# Factorial doesn't output an integer

I'm not a very experienced programmer but I just wrote this in Python to try and find `e`, using the definition that `e` is the sum of 1/0! + 1/1! + 1/2! etc...

The problem I'm having is `def factorial` doesn't output an integer. I realize it wouldn't given how it's written but I'm not sure how I can make it. `total` is what I would want outputted as an int from `def factorial`.

``````e = 0

def factorial(m):
n = m - 1
total = 1
if n > 0:
total = m
while n > 0:
total = total * n
n = n - 1

for w in range(0,100):
s = factorial(w)
e = e + ( 1 / s )

print(e)
``````
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gotta love this title... –  Bitwise Apr 8 '13 at 1:43
Use return, lol @Bitwise –  xxmbabanexx Apr 8 '13 at 1:46
`e` is a real number. You would not want total to be an integer anyway I guess. Integers only represent natural numbers (including negatives). –  Felix Kling Apr 8 '13 at 1:46
total is just a factorial, it absolutely should be int –  User1 Apr 8 '13 at 1:48
Oh sorry... for some reason I thought `1/2!` was supposed to be read as `(1/2)!`. Of course factorials of rational numbers don't make sense. I should go to sleep now... –  Felix Kling Apr 8 '13 at 1:51

``````def factorial(m):
n = m - 1
total = 1
if n > 0:
total = m
while n > 0:
total = total * n
n = n - 1
``````

EDIT: The problem is that, in order to get information from `factorial`, you have to use a return statement. Anything after the `return` is evaluated, and used as the value of `s` in `s = factorial(w)`.

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It would be better if you explained what the problem was (even if it might be obvious for you and me). –  Felix Kling Apr 8 '13 at 1:45
Lo siento. Added an explanation. –  hatkirby Apr 8 '13 at 1:47

The code by Feffernoose works. But to improve the performance in your case, you would better use the "yield" statement to build a iterable object.

``````e = 0
def factorial(m):
assert(m>1)
current = 0
total = 1
while current<=m:
yield total
current += 1
total *= current

for w in factorial(100):
e = e + ( 1 / w )
print(e)
``````

Update: in the solution with "return", you approximately need O(n*n) time for the factorial value computation. But with "yield", you only need O(n).

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