For complex number `z =3 -2i,z + bar z = 2i Im(z)` .

For complex number z = 5 + 3i value z -barz=10 .

For any complex numbers z_1,z_2 and z_3, z_1Im(bar(z_2)z_3) +z_2Im(bar(z_3)z_1) + z_3 Im(bar(z_1)z_2) is

Numbers of complex numbers z, such that abs(z)=1 and abs((z)/bar(z)+bar(z)/(z))=1 is

A complex number z is said to be unimodular if abs(z)=1 . Suppose z_(1) and z_(2) are complex numbers such that (z_(1)-2z_(2))/(2-z_(1) bar z_(2)) is unimodular and z_(2) is not unimodular. Then the point z_(1) lies on a

Multiplicative inverse of complex number z = 2 - 3i is ............

Let A,B and C be three sets of complex numbers as defined below: {:(,A={z:Im(z) ge 1}),(,B={z:abs(z-2-i)=3}),(,C={z:Re(1-i)z)=sqrt(2)"where" i=sqrt(-1)):} Let z be any point in A cap B cap C . Then, abs(z+1-i)^(2)+abs(z-5-i)^(2) lies between

Let A,B and C be three sets of complex numbers as defined below: {:(,A={z:Im(z) ge 1}),(,B={z:abs(z-2-i)=3}),(,C={z:Re(1-i)z)=3sqrt(2)"where" i=sqrt(-1)):} Let z be any point in A cap B cap C " and " omega be any point satisfying abs(omega-2-i) lt 3 . Then, abs(z)-abs(omega)+3 lies between

Show that the area of the triagle on the argand plane formed by the complex numbers Z, iz and z+iz is (1)/(2)|z|^(2)," where "i=sqrt(-1).

For any two complex numbers z_(1) and z_(2) , prove that Re ( z_(1)z_(2)) = Re z_(1) Re z_(2)- 1mz_(1) Imz_(2)