You have five cards in your (poker) hand, 3 of which are spades. That means there are 10 other spades and 37 non-spade cards out there. You get rid of your two non-spade cards and pick up two more. Use a tree diagram to find the chance that you pick up two more spades.
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You have five cards in your (poker) hand, 3 of which are spades. That means there...
The probability of getting a single pair in a poker hand of five cards is approximately 0.42. Find the approximate probability that out of 990 poker hands, there will be at least 450 with a single pair. Note: we didn’t cover the continuity correction in class, and you shouldn’t use it. ?(more than 450 out of 990 hands have a single pair)≈
You are playing poker, and your hand currently holds 3 cards that all are aces. You are then drawing two more cards. What is the probability that you will get a full house (3 of one kind and two of another)?
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...
Assume you are dealt the following hand in poker: K of hearts, Q of hearts, 10 of spades, 3 hearts, 7 clubs. If you keep the King of hearts, the Queen of hearts and the 10 of spades, find: P(Straight)…be sure to consider both 9-King and 10-Ace. as far as how many cards are left to be selected from, assume there are 47 ( that is, don't consider the cards in other players hands)
Write a Java program that deals a five-card poker hand and then determines which of the following hands are contained in it: high card, pairs, two pair, three of a kind, flush. Test only for those hands. Use the numbers from 0 to 51 to represent the cards of the poker deck. 1. To deal the cards, your main method should call a secondary method that selects a random card. The secondary method should accept 5 integers that represent the...
Assume you are dealt the following hand in poker: K of hearts, Q of hearts, 10 of spades, 3 hearts, 7 clubs. Suppose you decide to keep the King of hearts and the Queen of Hearts, and the 3 of hearts, find: - P(flush in hearts) - P(pair of Kings or a pair of Queens or a pair of both Queens and Kings) - P(3-Kings or 3-Queens) as far as how many cards are left to be selected from, assume...
(1) Suppose you are to play a version of poker where you are dealt five cards and win only if you are dealt a three of kind. That is, you win only when your five card hand contains a triple of the same rank, and two other cards each of different ranks than each other and different than the triple (examples: AAA94, 55579). If you win, you will win S100. If you lose, you have to pay some amount of...
3. Cards: I take a standard deck of 52 cards, consisting of 13 spades, 13 hearts, 13 diamonds, and 13 clubs. I am g in seeing how many non-heart cards I can draw before picking a heart. After each draw, I will put the card back in the deck, so there is a 1/4 chance I get a heart with each draw, and a 3/4 chance I do not get a heart. I think about this a te bit and...
3. Cards: I take a standard deck of 52 cards, consisting of 13 spades, 13 hearts, 13 diamonds, and 13 clubs. I am interesting in seeing how many non-heart cards I can draw before picking a heart. After each draw, I will put the card back in the deck, so there is a 1/4 chance I get a heart with each draw, and a 3/4 chance I do not get a heart. I think about this a little bit and...
3. Cards: I take a standard deck of 52 cards, consisting of 13 spades, 13 hearts, 13 diamonds, and 13 clubs. I am interesting in seeing how many non-heart cards I can draw before picking a heart. After each draw, I will put the card back in the deck, so there is a 1/4 chance I get a heart with each draw, and a 3/4 chance I do not get a heart. I think about this a ittle bi and...