Gamma and Beta function

cof :: [Double]
cof = [76.18009172947146,-86.50532032941677,24.01409824083091,-1.231739572450155,0.001208650973866179,-0.000005395239384953]

ser :: Double
ser = 1.000000000190015

gammaln :: Double -> Double
gammaln xx = let tmp' = (xx+5.5) - (xx+0.5)*log(xx+5.5)
                 ser' = ser + sum $ zipWith (/) cof [xx+1..]
             in -tmp' + log(2.5066282746310005 * ser' / xx)

the beta function relates to the gamma function by ${\displaystyle \mathrm {B} (z,w)={\frac {\Gamma (z)\cdot \Gamma (w)}{\Gamma (z+w)}}}$, so we can compute the Beta function using gammaln like this:

beta z w = exp (gammaln z + gammaln w - gammaln (z+w))