 28 32 68 1 3550 32 1
"3701" "exp3" 2 53 "all-graphed" "pro-out" 82 18 10 90 82 18 10 90 2 1405 0 0
"3701" "exp3" 2 54 "all-graphed" "pro-out" 84 16 12 88 84 16 12 88 2 4411 0 0
"3701" "exp3" 2 55 "all-graphed" "pro-out" 63 37 29 71 63 37 29 71 2 4128 71 1
"3701" "exp3" 2 56 "all-graphed" "pro-out" 90 10 2 98 90 10 2 98 2 3787 0 0
"3701" "exp3" 2 57 "all-graphed" "pro-prob" 63 37 45 55 63 37 45 55 1 4833 0 0
"3701" "exp3" 2 58 "all-graphed" "pro-prob" 74 26 30 70 74 26 30 70 1 3426 0 0
"3701" "exp3" 2 59 "all-graphed" "pro-out" 62 38 34 66 62 38 34 66 2 5447 0 0
"3701" "exp3" 2 60 "all-graphed" "pro-prob" 62 38 42 58 62 38 42 58 1 13434 0 0
"3701" "exp3" 2 61 "all-graphed" "pro-prob" 84 16 24 76 84 16 24 76 1 1968 24 1
"3701" "exp3" 2 62 "all-graphed" "pro-prob" 86 14 22 78 86 14 22 78 1 3476 22 1
"3701" "exp3" 2 63 "all-graphed" "pro-prob" 81 19 23 77 81 19 23 77 1 2845 23 1
"3701" "exp3" 2 64 "all-graphed" "pro-prob" 74 26 34 66 74 26 34 66 1 4532 0 0
"3701" "exp3" 2 65 "all-graphed" "pro-out" 85 15 7 93 85 15 7 93 2 1584 0 0
"3701" "exp3" 2 66 "all-graphed" "pro-prob" 65 35 39 61 65 35 39 61 1 6513 39 1
"3701" "exp3" 2 67 "all-graphed" "pro-out" 71 29 21 79 71 29 21 79 2 4161 0 0
"3701" "exp3" 2 68 "all-graphed" "pro-prob" 62 38 46 54 62 38 46 54 1 6849 46 1
"3701" "exp3" 2 69 "all-graphed" "pro-out" 66 34 30 70 66 34 30 70 2 4710 0 0
"3701" "exp3" 2 70 "all-graphed" "pro-prob" 59 41 45 55 59 41 45 55 1 15312 45 1
"3701" "exp3" 2 71 "all-graphed" "pro-prob" 91 9 13 87 91 9 13 87 1 2274 13 1
"3701" "exp3" 2 72 "all-graphed" "pro-out" 88 12 4 96 88 12 4 96 2 1314 0 0
"3701" "exp3" 2 73 "all-graphed" "pro-prob" 67 33 41 59 67 33 41 59 1 4140 41 1
"3701" "exp3" 2 74 "all-graphed" "pro-prob" 85 15 19 81 85 15 19 81 1 2043 19 1
"3701" "exp3" 2 75 "all-graphed" "pro-out" 87 13 9 91 87 13 9 91 2 1242 0 0
"3701" "exp3" 2 76 "all-graphed" "pro-prob" 87 13 21 79 87 13 21 79 1 1988 21 1
"3701" "exp3" 2 77 "all-graphed" "pro-prob" 63 37 41 59 63 37 41 59 1 3166 41 1
"3701" "exp3" 2 78 "all-graphed" "pro-out" 84 16 8 92 84 16 8 92 2 1064 0 0
"3701" "exp3" 2 79 "all-graphed" "pro-prob" 89 11 19 81 89 11 19 81 1 1607 19 1
"3701" "exp3" 2 80 "all-graphed" "pro-out" 86 14 10 90 86 14 10 90 2 1027 0 0
"3701" "exp3" 2 81 "all-graphed" "pro-out" 59 41 37 63 59 41 37 63 2 3670 0 0
"3701" "exp3" 2 82 "all-graphed" "pro-prob" 60 40 44 56 60 40 44 56 1 7180 0 0
"3701" "exp3" 2 83 "all-graphed" "pro-out" 76 24 16 84 76 24 16 84 2 1916 0 0
"3701" "exp3" 2 84 "all-graphed" "pro-prob" 61 39 47 53 61 39 47 53 1 5951 0 0
"3701" "exp3" 2 85 "all-graphed" "pro-prob" 70 30 34 66 70 30 34 66 1 3554 34 1
"3701" "exp3" 2 86 "all-graphed" "pro-prob" 64 36 40 60 64 36 40 60 1 3797 40 1
"3701" "exp3" 2 87 "all-graphed" "pro-out" 63 37 33 67 63 37 33 67 2 4304 0 0
"3701" "exp3" 2 88 "all-graphed" "pro-out" 79 21 17 83 79 21 17 83 2 1667 0 0
"3701" "exp3" 2 89 "all-graphed" "pro-out" 61 39 31 69 61 39 31 69 2 4035 0 0
"3701" "exp3" 2 90 "all-graphed" "pro-prob" 83 17 21 79 83 17 21 79 1 1658 21 1
"3701" "exp3" 2 91 "all-graphed" "pro-out" 86 14 6 94 86 14 6 94 2 1055 0 0
"3701" "exp3" 2 92 "all-graphed" "pro-prob" 65 35 43 57 65 35 43 57 1 5263 0 0
"3701" "exp3" 2 93 "all-graphed" "pro-out" 65 35 31 69 65 35 31 69 2 3379 69 1
"3701" "exp3" 2 94 "all-graphed" "pro-prob" 75 25 29 71 75 25 29 71 1 3657 0 0
"3701" "exp3" 2 95 "all-graphed" "pro-prob" 67 33 37 63 67 33 37 63 1 5016 37 1
"3701" "exp3" 2 96 "all-graphed" "pro-out" 70 30 22 78 70 30 22 78 2 2247 78 1
"3701" "exp3" 2 97 "all-graphed" "pro-out" 67 33 25 75 67 33 25 75 2 2639 75 1
"3701" "exp3" 2 98 "all-graphed" "pro-out" 60 40 36 64 60 40 36 64 2 2798 0 0
"3701" "exp3" 2 99 "all-graphed" "pro-prob" 87 13 17 83 87 13 17 83 1 3776 17 1
"3701" "exp3" 2 100 "all-graphed" "pro-out" 64 36 28 72 64 36 28 72 2 4815 0 0
"3701" "exp3" 2 101 "all-graphed" "pro-prob" 88 12 20 80 88 12 20 80 1 7885 20 1
"3701" "exp3" 2 102 "all-graphed" "pro-out" 73 27 19 81 73 27 19 81 2 5495 0 0
"3701" "exp3" 2 103 "all-graphed" "pro-out" 80 20 16 84 80 20 16 84 2 3033 0 0
"3701" "exp3" 2 104 "all-graphed" "pro-out" 82 18 14 86 82 18 14 86 2 1411 0 0
"3701" "exp3" 2 105 "all-graphed" "pro-prob" 69 31 35 65 69 31 35 65 1 3239 35 1
"3701" "exp3" 2 106 "all-graphed" "pro-out" 77 23 19 81 77 23 19 81 2 2715 0 0
"3701" "exp3" 2 107 "all-graphed" "pro-prob" 64 36 44 56 64 36 44 56 1 3351 44 1
"3701" "exp3" 2 108 "all-graphed" "pro-prob" 82 18 26 74 82 18 26 74 1 2331 0 0
"3701" "exp3" 2 109 "all-graphed" "pro-prob" 72 28 36 64 72 28 36 64 1 3289 0 0
"3701" "exp3" 2 110 "all-graphed" "pro-prob" 88 12 16 84 88 12 16 84 1 2821 16 1
"3701" "exp3" 2 111 "all-graphed" "pro-out" 80 20 12 88 80 20 12 88 2 1938 88 1
"3701" "exp3" 2 112 "all-graphed" "pro-out" 90 10 6 94 90 10 6 94 2 1166 94 1
"3701" "exp3" 2 113 "all-graphed" "pro-out" 75 25 17 83 75 25 17 83 2 3099 0 0
"3701" "exp3" 2 114 "all-graphed" "pro-out" 66 34 26 74 66 34 26 74 2 2987 0 0
"3701" "exp3" 2 115 "all-graphed" "pro-out" 79 21 13 87 79 21 13 87 2 1644 0 0
"3701" "exp3" 2 116 "all-graphed" "pro-prob" 83 17 25 75 83 17 25 75 1 2535 25 1
"3701" "exp3" 2 117 "all-graphed" "pro-prob" 90 10 18 82 90 10 18 82 1 1700 18 1
"3701" "exp3" 2 118 "all-graphed" "pro-out" 74 26 22 78 74 26 22 78 2 4077 0 0
"3701" "exp3" 2 119 "all-graphed" "pro-out" 71 29 25 75 71 29 25 75 2 2555 75 1
"3701" "exp3" 2 120 "all-graphed" "pro-out" 67 33 29 71 67 33 29 71 2 3719 0 0
"3701" "exp3" 2 121 "all-graphed" "pro-prob" 80 20 28 72 80 20 28 72 1 2162 28 1
"3701" "exp3" 2 122 "all-graphed" "pro-out" 65 35 27 73 65 35 27 73 2 2015 0 0
"3701" "exp3" 2 123 "all-graphed" "pro-prob" 66 34 42 58 66 34 42 58 1 3770 0 0
"3701" "exp3" 2 124 "all-graphed" "pro-prob" 66 34 38 62 66 34 38 62 1 3951 0 0
"3701" "exp3" 2 125 "all-graphed" "pro-out" 81 19 15 85 81 19 15 85 2 2247 0 0
"3701" "exp3" 2 126 "all-graphed" "pro-out" 69 31 27 73 69 31 27 73 2 2950 0 0
"3701" "exp3" 2 127 "all-graphed" "pro-prob" 77 23 27 73 77 23 27 73 1 3310 27 1
"3701" "exp3" 2 128 "all-graphed" "pro-out" 81 19 11 89 81 19 11 89 2 1776 0 0
"3701" "exp3" 2 129 "all-graphed" "pro-prob" 91 9 17 83 91 9 17 83 1 2567 17 1
"3701" "exp3" 2 130 "all-graphed" "pro-prob" 79 21 29 71 79 21 29 71 1 2467 29 1
"3701" "exp3" 2 131 "all-graphed" "pro-out" 83 17 9 91 83 17 9 91 2 1231 0 0
"3701" "exp3" 2 132 "all-graphed" "pro-prob" 78 22 26 74 78 22 26 74 1 3236 26 1
"3701" "exp3" 1 1 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 3289 0 0
"3701" "exp3" 1 2 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2449 97 1
"3701" "exp3" 1 3 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 4682 0 0
"3701" "exp3" 1 4 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 2371 78 1
"3701" "exp3" 1 5 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 1925 0 0
"3701" "exp3" 1 6 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 1818 0 0
"3701" "exp3" 1 7 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 3404 0 0
"3701" "exp3" 1 8 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 5566 0 0
"3701" "exp3" 1 9 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 2528 96 1
"3701" "exp3" 1 10 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 6935 40 1
"3701" "exp3" 1 11 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 2075 18 1
"3701" "exp3" 1 12 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 2675 20 1
"3701" "exp3" 1 13 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 11672 0 0
"3701" "exp3" 1 14 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 2508 33 1
"3701" "exp3" 1 15 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2671 41 1
"3701" "exp3" 1 16 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 2194 90 1
"3701" "exp3" 1 17 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 2392 0 0
"3701" "exp3" 1 18 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1303 0 0
"3701" "exp3" 1 19 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 5717 39 1
"3701" "exp3" 1 20 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1872 14 1
"3701" "exp3" 1 21 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 4689 23 1
"3701" "exp3" 1 22 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 4245 36 1
"3701" "exp3" 1 23 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 3841 35 1
"3701" "exp3" 1 24 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 2261 0 0
"3701" "exp3" 1 25 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 4079 35 1
"3701" "exp3" 1 26 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 2564 30 1
"3701" "exp3" 1 27 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 3720 32 1
"3701" "exp3" 1 28 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 1079 93 1
"3701" "exp3" 1 29 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 4407 0 0
"3701" "exp3" 1 30 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 5310 70 1
"3701" "exp3" 1 31 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 4184 0 0
"3701" "exp3" 1 32 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 3738 21 1
