A pretty simple and concise brute-force solution to check whether a number N is prime: simply check if there is any divisor of N from 2 up to the square root of N (see why here if interested).
The following code is compatible with both Python 2 and Python 3:
from math import sqrt
from itertools import count, islice
def is_prime(n):
return n > 1 and all(n % i for i in islice(count(2), int(sqrt(n) - 1)))
Here's an extended version for clarity:
from math import sqrt
from itertools import count, islice
def is_prime(n):
if n < 2:
return False
for number in islice(count(2), int(sqrt(n) - 1)):
if n % number == 0:
return False
return True
This is not meant to be anything near the fastest nor the most optimal primality check algorithm, it only accomplishes the goal of being simple and concise, which also reduces implementation errors. It has a time complexity of O(sqrt(n)).
If you are looking for faster algorithms to check whether a number is prime, you might be interested in the following:
Implementation notes
You might have noticed that I am using itertools.count() in combination with itertools.islice() instead of a simple range() or xrange() (the old Python 2 generator range, which in Python 3 is the default). This is because in CPython 2 xrange(N) for some N such that N > 263 ? 1 (or N > 231 ? 1 depending on the implementation) raises an OverflowError. This is an unfortunate CPython implementation detail.
We can use itertools to overcome this issue. Since we are counting up from 2 to infinity using itertools.count(2), we'll reach sqrt(n) after sqrt(n) - 1 steps, and we can limit the generator using itertools.islice().
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