HM Quickie 29 A Simple Call/Raise Option Knowing Villain’s Pre-flop Opening Range
In keeping with my past attempts to simplify EV analysis, I offer the following:
If you are pretty confident about a single opponent’s opening range, then one strategy option is to call with the same range. If you do so, your equity is 50%, so the EV equation in pot size units is as follows:
EVcall = 0.5*(1 + Bet) - 0.5*Bet = 0.5.
This equation used the setting of the strategy as the decision point, so hero’s investment is the bet plus the blind amount. An EV of 0.5 (half the pot) is to be expected if both players have 50% equity. Note that the EV is independent of the bet size and, if not a river decision, ignores future betting or assumes the hand is checked down.
If you raise rather than call, say to K*Bet, K>1, and villain fold equity is fe, then
EVraise = fe*1 + (1-fe)*(0.5*(1+ K*Bet)- 0.5*(K*Bet)) = 0.5*(1+fe)
If fe > 0, a raise results in a higher expected value than calling. If villain always folds (fe=1), EV = 1; if villain folds half the time, EV = 0.75, and, as shown by the previous equation, if villain never folds (fe=0), EV = 0.5. Again, these results as shown do not depend on the bet or raise size, but generally fe will be an increasing function of K and may dip for large K if villain suspects a bluff.
Note that since EV is not dependent on the raise size, it is suggested that you probably should raise big to increase the fe value, especially if your hand is a good one.
Of course, if your hand is at the higher end of the bet/call range, then the above results are conservative and they are optimistic if your hand is at the lower end of the range.
Counter Argument: If your equity is 50% when your calling range is equal to villain’s betting range, why not call with a tighter range so your equity is greater than 50%.
Answer: Following this reasoning, why not call only when you have aces for that will maximize your EV. True, but it only maximizes it for the hands you play and you will hardly play at all, so your EV is quite negative since you’ve been paying the blinds and possibly antes all the while. Of course, if the pot is large enough, pot odds theory says you can profitably call with realized equity less than 50%.
Summary. Have we found a simple solution to always be a winning player? Of course not. For one, you will never know your opponent’s range. And even if you can estimate how often he plays, say 20% of the time, his 20% hand range may (probably) not coincide with your 20% hand range. Even if you can accurately estimate opponent’s range, that doesn’t mean you should always call or raise his bet with that same range. If you have one of the lower ranked hands in the range, a fold may be best. But, as with so many math-based strategies, this type of analysis can offer initial guidance to better playing, which can then be modified to include other factors not considered here.
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Addendum: We’ve shown calling at villain’s betting range has EV = 0. 5. We can also call at a different range if we want to set EV = E, say. Let E(Rh,Rv) be the equity of calling with hero range of Rh when villain is betting with range Rv. Then
EV = E(Rh, Rv)*(Pot + 2Bet) - Bet = E
E(Rh,Rv) = (E + Bet)/(Pot + 2Bet)
For the ranking system I used, the following table shows the calling range to use for various bet sizes that results in a showdown EV equal to 0, thus assuring no loss. These results will vary somewhat for other ranking systems but should serve for general use.
Example: If villain makes a 2xPot size bet with a betting range of top 10%, to assure +EV (E=0), hero needs equity of 40% and achieves this with a top 26% range. If villain bets less than ¾ Pot with this range, hero can always call. Naturally if hero’s hand is at the bottom of a range, discretion should be used.
We note that in an earlier post (HM Quickie 15) we did a similar analysis but there we required that every hand in hero’s range had the required equity.
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