The value of `(2 - omega) (2- omega ^(2)) (2-omega^(10)) (2- omega ^(11))` where ` omega ` is the complex cube root of unity, is : a)49 b)50 c)48 d)47

The value of the expression 1.(2- omega)(2- omega^(2)) + 2.(3-omega) (3-omega^(2)) + …+ (n-1)(n- omega)(n- omega^(2)) , where omega is an imaginary cube root of unity is

The value of |(1,omega,2omega^(2)),(2,2omega^(2),4omega^(3)),(3,3omega^(3),6omega^(4))| is equal to (where omega is imaginary cube root of unity

Using properties, prove that |[1,omega,omega^2],[omega,omega^2,1],[omega^2,1,omega]|=0 where omega is a complex cube root of unity.

Without expanding at any stage, prove that the value of the following determinant is zero. |(1,omega,omega^(2)),(omega,omega^(2),1),(omega^(2),1,omega)| , where omega is cube root of unity

If x= a+ b, y = a omega + b omega^(2), z= a omega^(2) + b omega , then the value of x^(3) + y^(3) + z^(3) is equal to (where omega is imaginary cube root of unity)

If a, b, c are integers, no two of them being equal and omega is complex cube root of unity, then minimum value of |a+b omega| + c omega^(2)| is

Let omega ne 1 be cube root of unity and (1 + omega ) ^(7)= a + omega. Then the value of a is

If omega is an imaginary cube root of unity, then (1 + omega - omega^(2))^(7) is equal to

If omega ne 1 and omega^3=1 then (a omega+b+c omega^2)/(a omega^2+b omega+c)+(a omega^2+b+c omega)/(a+b omega+ c omega^2) is equal to a)2 b) omega c) 2 omega d) 2 omega^2