The chances of getting a top starting hand (of double aces, picture pairs. Probability Of Getting 4 Of A Kind In Texas Holdem Games; As Bill F noted, the odds of getting four of a kind for any specific hand, before the deal, in holdem is approximately 0.17%. So, once you have gotten four of a kind on one hand, you have a 0.17%. The odds of getting a 4 of a kind given 7 cards (2 in your hand and 5 on the board) are (13. A Texas Holdem poker odds table. Chances of flopping a set, catching a flush, making a straight and other must know poker odds. Four of a Kind (Quads) 5555K.0239%. Pocket jacks is known as a big danger hand in Texas Hold’em. What Beats 4 Of A Kind In Texas Holdem; Texas Holdem 4 Of A Kind Odds; Introduction #4: Full House Also known as a full boat, a full house is a set of three of the same card plus two other cards that match, such as 8-8-Q-Q-Q. The higher of the three of a kind wins in a showdown of full houses. Four-of-a-kind, or quads as its usually known in. Playing poker is about playing the odds. The following list gives the odds for outcomes in Texas Hold’em hands. When you realize how heavily the odds are stacked against you, you may want to rethink going all-in before the flop with two suited cards. Use the odds to your advantage: 1 percent (1-in-100): Percentage of.
#4: Full House Also known as a full boat, a full house is a set of three of the same card plus two other cards that match, such as 8-8-Q-Q-Q. The higher of the three of a kind wins in a showdown of full houses. Four-of-a-kind, or quads as its usually known in poker, is essentially an unbeatable hand in No-Limit Hold’em. There are technically ways you can lose with it but it’s almost unheard of and you’d have to get astronomically unlucky. Let’s start with the elephant in the room. Four of a kind, or quads, are four cards of equal value. For example, four jacks. Full house has ex. Four of a kind QQQQ6. Now which has more #'s in it theres 4 Q's and theres only # K's in full house.
'Bad beat' is a term that can mean having an outstanding chance of winning a bet, only to still lose. The term can be used in any form of gambling but is most commonly applied to poker. Many poker rooms offer a progressive jackpot for very unlikely bad beats. Various other rules are added to ensure that only surprising bad beats win. Below I present tables of bad beat probabilities, starting with the most liberal rules, and ending with the most stringent. The most stringent rules, the 'Bad Beat Type 3', are the most common, in my experience.
Following are the rules for a type 1 bad beat.
The rules for a type 2 bad beat are the same as type 1, plus any four of a kind, whether the bad beat hand or winning hand, must contain a pocket pair.
The rules for a type 3 bad beat are the same as type 2, plus a full house may not make use of a three of a kind entirely on the board.
In my experience, is the most common format for bad beat rules is type 3. The additional rule for type 3 makes very little difference, compared to type 2.
The following table shows the probability of each bad beat hand under all three types of rules. The table is based on a ten-player game in which nobody ever folds. The probabilities are for any pair of players meeting the qualifying rules. If you want to know YOUR probability of winning, you should divide the probability in the table by 10.
Bad Beat Hand | Type 1 | Type 2 | Type 3 |
---|---|---|---|
Any full house | 0.00203329 | 0.00050305 | 0.00049508 |
Full house, three 3's or higher | 0.00189512 | 0.00046978 | 0.00046204 |
Full house, three 4's or higher | 0.00175159 | 0.00043444 | 0.00042728 |
Full house, three 5's or higher | 0.00160333 | 0.00039706 | 0.00039028 |
Full house, three 6's or higher | 0.00144965 | 0.00035741 | 0.00035145 |
Full house, three 7's or higher | 0.0012936 | 0.00031767 | 0.00031266 |
Full house, three 8's or higher | 0.00113492 | 0.00027775 | 0.00027355 |
Full house, three 9's or higher | 0.00097379 | 0.00023772 | 0.00023445 |
Full house, three T's or higher | 0.00081113 | 0.00019759 | 0.00019503 |
Full house, three J's or higher | 0.00064763 | 0.00015708 | 0.00015509 |
Full house, three Q's or higher | 0.00048533 | 0.00011838 | 0.00011682 |
Full house, three K's or higher | 0.00032561 | 0.00008130 | 0.00008033 |
Full house, three A's or higher | 0.00016964 | 0.00004608 | 0.00004579 |
Full house, aces full of 3's or higher | 0.00016004 | 0.00004350 | 0.00004322 |
Full house, aces full of 4's or higher | 0.00014986 | 0.00004080 | 0.00004052 |
Full house, aces full of 5's or higher | 0.00013898 | 0.00003797 | 0.00003763 |
Full house, aces full of 6's or higher | 0.00012749 | 0.00003504 | 0.00003469 |
