If`w =|z|^2 +iz^2` , where z is a nonzero complex number then

The nonzero complex number Z satisfying Z=iZ^(2) is

If |z + omega|^(2) = |z|^(2)+|omega|^(2) , where z and omega are complex numbers , then

If |z + omega|^(2) = |z|^(2)+|omega|^(2) , where z and omega are complex numbers , then

z_(1) and z_(2) are the roots of the equation z^(2) -az + b=0 where |z_(1)|=|z_(2)|=1 and a,b are nonzero complex numbers, then

z_(1) and z_(2) are the roots of the equaiton z^(2) -az + b=0 where |z_(1)|=|z_(2)|=1 and a,b are nonzero complex numbers, then

z_(1) and z_(2) are the roots of the equaiton z^(2) -az + b=0 where |z_(1)|=|z_(2)|=1 and a,b are nonzero complex numbers, then

Let |z|=2and w=(z+1)/(z-1),where z ,w , in C (where C is the set of complex numbers). Then product of least and greatest value of modulus of w is__________.

Let |z|=2and w=(z+1)/(z-1),where z ,w , in C (where C is the set of complex numbers). Then product of least and greatest value of modulus of w is__________.

Find the non-zero complex numbers z satisfying z=iz^(2)

for the equation 10z^(2)-4iz-m where z is complex number then find which of the following is true