| ATAN2(3) | Library Functions Manual | ATAN2(3) |
atan2, atan2f,
atan2l — arc tangent
function of two variables
Math Library (libm, -lm)
#include
<math.h>
double
atan2(double
y, double x);
float
atan2f(float
y, float x);
long double
atan2l(long
double y, long double
x);
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 atan2() function, if successful,
returns the arc tangent of y/x
in the range [-pi, +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. |
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:
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.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,
conversions to polar coordinates should be computed thus:
r := hypot(x,y); ... := sqrt(x∗x+y∗y) theta := atan2(y,x).
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);
acos(3), asin(3), atan(3), cos(3), cosh(3), math(3), sin(3), sinh(3), tan(3), tanh(3)
The atan2() function conforms to
ISO/IEC 9899:1999
(“ISO C99”).
| January 29, 2013 | NetBSD 11.0 |