'\" t .\" Copyright 2002 Walter Harms (walter.harms@informatik.uni-oldenburg.de) .\" and Copyright (C) 2011 Michael Kerrisk .\" .\" SPDX-License-Identifier: GPL-1.0-or-later .\" .TH cacos 3 2023-07-20 "Linux man-pages 6.05.01" .SH NAME cacos, cacosf, cacosl \- complex arc cosine .SH LIBRARY Math library .RI ( libm ", " \-lm ) .SH SYNOPSIS .nf .B #include .PP .BI "double complex cacos(double complex " z ); .BI "float complex cacosf(float complex " z ); .BI "long double complex cacosl(long double complex " z ); .fi .SH DESCRIPTION These functions calculate the complex arc cosine of .IR z . If \fIy\ =\ cacos(z)\fP, then \fIz\ =\ ccos(y)\fP. The real part of .I y is chosen in the interval [0,pi]. .PP One has: .PP .nf cacos(z) = \-i * clog(z + i * csqrt(1 \- z * z)) .fi .SH ATTRIBUTES For an explanation of the terms used in this section, see .BR attributes (7). .TS allbox; lbx lb lb l l l. Interface Attribute Value T{ .na .nh .BR cacos (), .BR cacosf (), .BR cacosl () T} Thread safety MT-Safe .TE .sp 1 .SH STANDARDS C11, POSIX.1-2008. .SH HISTORY glibc 2.1. C99, POSIX.1-2001. .SH EXAMPLES .\" SRC BEGIN (cacos.c) .EX /* Link with "\-lm" */ \& #include #include #include #include \& int main(int argc, char *argv[]) { double complex z, c, f; double complex i = I; \& if (argc != 3) { fprintf(stderr, "Usage: %s \en", argv[0]); exit(EXIT_FAILURE); } \& z = atof(argv[1]) + atof(argv[2]) * I; \& c = cacos(z); \& printf("cacos() = %6.3f %6.3f*i\en", creal(c), cimag(c)); \& f = \-i * clog(z + i * csqrt(1 \- z * z)); \& printf("formula = %6.3f %6.3f*i\en", creal(f), cimag(f)); \& exit(EXIT_SUCCESS); } .EE .\" SRC END .SH SEE ALSO .BR ccos (3), .BR clog (3), .BR complex (7)