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Given integer values x and y, C and C++ both return as the quotient q = x/y the floor of the floating point equivalent. I'm interestd in a method of returning the ceiling instead. For example, ceil(10/5) = 2 and ceil(11/5) = 3.

The obvious approach involves something like:

q = x / y;
if (q * y < x) ++q;

This requires an extra comparison and multiplication; and other methods I've seen (used in fact) involve casting as a float or double. Is there a more direct method that avoids the additional multiplication (or a second division) and branch, and that also avoids casting as a floating point number?

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3  
the divide instruction often returns both quotient and remainder at the same time so there's no need to multiply, just q = x/y + (x % y != 0); is enough –  Lưu Vĩnh Phúc Jan 25 at 11:17
    
@LưuVĩnhPhúc that comment should be the accepted answer, imo. –  Andreas Grapentin Jul 9 at 14:14
    
@LưuVĩnhPhúc Seriously you need to add that as the answer. I just used that for my answer during a codility test. It worked like a charm though I am not certain how the mod part of the answer works but it did the job. –  Zachary Kraus Aug 26 at 0:56
    
@AndreasGrapentin the answer below by Miguel Figueiredo was submitted nearly a year before Lưu Vĩnh Phúc left the comment above. While I understand how appealing and elegant Miguel's solution is, I'm not inclined to change the accepted answer at this late date. Both approaches remain sound. If you feel strongly enough about it, I suggest you show your support by up-voting Miguel's answer below. –  andand Aug 26 at 2:51
1  
I found the answer by Miguel Figueiredo after I left this comment. Yeah I did give him an upvote. Sorry for any confusion. –  Zachary Kraus Aug 27 at 0:44

6 Answers 6

up vote 115 down vote accepted

To round up ...

q = (x + y - 1) / y;

or (avoiding overflow in x+y)

q = 1 + ((x - 1) / y); // if x != 0
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1  
Yeah, that'll work. Thanks. –  andand Apr 30 '10 at 14:21
19  
Note: this will only work for positive numbers. –  bitc Apr 30 '10 at 14:32
3  
@bitc: For negative numbers, I believe C99 specifies round-to-zero, so x/y is the ceiling of the division. C90 didn't specify how to round, and I don't think the current C++ standard does either. –  David Thornley Apr 30 '10 at 14:46
4  
See Eric Lippert's post: stackoverflow.com/questions/921180/c-round-up/926806#926806 –  Mashmagar Apr 30 '10 at 14:53
2  
The second one has a problem where x is 0. ceil(0/y) = 0 but it returns 1. –  Omry Yadan May 27 '13 at 0:52

Sparky's answer is one standard way to solve this problem, but as I also wrote in my comment, you run the risk of overflows. This can be solved by using a wider type, but what if you want to divide long longs?

Nathan Ernst's answer provides one solution, but it involves a function call, a variable declaration and a conditional, which makes it no shorter than the OPs code and probably even slower, because it is harder to optimize.

My solution is this:

q = (x % y) ? x / y + 1 : x / y);

It will be slightly faster than the OPs code, because the modulo and the division is performed using the same instruction on the processor, because the compiler can see that they are equivalent. At least gcc 4.4.1 performs this optimization with -O2 flag on x86.

In theory the compiler might inline the function call in Nathan Ernst's code and emit the same thing, but gcc didn't do that when I tested it. This might be because it would tie the compiled code to a single version of the standard library.

As a final note, none of this matters on a modern machine, except if you are in an extremely tight loop and all your data is in registers or the L1-cache. Otherwise all of these solutions will be equally fast, except for possibly Nathan Ernst's, which might be significantly slower if the function has to be fetched from main memory.

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+1 Nice, in-depth answer. –  Kevin Little Apr 30 '10 at 22:18
3  
There was an easier way to fix overflow, simply reduce y/y: q = (x > 0)? 1 + (x - 1)/y: (x / y); –  Ben Voigt Apr 30 '10 at 22:40
    
-1: this is an inefficient way, as it trades a cheap * for a costly %; worse than the OP approach. –  Yves Daoust Apr 11 at 8:43
    
No, it does not. As I explained in the answer, the % operator is free when you already perform the division. –  Jørgen Fogh Apr 11 at 22:03
    
Then q = x / y + (x % y > 0); is easier than ? : expression? –  Han May 29 at 16:00

How about this? (requires y non-negative, so don't use this in the rare case where y is a variable with no non-negativity guarantee)

q = (x > 0)? 1 + (x - 1)/y: (x / y);

I reduced y/y to one, eliminating the term x + y - 1 and with it any chance of overflow.

I avoid x - 1 wrapping around when x is an unsigned type and contains zero.

For signed x, negative and zero still combine into a single case.

Probably not a huge benefit on a modern general-purpose CPU, but this would be far faster in an embedded system than any of the other correct answers.

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+1: Nice answer! It seems so obvious now. ;-) –  Jørgen Fogh Apr 30 '10 at 23:24

You could use the div function in cstdlib to get the quotient & remainder in a single call and then handle the ceiling separately, like in the below

#include <cstdlib>
#include <iostream>

int div_ceil(int numerator, int denominator)
{
        std::div_t res = std::div(numerator, denominator);
        return res.rem ? (res.quot + 1) : res.quot;
}

int main(int, const char**)
{
        std::cout << "10 / 5 = " << div_ceil(10, 5) << std::endl;
        std::cout << "11 / 5 = " << div_ceil(11, 5) << std::endl;

        return 0;
}
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6  
As an interesting case of the double bang, you could also return res.quot + !!res.rem; :) –  280Z28 Apr 30 '10 at 22:32

For positive numbers:

    q = x/y + (x % y != 0);
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most common architecture's divide instruction also includes remainder in its result so this really needs only one division and would be very fast –  Lưu Vĩnh Phúc Jan 25 at 11:15
    
I dont know about the speed thing but its easy to understand. I give this two thumbs up. If only I was an octopus I could give it the truly well deserved eight thumbs up. –  Zachary Kraus Aug 26 at 1:02

This works for positive or negative numbers.

q = x/y+((x%y!=0)?!((x>0)^(y>0)):0);

If there is a remainder, checks to see if x and y are of the same sign and adds 1 accordingly.

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