IndexError: list index out of range— Prime Factor Generator

I have a program that finds the prime factors of any number, n. When running it, I get an index error because the index is exceeding the limit (where the limit is sqrt(n)). I'm not sure why it exceeds the limit. Can anyone provide any insight?

My code works well for most numbers:

``````>>> pFactors(250000)
[2, 2, 2, 2, 5, 5, 5, 5, 5, 5]
>>> pFactors(123456789)
[3, 3, 3607, 3803]
>>> pFactors(123456)

Traceback (most recent call last):
File "<pyshell#2>", line 1, in <module>
pFactors(123456)
File "D:\my_stuff\Google Drive\Modules\factors.py", line 50, in pFactors
check = primes[index]
IndexError: list index out of range
>>> pFactors(123455)

Traceback (most recent call last):
File "<pyshell#3>", line 1, in <module>
pFactors(123455)
File "D:\my_stuff\Google Drive\Modules\factors.py", line 50, in pFactors
check = primes[index]
IndexError: list index out of range
``````

Oddly, so far I've only found it unable to work for numbers 123400-1234

Here is my code:

``````def pFactors(n):
import primes as p
from math import sqrt
global pFact
pFact, primes, limit, check, num, index = [], [], int(round(sqrt(n))), 2, n, 0
if type(n) != int and type(n) != long:
raise TypeError("Argument <n> can only be <type 'int'> or <type 'long'>")
else:
if p.isPrime(n):
pFact = [1, n]
else:
p.prevPrimes(limit)
for i in p.primes_dict:
if p.primes_dict[i]:
primes.append(i)
while check <= limit:
if check in primes and (num%check==0):
pFact.append(check)
num = num / check
if num in primes:
pFact.append(num)
break
else:
check = primes[index]
index += 1
return pFact
``````

I am sure that the problem doesn't lie in the `primes.py`, as this works fine. If anyone has any solutions on how to fix this, please tell me. Thanks!

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Why on earth are you importing the modules inside the function? also, please. If you want to check if an object is of a given type us `isinstance`(e.g. `if isinstance(n, (int, long))`), or even better i your case just to `n = int(n)` which will already raise a `TypeError` if it is unable to create an integer from `n`. As a side note, I believe just iterating for the odd numbers up to `sqrt(n)` would be faster than looking for primes first(since you must already iterate over them to mark the primes...). –  Bakuriu Nov 26 '12 at 17:07
What I ended up doing was `check += 1` and removing the whole generation of primes up to sqrt(n). This also sped it up considerably (50 times faster for this number: 600851475143--- from Project Euler). –  F3AR3DLEGEND Nov 26 '12 at 18:18

You want to use the ceiling of the square root as the list length, but you're just rounding it, which means it is sometimes rounded down.

Better yet, use an int based square root function instead of `math.sqrt`, so that it will work for numbers too large for doubles as well.

Also, `global pFact` is terrible design. There's no reason at all to use a global list for this, unless you're trying to debug it or something, and even then it's questionable.

Lastly, I'm not sure why you want to return 1 as a factor in the case of primes. It's against convention and inconsistent with your composite case, but I guess you could do it that way if you really want to.

Anyway, here's a simple way to do factoring. You can worry about optimizing it once you've got it working in the first place.

``````def factor(x):
n = int(x)
if n < 1:
raise ValueError("Argument must be positive")

factors = []
d = 2

while d*d <= n:
while n%d == 0:
n = n // d
factors.append(d)
d += 1
if n>1:
factors.append(n)
return factors
``````
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