Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I want to represent a number as the product of its factors.The number of factors that are used to represent the number should be from 2 to number of prime factors of the same number(this i s the maximum possible number of factors for a number).

for example taking the number 24:

representation of the number as two factors multiplication are 2*12, 8*3, 6*4 and so on...,

representation of the number as three factors multiplication are 2*2*6, 2*3*4 and so on...,

representation of the number as four factors multiplication(prime factors alone) are 2*2*2*3.

please help me get some simple and generic algorithm for this

share|improve this question
So given 24, what should this hypothetical function return? [2,12]? [8,3]? [3,8]? -- Also, I think you'll get a lot more response on a question like this if you try something and then come back with a specific question if it doesn't work. –  mgilson Feb 25 '13 at 14:03
have a look here. That will give you the factors. Then you just have to manipulate them. –  will Feb 25 '13 at 14:03

3 Answers 3

This will generate all the sets of factors which multiply to give the original number. It returns all the product sets as a unique list of sorted tuples.

The 1s are excluded, to avoid infinite recursion.

def prime_factors(n):    
    return set(reduce(list.__add__, ([i, n//i] for i in range(1, int(n**0.5) + 1) if n % i == 0)))

def product_sets(n):
    return set(products(1, [], n, prime_factors(n)))

def products(current_product, current_list, aim, factors):

    if current_product == aim:
        yield tuple(sorted(current_list))

    elif 0 < current_product < aim:
        for factor in factors:
            if factor != 1:
                for product in products(current_product * factor, current_list + [factor], aim, factors):
                    yield product

print list(product_sets(24))


[(4, 6), (3, 8), (2, 12), (2, 3, 4), (24,), (2, 2, 6), (2, 2, 2, 3)]
share|improve this answer
Thanks a lot.. it helped me a lot –  user2095966 Feb 26 '13 at 10:39
@user2095966 - perhaps you could mark it as the correct answer? –  will Feb 26 '13 at 13:07

I know one...

If you're using python, you can use dictionary's to simplify the storage...

You'll have to check for every prime less than square root of the number.

Now, suppose p^k divides your number n, your task, I suppose is to find k. Here's the method:

int c = 0; int temp = n; while(temp!=0) { temp /= p; c+= temp; }

The above is a C++ code but you'll get the idea... At the end of this loop you'll have c = k

And yeah, the link given by will is a perfect python implementation of the same algorithm

share|improve this answer

Here's a function that returns all the factors of a given number, n. Note that it returns every single factor, not a specific pair.

def factors(n):
    """Finds all the factors of 'n'"""
    fList, num, y, limit = [], n, 0, int(sqrt(n)) + 1
    for factor in range(1, limit):
        if n % factor == 0:
            if factor not in fList: fList.append(factor)
            y = n / factor
            if y not in fList: fList.append(y)
    return sorted(fList)

For example, factors(24):

>>> factors(24)
[1, 2, 3, 4, 6, 8, 12, 24]
share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.