An important concept that most winning Texas holdem players
understand is expected value.
The expected value is the average amount you win or lose on a
situation if you were able to play the exact same situation
thousands of times.
It can be difficult to understand expected value on a hand
for hand basis, but if you ran a situation 100 times it can help
make it clear.
Here’s an example:
You’re finished with the betting round on the turn and are
waiting for the river card to be dealt. You have four cards to a
flush and if you complete the flush you’ll win the hand and if
you don’t complete your flush you’ll lose the hand. Nine out of
the 46 remaining unseen cards win the hand for you and there’s
$100 in the pot.
- High-Value Casino Denominations. Chip values above $5,000 are rarely seen by the public in casinos, since such high-stake games generally are private affairs. For very high-stakes games, casinos may use rectangular plaques that are about the size of a playing card.
- Texas Hold’em is a community card poker game with game play focused as much on the betting as on the cards being played. Although the rules and game play are the same the end goal is slightly different depending on if you’re playing a Texas Holdem cash game or a Texas Holdem tournament. A Texas Hold’em.
Card Values and Hand Rankings The rank of the cards used in Ultimate Texas Hold’em, for the purpose of determining a winning hand shall be, in order from the lowest to highest rank; 2, 3, 4, 5, 6, 7, 8, 9, 10. The following chart contains every 2-card possible combination you can be dealt in Texas Hold’em. The hands are arranged by largest hole card with a separate section for pocket pairs. Each hand will be followed by its long-term winning percentage (out of 100) against a specific number of opponents holding random cards. The larger of the two forced blind bets. This is the first full bet in a hand of Texas holdem. Blank: A community card that is dealt face up and doesn’t provide any player with help given the state of the hand. Blinds: Forced bets that two players make before the cards.
The percentages say you’ll win the hand 19.57% of the time.
You can figure the percentage yourself by dividing nine by 46.
If you play the exact same situation 100 times you win 20
times and lose 80 times. We rounded the 19.57% up to 20.
So 20 times you win $100 for a total win of $2,000. If you
divide $2,000 by 100 times you end up with the average win, or
expected value for this situation. In this case the expected
value is $20.
9 Player Texas Holdem
This is a simplified example and isn’t especially useful at
the holdem tables. But if we take the reasoning and mathematics
behind what you just learned a bit deeper you can find a way
expected value can be quite valuable and useful at the Texas
If you take this example to the next level consider this
In the same hand after the turn card has been dealt your
opponent bets $20 into a $60 pot, you can use expected value to
determine if you should call or fold.
The cost of the call, $20, is multiplied by 100 to come up
with a total cost of $2,000 to play the situation 100 times. The
20 times you win the hand you win $100. 20 times $100 is $2,000.
So it looks like your expected value is 0 in this situation.
But there’s still one thing to consider. What happens on the
river when you miss your hand and when you hit your hand? If you
don’t check and fold on the river every single time you miss
your hand your expected value goes below even.
Will your opponent ever call a bet on the river if you hit
your flush? The answer is certainly yes. They might not call
often, but you can get action on the river with a flush. This
actually pushes the expected value of a hand like this to the
As a Texas holdem player you need to make it your goal to
find as many positive expectation situations as possible and
play in every one of them possible. You also need to avoid
negative expected value situations like the plague.
The magic of positive expectation is the short term results
don’t mean anything. If you consistently put yourself in
positive expectation situations you’ll win money in the long
Statistical laws show you have to make money in the long run
if you always play in positive expectation situations.
Here’s a list of a few positive expectation situations:
- Getting all in pre flop with a better hand than your opponent. Different
hand strengths have different positive expectation spreads, but
any advantage will pay off in long term profit. Pocket aces have
a huge positive expectation over seven two off suit, but even a
nine seven off suit has a long term advantage over eight six off
suit that pays off over time.
- Calling small bets in comparison to the pot size when you a flush draw,
open end straight draw, or other strong draw.
- Playing in a game filled with players who aren’t as good as you. It’s
difficult to determine an exact expected value amount in this
situation but it’s profitable.
- Leaving a table immediately when you realize every other player is better
than you. You don’t win money in this situation, but you lose
less so it’s a positive play.
Expected value is often shortened to EV. You may see positive
expected value listed as +EV or negative expected value listed
as –EV. Friends bingo ottawa amounts and numbers.
