If you pick five cards from a standard 52-deck,
(a) what is the probability of getting two kings and three "4s"?
(b) what is the probability of getting four ♣'s and one ♠?
(c) what is the probability of getting three aces?
(d) what is the probability of getting two ♢'s and two ♡'s?
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(♠|♣) =
Five cards are to be chosen from a standard 52-card deck. In how many ways can this be done if… a. All of the cards are clubs? b. There are three clubs and two spades? c. What is the probability you get 4 Aces and 2 Kings?
A deck of cards has 4 suits and 13 denominators. A full deck contains 52 cards A single card has three characteristics: suit, denomination and colour, for example a king of red hearts. (a) 7 cards are drawn from 52, without replacement. Let ? be the number of ♢ 's drawn. What is the standard deviation of ?,??[?]=? (b) 28 cards are drawn from 52, with replacement and the number of ♣'s drawn is at most 11 but at least...
Suppose you are dealt six cards from a well-shuffled standard playing deck (there are 13 kinds, and four of each kind, in the standard 52 card deck). (a) What is the probability of receiving 3 aces and 3 kings? (b) What is the probability of receiving 3 of one kind and 3 of another? (c) What is the probability of receiving 4 aces and 2 kings?(d) What is the probability of receiving 4 of one kind and 2 of another?
Suppose you draw 5 cards from a standard 52 card deck (13 rank cards in 4 suits). What is the probability your hand contains at least two aces or at least two kings?
Problem 6 Five cards are dealt from a standard 52-card deck. Note that there are 13 kind of cards and each kind has 4 cards in a standard deck. (a) How many ways that one can draw 3 aces and 2 kings? (0.5 point (b) How many ways that one can draw a full house (3 cards of one kind, 2 cards of another kind)? (0.5 point)
You pick cards one at a time without replacement from an ordinary deck of 52 playing cards. What is the minimum number of cards you must pick in order to guarantee that you get three of a kind, and three Kings **Show all work**
2. Consider a standard 52 card deck of playing cards. In total there are four cards that are Aces, four cards that are Kings, four cards that are Queens and four cards that are Jacks. The remaining 36 cards are four each of the numbers 2, 310. That is there are four cards that are twos, four cards that are threes etc. For this question, suppose that we reduce the number of cards in the deck by removing one of...
Consider a standard deck of 52 cards with 4 suits. Define events! a. Suppose you pick 1 card at random from the deck. What is the probability that card is a heart? b. Suppose you pick one card from the deck. What is the probability that card is a 5? c. Suppose you pick one card from the deck. What is the probability that the card is a heart and a 5? d. Suppose you pick one card from the...
The following question involves a standard deck of 52 playing cards. In such a deck of cards there are four suits of 13 cards each. The four suits are: hearts, diamonds, clubs, and spades. The 26 cards included in hearts and diamonds are red. The 26 cards included in clubs and spades are black. The 13 cards in each suit are: 2, 3, 4, 5, 6, 7, 8, 9, 10, Jack, Queen, King, and Ace. This means there are four...