Card Odds Texas Holdem
2021年5月1日Register here: http://gg.gg/ug2a3
Introduction
*Texas Holdem Odds Calculator
*Texas Holdem Card Game
*Texas Holdem Odds Chart
The Odds are defined as the ratio of the number of ways not to draw the hand. In some popular variations of poker such as Texas Hold ’Em, a player uses the best five-card poker hand out of seven cards. The frequencies are calculated in a manner similar to that shown for 5-card hands, except additional complications arise due to the extra. The Hold’em 101 deck is VERY basic but that may be what some people need. I just finished my first run through the Hand Odds deck and am very pleased. A constant review with these cards would indeed make you better at in play calculation in my opinion. The poker odds calculators on CardPlayer.com let you run any scenario that you see at the poker table, see your odds and outs, and cover the math of winning and losing poker hands. Texas Hold’em Omaha. There are 9 unknown cards left that could complete your flush so you have 9 outs out of 47 total unknown cards (52 cards in the deck – your 2 cards and – 3 more on the flop). This is how Texas Hold’em odds are calculated. Rounded to the nearest tenth of a percent, 9/47 = 19.1, or a 19.1% chance to hit your flush on the turn. Odds of flopping a one card nut Flush draw with an Ax holding – 1.12% Odds of flopping any one card Flush draw with an unsuited starting hand – 2.24% The most useful piece of information here is that we will flop a Flush draw around 11% of the time when starting out with a suited hand.
The following table ranks the top hands in an 8-player game. This table assumes that all players stay in until the end.Explanation of column headings.
*Cards: Initial two-card hand.
*Probability of win: Probability that this hand will win, or tie for the win.
*Average win: This is how much the player will win on average, including his own bets, if the player does win. This is less than 8 because sometimes the player will have to split the pot.
*Expected value: This is how many units the player can expected to win (positive) or lose (negative) with this hand. For example if the player had a pair of aces and contibuted $1 to the pot then the player could expect to have a net win of $2.09.
*Probability: Probability of getting this hand to begin with.
*Additive probability: Probability of getting this hand or any stronger hand to begin with.Initial Hold’em Hands in Rank Order for 8-Player GameCardsProbability of WinAverage WinExpected ValueProbabilityAdditive ProbabilityPair of A’s39.05%7.942.0990.45%0.45%Pair of K’s33.26%7.921.63280.45%0.9%Pair of Q’s28.71%7.881.26280.45%1.36%A/K suited26%7.670.99530.3%1.66%Pair of J’s25.13%7.840.97050.45%2.11%A/Q suited24.51%7.60.86280.3%2.41%K/Q suited23.72%7.610.80430.3%2.71%A/J suited23.41%7.530.76160.3%3.02%Pair of T’s22.32%7.790.73950.45%3.47%A/K unsuited22.68%7.610.72640.9%4.37%K/J suited22.66%7.530.70730.3%4.68%A/T suited22.55%7.450.68030.3%4.98%Q/J