Poker Odds Of Getting Aa
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Texas Hold'em Odds. The following Texas Hold em odds table highlights some common probabilities that you may encounter in Hold'em. It is not vital that you learn these probabilities, but it is useful to be aware of the chances of certain situations arising. Contrary to what some poker strategists tend to preach you don’t need to memorize lists of odds and perform complex mathematics to be a winning Hold’em player. However, there are some simple Texas Hold’em odds and probabilities that you should know well when you’re drawing to a hand or want to prevent your opponents from doing so.
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Introduction
'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.
- Both the bad beat and winning hand must be the best possible combination of five cards. In cases where the same hand can be created multiple ways (for example player has AK and the board shows AAKKQ) the player's hole cards will take priority.
- Both the bad beat and winning hand must make use of both hole cards.
- A full house must be beaten by a four of a kind or higher.
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 Probabilities
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 |
Methodology
Best Video Poker Odds
The above tables are the result of random simulations of about 2.5 billion rounds each.
Further Reading
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.
There are card combinations which are more or less likely to provide certain opportunities, but cards are only a part of the equation, and attaching emotional value to them is counter-productive. This fact alone has enabled me to react positively to bad outcomes of decisions I have made elsewhere in life, because I still feel the decision was sound. There are no good or bad hands. Why poker is bad for you. You play the cards you get the best you can. Whether or not something is a good or bad decision is set in stone when it is made, based on the likelihood and severity of certain outcomes, and based on the possible knowledge available to me at the time.
Written by: Michael Shackleford
In our poker math and probability lesson it was stated that when it comes to poker; “the math is essential“. Although you don’t need to be a math genius to play poker, a solid understanding of probability will serve you well and knowing the odds is what it’s all about in poker. It has also been said that in poker, there are good bets and bad bets. The game just determines who can tell the difference. That statement relates to the importance of knowing and understanding the math of the game.
In this lesson, we’re going to focus on drawing odds in poker and how to calculate your chances of hitting a winning hand. We’ll start with some basic math before showing you how to correctly calculate your odds. Don’t worry about any complex math – we will show you how to crunch the numbers, but we’ll also provide some simple and easy shortcuts that you can commit to memory.
Basic Math – Odds and Percentages
Odds can be expressed both “for” and “against”. Let’s use a poker example to illustrate. The odds against hitting a flush when you hold four suited cards with one card to come is expressed as approximately 4-to-1. This is a ratio, not a fraction. It doesn’t mean “a quarter”. To figure the odds for this event simply add 4 and 1 together, which makes 5. So in this example you would expect to hit your flush 1 out of every 5 times. In percentage terms this would be expressed as 20% (100 / 5).
Here are some examples:
- 2-to-1 against = 1 out of every 3 times = 33.3%
- 3-to-1 against = 1 out of every 4 times = 25%
- 4-to-1 against = 1 out of every 5 times= 20%
- 5-to-1 against = 1 out of every 6 times = 16.6%
Converting odds into a percentage:
- 3-to-1 odds: 3 + 1 = 4. Then 100 / 4 = 25%
- 4-to-1 odds: 4 + 1 = 5. Then 100 / 5 = 20%
Converting a percentage into odds:
- 25%: 100 / 25 = 4. Then 4 – 1 = 3, giving 3-to-1 odds.
- 20%: 100 / 20 = 5. Then 5 – 1 = 4, giving 4-to-1 odds.
Another method of converting percentage into odds is to divide the percentage chance when you don’t hit by the percentage when you do hit. For example, with a 20% chance of hitting (such as in a flush draw) we would do the following; 80% / 20% = 4, thus 4-to-1. Here are some other examples:
- 25% chance = 75 / 25 = 3 (thus, 3-to-1 odds).
- 30% chance = 70 / 30 = 2.33 (thus, 2.33-to-1 odds).
Some people are more comfortable working with percentages rather than odds, and vice versa. What’s most important is that you fully understand how odds work, because now we’re going to apply this knowledge of odds to the game of poker.
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Counting Your Outs
Before you can begin to calculate your poker odds you need to know your “outs”. An out is a card which will make your hand. For example, if you are on a flush draw with four hearts in your hand, then there will be nine hearts (outs) remaining in the deck to give you a flush. Remember there are thirteen cards in a suit, so this is easily worked out; 13 – 4 = 9.
Another example would be if you hold a hand like and hit two pair on the flop of . You might already have the best hand, but there’s room for improvement and you have four ways of making a full house. Any of the following cards will help improve your hand to a full house; .
