Find the maximum value of `abs(z)` when `abs(z-frac{3}{z}) = 2`, `z` being a complex number

The maximum value of abs(z) when z satisfies the condition abs(z-frac{2}{z}) = 2

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

If z=x+iy then abs(frac{z-1}{z+1}) =1 represents

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

The value of abs(z-5) , if z = x+iy is

The congugate of a complex number z is frac{1}{i-1} ,then the complex number 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

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

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

If abs(z) =5 and w = frac{z-5}{z+5} , then Re(w) is equal to