In poker, players form sets of five playing cards, called hands, according to the rules of the game.[1] Each hand 📈 has a rank, which is compared against the ranks of other hands participating in the showdown to decide who wins 📈 the pot.[2] In high games, like Texas hold 'em and seven-card stud, the highest-ranking hands win. In low games, like 📈 razz, the lowest-ranking hands win. In high-low split games, both the highest-ranking and lowest-ranking hands win, though different rules are 📈 used to rank the high and low hands.[3][4]
Each hand belongs to a category determined by the patterns formed by its 📈 cards. A hand in a higher-ranking category always ranks higher than a hand in a lower-ranking category. A hand is 📈 ranked within its category using the ranks of its cards. Individual cards are ranked, from highest to lowest: A, K, 📈 Q, J, 10, 9, 8, 7, 6, 5, 4, 3 and 2.[5] However, aces have the highest rank under ace-to-five 📈 high or six-to-ace low rules, or under high rules as part of a five-high straight or straight flush.[6][7] Suits are 📈 not ranked, so hands that differ by suit alone are of equal rank.[8]
There are nine categories of hand when using 📈 a standard 52-card deck, except under ace-to-five low rules where straights, flushes and straight flushes are not recognized. An additional 📈 category, five of a kind, exists when using one or more wild cards. The fewer hands a category contains, the 📈 higher its rank.[9] There are 52 ! ( 52 − 5 ) ! = 311,875,200 {\displaystyle {\begin{matrix}{\frac {52!}{(52-5)!}}=311{,}875{,}200\end{matrix}}} ways to 📈 deal five cards from the deck but only 52 ! ( 52 − 5 ) ! 5 ! = 2,598,960 📈 {\displaystyle {\begin{matrix}{\frac {52!}{(52-5)!5!}}=2{,}598{,}960\end{matrix}}} distinct hands, because the order in which cards are dealt or arranged in a hand does not 📈 matter.[10] Moreover, since hands differing only by suit are of equal rank, there are only 7,462 distinct hand ranks.[11]
Hand-ranking categories 📈 [ edit ]
* Only possible when using one or more wild cards ** Category does not exist under ace-to-five low 📈 rules