Quote:
Originally Posted by abanger
Does the same logic apply to the equations from MOP?
alpha = s/(1 + s)
cbet = (1 + s)/(1 + 2s)
If I'm understanding the equations correctly, the 1s refer to the pot size. So would you simply subtract the rake %?
alpha = s/(1 - rake + s)
cbet = (1 - rake + s)/(1 - rake + 2s)
If you're going to add a rake term you want to avoid adding an additional unknown variable since it will make solving harder.
Since we can express rake in terms of pot, we can avoid this issue.
If the convention in the equation is that P = 1 and it stands for the amount you can win just subtract some 1/x where x varies between some number between 0 and 1, which represents no rake and 100% rake.
So everywhere there is a 1, put in (1-1/x) instead. 1/20 would represent 5% rake for example.