"3701" "exp3" 1 33 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 1968 80 1
"3701" "exp3" 1 34 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 1642 83 1
"3701" "exp3" 1 35 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 2151 0 0
"3701" "exp3" 1 36 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 3031 0 0
"3701" "exp3" 1 37 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 2030 24 1
"3701" "exp3" 1 38 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 939 83 1
"3701" "exp3" 1 39 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 3176 25 1
"3701" "exp3" 1 40 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 2255 0 0
"3701" "exp3" 1 41 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1705 22 1
"3701" "exp3" 1 42 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 2382 0 0
"3701" "exp3" 1 43 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 5392 31 1
"3701" "exp3" 1 44 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 6937 0 0
"3701" "exp3" 1 45 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 4643 0 0
"3701" "exp3" 1 46 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 3868 0 0
"3701" "exp3" 1 47 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 3549 48 1
"3701" "exp3" 1 48 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 4359 19 1
"3701" "exp3" 1 49 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 6185 27 1
"3701" "exp3" 1 50 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1889 0 0
"3701" "exp3" 1 51 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 3771 0 0
"3701" "exp3" 1 52 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 5372 0 0
"3701" "exp3" 1 53 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 2115 0 0
"3701" "exp3" 1 54 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 4689 0 0
"3701" "exp3" 1 55 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 4085 66 1
"3701" "exp3" 1 56 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 4669 0 0
"3701" "exp3" 1 57 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 1892 82 1
"3701" "exp3" 1 58 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 2571 30 1
"3701" "exp3" 1 59 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 2173 21 1
"3701" "exp3" 1 60 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 4363 0 0
"3701" "exp3" 1 61 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 2938 32 1
"3701" "exp3" 1 62 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 4239 0 0
"3701" "exp3" 1 63 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 6745 39 1
"3701" "exp3" 1 64 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 2262 84 1
"3701" "exp3" 1 65 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1982 0 0
"3701" "exp3" 1 66 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 6748 0 0
"3701" "exp3" 1 67 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 4713 28 1
"3701" "exp3" 1 68 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 5070 31 1
"3701" "exp3" 1 69 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1345 0 0
"3701" "exp3" 1 70 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 5999 45 1
"3701" "exp3" 1 71 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 5104 0 0
"3701" "exp3" 1 72 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 2726 0 0
"3701" "exp3" 1 73 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 2220 0 0
"3701" "exp3" 1 74 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 7481 40 1
"3701" "exp3" 1 75 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 4817 46 1
"3701" "exp3" 1 76 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 1615 0 0
"3701" "exp3" 1 77 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1028 0 0
"3701" "exp3" 1 78 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 3830 0 0
"3701" "exp3" 1 79 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 3034 15 1
"3701" "exp3" 1 80 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 2065 0 0
"3701" "exp3" 1 81 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 4737 0 0
"3701" "exp3" 1 82 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 1419 0 0
"3701" "exp3" 1 83 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 2860 24 1
"3701" "exp3" 1 84 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 4615 0 0
"3701" "exp3" 1 85 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 2021 0 0
"3701" "exp3" 1 86 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 1693 0 0
"3701" "exp3" 1 87 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1445 0 0
"3701" "exp3" 1 88 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 2495 29 1
"3701" "exp3" 1 89 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 4885 0 0
"3701" "exp3" 1 90 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 875 0 0
"3701" "exp3" 1 91 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1958 0 0
"3701" "exp3" 1 92 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 9919 80 1
"3701" "exp3" 1 93 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 4040 28 1
"3701" "exp3" 1 94 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1424 0 0
"3701" "exp3" 1 95 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2671 0 0
"3701" "exp3" 1 96 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 1522 0 0
"3701" "exp3" 1 97 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 3100 0 0
"3701" "exp3" 1 98 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 3099 0 0
"3701" "exp3" 1 99 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 1 2110 18 1
"3701" "exp3" 1 100 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 8308 47 1
"3701" "exp3" 1 101 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2904 0 0
"3701" "exp3" 1 102 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 2460 0 0
"3701" "exp3" 1 103 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 2221 78 1
"3701" "exp3" 1 104 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 2581 0 0
"3701" "exp3" 1 105 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1504 25 1
"3701" "exp3" 1 106 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 2 1637 0 0
"3701" "exp3" 1 107 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 4844 44 1
"3701" "exp3" 1 108 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 5086 0 0
"3701" "exp3" 1 109 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1725 23 1
"3701" "exp3" 1 110 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3280 0 0
"3701" "exp3" 1 111 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 3286 0 0
"3701" "exp3" 1 112 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 2967 0 0
"3701" "exp3" 1 113 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1523 26 1
"3701" "exp3" 1 114 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 2747 73 1
"3701" "exp3" 1 115 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1828 13 1
"3701" "exp3" 1 116 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 4420 45 1
"3701" "exp3" 1 117 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 3813 0 0
"3701" "exp3" 1 118 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1271 17 1
"3701" "exp3" 1 119 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 4474 0 0
"3701" "exp3" 1 120 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 2110 0 0
"3701" "exp3" 1 121 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1291 22 1
"3701" "exp3" 1 122 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1517 0 0
"3701" "exp3" 1 123 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 2258 0 0
"3701" "exp3" 1 124 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 7572 0 0
"3701" "exp3" 1 125 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 5062 37 1
"3701" "exp3" 1 126 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 1024 0 0
"3701" "exp3" 1 127 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1159 0 0
"3701" "exp3" 1 128 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 2233 0 0
"3701" "exp3" 1 129 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 3870 0 0
"3701" "exp3" 1 130 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 5027 38 1
"3701" "exp3" 1 131 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 1647 0 0
"3701" "exp3" 1 132 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 2078 74 1
"3701" "exp3" 2 1 "graphed-outcome" "pro-out" 67 33 25 75 67 33 25 75 2 2159 0 0
"3701" "exp3" 2 2 "graphed-outcome" "pro-prob" 86 14 18 82 86 14 18 82 2 1884 0 0
"3701" "exp3" 2 3 "graphed-outcome" "pro-prob" 65 35 43 57 65 35 43 57 1 5773 43 1
"3701" "exp3" 2 4 "graphed-outcome" "pro-out" 65 35 27 73 65 35 27 73 2 2310 73 1
"3701" "exp3" 2 5 "graphed-outcome" "pro-prob" 69 31 39 61 69 31 39 61 1 2529 39 1
"3701" "exp3" 2 6 "graphed-outcome" "pro-out" 84 16 12 88 84 16 12 88 2 2061 0 0
"3701" "exp3" 2 7 "graphed-outcome" "pro-out" 88 12 4 96 88 12 4 96 2 1112 0 0
"3701" "exp3" 2 8 "graphed-outcome" "pro-prob" 73 27 31 69 73 27 31 69 1 2727 31 1
