If `1`,`omega`,`omega^2` are the cube roots of unity,then `/_\=|[1,omega^n,omega^n],[omega^n,omega^(2n),1],[omega^(2n),1,omega^n]|`

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

If n ne 3k and 1 , omega , omega ^(2) are the cube roots of units , then Delta =Delta=|(1,omega^(n),omega^(2n)),(omega^(2n),1,omega^(n)),(omega^(n),omega^(2n),1)| has the value

If 1, omega,(omega)^2 are the cube roots of unity, then their product is

If 1,omega,(omega)^2 are the cube roots of unity, then (a+b+c)(a+b(omega)+c(omega)^2)(a+b(omega)^2+c(omega)) =

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

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

Select and write the correct answer from the given alternatives in each of the following:If omega is a cube root of unity,then for the equations |(x+1,omega,omega^2),(omega,x+omega^2,1),(omega^2,1,x+omega)|=0 ,x=

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

If omega is the cube root of unity, prove that (1-omega+omega^2)^6 + (1+omega-omega^2)^6 = 128