If `z_1=a + ib and z_2 = c + id` are complex numbers such that `|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

If z_1=a + ib and z_2 = c + id are complex numbers such that |z_1|=|z_2|=1 and Re(z_1 bar z_2)=0 , then the pair ofcomplex nunmbers omega_1=a+ic and omega_2=b+id satisfies

If z_1=a + ib and z_2 = c + id are complex numbers such that |z_1|=|z_2|=1 and Re(z_1 bar z_2)=0 , then the pair of complex numbers omega_1=a+ic and omega_2=b+id satisfies a. |omega_(1)|=1 b. |omega_(2)|=1 c. Re(omega_(1)baromega_(2))=0 d. None of these

If z_1=a+ib and z_2=c+id are complex numbers such that abs(z_1)=abs(z_2)=1 and Re(z_1barz_2)=0 , then the pair of complex numbers omega_1=a+ic and omega_2=b+id satisfies:

If z_1=a+ib and z_2=c+id are complex numbes such that |z_1|=|z_2|=1 and Re(z_1barz_2)=0 then the pair of complex numbers omega_1= a+ic and omega_2=b+id satisfy which of the following relations? (A) |omega_1|=1 (B) |omega_2|=1 (C) Re(omega_1 baromega_2)=0 (D) Im(omega_1baromega_2)=0

If z_1 = a+ib and z_2 = c+id are complex numbers such that abs(z_1) = abs(z_2) = 1 and Re(z_1barz_2) = 0 , then the pair of complex numbers w_1 = a+ic and w_2 = b+id satisfies

If z_(1) = a + ib " and " z_(2) + c id are complex numbers such that |z_(1)| = |z_(2)| = 1 and Re (z_(1)bar (z)_(2)) = 0 , then the pair of complex numbers w_(1) = a + ic " and " w_(2) = b id satisfies :

If z_(1) = a + ib " and " z_(2) + c id are complex numbers such that |z_(1)| = |z_(2)| = 1 and Re (z_(1)bar (z)_(2)) = 0 , then the pair of complex numbers w_(1) = a + ic " and " w_(2) = b id satisfies :

If z 1 ​ =a+ib and z 2 ​ =c+id are complex numbers such that ∣z 1 ​ ∣=∣z 2 ​ ∣=1 and Re(z 1 ​ z 2 ​ ​ )=0, then the pair of complex numbers w 1 ​ =a+ic and w 2 ​ =b+id satisfy

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

If z_1 + a_1 + ib_1 and z_2 = a_2 + ib_2 are complex such that |z_1| = 1, |z_2|=2 and "Re" (z_1 z_2)=0 , then the pair of complex numbers omega_(1) = a_(1) = (ia_2)/(2) and omega_(2) = 2b_(1) + ib_(2) satisfy.