If z is a complex number, then `( bar( z) ^(-1)) ( bar( z))` is equal to

If z is a nonzero complex number then (bar(z^-1))=(barz)^-1 .

If z is a complex no.,then z^(2)+bar(z)^(2)= represents

If Z is a complex number the radius of zbar(z)-(2+3i)z-(2-3i)bar(z)+9=0 is equal to

If z is a complex number such taht z^(2)=(bar(z))^(2) then find the location of z on the Argand plane.

If z is a complex number and z=bar(z) , then prove that z is a purely real number.

Suppose z is a complex number such that z ne -1, |z| = 1 and arg(z) = theta . Let w = (z(1-bar(z)))/(bar(z)(1+z)) , then Re(w) is equal to

If |z|=1, then (1+z)/(1+bar(z)) is equal to

If z_1 and z_2 unimodular complex number that satisfy z_1^2 + z_2^2 = 4 then (z_1 + bar(z_1))^2 ( z_2 + bar(z_2))^2 is equal to

Suppose z is a complex number such that z ne -1, |z| = 1, and arg(z) = theta . Let omega = (z(1-bar(z)))/(bar(z)(1+z)) , then Re (omega) is equal to