The maximum value of |z| when z satisfies the condition `|z+(2)/(z)|=2` is

If z=1+i , then the argument of z^(2)e^(z-i) is

If z_(1) and z_(2) are two complex numbers satisfying the equation |(z_(1) + iz_(2))/(z_(1)-iz_(2))|=1 , then (z_(1))/(z_(2)) is

Which will have the maximum value of electron affinity O^(X),O^(Y),O^(Z) (X, Y, Z respectively are 0, -1 and -2)

Consider the following system of linear equations, x+y+z=6 , x-y+z=2 , 2x+y+z=1 Find the value of x,y and z satisfying the above equation.

When |z|=1 , the point 1+2z lie on a

Let the complex number z satisfy the equation |z+4i|=3 . Then the greatest and least values of |z+3| are

If (pi)/(3) and (pi)/(4) are argument of z_(1) and bar(z)_(2) then the value of arg (z_(1)z_(2)) is

Consider the complex number z_1 = 3+i and z_2 = 1+i .What is the conjugate of z_2 ?