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If you have an equation like this:

x = 3 mod 7

x could be ... -4, 3, 10, 17, ..., or more generally:

x = 3 + k * 7

where k can be any integer. I don't know of a modulo operation is defined for math, but the factor ring certainly is.


In Python, you will always get non-negative values when you use % with a positive m:

# -*- coding: utf-8 -*-

m = 7

for i in xrange(-8, 10 + 1):
    print(i % 7)

Results in:

6    0    1    2    3    4    5    6    0    1    2    3    4    5    6    0    1    2    3


#include <iostream>

using namespace std;

int main(){
    int m = 7;

    for(int i=-8; i <= 10; i++) {
        cout << (i % m) << endl;

    return 0;

Will output:

-1    0    -6    -5    -4    -3    -2    -1    0    1    2    3    4    5    6    0    1    2    3    

ISO/IEC 14882:2003(E) - 5.6 Multiplicative operators:

The binary / operator yields the quotient, and the binary % operator yields the remainder from the division of the first expression by the second. If the second operand of / or % is zero the behavior is undefined; otherwise (a/b)*b + a%b is equal to a. If both operands are nonnegative then the remainder is nonnegative; if not, the sign of the remainder is implementation-defined 74).


74) According to work underway toward the revision of ISO C, the preferred algorithm for integer division follows the rules defined in the ISO Fortran standard, ISO/IEC 1539:1991, in which the quotient is always rounded toward zero.

Source: ISO/IEC 14882:2003(E)

(I couldn't find a free version of ISO/IEC 1539:1991. Does anybody know where to get it from?)

The operation seems to be defined like this:

enter image description here


Does it make sense to define it like that?

What are arguments for this specification? Is there a place where the people who create such standards discuss about it? Where I can read something about the reasons why they decided to make it this way?

Most of the time when I use modulo, I want to access elements of a datastructure. In this case, I have to make sure that mod returns a non-negative value. So, for this case, it would be good of mod always returned a non-negative value. (Another usage is the Euclidean algorithm. As you could make both numbers positive before using this algorithm, the sign of modulo would matter.)

Additional material:

See Wikipedia for a long list of what modulo does in different languages.

share|improve this question
The usual reason for C (and therefore C++) is that existing hardware does math in a certain way. The language standard just documents what is happening (and what is not). – Bo Persson Jul 24 '12 at 12:09
A useful addition to this question might be "and what is a good alternative in C++ code to get the behaviour shown by Python?" – hertzsprung Aug 17 '15 at 15:44
up vote 14 down vote accepted

On x86 (and other processor architectures), integer division and modulo are carried out by a single operation, idiv (div for unsigned values), which produces both quotient and remainder (for word-sized arguments, in AX and DX respectively). This is used in the C library function divmod, which can be optimised by the compiler to a single instruction!

Integer division respects two rules:

  • Non-integer quotients are rounded towards zero; and
  • the equation dividend = quotient*divisor + remainder is satisfied by the results.

Accordingly, when dividing a negative number by a positive number, the quotient will be negative (or zero).

So this behaviour can be seen as the result of a chain of local decisions:

  • Processor instruction set design optimises for the common case (division) over the less common case (modulo);
  • Consistency (rounding towards zero, and respecting the division equation) is preferred over mathematical correctness;
  • C prefers efficiency and simplicitly (especially given the tendency to view C as a "high level assembler"); and
  • C++ prefers compatibility with C.
share|improve this answer
I wonder how often the truncated division is faster than floored, given that power-of-two divisors are very common, as are divisors which are amenable to scaled multiplication. – supercat Dec 19 '13 at 9:10

What are arguments for this specification?

One of the design goals of C++ is to map efficiently to hardware. If the underlying hardware implements division in a way that produces negative remainders, then that's what you'll get if you use % in C++. That's all there is to it really.

Is there a place where the people who create such standards discuss about it?

You will find interesting discussions on comp.lang.c++.moderated and, to a lesser extent, comp.lang.c++

share|improve this answer
And this goes very well with the C++ goal of "you dont pay for what you dont use". Performance is never sacrificed by default for the sake of convenience. If you need to check/abs your modulo results, you can easily wrap it wherever you need that behavior. – Preet Kukreti Jul 24 '12 at 12:12
Wouldn't the goal of "mapping efficiently to hardware" be better specified by saying that if x or y is negative and the modulus is non-zero, the compiler could arbitrarily return either the positive or negative result? The fastest implementation of (x%123456789) which works correctly with positive numbers might yield negative results with negative numbers, but the fastest implementation of (x%8) would yield positive numbers. The fastest way to compute (x mod y) if y is positive and x may be negative is probably: m=x%y; if (m<0) m+=y;, and that would work even if the compiler... – supercat Nov 1 '13 at 21:32
...randomly returned positive or negative results for negative x values that weren't divisible by y. The only thing I can see that is accomplished by specifying truncate-to-zero on /, and corresponding behavior on %, is to make operations like x/=4; or y%=4; three times as slow as they would otherwise need to be. Have you ever seen any code that actually benefits from -5%2=-1? – supercat Nov 1 '13 at 21:37

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