Prove the following properties:
Re(z) = `(z + bar(z))/(2)` and Im(z) = `(z - bar(z))/(2i)`

Prove the following properties: z is real if and only if z = bar(z)

Find Re (z) and im (z) if z = 5i^(11) + 7i^(3)

Find the locus of z if Re ((bar(z) + 1)/(bar(z) - i)) = 0.

Prove that following inequalities: |z/(|z|)-1|lt=|a rgz| (ii) |z-1|lt=|z||argz|+||z|-1|

If z = x + iy, then z bar(z) =

For two unimobular complex numbers z_(1) and z_(2) , find [(bar(z)_(1),-z_(2)),(bar(z)_(2),z_(1))]^(-1) [(z_(1),z_(2)),(-bar(z)_(2),bar(z)_(1))]^(-1)

Identify the locus of z if bar z = bar a +(r^2)/(z-a).

Let vertices of an acute-angled triangle are A(z_1),B(z_2),a n dC(z_3)dot If the origin O is he orthocentre of the triangle, then prove that z_1( bar z )_2+( bar z )_1z_2=z_2( bar z )_3+( bar z )_2z_3=z_3( bar z )_1+( bar z )_(3)z_1

Find the radius and centre of the circle z bar(z) - (2 + 3i)z - (2 - 3i)bar(z) + 9 = 0 where z is a complex number

If z_(1)=3-4i , z_(2)=2+i find bar(((z_(1))/(z_(2)))