"3701" "exp3" 2 9 "graphed-outcome" "pro-prob" 65 35 39 61 65 35 39 61 1 2924 0 0
"3701" "exp3" 2 10 "graphed-outcome" "pro-prob" 64 36 40 60 64 36 40 60 1 2496 0 0
"3701" "exp3" 2 11 "graphed-outcome" "pro-out" 77 23 15 85 77 23 15 85 2 1561 85 1
"3701" "exp3" 2 12 "graphed-outcome" "pro-out" 86 14 10 90 86 14 10 90 2 2018 0 0
"3701" "exp3" 2 13 "graphed-outcome" "pro-prob" 69 31 35 65 69 31 35 65 1 3803 35 1
"3701" "exp3" 2 14 "graphed-outcome" "pro-prob" 67 33 37 63 67 33 37 63 1 4044 0 0
"3701" "exp3" 2 15 "graphed-outcome" "pro-prob" 66 34 38 62 66 34 38 62 1 3035 0 0
"3701" "exp3" 2 16 "graphed-outcome" "pro-prob" 83 17 21 79 83 17 21 79 1 2423 21 1
"3701" "exp3" 2 17 "graphed-outcome" "pro-out" 91 9 5 95 91 9 5 95 2 945 0 0
"3701" "exp3" 2 18 "graphed-outcome" "pro-prob" 73 27 35 65 73 27 35 65 1 2575 35 1
"3701" "exp3" 2 19 "graphed-outcome" "pro-prob" 78 22 26 74 78 22 26 74 1 3184 0 0
"3701" "exp3" 2 20 "graphed-outcome" "pro-prob" 91 9 13 87 91 9 13 87 1 1400 13 1
"3701" "exp3" 2 21 "graphed-outcome" "pro-prob" 63 37 41 59 63 37 41 59 1 1775 0 0
"3701" "exp3" 2 22 "graphed-outcome" "pro-out" 70 30 26 74 70 30 26 74 2 2249 74 1
"3701" "exp3" 2 23 "graphed-outcome" "pro-prob" 78 22 30 70 78 22 30 70 1 2057 0 0
"3701" "exp3" 2 24 "graphed-outcome" "pro-out" 85 15 11 89 85 15 11 89 2 1102 0 0
"3701" "exp3" 2 25 "graphed-outcome" "pro-out" 72 28 24 76 72 28 24 76 2 2186 0 0
"3701" "exp3" 2 26 "graphed-outcome" "pro-prob" 81 19 27 73 81 19 27 73 1 1073 27 1
"3701" "exp3" 2 27 "graphed-outcome" "pro-out" 87 13 5 95 87 13 5 95 2 776 95 1
"3701" "exp3" 2 28 "graphed-outcome" "pro-out" 62 38 30 70 62 38 30 70 2 2264 0 0
"3701" "exp3" 2 29 "graphed-outcome" "pro-out" 63 37 29 71 63 37 29 71 2 2875 0 0
"3701" "exp3" 2 30 "graphed-outcome" "pro-prob" 60 40 44 56 60 40 44 56 1 2825 0 0
"3701" "exp3" 2 31 "graphed-outcome" "pro-out" 85 15 7 93 85 15 7 93 2 1451 0 0
"3701" "exp3" 2 32 "graphed-outcome" "pro-prob" 64 36 44 56 64 36 44 56 1 4951 0 0
"3701" "exp3" 2 33 "graphed-outcome" "pro-prob" 83 17 25 75 83 17 25 75 1 4202 25 1
"3701" "exp3" 2 34 "graphed-outcome" "pro-out" 72 28 20 80 72 28 20 80 2 3084 80 1
"3701" "exp3" 2 35 "graphed-outcome" "pro-prob" 68 32 40 60 68 32 40 60 1 15979 0 0
"3701" "exp3" 2 36 "graphed-outcome" "pro-prob" 68 32 36 64 68 32 36 64 1 6246 36 1
"3701" "exp3" 2 37 "graphed-outcome" "pro-prob" 82 18 26 74 82 18 26 74 1 1632 0 0
"3701" "exp3" 2 38 "graphed-outcome" "pro-out" 68 32 28 72 68 32 28 72 2 1708 0 0
"3701" "exp3" 2 39 "graphed-outcome" "pro-prob" 80 20 24 76 80 20 24 76 1 1984 24 1
"3701" "exp3" 2 40 "graphed-outcome" "pro-out" 76 24 16 84 76 24 16 84 2 1482 0 0
"3701" "exp3" 2 41 "graphed-outcome" "pro-prob" 85 15 19 81 85 15 19 81 1 1098 19 1
"3701" "exp3" 2 42 "graphed-outcome" "pro-prob" 72 28 32 68 72 28 32 68 1 1489 0 0
"3701" "exp3" 2 43 "graphed-outcome" "pro-out" 60 40 32 68 60 40 32 68 2 990 68 1
"3701" "exp3" 2 44 "graphed-outcome" "pro-out" 79 21 13 87 79 21 13 87 2 825 87 1
"3701" "exp3" 2 45 "graphed-outcome" "pro-prob" 91 9 17 83 91 9 17 83 1 1934 17 1
"3701" "exp3" 2 46 "graphed-outcome" "pro-out" 75 25 21 79 75 25 21 79 2 2149 79 1
"3701" "exp3" 2 47 "graphed-outcome" "pro-out" 90 10 2 98 90 10 2 98 2 1436 0 0
"3701" "exp3" 2 48 "graphed-outcome" "pro-prob" 62 38 46 54 62 38 46 54 1 3849 46 1
"3701" "exp3" 2 49 "graphed-outcome" "pro-out" 70 30 22 78 70 30 22 78 2 2245 78 1
"3701" "exp3" 2 50 "graphed-outcome" "pro-out" 87 13 9 91 87 13 9 91 2 1181 0 0
"3701" "exp3" 2 51 "graphed-outcome" "pro-prob" 87 13 17 83 87 13 17 83 1 1282 17 1
"3701" "exp3" 2 52 "graphed-outcome" "pro-prob" 72 28 36 64 72 28 36 64 1 1894 0 0
"3701" "exp3" 2 53 "graphed-outcome" "pro-out" 83 17 9 91 83 17 9 91 2 835 0 0
"3701" "exp3" 2 54 "graphed-outcome" "pro-out" 74 26 18 82 74 26 18 82 2 2448 0 0
"3701" "exp3" 2 55 "graphed-outcome" "pro-prob" 90 10 14 86 90 10 14 86 1 1517 14 1
"3701" "exp3" 2 56 "graphed-outcome" "pro-out" 59 41 37 63 59 41 37 63 2 1690 0 0
"3701" "exp3" 2 57 "graphed-outcome" "pro-out" 78 22 14 86 78 22 14 86 2 1280 0 0
"3701" "exp3" 2 58 "graphed-outcome" "pro-prob" 75 25 29 71 75 25 29 71 1 2322 0 0
"3701" "exp3" 2 59 "graphed-outcome" "pro-out" 81 19 11 89 81 19 11 89 2 2285 0 0
"3701" "exp3" 2 60 "graphed-outcome" "pro-prob" 90 10 18 82 90 10 18 82 1 1284 0 0
"3701" "exp3" 2 61 "graphed-outcome" "pro-out" 64 36 32 68 64 36 32 68 2 2992 68 1
"3701" "exp3" 2 62 "graphed-outcome" "pro-out" 74 26 22 78 74 26 22 78 2 1889 0 0
"3701" "exp3" 2 63 "graphed-outcome" "pro-prob" 76 24 32 68 76 24 32 68 1 1832 0 0
"3701" "exp3" 2 64 "graphed-outcome" "pro-prob" 77 23 31 69 77 23 31 69 1 1019 31 1
"3701" "exp3" 2 65 "graphed-outcome" "pro-prob" 77 23 27 73 77 23 27 73 1 1454 27 1
"3701" "exp3" 2 66 "graphed-outcome" "pro-out" 73 27 19 81 73 27 19 81 2 1137 81 1
"3701" "exp3" 2 67 "graphed-outcome" "pro-prob" 82 18 22 78 82 18 22 78 1 1697 22 1
"3701" "exp3" 2 68 "graphed-outcome" "pro-prob" 71 29 37 63 71 29 37 63 1 1194 37 1
"3701" "exp3" 2 69 "graphed-outcome" "pro-out" 63 37 33 67 63 37 33 67 2 3569 0 0
"3701" "exp3" 2 70 "graphed-outcome" "pro-out" 83 17 13 87 83 17 13 87 2 798 0 0
"3701" "exp3" 2 71 "graphed-outcome" "pro-prob" 63 37 45 55 63 37 45 55 1 2020 0 0
"3701" "exp3" 2 72 "graphed-outcome" "pro-prob" 84 16 20 80 84 16 20 80 1 1674 20 1
"3701" "exp3" 2 73 "graphed-outcome" "pro-out" 89 11 3 97 89 11 3 97 2 2134 0 0
"3701" "exp3" 2 74 "graphed-outcome" "pro-out" 80 20 12 88 80 20 12 88 2 1804 0 0
"3701" "exp3" 2 75 "graphed-outcome" "pro-out" 80 20 16 84 80 20 16 84 2 1120 0 0
"3701" "exp3" 2 76 "graphed-outcome" "pro-prob" 70 30 34 66 70 30 34 66 1 1729 34 1
"3701" "exp3" 2 77 "graphed-outcome" "pro-prob" 88 12 20 80 88 12 20 80 1 874 0 0
"3701" "exp3" 2 78 "graphed-outcome" "pro-prob" 79 21 29 71 79 21 29 71 1 1499 0 0
"3701" "exp3" 2 79 "graphed-outcome" "pro-out" 88 12 8 92 88 12 8 92 2 1697 0 0
"3701" "exp3" 2 80 "graphed-outcome" "pro-prob" 71 29 33 67 71 29 33 67 1 1572 0 0
"3701" "exp3" 2 81 "graphed-outcome" "pro-out" 65 35 31 69 65 35 31 69 2 2131 69 1
"3701" "exp3" 2 82 "graphed-outcome" "pro-out" 60 40 36 64 60 40 36 64 2 1458 64 1
"3701" "exp3" 2 83 "graphed-outcome" "pro-out" 67 33 29 71 67 33 29 71 2 2188 0 0
"3701" "exp3" 2 84 "graphed-outcome" "pro-prob" 89 11 15 85 89 11 15 85 1 1657 0 0
"3701" "exp3" 2 85 "graphed-outcome" "pro-prob" 86 14 22 78 86 14 22 78 1 1397 22 1
"3701" "exp3" 2 86 "graphed-outcome" "pro-prob" 66 34 42 58 66 34 42 58 1 1626 0 0
"3701" "exp3" 2 87 "graphed-outcome" "pro-prob" 60 40 48 52 60 40 48 52 1 4709 0 0
"3701" "exp3" 2 88 "graphed-outcome" "pro-out" 69 31 23 77 69 31 23 77 2 2803 0 0
"3701" "exp3" 2 89 "graphed-outcome" "pro-prob" 79 21 25 75 79 21 25 75 1 1858 25 1
"3701" "exp3" 2 90 "graphed-outcome" "pro-out" 86 14 6 94 86 14 6 94 2 1225 0 0
"3701" "exp3" 2 91 "graphed-outcome" "pro-prob" 76 24 28 72 76 24 28 72 1 3239 28 1
"3701" "exp3" 2 92 "graphed-outcome" "pro-prob" 87 13 21 79 87 13 21 79 1 2281 21 1
"3701" "exp3" 2 93 "graphed-outcome" "pro-out" 73 27 23 77 73 27 23 77 2 1769 77 1
"3701" "exp3" 2 94 "graphed-outcome" "pro-prob" 80 20 28 72 80 20 28 72 1 1155 0 0
"3701" "exp3" 2 95 "graphed-outcome" "pro-out" 71 29 25 75 71 29 25 75 2 3109 75 1
"3701" "exp3" 2 96 "graphed-outcome" "pro-out" 59 41 33 67 59 41 33 67 2 1819 0 0
"3701" "exp3" 2 97 "graphed-outcome" "pro-prob" 62 38 42 58 62 38 42 58 1 1687 0 0
"3701" "exp3" 2 98 "graphed-outcome" "pro-prob" 59 41 49 51 59 41 49 51 1 3103 49 1
"3701" "exp3" 2 99 "graphed-outcome" "pro-out" 64 36 28 72 64 36 28 72 2 1789 72 1
"3701" "exp3" 2 100 "graphed-outcome" "pro-out" 77 23 19 81 77 23 19 81 2 1453 0 0
"3701" "exp3" 2 101 "graphed-outcome" "pro-prob" 61 39 43 57 61 39 43 57 1 1301 43 1
"3701" "exp3" 2 102 "graphed-outcome" "pro-prob" 75 25 33 67 75 25 33 67 1 1841 0 0
"3701" "exp3" 2 103 "graphed-outcome" "pro-prob" 85 15 23 77 85 15 23 77 1 1478 23 1
"3701" "exp3" 2 104 "graphed-outcome" "pro-prob" 88 12 16 84 88 12 16 84 1 1692 0 0
"3701" "exp3" 2 105 "graphed-outcome" "pro-out" 82 18 10 90 82 18 10 90 2 1027 0 0
"3701" "exp3" 2 106 "graphed-outcome" "pro-out" 61 39 31 69 61 39 31 69 2 2042 0 0
"3701" "exp3" 2 107 "graphed-outcome" "pro-out" 68 32 24 76 68 32 24 76 2 1670 0 0
"3701" "exp3" 2 108 "graphed-outcome" "pro-prob" 59 41 45 55 59 41 45 55 1 3296 45 1
"3701" "exp3" 2 109 "graphed-outcome" "pro-prob" 70 30 38 62 70 30 38 62 1 1393 0 0
"3701" "exp3" 2 110 "graphed-outcome" "pro-out" 66 34 26 74 66 34 26 74 2 1144 74 1
"3701" "exp3" 2 111 "graphed-outcome" "pro-prob" 67 33 41 59 67 33 41 59 1 2801 0 0
"3701" "exp3" 2 112 "graphed-outcome" "pro-out" 79 21 17 83 79 21 17 83 2 1696 83 1
"3701" "exp3" 2 113 "graphed-outcome" "pro-prob" 74 26 30 70 74 26 30 70 1 2081 30 1
"3701" "exp3" 2 114 "graphed-outcome" "pro-prob" 74 26 34 66 74 26 34 66 1 2041 34 1
"3701" "exp3" 2 115 "graphed-outcome" "pro-out" 91 9 1 99 91 9 1 99 2 872 0 0
"3701" "exp3" 2 116 "graphed-outcome" "pro-out" 66 34 30 70 66 34 30 70 2 1550 0 0
"3701" "exp3" 2 117 "graphed-outcome" "pro-out" 61 39 35 65 61 39 35 65 2 3622 0 0