One of the biggest mistakes Texas holdem players make when
trying to wrap their head around expected value is trying to
figure out how the money they’ve already placed in the pot gets
figured into the equation.
The answer is simple, but most players have a hard time with
it. The money you’ve already put in the pot is only considered
in the pot size. In other words, the money stops being yours as
soon as it goes in the pot.
If you make a positive expected value play on every decision
of the hand everything else will take care of itself.
Examples of Expected Value
The best way to learn how to determine expected value in
Texas holdem is to practice. This section includes many examples
so you can practice for free. When you practice at the tables it
can cost you money.
Take a few minutes and try to figure out the correct answer
before looking at the solution. Remember to run the situation as
if it was identical 100 times. Just follow the simple steps used
in the opening section.
The examples all come first and the solutions are further
down the section. This way you can’t cheat to see the answers
before you try to figure out the answers unless you want to. All
of the examples are using Texas holdem.
On the river of a no limit game you have the top pair with a
good kicker but only think you have a 20% chance of having the
winning hand. The pot has $500 in it, you check, and your only
opponent bets $250.
You’re playing a $10 / $20 limit game and after the turn you
have an open end straight draw and a flush draw. The pot has
$100 in it, you check and your opponent bets $20.
If you raise your opponent will call on the turn and call one
bet on the river if you hit your straight, but will fold to a
bet if you hit your flush. If you miss your draws you check and
fold to a bet on the river.
On the river of a no limit game the pot has $2,000 in it and
you just hit a full house on a board that has three suited
cards. The way the hand played out you’re relatively sure your
opponent hit the flush. You have to act first and are trying to
determine the best way to extract the maximum expected value
from the situation.
You can check and raise if your opponent bets or you can bet.
The mounts of bets and raises complicate the situation, but
being a winning Texas holdem player is complicated, so you have
to make your best educated guess when situations like this come
Based on what you know about your opponent if you make a bet
up to $2,000 she’ll call. If you check she’ll bet $500 and call
up to a re-raise of $1,000.
You’re playing in a $20 / $40 limit game and flop an open end
straight draw. The pot has $80 in it at the start of the round,
the first player bets, the second folds, the third calls, and
you’re last to act. The pot now has $120 in it and you have to
call a $20 bet to see the turn.
played figure into your decision?
After the river has been dealt you have top pair and top
kicker. You determine you have a 40% chance of winning the hand
because the way the hand has played out your opponent either has
top pair with a worse kicker or hit two pair. Your opponent has
played the hand aggressively enough that you’ve tilted the
percentage to her favor.
The pot has $1,000 in it before your opponent bets $800. Once
you know the break-even expected value it’s easy to see if a
call or fold is more profitable in the long run.
If your percentage is correct what’s your expected value if
How much would your opponent have to bet to make your call a
break even expected value?
If you call $250 100 times your total investment is $25,000.
The total amount of the pot is $1,000 after you call. Winning
20% of the time means you win a total of $20,000 when you win.
This is a negative expected value of $5,000 total and $50 on
You need to win this hand at least 25% of the time to break
even. You know this because the total investment stays the same,
creating a total amount of $25,000. You divide this by the size
of the pot to find the break-even point. $25,000 divided by
$1,000 is 25, so you need to win 25 out of 100 times, or 25%.
This situation has a host of possibilities so you need to
consider them one at a time. Before moving deeper you need to
decide if a fold or call is correct.
You’re faced with a call of $20 making a total pot of $140.
You have 15 outs out of 46 unseen cards for a percentage of 33%
chance to win. Your total investment over 100 hands is $2,000
and the 33 hands you win return $4,620. This creates an average
positive EV of $26.20 per hand. So you can rule out a fold.
Now let’s consider a raise. Three things can happen if you
raise, so you need to consider each of them and then combine the
The first thing that can happen is you raise, your opponent
calls, and you miss your draws. Your raise costs $40 so over 100
hands you lose $4,000, or $40 on average. This happens 31 times
out of every 46 possibilities, or 67 times out of 100.
The second possibility is you raise, your opponent calls, you
hit a flush, and you don’t win additional money on the river.
