SOLUTION: In 5 card poker,played with a standard 52 card deck 52C5 or 2598960 different hands are possible. The probability of being dealt various hands is the number of different ways they
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-> SOLUTION: In 5 card poker,played with a standard 52 card deck 52C5 or 2598960 different hands are possible. The probability of being dealt various hands is the number of different ways they
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Question 1008078: In 5 card poker,played with a standard 52 card deck 52C5 or 2598960 different hands are possible. The probability of being dealt various hands is the number of different ways they can occur divided by 2598960. The probability of being dealt this type of hand is 8942/2598960. Find the probability of not being dealt this type of hand. Answer by fractalier(6550) (Show Source):
You can put this solution on YOUR website! As before, we subtract the probability of getting the hand from all the hands to find the probability of not getting the hand, so
2598960/2598960 - 8942/2598960 = 2590018/2598960 then reduce
