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Seems like whenever I divide a negative int by a positive int, I need it to round down (toward -inf), not toward 0. But both C# and C++ round toward 0.

So I guess I need a DivideDownward() method. I can write it in a few lines with a test for negative and so on, but my ideas seem klugey. So I'm wondering if I'm missing something and if you have an "elegant" way to round negative division downward.

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Give examples of the behavior you want. –  Matthew Flaschen Jun 15 '10 at 1:03
Example? OK, I need (-5)/3 to yield -2, not -1. But I really don't think the example adds anything to the (IMO) clear question. –  Conrad Albrecht Jun 15 '10 at 1:40

14 Answers 14

up vote 5 down vote accepted

WARNING: this post produces incorrect results for input with a=-1. Please see other answers. -Cam


This is probably what you meant by 'kludgey', but it's what I came up with ;)

int divideDown(int a, int b){
    int r=a/b;
    if (r<0 && r*b!=a)
        return r-1;
    return r;

In the if statement, I put r<0 - however I'm not sure if that's what you want. You may wish to change the if statement to

if (a<0 && b>0)

which would be consistent with your description "Seems like whenever I divide a negative int by a positive int ".

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This is what I meant by klugey, but I don't know anything better. Especially for the r*b!=a test, which is probably more efficient than a%b!=0, and justifies the extra lines of code as compared to the single-line expressions offered, I award this "the answer". –  Conrad Albrecht Jun 15 '10 at 2:22
I'm not certain about this, but shouldn't it be if (r<=0 && r*b!=a)? –  Chris Burt-Brown Oct 21 '12 at 19:09
It's worse than that -- as written, this produces the wrong answer for a=-1, and if you change it to r<=0, then it produces the wrong answer for a=1. This answer should not have been accepted; it produces incorrect results. –  Joe Strout Jul 27 '13 at 0:05
Cannot delete as it is the accepted answer. Will try to fix with a solution, but until then have edited with a warning. Thanks for finding the bug! –  Cam Jul 29 '13 at 21:15
@Cam I thought it was possible to delete your own answer even if it is already accepted. In fact, I thought there was some sort of self critic badge for doing so. Maybe not. –  csj Jul 29 '13 at 21:19

Whenever I divide a negative int by a positive int, I need it to round down.

It's hell, isn't it? Knuth wrote why this is the right way to do things, but we're stuck with legacy integer hardware.

  • If you can afford the loss of precision, the simplest and cleanest way to do this is to cast a 32-bit integer to a 64-bit double and use the FP rounding mode to round toward minus infinity when you convert the quotient back to integer. Today's floating-point units are pretty fast and may actually divide faster than an integer unit; to be sure, you'd have to measure.

  • If you need full 64-bit integer precision, I've dealt with this problem as a compiler writer by doing the two conditional branches so that you wind up dividing the magnitudes, then get the correct sign. But this was a while back when the conditional branch was cheap compared to a divide; on today's hardware, I would have to experiment before I'd be able to recommend something.

  • In principle, you could pull the floating-point trick on 64-bit ints by using the legacy Intel 80-bit floating-point numbers, but it's wildly unportable, and I don't trust Intel to keep making that unit fast. These days the floating point speed is in the SSE unit.

  • Places to look for other tricks would include Hank Warren's book Hacker's Delight (my copy is at work) and the MLton compiler for Standard ML, which requires integer division to round toward minus infinity.

Whatever you do, when you get settled on it, if you are using C++ or C99, stick your divide routine into a .h file and make it static inline. That way when your solution turns out to be suboptimal for new whizbang hardware delivered in 5 years, you have one place to change it.

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I thought int32 -> double wouldn't lose any precision. But I just optimized some fp code where fstp ops (on near-0 numbers) were taking most of my CPU time. Maybe not relevant, but I'm soured on unnecessary fp for now. ;) –  Conrad Albrecht Jun 15 '10 at 2:15

If you wanted to write this just using integers in a relatively succinct way, then you can write this:

var res = a / b - (a % b < 0 ? 1 : 0);

This probably compiles to quite a few instructions, but it may still be faster than using floating-points.