suited22.1%7.520.66220.3%5.28%K/T suited21.87%7.470.6330.3%5.58%Q/T suited21.38%7.450.59360.3%5.88%J/T suited21.26%7.440.58130.3%6.18%A/Q unsuited20.98%7.510.57650.9%7.09%Pair of 9’s19.89%7.810.55270.45%7.54%K/Q unsuited20.31%7.520.52810.9%8.45%A/9 suited20.28%7.390.49810.3%8.75%A/J unsuited19.7%7.410.46070.9%9.65%K/9 suited19.5%7.420.44660.3%9.95%A/8 suited19.66%7.320.43860.3%10.26%K/J unsuited19.1%7.430.41830.9%11.16%Pair of 8’s18.19%7.790.41640.45%11.61%T/9 suited19.18%7.380.41620.3%11.92%Q/9 suited19.03%7.410.41070.3%12.22%J/9 suited18.96%7.40.40320.3%12.52%A/5 suited19.29%7.210.39140.3%12.82%A/7 suited19.12%7.260.38830.3%13.12%Q/J unsuited18.67%7.410.38320.9%14.03%A/T unsuited18.74%7.310.37050.9%14.93%A/4 suited18.86%7.230.36380.3%15.23%A/6 suited18.62%7.220.34480.3%15.54%A/3 suited18.41%7.260.3360.3%15.84%K/T unsuited18.18%7.330.33280.9%16.74%K/8 suited18.05%7.330.32340.3%17.04%Pair of 7’s16.85%7.770.3090.45%17.5%Q/T unsuited17.83%7.320.30440.9%18.4%J/T unsuited17.86%7.30.30410.9%19.31%A/2 suited17.86%7.280.29970.3%19.61%T/8 suited17.68%7.320.29490.3%19.91%Q/8 suited17.51%7.340.2850.3%20.21%J/8 suited17.44%7.330.27920.3%20.51%K/7 suited17.57%7.270.27770.3%20.81%9/8 suited17.31%7.380.27680.3%21.12%K/6 suited17.17%7.230.24130.3%21.42%Pair of 6’s15.84%7.750.22820.45%21.87%K/5 suited16.83%7.20.21170.3%22.17%8/7 suited16.38%7.350.20330.3%22.47%K/4 suited16.44%7.220.18690.3%22.78%9/7 suited16.2%7.330.18680.3%23.08%T/7 suited16.3%7.260.18270.3%23.38%Q/7 suited16.22%7.250.17560.3%23.68%A/9 unsuited16.27%7.20.17110.9%24.59%J/7 suited16.07%7.260.16620.3%24.89%K/3 suited16.06%7.260.16530.3%25.19%Pair of 5’s14.93%7.730.15420.45%25.64%7/6 suited15.66%7.330.14810.3%25.94%K/2 suited15.7%7.290.14460.3%26.24%Q/6 suited15.85%7.20.14170.3%26.55%T/9 unsuited15.71%7.210.13320.9%27.45%K/9 unsuited15.62%7.240.13080.9%28.36%8/6 suited15.37%7.30.12230.3%28.66%Q/5 suited15.56%7.170.11580.3%28.96%Pair of 4’s14.31%7.760.11030.45%29.41%J/9 unsuited15.34%7.220.10810.9%30.32%6/5 suited15.12%7.320.10670.3%30.62%Q/9 unsuited15.27%7.230.10440.9%31.52%A/8 unsuited15.55%7.10.10370.9%32.43%Q/4 suited15.16%7.20.09160.3%32.73%9/6 suited14.99%7.260.08910.3%33.03%5/4 suited14.74%7.320.07890.3%33.33%T/6 suited15.03%7.180.07850.3%33.63%Pair of 3’s13.83%7.80.07820.45%34.09%7/5 suited14.74%7.290.07410.3%34.39%Q/3 suited14.81%7.240.07210.3%34.69%J/6 suited14.92%7.170.06910.3%34.99%Pair of 2’s13.49%7.830.0570.45%35.44%Q/2 suited14.46%7.280.05240.3%35.75%A/5 unsuited15.1%6.950.04890.9%36.65%A/7 unsuited14.94%7.010.04730.9%37.56%J/5 suited14.66%7.130.04540.3%37.86%6/4 suited14.07%7.330.03060.3%38.16%8/5 suited14.22%7.240.03030.3%38.46%J/4 suited14.28%7.160.02220.3%38.76%A/4 unsuited14.63%6.960.01840.9%39.67%5/3 suited13.71%7.330.00490.3%39.97%J/3 suited13.92%7.20.00230.3%40.27%A/6 unsuited14.39%6.9500.9%41.18%T/8 unsuited14.07%7.11-0.00020.9%42.08%K/8 unsuited14.01%7.09-0.00590.9%42.99%9/5 suited13.81%7.19-0.00660.3%43.29%T/5 suited13.98%7.09-0.00920.3%43.59%A/3 