# All possible pairs of factors

I am trying to write a program that takes a number with a single leading integer and an arbitrary number of trailing zeros and then prints all possible combinations of two factors.

ie.

100

factors are 2^2, 5^2

so the program would print:

(2,50),(4,25),(5,20)

or

600

factors are 2^3,3,5^2

(2,300),(4,150),(8,75),(3,200),(5,120),(25,24),(6,100),(12,50),(15,40),(30,20),(60,10)

...I think that's all of them? Is it? I could use a program to check...

``````import itertools

facts=[[2,2,2],[3],[5,5]]
for n in itertools.product(*facts)
print(n)
``````

I see that I am using this incorrectly but that was my first stab at it.

This just gives (2,3,5) ten times.

I want something like (2) * (2,3,5,5) and (2,2) * (3,5.5) and the like...

-
Do you have any code from what you've tried? –  RocketDonkey Aug 14 '12 at 4:06
Sure, but it's trash, that's why I came here..? –  Peregrine Aug 14 '12 at 4:09
Welcome to StackOverflow.com. To show effort, posters are expected to at least show some code that they have tried, or links to research they have done. Just a formality here on SO. –  Jon Aug 14 '12 at 4:10
@PrincePeregrine: If you don't post your existing code, people will automatically assume that your are trying to cheat at homework and will harass you and close your question within a matter of minutes. –  Blender Aug 14 '12 at 4:11
@Blender not true. What I've seen is that if you don't post your code, people will ignore the question and simply not bother to do anything. –  Jon Aug 14 '12 at 4:14
show 1 more comment

``````#!/usr/bin/env python
import itertools, operator

def all_factors(prime_dict):
series = [[p**e for e in range(maxe+1)] for p, maxe in prime_dict.items()]
for multipliers in itertools.product(*series):
yield reduce(operator.mul, multipliers)
``````

### Example

``````prime_dict = {2:3, 3:1, 5:2}
L = sorted(all_factors(prime_dict))
number_of_divisors = reduce(lambda prod, e: prod*(e+1), prime_dict.values(),1)
assert len(L) == number_of_divisors
# -> [1, 2, 3, 4, 5, 6, 8, 10, 12, 15, 20, 24,
#     25, 30, 40, 50, 60, 75, 100, 120, 150, 200, 300, 600]
``````

To produce pairs:

``````n, isodd = divmod(len(L), 2)
print(zip(L[:n], reversed(L[n + isodd:])))
if isodd: # number is perfect square
print((L[n], L[n]))
``````

### Output

``````[(1, 600), (2, 300), (3, 200), (4, 150), (5, 120), (6, 100),
(8, 75), (10, 60), (12, 50), (15, 40), (20, 30), (24, 25)]
``````

It works for small numbers. You could use it to test your solution that could take into account the special form of your numbers: `x00000...`

-
Perfect thanks. –  Peregrine Aug 14 '12 at 5:01
Having trouble dissecting exactly what you did. Can you explain the 'p**e' and 'p,' parts of your for loops? –  Peregrine Aug 14 '12 at 5:04
Yeah it works for very large numbers extremely well as well. –  Peregrine Aug 14 '12 at 5:08
O!, it's like 'piping' for loops..? Very cool. What's the terminology used to describe a move like that? –  Peregrine Aug 14 '12 at 5:14
Easily handles something like 300000000000000000000 {2:20,3:1,5:20} which would cripple a method that finds the factors first using range(). –  Peregrine Aug 14 '12 at 5:20
show 3 more comments

You can put it all in a list comprehension

``````import math
n = 600 # or whatever...
[(x, n/x) for x in range(1, int(math.sqrt(n))+1) if n % x == 0]
``````

Returns:

``````[(1, 600), (2, 300), (3, 200), (4, 150), (5, 120), (6, 100), (8, 75), (10, 60), (12, 50), (15, 40), (20, 30), (24, 25)]
``````

If you don't want (1,600) just use range(2, int(math.sqrt(n))+1).

-
This is great, but it steps one integer at a time, which can be costly for a large number. Since I know the numbers are a combination of 2s and 5s, and sometimes 3s, and 7s, I was looking for a solution that just shows possible combinations of these values. –  Peregrine Aug 14 '12 at 4:30

I think this would do what you want:

``````n = input('Enter a number? ')
factors = []

for i in range(int(sqrt(n))):
if n % i == 0:
factors.append((i, n / i))
``````

By the definition of factors, the maximum number you have to check is up to the square root of the number, so if you can code this, you should be set.

If you can code this, you should be set.

-
Thanks to @Blender for the syntax. –  Jon Aug 14 '12 at 4:13

Here's how I would do it:

``````def factors(n):
# Fill this in

def factor_pairs(n):
for i in factors(n):  # You need to write the factor() function
yield i, n / i

if __name__ == '__main__':
n = input('Enter an integer: ')

for i, j in factor_pairs(n):
print i, j
``````

I'm not going to code it for you entirely, but you get the idea.

-
Thanks the factoring part I have down it was the all possible combinations thing that was tripping me up. When I factor it though it lists the factors as 2**w, 3**x, 5**y, 7**z. For yours to work I'd have to iterate all of the possible factors, and list it that way, and that is exactly what I am having trouble doing. –  Peregrine Aug 14 '12 at 4:10
Just see which numbers divide `n`. You don't really need prime factorization of a number to list factor pairs, do you? –  Blender Aug 14 '12 at 4:15
No, but I thought it would be the most efficient for large numbers since each number I am finding the pairs for only uses 2s and 5s, and every so often 3s, and 7s. –  Peregrine Aug 14 '12 at 4:20
What do you mean by that? What's an example number? –  Blender Aug 14 '12 at 4:39
Check the question for 600. –  Peregrine Aug 14 '12 at 4:41
show 2 more comments