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The OP didn't mention C, but it's still worth noting this is not guaranteed to work in C89 due to implementation-defined %. I think you can generalize it by changing to a % b != 0. –  Matthew Flaschen Jun 15 '10 at 1:14
@Matthew: That's tricky. However, it needs to return 0 if a % b returns a number larger than zero (so that's why I need < in C#). –  Tomas Petricek Jun 15 '10 at 1:22
@Tom, good point. I was thinking in terms of a being negative. So I guess a generalized version would be: a /b - (a < 0 && a % b != 0 ? 1 : 0) –  Matthew Flaschen Jun 15 '10 at 1:30
I think the given answer is implementation-dependent, but Matthew's modification appears concise and reliable. If it was an answer I'd checkmark it. Thank you (everyone)! –  Conrad Albrecht Jun 15 '10 at 1:47
@Matthew: actually, this is guarenteed to work by both C89 and C99 -- they require that (a/b)*b + a%b == a unless b == 0 even though the actual values returned by / and % are implementation defined for negative operands. Your version will fail if the builtin / rounds towards -inf instead of 0. –  Chris Dodd Jun 15 '10 at 1:49

You can get rid of any branching by doing this:

inline int DivideRoundDown(int a_numerator, int a_denominator)
    return (a_numerator / a_denominator) + ((a_numerator % a_denominator) >> 31);
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Assuming b is always positive, here is a cheap solution:

inline int roundDownDivide(int a, int b) {
  if (a >= 0) return a/b; 
  else return (a-b+1)/b;
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if you need it as an int, cast it afterwards

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decimal is the slowest numeric type, and it doesn't add anything here. float or double would be more appropriate. –  Matthew Flaschen Jun 15 '10 at 1:04
You also don't need to cast the denominator, just the numerator. –  Phong Jun 15 '10 at 1:09
@Matthew Flaschen: I was considering that. I did not realize the int he was talking about was an int32. If you plug in the extraneous values for a and b [Int64.MaxValue-1 and Int64.MaxValue respectively], using double will break because of floating point error, and you'll get 1 instead of 0. Answer has been fixed. –  Warty Jun 15 '10 at 1:10
This answer works, but given the performance cost of fp, I'd consider it no improvement over my "kludgey" method ideas. –  Conrad Albrecht Jun 15 '10 at 1:42

For powers of 2, depending on your compiler implementation (Visual Studio), you could use a right shift.

-5 >> 2 == -2
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Dr Atlans solution above is the most general answer, but if you know that a isn't going to be less than some fixed number, you can add the smallest multiple of b that will make it positive and then adjust the result. For example, if a is always >= -10 * b, you can say:

return (a + 10 * b) / b - 10

or if you just want a correct result when a is positive or 0 and some negative result when a is negative (eg for testing if the result is >= 0 without including the range a = [-1 ; -b +1]) you can do

return (a + b) / b - 1;

which will return -1 for [-1 , -b + 1] as well as for [-b ; -2 * b + 1], but that doesn't matter if you're just trying establish if the result of the division is positive. Effectively we're just changing the rounding so that it rounds towards -1 instead of 0.

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I'm no expert in low-level optimization, but here's a version with no branching (conditionals) which also doesn't require conversions to floating point numbers. Tested in C#, it seems to be significantly faster there than the versions using branching.

return (a - (((a % b) + b) % b)) / b;

This solution is partially derived from the discussions about how to do the best modulo function for negative numbers: Modulo of negative numbers

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Edit: My solution didn't work in all cases. Here's a C# implementation of Dr.Atlan's solution:

/// <summary>
/// Divides a/b, rounding negative numbers towards -Inf.
/// </summary>
/// <param name="a">Dividend</param>
/// <param name="b">Divisor; must be positive for correct results</param>
/// <returns>a ÷ b</returns>
public static int Div(int a, int b)
    return a < 0 ? (a - b + 1) / b : a / b;
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Doesn't work for numbers that can be divided without remainder. For example, Div(-1, 1) returns -2. –  Branko Dimitrijevic Feb 26 '12 at 19:55
@BrankoDimitrijevic: Hah! That explains the artifacts in my game. Using Dr.Altan's solution instead now; that one seems to work well. –  Mark Feb 26 '12 at 20:35

Here's a version that works when the divisor is negative:

int floor_div2(int a, int b)
  int rem = a % b;
  int div = a/b;
  if (!rem)
    a = b;
  int sub = a ^ b;
  sub >>= 31;
  return div+sub;
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Do the calculation in an unsigned long by offsetting with 2^31, eg:

int floor_div(int a, int b)
  unsigned long aa = a + (1UL << 31);
  unsigned long cc = (aa / b) - (1UL << 31);
  return (int)cc

I have not tested this.

