Let z be a complex number such that the imaginary part of z is non-zero and `a=z^(2)+z+1` is real. Then, a cannot take the value

Let z be a complex number such that the imaginary part of z is nonzero and a = z^(2) + z+z+1 is real. Then a cannot take the value.

For any complex number z, the minimum value of |z|+|z-1| is :

If z is a complex number such that |z|geq2 , then the minimum value of |z+1/2|

The number of complex numbers z such that |z-1|=|z+1|=|z-i| is

If z is any complex number, prove that : |z|^2= |z^2| .

Let z and w be two complex numbers such that |z|le1, |w|le1 and |z-iw|=|z-i bar w|=2 , then z equals :

If z is purely real number such that Re(z)<0 , then argument (z) is equal to:

Let z_1=10+6i and z_2=4+6idot If z is any complex number such that the argument of ((z-z_1))/((z-z_2)) is pi/4, then prove that |z-7-9i|=3sqrt(2) .

Let z and w be two non-zero complex numbers such that ∣z∣=∣w∣ and arg(z)+arg(w)=π, then z equals

If Z is a complex number, then |Z-8| lt= |Z-2|implies: