Let , `/_\=|[1,1,1],[1,-1-omega^(2),omega^(2)],[1,omega,omega^4]|` where `omega ne 1` is a complex number such that `omega^3 = 1`, then `/_\ = `

(1-omega+(omega)^2)^5+(1+omega-(omega)^2)^5 =

If omega is a complex cube root of unity, show that (1+omega)^3 - (1+omega^2)^3 =0

If omega is a complex cube root of unity, then (1-omega+(omega)^2)^3 =

If omega is a complex cube root of unity, show that (1+omega-omega^2)^6 = 64

If omega is a complex cube root of unity, then show that: (1 + omega)^3 - (1 + omega^2)^3 = 0

If omega is a complex cube root of unity, then (1+omega^2)^4=

Let omega be a complex number such that 2omega+1 = z where z = sqrt(-3) . If /_\=|[1,1,1],[1,-1-omega^(2),omega^(2)],[1,omega^2,omega^7]| = 3k , then k is equal to

Given omega = -frac{1}{2}+frac{isqrt(3)}{2} , then the value of /_\=|[1,1,1],[1,-1-omega^(2),omega^(2)],[1,omega^2,omega^4]|

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^2)^3