unsuited14.15%6.99-0.01110.9%44.49%9/8 unsuited13.73%7.18-0.01370.9%45.4%J/2 suited13.59%7.24-0.01540.3%45.7%7/4 suited13.48%7.28-0.01870.3%46%J/8 unsuited13.68%7.11-0.02780.9%46.91%T/4 suited13.64%7.11-0.03040.3%47.21%Q/8 unsuited13.6%7.11-0.03310.9%48.11%4/3 suited13.09%7.37-0.03510.3%48.42%T/3 suited13.3%7.15-0.0490.3%48.72%A/2 unsuited13.54%7.01-0.05070.9%49.62%K/7 unsuited13.48%7-0.05570.9%50.53%6/3 suited12.85%7.33-0.05870.3%50.83%8/4 suited12.98%7.22-0.06260.3%51.13%T/2 suited12.95%7.19-0.06820.3%51.43%5/2 suited12.5%7.33-0.08390.3%51.73%8/7 unsuited12.79%7.13-0.08770.9%52.64%9/4 suited12.71%7.16-0.09080.3%52.94%K/6 unsuited13.02%6.94-0.09720.9%53.85%4/2 suited12.08%7.38-0.10790.3%54.15%7/3 suited12.25%7.27-0.11010.3%54.45%9/3 suited12.37%7.19-0.11080.3%54.75%9/7 unsuited12.54%7.09-0.11140.9%55.66%T/7 unsuited12.55%6.98-0.12380.9%56.56%9/2 suited12.03%7.24-0.12870.3%56.86%K/5 unsuited12.65%6.88-0.12980.9%57.77%7/6 unsuited12.08%7.09-0.14330.9%58.67%8/3 suited11.88%7.19-0.14520.3%58.97%3/2 suited11.49%7.43-0.14540.3%59.28%6/2 suited11.62%7.32-0.14920.3%59.58%Q/7 unsuited12.22%6.95-0.15110.9%60.48%J/7 unsuited12.18%6.97-0.15140.9%61.39%K/4 unsuited12.21%6.9-0.15790.9%62.29%8/2 suited11.57%7.23-0.1630.3%62.59%8/6 unsuited11.7%7.04-0.17670.9%63.5%K/3 unsuited11.79%6.94-0.18180.9%64.4%6/5 unsuited11.51%7.07-0.18650.9%65.31%Q/6 unsuited11.81%6.87-0.1890.9%66.21%7/2 suited11.19%7.24-0.18970.3%66.52%K/2 unsuited11.41%6.98-0.20350.9%67.42%5/4 unsuited11.12%7.06-0.21490.9%68.33%9/6 unsuited11.22%6.97-0.21820.9%69.23%Q/5 unsuited11.46%6.82-0.21910.9%70.14%7/5 unsuited11.07%7-0.22490.9%71.04%T/6 unsuited11.18%6.83-0.23610.9%71.95%Q/4 unsuited11.03%6.84-0.24540.9%72.85%J/6 unsuited10.94%6.8-0.25620.9%73.76%6/4 unsuited10.39%7.05-0.26770.9%74.66%Q/3 unsuited10.63%6.88-0.26790.9%75.57%8/5 unsuited10.47%6.92-0.27570.9%76.47%J/5 unsuited10.64%6.73-0.28370.9%77.38%Q/2 unsuited10.26%6.93-0.2890.9%78.28%5/3 unsuited10.04%7.04-0.29360.9%79.19%J/4 unsuited10.22%6.76-0.30910.9%80.09%9/5 unsuited9.97%6.82-0.32060.9%81%7/4 unsuited9.73%6.95-0.32380.9%81.9%T/5 unsuited10.06%6.65-0.33080.9%82.81%J/3 unsuited9.83%6.81-0.33120.9%83.71%4/3 unsuited9.38%7.08-0.3360.9%84.62%J/2 unsuited9.46%6.86-0.35120.9%85.52%T/4 unsuited9.66%6.67-0.35540.9%86.43%6/3 unsuited9.08%7-0.36420.9%87.33%8/4 unsuited9.12%6.84-0.37660.9%88.24%T/3 unsuited9.28%6.72-0.37670.9%89.14%5/2 unsuited8.73%7-0.38920.9%90.05%T/2 unsuited8.93%6.76-0.39620.9%90.95%9/4 unsuited8.76%6.71-0.41260.9%91.86%4/2 unsuited8.3%7.06-0.41380.9%92.76%7/3 unsuited8.41%6.88-0.42190.9%93.67%9/3 unsuited8.4%6.74-0.43380.9%94.57%9/2 unsuited8.04%6.8-0.45310.9%95.48%3/2 unsuited7.67%7.12-0.45430.9%96.38%6/2 unsuited7.79%6.94-0.460.9%97.29%8/3 unsuited7.96%6.73-0.46460.9%98.19%8/2 unsuited7.61%6.77-0.48440.9%99.1%7/2 unsuited7.28%6.77-0.50730.9%100%Total7.20100%
Methodology
This table is the result of a random simulation of 25,729,704,000 games and assumes all players stay in until the end of the hand.