Full house, aces full of 7's or higher | 0.00011580 | 0.00003233 | 0.00003203 |
Full house, aces full of 8's or higher | 0.00010347 | 0.00002957 | 0.00002925 |
Full house, aces full of 9's or higher | 0.00009067 | 0.00002673 | 0.00002645 |
Full house, aces full of T's or higher | 0.00007714 | 0.00002383 | 0.00002359 |
Full house, aces full of J's or higher | 0.00006286 | 0.00002064 | 0.0000204 |
Full house, aces full of Q's or higher | 0.00004793 | 0.00001738 | 0.00001721 |
Full house, aces full of K's or higher | 0.00003230 | 0.00001408 | 0.00001402 |
Any four of a kind | 0.00001601 | 0.00001086 | 0.00001081 |
Four 3's or higher | 0.00001437 | 0.00000996 | 0.00000992 |
Four 4's or higher | 0.0000127 | 0.00000900 | 0.00000902 |
Four 5's or higher | 0.00001099 | 0.00000805 | 0.00000804 |
Four 6's or higher | 0.00000934 | 0.00000705 | 0.00000707 |
Four 7's or higher | 0.0000078 | 0.00000613 | 0.00000611 |
Four 8's or higher | 0.0000064 | 0.00000525 | 0.00000519 |
Four 9's or higher | 0.00000519 | 0.00000439 | 0.00000435 |
Four T's or higher | 0.00000414 | 0.00000359 | 0.00000357 |
Four J's or higher | 0.00000317 | 0.00000287 | 0.00000285 |
Four Q's or higher | 0.00000246 | 0.00000226 | 0.00000224 |
Four K's or higher | 0.00000193 | 0.00000180 | 0.00000179 |
Four A's or higher | 0.00000157 | 0.00000149 | 0.00000147 |
Any straight flush | 0.0000012 | 0.00000122 | 0.00000121 |
Straight flush 6 high or higher | 0.00000105 | 0.00000107 | 0.00000105 |
Straight flush 7 high or higher | 0.00000089 | 0.00000091 | 0.00000090 |
Straight flush 8 high or higher | 0.00000073 | 0.00000074 | 0.00000074 |
Straight flush 9 high or higher | 0.00000056 | 0.00000059 | 0.00000058 |
Straight flush T high or higher | 0.00000041 | 0.00000043 | 0.00000042 |
Straight flush J high or higher | 0.00000028 | 0.00000027 | 0.00000027 |
Straight flush Q high or higher | 0.00000012 | 0.00000012 | 0.00000012 |
The above tables are the result of random simulations of about 2.5 billion rounds each.
The video poker variant World Series of Poker - Final Table Bonus features a bad beat jackpot. See my section on that game for more information.
Brian Alspach has a very good page on Texas Hold'em, including a section on the Bad Beat Jackpot at Party Poker.
Written by: Michael Shackleford
There are 10 different hands ranks in Texas Hold’em – from a Royal Flush to a Straight to a lousy High Card. Here’s a comprehensive list of all Texas Hold’em poker hand rankings:
You can also print and download the Official Texas Hold’em hand ranking as a PDF file.
Download the poker hand ranking charts image or PDF:
If you want to start playing poker online, check our online poker sites comparison:
There are only 10 distinct poker hand ranks, but if you randomly deal 5 cards from a deck of 52 cards there are exactly 2,598,960 possible card combinations.
The poker hand ranking charts are based on the probability for each distinct hand rank. More unlikely combinations are ranked higher. Those are the probabilities and odds for all 5-card poker hands:
If you’re playing Texas Hold’em, you have 7 cards to chose your hand from. There are 133,784,560 to deal 7 random cards. This changes the odds and probabilities for all poker hands a bit. Those are the probabilities and odds for all Texas Hold’em Poker hands:
Technically it’s more likely that you’re dealt at least a pair in Texas Hold’em than holding only high card. But “High Card” still remains the lowest rank.
When playing Texas Hold’em (or any other popular poker variant) 2 pairs are always ranked below a straight.
3 Aces are just trips (or three of a kind) in poker. When playing regular Texas Hold’em a straight is ranked above trips. There are however rule variations where trips can bet a straight, namely Short Deck Hold’em, a poker variant where all cards below 5 are removed.
In regular poker variants there are is no 5-of-kind rank. When playing with wildcards (joker) 5 of a kind are possible. In this case 5 of a kind are the highest possible poker hand and beat a royal flush.
Every full house always beats trips, no matter the rank of the trips. Even trip aces are always ranked below every possible full house.
A Royal Flush is the best possible poker hand and of course always beats any other flush.
Every common poker variant, including Texas Hold’em, ranks a Full House above a straight. So no, a Straight never beats a Full House in Poker.
In all regular modern poker variations (including Texas Hold’em and Omaha) a Royal Flush is always the highest possible hand rank. A higher rank is only possible when playing with a Joker. In this case 5 of a kind (4 Aces plus Joker) beats a Royal Flush.
