Probability and the
ability to understand and predict human behavior are the
two important keys to playing and winning at Texas
Holdem. Learning how to read your opponents comes with
practice, a keen sense of observation, and years of experience.
The knowledge of Texas Holdem probability theory can and
should be learned before you sit down with a pile of chips
in front of you. For example the odds of catching your flush
or straight, the odds of getting an overcard, or the proportion
(or percentage) of times you're going to match a card on
the flop to your pair of cards in your hand, and the percentage
of times you can expect to lose if you do not catch your
set on the flop holding a small pair are a few extremely
important factors in learning how to play Texas Holdem Poker.
Knowledge of these statistics is probably the most important
key to winning and is often the difference between winning
and losing. In online games especially without any face
to face confrontations, statistical knowledge becomes the
main factor when choosing whether to bet, call, or fold.
Here are some terms that you'll hear on this site and whenever
you're talking about poker
odds.
Outs
The number of cards left
in the deck that will improve your hand. "I had four
diamonds on the turn, so I had only 9 outs left to finish
that flush."
Pot Odds
The odds you get when
analyzing the current size of the pot vs. your next call.
"There's $240 already in the pot, and another $12 bet
coming at me, so my pot odds are good if I hit that diamond
flush"
Bet Odds
The odds you get as a
result of evaluating the number of callers to a raise. "With
a 1 in 5 chance of hitting it, and knowing all six of these
guys are planning on calling my bet, my bet odds are good
too."
Implied Odds
The odds you are getting
after the assumed result of betting for the remainder of
the hand. "Since I think these guys are going to call
on the turn and river, my implied odds are excellent."
In Texas Hold 'Em, you commonly use outs and pot odds the
most. This is also the starting point for those who want
to learn about poker odds. To those out there who "are
not exactly great mathematicians", you better get good
because that is how it's done. At this point it's only simple
division The numerator will be the number of outs you have.
The denominator is the number of cards left that we haven't
seen. The result will be the percentage chance of making
one of those outs. Therefore, the most math you'll be doing
will be dividing small numbers by 50 (pre-flop), 47 (after
the flop), or 46 (after the turn).
Before we move on, we
would like to take the opportunity to clarify one point
of statistical interest. A lot of you might wonder why we
never factor the opponents' cards or the nonused cards (referred
to as the burn cards) when figuring out the denominator
in our mathematical interpretation. The answer is very simple.
We only consider "unseen cards" in all our mathematical
calculations. If you saw what the burn cards (or unused
cards) were, or an opponent showed you his hand, you would
know that those cards are not going to be drawn and could
use that information in your calculations. We typically
do not know what they have, so we don't even think about
it when talking about odds.
Pot odds are as easy
as computing outs. You compare your outs or your chance
of winning to the size of the pot. If your chance of winning
is significantly better than the ratio of the pot size to
a bet, then you have good pot odds. If it's lower, then
you have bad pot odds. For example, say you are in a $5/$10
holdem game with Jack-Ten facing one opponent on the turn.
You have an outside straight draw with a board of 2-5-9-Q,
and only the river card left to make it. Any 8 or any King
will finish this straight for you, so you have 8 outs (four
8's and 4 K's left in the deck) and 46 unseen cards left.
8/46 is almost the same as a 1 in 6 chance of making it.
Your sole opponent bets $10. Now you have to decide if calling
that bet is a good idea or is folding the move to make here.
How do we know what to do? Simple – look for the math
to help you make the right decision. Now if you take a $10
bet you could win $200. $200/$10 is 20, so you stand to
make 20x more if you call. 1/6 is a greater number than
1/20 so the math is telling you to call this bet into you.
What about raising into this same scenario? Well then you
would be putting in $20 to make back $220 or 1/11 so again
the real gambler would raise since he could either win with
his straight or win when his opponent folds. However if
his opponent re-raised another $60 then you would be getting
only 1 in 4.67 to one odds and that is not enough money
to call – so now it would be time to fold.
