If `omega ` is a complex cube root of unity , then the matrix ` A = [(1,omega^(2),omega),(omega^(2),omega,1),(omega,1,omega^(2))] ` is a :

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

If omega is an imaginary cube root of unity ,then the value of [{:(1,omega^(2),1-omega^(4)),(omega,1,1+omega^(5)),(1,omega,omega^(2)):}] is

If omega is a complex cube root of unity , then the value of omega^(99) + omega^(100) + omega^(101) is

If omega is a complex cube root of unity then a root of the equation |[x+1,omega,omega^2],[omega,x+omega^2,1],[omega^2,1,x+omega]|=0 is

If omega is a complex cube root of unit, then the value of the determinant |[1,omega,omega+1],[omega+1,1,omega],[omega,omega+1,1]|=

If w is a complex cube roots of unity, then arg (i w)+arg (i w^(2))=

If omega is the cube root of unity then {:abs((1,omega,omega^2),(omega,omega^2,1),(omega^2,1,omega)):} is

If omega!=1 is a complex cube root of unity, then prove that [{:(1+2omega^(2017)+omega^(2018)," "omega^(2018),1),(1,1+2omega^(2018)+omega^(2017),omega^(2017)),(omega^(2017),omega^(2018),2+2omega^(2017)+omega^(2018)):}] is singular

If omega is a cube root of unity |(1, omega, omega^(2)),(omega, omega^(2), 1),(omega^(2), omega, 1)| =