The following table provides a short list of some common outs for post-flop play. I recommend you commit these outs to memory:
Table #1 – Outs to Improve Your Hand
The next table provides a list of even more types of draws and give examples, including the specific outs needed to make your hand. Take a moment to study these examples:
Table #2 – Examples of Drawing Hands (click to enlarge)
Counting outs is a fairly straightforward process. You simply count the number of unknown cards that will improve your hand, right? Wait… there are one or two things you need to consider:
Don’t Count Outs Twice
There are 15 outs when you have both a straight and flush draw. You might be wondering why it’s 15 outs and not 17 outs, since there are 8 outs to make a straight and 9 outs for a flush (and 8 + 9 = 17). The reason is simple… in our example from table #2 the and the will make a flush and also complete a straight. These outs cannot be counted twice, so our total outs for this type of draw is 15 and not 17.
Anti-Outs and Blockers
There are outs that will improve your hand but won’t help you win. For example, suppose you hold on a flop of . You’re drawing to a straight and any two or any seven will help you make it. However, the flop also contains two hearts, so if you hit the or the you will have a straight, but could be losing to a flush. So from 8 possible outs you really only have 6 good outs.
It’s generally better to err on the side of caution when assessing your possible outs. Don’t fall into the trap of assuming that all your outs will help you. Some won’t, and they should be discounted from the equation. There are good outs, no-so good outs, and anti-outs. Keep this in mind.
Calculating Your Poker Odds
Once you know how many outs you’ve got (remember to only include “good outs”), it’s time to calculate your odds. There are many ways to figure the actual odds of hitting these outs, and we’ll explain three methods. This first one does not require math, just use the handy chart below:
Table #3 – Poker Odds Chart
As you can see in the above table, if you’re holding a flush draw after the flop (9 outs) you have a 19.1% chance of hitting it on the turn or expressed in odds, you’re 4.22-to-1 against. The odds are slightly better from the turn to the river, and much better when you have both cards still to come. Indeed, with both the turn and river you have a 35% chance of making your flush, or 1.86-to-1.
We have created a printable version of the poker drawing odds chart which will load as a PDF document (in a new window). You’ll need to have Adobe Acrobat on your computer to be able to view the PDF, but this is installed on most computers by default. We recommend you print the chart and use it as a source of reference. It should come in very handy.
Doing the Math – Crunching Numbers
There are a couple of ways to do the math. One is complete and totally accurate and the other, a short cut which is close enough.
Let’s again use a flush draw as an example. The odds against hitting your flush from the flop to the river is 1.86-to-1. How do we get to this number? Let’s take a look…
With 9 hearts remaining there would be 36 combinations of getting 2 hearts and making your flush with 5 hearts. This is calculated as follows:
(9 x 8 / 2 x 1) = (72 / 2) ≈ 36.
This is the probability of 2 running hearts when you only need 1 but this has to be figured. Of the 47 unknown remaining cards, 38 of them can combine with any of the 9 remaining hearts:
9 x 38 ≈ 342.
Now we know there are 342 combinations of any non heart/heart combination. So we then add the two combinations that can make you your flush:
36 + 342 ≈ 380.
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The total number of turn and river combos is 1081 which is calculated as follows:
(47 x 46 / 2 x 1) = (2162 / 2) ≈ 1081.
Now you take the 380 possible ways to make it and divide by the 1081 total possible outcomes:
380 / 1081 = 35.18518%
This number can be rounded to .352 or just .35 in decimal terms. You divide .35 into its reciprocal of .65:
0.65 / 0.35 = 1.8571428
And voila, this is how we reach 1.86. If that made you dizzy, here is the short hand method because you do not need to know it to 7 decimal points.
The Rule of Four and Two
A much easier way of calculating poker odds is the 4 and 2 method, which states you multiply your outs by 4 when you have both the turn and river to come – and with one card to go (i.e. turn to river) you would multiply your outs by 2 instead of 4.
Imagine a player goes all-in and by calling you’re guaranteed to see both the turn and river cards. If you have nine outs then it’s just a case of 9 x 4 = 36. It doesn’t match the exact odds given in the chart, but it’s accurate enough.
What about with just one card to come? Well, it’s even easier. Using our flush example, nine outs would equal 18% (9 x 2). For a straight draw, simply count the outs and multiply by two, so that’s 16% (8 x 2) – which is almost 17%. Again, it’s close enough and easy to do – you really don’t have to be a math genius.
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Conclusion
In this lesson we’ve covered a lot of ground. We haven’t mentioned the topic of pot odds yet – which is when we calculate whether or not it’s correct to call a bet based on the odds. This lesson was step one of the process, and in our pot odds lesson we’ll give some examples of how the knowledge of poker odds is applied to making crucial decisions at the poker table.
As for calculating your odds…. have faith in the tables, they are accurate and the math is correct. Memorize some of the common draws, such as knowing that a flush draw is 4-to-1 against or 20%. The reason this is easier is that it requires less work when calculating the pot odds, which we’ll get to in the next lesson.
Basic Poker Odds
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By Tom 'TIME' Leonard
Tom has been writing about poker since 1994 and has played across the USA for over 40 years, playing every game in almost every card room in Atlantic City, California and Las Vegas.