Let `triangle=|(1,1,1),(1,-1-w^(2),w^(2)),(1,w,w^(4))|` where W `ne` 1 is a complex number such that `w^(3)=1` then `triangle` equals

Let w ne pm 1 be a complex number. If |w| =1 and z = (w -1)/(w +1), then R (z) is equal to

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

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

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

Derivative of sec^(-1)(1/(1-2x^(2))) w.r.t. sin^(-1)(3x-4x^(3)) is :

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.