"3701" "exp3" 2 118 "graphed-outcome" "pro-prob" 89 11 19 81 89 11 19 81 1 1687 19 1
"3701" "exp3" 2 119 "graphed-outcome" "pro-out" 75 25 17 83 75 25 17 83 2 948 0 0
"3701" "exp3" 2 120 "graphed-outcome" "pro-out" 62 38 34 66 62 38 34 66 2 2499 0 0
"3701" "exp3" 2 121 "graphed-outcome" "pro-out" 81 19 15 85 81 19 15 85 2 2358 0 0
"3701" "exp3" 2 122 "graphed-outcome" "pro-out" 76 24 20 80 76 24 20 80 2 1807 0 0
"3701" "exp3" 2 123 "graphed-outcome" "pro-out" 84 16 8 92 84 16 8 92 2 1619 0 0
"3701" "exp3" 2 124 "graphed-outcome" "pro-prob" 84 16 24 76 84 16 24 76 1 1324 24 1
"3701" "exp3" 2 125 "graphed-outcome" "pro-prob" 81 19 23 77 81 19 23 77 1 1607 0 0
"3701" "exp3" 2 126 "graphed-outcome" "pro-out" 71 29 21 79 71 29 21 79 2 2166 0 0
"3701" "exp3" 2 127 "graphed-outcome" "pro-out" 82 18 14 86 82 18 14 86 2 1459 0 0
"3701" "exp3" 2 128 "graphed-outcome" "pro-out" 78 22 18 82 78 22 18 82 2 2151 0 0
"3701" "exp3" 2 129 "graphed-outcome" "pro-out" 69 31 27 73 69 31 27 73 2 4525 73 1
"3701" "exp3" 2 130 "graphed-outcome" "pro-prob" 61 39 47 53 61 39 47 53 1 6448 0 0
"3701" "exp3" 2 131 "graphed-outcome" "pro-out" 89 11 7 93 89 11 7 93 2 2023 0 0
"3701" "exp3" 2 132 "graphed-outcome" "pro-out" 90 10 6 94 90 10 6 94 2 1509 0 0
"3701" "exp3" 1 1 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 974 20 1
"3701" "exp3" 1 2 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1696 0 0
"3701" "exp3" 1 3 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1421 30 1
"3701" "exp3" 1 4 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1060 94 1
"3701" "exp3" 1 5 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 1080 88 1
"3701" "exp3" 1 6 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 1215 29 1
"3701" "exp3" 1 7 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 1261 19 1
"3701" "exp3" 1 8 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1011 0 0
"3701" "exp3" 1 9 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1405 0 0
"3701" "exp3" 1 10 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 839 0 0
"3701" "exp3" 1 11 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1203 0 0
"3701" "exp3" 1 12 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 1129 0 0
"3701" "exp3" 1 13 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1066 17 1
"3701" "exp3" 1 14 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1241 31 1
"3701" "exp3" 1 15 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1344 0 0
"3701" "exp3" 1 16 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1361 0 0
"3701" "exp3" 1 17 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 1180 0 0
"3701" "exp3" 1 18 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 2680 22 1
"3701" "exp3" 1 19 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 1354 24 1
"3701" "exp3" 1 20 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 870 25 1
"3701" "exp3" 1 21 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1075 36 1
"3701" "exp3" 1 22 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1431 0 0
"3701" "exp3" 1 23 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 1834 44 1
"3701" "exp3" 1 24 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 2414 0 0
"3701" "exp3" 1 25 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1416 0 0
"3701" "exp3" 1 26 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1098 0 0
"3701" "exp3" 1 27 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 2 1419 64 1
"3701" "exp3" 1 28 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 4825 27 1
"3701" "exp3" 1 29 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1082 18 1
"3701" "exp3" 1 30 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1728 28 1
"3701" "exp3" 1 31 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1124 40 1
"3701" "exp3" 1 32 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 1301 0 0
"3701" "exp3" 1 33 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 849 0 0
"3701" "exp3" 1 34 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 974 20 1
"3701" "exp3" 1 35 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1471 74 1
"3701" "exp3" 1 36 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 1283 28 1
"3701" "exp3" 1 37 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 1686 0 0
"3701" "exp3" 1 38 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 2064 35 1
"3701" "exp3" 1 39 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 1051 33 1
"3701" "exp3" 1 40 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 858 0 0
"3701" "exp3" 1 41 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 3413 0 0
"3701" "exp3" 1 42 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 3392 18 1
"3701" "exp3" 1 43 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 3495 0 0
"3701" "exp3" 1 44 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1849 26 1
"3701" "exp3" 1 45 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 10125 23 1
"3701" "exp3" 1 46 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 2623 43 1
"3701" "exp3" 1 47 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 1243 0 0
"3701" "exp3" 1 48 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 1 1324 41 1
"3701" "exp3" 1 49 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 1591 0 0
"3701" "exp3" 1 50 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 2502 91 1
"3701" "exp3" 1 51 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1531 0 0
"3701" "exp3" 1 52 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1961 67 1
"3701" "exp3" 1 53 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 2074 0 0
"3701" "exp3" 1 54 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1725 0 0
"3701" "exp3" 1 55 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 2460 83 1
"3701" "exp3" 1 56 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1511 0 0
"3701" "exp3" 1 57 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 1058 32 1
"3701" "exp3" 1 58 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 1578 0 0
"3701" "exp3" 1 59 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 858 0 0
"3701" "exp3" 1 60 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 1 1767 39 1
"3701" "exp3" 1 61 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 1182 0 0
"3701" "exp3" 1 62 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 872 0 0
"3701" "exp3" 1 63 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 2758 66 1
"3701" "exp3" 1 64 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 2139 0 0
"3701" "exp3" 1 65 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1537 0 0
"3701" "exp3" 1 66 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 4564 90 1
"3701" "exp3" 1 67 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 1893 86 1
"3701" "exp3" 1 68 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1364 0 0
"3701" "exp3" 1 69 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 3429 0 0
"3701" "exp3" 1 70 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1037 17 1
"3701" "exp3" 1 71 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 2316 22 1
"3701" "exp3" 1 72 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 2500 30 1
"3701" "exp3" 1 73 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 1677 0 0
"3701" "exp3" 1 74 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1218 0 0
"3701" "exp3" 1 75 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1755 0 0
"3701" "exp3" 1 76 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1671 27 1
"3701" "exp3" 1 77 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1346 15 1
"3701" "exp3" 1 78 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 1988 0 0
"3701" "exp3" 1 79 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 5077 0 0
"3701" "exp3" 1 80 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1015 0 0
"3701" "exp3" 1 81 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2268 0 0
"3701" "exp3" 1 82 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 2606 0 0
"3701" "exp3" 1 83 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 2805 0 0
"3701" "exp3" 1 84 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 976 47 1
"3701" "exp3" 1 85 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1435 0 0
"3701" "exp3" 1 86 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 1406 0 0
"3701" "exp3" 1 87 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 2302 0 0
"3701" "exp3" 1 88 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1014 0 0
"3701" "exp3" 1 89 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1267 0 0
"3701" "exp3" 1 90 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 2838 45 1
"3701" "exp3" 1 91 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 1789 44 1
"3701" "exp3" 1 92 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1292 0 0
"3701" "exp3" 1 93 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 2947 89 1
"3701" "exp3" 1 94 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1972 0 0