The following table shows my power rating for each initial 2-card hand in a 8-player game. The numbers are on a 0 to 40 scale. Basically, you should only play hands that are dark green, blue, or purple. Of course you should be more be more liberal in late position and picky in early position.
Use the top table if you have a pair, the middle table if your cards are suited, and the bottom table if your cards are unsuited. Except for a pair,look up your high card along the left and your low card along the top.Inside Links
Written by: Michael Shackleford
It’s not uncommon for people to hear of cheating when they hear the term “card counting”, but the technique doesn’t actually have anything to do with cheating at all. What’s more is that you don’t need to be a math wiz to be able to learn how to do it.
Nevertheless, it’s not uncommon for people to want to learn how counting cards works, and in poker specifically, it can be an effective strategy that can give you the edge over your opponents. When you first start learning how to count cards, you only need to get a hang of three simple things, namely Texas Hold’em odds, counting your outs and pot equity. This guide will show you the basics of counting cards so that you can improve your Texas Hold’em game: How to Count Cards: Counting Outs
Any good poker player needs to be able to count outs. Learning how to count outs will help you improve your game and give you excellent preliminary knowledge before you truly understand how to count cards in poker. So, what is an “out”? The term “out” in the context of poker refers to any card that will make your hand stronger or give you the potential of turning your hand into a winning one. To be able to identify cards that will do this to a hand, you need to have good knowledge of hand rankings. Thankfully, calculating outs is relatively simple:
Remember that counting cards is not an exact science. Unlike the example above, you will never know which cards your opponent is holding. As a result, you need to pay attention to how they play, when they produce their flop cards, how much they are betting while also considering the possible available combinations. Don’t forget that they could always be bluffing! Counting Cards: Poker Pot Equity
You will be able to grasp pot equity when you get the hang of counting cards. It’s a natural extension of card counting and involves calculating the likelihood of your chances of forming a winning hand and thus taking the pot. Texas Holdem Odds Calculator
There’s a method for calculating pot equity, and it’s known as the “Rule of Two and Four”. It is only applied during the flop and river stages of a round, and that’s because they are the only two stages where more cards are revealed. Here the two simple rules within the Rule of Two and Four:
For example, if you had a draw with 12 possible outs on the flop, you would multiply this by four, giving you approximately a 48% chance of getting the right cards to complete your hand. Furthermore, if you are left with 12 outs on the turn, you would have a 24% chance of completing your hand. Calculating your pot equity can be extremely useful when it comes to determining your moves in a game, reducing the number of needless bets you have to make, and proving the importance of learning how to count cards in poker.
The underlying mathematics of this process is complex, but worth knowing if you want to calculate your equity on the fly. Say you have 10 outs on the turn with 46 cards left in the deck, your probability of hitting is 10/46. By imagining that there are 50 cards in the deck, the probability is 10/50, or 20/100, meaning that your chance of getting the pot equity is 20%.
However, the real probability of 10/46 is expressed as 21.7%, which would mean that the number of outs would have to be multiplied by 2.174 – an incredibly hard sum to do when your opponent just raised €50! Regardless of how you choose to use it, if you want to learn how to count cards, you need to know how to judge your pot equity.Texas Hold’em Odds: Hole CardsTexas Holdem Card Game
To give you a greater understanding of how difficult it can be to predict an opponent’s hand, as well as giving you a better insight into how to count cards effectively, it’s important to know the odds of receiving some of the best and worst hole cards. In addition, we’ll give you the probability of winning with these hands in a standard four-person game.Texas Holdem Odds Chart
Now that you’ve learned the ins and outs of how to count cards, pot equity, and Texas Holdem odds, why not put your skills to the test of one of our online poker games?
