I just wish I could solve everybody's sex problems in the form of a mathematical proof.
Given that:
1) Women with low drives don't want to have sex once a week.
2) WBs wife is having sex once a week.
3) WB is happy to be having sex once a week.
4) Sex drives don't magically change.
5) People try to please those they love by doing things they don't especially enjoy.
6) Sex drives can change.
I conclude that:
Since WB's wife is having sex once a week EITHER
she belongs to the group of people who love WB and therefore are willing to do things they don't particularly enjoy in order to please him.
OR
She no longer belongs to the group of people with low sex drives AND the change in her sex drive wasn't magical.
If I were to draw a Boolean diagram, WB would be found in the intersection of the set of (men whose wives have never tried to please them sexually) and the set of (men whose wives have very low sex drives) due to the vagaries of the human mind many men found in this intersection also belong to the set (men who would think it was a miracle if their wife had sex with them once a week) and of course this set can't possibly intersect with the set (men who are completely rational). Since I belong to the set (people who can't abide irrational thought) I don't want WB to be a member of a set of irrational thinkers.
"Tell me, what is it you plan to do with your one wild and precious life?" - Mary Oliver
