Complex number `z_1` and `z_2` satisfy `z+barz=2|z-1|` and arg `(z_1-z_2) = pi/4` . Then the value of lm`(z_1+z_2)` is

Let two distinct complex numbers z_1 and z_2 both satisfy the equation z+ bar(z) = 2 |z-1| and "arg" (z_1 -z_2)=(pi)/(4) , then

If z_(1)andz_(2) both satisfy z+ddot z=2|z-1| and arg(z_(1)-z_(2))=(pi)/(4), then find Im(z_(1)+z_(2))

If z_(1) and z_(2) both satisfy the relation z+bar(z)=2|z-1| and arg(z_(1)-z_(2))=(pi)/(4) then Im(z_(1)+z_(2)) equals

The complex number z satisfying |z+1|=|z-1| and arg (z-1)/(z+1)=pi/4 , is

If |z_(1)|=|z_(2)| and arg (z_(1)//z_(2))=pi, then find the of z_(1)z_(2).

If z_(1) and z_(2) are two non-zero complex number such that |z_(1)z_(2)|=2 and arg(z_(1))-arg(z_(2))=(pi)/(2) ,then the value of 3iz_(1)z_(2)

If |z_1| = |z_2| and "arg" (z_1) + "arg" (z_2) = pi//2, , then

If |z_1-1|=Re(z_1),|z_2-1|=Re(z_2) and arg (z_1-z_2)=pi/3, then Im (z_1+z_2) =

Let z_1 and z_2 be two complex numbers satisfying |z_1|=9 and |z_2-3-4i|=4 Then the minimum value of |z_1-Z_2| is

If z_1, z_2 are two complex numbers (z_1!=z_2) satisfying |z1^2-z2^2|=| z 1^2+ z 2 ^2-2( z )_1( z )_2| , then a. (z_1)/(z_2) is purely imaginary b. (z_1)/(z_2) is purely real c. |a r g z_1-a rgz_2|=pi d. |a r g z_1-a rgz_2|=pi/2