If `k>0`, `|z|=|w|=k`, and `alpha=(z-bar(w))/(k^2+zbar(w))`, `Re(alpha)`

If k>0,|z|=backslash w backslash=k, and alpha=(z-bar(w))/(k^(2)+zbar(w)) then Re(alpha)(A)0(B)(k)/(2)(C)k(D) None of these

Let z and w are two non zero complex number such that |z|=|w|, and Arg(z)+Arg(w)=pi then (a) z=w( b) z=bar(w)(c)bar(z)=bar(w)(d)bar(z)=-bar(w)

If |z|=k and omega=(z-k)/(z+k) , then Re (omega) =

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

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 and omega=(z-1)/(z+1) (where z in -1 ), then Re (omega) is

If z and w are two complex number such that |zw|=1 and arg(z)arg(w)=(pi)/(2), then show that bar(z)w=-i

If z_(1)=a+ib and z_(2)=c+id are complex numbers such that Re(z_(1)bar(z)_(2))=0, then the |z_(1)|=|z_(2)|=1 and Re(z_(1)bar(z)_(2))=0, then the pair ofcomplex nunmbers omega=a+ic and omega_(2)=b+id satisfies

Let zandw be two nonzero complex numbers such that |z|=|w| andarg (z)+arg(w)=pi Then prove that z=-bar(w) .