I just treated it as a binomial distribution with a fixed but unknown probability.
Take the case of zero successes, that can happen for every probability except for one.
The graph peaks at zero, but if you calculate 'x' such that the integral from zero to x of the binomial function is equal to the integral from x to one, you get a nice centre point.
Take the case of zero successes, that can happen for every probability except for one.
The graph peaks at zero, but if you calculate 'x' such that the integral from zero to x of the binomial function is equal to the integral from x to one, you get a nice centre point.