std::remainder, std::remainderf, std::remainderl - cppreference.com
| Defined in header |
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| (1) | ||
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(until C++23) | |
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(since C++23) | |
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(2) | (since C++11) (constexpr since C++23) |
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(3) | (since C++11) (constexpr since C++23) |
| SIMD overload (since C++26) |
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| Defined in header |
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(S) | (since C++26) |
| Additional overloads (since C++11) |
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| Defined in header |
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(A) | (constexpr since C++23) |
1-3) Computes the IEEE remainder of the floating point division operation x / y. The library provides overloads of std::remainder for all cv-unqualified floating-point types as the type of the parameters.(since C++23)
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S) The SIMD overload performs an element-wise
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(since C++26) |
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A) Additional overloads are provided for all integer types, which are treated as |
(since C++11) |
The IEEE floating-point remainder of the division operation x / y calculated by this function is exactly the value x - quo * y, where the value quo is the integral value nearest the exact value x / y. When |quo - x / y| = ½, the value quo is chosen to be even.
In contrast to std::fmod, the returned value is not guaranteed to have the same sign as x.
If the returned value is zero, it will have the same sign as x.
Parameters
| x, y | - | floating-point or integer values |
Return value
If successful, returns the IEEE floating-point remainder of the division x / y as defined above.
If a domain error occurs, an implementation-defined value is returned (NaN where supported).
If a range error occurs due to underflow, the correct result is returned.
If y is zero, but the domain error does not occur, zero is returned.
Error handling
Errors are reported as specified in math_errhandling.
Domain error may occur if y is zero.
If the implementation supports IEEE floating-point arithmetic (IEC 60559),
- The current rounding mode has no effect.
- FE_INEXACT is never raised, the result is always exact.
- If
xis ±∞ andyis not NaN, NaN is returned and FE_INVALID is raised. - If
yis ±0 andxis not NaN, NaN is returned and FE_INVALID is raised. - If either argument is NaN, NaN is returned.
Notes
POSIX requires that a domain error occurs if x is infinite or y is zero.
std::fmod, but not std::remainder is useful for doing silent wrapping of floating-point types to unsigned integer types: (0.0 <= (y = std::fmod(std::rint(x), 65536.0))) ? y : 65536.0 + y is in the range [-0.0, 65535.0], which corresponds to unsigned short, but std::remainder(std::rint(x), 65536.0) is in the range [-32767.0, +32768.0], which is outside of the range of signed short.
The additional overloads are not required to be provided exactly as (A). They only need to be sufficient to ensure that for their first argument num1 and second argument num2:
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(until C++23) |
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If If no such floating-point type with the greatest rank and subrank exists, then overload resolution does not result in a usable candidate from the overloads provided. |
(since C++23) |
Example
#include <cfenv> #include <cmath> #include <iostream> // #pragma STDC FENV_ACCESS ON int main() { std::cout << "remainder(+5.1, +3.0) = " << std::remainder(5.1, 3) << '\n' << "remainder(-5.1, +3.0) = " << std::remainder(-5.1, 3) << '\n' << "remainder(+5.1, -3.0) = " << std::remainder(5.1, -3) << '\n' << "remainder(-5.1, -3.0) = " << std::remainder(-5.1, -3) << '\n'; // special values std::cout << "remainder(-0.0, 1.0) = " << std::remainder(-0.0, 1) << '\n' << "remainder(5.1, Inf) = " << std::remainder(5.1, INFINITY) << '\n'; // error handling std::feclearexcept(FE_ALL_EXCEPT); std::cout << "remainder(+5.1, 0) = " << std::remainder(5.1, 0) << '\n'; if (fetestexcept(FE_INVALID)) std::cout << " FE_INVALID raised\n"; }
Possible output:
remainder(+5.1, +3.0) = -0.9
remainder(-5.1, +3.0) = 0.9
remainder(+5.1, -3.0) = -0.9
remainder(-5.1, -3.0) = 0.9
remainder(-0.0, 1.0) = -0
remainder(5.1, Inf) = 5.1
remainder(+5.1, 0) = -nan
FE_INVALID raised