Register here: http://gg.gg/ug2a3
https://diarynote-jp.indered.space
Introduction
*Texas Holdem Odds Calculator
*Texas Holdem Card Game
*Texas Holdem Odds Chart
The Odds are defined as the ratio of the number of ways not to draw the hand. In some popular variations of poker such as Texas Hold ’Em, a player uses the best five-card poker hand out of seven cards. The frequencies are calculated in a manner similar to that shown for 5-card hands, except additional complications arise due to the extra. The Hold’em 101 deck is VERY basic but that may be what some people need. I just finished my first run through the Hand Odds deck and am very pleased. A constant review with these cards would indeed make you better at in play calculation in my opinion. The poker odds calculators on CardPlayer.com let you run any scenario that you see at the poker table, see your odds and outs, and cover the math of winning and losing poker hands. Texas Hold’em Omaha. There are 9 unknown cards left that could complete your flush so you have 9 outs out of 47 total unknown cards (52 cards in the deck – your 2 cards and – 3 more on the flop). This is how Texas Hold’em odds are calculated. Rounded to the nearest tenth of a percent, 9/47 = 19.1, or a 19.1% chance to hit your flush on the turn. Odds of flopping a one card nut Flush draw with an Ax holding – 1.12% Odds of flopping any one card Flush draw with an unsuited starting hand – 2.24% The most useful piece of information here is that we will flop a Flush draw around 11% of the time when starting out with a suited hand.
The following table ranks the top hands in an 8-player game. This table assumes that all players stay in until the end.Explanation of column headings.
*Cards: Initial two-card hand.
*Probability of win: Probability that this hand will win, or tie for the win.
*Average win: This is how much the player will win on average, including his own bets, if the player does win. This is less than 8 because sometimes the player will have to split the pot.
*Expected value: This is how many units the player can expected to win (positive) or lose (negative) with this hand. For example if the player had a pair of aces and contibuted $1 to the pot then the player could expect to have a net win of $2.09.
*Probability: Probability of getting this hand to begin with.
*Additive probability: Probability of getting this hand or any stronger hand to begin with.Initial Hold’em Hands in Rank Order for 8-Player GameCardsProbability of WinAverage WinExpected ValueProbabilityAdditive ProbabilityPair of A’s39.05%7.942.0990.45%0.45%Pair of K’s33.26%7.921.63280.45%0.9%Pair of Q’s28.71%7.881.26280.45%1.36%A/K suited26%7.670.99530.3%1.66%Pair of J’s25.13%7.840.97050.45%2.11%A/Q suited24.51%7.60.86280.3%2.41%K/Q suited23.72%7.610.80430.3%2.71%A/J suited23.41%7.530.76160.3%3.02%Pair of T’s22.32%7.790.73950.45%3.47%A/K unsuited22.68%7.610.72640.9%4.37%K/J suited22.66%7.530.70730.3%4.68%A/T suited22.55%7.450.68030.3%4.98%Q/J