If `w=alpha+ibeta` where `Beta 0 ` and `z ne 1` satisfies the condition that `((w- bar wz)/(1-z))` is purely real then the set of values of z is

If w=alpha+ibeta where beta ne 0 and z ne 1 satisfies the condition that ((w- bar wz)/(1-z)) is purely real then the set of values of z is

If w=alpha+i beta, where beta!=0 and z!=1 satisfies the condition that ((w-wz)/(1-z)) is a purely real,then the set of values of z is |z|=1,z!=2( b) |z|=1 and z!=1z=z(d) None of these

If ((z-1)/(z+1)) is purely an imaginary number and z ne -1 then find the value of |z|.

If z=x+iy and w=(1-iz)/(z-i), show that |w|=1o+_(z) is purely real.

If z=x+iy and w=(1-iz)/(z-i), then show that |w|1hat boldsymbol varphi_(z) is purely real.

If (z-1)/(z+1) is a purely imaginary number (z ne - 1) , then find the value of |z| .

z_(1),z_(2) satisfy |z8|=3 and (z_(1))/(z_(2)) is purely real and positive then |z_(1)z_(2)|=

If w=(z)/(z-(1)/(3)i) and |w|=1, then z lies on