A Flush is a very strong hand in poker. The only hands that beat a Flush are Full House, Quads, Straight Flush, and Royal Flush.
A Royal Flush is extremely rare. When playing Texas Hold’em you’ll only get one every 31,000 hands. And that assumes you never fold. The hand is so rare that most poker players can remember all Royal Flushes they have been dealt in their life time.
Straight Flushes are almost as rare as Royal Flushes. When playing Texas Hold’em you will hit a Straight Flush roughly every 3,600 hands (assuming you never fold any hand that can make a Straight Flush).
There is no “3 pair” hand rank in poker. When playing Texas Hold’em it’s technically possible to have three pairs, but since a poker hand only consists of 5 cards only the 2 highest pairs are in play. For example, if you hold Q-J and the board reads Q-J-6-A-A you only have two pair: Aces and Queens.
A Royal Flush can be any of the 4 suits, spades, hearts, diamonds, or clubs. It’s just that usually a Royal Flush is depicted in spades or hearts. Nevertheless, it doesn’t matter which suit, a Royal Flush is always the best Texas Hold’em Poker Hand.
A poker hand can consist of up to 5 kickers. A player with no pair only has kickers. A player with one pair has 3 kickers, a player with trips has 2 kickers, and a player with 2 pair or quads has 1 kicker.
When building a straight an Ace can be used as a virtual “1” in poker. Meaning, A-2-3-4-5 is a straight. There are also lowball poker variations where the Ace counts as the lowest card.
Yes, the ace can count as the lowest card in a straight and function as a “1” when combined with 2-3-4-5.
A straight cannot go “around the corner”, the Ace can only be either the highest or the lowest card, not a card in the middle. So no, J-Q-K-A-2 is no straight in poker.
A straight cannot go “around the corner”, the Ace can only be either the highest or the lowest card, not a card in the middle. So no, Q-K-A-2-3 is no straight in poker.
For a straight you need to use all 5 cards. There are no cards left for a kicker. The rank of the straight is determined by the highest card. E.g. an ace-high straight beats a queen-high straight.
A flush in poker is hand which consists of 5 cards of the same suit. The same color (red or black) is not enough. It has to 5 spades, hearts, diamonds, or clubs.
There are no distinctions between the 4 possible Royal Flushes in poker. A Royal Flush in spades is as good as a Royal Flush in hearts, diamonds, or clubs.
Only in very rare occasions (for example when dealing for the button) the suits are ranked in poker. In this case the ranking is: 1. spades, 2. hearts, 3. diamonds, 4. clubs. Suits are otherwise generally not ranked in poker. A Flush in spades is as good as a flush in any other suit, only the ranks of the cards matter.
In poker the lowest possible pair is a pair of Deuces (twos).
To win a bad beat jackpot in poker you need to lose with a very strong hand, usually a strong Full House (Aces Full). It’s also necessary that both, the winning hand losing player, user both of their hole cards. E.g. losing with quads on the board does not count.
The odds of hitting a bad beat jackpot in poker depend on the rules for the jackpot. If you have to lose with Aces Full or better your odds of hitting the bad beat jackpot are 1:58,948. If you have to lose with quads or better your odds are 1:624,609 (assuming a 10 player table where nobody ever folds).
If you lose with a very strong hand against an even stronger hand this is called a “bad beat”. It is also a bad beat if you lose an all-in while being far ahead and you opponent wins by catching some miracle cards.
5 Card Stud is one of the oldest poker variants where each player is dealt 5 cards. There are exactly 2,598,960 different 5 stud poker hands possible.
There are only 10 distinct poker hand ranks, but if you randomly deal 5 cards from a deck of 52 cards there are exactly 2,598,960 possible card combinations. If you’re playing Texas Hold’em, you have 7 cards to chose your hand from. There are 133,784,560 to deal 7 random cards.
It’s possible (and not too uncommon) for two players to have the same hand in poker. In this case the pot is split and both players receive half the pot.
When playing Texas Hold’em it’s almost impossible for two players to have a Royal Flush. For that to happen the 5 community cards need to form a Royal Flush. In that case all players in the hand win and split the pot.
If two players have the same hand, the pot is split and both players win half of it. This can happen for example if both players have the same cards (e.g. Ace-King) and nobody makes a Flush.
In Video Poker you can win the jackpot when you hit a Royal Flush. To maximize your chances you should always keep all suited cards 10 or above (if you have at least 2) and discard the rest. You will see a Royal Flush roughly once every 40,000 spins.
The odds of hitting a royal flush directly are only 1 in 649,739. But since you can draw one time your odds increase. If you play perfectly your odds of hitting a royal flush are roughly 1 in 40,000.