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Is there is a simple, pythonic way of rounding to the nearest whole number without using floating point? I'd like to do the following but with integer arithmetic:

skip = int(round(1.0 * total / surplus))


@John: Floating point is not reproducible across platforms. If you want your code to pass tests across different platforms then you need to avoid floating point (or add some hacky espilon stuff to your tests and hope it works). The above may be simple enough that it would be the same on most/all platforms, but I'd rather not make that determination as it is easier to avoid floating point altogether. How is that "not in the spirit of Python"?

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@John: Well, longs in Python can store arbitrarily-large values, where floats are fixed-precision, so there's a cost in range, complexity and possible bugs introducing floating-point into an integer operation. I do wish people would stop sprinkling every question with the silly buzzword "Pythonic", though. – Glenn Maynard Oct 16 '10 at 19:50
@GlennMaynard True! It's not very Pythical. – Robert Grant Apr 19 at 21:40

6 Answers 6

up vote 21 down vote accepted

You can do this quite simply:

(n + d // 2) // d, where n is the dividend and d is the divisor.

Alternatives like (((n << 1) // d) + 1) >> 1 or the equivalent (((n * 2) // d) + 1) // 2 may be SLOWER in recent CPythons, where an int is implemented like the old long.

The simple method does 3 variable accesses, 1 constant load, and 3 integer operations. The complicated methods do 2 variable accesses, 3 constant loads, and 4 integer operations. Integer operations are likely to take time which depends on the sizes of the numbers involved. Variable accesses of function locals don't involve "lookups".

If you are really desparate for speed, do benchmarks. Otherwise, KISS.

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+1 This method is both more readable than the bit-shifting approach, and also faster (in timeit testing) on Py 2.7. – snapshoe Oct 17 '10 at 0:23
skip = (((total << 1) // surplus) + 1) >> 1

Shifting things left by one bit effectively multiplies by two, shifting things right by one bit divides by two rounding down. Adding one in the middle makes it so that "rounding down" is actually rounding up if the result would have been above a .5 decimal part.

It's basically the same as if you wrote...

skip = int((1.0*total/surplus) + 0.5)

except with everything multplied by 2, and then later divided by 2, which is something you can do with integer arithmetic (since bit shifts don't require floating point).

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Right idea, but I think the quantity you need to add to total is commensurate to surplus. I would replace the "+ 1" by "+ surplus" in your current formula and that would probably be about right. – Pascal Cuoq Oct 16 '10 at 19:23
Actually I just need to move the 1 outside. :) It's equivalent to adding surplus inside, but requires fewer lookups. – Amber Oct 16 '10 at 19:24
yes, that's another possibility. – Pascal Cuoq Oct 16 '10 at 19:26
Thanks! It is not immediately obvious to me that this works correctly in all the edge cases, and I'll check to be sure. – Kekito Oct 16 '10 at 19:31
I'd recommend multiplying multiplying by two to multiply by two, and dividing by two to divide by two, unless this is actually profiled, performance-sensitive code. – Glenn Maynard Oct 16 '10 at 19:59

Yet another funny way:

q, r = divmod(total, surplus)
skip = q + int(bool(r))
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Note that this solution rounds to to next greater whole number which is not necessarily the nearest whole number. See my answer for a fixed version (which I posted at a time when I did not have enough reputation for commenting yet.). – Daniel Jun 3 '14 at 16:38

Inspired by zhmyh's answer answer, which is

q, r = divmod(total, surplus)
skip = q + int(bool(r)) # rounds to next greater integer (always ceiling)

, I came up with the following solution:

q, r = divmod(total, surplus) 
skip = q + int(2 * r >= surplus) # rounds to nearest integer (floor or ceiling)

Since the OP asked for rounding to the nearest whole number, zhmhs's solution is in fact slightly incorrect, because it always rounds to the next greater whole number, while my solution works as demanded.

(If you feel that my answer should better have been an edit or comment on zhmh's answer, let me point out that my suggested edit for it was rejected, because it should better have been a comment, but I do not have enough reputation yet for commenting!)

In case you wonder how divmod is defined: According to its documentation

For integers, the result is the same as (a // b, a % b).

We therefore stick with integer arithmetic, as demanded by the OP.

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Simply take care of the rounding rule before you ever divide. For the simplest round-half-up:

if total % surplus < surplus / 2:
    return total / surplus
    return (total / surplus) + 1

Tweak a little bit if you need to do a proper round-to-even.

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The modulo and the division operator are quite expensive, this code runs 3 division operations (one modulo and 2 regular divisions), so this is not optimal if the code needs to be fast. – FrederikNS Nov 17 '11 at 0:59

This should work too:

def rint(n):
    return (int(n+.5) if n > 0 else int(n-.5))
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@ArneL.: Uh you're right, sorry. Then you've done well downvoting :) – rubik Jul 30 '13 at 11:56
This is not an answer to the question, because it involves floating point arithmetic in n + .5. @rubik I didn't downvote, that was someone else. ;-) – Arne L. Jul 30 '13 at 16:40
@ArneL.: Well it does not matter, if it's wrong it's right to downvote :) – rubik Jul 30 '13 at 16:42

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