Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I found out about the // operator in Python which in Python 3 does division with floor, is there an operator which divides with ceil instead? (I know about the / operator which in Python 3 does floating point division.)

Update: I have been told that using standard float division and then ceiling the result is the best method for clarity: ceil(foo/bar)

share|improve this question
"divide-then-ceil" isn't really a common thing in maths, while // is based on the integer division-with-modulus operation. –  millimoose Feb 11 '13 at 22:39
add comment

5 Answers

up vote 11 down vote accepted

There is no operator which divides with ceil. You need to import math and use math.ceil

share|improve this answer
so foobar = math.ceil(foo / bar)? Hmm, I can live with that, don't know of anywhere I wanted to use that, was just curious, thanks –  Cradam Feb 11 '13 at 22:51
add comment

You can just do upside-down floor division:

def ceildiv(a, b):
    return -(-a // b)

This works because Python's division operator does floor division (unlike in C, where integer division truncates the fractional part).

This also works with Python's big integers, because there's no (lossy) floating-point conversion.

Here's a demonstration:

>>> from __future__ import division   # a/b is float division
>>> from math import ceil
>>> b = 3
>>> for a in range(-7, 8):
...     print(["%d/%d" % (a, b), int(ceil(a / b)), -(-a // b)])
['-7/3', -2, -2]
['-6/3', -2, -2]
['-5/3', -1, -1]
['-4/3', -1, -1]
['-3/3', -1, -1]
['-2/3', 0, 0]
['-1/3', 0, 0]
['0/3', 0, 0]
['1/3', 1, 1]
['2/3', 1, 1]
['3/3', 1, 1]
['4/3', 2, 2]
['5/3', 2, 2]
['6/3', 2, 2]
['7/3', 3, 3]
share|improve this answer
add comment

Note that math.ceil is limited to 53 bits of precision. If you are working with large integers, you may not get exact results.

The gmpy2 libary provides a c_div function which uses ceiling rounding.

Disclaimer: I maintain gmpy2.

share|improve this answer
This package would be useful if I was doing something heavily mathematics or science orientated, I prefer the answer which uses core libraries though. I am giving an upvote though as it is a useful answer –  Cradam Feb 12 '13 at 13:38
add comment

You could do (x + (d-1)) // d when dividing x by d, i.e. (x + 4) // 5.

share|improve this answer
This is the classic method I've used forever. Doesn't work for negative divisors though. –  Mark Ransom Jul 8 '13 at 16:20
add comment

You can always just do it inline as well

((foo - 1) // bar) + 1

In python3, this is just shy of an order of magnitude faster than forcing the float division and calling ceil(), provided you care about the speed. Which you shouldn't, unless you've proven through usage that you need to.

>>> timeit.timeit("((5 - 1) // 4) + 1", number = 100000000)
>>> timeit.timeit("ceil(5/4)", setup="from math import ceil", number = 100000000)
share|improve this answer
just ran those tests myself I get about 12.5 seconds, ehrm, why wouldn't I care about speed when it is such a huge speed difference? –  Cradam Feb 11 '13 at 23:17
@Cradam Note that he's using doing 100 million calls (number=100000000). Per single call, the difference is pretty insignificant. –  F3AR3DLEGEND Feb 11 '13 at 23:19
ahh, thanks, i'll be using ceil method then –  Cradam Feb 11 '13 at 23:23
Because code clarity trumps all. Clarity is objective in this case probably. But you should always make readable/maintainable first. When, and only when, you've discovered a performance checkpoint, do you get to break the rules. Modern machines are so fast, and so often all of the other stuff your program is doing renders this kind of difference lost in the noise. –  Travis Griggs Feb 11 '13 at 23:26
add comment

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.