IF `(1+i)z=(1-i)z,` then show that `z=-barz`.

z_(1) and z_(2) are two complex number such that |z_(1)|=|z_(2)| and arg (z_(1))+arg(z_(2))=pi , then show that z_(1)=-barz_(2)

If iz^(3)+z^(2)-z+i=0 then show that |z|=1.

If z=x+iy , then show that z barz+2(z+barz)+b=0 where b in R , represents a circle.

If z and we are two complex numbers such that |zw|=1 and arg(z)-arg(w)=(pi)/(2) then show that barzw=-i

Given that z=1-i

If |z_(1)|=1(z_(1) ne -1) and z_(2)=(z_(1)-1)/(z_(1)+1) then show that the real part of z_(2) is zero.

If z=3-2i then show that z^(2)-6z+13=0 Hence find the value of z^(4)-4z^(3)+6z^(2)-4z+17

If (z-1)/(z+1)(z ne-1) is purely imaginary then show that |z|=1

If |z_(1)|=|z_(2)|=....|z_(n)|=1 , then show that, |z_(1)+z_(2)+z_(3)+....z_(n)|= |(1)/(z_(1))+(1)/(z_(2))+(1)/(z_(3))+...+(1)/(z_(n))|

If the complex numbers z_(1) and z_(2) and the origin form an isosceles triangle with vertical angle (2pi)/(3) ,then show that z_(1)^(2)+z_(2)^(2)+z_(1)z_(2)=0.