"3701" "exp3" 1 95 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1152 71 1
"3701" "exp3" 1 96 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1074 0 0
"3701" "exp3" 1 97 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 2446 0 0
"3701" "exp3" 1 98 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 882 0 0
"3701" "exp3" 1 99 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 2066 0 0
"3701" "exp3" 1 100 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 2136 33 1
"3701" "exp3" 1 101 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 1321 14 1
"3701" "exp3" 1 102 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 4975 0 0
"3701" "exp3" 1 103 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 927 13 1
"3701" "exp3" 1 104 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 2526 37 1
"3701" "exp3" 1 105 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 2407 0 0
"3701" "exp3" 1 106 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 816 0 0
"3701" "exp3" 1 107 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 1155 0 0
"3701" "exp3" 1 108 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 3489 0 0
"3701" "exp3" 1 109 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 1107 0 0
"3701" "exp3" 1 110 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1946 0 0
"3701" "exp3" 1 111 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1750 24 1
"3701" "exp3" 1 112 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 1868 32 1
"3701" "exp3" 1 113 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 1928 35 1
"3701" "exp3" 1 114 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 865 37 1
"3701" "exp3" 1 115 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1684 0 0
"3701" "exp3" 1 116 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1479 63 1
"3701" "exp3" 1 117 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 879 0 0
"3701" "exp3" 1 118 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 753 87 1
"3701" "exp3" 1 119 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 818 21 1
"3701" "exp3" 1 120 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 1096 65 1
"3701" "exp3" 1 121 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 1 937 23 1
"3701" "exp3" 1 122 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 2722 92 1
"3701" "exp3" 1 123 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1429 0 0
"3701" "exp3" 1 124 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 1957 0 0
"3701" "exp3" 1 125 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1285 0 0
"3701" "exp3" 1 126 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 1913 73 1
"3701" "exp3" 1 127 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 2243 0 0
"3701" "exp3" 1 128 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 803 0 0
"3701" "exp3" 1 129 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 2358 19 1
"3701" "exp3" 1 130 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 3321 25 1
"3701" "exp3" 1 131 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1851 0 0
"3701" "exp3" 1 132 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1505 0 0
"3701" "exp3" 2 1 "all-numeric" "pro-prob" 67 33 41 59 67 33 41 59 2 1785 0 0
"3701" "exp3" 2 2 "all-numeric" "pro-out" 90 10 6 94 90 10 6 94 2 1203 0 0
"3701" "exp3" 2 3 "all-numeric" "pro-prob" 70 30 34 66 70 30 34 66 1 1246 34 1
"3701" "exp3" 2 4 "all-numeric" "pro-out" 87 13 5 95 87 13 5 95 2 1373 0 0
"3701" "exp3" 2 5 "all-numeric" "pro-out" 59 41 37 63 59 41 37 63 2 1329 63 1
"3701" "exp3" 2 6 "all-numeric" "pro-prob" 71 29 37 63 71 29 37 63 1 1322 0 0
"3701" "exp3" 2 7 "all-numeric" "pro-prob" 76 24 32 68 76 24 32 68 1 2144 32 1
"3701" "exp3" 2 8 "all-numeric" "pro-out" 82 18 10 90 82 18 10 90 2 828 0 0
"3701" "exp3" 2 9 "all-numeric" "pro-out" 83 17 9 91 83 17 9 91 2 1415 0 0
"3701" "exp3" 2 10 "all-numeric" "pro-prob" 74 26 34 66 74 26 34 66 1 1490 34 1
"3701" "exp3" 2 11 "all-numeric" "pro-prob" 63 37 41 59 63 37 41 59 1 1811 41 1
"3701" "exp3" 2 12 "all-numeric" "pro-prob" 86 14 18 82 86 14 18 82 1 1551 18 1
"3701" "exp3" 2 13 "all-numeric" "pro-prob" 62 38 42 58 62 38 42 58 1 1012 42 1
"3701" "exp3" 2 14 "all-numeric" "pro-out" 59 41 33 67 59 41 33 67 2 997 0 0
"3701" "exp3" 2 15 "all-numeric" "pro-out" 80 20 16 84 80 20 16 84 2 1378 84 1
"3701" "exp3" 2 16 "all-numeric" "pro-out" 85 15 11 89 85 15 11 89 2 969 0 0
"3701" "exp3" 2 17 "all-numeric" "pro-prob" 84 16 24 76 84 16 24 76 1 768 24 1
"3701" "exp3" 2 18 "all-numeric" "pro-out" 91 9 1 99 91 9 1 99 2 703 0 0
"3701" "exp3" 2 19 "all-numeric" "pro-out" 84 16 12 88 84 16 12 88 2 1511 0 0
"3701" "exp3" 2 20 "all-numeric" "pro-out" 91 9 5 95 91 9 5 95 2 806 0 0
"3701" "exp3" 2 21 "all-numeric" "pro-out" 73 27 19 81 73 27 19 81 2 1081 0 0
"3701" "exp3" 2 22 "all-numeric" "pro-prob" 75 25 29 71 75 25 29 71 1 2664 29 1
"3701" "exp3" 2 23 "all-numeric" "pro-out" 90 10 2 98 90 10 2 98 2 879 0 0
"3701" "exp3" 2 24 "all-numeric" "pro-prob" 88 12 16 84 88 12 16 84 1 2557 16 1
"3701" "exp3" 2 25 "all-numeric" "pro-out" 70 30 26 74 70 30 26 74 2 1343 74 1
"3701" "exp3" 2 26 "all-numeric" "pro-out" 82 18 14 86 82 18 14 86 2 1555 0 0
"3701" "exp3" 2 27 "all-numeric" "pro-out" 72 28 24 76 72 28 24 76 2 2319 0 0
"3701" "exp3" 2 28 "all-numeric" "pro-out" 80 20 12 88 80 20 12 88 2 761 0 0
"3701" "exp3" 2 29 "all-numeric" "pro-out" 65 35 27 73 65 35 27 73 2 906 73 1
"3701" "exp3" 2 30 "all-numeric" "pro-prob" 78 22 26 74 78 22 26 74 1 1843 26 1
"3701" "exp3" 2 31 "all-numeric" "pro-prob" 73 27 35 65 73 27 35 65 1 955 35 1
"3701" "exp3" 2 32 "all-numeric" "pro-prob" 74 26 30 70 74 26 30 70 1 1813 30 1
"3701" "exp3" 2 33 "all-numeric" "pro-prob" 61 39 43 57 61 39 43 57 1 1203 43 1
"3701" "exp3" 2 34 "all-numeric" "pro-prob" 81 19 23 77 81 19 23 77 1 1026 0 0
"3701" "exp3" 2 35 "all-numeric" "pro-prob" 66 34 42 58 66 34 42 58 1 1462 42 1
"3701" "exp3" 2 36 "all-numeric" "pro-prob" 86 14 22 78 86 14 22 78 1 964 22 1
"3701" "exp3" 2 37 "all-numeric" "pro-prob" 82 18 22 78 82 18 22 78 1 1286 22 1
"3701" "exp3" 2 38 "all-numeric" "pro-prob" 79 21 25 75 79 21 25 75 1 1623 25 1
"3701" "exp3" 2 39 "all-numeric" "pro-out" 88 12 8 92 88 12 8 92 2 780 0 0
"3701" "exp3" 2 40 "all-numeric" "pro-out" 76 24 20 80 76 24 20 80 2 1052 0 0
"3701" "exp3" 2 41 "all-numeric" "pro-out" 69 31 23 77 69 31 23 77 2 819 77 1
"3701" "exp3" 2 42 "all-numeric" "pro-prob" 80 20 28 72 80 20 28 72 1 1537 28 1
"3701" "exp3" 2 43 "all-numeric" "pro-prob" 82 18 26 74 82 18 26 74 1 1569 26 1
"3701" "exp3" 2 44 "all-numeric" "pro-prob" 87 13 21 79 87 13 21 79 1 1227 0 0
"3701" "exp3" 2 45 "all-numeric" "pro-out" 61 39 35 65 61 39 35 65 2 2000 65 1
"3701" "exp3" 2 46 "all-numeric" "pro-out" 63 37 33 67 63 37 33 67 2 1735 0 0
"3701" "exp3" 2 47 "all-numeric" "pro-prob" 69 31 35 65 69 31 35 65 1 2990 35 1
"3701" "exp3" 2 48 "all-numeric" "pro-prob" 84 16 20 80 84 16 20 80 1 1424 20 1
"3701" "exp3" 2 49 "all-numeric" "pro-out" 86 14 6 94 86 14 6 94 2 1067 0 0
"3701" "exp3" 2 50 "all-numeric" "pro-out" 67 33 25 75 67 33 25 75 2 1586 0 0
"3701" "exp3" 2 51 "all-numeric" "pro-prob" 64 36 40 60 64 36 40 60 1 1061 40 1
"3701" "exp3" 2 52 "all-numeric" "pro-out" 89 11 3 97 89 11 3 97 2 1374 97 1
"3701" "exp3" 2 53 "all-numeric" "pro-prob" 88 12 20 80 88 12 20 80 1 1660 20 1
"3701" "exp3" 2 54 "all-numeric" "pro-prob" 70 30 38 62 70 30 38 62 1 2198 0 0
"3701" "exp3" 2 55 "all-numeric" "pro-prob" 91 9 17 83 91 9 17 83 1 1993 0 0
"3701" "exp3" 2 56 "all-numeric" "pro-out" 81 19 11 89 81 19 11 89 2 1404 89 1
"3701" "exp3" 2 57 "all-numeric" "pro-out" 74 26 18 82 74 26 18 82 2 2256 0 0
"3701" "exp3" 2 58 "all-numeric" "pro-out" 73 27 23 77 73 27 23 77 2 5692 0 0
"3701" "exp3" 2 59 "all-numeric" "pro-prob" 89 11 19 81 89 11 19 81 1 3371 19 1
"3701" "exp3" 2 60 "all-numeric" "pro-prob" 83 17 21 79 83 17 21 79 1 4327 21 1
"3701" "exp3" 2 61 "all-numeric" "pro-prob" 62 38 46 54 62 38 46 54 1 2334 46 1
"3701" "exp3" 2 62 "all-numeric" "pro-prob" 90 10 14 86 90 10 14 86 1 2456 14 1
"3701" "exp3" 2 63 "all-numeric" "pro-prob" 69 31 39 61 69 31 39 61 1 2850 39 1
"3701" "exp3" 2 64 "all-numeric" "pro-prob" 72 28 32 68 72 28 32 68 1 814 32 1
"3701" "exp3" 2 65 "all-numeric" "pro-prob" 80 20 24 76 80 20 24 76 1 1318 24 1
"3701" "exp3" 2 66 "all-numeric" "pro-out" 81 19 15 85 81 19 15 85 2 1649 0 0
"3701" "exp3" 2 67 "all-numeric" "pro-prob" 90 10 18 82 90 10 18 82 1 1127 18 1
"3701" "exp3" 2 68 "all-numeric" "pro-prob" 71 29 33 67 71 29 33 67 1 864 33 1
"3701" "exp3" 2 69 "all-numeric" "pro-prob" 83 17 25 75 83 17 25 75 1 1662 25 1
"3701" "exp3" 2 70 "all-numeric" "pro-out" 60 40 36 64 60 40 36 64 2 802 64 1
"3701" "exp3" 2 71 "all-numeric" "pro-out" 69 31 27 73 69 31 27 73 2 803 0 0
"3701" "exp3" 2 72 "all-numeric" "pro-prob" 75 25 33 67 75 25 33 67 1 969 33 1
"3701" "exp3" 2 73 "all-numeric" "pro-prob" 68 32 36 64 68 32 36 64 1 1805 0 0
"3701" "exp3" 2 74 "all-numeric" "pro-prob" 68 32 40 60 68 32 40 60 1 1369 40 1
