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I have to create a function that calculates how much factors an integer has. For example, when I call factor(10) the function should be able to tell me it has 4 factors (1, 2, 5, 10). So where would I start off? Would do I need to put?

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3  
Could you show us what have you tried so far? –  Rik Poggi Mar 18 '12 at 19:35
    
I dont really have anything working but i will post anyway –  bahaaz Mar 18 '12 at 19:36
    
@bahaaz: Please edit your question with the code. –  Sven Marnach Mar 18 '12 at 19:36
1  
If the number is not too large you can just run a for loop from 1 to X (inclusive) and check if X % i is 0. –  adelbertc Mar 18 '12 at 19:37
2  
Have you already read the Wikipedia article on integer factorization? –  Gumbo Mar 18 '12 at 19:38

5 Answers 5

up vote 2 down vote accepted

The % (modulus) operator gives you the remainder of a division. If that remainder is 0, then the second multiple is a factor of the second. So just loop through all the numbers from 1 to n and check if they're factors; if so, add them to the list with append:

def factors(n):
    result = []

    for i in range(1, n + 1):
        if n % i == 0:
            result.append(i)

    return result

Here's a demo.

Or, more concisely using lambdas:

def factors(n):
    return filter(lambda i: n % i == 0, range(1, n + 1))

Here's a demo.

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3  
You can stop at n/2 to save some time –  Rich Mar 18 '12 at 19:44
    
++ for taking the time to provide the demo. –  Austin Henley Mar 18 '12 at 19:44
1  
You need range(1, n+1) if you're doing this, else you'll miss n. –  DSM Mar 18 '12 at 19:44
    
@DSM: Oops, thanks. –  minitech Mar 18 '12 at 19:45
    
@Rich: I just want to keep it simple to understand :P –  minitech Mar 18 '12 at 19:47

For small numbers:

def factors(n):
    return [f for f in range(1,n+1) if n%f==0]

For improved performance, if you are just interested in the number of primes, you can find the prime factorization. See the Wikipedia article to find algorithms for this. Once you have the prime factorization, notice that each number can either be included or excluded. For example 72 == 2^3 * 3^2. We can have either 0 or 1 or 2 or 3 3s, and 0 or 1 or 2 3s, for 4*3=12 possible combinations. (The factor of 1 corresponds to choices of 0 from each set of prime factors, and the number itself corresponds to maximally large choices from each set of prime factors.)

from functools import reduce  # needed in python3
from operators import *

def factors(n):
    primeFactors = prime_factorization_algorithm(n)
    # e.g. algorithm(72) == Counter({2:3, 3:2})

    return reduce(mul, (count+1 for factor,count in primeFactors.items()))
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I think that it might be worth it to measure the performances of a solution that does the module only on the first sqrt(n) numbers.

def factors(n):
    sqrt = int(n ** .5)
    half_factors = [i for i in range(1, sqrt + 1) if n % i == 0]
    return half_factors + [n // i for i in half_factors[n%sqrt == 0::-1]]

Quick test:

>>> factors(16)
[1, 2, 4, 8, 16]
>>> factors(20)
[1, 2, 4, 10, 20]

Note: Change range to xrange if you are in Python 2, but keep // that explicitly call the floor division.

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I use this code. It tests up to sqrt(n), skipping all multiples of 2 and 3. Not that slow... This one returns only the prime factors, not composites.

def factorize(n1):
    if n1==0: return []
    if n1==1: return [1]
    n=n1
    b=[]
    while n % 2 ==0 : b.append(2);n/=2
    while n % 3 ==0 : b.append(3);n/=3
    i=5
    inc=2
    while i*i<=n:
     while n % i ==0 : b.append(i); n/=i
     i+=inc
     inc=6-inc
    if n<>1:b.append(n) 
    return b 

With a 16 figures integer:

>>> 
1234567890123456 [2, 2, 2, 2, 2, 2, 3, 7, 7, 301319, 435503] in  0.36825485272  seconds
>>> 
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You only need to divide from 2 - sqrt (number) to find if it is composite. So, when you do that, whenever a number divides, you get two factors of it, say x and y such that x*y =number. Now, you can write a recursive factors function that recursively finds factors of number, x and y and finally return the set of factors without duplicates(you have to find a way to remove those).

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