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 )......3), catan (3), catanh (3), ccos (3), ccosh (3), cerf (3), cexp (3), cexp2 (3), cimag (3), clog (3), clog10 (3), clog2 (3), conj (3), cpow (3), cproj (3), creal (3), csin (3), cs…...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…