# remquof(3) [netbsd man page]

REMAINDER(3) BSD Library Functions Manual REMAINDER(3)NAME

remainder, remainderf, remquo, remquofremainder functions--LIBRARY

Math Library (libm, -lm)SYNOPSIS

#include <math.h> double remainder(double x, double y); float remainderf(float x, float y); double remquo(double x, double y, int *quo); float remquof(float x, float y, int *quo);DESCRIPTION

Provided that y != 0 , the remainder() and remainderf() functions calculate the floating-point remainder r of r = x - ny, where n is the integral value nearest to the exact value of x / y. If | n - x / y | = 1/2 , the value n is chosen to be even. Consequently, the remainder is computed exactly and | r | <= | y | / 2 . Also the remquo() and remquof() functions calculate the remainder as described above. But these additionally use quo to store a value whose sign is the sign of x / y and whose magnitude is congruent modulo 2^k to the magnitude of the integral quotient of x / y, where k is an implementation-defined integer greater than or equal to 3. The rationale of the remquo() family of functions relates to situations where only few bits of the quotient are required. The exact repre- sentation of the quotient may not be meaningful when x is large in magnitude compared to y.RETURN VALUES

The functions return the remainder independent of the rounding mode. If y is zero , NaN is returned and a domain error occurs. A domain error occurs and a NaN is returned also when x is infinite but y is not a NaN. If either x or y is NaN, a NaN is always returned.SEE ALSO

div(3), fast_remainder32(3), fmod(3), math(3)STANDARDS

The described functions conform to ISO/IEC 9899:1999 (``ISO C99'').BSD

September 18, 2011 BSD

## Check Out this Related Man Page

NAME

remainder, remainderf, remquo, remquofremainder functions--LIBRARY

Math Library (libm, -lm)SYNOPSIS

#include <math.h> double remainder(double x, double y); float remainderf(float x, float y); double remquo(double x, double y, int *quo); float remquof(float x, float y, int *quo);DESCRIPTION

Provided that y != 0 , the remainder() and remainderf() functions calculate the floating-point remainder r of r = x - ny, where n is the integral value nearest to the exact value of x / y. If | n - x / y | = 1/2 , the value n is chosen to be even. Consequently, the remainder is computed exactly and | r | <= | y | / 2 . Also the remquo() and remquof() functions calculate the remainder as described above. But these additionally use quo to store a value whose sign is the sign of x / y and whose magnitude is congruent modulo 2^k to the magnitude of the integral quotient of x / y, where k is an implementation-defined integer greater than or equal to 3. The rationale of the remquo() family of functions relates to situations where only few bits of the quotient are required. The exact repre- sentation of the quotient may not be meaningful when x is large in magnitude compared to y.RETURN VALUES

The functions return the remainder independent of the rounding mode. If y is zero , NaN is returned and a domain error occurs. A domain error occurs and a NaN is returned also when x is infinite but y is not a NaN. If either x or y is NaN, a NaN is always returned.SEE ALSO

div(3), fast_remainder32(3), fmod(3), math(3)STANDARDS

The described functions conform to ISO/IEC 9899:1999 (``ISO C99'').BSD

September 18, 2011 BSD