Die verschiedenen Straight Flushes (für: Einfarbige Straßen; der Straight Flush die zweithöchst gewertete aller Pokerhände. Ein Straight Flush ist eine Poker Hand mit fünf aufeinanderfolgenden Karten der gleichen Farbe. Ein Ass-hoch Straight Flush, wird auch als Royal Flush. Straight Flush - Poker Lexikon. amplicom.eu soll einen ersten Eindruck für das Poker Spiel im Allgemeinen geben. Es werden die gängisten.
In poker , players form sets of five playing cards , called hands , according to the rules of the game. 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.
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. There are nine categories of hand when using a standard 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.
It ranks above a straight flush but is only possible when using one or more wild cards, as there are only four cards of each rank in the deck.
Each five of a kind is ranked by the rank of its quintuplet. Each straight flush is ranked by the rank of its highest-ranking card.
It ranks below a straight flush and above a full house. Each four of a kind is ranked first by the rank of its quadruplet, and then by the rank of its kicker.
Each full house is ranked first by the rank of its triplet, and then by the rank of its pair. Each flush is ranked first by the rank of its highest-ranking card, then by the rank of its second highest-ranking card, then by the rank of its third highest-ranking card, then by the rank of its fourth highest-ranking card, and finally by the rank of its lowest-ranking card.
It ranks below a flush and above three of a kind. Each straight is ranked by the rank of its highest-ranking card. It ranks below a straight and above two pair.
Each three of a kind is ranked first by the rank of its triplet, then by the rank of its highest-ranking kicker, and finally by the rank of its lowest-ranking kicker.
Each two pair is ranked first by the rank of its highest-ranking pair, then by the rank of its lowest-ranking pair, and finally by the rank of its kicker.
It ranks below two pair and above high card. Each one pair is ranked first by the rank of its pair, then by the rank of its highest-ranking kicker, then by the rank of its second highest-ranking kicker, and finally by the rank of its lowest-ranking kicker.
Each high card hand is ranked first by the rank of its highest-ranking card, then by the rank of its second highest-ranking card, then by the rank of its third highest-ranking card, then by the rank of its fourth highest-ranking card, and finally by the rank of its lowest-ranking card.
From Wikipedia, the free encyclopedia. For other uses, see Straight flush disambiguation. Probability and gambling have been an idea since long before the invention of poker.
The development of probability theory in the late s was attributed to gambling; when playing a game with high stakes, players wanted to know what the chance of winning would be.
In , Fra Luca Paccioli released his work Summa de arithmetica, geometria, proportioni e proportionalita which was the first written text on probability.
His work from , titled Liber de Ludo Aleae , discussed the concepts of probability and how they were directly related to gambling.
However, his work did not receive any immediate recognition since it was not published until after his death.
Blaise Pascal also contributed to probability theory. Determined to know why his strategy was unsuccessful, he consulted with Pascal.
Communicating through letters, the two continued to exchange their ideas and thoughts. These interactions led to the conception of basic probability theory.
To this day, many gamblers still rely on the basic concepts of probability theory in order to make informed decisions while gambling. The following chart enumerates the absolute frequency of each hand, given all combinations of 5 cards randomly drawn from a full deck of 52 without replacement.
Wild cards are not considered. The royal flush is a case of the straight flush. It can be formed 4 ways one for each suit , giving it a probability of 0.
When ace-low straights and ace-low straight flushes are not counted, the probabilities of each are reduced: The 4 missed straight flushes become flushes and the 1, missed straights become no pair.
Note that since suits have no relative value in poker, two hands can be considered identical if one hand can be transformed into the other by swapping suits.
So eliminating identical hands that ignore relative suit values, there are only , distinct hands. The number of distinct poker hands is even smaller.
However, even though the hands are not identical from that perspective, they still form equivalent poker hands because each hand is an A-Q high card hand.
There are 7, distinct poker hands. The frequencies are calculated in a manner similar to that shown for 5-card hands, except additional complications arise due to the extra two cards in the 7-card poker hand.
It is notable that the probability of a no-pair hand is less than the probability of a one-pair or two-pair hand. The Ace-high straight flush or royal flush is slightly more frequent than the lower straight flushes each because the remaining two cards can have any value; a King-high straight flush, for example, cannot have the Ace of its suit in the hand as that would make it ace-high instead.
Since suits have no relative value in poker, two hands can be considered identical if one hand can be transformed into the other by swapping suits.
Eliminating identical hands that ignore relative suit values leaves 6,, distinct 7-card hands. The number of distinct 5-card poker hands that are possible from 7 cards is 4, Perhaps surprisingly, this is fewer than the number of 5-card poker hands from 5 cards because some 5-card hands are impossible with 7 cards e.
Some variants of poker, called lowball , use a low hand to determine the winning hand. The frequencies given are exact; the probabilities and odds are approximate.
As can be seen from the table, just over half the time a player gets a hand that has no pairs, three- or four-of-a-kinds.
If aces are not low, simply rotate the hand descriptions so that 6-high replaces 5-high for the best hand and ace-high replaces king-high as the worst hand.
In some variants of poker a player uses the best five-card low hand selected from seven cards.