suited22.1%7.520.66220.3%5.28%K/T suited21.87%7.470.6330.3%5.58%Q/T suited21.38%7.450.59360.3%5.88%J/T suited21.26%7.440.58130.3%6.18%A/Q unsuited20.98%7.510.57650.9%7.09%Pair of 9’s19.89%7.810.55270.45%7.54%K/Q unsuited20.31%7.520.52810.9%8.45%A/9 suited20.28%7.390.49810.3%8.75%A/J unsuited19.7%7.410.46070.9%9.65%K/9 suited19.5%7.420.44660.3%9.95%A/8 suited19.66%7.320.43860.3%10.26%K/J unsuited19.1%7.430.41830.9%11.16%Pair of 8’s18.19%7.790.41640.45%11.61%T/9 suited19.18%7.380.41620.3%11.92%Q/9 suited19.03%7.410.41070.3%12.22%J/9 suited18.96%7.40.40320.3%12.52%A/5 suited19.29%7.210.39140.3%12.82%A/7 suited19.12%7.260.38830.3%13.12%Q/J unsuited18.67%7.410.38320.9%14.03%A/T unsuited18.74%7.310.37050.9%14.93%A/4 suited18.86%7.230.36380.3%15.23%A/6 suited18.62%7.220.34480.3%15.54%A/3 suited18.41%7.260.3360.3%15.84%K/T unsuited18.18%7.330.33280.9%16.74%K/8 suited18.05%7.330.32340.3%17.04%Pair of 7’s16.85%7.770.3090.45%17.5%Q/T unsuited17.83%7.320.30440.9%18.4%J/T unsuited17.86%7.30.30410.9%19.31%A/2 suited17.86%7.280.29970.3%19.61%T/8 suited17.68%7.320.29490.3%19.91%Q/8 suited17.51%7.340.2850.3%20.21%J/8 suited17.44%7.330.27920.3%20.51%K/7 suited17.57%7.270.27770.3%20.81%9/8 suited17.31%7.380.27680.3%21.12%K/6 suited17.17%7.230.24130.3%21.42%Pair of 6’s15.84%7.750.22820.45%21.87%K/5 suited16.83%7.20.21170.3%22.17%8/7 suited16.38%7.350.20330.3%22.47%K/4 suited16.44%7.220.18690.3%22.78%9/7 suited16.2%7.330.18680.3%23.08%T/7 suited16.3%7.260.18270.3%23.38%Q/7 suited16.22%7.250.17560.3%23.68%A/9 unsuited16.27%7.20.17110.9%24.59%J/7 suited16.07%7.260.16620.3%24.89%K/3 suited16.06%7.260.16530.3%25.19%Pair of 5’s14.93%7.730.15420.45%25.64%7/6 suited15.66%7.330.14810.3%25.94%K/2 suited15.7%7.290.14460.3%26.24%Q/6 suited15.85%7.20.14170.3%26.55%T/9 unsuited15.71%7.210.13320.9%27.45%K/9 unsuited15.62%7.240.13080.9%28.36%8/6 suited15.37%7.30.12230.3%28.66%Q/5 suited15.56%7.170.11580.3%28.96%Pair of 4’s14.31%7.760.11030.45%29.41%J/9 unsuited15.34%7.220.10810.9%30.32%6/5 suited15.12%7.320.10670.3%30.62%Q/9 unsuited15.27%7.230.10440.9%31.52%A/8 unsuited15.55%7.10.10370.9%32.43%Q/4 suited15.16%7.20.09160.3%32.73%9/6 suited14.99%7.260.08910.3%33.03%5/4 suited14.74%7.320.07890.3%33.33%T/6 suited15.03%7.180.07850.3%33.63%Pair of 3’s13.83%7.80.07820.45%34.09%7/5 suited14.74%7.290.07410.3%34.39%Q/3 suited14.81%7.240.07210.3%34.69%J/6 suited14.92%7.170.06910.3%34.99%Pair of 2’s13.49%7.830.0570.45%35.44%Q/2 suited14.46%7.280.05240.3%35.75%A/5 unsuited15.1%6.950.04890.9%36.65%A/7 unsuited14.94%7.010.04730.9%37.56%J/5 suited14.66%7.130.04540.3%37.86%6/4 suited14.07%7.330.03060.3%38.16%8/5 suited14.22%7.240.03030.3%38.46%J/4 suited14.28%7.160.02220.3%38.76%A/4 unsuited14.63%6.960.01840.9%39.67%5/3 suited13.71%7.330.00490.3%39.97%J/3 suited13.92%7.20.00230.3%40.27%A/6 unsuited14.39%6.9500.9%41.18%T/8 unsuited14.07%7.11-0.00020.9%42.08%K/8 unsuited14.01%7.09-0.00590.9%42.99%9/5 suited13.81%7.19-0.00660.3%43.29%T/5 suited13.98%7.09-0.00920.3%43.59%A/3 