With `1,omega,omega^(2)` as cube roots of unity, inverse of which of the following matrices exists?

Cube roots of unity are in

1, omega, omega^(2) are cube roots of unit x, then their product is

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

If 1 , omega , omega^(2) are cube roots of unity , then for alpha , beta , gamma , delta in R , (alpha+betaomega+gammaomega^(2)+deltaomega^(3))/(beta+alphaomega^(2)+gammaomega+deltaomega^(2)) equals :

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

If w is a complex cube-root of unity then,

Elements of a matrix A of order 10xx10 are defined as a_("ij")=omega^(i+j) (where omega is imaginary cube root of unity), then trace (A) of the matrix is

If 1, omega, omega^(2) are the three cube roots of unity and alpha, beta, gamma are the cube roots of p, plt0 , then for any x, y, z the expression (x alpha+y beta+z gamma)/(x beta+y gamma+z alpha)=

If 1, omega,omega^2 are the cube roots of unity the value of (1 - omega + omega^2)^5 + ( 1 + omega - omega^2)^5 is equal to