What is the most efficient way of finding all the factors of a number in Python?

Can someone explain to me an efficient way of finding all the factors of a number in Python (2.7)?

I can create algorithms to do this job, but i think it is poorly coded, and takes too long to execute a result for a large numbers.

``````from functools import reduce

def factors(n):
([i, n//i] for i in range(1, int(n**0.5) + 1) if n % i == 0)))
``````

This will return all of the factors, very quickly, of a number `n`.

Why square root as the upper limit?

`sqrt(x) * sqrt(x) = x`. So if the two factors are the same, they're both the square root. If you make one factor bigger, you have to make the other factor smaller. This means that one of the two will always be less than or equal to `sqrt(x)`, so you only have to search up to that point to find one of the two matching factors. You can then use `x / fac1` to get `fac2`.

The `reduce(list.__add__, ...)` is taking the little lists of `[fac1, fac2]` and joining them together in one long list.

The `[i, n/i] for i in range(1, int(sqrt(n)) + 1) if n % i == 0` returns a pair of factors if the remainder when you divide `n` by the smaller one is zero (it doesn't need to check the larger one too; it just gets that by dividing `n` by the smaller one.)

The `set(...)` on the outside is getting rid of duplicates, which only happens for perfect squares. For `n = 4`, this will return `2` twice, so `set` gets rid of one of them.

• I copy-pasted this from a list of algorithms on my computer, all I did was encapsulate the `sqrt` -- it's probably from before people were really thinking about supporting Python 3. I think the site I got it from tried it against `__iadd__` and it was faster. I seem to remember something about `x**0.5` being faster than `sqrt(x)` at some point though -- and it is more foolproof that way. – agf Jul 23 '11 at 13:35
• Seems to perform 15% faster if I use `if not n % i` instead of `if n % i == 0` – dansalmo Nov 8 '13 at 2:18
• @sthzg We want it to return an integer, not a float, and on Python 3 `/` will return a float even if both arguments are integers and they are exactly divisable, i.e. `4 / 2 == 2.0` not `2`. – agf Jan 7 '15 at 18:55
• I know this is an old question, but in Python 3.x you need to add `from functools import reduce` to make this work. – anonymoose Sep 2 '17 at 14:10
• @unseen_rider: That doesn’t sound right. Can you provide anything to back it up? – Ry- Feb 17 '18 at 9:28

The solution presented by @agf is great, but one can achieve ~50% faster run time for an arbitrary odd number by checking for parity. As the factors of an odd number always are odd themselves, it is not necessary to check these when dealing with odd numbers.

I've just started solving Project Euler puzzles myself. In some problems, a divisor check is called inside two nested `for` loops, and the performance of this function is thus essential.

Combining this fact with agf's excellent solution, I've ended up with this function:

``````from math import sqrt
def factors(n):
step = 2 if n%2 else 1
([i, n//i] for i in range(1, int(sqrt(n))+1, step) if n % i == 0)))
``````

However, on small numbers (~ < 100), the extra overhead from this alteration may cause the function to take longer.

I ran some tests in order to check the speed. Below is the code used. To produce the different plots, I altered the `X = range(1,100,1)` accordingly.

``````import timeit
from math import sqrt
from matplotlib.pyplot import plot, legend, show

def factors_1(n):
step = 2 if n%2 else 1
([i, n//i] for i in range(1, int(sqrt(n))+1, step) if n % i == 0)))

def factors_2(n):
([i, n//i] for i in range(1, int(sqrt(n)) + 1) if n % i == 0)))

X = range(1,100000,1000)
Y = []
for i in X:
f_1 = timeit.timeit('factors_1({})'.format(i), setup='from __main__ import factors_1', number=10000)
f_2 = timeit.timeit('factors_2({})'.format(i), setup='from __main__ import factors_2', number=10000)
Y.append(f_1/f_2)
plot(X,Y, label='Running time with/without parity check')
legend()
show()
``````

X = range(1,100,1) No significant difference here, but with bigger numbers, the advantage is obvious:

X = range(1,100000,1000) (only odd numbers) X = range(2,100000,100) (only even numbers) X = range(1,100000,1001) (alternating parity) agf's answer is really quite cool. I wanted to see if I could rewrite it to avoid using `reduce()`. This is what I came up with:

``````import itertools
flatten_iter = itertools.chain.from_iterable
def factors(n):
return set(flatten_iter((i, n//i)
for i in range(1, int(n**0.5)+1) if n % i == 0))
``````

I also tried a version that uses tricky generator functions:

``````def factors(n):
return set(x for tup in ([i, n//i]
for i in range(1, int(n**0.5)+1) if n % i == 0) for x in tup)
``````

I timed it by computing:

``````start = 10000000
end = start + 40000
for n in range(start, end):
factors(n)
``````

I ran it once to let Python compile it, then ran it under the time(1) command three times and kept the best time.

