asinh
Compute the hyperbolic arcsine of an input real number.
Interface Definition
C interface:
float asinhf(float x);
double asinh(double x);
long double asinhl(long double x);
Fortran interface:
RES = ASINHF(X);
RES = ASINH(X);
Parameters
Parameter |
Type |
Description |
Input/Output |
|---|---|---|---|
x |
|
Floating-point value of the input data. |
Input |
Return Value
- The hyperbolic arcsine y of radian angle x is returned.
- If the input is ±0, the return value is ±0.
- If the input is ±∞, the return value is ±∞.
- If the input is NaN, the return value is NaN.
Dependency
C: "km.h"
Examples
C interface:
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 | double pi = acos(-1); // typical usage double a = pi/6, b = 1.0, c = -3*pi/4, d = pi/3; // special handling double e = INFINITY, f = -INFINITY, g = NAN; // print result printf("asinh(pi/6) = %.15f\n", asinh(a)); printf("asinh(1.0) = %.15f\n", asinh(b)); printf("asinh(-3*pi/4) = %.15f\n", asinh(c)); printf("asinh(pi/3) = %.15f\n", asinh(d)); printf("asinh(INFINITY) = %.15f\n", asinh(e)); printf("asinh(-INFINITY) = %.15f\n", asinh(f)); printf("asinh(NAN) = %.15f\n", asinh(g)); /* * asinh(pi/6) = 0.502218985034611 * asinh(1.0) = 0.881373587019543 * asinh(-3*pi/4) = -1.592457372858543 * asinh(pi/3) = 0.914356655392886 * asinh(INFINITY) = inf * asinh(-INFINITY) = -inf * asinh(NAN) = nan * * */ |
Fortran interface:
REAL(8) :: X = 1.0
PRINT*, ASINH(X)
!
! OUTPUT
! 0.881373587019543
!
Parent topic: Hyperbolic Functions