WinCraps AutoBets, Data Format 3.9 ZEnd UC ' Random check for double skew for #'s 2,3,4,5 c' Random check for double skew for #'s 2,3,4,5 ' First accumulate some data (e.g. run Hyper-Drive for a while). c' First accumulate some data (e.g. run Hyper-Drive for a while). ' Correct %'s are NOT computed every roll for the sake of speed. c' Correct %'s are NOT computed every roll for the sake of speed. ' When ready to calculate %'s, go to Flag Values screen and set c' When ready to calculate %'s, go to Flag Values screen and set ' flag "Figure percentages" to true. Then return to main game table and c' flag "Figure percentages" to true. Then return to main game table and ' roll the dice once. Now you can check the Chip-Stack values for correct %'s. c' roll the dice once. Now you can check the Chip-Stack values for correct %'s. ' "Figure Percentages" flag is automatically reset to false, so you can c' "Figure Percentages" flag is automatically reset to false, so you can ' then continue rolling. When ready to check %'s again, repeat above. c' then continue rolling. When ready to check %'s again, repeat above. ' As # of rolls increase the computed %'s should approach the probable %'s. c' As # of rolls increase the computed %'s should approach the probable %'s. ' Low #'s of rolls generally yield insignificant results. c' Low #'s of rolls generally yield insignificant results. When . . .  Initializing Auto-Bet  <F then . . . Name Chip-Stack # 0 as "Roll reference" WRoll reference Name Chip-Stack # 1 as "2-2" W2-2  Name Chip-Stack # 2 as " 2-3" W 2-3  Name Chip-Stack # 3 as " 2-4" W 2-4  Name Chip-Stack # 4 as " 2-5" W 2-5  Name Chip-Stack # 5 as " 2-6" W 2-6  Name Chip-Stack # 6 as " 2-7" W 2-7  Name Chip-Stack # 7 as " 2-8" W 2-8  Name Chip-Stack # 8 as " 2-9" W 2-9  Name Chip-Stack # 9 as " 2-10" W 2-10 Name Chip-Stack # 10 as " 2-11" W 2-11 Name Chip-Stack # 11 as "2-12" W2-12 Name Chip-Stack # 12 as "Total # of 2's ------------------------------------------------------" WTotal # of 2's ------------------------------------------------------ Name Chip-Stack # 13 as "2-2 % *100 (278 probable)" W2-2 % *100 (278 probable) Name Chip-Stack # 14 as " 2-3 % *100 (556 probable)" W 2-3 % *100 (556 probable)  Name Chip-Stack # 15 as " 2-4 % *100 (833 probable)" W 2-4 % *100 (833 probable)  Name Chip-Stack # 16 as " 2-5 % *100 (1111 probable)" W 2-5 % *100 (1111 probable)  Name Chip-Stack # 17 as " 2-6 % *100 (1389 probable)" W 2-6 % *100 (1389 probable)  Name Chip-Stack # 18 as " 2-7 % *100 (1667 probable)" W 2-7 % *100 (1667 probable)  Name Chip-Stack # 19 as " 2-8 % *100 (1389 probable)" W 2-8 % *100 (1389 probable)  Name Chip-Stack # 20 as " 2-9 % *100 (1111 probable)" W 2-9 % *100 (1111 probable)  Name Chip-Stack # 21 as " 2-10 % *100 (833 probable)" W 2-10 % *100 (833 probable)  Name Chip-Stack # 22 as " 2-11 % *100 (556 probable)" W 2-11 % *100 (556 probable)  Name Chip-Stack # 23 as "2-12 % *100 (278 probable)" W2-12 % *100 (278 probable)  Name Chip-Stack # 24 as "3-2" W3-2  Name Chip-Stack # 25 as " 3-3" W 3-3  Name Chip-Stack # 26 as " 3-4" W 3-4  Name Chip-Stack # 27 as " 3-5" W 3-5  Name Chip-Stack # 28 as " 3-6" W 3-6  Name Chip-Stack # 29 as " 3-7" W 3-7  Name Chip-Stack # 30 as " 3-8" W 3-8  Name Chip-Stack # 31 as " 3-9" W 3-9  Name Chip-Stack # 32 as " 3-10" W 3-10 Name Chip-Stack # 33 as " 3-11" W 3-11 ! Name Chip-Stack # 34 as "3-12" W3-12 " Name Chip-Stack # 35 as "Total # of 3's ------------------------------------------------------" WTotal # of 3's ------------------------------------------------------ # Name Chip-Stack # 36 as "3-2 % *100 (278 probable)" W3-2 % *100 (278 probable) $ Name Chip-Stack # 37 as " 3-3 % *100 (556 probable)" W 3-3 % *100 (556 probable) % Name Chip-Stack # 38 as " 3-4 % *100 (833 probable)" W 3-4 % *100 (833 probable) & Name Chip-Stack # 39 as " 3-5 % *100 (1111 probable)" W 3-5 % *100 (1111 probable) ' Name Chip-Stack # 40 as " 3-6 % *100 (1389 probable)" W 3-6 % *100 (1389 probable) ( Name Chip-Stack # 41 as " 3-7 % *100 (1667 probable)" W 3-7 % *100 (1667 probable) ) Name Chip-Stack # 42 as " 3-8 % *100 (1389 probable)" W 3-8 % *100 (1389 probable) * Name Chip-Stack # 43 as " 3-9 % *100 (1111 probable)" W 3-9 % *100 (1111 probable) + Name Chip-Stack # 44 as " 3-10 % *100 (833 probable)" W 3-10 % *100 (833 probable) , Name Chip-Stack # 45 as " 3-11 % *100 (556 probable)" W 3-11 % *100 (556 probable) - Name Chip-Stack # 46 as "3-12 % *100 (278 probable)" W3-12 % *100 (278 probable) . Name Chip-Stack # 47 as "4-2" W4-2 / Name Chip-Stack # 48 as " 4-3" W 4-3 0 Name Chip-Stack # 49 as " 4-4" W 4-4 1 Name Chip-Stack # 50 as " 4-5" W 4-5 2 Name Chip-Stack # 51 as " 4-6" W 4-6 3 Name Chip-Stack # 52 as " 4-7" W 4-7 4 Name Chip-Stack # 53 as " 4-8" W 4-8 5 Name Chip-Stack # 54 as " 4-9" W 4-9 6 Name Chip-Stack # 55 as " 4-10" W 4-10 7 Name Chip-Stack # 56 as " 4-11" W 4-11 8 Name Chip-Stack # 57 as "4-12" W4-12 9 Name Chip-Stack # 58 as "Total # of 4's ------------------------------------------------------" WTotal # of 4's ------------------------------------------------------ : Name Chip-Stack # 59 as "4-2 % *100 (278 probable)" W4-2 % *100 (278 probable) ; Name Chip-Stack # 60 as " 4-3 % *100 (556 probable)" W 4-3 % *100 (556 probable) < Name Chip-Stack # 61 as " 4-4 % *100 (833 probable)" W 4-4 % *100 (833 probable) = Name Chip-Stack # 62 as " 4-5 % *100 (1111 probable)" W 4-5 % *100 (1111 probable) > Name Chip-Stack # 63 as " 4-6 % *100 (1389 probable)" W 4-6 % *100 (1389 probable) ? Name Chip-Stack # 64 as " 4-7 % *100 (1667 probable)" W 4-7 % *100 (1667 probable) @ Name Chip-Stack # 65 as " 4-8 % *100 (1389 probable)" W 4-8 % *100 (1389 probable) A Name Chip-Stack # 66 as " 4-9 % *100 (1111 probable)" W 4-9 % *100 (1111 probable) B Name Chip-Stack # 67 as " 4-10 % *100 (833 probable)" W 4-10 % *100 (833 probable) C Name Chip-Stack # 68 as " 4-11 % *100 (556 probable)" W 4-11 % *100 (556 probable) D Name Chip-Stack # 69 as "4-12 % *100 (278 probable)" W4-12 % *100 (278 probable) E Name Chip-Stack # 70 as "5-2" W5-2 F Name Chip-Stack # 71 as " 5-3" W 5-3 G Name Chip-Stack # 72 as " 5-4" W 5-4 H Name Chip-Stack # 73 as " 5-5" W 5-5 I Name Chip-Stack # 74 as " 5-6" W 5-6 J Name Chip-Stack # 75 as " 5-7" W 5-7 K Name Chip-Stack # 76 as " 5-8" W 5-8 L Name Chip-Stack # 77 as " 5-9" W 5-9 M Name Chip-Stack # 78 as " 5-10" W 5-10 N Name Chip-Stack # 79 as " 5-11" W 5-11 O Name Chip-Stack # 80 as "5-12" W5-12 P Name Chip-Stack # 81 as "Total # of 5's ------------------------------------------------------" WTotal # of 5's ------------------------------------------------------ Q Name Chip-Stack # 82 as "5-2 % *100 (278 probable)" W5-2 % *100 (278 probable) R Name Chip-Stack # 83 as " 5-3 % *100 (556 probable)" W 5-3 % *100 (556 probable) S Name Chip-Stack # 84 as " 5-4 % *100 (833 probable)" W 5-4 % *100 (833 probable) T Name Chip-Stack # 85 as " 5-5 % *100 (1111 probable)" W 5-5 % *100 (1111 probable) U Name Chip-Stack # 86 as " 5-6 % *100 (1389 probable)" W 5-6 % *100 (1389 probable) V Name Chip-Stack # 87 as " 5-7 % *100 (1667 probable)" W 5-7 % *100 (1667 probable) W Name Chip-Stack # 88 as " 5-8 % *100 (1389 probable)" W 5-8 % *100 (1389 probable) X Name Chip-Stack # 89 as " 5-9 % *100 (1111 probable)" W 5-9 % *100 (1111 probable) Y Name Chip-Stack # 90 as " 5-10 % *100 (833 probable)" W 5-10 % *100 (833 probable) Z Name Chip-Stack # 91 as " 5-11 % *100 (556 probable)" W 5-11 % *100 (556 probable) [ Name Chip-Stack # 92 as "5-12 % *100 (278 probable)" W5-12 % *100 (278 probable) \ When . . .  A 2 has rolled each time  @úD then . . . Add $ 1 on Chip-Stack ref # 0  €? ÈD Bet $ 1 on Chip-Stack # 0  €?ÈD Add $ 1 on Chip-Stack # 12  €?ÈD When . . .  Any 3 has rolled each time  `úD then . . . Add $ 1 on Chip-Stack # 0  €?ÈD Add $ 1 on Chip-Stack ref # 0  €? ÈD Bet $ 24 on Chip-Stack # 0  ÀAÈD Add $ 1 on Chip-Stack # 35  €?ÈD# When . . .  Any 4 has rolled each time  €úD then . . . Add $ 2 on Chip-Stack # 0  @ÈD Add $ 1 on Chip-Stack ref # 0  €? ÈD Bet $ 47 on Chip-Stack # 0