How many five-card hands (drawn from a standard 52-card deck) contain exactly three sixes?
We need to choose 3 sixes out of 4 and then 2 cards out of remaining 48 from the deck. Hence,
Number of five card hands with exactly three sixes
= 4C3 * 48C2
= 4512
How many five-card hands (drawn from a standard 52-card deck) contain exactly three sixes?
How many five-card hands (drawn from a standard 52-card deck) contain a three-of-a-kind?
How many ways are there to choose three sixes from a standard 52-card deck?
How many different 5 card hands can be dealt from a deck of 52 cards? Answer: possible hands How many different 5 card hands can be dealt from a deck of 52 cards if all five of these cards are clubs? Answer: possible hands How many different 5 card hands can be dealt from a deck of 52 cards if the hand consists of exactly 2 aces? Answer: possible hands How many different 5 card hands can be dealt from...
26. -12 points v From a standard 52-card deck, how many 5-card poker hands can be dealt consisting of the following cards? (a) Five clubs poker hands (b) Three kings and one pair poker hands
6. How many 5-card poker hands (from a 52-card deck) contain the Queen of Spades? (Note: There is only one Queen of Spades in a deck!)
9. How many five-card poker hands using 52 cards contain exactly two aces?
5 cards are drawn from a standard deck of 52 playing cards. How many different 5-card hands are possible if the drawing is done without replacement?
If a single card is drawn from a standard 52-card deck, in how many ways could it be a red card or a 7?
[Discrete Math] The rank of a particular card drawn from a standard 52-card deck can be 2, 3,.., J, Q, K, A, while the possible suits are: spade, diamond, heart, and club. Consider 6-card hands dealt from a standard deck of 52 cards, the order in which the cards are dealt does not matter. How many hands contain 2 hearts and 4 spades?
Five cards are drawn from a standard 52 playing card deck. Find the probability of: a) Straight (5 consecutive enumeration) b) Flush (5 cards of the same suit) c) Exactly two pair d) Exactly 3 of a kind e) A full house (three of a kind and a pair)