If `|z|=1` and `w=(z-1)/(z+1)` (where `z!=-1),` then `R e(w)` is

If |z|=1, prove that (z-1)/(z+1) (z ne -1) is purely imaginary number. What will you conclude if z=1?

If z and w are two non-zero complex numbers such that |zw|=1 and Arg (z) -Arg (w) =pi/2 , then bar z w is equal to :

If w= z/(z-i1/3) and |w|=1,then z lies on:

If |z|=1 and z!=1, then all the values of z/(1-z^2) lie on

If z = x + iy and w=(1-iz)/(z-i) , show that : |w|=1 implies z is purely real.

Let z and omega be complex numbers. If Re(z) = |z-2| , Re(omega) = |omega - z| and arg(z - omega) = pi/3 , then the value of Im(z+w) , is

The complex numbers z_(1),z_(2),z_(3) stisfying (z_(2)-z_(3))=(1+i)(z_(1)-z_(3)).where i=sqrt(-1), are vertices of a triangle which is

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_1=a + ib and z_2 = c + id are complex numbers such that |z_1|=|z_2|=1 and Re(z_1 bar z_2)=0 , then the pair of complex numbers omega_1=a+ic and omega_2=b+id satisfies a. |omega_(1)|=1 b. |omega_(2)|=1 c. Re(omega_(1)baromega_(2))=0 d. None of these

If |z_(1)|=|z_(2)| and arg (z_(1)//z_(2))=pi, then z 1 ​ +z 2 ​ is equal to