A flush (5 cards from the same suit) is an excellent hand in
poker. If there...
A flush (5 cards from the same suit) is an excellent hand in
poker. If there are 13 cards in each of four suits in a deck of
playing cards and there are 5 cards in a hand, how many flush hands
are possible?
A poker hand consists of 5 cards dealt from an ordinary deck of
52 playing cards. How many different hands are there consisting of
four cards of one suit and one card of another suit?
What is the probability that a poker hand (5 cards) be ‘three of
a kind’? This 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.
In the card game Poker, a royal flush is an unbeatable hand. It
is composed of an ace, king, queen, jack, and 10 all of the same
suit. There are four possible royal flushes:
A♣️, K♣️, Q♣️, J♣️, 10♣️.
A♠︎, K♠︎, Q♠︎, J♠︎, 10♠︎.
A♥️, K♥️, Q♥️, J♥️, 10♥️.
A♦︎, K♦︎, Q♦︎, J♦︎, 10♦︎.
As you may expect, the probability of being dealt a royal flush is
incredibly tiny. "Any poker player who has ever been dealt a royal
flush...
the probability of getting a single pair in a poker hand of 5
cards is approximately .42. Find the approximate probability that
out of 1000 poker hands there will be at least 450 with a single
pair.
A poker hand consists of five cards randomly dealt from a
standard deck of 52 cards. The order of the cards does not matter.
Determine the following probabilities for a 5-card poker hand.
Write your answers in percent form, rounded to 4 decimal
places.
Determine the probability that exactly 3 of these cards
are Aces.
Answer: %
Determine the probability that all five of these cards
are Spades.
Answer: %
Determine the probability that exactly 3 of these cards
are face cards....
A poker hand consists of five cards randomly dealt from a
standard deck of 52 cards. The order of the cards does not matter.
Determine the following probabilities for a 5-card poker hand.
Write your answers in percent form, rounded to 4 decimal
places.
Determine the probability that exactly 3 of these cards are
Aces. Answer: %
Determine the probability that all five of these cards are
Spades. Answer: %
Determine the probability that exactly 3 of these cards are...
A poker hand (5 cards) is dealt off the top of a well-shuffled
deck of 52 cards. Let X be the number of diamonds in the hand. Let
Y be the number of hearts in the hand.
1. Do you think Cov[X,Y] is positive, negative, or zero?
Explain.
2. let Di(i=1,...,5) be a random variable that is 1 if the ith
card is a diamond and 0 otherwise. What is E[Di]?
3. let Hi(i=1,...,5) be a random variable that is...
A) A poker hand consists of five cards randomly dealt from a
standard deck of 52 cards. The order of the cards does not matter.
Determine the following probabilities for a 5-card poker hand.
Write your answers in percent form, rounded to 4 decimal places.
Determine the probability that exactly 3 of these cards are Aces.
Answer: % Determine the probability that all five of these cards
are Spades. Answer: % Determine the probability that exactly 3 of
these cards...
A poker hand contains five cards. Find the mean of each of the
following:
a. The number of spades in a poker hand.
b. The number of different suits in a poker hands
c. The number of aces in a poker hand.
d. The number of different face values in a poker hand.
Show steps for each part please.