# Calculating the Harmonic Mean and Geometric Mean Recursively

Does anyone have a good example on how to calculate the Harmonic Mean and Geometric Mean Recursively. Is it possible to use a Tail Recursive function?

Thanks!

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You can use 'recursive' definitions:

``````G(x1,x2,...,xn) = (x1 * G(x2,...,xn)^(n-1))^(1/n)
H(x1,x2,...,xn) = n / ( 1/x1 + (n-1)/H(x2,...,xn) )
``````

This isn't efficient way to calculate means, since exponentiation/multiplication is done n times.

Simple python implementation with lists as input parameter (N):

``````def G(N):
if len(N) == 1: return N[0]
return (N[0] * G(N[1:])**(len(N)-1))**(1/len(N))

def H(N):
if len(N) == 1: return N[0]
return len(N) / ( 1/N[0] + (len(N)-1)/H(N[1:]) )
``````
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I think its also possible to calculate a partial harmonic mean. There should be a way to add the results up independently and then sum them at the end. Is there another way rather then logarithms that can simplify division or multiplication? –  Asher May 8 '13 at 18:39