Number of imaginergy complex numbers satisfying the equation, `z^(2)=barz*2^(1-|z|)` is

The complex number z which satisfies the Equation |(i+z)/(i-z)|=1 lies on

Number of solutions of the equation z^(2)+|z|^(2)=0 is

If z_(1),z_(2) are two complex numbers satisfying the equation : |(z_(1)-z_(2))/(z_(1)+z_(2))|=1 , then (z_(1))/(z_(2)) is a number which is

Let z be a complex number satisfying the equation z^(2)-(3+i)z+lambda+2i=0, whre lambdain R and suppose the equation has a real root , then find the non -real root.

If z is a complex number then

All complex numers z, which satisfy the equation |(z-i)/(z+i)|=1 lie on the

All complex number z which satisfy the equation |(z-6 i)/(z+6 i)|=1 lie on the

The complex number z , which satisfies the condition |(1+z)/(1-z)|=1 lies on

If z is a complex number satisfying z^(4)+z^(3)+2 z^(2)+z+1=0 then |z|=

Let omega be the complex number cos (2 pi)/(3)+i sin (2 pi)/(3) . Then the number of distinct complex number z satisfying [[z+1,omega,omega^(2)],[omega,z+omega^2,1],[omega^(2),1,z+omega]] = 0 is equal to