# cargf(3) [freebsd man page]

ATAN2(3) BSD Library Functions Manual ATAN2(3)NAME

atan2, atan2f, atan2l, carg, cargf, carglarc tangent and complex phase angle functions--LIBRARY

Math Library (libm, -lm)SYNOPSIS

#include <math.h> double atan2(double y, double x); float atan2f(float y, float x); long double atan2l(long double y, long double x); #include <complex.h> double carg(double complex z); float cargf(float complex z); long double cargl(long double complex z);DESCRIPTION

The atan2(), atan2f(), and atan2l() functions compute the principal value of the arc tangent of y/x, using the signs of both arguments to determine the quadrant of the return value. The carg(), cargf(), and cargl() functions compute the complex argument (or phase angle) of z. The complex argument is the number theta such that z = r * e^(I * theta), where r = cabs(z). The call carg(z) is equivalent to atan2(cimag(z), creal(z)), and similarly for cargf() and cargl().RETURN VALUES

The atan2(), atan2f(), and atan2l() functions, if successful, return the arc tangent of y/x in the range [, +pi] radians. Here are some of the special cases: atan2(y, x) := atan(y/x) if x > 0, sign(y)*(pi - atan(|y/x|)) if x < 0, 0 if x = y = 0, or sign(y)*pi/2 if x = 0 != y.-piNOTES

The function atan2() defines "if x > 0," atan2(0, 0) = 0 despite that previously atan2(0, 0) may have generated an error message. The rea- sons for assigning a value to atan2(0, 0) are these: 1. Programs that test arguments to avoid computing atan2(0, 0) must be indifferent to its value. Programs that require it to be invalid are vulnerable to diverse reactions to that invalidity on diverse computer systems. 2. The atan2() function is used mostly to convert from rectangular (x,y) to polar (r,theta) coordinates that must satisfy x = r*cos theta and y = r*sin theta. These equations are satisfied when (x=0,y=0) is mapped to (r=0,theta=0). In general, conversions to polar coordinates should be computed thus: r := hypot(x,y); ... := sqrt(x*x+y*y) theta := atan2(y,x). 3. The foregoing formulas need not be altered to cope in a reasonable way with signed zeros and infinities on a machine that conforms to IEEE 754; the versions of hypot(3) and atan2() provided for such a machine are designed to handle all cases. That is why atan2(+-0, -0) = +-pi for instance. In general the formulas above are equivalent to these: r := sqrt(x*x+y*y); if r = 0 then x := copysign(1,x);SEE ALSO

acos(3), asin(3), atan(3), cabs(3), cos(3), cosh(3), math(3), sin(3), sinh(3), tan(3), tanh(3)STANDARDS

The atan2(), atan2f(), atan2l(), carg(), cargf(), and cargl() functions conform to ISO/IEC 9899:1999 (``ISO C99'').BSD

July 31, 2008 BSD

## Check Out this Related Man Page

ATAN2(3) BSD Library Functions Manual ATAN2(3)NAME

atan2, atan2farc tangent function of two variables--LIBRARY

Math Library (libm, -lm)SYNOPSIS

#include <math.h> double atan2(double y, double x); float atan2f(float y, float x);DESCRIPTION

The atan2() and atan2f() functions compute the principal value of the arc tangent of y/x, using the signs of both arguments to determine the quadrant of the return value.RETURN VALUES

The atan2() function, if successful, returns the arc tangent of y/x in the range [, +pi] radians. If both x and y are zero, the global variable errno is set to EDOM. On the VAX: atan2(y, x) := atan(y/x) if x > 0, sign(y)*(pi - atan(|y/x|)) if x < 0, 0 if x = y = 0, or sign(y)*pi/2 if x = 0 y.-piNOTES

The function atan2() defines "if x > 0," atan2(0, 0) = 0 on a VAX despite that previously atan2(0, 0) may have generated an error message. The reasons for assigning a value to atan2(0, 0) are these: 1. Programs that test arguments to avoid computing atan2(0, 0) must be indifferent to its value. Programs that require it to be invalid are vulnerable to diverse reactions to that invalidity on diverse computer systems. 2. The atan2() function is used mostly to convert from rectangular (x,y) to polar (r,theta) coordinates that must satisfy x = r*cos theta and y = r*sin theta. These equations are satisfied when (x=0,y=0) is mapped to (r=0,theta=0) on a VAX. In general, conver- sions to polar coordinates should be computed thus: r := hypot(x,y); ... := sqrt(x*x+y*y) theta := atan2(y,x). 3. The foregoing formulas need not be altered to cope in a reasonable way with signed zeros and infinities on a machine that conforms to IEEE 754; the versions of hypot(3) and atan2() provided for such a machine are designed to handle all cases. That is why atan2(+-0, -0) = +-pi for instance. In general the formulas above are equivalent to these: r := sqrt(x*x+y*y); if r = 0 then x := copysign(1,x);SEE ALSO

acos(3), asin(3), atan(3), cos(3), cosh(3), math(3), sin(3), sinh(3), tan(3), tanh(3)STANDARDS

The atan2() function conforms to ANSI X3.159-1989 (``ANSI C89'').BSD

May 2, 1991 BSD