• reduce version: 11.58 seconds
• itertools version: 11.49 seconds
• tricky version: 11.12 seconds

Note that the itertools version is building a tuple and passing it to flatten_iter(). If I change the code to build a list instead, it slows down slightly:

• iterools (list) version: 11.62 seconds

I believe that the tricky generator functions version is the fastest possible in Python. But it's not really much faster than the reduce version, roughly 4% faster based on my measurements.

• you could simplify the "tricky version" (remove unnecessary `for tup in`): `factors = lambda n: {f for i in range(1, int(n**0.5)+1) if n % i == 0 for f in [i, n//i]}` – jfs Jul 2 '16 at 8:23

An alternative approach to agf's answer:

``````def factors(n):
result = set()
for i in range(1, int(n ** 0.5) + 1):
div, mod = divmod(n, i)
if mod == 0:
result |= {i, div}
return result
``````
• Can you explain the div, mod part? – Adnan Jul 23 '11 at 18:45
• divmod(x, y) returns ((x-x%y)/y, x%y), i.e., the quotient and remainder of the division. – c4757p Jul 23 '11 at 22:29
• This doesn't handle duplicate factors well - try 81 for example. – phkahler Aug 15 '11 at 14:03
• Your answer is clearer, so I was able to grok it just enough to misunderstand. I was thinking of prime factorization where you'd want to call out multiple 3's. This should be fine, as that is what the OP asked for. – phkahler Aug 17 '11 at 17:59
• I piled everything into one line because agf's answer did so. I was interested in seeing whether `reduce()` was significantly faster, so I pretty much did everything other than the `reduce()` part the same way agf did. For readability, it would be nice to see a function call like `is_even(n)` rather than an expression like `n % 2 == 0`. – steveha Apr 9 '13 at 0:10

Further improvement to afg & eryksun's solution. The following piece of code returns a sorted list of all the factors without changing run time asymptotic complexity:

``````    def factors(n):
l1, l2 = [], []
for i in range(1, int(n ** 0.5) + 1):
q,r = n//i, n%i     # Alter: divmod() fn can be used.
if r == 0:
l1.append(i)
l2.append(q)    # q's obtained are decreasing.
if l1[-1] == l2[-1]:    # To avoid duplication of the possible factor sqrt(n)
l1.pop()
l2.reverse()
return l1 + l2
``````

Idea: Instead of using the list.sort() function to get a sorted list which gives nlog(n) complexity; It is much faster to use list.reverse() on l2 which takes O(n) complexity. (That's how python is made.) After l2.reverse(), l2 may be appended to l1 to get the sorted list of factors.

Notice, l1 contains i-s which are increasing. l2 contains q-s which are decreasing. Thats the reason behind using the above idea.

• Pretty sure `list.reverse` is O(n) not O(1), not that it changes the overall complexity. – agf Apr 17 '13 at 16:19
• Yes, that's right. I made a mistake. Should be O(n). (I have updated the answer now to the correct one) – Pranjal Mittal Apr 27 '13 at 17:20
• It is around 2 times slower than @ steveha's or @agf's solutions. – jfs Apr 28 '13 at 6:53
• You can pick up a small (2-3%) speed improvement by returning `l1 + l2.reversed()` rather than reversing the list in place. – Rakurai Jan 25 at 22:04

I've tried most of these wonderful answers with timeit to compare their efficiency versus my simple function and yet I constantly see mine outperform those listed here. I figured I'd share it and see what you all think.

``````def factors(n):
results = set()
for i in xrange(1, int(math.sqrt(n)) + 1):
if n % i == 0:
return results
``````

As it's written you'll have to import math to test, but replacing math.sqrt(n) with n**.5 should work just as well. I don't bother wasting time checking for duplicates because duplicates can't exist in a set regardless.