"3701" "exp3" 2 75 "all-numeric" "pro-out" 77 23 15 85 77 23 15 85 2 1037 0 0
"3701" "exp3" 2 76 "all-numeric" "pro-prob" 79 21 29 71 79 21 29 71 1 1331 29 1
"3701" "exp3" 2 77 "all-numeric" "pro-out" 78 22 14 86 78 22 14 86 2 884 0 0
"3701" "exp3" 2 78 "all-numeric" "pro-prob" 73 27 31 69 73 27 31 69 1 1100 31 1
"3701" "exp3" 2 79 "all-numeric" "pro-prob" 77 23 31 69 77 23 31 69 1 765 31 1
"3701" "exp3" 2 80 "all-numeric" "pro-prob" 85 15 19 81 85 15 19 81 1 1403 19 1
"3701" "exp3" 2 81 "all-numeric" "pro-out" 71 29 21 79 71 29 21 79 2 1302 0 0
"3701" "exp3" 2 82 "all-numeric" "pro-out" 88 12 4 96 88 12 4 96 2 1095 0 0
"3701" "exp3" 2 83 "all-numeric" "pro-out" 83 17 13 87 83 17 13 87 2 2135 87 1
"3701" "exp3" 2 84 "all-numeric" "pro-out" 62 38 30 70 62 38 30 70 2 869 0 0
"3701" "exp3" 2 85 "all-numeric" "pro-out" 70 30 22 78 70 30 22 78 2 1259 0 0
"3701" "exp3" 2 86 "all-numeric" "pro-prob" 59 41 45 55 59 41 45 55 1 2409 0 0
"3701" "exp3" 2 87 "all-numeric" "pro-prob" 72 28 36 64 72 28 36 64 1 1170 36 1
"3701" "exp3" 2 88 "all-numeric" "pro-prob" 85 15 23 77 85 15 23 77 1 1055 23 1
"3701" "exp3" 2 89 "all-numeric" "pro-out" 77 23 19 81 77 23 19 81 2 1150 0 0
"3701" "exp3" 2 90 "all-numeric" "pro-out" 71 29 25 75 71 29 25 75 2 1448 0 0
"3701" "exp3" 2 91 "all-numeric" "pro-out" 64 36 32 68 64 36 32 68 2 1497 68 1
"3701" "exp3" 2 92 "all-numeric" "pro-out" 84 16 8 92 84 16 8 92 2 1111 0 0
"3701" "exp3" 2 93 "all-numeric" "pro-out" 68 32 28 72 68 32 28 72 2 935 72 1
"3701" "exp3" 2 94 "all-numeric" "pro-out" 66 34 26 74 66 34 26 74 2 1265 0 0
"3701" "exp3" 2 95 "all-numeric" "pro-prob" 87 13 17 83 87 13 17 83 1 1109 17 1
"3701" "exp3" 2 96 "all-numeric" "pro-prob" 60 40 48 52 60 40 48 52 1 917 0 0
"3701" "exp3" 2 97 "all-numeric" "pro-out" 60 40 32 68 60 40 32 68 2 1079 68 1
"3701" "exp3" 2 98 "all-numeric" "pro-prob" 60 40 44 56 60 40 44 56 1 892 44 1
"3701" "exp3" 2 99 "all-numeric" "pro-out" 76 24 16 84 76 24 16 84 2 1001 0 0
"3701" "exp3" 2 100 "all-numeric" "pro-prob" 63 37 45 55 63 37 45 55 1 1169 45 1
"3701" "exp3" 2 101 "all-numeric" "pro-prob" 59 41 49 51 59 41 49 51 1 1320 49 1
"3701" "exp3" 2 102 "all-numeric" "pro-prob" 66 34 38 62 66 34 38 62 1 1672 38 1
"3701" "exp3" 2 103 "all-numeric" "pro-out" 87 13 9 91 87 13 9 91 2 898 0 0
"3701" "exp3" 2 104 "all-numeric" "pro-out" 85 15 7 93 85 15 7 93 2 1096 0 0
"3701" "exp3" 2 105 "all-numeric" "pro-out" 67 33 29 71 67 33 29 71 2 836 71 1
"3701" "exp3" 2 106 "all-numeric" "pro-out" 64 36 28 72 64 36 28 72 2 2074 0 0
"3701" "exp3" 2 107 "all-numeric" "pro-out" 75 25 21 79 75 25 21 79 2 1338 79 1
"3701" "exp3" 2 108 "all-numeric" "pro-out" 72 28 20 80 72 28 20 80 2 1229 0 0
"3701" "exp3" 2 109 "all-numeric" "pro-out" 61 39 31 69 61 39 31 69 2 1041 0 0
"3701" "exp3" 2 110 "all-numeric" "pro-out" 74 26 22 78 74 26 22 78 2 1365 0 0
"3701" "exp3" 2 111 "all-numeric" "pro-out" 79 21 17 83 79 21 17 83 2 1251 0 0
"3701" "exp3" 2 112 "all-numeric" "pro-prob" 65 35 43 57 65 35 43 57 1 884 0 0
"3701" "exp3" 2 113 "all-numeric" "pro-prob" 76 24 28 72 76 24 28 72 1 3015 28 1
"3701" "exp3" 2 114 "all-numeric" "pro-prob" 91 9 13 87 91 9 13 87 1 1502 13 1
"3701" "exp3" 2 115 "all-numeric" "pro-prob" 81 19 27 73 81 19 27 73 1 1140 27 1
"3701" "exp3" 2 116 "all-numeric" "pro-prob" 78 22 30 70 78 22 30 70 1 1316 30 1
"3701" "exp3" 2 117 "all-numeric" "pro-prob" 64 36 44 56 64 36 44 56 1 908 0 0
"3701" "exp3" 2 118 "all-numeric" "pro-out" 78 22 18 82 78 22 18 82 2 1117 0 0
"3701" "exp3" 2 119 "all-numeric" "pro-out" 79 21 13 87 79 21 13 87 2 1322 0 0
"3701" "exp3" 2 120 "all-numeric" "pro-prob" 89 11 15 85 89 11 15 85 1 1331 15 1
"3701" "exp3" 2 121 "all-numeric" "pro-out" 86 14 10 90 86 14 10 90 2 801 0 0
"3701" "exp3" 2 122 "all-numeric" "pro-out" 68 32 24 76 68 32 24 76 2 1386 0 0
"3701" "exp3" 2 123 "all-numeric" "pro-prob" 65 35 39 61 65 35 39 61 2 1645 0 0
"3701" "exp3" 2 124 "all-numeric" "pro-out" 66 34 30 70 66 34 30 70 2 1846 0 0
"3701" "exp3" 2 125 "all-numeric" "pro-out" 89 11 7 93 89 11 7 93 2 1263 0 0
"3701" "exp3" 2 126 "all-numeric" "pro-prob" 61 39 47 53 61 39 47 53 1 2223 47 1
"3701" "exp3" 2 127 "all-numeric" "pro-prob" 67 33 37 63 67 33 37 63 1 1517 0 0
"3701" "exp3" 2 128 "all-numeric" "pro-prob" 77 23 27 73 77 23 27 73 1 2002 0 0
"3701" "exp3" 2 129 "all-numeric" "pro-out" 63 37 29 71 63 37 29 71 2 1379 71 1
"3701" "exp3" 2 130 "all-numeric" "pro-out" 62 38 34 66 62 38 34 66 2 1432 66 1
"3701" "exp3" 2 131 "all-numeric" "pro-out" 65 35 31 69 65 35 31 69 2 1635 0 0
"3701" "exp3" 2 132 "all-numeric" "pro-out" 75 25 17 83 75 25 17 83 2 787 0 0
"3701" "exp3" 1 1 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 3203 0 0
"3701" "exp3" 1 2 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 1 1302 15 1
"3701" "exp3" 1 3 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1825 26 1
"3701" "exp3" 1 4 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 2006 0 0
"3701" "exp3" 1 5 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 3447 36 1
"3701" "exp3" 1 6 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 2771 0 0
"3701" "exp3" 1 7 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 2090 0 0
"3701" "exp3" 1 8 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 792 21 1
"3701" "exp3" 1 9 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 2413 0 0
"3701" "exp3" 1 10 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1490 0 0
"3701" "exp3" 1 11 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 2820 0 0
"3701" "exp3" 1 12 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1985 0 0
"3701" "exp3" 1 13 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 2093 0 0
"3701" "exp3" 1 14 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1314 17 1
"3701" "exp3" 1 15 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1072 0 0
"3701" "exp3" 1 16 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 1240 0 0
"3701" "exp3" 1 17 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1654 0 0
"3701" "exp3" 1 18 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1465 0 0
"3701" "exp3" 1 19 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 1029 81 1
"3701" "exp3" 1 20 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 1205 28 1
"3701" "exp3" 1 21 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1224 34 1
"3701" "exp3" 1 22 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1844 0 0
"3701" "exp3" 1 23 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1451 0 0
"3701" "exp3" 1 24 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1083 18 1
"3701" "exp3" 1 25 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 1444 0 0
"3701" "exp3" 1 26 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 1066 18 1
"3701" "exp3" 1 27 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 1574 82 1
"3701" "exp3" 1 28 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1752 27 1
"3701" "exp3" 1 29 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 1570 0 0
"3701" "exp3" 1 30 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1130 30 1
"3701" "exp3" 1 31 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 4937 33 1
"3701" "exp3" 1 32 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 2519 21 1
"3701" "exp3" 1 33 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1882 0 0
"3701" "exp3" 1 34 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 867 0 0
"3701" "exp3" 1 35 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 1347 0 0
"3701" "exp3" 1 36 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 984 0 0
"3701" "exp3" 1 37 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 2 3650 0 0
"3701" "exp3" 1 38 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 1614 29 1
"3701" "exp3" 1 39 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 973 30 1
"3701" "exp3" 1 40 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1058 0 0
"3701" "exp3" 1 41 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 1209 19 1
"3701" "exp3" 1 42 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 967 0 0
"3701" "exp3" 1 43 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 740 0 0
"3701" "exp3" 1 44 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1028 0 0
"3701" "exp3" 1 45 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1041 0 0
"3701" "exp3" 1 46 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 2192 48 1
"3701" "exp3" 1 47 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1348 0 0
"3701" "exp3" 1 48 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1992 0 0
"3701" "exp3" 1 49 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 900 22 1
"3701" "exp3" 1 50 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1318 0 0
"3701" "exp3" 1 51 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1765 0 0
"3701" "exp3" 1 52 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1705 35 1
"3701" "exp3" 1 53 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1087 0 0
