Mathematics

Mathematics, 12.07.2019 15:00, monsterduckgoose

How many ways can you get a royal flush in five card stud?

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Mathematics, 25.06.2019 09:40, joel4676

Five card draw is one of most basic forms of poker, and it's the kind of poker you're used to seeing in movies and on tv. this game has been around for a long time, and has been played in countless home games and card rooms across the nation. play begins with each player being dealt five cards, one at a time, all face down. the remaining deck is placed aside, often protected by placing a chip or other marker on it. players pick up the cards and hold them in their hands, being careful to keep them concealed from the other players, then a round of betting occurs. some combinations of five-card hand have special names such as full house, royal flush, four of a kind, etc. let`s find some 5-card combinations. order of the drawn card does not matter. a) a flush is a poker hand, where all five cards are of the same suit, but not in sequence. compute the number of a 5-card poker hands containing all diamonds.

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Mathematics, 20.07.2019 02:10, nika0001

Royal flush is an ace, king, queen, jack, and 10, all of the same suit. how many ways are there to get a royal flush? in 5-card poker, a there are ways to get a royal flush. vi () more enter your answer in the answer box and then click check answer all parts showing clear all check 10.5 exercises 14 w ww

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Mathematics, 27.08.2019 19:30, tessalopezgarcia2345

What is the probability that a five-card poker hand contains a royal flush, that is, the 10, jack, queen, king, and ace of one suit?

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Mathematics, 25.09.2019 06:10, tiffg3140

Hello there, i have taken my first test today and i was not able to answer these questions. i was wondering if someone can break down and show me how to solve this problem ! because i know that i will see this problem again! you. 1) we are creating a new card game with a new deck. unlike the normal deck that has 13 ranks (ace through king) and 4 suits (hearts, diamonds, spades, and clubs), our deck will be made up of the following. each card will have: i) one rank from 1 to 16. ii) one of 5 different suits. hence, there are 80 cards in the deck with 16 ranks for each of the 5 different suits, and none of the cards will be face cards! so, a card rank 11 would just have an 11 on it. hence, there is no discussion of "royal" anything since there won't be any cards that are "royalty" like king or queen, and no face cards! the game is played by dealing each player 5 cards from the deck. our goal is to determine which hands would beat other hands using probability. obviously the hands that are harder to get (i.e. are more rare) should beat hands that are easier to get. a) how many different ways are there to get any 5 card hand? the number of ways of getting any 5 card hand is (do not use any commas) b)how many different ways are there to get exactly 1 pair (i.e. 2 cards with the same rank)? the number of ways of getting exactly 1 pair is do not use any commas what is the probability of being dealt exactly 1 pair? round your answer to 7 decimal places. c) how many different ways are there to get exactly 2 pair (i.e. 2 different sets of 2 cards with the same rank)? the number of ways of getting exactly 2 pair is do not use any commas what is the probability of being dealt exactly 2 pair? round your answer to 7 decimal places. d) how many different ways are there to get exactly 3 of a kind (i.e. 3 cards with the same rank)? the number of ways of getting exactly 3 of a kind is do not use any commas what is the probability of being dealt exactly 3 of a kind? round your answer to 7 decimal places. e) how many different ways are there to get exactly 4 of a kind (i.e. 4 cards with the same rank)? the number of ways of getting exactly 4 of a kind is do not use any commas what is the probability of being dealt exactly 4 of a kind? round your answer to 7 decimal places. f) how many different ways are there to get exactly 5 of a kind (i.e. 5 cards with the same rank)? the number of ways of getting exactly 5 of a kind is do not use any commas what is the probability of being dealt exactly 5 of a kind? round your answer to 7 decimal places. g) how many different ways are there to get a full house (i.e. 3 of a kind and a pair, but not all 5 cards the same rank)? the number of ways of getting a full house is do not use any commas what is the probability of being dealt a full house? round your answer to 7 decimal places. h) how many different ways are there to get a straight flush (cards go in consecutive order like 4, 5, 6, 7, 8 and all have the same suit. also, we are assuming there is no wrapping, so you cannot have the ranks be 14, 15, 16, 1, 2)? the number of ways of getting a straight flush is do not use any commas what is the probability of being dealt a straight flush? round your answer to 7 decimal places. i) how many different ways are there to get a flush (all cards have the same suit, but they don't form a straight)? hint: find all flush hands and then just subtract the number of straight flushes from your calculation above. the number of ways of getting a flush that is not a straight flush is do not use any commas what is the probability of being dealt a flush that is not a straight flush? round your answer to 7 decimal places. j) how many different ways are there to get a straight that is not a straight flush (again, a straight flush has cards that go in consecutive order like 4, 5, 6, 7, 8 and all have the same suit. also, we are assuming there is no wrapping, so you cannot have the ranks be 14, 15, 16, 1, 2)? hint: find all possible straights and then just subtract the number of straight flushes from your calculation above. the number of ways of getting a straight that is not a straight flush is do not use any commas what is the probability of being dealt a straight that is not a straight flush? round your answer to 7 decimal places.

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