# Why does the modulo operator result in negative values? [duplicate]

Why do such operations:

``````std::cout << (-7 % 3) << std::endl;
std::cout << (7 % -3) << std::endl;
``````

give different results?

``````-1
1
``````

From ISO14882:2011(e) 5.6-4:

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. For integral operands the / operator yields the algebraic quotient with any fractional part discarded; if the quotient a/b is representable in the type of the result, (a/b)*b + a%b is equal to a.

The rest is basic math:

``````(-7 / 3) => -2
-2 * 3   => -6
so a % b => -1

(7 / -3) => -2
-2 * -3  => 6
so a % b => 1
``````

Note that

If both operands are nonnegative then the remainder is nonnegative; if not, the sign of the remainder is implementation-defined.

from ISO14882:2003(e) is no longer present in ISO14882:2011(e)

• The expression "algebraic quotient" isn't present in ISO 14882:2003; the expression there is just "quotient" (and what is implementation defined is whether `-7/3` results in `-2` or `-3`). Commented Sep 29, 2011 at 8:52
• I think no matter which way and how many times you skin that cat, the fundamental fact is that divide and modulo with signed operands is implementation defined. There's always a "which way" choice in some guise or another. The guaranteed identity at the end of that quote is what's important. (Though I think C99 may actually fix that choice.) Commented Sep 29, 2011 at 9:13
• @JamesKanze: C++03 still contains the implementation definedness, it is C++11 which removes it. (and requires divisions to follow fortran, basically) Commented Sep 29, 2011 at 10:00
• @KerrekSB It is defined now in C++11.
– Buge
Commented Jul 31, 2014 at 19:22
• @Buge: C++11 is based on C99, so that makes sense. Commented Jul 31, 2014 at 20:03
``````a % b
``````

in c++ default:

``````(-7 / 3) => -2
-2 * 3   => -6
so a % b => -1

(7 / -3) => -2
-2 * -3  => 6
so a % b => 1
``````

in python:

``````-7 % 3 => 2
7 % -3 => -2
``````

in c++ to python:

``````(b + (a % b)) % b
``````
• There is no "C++ default" regarding the resulting sign in case of negative numbers. Commented Dec 6, 2018 at 15:40

The sign in such cases (i.e when one or both operands are negative) is implementation-defined. The spec says in §5.6/4 (C++03),

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.

That is all the language has to say, as far as C++03 is concerned.

• That's all the language had to say. C++11 (like C99) adopts the Fortran rules of rounding to zero (i.e. dropping the fractional part). In practice, all hardware had adopted the Fortran rules long ago, so all all implementations already did it this way anyway. (The purpose of the "implementation-defined" is to allow C/C++ to do whatever the hardware does. I think some very old hardware did always round down, so that `-7/3` would result in `-3`, but that would be in a very distant past.) Commented Sep 29, 2011 at 8:49
• @JamesKanze: If `b` is a power of 2, it used to be possible to compute `n % b` as `n & (b-1)`. The new standard requires that it be computed as `n < 0 ? n | -b : n & (b-1)`. Likewise, `n / b` cannot be written as a simple shift, even on hardware that supports arithmetic shifts; instead, on such systems, an expression like `n/16` (if `n` is an `int32`) must be written as `n < 0 ? (n+15) >> 4 : n >> 4`. Horrible standard, IMHO. Note that since non-power-of-two division is inherently slow anyway, mandating Euclidian behavior wouldn't have slowed it down much. Commented Jul 1, 2013 at 18:12
• @JamesKanze: It is NOT the behavior of existing hardware in the case of optimizing divide-by-power-of-two operations as shifts. Under the old rules, `foo /= 16` could be written as `asr [dword foo],4`. Under the new rules, the optimal representation requires many more instructions [perhaps `mov eax,[foo] / mov ebx,eax, asr eax,31 / lsr eax,28 / add eax,ebx / asr eax,4 / mov [foo],eax`] Not as slow as a divide instruction, but a lot more work than a simple shift. Commented Jul 1, 2013 at 22:11
• @supercat Complaining about the way that an arithmetic function in a human readable language works because of how many instructions have to be done in machine code to keep it consistent instead of using a hacky shortcut that only simplifies operations with a tiny subset of all possible values? Wow. Just wow. slow clap Commented Mar 15, 2016 at 20:07
• @CptRobby You seem to forget that the entire design philosophy of C revolves around hacky shortcuts to produce faster assembly code. Commented May 20, 2017 at 23:18