Let `barz_1 and barz_2` two complex number show that `barz_1=ibarz_2` and `arg(z_1/barz_2)=pi` then find the argument of `z_1 and z_2`

Let z_(1) and z_(2) be two complex numbers such that bar(z)_(1)+bar(iz)_(2)=0 and arg(z_(1)z_(2))=pi then find arg(z_(1))

Let z,w be complex numbers such that barz+ibarw=0 and arg zw=pi Then argz equals

Solve: z +2barz=ibarz

If z_1 and z_2 are two complex numbers such that |(barz_1-2barz_2)(2-z_1barz_2)|=1 then (A) |z_1|=1, if |z_2|!=1 (B) |z_1|=2, if |z_2|!=1 (C) |z_2|=2, if |z_1|!=1 (D) |z_2|=1, if |z_1|!=2

Complex number z_1 and z_2 satisfy z+barz=2|z-1| and arg (z_1-z_2) = pi/4 . Then the value of lm (z_1+z_2) is

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

Find the complex number z if zbarz = 2 and z + barz=2

Find the complex number z if z^2+barz =0

Find all complex numbers satisfying barz = z^2 .