Answer :
Answer:
There are 3744 possible full house hands in five-cards poker.
There are 5148 possible flush hands in five-cards poker.
Step-by-step explanation:
For a full house, we have to have 2 out of 4 of the same value with 13 different values, plus 3 out of 4 of the same value with 12 different values (because one was used for the first 2 cards). We can count those different options by using combinatorics (choosing 3 out of 4 and (in probability, and means those two are independent, meaning we multiply the options) 2 out of 4) and multiplying them by the different options of values:
[tex]Options = \left(\begin{array}{ccc}4\\2\end{array}\right)*13 * \left(\begin{array}{ccc}4\\3\end{array}\right)*12=3744[/tex]
In order to count how many hands result in a flush, we do it the same way, but now, we have to choose 5 out of 13 cards, times 4 possible suits:
[tex]Options = \left(\begin{array}{ccc}13\\5\end{array}\right)*4=5148[/tex]