A,what is the probability that you get "three of a kind", with three cards of the...

. In a 7 card hand, what is the probability of a. three cards of one...

. In a 7 card hand, what is the probability of a. three cards of one rank two of another rank and one each of two more different ranks? b. three cards of one suit, two of a second suit and one each of the remaining suits? c. three of one rank, three of a second rank

5. In poker, a “flush” is a five-card hand where all five cards have the same...

5. In poker, a “flush” is a five-card hand where all five cards have the same suit. A hand has “three of a kind” when any three cards have the same rank. “Four of a kind” is defined analogously. A flush beats a three of a kind, but is beaten by four of a kind. Demonstrate that this ranking of hands corresponds to how unlikely each hand type is to occur when drawing five cards at random (Hint: just count...

Determine the probability that a poker hand (of 5 cards) is three of a kind. Three...

Determine the probability that a poker hand (of 5 cards) is three of a kind. Three of a kind means that there are exactly three cards of the same face value (2,3,4,5,6,7,8,9,10,J,Q,K, or A), and two other cards with different face values.

What is the probability that a hand of eight cards dealt from a shuffled pack contains:...

What is the probability that a hand of eight cards dealt from a shuffled pack contains: a) exactly three cards of the same value and the remaining cards all from the remaining suit (for example, ♥ 4, ♦ 4, ♠ 4 and five clubs not including the ♣ 4); b) exactly three cards in at least one of the suits; c) exactly three cards in exactly one of the suits. (Hint. First find the number of ways in which five...

Find the probability of being dealt seven clubs and three cards with one card of each...

Find the probability of being dealt seven clubs and three cards with one card of each other remaining suit in 10​-card poker.

1. A five-card poker hand is dealt from a standard deck of cards. Find the probability...

1. A five-card poker hand is dealt from a standard deck of cards. Find the probability that: a. The hand contains exactly 3 Clubs and exactly 1 Spade. b. The hand contains at least two aces c. The hand contains all cards from the same suit d. The hand contains three cards from one suit and two cards from different suit e. The hand contains no more than one spade

A deck of playing cards has 52 cards. There are four suits (clubs, spades, hearts, and...

A deck of playing cards has 52 cards. There are four suits (clubs, spades, hearts, and diamonds). Each suit has 13 cards. Jacks, Queens, and Kings are called picture cards. Suppose you select three cards from the deck without replacement. a. Find the probability of getting a heart only on your second card. Round answer to three decimal places b Find the probability of selecting a Jack and a heart . Round answer to three decimal places. c. Find the...

a) Describe an experiments of the drawing of three cards from a deck of cards from...

a) Describe an experiments of the drawing of three cards from a deck of cards from which the jacks, queens and kings have been removed. (Note: these are 52 cards in a deck--13 cards are hearts, 13 cards are diamonds., 13 cards are clubs, and 13 cards are spades. A card with an ace counts as 1. Nine cards of each suit are marked 2 through 10. Ignore the jacks, queens, and kings, leaving 40 cards from which to draw.)...

Suppose that from a standard deck of cards you draw three cards without replacement. (a) Let...

Suppose that from a standard deck of cards you draw three cards without replacement. (a) Let X be the number of queens among your three cards. Complete the probability distribution for X shown below. X 0 1 2 3   P(X)   (b) What is the expected number of queens that you will draw?

Let n > 5. A deck containing 4n cards has exactly n cards each of four...

Let n > 5. A deck containing 4n cards has exactly n cards each of four diffrent suits numbered from the set [n]. Using the method of choice (or otherwise) in how many ways can five cards be chosen so that they contain: (a) five consecutive cards of the same suit? (ie. the set of numbers on the cards is [i, i + 4]) (b) four of the five cards have the same number? (c) exactly three of the cards...