# Python - Integer Factorization into Primes [closed]

I wrote an integer factorization function, but after messing around with it, I realized it had problems with a few numbers...

``````>>> pFactors(99) # it does work for numbers with multiple of one prime factor
[3, 3, 11]
>>> pFactors(999) # however, sometimes, it doesn't
[3, 37] # the actual prime factorization of 999 is [3, 3, 3, 37].
>>> pFactors(88)
[2, 11]
>>> pFactors(888)
[2, 3, 37]
``````

What's wrong in my code?

``````def pFactors(n):
"""Finds the prime factors of 'n'"""
from primes import isPrime
from math import sqrt
pFact, limit, check, num = [], int(round(sqrt(n), 2)) + 1, 2, n
if isPrime(n):
return [n]
for check in range(2, limit):
if isPrime(check) and num % check == 0:
pFact.append(check)
num /= check
if isPrime(num):
pFact.append(num)
break
pFact = sorted(pFact)
return pFact
``````
-

## closed as off topic by Abhijit, kmp, P.T., SWeko, Sindre SorhusJan 28 '13 at 9:45

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You need to recalculate `limit` and restart the loop every time you break down the number. I would recommend a recursive approach here instead of your iterative one. –  Waleed Khan Jan 27 '13 at 18:45
Here's a naive recursive approach in five lines. –  Waleed Khan Jan 27 '13 at 19:07

Modify like so :

``````def pFactors(n):
"""Finds the prime factors of 'n'"""
from math import sqrt
pFact, limit, check, num = [], int(sqrt(n)) + 1, 2, n
if n == 1: return [1]
for check in range(2, limit):
while num % check == 0:
pFact.append(check)
num /= check
if num > 1:
pFact.append(num)
return pFact

for i in range(1,1000):
print pFactors(i)
``````

Although I liked your code as originally written, a few points :

1. You do not need isPrime. The reason is that any prime in the range up to limit, that divides num, will also be the smallest divisor of any composite that divides num, so as you divide out those primes, you will prevent the composites they make up from being found as divisors later in the range, leaving you only with the prime factors.

2. You do not need to sort the array, it is already sorted by virtue of `check` ascending in order.

3. The while loop added ensures that repeat factors are correctly found as long as they continue to divide num.

4. You can use congruences to filter out 2/3 of all numbers less than limit to check as divisors, can you see how?

The last few lines of the result above are :

``````[11, 89]
[2, 2, 5, 7, 7]
[3, 3, 109]
[2, 491]
[983]
[2, 2, 2, 3, 41]
[5, 197]
[2, 17, 29]
[3, 7, 47]
[2, 2, 13, 19]
[23, 43]
[2, 3, 3, 5, 11]
[991]
[2, 2, 2, 2, 2, 31]
[3, 331]
[2, 7, 71]
[5, 199]
[2, 2, 3, 83]
[997]
[2, 499]
[3, 3, 3, 37]
``````
-
Ah, the `while` loop fixed it. Thanks for that and the other suggestions :) –  F3AR3DLEGEND Jan 27 '13 at 19:21
You are welcome. Good luck! –  Cris Stringfellow Jan 27 '13 at 19:22