|
#1
|
|||
|
|||
AA chop, becoming a habit
My last two sessions playing I have been dealt AA once in each session. Both times I ended up chopping the pot(and not much of one)with another pair of Aces. Just wondering what the odds are of another player being dealt the other 2 aces if you have 2, and what are the odds of it happening twice in a row?
Thank You. |
#2
|
|||
|
|||
Re: AA chop, becoming a habit
[ QUOTE ]
Just wondering what the odds are of another player being dealt the other 2 aces if you have 2 [/ QUOTE ] (1225/N - 1) to 1, where N is the number of opponents. [ QUOTE ] and what are the odds of it happening twice in a row? [/ QUOTE ] (1225/N)^2 - 1 to 1. |
#3
|
|||
|
|||
Re: AA chop, becoming a habit
[ QUOTE ]
[ QUOTE ] Just wondering what the odds are of another player being dealt the other 2 aces if you have 2 [/ QUOTE ] (1225/N - 1) to 1, where N is the number of opponents. [ QUOTE ] and what are the odds of it happening twice in a row? [/ QUOTE ] (1225/N)^2 - 1 to 1. [/ QUOTE ] I'm not very bright. What does N stand for here? There are 9 players in game if that matters. |
#4
|
|||
|
|||
Re: AA chop, becoming a habit
[ QUOTE ]
(1225/N - 1) to 1, where N is the number of opponents. [/ QUOTE ] Hope that helped |
#5
|
|||
|
|||
Re: AA chop, becoming a habit
A closer look...
Given that you have AA, there are 2 aces in the deck. Order does not matter. 2/50*1/49 of the other player holding AA, given that you have AA as well. Or 1/1225 for an individual opponent. That's what the other guy already wrote, but in terms of a ratio instead of fractions. If you want to add another condition... that the pot is not split, you have to consider the probability of there being 4 to a flush on the board, since that's the only way that it wont be a chop. The probability of this happening is a bit more difficult to calculate. I'm not sure the exact value of how likely it is for 4 to a flush being dealt on a board. Once you have that, the probability of it happening two times in a row is simply a matter of squaring it. |
#6
|
|||
|
|||
Re: AA chop, becoming a habit
Out of 1712304 boards, 74420 will result in a pot that goes in one direction only.
So 2.17% of the time you will lose, 2.17% of the time you will win and the rest you will split. Note: you have to consider board flushes as well, with the exception of straight flushes. 4 Flush: [4 * C(12,4) * C(36,1)] = 71280 5 Flush: 4 * C(12,5) = 3168 28 Straight Flushes that split the pot. [4 * C(12,4) * C(36,1)] + [4 * C(12,5)] - 28 = 74420 |
Thread Tools | |
Display Modes | |
|
|