Let `z` and `omega` be two complex numbers such that `|z|=1` and `(omega-1)/(omega+1)=((z-1)/(x+1))^(2)`. Then the maximum value of `|omega + 1|` is

Let z and omega be two complex numbers such that |z|=1 and (omega-1)/(omega+1) = ((z-1)^2)/(z+1)^2 then value of |omega-1| +|omega+1| is equal to____________

Let Z and w be two complex number such that |zw|=1 and arg(z)-arg(w)=pi/2 then

Let z and w be two complex numbers such that |Z|<=1,|w|<=1 and |z+iw|=|z-ibar(w)|=2

Let z and omega be two non-zero complex numbers, such that |z|=|omega| and "arg"(z)+"arg"(omega)=pi . Then, z equals

Let z and omega be two complex numbers such that |z|<=1,| omega|<=1 and |z+omega|=|z-1vec omega|=2 Use the result |z|^(2)=zz and |z+omega|<=|z|+| omega|

Suppose z and omega are two complex number such that |z|leq1 , |omega|leq1 and |z+iomega|=|z-ibar omega|=2 The complex number of omega can be