If `frac{z-i}{z+i}(z ne -i)` is a purely imaginary number, then `z.barz` is equal to

If ( frac{z-1}{z+1} ) is a purely imaginary number (z != -1), then find the value of abs(z)

If frac{2z_1}{3z_2} is a purely imaginary number, then abs(frac{z_1-z_2}{z_1+z_2}) =

Show that z= frac{5}{(1-i)(2-i)(3-i)} is purely imaginary number

If z is purely real and Re(z) < 0, then Arg(z) is

If z is a complex number such that frac{z-1}{z+1} is purely imaginary, then

If z = e^frac{i4pi}{3} , then (z^192+z^194)^3 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 z= frac{7-i}{3-4i} , then z^14 = …...

If z=(-1-i) , then arg z =

Select and write the correct answer from the given alternatives in each of the following: If z is any complex number, then (z - bar z) / (2i) is