Another clarification
is in order right about now ... you see there are a lot
of players want to somehow factor in money they wagered
on previous rounds in all their calculations. With the last
example, you probably had already invested a significant
portion of that $200 pot. Let's say $50. Does that mean
you should play or fold because of that money you already
have in there? $50/$200? Not at all. That's not your money
anymore! It's in a pool of money to be given to the winner.
You have no "stake" to any of the funds you have
already put in the pot. This is exactly where amateur Texas
Holdem players make their biggest tactical mistake. They
think about all the money they have put in that pot and
chase after the pot even though their mathematical chances
of winning are slim to none. The only stake you might have
is totally mental and has no bearing on hard statistics.
The next step is to use
bet odds and implied odds. That's tougher, because it involves
predicting reactions of other players. With bet odds, you
try to factor in how many people are going to call a raise.
With implied odds, you're thinking about reactions for the
rest of the game. One last example on implied odds...
Say it's another $5/$10
holdem game and you have a four flush on the flop. Your
neighbor bets, and everyone else folds. The pot is $50 at
this point. First you figure your chance of hitting your
flush on the turn, and it comes out to about 19.1% (about
1 in 5). You have to call this $5 bet vs a $50 pot, so that's
a 10x payout. 1/5 is higher than 1/10, so bet odds are okay,
but you must consider that this guy's going to bet into
you on the turn and river also. That's the $5 plus two more
$10 bets. So now your facing $25 more till the end of the
hand. So you have to consider your chances of hitting that
flush on the turn or river, which makes it about 35% (better
than 1 in 3 now), but you have to invest $25 for a finishing
pot of $100. $100/$25 is 1 in 4. That's pretty close. But
there's more!... if you don't make it on the turn, it'll
change your outs and odds! You'll have a 19.6% chance of
hitting the flush (little worse than 1 in 5), but a $20
investment for a finishing pot of $100! $100/$20 is 1 in
5. So the chances would take a nasty turn if you didn't
hit it! What's makes it more complicated is that if you
did hit it on the turn, you could raise him back, and get
an extra $20 or maybe even $40 in the pot.
As you can see I could
imagine additional scenarios that would make it impossible
for you to call. What you have to do is to master simple
outs and pot odds, and remember that bet and implied odds
are just extended versions of those odds. If you sit and
think about these things while you play, it'll come to you
eventually without any help at all.
Example number
one: playing with a pocket pair.
You start with a pair
of Aces in the pocket. You are holding the top pair. The
flop however, doesn't contain another Ace.
Lesson 1: What
are my chances of getting an Ace on the turn?
You need to just figure
out the number of outs and divide it by the number of cards
in the deck. There's 2 more Aces. There's 47 more cards
since you've seen five already (two in your hand and three
on the flop). The answer is 2/47, or 0.0426, let’s
say close to 4.3%.
Lesson 2: No
luck on the turn, how 'bout the river?
Still 2 Aces left, but
one less card in the deck bringing the grand total to 46.
What's 2/46? That's .0434, which is also a little more than
4.3% Your chances didn't change much.
Lesson 3: Now
what if I wanted to get 4 Aces! What are my chances of that
happening?
Since we're trying to
figure out the chances of getting one on the turn AND another
one on the river, and not getting one on EITHER the turn
or river, we don't have to reverse our thinking. Just multiply
the probability of each event happening. Chances of getting
that first Ace on the turn was 0.0426 and the chance of
getting a second Ace on the river would be 1/46, because
there would only be one Ace left in the deck. That's about
0.0217, or 2.2%. To get the answer, multiply these to together
.0426 X .0217 is about .0009! That's around one-tenth of
a percent or one in one thousand hands that you get pocket
Aces to start your hand - not often.
Lesson 4:
Hey, what were my chances of getting a pair of Aces to start
off with anyway?
Lesson 5:
What were my chances of getting an Ace on the flop?
Now you do have to "think
in reverse" as in the previous example. Figure out
the chances of NOT getting a Ace on each successive card
flip. First card you have a 48/50 chance (48 non-Ace cards
left, 50 cards left in the deck), second card is 47/49,
third card is 46/48. Those come out to .96, .959, and .958.
Multiply them and get .882, or an 88.2% chance of NOT getting
any Aces on the flop. Invert it to figure out what your
chances really are and you get .118 or 11.8%. This will
be your chance to get one more Ace on the flop.
