Is there a formula?
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10-28-11 04:54 PM #1
How do I calculate the required winning percent for each leg of a parlay?
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10-28-11 05:20 PM #2Points Awarded:
jbrent95 gave mathdotcom 2 SBR Point(s) for this post.
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10-28-11 06:04 PM #3
Thanks Mathy,
For a 3 team parlay with all three teams at -110, I read that the break even win rate is 52.28%. How do I calculate that?
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10-28-11 06:38 PM #4
I made up this excel spreadsheet to help me decide which book to use for a specific teaser. I won't guarantee that my math is correct, but I thought this might help. I'm terribly hungover, but I assume it would work or parlays as well.
I use the following formula to calculate the required win percentage for the entire parlay to be advantageous.
=IF(G4<0,ABS(G4)/(ABS(G4)+100),100/(100+G4)) ...in this example, cell G4 is the odds I am getting on the play.
To get the one-game required win percentage, I use this formula:
=H5^(1/$E5) where H5 is the required probability of winning the parlay (the above formula) and $E5 is the number of teams.
edit: left out a word
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10-28-11 06:46 PM #5
Actually, using the above method (in my previous post), I come up with required win percentage of 52.38 for a 3-teamer consisting of -110 odds and a single-game required win percentage of 80.61 ....Here's the math:
Originally Posted by jbrent95
=IF(-110<0, ----which it is so---- ABS(-110)/(ABS(-110)+100) ---or---- 110/210 ----or---- .5238095
and
.5238^(1/3) = .5238^.3333 = .8061
so, the required one game win percentage is 80.61%
edit... I am really sorry, but I calculated the required win % for a 3-team teaser paying -110. Here's the math for a 3-team parlay paying +600...
100/(100+600) = 100/700 = .1428
and,
.1428^.3333 = .5227 so, yes, you are right. You'd need to a one-game win probability of 52.27% (or so) for 3-team parlay that paid 6 to 1.
Sorry for the hungover mathLast edited by WendysRox; 10-28-11 at 07:24 PM. Reason: screwed up my math
Points Awarded:jbrent95 gave WendysRox 10 SBR Point(s) for this post.
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10-28-11 08:08 PM #6
If I wanted to see what to determine the winning percentage for each leg to obtain at 5% ROI, is this the correct calculation:
1.05/(1+6) = .15 for a 3 team parlay ?
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10-28-11 08:48 PM #7
Originally Posted by jbrent95
It seems that you just showed me something new. What you've done is basically used desired edge to calculate required win probability. In other words, if I wanted to find a 5% edge in a +600 odds play, I'd need a win percentage of roughly 15%.
The desired edge is anything over 1, as in your .05. So, if I wanted a 30% edge in this situation, I'd need a win % of 18.57%....
1.30/(1+6) [---or--- 130/(100+600)] = 1.3/7 = .1857 .......interesting!
As for the ROI. I must be too tired to figure that right now. I'm running on 6 hours of sleep and 12 hours of work after drinking for 5 hours last night
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