The locus of the point representing the complex number z for which `abs(z+3)^2-abs(z-3)^2 = 15` is

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

The values of z for which abs(z+i)=abs(z-i) are

For any non zero complex number z, the minimum value of abs(z)+abs(z-1) is

If the real part of frac{bar z + 2}{bar z -1} is 4, then show that the locus of the point representing z in the complex plane is a circle.

If z is a complex number, then (bar(z^-1))(bar(z)) =

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

If z_1 and z_2 are any complex numbers, then abs(z_1+z_2)^2+abs(z_1-z_2)^2 is equal to

If the imaginary part of frac{2z+1}{iz+1} is -2 , then the locus of the point representing z in the complex plane is

If z ne 1 and frac{z^2}{z-1} is real, then the point represented by the complex number z lies

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