Example number
two: "The straight draw"
You start with a Jack
of Spades and a Ten of Spades. You get a rainbow flop with
a Queen of Spades, a Three of Diamonds, and a Nine of Clubs.
You've got a straight draw.
Lesson 1:
What are my chances of hitting it on the next card?
Same as before, but with
different outs. A King or an Eight will complete your hand.
There are presumably four of each left in the deck. You've
got 8 outs. The chance of getting one of them on the turn
is 8 over 47, because there's 47 cards left in the deck.
That comes out to about .170, or around 17%.
Lesson 2:
I didn't get it on the turn! What are my chances now!?
There's still 8 cards
left in the deck that'll help you, but 46 cards left in
the deck. That's 8 over 46. It changes to .174. It's improved
to a whopping 17.4%!
Lesson 3:
I should of thought about my total chances first, I'm such
an idiot. What are my chances of getting that card on the
turn OR the river?
Once again we'll have
to calculate the chances of a King or Eight NOT appearing,
so we can do it like the last problem (in this case, {39/47}
X {38/46}). Or, since we've already figured out our chances
in the previous two lessons, we can just invert the probabilities
and multiply 'em. You had a .170 chance on the turn, and
a .174 on the river. By inverting, I mean subtracting them
from one. Now we've got .830 and .826! Multiply and get
.686! That's our chance of NOT hitting our card at all.
So invert it again and get .314, or 31.4%. So drawing to
an open ended straight draw is 31.4% - now that I like.
Example number
three: "Top two pair"
You get dealt a King
of Diamonds and a Nine of Hearts. The flop is lookin' pretty
good for you with a King of Spades, a Nine of Clubs, and
a Four of Clubs. Top two pair!
Lesson 1:
What are my chances of getting a full house on the turn?
To get a full house,
you need another King or Nine to pop up. There are presumably
two of each left in the deck. So you've got 4 outs. After
the flop there's always 47 cards unaccounted for. 4/47 is
around .085 or an 8.5% chance of you getting that boat.
Lesson 2:
What are my chances of getting a full house on the river?
If it didn't happen on
the turn, your chances usually don't change all too much,
but let's check. You've still got 4 outs and now 46 unseen
cards left. 4/46 is about .087 or around an 8.7% chance
of hitting it on the river. A .2% difference. Sorry.
Lesson 3:
How about the chances of getting the boat on the turn OR
the river?
Like the previous examples,
to figure your chance of something happening on multiple
events, you need to calculate the chance of it NOT happening
first. On the turn it won't happen 43/47 times. On the river
it won't happen 42/46 times. 43/47 is .915, and 42/46 is
.913. Multiply them and get .835, or 83.5% chance of it
not happening. Invert that and you get a 16.5% of getting
at least a full house by the showdown.
Lesson 4:
What do you mean by "at least"?
Since we figured the
chances to NOT get dealt a full house, the chances are built
in if the turn and river are two Kings, two Nines, or a
King and a Nine. If you are dealt two cards both of either
King or Nine, it'll be four-of-a-kind and not a King and
Nine 33% of the time. Think of it as being dealt one card
then the other. What are the chances of the first card matching
the second? Whether it's a King or Nine, there will be only
one unaccounted for, but two of the other. That's 1/3, or
33%.
Lesson 5:
Then what are my chances of getting four-of-a-kind?
This is a little more
abstract. I hope I warmed you up for this with the previous
lesson. It doesn't matter which card we're banking on. We
need to first get a full house on the turn. According to
lesson #1, the chance of that happening is .085. The chance
of getting the same card we got on the turn is 1/46. There's
only one out, and the usual 46 unseen cards. 1/46 is around
.022, or 2.2%. Multiply the two probabilities (.022 X .085)
and get .002 or one-fifth of a percent. It will be Kings
half of the time and Nines the other half.
That
is a lot of information to digest in one shot, but if you
are serious about playing poker to win then you have to
become a master of odds, and you need to review all the
odds over and over again until you know the odds perfectly
and you know the odds in any given situation as well. Like
anything else, practice makes perfect.
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