Re: Lanchester's Laws Applied to the Paladin Upgrade Questio
I can tell you for SURE that champs don't win with 8 left in reality. Using my formula champs win very narrowly. It doesn't exactly show how many champs will be remaining, but my formula predicts a very narrow win for the champs. This small win for champs was validated in online testing too (patrol vs patrol).
19 goth champs cost 988 res. 11 Ejags cost 990 res.
Here are the calculations:
n= (19/11)
sigma(n) = n(n+1)/2= 2.355 = p
So, if champs are to win, 3 x p should be greater than 7.
3 x 2.355 = 7.065 > 7. A narrow win for the champs (cannot predict how many will remain w/o using further formula).
I can tell you for SURE that champs don't win with 8 left in reality. Using my formula champs win very narrowly. It doesn't exactly show how many champs will be remaining, but my formula predicts a very narrow win for the champs. This small win for champs was validated in online testing too (patrol vs patrol).
19 goth champs cost 988 res. 11 Ejags cost 990 res.
Here are the calculations:
n= (19/11)
sigma(n) = n(n+1)/2= 2.355 = p
So, if champs are to win, 3 x p should be greater than 7.
3 x 2.355 = 7.065 > 7. A narrow win for the champs (cannot predict how many will remain w/o using further formula).