• Great stuff! If you put int(math.sqrt(n)) + 1 outside of the for loop you should get bit more performance out of it since won't have to re-calc it each iteration of the for loop – Tristan Forward Sep 13 '18 at 18:52
• @TristanForward: That’s not how for loops work in Python. `xrange(1, int(math.sqrt(n)) + 1)` is evaluated once. – Ry- Sep 21 '18 at 7:55

For n up to 10**16 (maybe even a bit more), here is a fast pure Python 3.6 solution,

``````from itertools import compress

def primes(n):
""" Returns  a list of primes < n for n > 2 """
sieve = bytearray([True]) * (n//2)
for i in range(3,int(n**0.5)+1,2):
if sieve[i//2]:
sieve[i*i//2::i] = bytearray((n-i*i-1)//(2*i)+1)
return [2,*compress(range(3,n,2), sieve[1:])]

def factorization(n):
""" Returns a list of the prime factorization of n """
pf = []
for p in primeslist:
if p*p > n : break
count = 0
while not n % p:
n //= p
count += 1
if count > 0: pf.append((p, count))
if n > 1: pf.append((n, 1))
return pf

def divisors(n):
""" Returns an unsorted list of the divisors of n """
divs = 
for p, e in factorization(n):
divs += [x*p**k for k in range(1,e+1) for x in divs]
return divs

n = 600851475143
primeslist = primes(int(n**0.5)+1)
print(divisors(n))
``````

Here's an alternative to @agf's solution which implements the same algorithm in a more pythonic style:

``````def factors(n):
return set(
factor for i in range(1, int(n**0.5) + 1) if n % i == 0
for factor in (i, n//i)
)
``````

This solution works in both Python 2 and Python 3 with no imports and is much more readable. I haven't tested the performance of this approach, but asymptotically it should be the same, and if performance is a serious concern, neither solution is optimal.

Here is another alternate without reduce that performs well with large numbers. It uses `sum` to flatten the list.

``````def factors(n):
return set(sum([[i, n//i] for i in xrange(1, int(n**0.5)+1) if not n%i], []))
``````
• This does not, it is unecessarily quadratic time. Don't use `sum` or `reduce(list.__add__)` to flatten a list. – juanpa.arrivillaga Jul 23 '18 at 18:30

Be sure to grab the number larger than `sqrt(number_to_factor)` for unusual numbers like 99 which has 3*3*11 and `floor sqrt(99)+1 == 10`.

``````import math

def factor(x):
if x == 0 or x == 1:
return None
res = []
for i in range(2,int(math.floor(math.sqrt(x)+1))):
while x % i == 0:
x /= i
res.append(i)
if x != 1: # Unusual numbers
res.append(x)
return res
``````

There is an industry-strength algorithm in SymPy called factorint:

``````>>> from sympy import factorint
>>> factorint(2**70 + 3**80)
{5: 2,
41: 1,
101: 1,
181: 1,
821: 1,
1597: 1,
5393: 1,
27188665321L: 1,
41030818561L: 1}
``````

This took under a minute. It switches among a cocktail of methods. See the documentation linked above.

Given all the prime factors, all other factors can be built easily.

Note that even if the accepted answer was allowed to run for long enough (i.e. an eternity) to factor the above number, for some large numbers it will fail, such the following example. This is due to the sloppy `int(n**0.5)`. For example, when `n = 10000000000000079**2`, we have

``````>>> int(n**0.5)
10000000000000078L
``````

Since 10000000000000079 is a prime, the accepted answer's algorithm will never find this factor. Note that it's not just an off-by-one; for larger numbers it will be off by more. For this reason it's better to avoid floating-point numbers in algorithms of this sort.

• It doesn't find all divisors but only prime factors so it's not really an answer. You should show how all other factors can be built, not just say it's easy ! By the way, sympy.divisors may be a better match to answer this question. – Colin Pitrat Jun 9 '17 at 16:01
• And note that sympy.divisors is not much faster than the accepted solution. – Colin Pitrat Jun 9 '17 at 16:08
• @ColinPitrat: I kind of doubt that `sympy.divisors` isn’t much faster, for numbers with few divisors in particular. Got any benchmarks? – Ry- Aug 12 '18 at 3:35
• @Ry I did one when I wrote this comment a year ago. It takes 2 min to write one so feel free to double check. – Colin Pitrat Aug 13 '18 at 6:37
• @ColinPitrat: Checked. As expected, the accepted answer is about the same speed as `sympy.divisors` for 100,000 and slower for anything higher (when speed actually matters). (And, of course, `sympy.divisors` works on numbers like `10000000000000079**2`.) – Ry- Aug 14 '18 at 2:10

