#11
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Re: Badugi Dilemma
Reminds me a little of the concept of breaking a boat in Draw.
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#12
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Re: Badugi Dilemma
[ QUOTE ]
In 29 of them his Badugi beats yours. (Total=90, good) [/ QUOTE ] I came up with 39 here - assuming that your opponent has 267 and you are both drawing to the same suit. |
#13
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Re: Badugi Dilemma
Let's see... I was assuming different suits.
His badugi / your badugis that lose / running total 762A 89TJK 5 7632 89TJK 10 7642 89TJK 15 7652 89TJK 20 8762 9TJK 24 9762 TJK 27 T762 JK 29 J762 K 30 Q762 K 31 K762 none Oops, now I ended up with 31. I don't see how to get to 39? |
#14
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Re: Badugi Dilemma
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I don't see how to get to 39? [/ QUOTE ] Maybe you were counting the Q. |
#15
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Re: Badugi Dilemma
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Maybe you were counting the Q. [/ QUOTE ] Yes, I forgot about the Q. Duh. Also if they were both drawing to the same suit they would both have 9 outs and the number in question would be 30 (Your last line: Q762 K 31 will be ommited) Sorry for the confusion. |
#16
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Re: Badugi Dilemma
[ QUOTE ]
In 9*(43-10)=297 you make another Badugi but he doesn't In 10*(43-9)=340 he makes a Badugi and you do not The remaining 1165 cases you win with the best 3-card hand. (Check: does this make sense? (44-9)*(43-10) = 1155, close enough... there are 10 cases missing somewhere.) [/ QUOTE ] I could be thinking wrong about this, but I think that this ought to be: 9(44-10)=306 (44 cards in the deck - 10 cards that will give a badugi to the villain) 10(43-9)340 So you have 1892-90-306-340=1156 And then (44-10)*(43-9)=1156 I don't think this would make much difference in the overall conclussions though. |
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