11/20/2023 0 Comments The wheel in poker![]() ![]() If k=1 then let a=-1, otherwise find a such that k=-ln(-a)/(1+a).Let p be the probability of winning any given hand.Here is his formula for any "drought" problem. So I turned to my friend and math professor Gabor Megyesi. It isn't often I say this but I tried for hours but the math on this one was simply over my head. The probability of drawing a full house is the number of ways to draw a full house divided by the total combinations, or 165/16,215 = 0.0101758, or about 1 in 98.įor more information on the combin() function, please see my section on probabilities in poker page. There are combin(47,3)=16,215 ways to arrange the 3 cards on the second draw. The total number of ways to arrange a full house is the sum under (1) and (2), or 39+126=165. There are combin(3,2) ways to form a pair from the 3 ranks with 3 cards left and combin(4,2) ways to form a pair to from the ranks with 4 cards left. There are 2 suits left to add to the existing pair. Next, let's work out the number of combinations under (2). There are 3 ranks with only 3 suits left (remember you discarded 3 singletons) and 9 ranks with 4 suits left. I'm going to assume you discard three singletons.įirst, lets work out the number of combinations under (1). There are two ways to get a full house in this situation: (1) draw a three of a kind or (2) draw one more to the pair and another pair. ![]()
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |