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In 6-card poker, played with a standard 52-card deck, 52Cg, or 20,358,520, different
hands are possible. The probability of being dealt various hands is the number of
different ways they can occur divided by 20,358,520. Shown to the right is the number
of ways a particular type of hand can occur and its associated probability. Find the
probability of not being dealt this type of hand.
The probability is (Round to six decimal places as needed.)
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Respuesta :

Using it's concept, it is found that there is a 0.999409 = 99.9409% probability of not being dealt this type of hand.

What is a probability?

A probability is given by the number of desired outcomes divided by the number of total outcomes.

In this problem, there are 20,358,520 different outcomes. The given outcome can happen in 1024 ways, and we want to find the probability of it's complement, hence those are the non-desired outcomes and the probability is:

p = (20,358,520 - 1,2024)/20,358,520 = 0.999409.

0.999409 = 99.9409% probability of not being dealt this type of hand.

More can be learned about probabilities at https://brainly.com/question/14398287

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