Here is an example if you want to use the primes number to go a lot faster. These lists are easy to find on the internet. I added comments in the code.

``````# http://primes.utm.edu/lists/small/10000.txt
# First 10000 primes

_PRIMES = (2, 3, 5, 7, 11, 13, 17, 19, 23, 29,
31, 37, 41, 43, 47, 53, 59, 61, 67, 71,
73, 79, 83, 89, 97, 101, 103, 107, 109, 113,
127, 131, 137, 139, 149, 151, 157, 163, 167, 173,
179, 181, 191, 193, 197, 199, 211, 223, 227, 229,
233, 239, 241, 251, 257, 263, 269, 271, 277, 281,
283, 293, 307, 311, 313, 317, 331, 337, 347, 349,
353, 359, 367, 373, 379, 383, 389, 397, 401, 409,
419, 421, 431, 433, 439, 443, 449, 457, 461, 463,
467, 479, 487, 491, 499, 503, 509, 521, 523, 541,
547, 557, 563, 569, 571, 577, 587, 593, 599, 601,
607, 613, 617, 619, 631, 641, 643, 647, 653, 659,
661, 673, 677, 683, 691, 701, 709, 719, 727, 733,
739, 743, 751, 757, 761, 769, 773, 787, 797, 809,
811, 821, 823, 827, 829, 839, 853, 857, 859, 863,
877, 881, 883, 887, 907, 911, 919, 929, 937, 941,
947, 953, 967, 971, 977, 983, 991, 997, 1009, 1013,
# Mising a lot of primes for the purpose of the example
)

from bisect import bisect_left as _bisect_left
from math import sqrt as _sqrt

def get_factors(n):
assert isinstance(n, int), "n must be an integer."
assert n > 0, "n must be greather than zero."
limit = pow(_PRIMES[-1], 2)
assert n <= limit, "n is greather then the limit of {0}".format(limit)
result = set((1, n))
root = int(_sqrt(n))
primes = [t for t in get_primes_smaller_than(root + 1) if not n % t]
result.update(primes)  # Add all the primes factors less or equal to root square
for t in primes:
result.update(get_factors(n/t))  # Add all the factors associted for the primes by using the same process
return sorted(result)

def get_primes_smaller_than(n):
return _PRIMES[:_bisect_left(_PRIMES, n)]
``````

a potentially more efficient algorithm than the ones presented here already (especially if there are small prime factons in `n`). the trick here is to adjust the limit up to which trial division is needed every time prime factors are found:

``````def factors(n):
'''
return prime factors and multiplicity of n
n = p0^e0 * p1^e1 * ... * pk^ek encoded as
res = [(p0, e0), (p1, e1), ..., (pk, ek)]
'''

res = []

# get rid of all the factors of 2 using bit shifts
mult = 0
while not n & 1:
mult += 1
n >>= 1
if mult != 0:
res.append((2, mult))

limit = round(sqrt(n))
test_prime = 3
while test_prime <= limit:
mult = 0
while n % test_prime == 0:
mult += 1
n //= test_prime
if mult != 0:
res.append((test_prime, mult))
if n == 1:              # only useful if ek >= 3 (ek: multiplicity
break               # of the last prime)
limit = round(sqrt(n))  # adjust the limit
test_prime += 2             # will often not be prime...
if n != 1:
res.append((n, 1))
return res
``````

this is of course still trial division and nothing more fancy. and therefore still very limited in its efficiency (especially for big numbers without small divisors).

this is python3; the division `//` should be the only thing you need to adapt for python 2 (add `from __future__ import division`).

your max factor is not more than your number, so, let's say

``````def factors(n):
factors = []
for i in range(1, n//2+1):
if n % i == 0:
factors.append (i)
factors.append(n)

return factors
``````

voilá!

Using `set(...)` makes the code slightly slower, and is only really necessary for when you check the square root. Here's my version:

``````def factors(num):
if (num == 1 or num == 0):
return []
f = 
sq = int(math.sqrt(num))
for i in range(2, sq):
if num % i == 0:
f.append(i)
f.append(num/i)
if sq > 1 and num % sq == 0:
f.append(sq)
if sq*sq != num:
f.append(num/sq)
return f
``````

The `if sq*sq != num:` condition is necessary for numbers like 12, where the square root is not an integer, but the floor of the square root is a factor.

Note that this version doesn't return the number itself, but that is an easy fix if you want it. The output also isn't sorted.

I timed it running 10000 times on all numbers 1-200 and 100 times on all numbers 1-5000. It outperforms all the other versions I tested, including dansalmo's, Jason Schorn's, oxrock's, agf's, steveha's, and eryksun's solutions, though oxrock's is by far the closest.

Use something as simple as the following list comprehension, noting that we do not need to test 1 and the number we are trying to find:

``````def factors(n):
return [x for x in range(2, n//2+1) if n%x == 0]
``````

In reference to the use of square root, say we want to find factors of 10. The integer portion of the `sqrt(10) = 4` therefore `range(1, int(sqrt(10))) = [1, 2, 3, 4]` and testing up to 4 clearly misses 5.

