The modulus of the complex number z such that `abs(z+3-i) = 1` and `argz = pi` is equal to

The conjugate of the complex number z is frac{1}{i-1} then z=

Let z and omega be complex numbers such that barz+ibar(omega) = 0 and arg(zomega) = pi then arg(z) equals to

If z_1 = a+ib and z_2 = c+id are complex numbers such that abs(z_1) = abs(z_2) = 1 and Re(z_1barz_2) = 0 , then the pair of complex numbers w_1 = a+ic and w_2 = b+id satisfies

Find z, if abs(z) = 4 and arg(z)=5 pi/6

Find the argument and modulus of the complex number z=1+i sqrt 3

The amplitude of the complex number z = sinalpha+i(1-cosalpha) is

Find the modulus and argument of the complex number (1 + 2i )/(1 - 3i).

Find the modulus and amplitude of each complex number: -3i

Prove that the points representing the complex number z for which abs(z+3)^2 - abs(z-3)^2 = 26 lie on a line