To compute this probability, we will have to compute how many outcomes are possible for five draws from a deck and how many of these have exactly 3 aces and 2 kings.
Assuming it is a standard deck of 52 cards, we have a total of 4 aces and 4 kings in the deck.
This means that we need to calculate the combinations in two groups and then combine these groups.
The first group are the 3 aces. Since the order doesn't matter, we have a case of "4 choose 3":
The other group are the kings, but we will pick only 2, so it is "4 choose 2":
Now, we want to combine these two groups, we do it by multiplying their possible combinations:
So, there are 12 possible hands with 3 aces and 2 kings.
Now, we ned to compute the total possible outcomes. Since we have a deck of 52 cards and will pick 5, this is "52 choose 5":
Then the probability will be the combinations of the hand we want over the total combinations: