If `omega !=1` is the complex cube root of unity and matrix `H=[(omega,0), (0,omega)],` then `H^70` is equal to

If omega=1 is the complex cube root of unity and matrix H=|{:(,omega,0),(,0,omega):}| , then H^(70) is equal to:

If omega=1 is the complex cube root of unity and matrix H=|{:(,omega,0),(,0,omega):}| , then H^(70) is equal to:

If omegane1 is the complex cube root of unity and matix H = {:[(omega,0),(0,omega)] , then H^70 is equal to

If omega^3=1 is the complex cube root of unity and matrix H=|{:(,omega,0),(,0,omega):}| , then H^(70) is equal to:

If omega != 1 is the complex root of unity and matrix H = [(omega , 0),(0,omega)] then H^(70) is equal to :

If omega be the complex cube root of unity and matrix H=[(omega,0),(0,omega)] , then H^(70) is equal to a)0 b)-H c)H d) H^(2)

If omega is a complex cube root of unity and A=[(omega,0),(0, omega)] then A^(100)=

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

If omega is the complex cube root of unity, then find omega^-97

If omega is the complex cube root of unity, then find omega^-73