Suppose we play a variant of poker in which a hand consists of a selection of six cards from a standard 52 card deck. Let's call a hand a really full house if it consists of four cards of one rank and two cards of another rank. For example, JO, J♡,. ,20, 2% is a really full house. How many distinct really full house hands are possible? (You may leave your answer in terms of ()'s, exponents, factorials, etc.)

Transcribed Image Text:

Suppose we play a variant of poker in which a hand consists of a selection of six cards from a standard 52 card deck. Let's call a hand a really full house if it consists of four cards of one rank and two cards of another rank. For example, JO, J♡, JA, ,20, 2% is a really full house. How many distinct really full house hands are possible? (You may leave your answer in terms of ()'s, exponents, factorials, etc.)