# Python recursive program

I'm relatively newcomer on programming as I'm educated a mathematician and have no experience on Python. I would like to know how to solve this problem in Python which appeared as I was studying one maths problem on my own:

Program asks a positive integer m. If m is of the form 2^n-1 it returns T(m)=n*2^{n-1}. Otherwise it writes m to the form 2^n+x, where -1 < x < 2^n, and returns T(m)=T(2^n-1)+x+1+T(x). Finally it outputs the answer.

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Could you post what you have tried? That way, others can point out where you went wrong (much better learning experience than just having someone post some code, IMO). –  Bart Kiers May 9 '10 at 18:43
As a hint, if you write a function decompose(m) that returns n, x where m = 2^n + x (-1 <= x < 2^n) then you're 99% of the way there. –  user97370 May 9 '10 at 19:09
This might be helpful: stackoverflow.com/questions/494594/… –  jathanism May 9 '10 at 21:45

I thought this was a neat problem so I attempted a solution. As far as I can tell, this satisfies the parameters in the original question.

``````#!/usr/bin/python

import math

def calculate(m: int) -> int:
"""
>>> calculate(10)
20
>>> calculate(100)
329
>>> calculate(1.2)
>>> calculate(-1)
"""
if (m <= 0 or math.modf(m)[0] != 0):
return None
n, x = decompose(m + 1)
if (x == 0):
return n * 2**(n - 1)
else:
return calculate(2**n - 1) + x + 1 + calculate(x)

def decompose(m: int) -> (int, int):
"""
Returns two numbers (n, x), where
m = 2**n + x and -1 < x < 2^n
"""
n = int(math.log(m, 2))
return (n, m - 2**n)

if __name__ == "__main__":
import doctest
doctest.testmod(verbose = True)
``````

Assuming the numbers included in the `calculate` function's unit tests are the correct results for the problem, this solution should be accurate. Feedback is most welcome, of course.

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