natural logarithm of a complex number NAME clog, clogf, clogl - natural logarithm of a complex number LIBRARY Math library ( libm , -lm )...base-10 logarithm of a complex number NAME clog10, clog10f, clog10l - base-10 logarithm of a complex number LIBRARY Math library ( libm ,...base-10 logarithm of a complex number NAME clog10, clog10f, clog10l - base-10 logarithm of a complex number LIBRARY Math library ( libm ,...base-10 logarithm of a complex number NAME clog10, clog10f, clog10l - base-10 logarithm of a complex number LIBRARY Math library ( libm ,...base-2 logarithm of a complex number NAME clog2, clog2f, clog2l - base-2 logarithm of a complex number LIBRARY Math library ( libm , -lm...base-2 logarithm of a complex number NAME clog2, clog2f, clog2l - base-2 logarithm of a complex number LIBRARY Math library ( libm , -lm...base-2 logarithm of a complex number NAME clog2, clog2f, clog2l - base-2 logarithm of a complex number LIBRARY Math library ( libm , -lm...natural logarithm of a complex number NAME clog, clogf, clogl - natural logarithm of a complex number LIBRARY Math library ( libm , -lm )...natural logarithm of a complex number NAME clog, clogf, clogl - natural logarithm of a complex number LIBRARY Math library ( libm , -lm )......tan(y) . The real part of y is chosen in the interval [-pi/2, pi/2]. One has: catan(z) = (clog(1 + i * z) - clog(1 - i * z)) / (2 * i) ATTRIBUTES For an explanation of the terms…...tan(y) . The real part of y is chosen in the interval [-pi/2, pi/2]. One has: catan(z) = (clog(1 + i * z) - clog(1 - i * z)) / (2 * i) ATTRIBUTES For an explanation of the terms…...tan(y) . The real part of y is chosen in the interval [-pi/2, pi/2]. One has: catan(z) = (clog(1 + i * z) - clog(1 - i * z)) / (2 * i) ATTRIBUTES For an explanation of the terms…...e 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)) ATTRIBUTES For an explanation of the terms used in this sect…...e 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)) ATTRIBUTES For an explanation of the terms used in this sect…...e 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)) ATTRIBUTES For an explanation of the terms used in this sect…...= ccos(y) . The real part of y is chosen in the interval [0,pi]. One has: cacos(z) = -i * clog(z + i * csqrt(1 - z * z)) ATTRIBUTES For an explanation of the terms used in this …...= ccos(y) . The real part of y is chosen in the interval [0,pi]. One has: cacos(z) = -i * clog(z + i * csqrt(1 - z * z)) ATTRIBUTES For an explanation of the terms used in this …...= ccos(y) . The real part of y is chosen in the interval [0,pi]. One has: cacos(z) = -i * clog(z + i * csqrt(1 - z * z)) ATTRIBUTES For an explanation of the terms used in this …...in(y) . The real part of y is chosen in the interval [-pi/2,pi/2]. One has: casin(z) = -i clog(iz + csqrt(1 - z * z)) ATTRIBUTES For an explanation of the terms used in this sec…...in(y) . The real part of y is chosen in the interval [-pi/2,pi/2]. One has: casin(z) = -i clog(iz + csqrt(1 - z * z)) ATTRIBUTES For an explanation of the terms used in this sec…