Recently, I got a question from one of my students. It stated, "What precisely is pot probabilities and is Texas hold’em pot odds strategy worth pursuing?"
One issue to remember, any kind of Texas holdem odds can and usually do have quite confusing. However, let me break pot odds down in incredibly uncomplicated terms. Please note that we are only discussing Pot Probabilities. Not outs, implied odds, basic odds or something else like that.
In short, pot probabilities are the probabilities you obtain when determining the ratio of the amount of money in the pot to the amount of money it’s going to cost you to call the wager.
For example, let us say you’re heads up with Player A. If there is $150 in the pot following the flop and Gambler A places a $20.00 bet it’ll price you only thirteen % of the pot to stay in the hand. If your likelihood of winning is greater than thirteen per-cent it is a no-brainer to call because you’ll have good pot probabilities.
That’s all there is to it definitely. Hold’em pot probabilities boils down to one thing. If your chance of succeeding is greater than the ratio of the pot size to the wager then you might have beneficial pot odds. If it is lower than you could have bad pot odds.
One additional thought about Holdem pot probabilities. You are still wagering the gambler more so than something else. Bet on the gambler a lot more than your starting hands or the size of the chip stack and even, yes the pot odds.
If you are able to learn to read your opponents well it is possible to utilize pot probabilities to assist justify or solidify your choice. But Texas hold’em pot odds don’t have to be an end all whenever you make a poker choice.
Knowing and understanding how Hold’em pot probabilities work can be a useful and successful strategy. But again don’t make Hold’em pot probabilities your only technique.
This entry was posted on June 1, 2010, 9:21 pm and is filed under Holdem. You can follow any responses to this entry through RSS 2.0. You can leave a response, or trackback from your own site.