Over 100 hands your raise still costs $40, making a total pot of
$180. You win $180 100 times for a total win of $18,000. When
you subtract your investment of $4,000 you have a positive
expectation of $14,000. This is an average of $140 per hand. You
hit your flush 20 out of 100 hands.
The third possibility is you hit your straight. In this case
you bet $40 on the turn and another $20 on the river for a total
investment over 100 hands of $6,000. The total pot size after
all betting on the river is $220, for a total win of $22,000.
This is an average win of $160 per hand. You hit your straight
and not a flush 13 out of 100 hands.
When you combine the results you have the following:
- 67 times out of 100 you lose $40.
- 20 times out of 100 you hit your flush and win $140.
- 13 times out of 100 you hit your straight and win $160
- 67 times 40 = a loss of $2,680
- 20 times $140 = a win of $2,800
- 13 times $160 = a win of $2,080
This makes a total positive expected value of $2,200,
creating an average of a $22 +EV per hand.
When you compare this to the +EV of $26.20 per hand created
by calling it shows both options are profitable but a call is
correct in this situation.
Realize that if you can extract more money on the river than
in this example a raise may increase to a point where it has the
In the first situation a bet of $2,000 in 100 hands is a
total investment of $200,000. The total pot size with your
opponents call is $6,000, for a total win over 100 hands of
$600,000. This is a positive expectation of $400,000 over 100
hands for an average of $4,000.
The second situation requires a total bet of $1,500, covering
the $500 bet and the $1,000 raise. This makes a total investment
of $150,000 over 100 hands. The total pot size is $5,000 so the
total win over 100 hands is $500,000. This creates an expected
average value of $3,500.
So the correct play is to bet $2,000.
This may seem like a simplified example, but this is a
perfect example of the complicated situations you fin at the
holdem tables on a regular basis. When you start considering all
of the possible outcomes for each hand being able to determine
expected value goes a long way to maximizing your long term
The first thing to determine is the expected value from the
flop to the turn. You’ve seen five cards so the deck has 47
unseen cards and eight of them complete your straight. This
means that 17% of the time you’ll complete your straight on the
It costs you $2,000 to call the $20 bet 100 times and the 17
times you win the total amount won will be $2,380, assuming no
further action in the hand.
But the odds of no further action taking place in the hand
are slim. Also, what happens if you miss your draw on the flop?
Unless the expected value is close to even you don’t need to
determine how likely you’ll get additional action is when you
hit. If the EV is close to even or slightly negative the
expected future action is enough to push the percentages to make
a call correct. That’s all you need to know to continue with the
hand based on possible future action.
The next thing to consider is what happens when you miss your
draw on the turn. The pot is now $140 and the bets are $40. The
only way you’d ever consider folding in this situation is if you
get caught in a bidding war between the other two opponents, and
even then with capped betting rounds the expected value says to
More likely you’ll face a single bet or two bets at most. The
first thing you need to do is determine if the situation still
offers a positive expectation if you face two bets.
Two bets from each of your opponents make the pot $300 and
you have to call $80, making a total pot size of $380.
You’ve now seen six cards, leaving 46 unseen and you still
have eight outs. Your percentage chance of winning has improved
slightly but it still rounds down to 17%.
Your total cost to call 100 times is $8,000. The 17 times you
win you get $380, for a total win of $6,460, creating a negative
expectation situation of $15.40 on average.
This is where you need to make a judgment call based on how
much you think you can extract from your opponents on the river
when you hit your hand. You need to win an average of $470 total
instead of the $380 listed above to break even, so can you get
over two additional bets on the river when you hit?
An open end straight draw is harder to see when it hits for
your opponents than a flush, and you’re in good position, so you
can probably push your wins enough when you hit to make this a
break even play or a slightly positive EV play. But it’s close,
so it really helps to know your opponents.
What about if you only face a single bet from each of your
In this case you have to call a $40 bet and the size of the
pot is $260 with both opponent’s bets and your call. It costs
$4,000 for 100 calls and the 17 times you win the total amount
is $4,420. This is a positive expected value and is a clear
calling situation. You’ll actually win more when you hit your
hand in most situations from action on the river.
The last thing to think about is if you should actually raise
on the flop.