Unless I am missing something I would suggest, if you must do it this way, using `int(ceil(sqrt(x)))`. Of course this produces a lot of unnecessary calls to functions.

• The issue with this solution is that it checks many numbers that can't possibly be factors -- and it checks the higher of each factor-pair separately when you already know it is a factor after finding the smaller of the factor-pair. – agf Apr 17 '13 at 16:22
• @JasonSchorn: When you find 2, you immediately know that 10/2=5 is a divisor as well, no need to check 5 separately! :) – Moberg Feb 1 '17 at 18:32

The simplest way of finding factors of a number:

``````def factors(x):
return [i for i in range(1,x+1) if x%i==0]
``````

I think for readability and speed @oxrock's solution is the best, so here is the code rewritten for python 3+:

``````def num_factors(n):
results = set()
for i in range(1, int(n**0.5) + 1):
if n % i == 0: results.update([i,int(n/i)])
return results
``````

I was pretty surprised when I saw this question that no one used numpy even when numpy is way faster than python loops. By implementing @agf's solution with numpy and it turned out at average 8x faster. I belive that if you implemented some of the other solutions in numpy you could get amazing times.

Here is my function:

``````import numpy as np
def b(n):
r = np.arange(1, int(n ** 0.5) + 1)
x = r[np.mod(n, r) == 0]
return set(np.concatenate((x, n / x), axis=None))
``````

Notice that the numbers of the x-axis are not the input to the functions. The input to the functions is 2 to the the number on the x-axis minus 1. So where ten is the input would be 2**10-1 = 1023 • If you’re going to use a library, may as well make it the right one: SymPy, as seen in Evgeni Sergeev’s answer. – Ry- Sep 21 '18 at 8:02
``````import 'dart:math';
generateFactorsOfN(N){
//determine lowest bound divisor range
final lowerBoundCheck = sqrt(N).toInt();
var factors = Set<int>(); //stores factors
/**
* Lets take 16:
* 4 = sqrt(16)
* start from 1 ...  4 inclusive
* check mod 16 % 1 == 0?  set[1, (16 / 1)]
* check mod 16 % 2 == 0?  set[1, (16 / 1) , 2 , (16 / 2)]
* check mod 16 % 3 == 0?  set[1, (16 / 1) , 2 , (16 / 2)] -> unchanged
* check mod 16 % 4 == 0?  set[1, (16 / 1) , 2 , (16 / 2), 4, (16 / 4)]
*
*  ******************* set is used to remove duplicate
*  ******************* case 4 and (16 / 4) both equal to 4
*  return factor set<int>.. this isn't ordered
*/

for(var divisor = 1; divisor <= lowerBoundCheck; divisor++){
if(N % divisor == 0){
factors.add(N ~/ divisor); // ~/ integer division
}
}
return factors;
}
``````
• Almost all the algorithm here limit to the range to the number * .5, but actually that range is much smaller. its actually sqrt of the number. if we have the lower divisor we can get he upper one easily. since its just the number / divisor. for 16 i get 4 for the sqrt, then loop from 1 to 4. since 2 is a lower bound divisor of 16 we take 16 / 2 to get 8. if we have 1 then to get 16 is (16 / 1). I came up this while learning about prime factorization so i dont know if it is published somewhere else, but it works even for large numbers. I can provide a python solution. – Tangang Atanga Dec 8 '18 at 18:41
`````` import math

'''
I applied finding prime factorization to solve this. (Trial Division)
It's not complicated
'''

def generate_factors(n):
lower_bound_check = int(math.sqrt(n))  # determine lowest bound divisor range [16 = 4]
factors = set()  # store factors
for divisors in range(1, lower_bound_check + 1):  # loop [1 .. 4]
if n % divisors == 0:
factors.add(divisors)  # lower bound divisor is found 16 [ 1, 2, 4]
factors.add(n // divisors)  # get upper divisor from lower [ 16 / 1 = 16, 16 / 2 = 8, 16 / 4 = 4]
return factors  # [1, 2, 4, 8 16]

print(generate_factors(12)) # {1, 2, 3, 4, 6, 12} -> pycharm output

Pierre Vriens hopefully this makes more sense. this is an O(nlogn) solution.
``````

I reckon this is the simplest way to do that:

``````    x = 23

i = 1
while i <= x:
if x % i == 0:
print("factor: %s"% i)
i += 1
``````
• Your answer, whilst giving the right result, is very inefficient. Have a look at the accepted answer. An explanation of how it solves the problem always helps an answer be more useful. – Nick Aug 11 '18 at 8:27