NAME¶

catanh, catanhf, catanhl - complex arc tangents hyperbolic

SYNOPSIS¶

#include <complex.h>

double complex catanh(double complex z);
float complex catanhf(float complex z);
long double complex catanhl(long double complex z);

Link with -lm.

DESCRIPTION¶

The catanh() function calculates the complex arc hyperbolic tangent of z. If y = catanh(z), then z = ctanh(y). The imaginary part of y is chosen in the interval [-pi/2,pi/2].

One has:

    catanh(z) = 0.5 * (clog(1 + z) - clog(1 - z))

VERSIONS¶

These functions first appeared in glibc in version 2.1.

CONFORMING TO¶

C99.

EXAMPLE¶

/* Link with "-lm" */
#include <complex.h>
#include <stdlib.h>
#include <unistd.h>
#include <stdio.h>
int
main(int argc, char *argv[])
{


    double complex z, c, f;


    if (argc != 3) {


        fprintf(stderr, "Usage: %s <real> <imag>\n", argv[0]);


        exit(EXIT_FAILURE);


    }


    z = atof(argv[1]) + atof(argv[2]) * I;


    c = catanh(z);


    printf("catanh() = %6.3f %6.3f*i\n", creal(c), cimag(c));


    f = 0.5 * (clog(1 + z) - clog(1 - z));


    printf("formula  = %6.3f %6.3f*i\n", creal(f2), cimag(f2));


    exit(EXIT_SUCCESS);
}

SEE ALSO¶

atanh(3), cabs(3), cimag(3), ctanh(3), complex(7)

COLOPHON¶

This page is part of release 3.53 of the Linux man-pages project. A description of the project, and information about reporting bugs, can be found at http://www.kernel.org/doc/man-pages/.