unsuited14.15%6.99-0.01110.9%44.49%9/8 unsuited13.73%7.18-0.01370.9%45.4%J/2 suited13.59%7.24-0.01540.3%45.7%7/4 suited13.48%7.28-0.01870.3%46%J/8 unsuited13.68%7.11-0.02780.9%46.91%T/4 suited13.64%7.11-0.03040.3%47.21%Q/8 unsuited13.6%7.11-0.03310.9%48.11%4/3 suited13.09%7.37-0.03510.3%48.42%T/3 suited13.3%7.15-0.0490.3%48.72%A/2 unsuited13.54%7.01-0.05070.9%49.62%K/7 unsuited13.48%7-0.05570.9%50.53%6/3 suited12.85%7.33-0.05870.3%50.83%8/4 suited12.98%7.22-0.06260.3%51.13%T/2 suited12.95%7.19-0.06820.3%51.43%5/2 suited12.5%7.33-0.08390.3%51.73%8/7 unsuited12.79%7.13-0.08770.9%52.64%9/4 suited12.71%7.16-0.09080.3%52.94%K/6 unsuited13.02%6.94-0.09720.9%53.85%4/2 suited12.08%7.38-0.10790.3%54.15%7/3 suited12.25%7.27-0.11010.3%54.45%9/3 suited12.37%7.19-0.11080.3%54.75%9/7 unsuited12.54%7.09-0.11140.9%55.66%T/7 unsuited12.55%6.98-0.12380.9%56.56%9/2 suited12.03%7.24-0.12870.3%56.86%K/5 unsuited12.65%6.88-0.12980.9%57.77%7/6 unsuited12.08%7.09-0.14330.9%58.67%8/3 suited11.88%7.19-0.14520.3%58.97%3/2 suited11.49%7.43-0.14540.3%59.28%6/2 suited11.62%7.32-0.14920.3%59.58%Q/7 unsuited12.22%6.95-0.15110.9%60.48%J/7 unsuited12.18%6.97-0.15140.9%61.39%K/4 unsuited12.21%6.9-0.15790.9%62.29%8/2 suited11.57%7.23-0.1630.3%62.59%8/6 unsuited11.7%7.04-0.17670.9%63.5%K/3 unsuited11.79%6.94-0.18180.9%64.4%6/5 unsuited11.51%7.07-0.18650.9%65.31%Q/6 unsuited11.81%6.87-0.1890.9%66.21%7/2 suited11.19%7.24-0.18970.3%66.52%K/2 unsuited11.41%6.98-0.20350.9%67.42%5/4 unsuited11.12%7.06-0.21490.9%68.33%9/6 unsuited11.22%6.97-0.21820.9%69.23%Q/5 unsuited11.46%6.82-0.21910.9%70.14%7/5 unsuited11.07%7-0.22490.9%71.04%T/6 unsuited11.18%6.83-0.23610.9%71.95%Q/4 unsuited11.03%6.84-0.24540.9%72.85%J/6 unsuited10.94%6.8-0.25620.9%73.76%6/4 unsuited10.39%7.05-0.26770.9%74.66%Q/3 unsuited10.63%6.88-0.26790.9%75.57%8/5 unsuited10.47%6.92-0.27570.9%76.47%J/5 unsuited10.64%6.73-0.28370.9%77.38%Q/2 unsuited10.26%6.93-0.2890.9%78.28%5/3 unsuited10.04%7.04-0.29360.9%79.19%J/4 unsuited10.22%6.76-0.30910.9%80.09%9/5 unsuited9.97%6.82-0.32060.9%81%7/4 unsuited9.73%6.95-0.32380.9%81.9%T/5 unsuited10.06%6.65-0.33080.9%82.81%J/3 unsuited9.83%6.81-0.33120.9%83.71%4/3 unsuited9.38%7.08-0.3360.9%84.62%J/2 unsuited9.46%6.86-0.35120.9%85.52%T/4 unsuited9.66%6.67-0.35540.9%86.43%6/3 unsuited9.08%7-0.36420.9%87.33%8/4 unsuited9.12%6.84-0.37660.9%88.24%T/3 unsuited9.28%6.72-0.37670.9%89.14%5/2 unsuited8.73%7-0.38920.9%90.05%T/2 unsuited8.93%6.76-0.39620.9%90.95%9/4 unsuited8.76%6.71-0.41260.9%91.86%4/2 unsuited8.3%7.06-0.41380.9%92.76%7/3 unsuited8.41%6.88-0.42190.9%93.67%9/3 unsuited8.4%6.74-0.43380.9%94.57%9/2 unsuited8.04%6.8-0.45310.9%95.48%3/2 unsuited7.67%7.12-0.45430.9%96.38%6/2 unsuited7.79%6.94-0.460.9%97.29%8/3 unsuited7.96%6.73-0.46460.9%98.19%8/2 unsuited7.61%6.77-0.48440.9%99.1%7/2 unsuited7.28%6.77-0.50730.9%100%Total7.20100%
Methodology
This table is the result of a random simulation of 25,729,704,000 games and assumes all players stay in until the end of the hand.
