I have written the following function which finds all divisors of a given natural number and returns them as a list:

```
def FindAllDivisors(x):
divList = []
y = 1
while y <= math.sqrt(x):
if x % y == 0:
divList.append(y)
divList.append(int(x / y))
y += 1
return divList
```

It works really well with the exception that it's really slow when the input is say an 18-digit number. Do you have any suggestions for how I can speed it up?

**Update**:

I have the following method to check for primality based on Fermat's Little Theorem:

```
def CheckIfProbablyPrime(x):
return (2 << x - 2) % x == 1
```

This method is really efficient when checking a single number, however I'm not sure whether I should be using it to compile all primes up to a certain boundary.

`CheckIfPrime`

to see if you can skip divisions for a certain x? You should be careful with this, because you can get false positives:`CheckIfPrime`

filters most numbers, but some composites still yield`True`

! – Ben Ruijl Sep 14 '12 at 10:24`CheckIfPrime`

function doesn't work due to Fermat pseudoprimes. For example,`CheckIfPrime(341)`

is True, but 341 = 11*31. If`CheckIfPrime`

is False, then the number is definitely composite, but the converse doesn't hold. [Ah, sorry, missed @BenRuijl's earlier comment to the same effect. I'll leave the example, though.] If you use it only as "CheckIfProbablyPrime", though, it could still be useful. – DSM Sep 14 '12 at 10:32and removing all the factors you find, by construction any pseudoprime which divides the original number will already have had its factors removed, and so won't divide the remainder. – DSM Sep 14 '12 at 10:47