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I did it this way (only one division, no multiplication, no modulo, looks like fastest solution):

(a < 0 && b > 0) ? (a - b + 1) / b : (a > 0 && b < 0) ? (a - b - 1) / b : a / b

I was curious what is faster: less branching or less multiplications/divisions/modulos, so I compared my solution with runevision's one and in this particular case less divisions is better than less branching. ben135's solution gives incorrect results in some cases (e.g. 10/-3 gives -3 but should be -4).

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Many programming languages, including the older standards of C and C++, guarantee the division rule, which is

a = b * (a / b) + a % b

even if the exact values of a/b and a%b are left undefined. (Nowadays they are defined in C and C++.) This can be exploited to calculate the desired result in many languages and platforms using (an equivalent of) the following code:

int divF(int a, int b) { return a / b - (a % b < 0); }

This is the version from @TomasPetricek's answer. However, this works only for b > 0!

The following code will work for any b != 0:[1]

int sign(int x) { return (x > 0) - (x < 0); }
int divF2(int a, int b) { return a / b - (sign(a % b) == -sign(b)); }

However, the rounding-down division (aka flooring division, aka Knuth's division) is not always desirable. It is argued[2] that Euclidean division is the most generally useful one. It rounds down for b > 0, and up for b < 0. It has the nice property that the value of the compatibly defined remainder is always non-negative, for all a, b, independently of their signs. Additionally it coincides with bit-shifts on twos complement machines for power-of-two divisors. Yes, it is also faster to calculate:

int divE(int a, int b) {
    int c = a % b < 0;
    return a / b + (b < 0 ? c : -c);

All three versions generate branchless code with clang 3.4.1 -O2 on amd64. However, on twos complement architectures, the following may be marginally faster:

int divE2(int a, int b) { return a / b + (-(a % b < 0) & (b < 0 ? 1 : -1)); }

Generated code


idiv esi
shr edx, 31
sub eax, edx


idiv esi
test edx, edx
setg cl
movzx ecx, cl
shr edx, 31
sub ecx, edx
test esi, esi
setg dl
movzx edx, dl
shr esi, 31
sub esi, edx
cmp ecx, esi
sete cl
movzx ecx, cl
sub eax, ecx


idiv esi
mov ecx, edx
shr ecx, 31
sar edx, 31
test esi, esi
cmovs edx, ecx
add eax, edx


idiv esi
sar edx, 31
shr esi, 31
lea ecx, dword ptr [rsi + rsi - 1]
and ecx, edx
add ecx, eax
mov eax, ecx // WTF? But OK when inlined...


With the above mentioned compiler, on i7-3720QM CPU @ 2.60GHz, running the following code with different TESTFUNCs, gives

simple truncating division:
1225053229                 base:  8.41 ns

round to -inf for b > 0, broken for b < 0:
 975205675                 divF:  8.70 ns
 975205675               ben135:  8.71 ns

euclidean division:
1225082031                divE2:  9.37 ns
1225082031                 divE:  9.67 ns

round to -inf, work for b < 0:
 975229215                Chazz:  9.67 ns
 975229215                divF2: 10.56 ns
 975229215           runevision: 13.85 ns
 975229215        LegsDrivenCat: 16.62 ns
 975229215                Warty: 20.00 ns

likely an overflow bug trying to implement the above:
 975049659              DrAltan: 11.77 ns

The first column is a checksum grouping algorithms producing the same result. base is the simplest truncating division used to measure the testing overhead.


#define STRINGIZE2(a) #a

int main()
    static const int N = 500000000;
    int ret = 0;
    for(int i = 0; i < N; ++i)
        int a = random() - 0x40000000, b;
        do b = (random() >> 16) - 0x4000; while(b == 0);
        ret += TESTFUNC(a,b);

    timespec t;
    clock_gettime(CLOCK_VIRTUAL, &t);
    printf("%10d %20s: %5.2f ns\n", ret, STRINGIZE(TESTFUNC), (t.tv_sec*1.e9 + t.tv_nsec)/N);


  1. Daan Leijen. Division and Modulus for Computer Scientists. December 2001.
  2. Raymond T. Boute. The Euclidean definition of the functions div and mod. April 1992.
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