Alice and Bob are going to be playing a game where they must drink poison. There are three bottles of poison to be divided among the players and the goal is to drink as little as possible (as some amount of the poison is lethal, but the players do not know how much). The game begins with Alice pouring some amount of the first bottle into a cup, then Bob selects if he would like to drink everything in the cup or everything in the bottle. Whichever one he does not choose Alice must drink. Then Alice pours some of the second bottle into a cup and Bob chooses who will drink from the cup and who will drink from the bottle, finally the third bottle is divided the same way. A special rule is in place however, Bob is not allowed to select from the cup all three times, he must select the bottle at least once. How should Alice divide up the bottles to minimize the amount she must drink?
Drinking Game
New puzzle time? It seems like that can only cause disaster when I finally run out of puzzles. My usual sources seem to be drying up, but I guess I have a few left. This one is from the xkcd forums (though, reworded):
Poker Time
Guess its time to blog again. The double draw poker problem has been up for ages, and my readership (yes, you) is probably bored of it.
The solution isn't hard to get at, the first thing is to notice that if Bob is able to grab an ace-high straight flush with his first move then the game is over right away (one might call an ace-high straight flush a "royal flush", but I absolutely hate that notation). So we see that Alice must block all four of the ace-high straight flushes right away, perhaps by taking all four aces and some other random card.
If Bob responds to this by taking any straight flush, Alice can get an ace-high straight flush and win (Bob cannot match that hand because he cannot access any of the aces). However, if Bob responds by grabbing all the kings, then Alice cannot do anything. She can get a queen-high straight flush, but Bob can beat that easily. Apparently just grabbing all the aces does not work.
One can try all the kings or whatever, but it is pretty apparent pretty fast that taking all the tens is the solution. After Bobs next move, Alice grabs an ace-high straight flush if she can, or a ten-high straight flush if she cannot. Without any tens, the best Bob can do is a nine-high straight flush.
Pretty simple, I know, but for some reason I like it.
The solution isn't hard to get at, the first thing is to notice that if Bob is able to grab an ace-high straight flush with his first move then the game is over right away (one might call an ace-high straight flush a "royal flush", but I absolutely hate that notation). So we see that Alice must block all four of the ace-high straight flushes right away, perhaps by taking all four aces and some other random card.
If Bob responds to this by taking any straight flush, Alice can get an ace-high straight flush and win (Bob cannot match that hand because he cannot access any of the aces). However, if Bob responds by grabbing all the kings, then Alice cannot do anything. She can get a queen-high straight flush, but Bob can beat that easily. Apparently just grabbing all the aces does not work.
One can try all the kings or whatever, but it is pretty apparent pretty fast that taking all the tens is the solution. After Bobs next move, Alice grabs an ace-high straight flush if she can, or a ten-high straight flush if she cannot. Without any tens, the best Bob can do is a nine-high straight flush.
Pretty simple, I know, but for some reason I like it.
Double Draw Poker
Alright, a bit of an unusual puzzle this time, but I thought it was sort of neat. I first found this on the xkcd forums:
If you don't know the rankings of poker hands, you are beyond help. I guess you could look them up, but I actually would say you won't find this puzzle even slightly interesting so don't even bother.
Alice and Bob are going to play a poker variant. A standard 52 card deck is laid out face up in front of them. Alice goes first, and gets to select any 5 cards from the deck. Then Bob gets to select any 5 cards that are still in the deck (not being allowed to select any cards Alice selected). Then Alice may discard any of her cards and replace them with cards still in the deck (discarded cards are removed from the game and do not return to the deck). Then Bob may discard any of his cards and replace them with cards from the deck. At this point, the game ends and whoever has the better poker hand of 5 cards wins. If both players have equal ranked hands, then Bob wins the game (that being the compensation for going second). Who wins this game when played optimally?
If you don't know the rankings of poker hands, you are beyond help. I guess you could look them up, but I actually would say you won't find this puzzle even slightly interesting so don't even bother.
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