Omaha holdem wikipedia
Omaha Hold’em (Omaha holdem nebo jen Omaha) je varianta pokeru. Část názvu Hold’em značí, že se jedná o hru s komunitními (společnými) kartami. This article should include a better summary of History of poker. See Wikipedia: Texas hold 'em and Omaha are two well-known variants of the community card family. Omaha hold 'em (ou Omaha holdem ou simplesmente Omaha) é uma variante de pôquer derivada do Texas hold 'em, onde cada jogador recebe quatro cartas fechadas, das.
Omaha hold 'em
The money pool is redistributed to the players in relation to the place they finished in the tournament. To lose the nut low in this case either a 2 and a 3, a 2 and a 4, or a 3 and a 4 would have to hit the board on the turn and the river giving the nut low to a player holding , and , respectively , an unlikely possibility. The no-limit and fixed-limit cash-game versions of hold 'em are strategically very different. Sample hand[ edit ] The blinds for this example hand Here is a sample game involving four players. Both hole cards can be used in a flush if they are suited, but pairs are never suited, so there would be 13 possible pairs, 78 possible suited non-pairs, and 78 possible unsuited "off-suit" non-pairs, for a total of possible hands.
Full house, kings full of fours Alice 8-high straight In this case, Ted's full house is the best hand, with Carol in second, Alice in third and Bob last. Sample hand[ edit ] The blinds for this example hand Here is a sample game involving four players. The players' individual hands will not be revealed until the showdown, to give a better sense of what happens during play: Alice is the dealer. Alice deals two hole cards face down to each player, beginning with Bob and ending with herself.
Ted must act first, being the first player after the big blind. Carol's blind is "live" see blind , so there is the option to raise here, but Carol checks instead, ending the first betting round. On this round, as on all subsequent rounds, the player on the dealer's left begins the betting.
Alice now burns another card and deals the turn card face up. Bob checks, Carol checks, and Alice checks; the turn has been checked around.
Kickers and ties[ edit ] Because of the presence of community cards in Texas hold 'em, different players' hands can often run very close in value. As a result, it is common for kickers to be used to determine the winning hand and also for two hands or maybe more to tie. A kicker is a card which is part of the five-card poker hand, but is not used in determining a hand's rank. The following situation illustrates the importance of breaking ties with kickers and card ranks, as well as the use of the five-card rule.
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In order for anyone to qualify low, there must be at least three cards of differing ranks 8 or below on the board. For example, a board of KJ makes low possible the best low hand would be A-2, followed by A-3, , etc. A board of KJ, however, cannot make any qualifying low the best low hand possible would be JA, which does not qualify. Low hands often tie, and high straights occasionally tie as well, as do, even more rarely, full houses.
In theory, it is possible to win as little as a 14th of a pot though this is extraordinarily rare. Winning a quarter of the pot is quite common, and is called "getting quartered. To illustrate, if a player has, for example, and two other cards in his hand and the flop is A, that player has flopped the "nut low". However, if either a 2 or a 3 hit the board on the turn or the river, the hand is "counterfeited" and the nut low hand is lost the player still has a much weaker low hand however, with , and making better lows.
This is why there is significant extra value in possessing the "protected" nut low. To illustrate this, if the player has in his hand his low is protected, i. To lose the nut low in this case either a 2 and a 3, a 2 and a 4, or a 3 and a 4 would have to hit the board on the turn and the river giving the nut low to a player holding , and , respectively , an unlikely possibility.
For similar reasons it is significantly better to possess the protected nut low draw over the low draw. For example, this could be having A with a flop of ; any low card below 7 on the turn or river gives the player the best low.
When four or five low cards appear on the board, it can become very difficult to read the low hands properly. In this situation he is often said to be playing his "live" 4, that is, his 4, plus some other low card that matches the board but still makes a low because the one on the board isn't needed.
Rating Newest Oldest Best Answer: There are 2 ways of seeing this. By the way, if you wrote that in terms of ODDS, it's written ", to 1". Again - 2 for your hand, and 3 for the flop. It is also the same odds as ALL 5 community cards being a Royal Flush for everyone to share, but that has nothing to do with your question.
By the way, before I go onto Scenario 2, the formula for Scenario 1 is correctly found in the following manner: That's ANY of the face cards in the deck including Aces. There are now only FOUR cards that you can be dealt as your second hole card because it has to match your other hole card's suit. On the flop it's now 3 out of 50, then 2 out of 49, then 1 out of 48 for the three Flop cards.
I explain it a little more thoroughly in Scenario 2. Therefor your formula is the following: Whichever two doesn't matter.
You can get ANY of 3 cards on the first card. That's 3 out of 50 cards left. You can get any of 2 remaining Royal Flush cards as the second card. That's 2 out of 49 cards left. Then you can only get 1 card to complete the Royal Flush for the 3rd 'Flop' card. That's 1 out of 48 cards left. Don't those cards matter??? You ONLY know 2 cards - your 2 hole cards. If you peeked at your neighbors cards and saw that he didn't have 1 of your Royal cards, then it would change the whole formula and you'd have a better chance.
If you peeked and saw that your neighbor DID have one of your Royal cards, then it would make the equation simple: You'd have ZERO chance! That is why your final formula, based on the previous paragraph , is this: This equals a 1 out of 19, chance of flopping the Royal Flush when you already are dealt 2 of any Royal Flush cards pre-flop.