(1/38) ˟ (1/38) ˟ (1/38) ˟ (1/38) ˟ (1/38) ˟ (1/38)
, that is:(1/38)6 = 0.000000000332122593261671
.3,010,936,384 to one
. The true (fair) odds are calculated as a reciprocal of the probability, that is 1 ÷ probability. If such a bet on a series of outcomes was possible in Roulette, we would win $3 billion for a $1 bet(!)The Same Number Comes Up in a Row | True Odds to One in FRENCH Roulette | True Odds to One in AMERICAN Roulette |
---|---|---|
37 | 38 | |
2˟ | 1,369 | 1,444 |
50,653 | 54,872 | |
4˟ | 1,874,161 | 2,085,136 |
69,343,957 | 79,235,168 | |
6˟ | 2,565,726,409 | 3,010,936,384 |
94,931,877,133 | 114,415,582,592 | |
8˟ | 3,512,479,453,921 | 4,347,792,138,496 |
129,961,739,795,077 | 165,216,101,262,848 | |
10˟ | 4,808,584,372,417,850 | 6,278,211,847,988,230 |
(18/37)32 = 0.000000000096886885
with the corresponding odds 10,321,314,387:1
.(18/38)32 = 0.00000000004127100756
and the odds are 24,230,084,485:1
. Thus this is even less likely than occurrence of a single number six times in a row. Again it is clearly demonstrated what kind of importance (a negative one for players) has just one extra number in American Roulette. Demo casino online.