A hand of 5 cards is dealt from a deck of 52 playing cards. What is the probability that the hand contains:
a) two spades and two hearts
b) two aces and a spade
c) at least two spades
A hand of 5 cards is dealt from a deck of 52 playing cards. What is...
You are dealt two playing cards from a shuffled 52-card deck. Per usual, this deck contains 4 aces. What is the probability that both of your cards are aces?
11 (6 points). A 5-card hand is dealt from a well-shuffled deck of 52 playing cards. What is the probability that the hand contains at least one card from each of the four suits?
Two cards are dealt from a standard deck of playing cards (52 cards, no jokers). The cards are not replaced after they are dealt. c) The probability that the first and second cards are both kings? P(K and K) = d) The probability that the first card is a club P(♣) = e) If the first card is a club, the probability that the second card will be a spade P(♠|♣) =
Question:You are randomly dealt 5 cards from a standard deck of 52 playing cards. What is the probability that you have at least 4 cards of the same suit?My solution: 4 [ P(4 of the same suit) ] - because there are 4 different ways to get 4 of the same suit, Clubs, Hearts, Spades and Diamonds.P(4 of the same suit) = (13 C 4 * 39 C 1)/(52 C 5)13 Choose 4 because you have 13 different cards in...
4. Playing poker, you are dealt five cards from a deck of 52 playing cards. (Remember there are 4 suits (spades, hearts, diamonds, clubs) of 13 cards in each suit (A,K,Q,J,10,9,8,7,6,5,4,3,2).) What is the probability of being dealt at least one Ace in those first 5 cards? (without replacement) _________________ 5. Six books are randomly stacked on a desk. What is the probability that they will, by chance, be perfectly stacked in alphabetical order? ______________ 6. A group of 10...
1. (25 total points) Probability and card games; Recall that an ordinary decdk of playing cards has 52 cards of which 13 cards are from each of the four suits hearts, diamonds, spades, and clubs. Each suit contains the cards 2 to 10, ace, jack, queen, and king. (a) (10 points) Three cards are randomly selected, without replacement, from an or- dinary deck of 52 playing cards. Compute the conditional probability that the first card selected is a spade, given...
A card is dealt from a complete deck of fifty-two playing cards (no jokers). Use probability rules (when appropriate) to find the probability that the card is as stated. (Enter your answers as fractions.) (a) a king and a spade (b) a king or a spade (c) not a king of spades
6. Three cards are randomly selected, without replacement, from a deck of 52 playing cards. Any such deck of cards contains exactly 13 spades. Compute the conditional probability that the first card selected is a spade, given that the second and third cards are spades.
A 5-card hand is dealt from a well-shuffled deck of playing cards. What is the probability of getting a hand with three cards of the same rank? What is the probability of getting a hand with two cards of the same rank? Please write as legibly as possible
You are dealt two cards from a deck of 52 cards. What is the probability that your two dealt cards are the 3 of clubs and the queen of hearts?