`1, omega, omega^2` are the cube roots of unity then `(2-omega)(2-omega^2)(2-omega^13)(2-omega^17)`

If 1, omega, omega ^(2) are the cube roots of unity , then w^2=

if 1,omega, omega^2 are the cube roots of unity then the value of (2-omega)(2-omega^2)(2-omega^(10))(2-omega^(11))=

If 1 , omega and (omega)^2 are the cube roots of unity, then (1-omega+(omega)^2)(1-(omega)^2+(omega)^4)….......upto 8 terms is

If 1,omega,omega^(2) are three cube roots of unity, then (1-omega+omega^(2))(1+omega-omega^(2)) is

If 1,omega,(omega)^2 are the cube roots of unity, then (omega)^2(1+omega)^3-(1+(omega)^2)omega=

If omega is a complex cube root of unity, then (2-omega)(2-(omega)^2)(2-(omega)^10)(2-(omega)^11) is

If 1 , omega , omega^(2) are the cube roots of unity, then prove that (2 - omega)(2 -omega^(2)) (2 - omega^(10)) ( 2 - omega^(11)) = 49 .

If 1,omega,omega^(2) are cube roots of unity then 1,omega,omega^(2) are in