52 Cards Choose 5 - At least one of the cards drawn is a king and...

52 Cards and you draw 5 - At least one is a 9 and four out...

52 Cards and you draw 5 - At least one is a 9 and four out of five of the cards belong to the same denomination (2,3,4,5,6,7,8,9,10,J,Q,K,A)

Probabilities with a deck of cards. There are 52 cards in a standard deck of cards....

Probabilities with a deck of cards. There are 52 cards in a standard deck of cards. There are 4 suits (Clubs, Hearts, Diamonds, and Spades) and there are 13 cards in each suit. Clubs/Spades are black, Hearts/Diamonds are red. There are 12 face cards. Face cards are those with a Jack (J), King (K), or Queen (Q) on them. For this question, we will consider the Ace (A) card to be a number card (i.e., number 1). Then for each...

Given:  A regular deck of 52 cards.   Cards are drawn without replacement.  R = red card; B = black...

Given:  A regular deck of 52 cards.   Cards are drawn without replacement.  R = red card; B = black card; C = club; D = diamond; H = heart; S = spade; J = Jack; Q = Queen; K = King; A = Ace. 19.  P(S) = 13/52                   20.  P(Q and Q) =                        21.  P(Q and J) =                                                                                                                                                                                         22.  P(H and D) =. 23.  P(Q | Q) =               24.  P(R | R) =                         25.  P(R | B) =                                                                                                                                                                                       26.  P(A | K)= 27.  What is the probability that the card is red if it is known to be...

Cards are drawn from a standard 52 card deck. After each card is drawn, it is...

Cards are drawn from a standard 52 card deck. After each card is drawn, it is put back in the deck and the cards are reshuffled so that each card drawn is independent of all others. Let N be the random variable that represents the number of cards that are drawn before the second appearance of an Ace. For example, if the sequence of cards drawn was {2, 5, K, 7, A, 5, 3, J, A, ...} then N would...

two cards are drawn successively with replacement from a desk of 52 cards, if there are...

two cards are drawn successively with replacement from a desk of 52 cards, if there are 4 kings in the deck of 52. 1) find the probability distribution for the random variable K, which represent the number of kings drawn. 2) confirm that R V K is a descrete random variable. 3)provide a graphical representation of the probablility distrbution for k

Two cards are drawn successively from an ordinary deck of 52 well-shuffled cards. Find the probability...

Two cards are drawn successively from an ordinary deck of 52 well-shuffled cards. Find the probability that a. the first card is not a Four of Clubs or an Five; b. the first card is an King but the second is not; c. at least one card is a Spade;

Here is a table showing all 52 cards in a standard deck. Face cards Color Suit...

Here is a table showing all 52 cards in a standard deck. Face cards Color Suit Ace Two Three Four Five Six Seven Eight Nine Ten Jack Queen King Red Hearts A ♥ 2 ♥ 3 ♥ 4 ♥ 5 ♥ 6 ♥ 7 ♥ 8 ♥ 9 ♥ 10 ♥ J ♥ Q ♥ K ♥ Red Diamonds A ♦ 2 ♦ 3 ♦ 4 ♦ 5 ♦ 6 ♦ 7 ♦ 8 ♦ 9 ♦ 10 ♦ J...

Q8. One card is drawn at random from a pack of 52 cards. What is the...

Q8. One card is drawn at random from a pack of 52 cards. What is the probability that the card drawn is a face card (Jack, Queen and King only) or greater than 7 of diamond?

Suppose 2 cards are drawn randomly for a standard 52 card deck. What is the probability...

Suppose 2 cards are drawn randomly for a standard 52 card deck. What is the probability that the second card is a face card (J, Q, or K) when the two cards are drawn without replacement? I'm stuck on this question, my hint was to draw a tree diagram to calculate the probability.

Suppose you choose 5 cards from a standard 52-card deck (with 13 hearts, 13 spades, 13...

Suppose you choose 5 cards from a standard 52-card deck (with 13 hearts, 13 spades, 13 clubs and 13 diamonds). How many different choices of cards are possible if a. you can choose any 5 cards from the deck? b. all 5 cards must be hearts? c. you must choose four kings and one queen? d. you must choose 3 kings and no queens? e. you must choose at least 1 king and at least 2 aces?