"3701" "exp3" 1 54 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1430 0 0
"3701" "exp3" 1 55 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1216 75 1
"3701" "exp3" 1 56 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 1175 20 1
"3701" "exp3" 1 57 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1731 0 0
"3701" "exp3" 1 58 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1471 74 1
"3701" "exp3" 1 59 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1105 0 0
"3701" "exp3" 1 60 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 2161 0 0
"3701" "exp3" 1 61 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 3101 64 1
"3701" "exp3" 1 62 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 1858 0 0
"3701" "exp3" 1 63 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1063 0 0
"3701" "exp3" 1 64 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1564 0 0
"3701" "exp3" 1 65 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 817 15 1
"3701" "exp3" 1 66 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1601 46 1
"3701" "exp3" 1 67 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1073 0 0
"3701" "exp3" 1 68 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 893 0 0
"3701" "exp3" 1 69 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1752 34 1
"3701" "exp3" 1 70 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 2268 0 0
"3701" "exp3" 1 71 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 1547 39 1
"3701" "exp3" 1 72 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1603 0 0
"3701" "exp3" 1 73 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1742 67 1
"3701" "exp3" 1 74 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1339 0 0
"3701" "exp3" 1 75 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1290 0 0
"3701" "exp3" 1 76 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1786 17 1
"3701" "exp3" 1 77 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2437 66 1
"3701" "exp3" 1 78 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1538 37 1
"3701" "exp3" 1 79 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 996 0 0
"3701" "exp3" 1 80 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1203 0 0
"3701" "exp3" 1 81 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1275 28 1
"3701" "exp3" 1 82 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 1640 39 1
"3701" "exp3" 1 83 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1573 0 0
"3701" "exp3" 1 84 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1869 0 0
"3701" "exp3" 1 85 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 952 0 0
"3701" "exp3" 1 86 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1577 89 1
"3701" "exp3" 1 87 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 1000 20 1
"3701" "exp3" 1 88 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 3639 67 1
"3701" "exp3" 1 89 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 943 14 1
"3701" "exp3" 1 90 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 2544 68 1
"3701" "exp3" 1 91 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 2388 44 1
"3701" "exp3" 1 92 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 934 16 1
"3701" "exp3" 1 93 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1707 0 0
"3701" "exp3" 1 94 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 1256 0 0
"3701" "exp3" 1 95 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 1330 73 1
"3701" "exp3" 1 96 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1152 0 0
"3701" "exp3" 1 97 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1339 38 1
"3701" "exp3" 1 98 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1234 80 1
"3701" "exp3" 1 99 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1320 80 1
"3701" "exp3" 1 100 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 1204 35 1
"3701" "exp3" 1 101 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 981 23 1
"3701" "exp3" 1 102 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 1477 0 0
"3701" "exp3" 1 103 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 1279 0 0
"3701" "exp3" 1 104 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1320 79 1
"3701" "exp3" 1 105 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1263 0 0
"3701" "exp3" 1 106 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 937 23 1
"3701" "exp3" 1 107 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 3263 71 1
"3701" "exp3" 1 108 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 1858 25 1
"3701" "exp3" 1 109 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 2430 79 1
"3701" "exp3" 1 110 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1277 0 0
"3701" "exp3" 1 111 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1328 0 0
"3701" "exp3" 1 112 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1064 32 1
"3701" "exp3" 1 113 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1469 0 0
"3701" "exp3" 1 114 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1078 0 0
"3701" "exp3" 1 115 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 979 0 0
"3701" "exp3" 1 116 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1637 0 0
"3701" "exp3" 1 117 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1388 0 0
"3701" "exp3" 1 118 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1848 75 1
"3701" "exp3" 1 119 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1322 0 0
"3701" "exp3" 1 120 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 1 883 0 0
"3701" "exp3" 1 121 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1154 0 0
"3701" "exp3" 1 122 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1876 0 0
"3701" "exp3" 1 123 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 1352 0 0
"3701" "exp3" 1 124 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1696 0 0
"3701" "exp3" 1 125 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 927 13 1
"3701" "exp3" 1 126 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1148 31 1
"3701" "exp3" 1 127 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1872 26 1
"3701" "exp3" 1 128 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 2101 45 1
"3701" "exp3" 1 129 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 866 42 1
"3701" "exp3" 1 130 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 975 0 0
"3701" "exp3" 1 131 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 1747 44 1
"3701" "exp3" 1 132 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 898 40 1
"3701" "exp3" 2 1 "graphed-probability" "pro-out" 83 17 9 91 83 17 9 91 2 1363 91 1
"3701" "exp3" 2 2 "graphed-probability" "pro-prob" 64 36 44 56 64 36 44 56 1 887 0 0
"3701" "exp3" 2 3 "graphed-probability" "pro-out" 62 38 34 66 62 38 34 66 2 2685 66 1
"3701" "exp3" 2 4 "graphed-probability" "pro-out" 59 41 37 63 59 41 37 63 2 1866 0 0
"3701" "exp3" 2 5 "graphed-probability" "pro-prob" 66 34 42 58 66 34 42 58 1 897 42 1
"3701" "exp3" 2 6 "graphed-probability" "pro-out" 64 36 28 72 64 36 28 72 2 1096 0 0
"3701" "exp3" 2 7 "graphed-probability" "pro-out" 80 20 12 88 80 20 12 88 2 1743 0 0
"3701" "exp3" 2 8 "graphed-probability" "pro-out" 73 27 19 81 73 27 19 81 2 3006 81 1
"3701" "exp3" 2 9 "graphed-probability" "pro-prob" 69 31 35 65 69 31 35 65 1 1995 35 1
"3701" "exp3" 2 10 "graphed-probability" "pro-out" 90 10 6 94 90 10 6 94 2 1899 0 0
"3701" "exp3" 2 11 "graphed-probability" "pro-out" 72 28 24 76 72 28 24 76 2 1703 0 0
"3701" "exp3" 2 12 "graphed-probability" "pro-prob" 74 26 30 70 74 26 30 70 1 1671 0 0
"3701" "exp3" 2 13 "graphed-probability" "pro-out" 76 24 16 84 76 24 16 84 2 1724 0 0
"3701" "exp3" 2 14 "graphed-probability" "pro-prob" 66 34 38 62 66 34 38 62 2 2020 62 1
"3701" "exp3" 2 15 "graphed-probability" "pro-out" 83 17 13 87 83 17 13 87 2 2301 87 1
"3701" "exp3" 2 16 "graphed-probability" "pro-prob" 83 17 21 79 83 17 21 79 1 2164 21 1
"3701" "exp3" 2 17 "graphed-probability" "pro-prob" 73 27 35 65 73 27 35 65 1 897 0 0
"3701" "exp3" 2 18 "graphed-probability" "pro-out" 89 11 3 97 89 11 3 97 2 1159 0 0
"3701" "exp3" 2 19 "graphed-probability" "pro-out" 71 29 21 79 71 29 21 79 2 1780 0 0
"3701" "exp3" 2 20 "graphed-probability" "pro-prob" 72 28 36 64 72 28 36 64 1 1696 0 0
"3701" "exp3" 2 21 "graphed-probability" "pro-prob" 63 37 41 59 63 37 41 59 1 1731 0 0
"3701" "exp3" 2 22 "graphed-probability" "pro-out" 69 31 27 73 69 31 27 73 2 1174 73 1
"3701" "exp3" 2 23 "graphed-probability" "pro-out" 60 40 32 68 60 40 32 68 2 1238 68 1
"3701" "exp3" 2 24 "graphed-probability" "pro-out" 84 16 8 92 84 16 8 92 2 1602 92 1
"3701" "exp3" 2 25 "graphed-probability" "pro-out" 73 27 23 77 73 27 23 77 2 1669 0 0
"3701" "exp3" 2 26 "graphed-probability" "pro-prob" 62 38 42 58 62 38 42 58 1 1289 42 1
"3701" "exp3" 2 27 "graphed-probability" "pro-out" 77 23 19 81 77 23 19 81 2 1000 0 0
"3701" "exp3" 2 28 "graphed-probability" "pro-out" 72 28 20 80 72 28 20 80 2 1180 80 1
"3701" "exp3" 2 29 "graphed-probability" "pro-prob" 75 25 33 67 75 25 33 67 1 1390 33 1
