If `abs(z^2-1) =(abs(z))^2+1`, then z lies on

if for the complex numbers z_1 and z_2 abs(1-barz_1z_2)^2-abs(z_1-z_2)^2 = k(1-abs(z_1)^2)(1-abs(z_2)^2) , then k is equal to

If abs(z+1) = z+2 (1+i), then find z

If abs(z_1+z_2) = abs(z_1-z_2) , then the difference in the amplitudes of z_1 and z_2 is

If abs(z) = max{abs(z-2),abs(z+2)} , then

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

If abs(z_1)=abs(z_2)=….....=abs(z_n) = 1 then the value of abs(z_1+z_2+z_3+…....+z_n) =

If abs(z_1) = abs(z_2) , is it necessary that z_1 = z_2 ?

If z_1 and z_2 are two non-zero complex numbers such that abs(z_1+z_2) = abs(z_1)+abs(z_2) , then arg(z_1)-arg(z_2) is equal to

If z=x+iy and abs(z - zi) = 1, then,

If abs(z-3+ i) = 4 then, the locus of z is