If `(z)_(1)=2-i`, `(z)_(2)=1+i`, find `|((z)_(1)+(z)_(2)+1)/((z)_(1)-(z)_(2)+1)|`

Let z_(1) and z_(2) be complex numbers satisfying |z_(1)|=|z_(2)|=2 and |z_(1)+z_(2)|=3 . Then |(1)/(z_(1))+(1)/(z_(2))|=

If z_1=2-i,z_2=1+i Hence find abs[(z_1+z_2+1)/(z_1-z_2+i)]

If z_(1)=2+3i and z_(2)=3+2i , then |z_(1)+z_(2)| is equal to

Let z_1=2-i, z_2=-2+i . Find Re ((z_1z_2)/overlinez_1)

Let z_(1) = 3 + 4i and z_(2) = - 1 + 2i . Then, |z_(1) + z_(2)|^(2) - 2(|z_(1)|^(2) + |z_(2)|^(2)) is equal to

For two unimodular complex numbers Z_(1) and Z_(2), [(bar(z_(1)),-z_(2)),(bar(z_(2)),z_(1))]^(-1)[(z_(1),z_(2)),(-bar(z_(2)),bar(z_(1)))]^(-1) is equal to a) [(z_(1),z_(2)),(bar(z)_(1),bar(z)_(2))] b) [(1,0),(0,1)] c) [(1//2,0),(0,1//2)] d)None of these

Let z_1=2-i, z_2=-2+i . Find Im (1/(z_1overlinez_1))