"3701" "exp3" 2 30 "graphed-probability" "pro-out" 71 29 25 75 71 29 25 75 2 1149 0 0
"3701" "exp3" 2 31 "graphed-probability" "pro-prob" 87 13 21 79 87 13 21 79 1 945 21 1
"3701" "exp3" 2 32 "graphed-probability" "pro-prob" 79 21 29 71 79 21 29 71 1 1449 0 0
"3701" "exp3" 2 33 "graphed-probability" "pro-prob" 88 12 16 84 88 12 16 84 1 1903 16 1
"3701" "exp3" 2 34 "graphed-probability" "pro-out" 88 12 4 96 88 12 4 96 2 872 0 0
"3701" "exp3" 2 35 "graphed-probability" "pro-prob" 85 15 19 81 85 15 19 81 1 864 19 1
"3701" "exp3" 2 36 "graphed-probability" "pro-out" 65 35 27 73 65 35 27 73 2 966 0 0
"3701" "exp3" 2 37 "graphed-probability" "pro-prob" 76 24 32 68 76 24 32 68 1 1426 32 1
"3701" "exp3" 2 38 "graphed-probability" "pro-out" 78 22 14 86 78 22 14 86 2 1090 86 1
"3701" "exp3" 2 39 "graphed-probability" "pro-prob" 78 22 30 70 78 22 30 70 1 1315 0 0
"3701" "exp3" 2 40 "graphed-probability" "pro-out" 62 38 30 70 62 38 30 70 2 1783 70 1
"3701" "exp3" 2 41 "graphed-probability" "pro-out" 87 13 5 95 87 13 5 95 2 1058 0 0
"3701" "exp3" 2 42 "graphed-probability" "pro-out" 86 14 10 90 86 14 10 90 2 1405 90 1
"3701" "exp3" 2 43 "graphed-probability" "pro-prob" 86 14 18 82 86 14 18 82 1 1206 18 1
"3701" "exp3" 2 44 "graphed-probability" "pro-prob" 70 30 34 66 70 30 34 66 1 1629 34 1
"3701" "exp3" 2 45 "graphed-probability" "pro-out" 81 19 11 89 81 19 11 89 2 1500 0 0
"3701" "exp3" 2 46 "graphed-probability" "pro-out" 90 10 2 98 90 10 2 98 2 1040 0 0
"3701" "exp3" 2 47 "graphed-probability" "pro-prob" 81 19 27 73 81 19 27 73 1 1739 27 1
"3701" "exp3" 2 48 "graphed-probability" "pro-out" 61 39 31 69 61 39 31 69 2 1693 0 0
"3701" "exp3" 2 49 "graphed-probability" "pro-out" 88 12 8 92 88 12 8 92 2 1836 0 0
"3701" "exp3" 2 50 "graphed-probability" "pro-prob" 69 31 39 61 69 31 39 61 1 2261 0 0
"3701" "exp3" 2 51 "graphed-probability" "pro-prob" 70 30 38 62 70 30 38 62 1 1667 0 0
"3701" "exp3" 2 52 "graphed-probability" "pro-prob" 91 9 17 83 91 9 17 83 1 1330 17 1
"3701" "exp3" 2 53 "graphed-probability" "pro-prob" 74 26 34 66 74 26 34 66 1 1524 34 1
"3701" "exp3" 2 54 "graphed-probability" "pro-prob" 80 20 24 76 80 20 24 76 1 1924 0 0
"3701" "exp3" 2 55 "graphed-probability" "pro-prob" 63 37 45 55 63 37 45 55 1 1601 45 1
"3701" "exp3" 2 56 "graphed-probability" "pro-prob" 84 16 24 76 84 16 24 76 1 1832 24 1
"3701" "exp3" 2 57 "graphed-probability" "pro-out" 68 32 24 76 68 32 24 76 2 2070 0 0
"3701" "exp3" 2 58 "graphed-probability" "pro-prob" 90 10 18 82 90 10 18 82 1 689 18 1
"3701" "exp3" 2 59 "graphed-probability" "pro-prob" 59 41 45 55 59 41 45 55 1 1928 45 1
"3701" "exp3" 2 60 "graphed-probability" "pro-prob" 71 29 33 67 71 29 33 67 1 1006 33 1
"3701" "exp3" 2 61 "graphed-probability" "pro-out" 74 26 22 78 74 26 22 78 2 2454 0 0
"3701" "exp3" 2 62 "graphed-probability" "pro-prob" 79 21 25 75 79 21 25 75 1 895 0 0
"3701" "exp3" 2 63 "graphed-probability" "pro-prob" 85 15 23 77 85 15 23 77 1 809 0 0
"3701" "exp3" 2 64 "graphed-probability" "pro-out" 77 23 15 85 77 23 15 85 2 1091 0 0
"3701" "exp3" 2 65 "graphed-probability" "pro-prob" 64 36 40 60 64 36 40 60 1 1204 0 0
"3701" "exp3" 2 66 "graphed-probability" "pro-out" 82 18 10 90 82 18 10 90 2 1170 0 0
"3701" "exp3" 2 67 "graphed-probability" "pro-prob" 91 9 13 87 91 9 13 87 1 661 13 1
"3701" "exp3" 2 68 "graphed-probability" "pro-out" 87 13 9 91 87 13 9 91 2 1289 0 0
"3701" "exp3" 2 69 "graphed-probability" "pro-prob" 60 40 44 56 60 40 44 56 1 1923 44 1
"3701" "exp3" 2 70 "graphed-probability" "pro-prob" 87 13 17 83 87 13 17 83 1 1467 17 1
"3701" "exp3" 2 71 "graphed-probability" "pro-out" 75 25 17 83 75 25 17 83 2 1083 0 0
"3701" "exp3" 2 72 "graphed-probability" "pro-prob" 77 23 27 73 77 23 27 73 1 1172 27 1
"3701" "exp3" 2 73 "graphed-probability" "pro-out" 79 21 13 87 79 21 13 87 2 2111 0 0
"3701" "exp3" 2 74 "graphed-probability" "pro-out" 63 37 33 67 63 37 33 67 2 3664 0 0
"3701" "exp3" 2 75 "graphed-probability" "pro-prob" 83 17 25 75 83 17 25 75 1 814 25 1
"3701" "exp3" 2 76 "graphed-probability" "pro-prob" 59 41 49 51 59 41 49 51 1 1420 49 1
"3701" "exp3" 2 77 "graphed-probability" "pro-out" 89 11 7 93 89 11 7 93 2 960 0 0
"3701" "exp3" 2 78 "graphed-probability" "pro-prob" 72 28 32 68 72 28 32 68 1 1526 32 1
"3701" "exp3" 2 79 "graphed-probability" "pro-out" 63 37 29 71 63 37 29 71 2 1809 71 1
"3701" "exp3" 2 80 "graphed-probability" "pro-prob" 61 39 43 57 61 39 43 57 1 1996 43 1
"3701" "exp3" 2 81 "graphed-probability" "pro-out" 76 24 20 80 76 24 20 80 2 1188 0 0
"3701" "exp3" 2 82 "graphed-probability" "pro-out" 85 15 11 89 85 15 11 89 2 1442 89 1
"3701" "exp3" 2 83 "graphed-probability" "pro-prob" 73 27 31 69 73 27 31 69 1 1495 31 1
"3701" "exp3" 2 84 "graphed-probability" "pro-out" 78 22 18 82 78 22 18 82 2 907 0 0
"3701" "exp3" 2 85 "graphed-probability" "pro-prob" 62 38 46 54 62 38 46 54 1 1353 46 1
"3701" "exp3" 2 86 "graphed-probability" "pro-prob" 90 10 14 86 90 10 14 86 1 1052 14 1
"3701" "exp3" 2 87 "graphed-probability" "pro-out" 91 9 1 99 91 9 1 99 2 1018 0 0
"3701" "exp3" 2 88 "graphed-probability" "pro-out" 70 30 22 78 70 30 22 78 2 1351 0 0
"3701" "exp3" 2 89 "graphed-probability" "pro-prob" 71 29 37 63 71 29 37 63 1 1437 37 1
"3701" "exp3" 2 90 "graphed-probability" "pro-out" 64 36 32 68 64 36 32 68 2 2326 68 1
"3701" "exp3" 2 91 "graphed-probability" "pro-prob" 65 35 43 57 65 35 43 57 1 927 0 0
"3701" "exp3" 2 92 "graphed-probability" "pro-prob" 77 23 31 69 77 23 31 69 1 789 31 1
"3701" "exp3" 2 93 "graphed-probability" "pro-out" 66 34 26 74 66 34 26 74 2 1283 0 0
"3701" "exp3" 2 94 "graphed-probability" "pro-prob" 86 14 22 78 86 14 22 78 1 1065 22 1
"3701" "exp3" 2 95 "graphed-probability" "pro-prob" 82 18 26 74 82 18 26 74 1 1161 26 1
"3701" "exp3" 2 96 "graphed-probability" "pro-prob" 89 11 19 81 89 11 19 81 2 1052 81 1
"3701" "exp3" 2 97 "graphed-probability" "pro-out" 67 33 25 75 67 33 25 75 2 1874 0 0
"3701" "exp3" 2 98 "graphed-probability" "pro-prob" 76 24 28 72 76 24 28 72 1 1866 0 0
"3701" "exp3" 2 99 "graphed-probability" "pro-out" 59 41 33 67 59 41 33 67 2 1523 0 0
"3701" "exp3" 2 100 "graphed-probability" "pro-out" 65 35 31 69 65 35 31 69 2 1549 69 1
"3701" "exp3" 2 101 "graphed-probability" "pro-out" 81 19 15 85 81 19 15 85 2 1392 0 0
"3701" "exp3" 2 102 "graphed-probability" "pro-out" 79 21 17 83 79 21 17 83 2 1246 0 0
"3701" "exp3" 2 103 "graphed-probability" "pro-out" 60 40 36 64 60 40 36 64 2 1303 64 1
"3701" "exp3" 2 104 "graphed-probability" "pro-prob" 78 22 26 74 78 22 26 74 1 1434 0 0
"3701" "exp3" 2 105 "graphed-probability" "pro-prob" 75 25 29 71 75 25 29 71 1 2319 0 0
"3701" "exp3" 2 106 "graphed-probability" "pro-out" 61 39 35 65 61 39 35 65 2 1671 65 1
"3701" "exp3" 2 107 "graphed-probability" "pro-prob" 68 32 40 60 68 32 40 60 1 1012 40 1
"3701" "exp3" 2 108 "graphed-probability" "pro-prob" 67 33 41 59 67 33 41 59 1 931 41 1
"3701" "exp3" 2 109 "graphed-probability" "pro-prob" 84 16 20 80 84 16 20 80 1 973 20 1
"3701" "exp3" 2 110 "graphed-probability" "pro-prob" 81 19 23 77 81 19 23 77 1 1406 0 0
"3701" "exp3" 2 111 "graphed-probability" "pro-out" 82 18 14 86 82 18 14 86 2 1723 0 0
"3701" "exp3" 2 112 "graphed-probability" "pro-out" 84 16 12 88 84 16 12 88 2 1244 0 0
"3701" "exp3" 2 113 "graphed-probability" "pro-prob" 60 40 48 52 60 40 48 52 1 2368 0 0
"3701" "exp3" 2 114 "graphed-probability" "pro-prob" 80 20 28 72 80 20 28 72 1 2373 28 1
"3701" "exp3" 2 115 "graphed-probability" "pro-prob" 65 35 39 61 65 35 39 61 1 2256 0 0
"3701" "exp3" 2 116 "graphed-probability" "pro-out" 85 15 7 93 85 15 7 93 2 808 0 0
"3701" "exp3" 2 117 "graphed-probability" "pro-out" 86 14 6 94 86 14 6 94 2 1253 0 0
"3701" "exp3" 2 118 "graphed-probability" "pro-out" 80 20 16 84 80 20 16 84 2 1713 0 0
"3701" "exp3" 2 119 "graphed-probability" "pro-out" 69 31 23 77 69 31 23 77 2 1142 0 0
"3701" "exp3" 2 120 "graphed-probability" "pro-out" 74 26 18 82 74 26 18 82 2 1197 0 0
"3701" "exp3" 2 121 "graphed-probability" "pro-out" 67 33 29 71 67 33 29 71 2 1042 0 0
"3701" "exp3" 2 122 "graphed-probability" "pro-prob" 67 33 37 63 67 33 37 63 1 1284 37 1
"3701" "exp3" 2 123 "graphed-probability" "pro-out" 66 34 30 70 66 34 30 70 2 1216 70 1
"3701" "exp3" 2 124 "graphed-probability" "pro-prob" 82 18 22 78 82 18 22 78 1 2273 22 1
"3701" "exp3" 2 125 "graphed-probability" "pro-out" 75 25 21 79 75 25 21 79 2 1848 0 0
"3701" "exp3" 2 126 "graphed-probability" "pro-out" 68 32 28 72 68 32 28 72 2 1590 72 1
"3701" "exp3" 2 127 "graphed-probability" "pro-out" 91 9 5 95 91 9 5 95 2 1033 0 0
"3701" "exp3" 2 128 "graphed-probability" "pro-prob" 68 32 36 64 68 32 36 64 1 2089 36 1
"3701" "exp3" 2 129 "graphed-probability" "pro-prob" 88 12 20 80 88 12 20 80 1 861 20 1
"3701" "exp3" 2 130 "graphed-probability" "pro-prob" 89 11 15 85 89 11 15 85 1 1417 15 1
"3701" "exp3" 2 131 "graphed-probability" "pro-prob" 61 39 47 53 61 39 47 53 1 2206 47 1
"3701" "exp3" 2 132 "graphed-probability" "pro-out" 70 30 26 74 70 30 26 74 2 1779 0 0