# Time complexity of modulo operator in Python

I am trying to determine the time complexity of an algorithm that I have, but I need first to know the time complexity of the % (modulo) operator in Python.

According to this post on http://math.stackexchange.com, its time complexity could be something similar to `O(log m log n)`, and in some specific cases it could also be optimised to be constant, but I would like to know if someone really knows the time complexity of `%`, so that I can determine correctly the overall time complexity of my algorithm.

Of course I am aware that the complexity could change from implementation to implementation, but I am interested only in the standard implementation.

• As that post explains, the modulo operator on fixed-length integers is a single machine instruction, O(1). Is your algorithm some other use of modulo? Commented Feb 3, 2016 at 23:47
• Python supports arbitrarily long integers, it should slow down eventually Commented Feb 4, 2016 at 0:13

• you might mean `log n` (the number of digits in the number), not `n` here (assuming `n % m` expression) i.e., `O(log m log n)` time complexity.