The value of `(frac{1+omega}{(omega)^2}}^3` is

If cube root of 1 is omega,then the value of (3+omega+3(omega)^2)^4 is

Find the value of ( frac{1}{omega} + frac{1}{omega^2} ),where omega is the complex cube root of unity.

Select and write the correct answer from the given alternatives in each of the following: The value of (1 + omega / omega^2)^3 is ( omega is complex cube root of unity)

The value of frac{1}{1+omega}+frac{1}{1+(omega)^2} =

If omega is of complex cube root of unity, then the value of [ frac{a+ b omega + c omega^2}{c+ a omega + b omega^2} + frac{a+ b omega + c omega^2}{b+ c omega + a omega^2} ] is

The value of (1+2(omega)+(omega)^2)^(3n)-(1+omega+2(omega)^2)^(3n) =

If omega is a complex cube root of unity, then find the values of: (1 - omega - omega^2)^3 + (1 - omega + omega^2)^3

The value of (1-omega+(omega)^2)(1-(omega)^2+omega)^6 , where omega,(omega)^2 are the cube roots of unity is

If omega is the complex cube of unity, find the value of (1-omega- omega^2)^3 + (1-omega+omega^2)^3

If omega is an imaginary cube root of unity, then the value of sin[((omega)^10+(omega)^23)pi-frac{pi}{4}] is