Homework SourseIn 5card poker played with a standard 52card deck 2598960 di
In 5-card poker, played with a standard 52-card deck, 2,598,960 different hands are possible. If there are 624 different ways a \"four-of-a-kind\" can be dealt, find the probability of not being dealt a \"four-of-a-kind\". Express as a fraction,but do not simplify.
In 5-card poker, played with a standard 52-card deck, 2,598,960 different hands are possible. If there are 624 different ways a \"four-of-a-kind\" can be dealt, find the probability of not being dealt a \"four-of-a-kind\". Express as a fraction,but do not simplify.
Solution
It will be (2,598,960-624)/2,598,960
= 2598336/2,598,960
![In 5-card poker, played with a standard 52-card deck, 2,598,960 different hands are possible. If there are 624 different ways a \](/WebImages/12/in-5card-poker-played-with-a-standard-52card-deck-2598960-di-1012617-1761522868-0.webp "In 5-card poker, played with a standard 52-card deck, 2,598,960 different hands are possible. If there are 624 different ways a \")
