1.If zzz and www are two complex numbers such that ∣zw∣=1|zw| = 1∣zw∣=1 and arg(z)−arg(w)=π2\arg(z) - \arg(w) = \dfrac{\pi}{2}arg(z)−arg(w)=2π, then:a.zˉw=1−i2\bar{z}w = \dfrac{1 - i}{\sqrt{2}}zˉw=21−ib.zˉw=i\bar{z}w = izˉw=ic.zˉw=−1+i2\bar{z}w = \dfrac{-1 + i}{\sqrt{2}}zˉw=2−1+id.zˉw=−i\bar{z}w = -izˉw=−iLogin to continueOnly logged in users canattempt or see the solution.