The following table shows my power rating for each initial 2-card hand in a 8-player game. The numbers are on a 0 to 40 scale. Basically, you should only play hands that are dark green, blue, or purple. Of course you should be more be more liberal in late position and picky in early position.
Use the top table if you have a pair, the middle table if your cards are suited, and the bottom table if your cards are unsuited. Except for a pair,look up your high card along the left and your low card along the top.Inside Links
Written by: Michael Shackleford
It’s not uncommon for people to hear of cheating when they hear the term “card counting”, but the technique doesn’t actually have anything to do with cheating at all. What’s more is that you don’t need to be a math wiz to be able to learn how to do it.
Nevertheless, it’s not uncommon for people to want to learn how counting cards works, and in poker specifically, it can be an effective strategy that can give you the edge over your opponents. When you first start learning how to count cards, you only need to get a hang of three simple things, namely Texas Hold’em odds, counting your outs and pot equity. This guide will show you the basics of counting cards so that you can improve your Texas Hold’em game: How to Count Cards: Counting Outs
Any good poker player needs to be able to count outs. Learning how to count outs will help you improve your game and give you excellent preliminary knowledge before you truly understand how to count cards in poker. So, what is an “out”? The term “out” in the context of poker refers to any card that will make your hand stronger or give you the potential of turning your hand into a winning one. To be able to identify cards that will do this to a hand, you need to have good knowledge of hand rankings. Thankfully, calculating outs is relatively simple:
Remember that counting cards is not an exact science. Unlike the example above, you will never know which cards your opponent is holding. As a result, you need to pay attention to how they play, when they produce their flop cards, how much they are betting while also considering the possible available combinations. Don’t forget that they could always be bluffing! Counting Cards: Poker Pot Equity
You will be able to grasp pot equity when you get the hang of counting cards. It’s a natural extension of card counting and involves calculating the likelihood of your chances of forming a winning hand and thus taking the pot. Texas Holdem Odds Calculator
There’s a method for calculating pot equity, and it’s known as the “Rule of Two and Four”. It is only applied during the flop and river stages of a round, and that’s because they are the only two stages where more cards are revealed. Here the two simple rules within the Rule of Two and Four:
For example, if you had a draw with 12 possible outs on the flop, you would multiply this by four, giving you approximately a 48% chance of getting the right cards to complete your hand. Furthermore, if you are left with 12 outs on the turn, you would have a 24% chance of completing your hand. Calculating your pot equity can be extremely useful when it comes to determining your moves in a game, reducing the number of needless bets you have to make, and proving the importance of learning how to count cards in poker.
The underlying mathematics of this process is complex, but worth knowing if you want to calculate your equity on the fly. Say you have 10 outs on the turn with 46 cards left in the deck, your probability of hitting is 10/46. By imagining that there are 50 cards in the deck, the probability is 10/50, or 20/100, meaning that your chance of getting the pot equity is 20%.
However, the real probability of 10/46 is expressed as 21.7%, which would mean that the number of outs would have to be multiplied by 2.174 – an incredibly hard sum to do when your opponent just raised €50! Regardless of how you choose to use it, if you want to learn how to count cards, you need to know how to judge your pot equity.Texas Hold’em Odds: Hole CardsTexas Holdem Card Game
To give you a greater understanding of how difficult it can be to predict an opponent’s hand, as well as giving you a better insight into how to count cards effectively, it’s important to know the odds of receiving some of the best and worst hole cards. In addition, we’ll give you the probability of winning with these hands in a standard four-person game.Texas Holdem Odds Chart
Now that you’ve learned the ins and outs of how to count cards, pot equity, and Texas Holdem odds, why not put your skills to the test of one of our online poker games?
Register here: http://gg.gg/ug2a3
https://diarynote-jp.indered.space
コメント