If you raise what will your opponents do? To get a true
picture you need to run every possible situation, but for the
sake of this discussion let’s assume one opponent folds and the
The pot has $120 in it, you raise $40, and the remaining
opponent calls $20 for a total pot of $180. Your raise in 100
hands totals $4,000 and you still win 17 times. 17 times $180 is
only $3,060, creating a negative expectation situation.
When you factor in the possibility of both opponents folding
and winning more bets on the turn and river when you hit it
still isn’t enough to make a raise enough. Remember that
sometimes your opponent will re-raise, making the situation
This is a complicated example so if you don’t understand all
of it, take the time to go back over it and study it. None of
the calculations are overly complicated, but it can be confusing
when you run into so many of them.
It’s going to cost you $800 to call, so you multiply that by
100. So your total cost is $80,000. The 40 times out of 100 that
you win you’ll win a pot of $2,600. 40 times $2,600 is $104,000.
So the total amount of your wins minus the cost of making the
call is $24,000. If you divide this by 100 your average expected
value is $240 every time you’re in this situation.
To determine the break even amount your opponent would need
to bet requires a slightly different calculation. Your opponent
would need to bet $2,000 to create a situation where your
expected value is zero.
A bet of $2,000 costs $200,000 to call 100 times. The pot is
$5,000, so when you win 40 out of 100 times you win a total of
$200,000, creating a zero expected value.
This means that any bet below $2,000 in this situation has a
positive EV to call.
More importantly, consider how important it can be to call
almost every bet on the river if you have a 40% chance to win.
You can work these numbers for any percentage chance of winning
to determine if a situation offers positive or negative EV. Most
players fold too often to small and medium bets on the river.
You can use a complicated mathematical formula to determine
this amount, but it’s simpler for 99% of the population to do a
simple progression of possibilities.
Here’s exactly how we determined that a $2,000 bet is the
We know that a bet of $800 creates a large positive
expectation situation so a break-even will need to be quite a
bit larger than that. So we built a small table and started
plugging in bets.
|Bet Amount||Total Pot||Call X100||40 Wins X Pot||Average EV|
Don’t be scared or intimidated by these calculations. Once
you do a few of them you’ll quickly learn they aren’t too
difficult. Pick a different situation and build a table to find
the correct break-even point.
You need to practice these quite a bit so you learn to
closely approximate your expected value at the table. It’s
difficult to determine all of this in your head, but as you gain
experience you’ll learn to recognize profitable and unprofitable
Expected value is just one of the many tools that winning
Texas holdem, players use, but it’s an important one. Winning
players strive to fin and exploit positive EV plays. If you can
enter more positive plays than negative ones you’re well on your
way to a long term winning career.
Go over the examples on this page and practice the
calculations every chance you get until it becomes easy. It may
be difficult at first but if you stick with it you’ll be glad
you did and it’ll pay for itself for years to come.
OBJECTIVE: To become a winner you should make up the highest possible poker hand of five cards, using the two initially dealt cards and the five community cards.
NUMBER OF PLAYERS: 2-10 players
NUMBER OF CARDS: 52- deck cards
RANK OF CARDS: A-K-Q-J-10-9-8-7-6-5-4-3-2
THE DEAL: Every player is dealt two cards face down which is commonly called ‘hole cards’.
TYPE OF GAME: Casino
Introduction to Texas Hold ‘Em
Card Value Texas Holdem Game
How to Play
First Round Betting: The Pre-Flop
Second Round Betting: The Flop
Holdem Starting Hand Ev
Third & Fourth Round Betting: The Turn & The River
Poker Cards Values
Pairs– if two players are tied for highest pairs a “kicker” or the next highest-ranking card is used to determine the winner. You continue until one player has a higher-ranking card or both are determined to have the same exact hand, in which case the pot is split.
Two pairs– in this tie, the higher ranked pair wins, if top pairs are equal in rank you move to the next pair, then move to kickers if necessary.
Three of a kind – higher ranking card takes the pot.
Straights – the straight with the highest-ranking card wins; if both straights are the same the pot is split.
Flush – The flush with the highest-ranking card wins, if the same you move to the next card till a winner is found or hands are the same. If hands are the same split the pot.
Full house – the hand with the higher ranking three cards wins.
Four of a kind – the higher ranking set of four wins.
Straight flush – ties are broken the same as a regular straight.
Royal Flush – split the pot.