If `omega` is a complex cube roots of unity then show that following. `(3 + 5omega + 3omega^2)^6 = 64`

If omega is a complex cube roots of unity then show that following. (a + b)^3 + (aomega + bomega^2)^3 + (aomega^2 + bomega)^3 = 3(a^3 + b^3)

If omega is a complex cube roots of unity then show that following. (1 + omega - omega^2) ( 1 - omega + omega^2) = 4

If omega is a complex cube roots of unity then show that following. (x - y) (xomega - yomega^2) (xomega^2 - yomega) = x^3 - y^3

If omega is a complex cube roots of unity then show that following. (a + 2b)^2 + (aomega + 2bomega^2)^2 +(aomega^2 + 2bomega)^2 = 12ab

If omega is a complex cube root of unity, then show that: (1 + omega)^3 - (1 + omega^2)^3 = 0

If omega is a complex cube root of unity, then show that: (1 + omega - omega^2)^6 = 64

If omega is a complex cube root of unity, then show that: (2 - omega) (2 - omega^2) = 7

If omega is a complex cube root of unity, then (1+omega^2)^4=

If omega is a complex cube root of unity, then show that: (3 + 3omega + 5omega^2)^6 - (2 + 6omega + 2omega^2)^3 = 0

If omega is a complex cube root of unity, then show that: (a - b) (a - bomega) (a - bomega^2) = a^3 - b^3