If a,b,c are the roots of `x^3 - 3x^2 + 3x + 26=0` and `omega` is cube roots of unity then the value of `(a-1)/(b-1)+(b-1)/(c-1)+(c-1)/(a-1)=`

If omega!=1 is a cube root of unity,then roots of (x-2i)^(3)+i=0

If 1,x_(1),x_(2),x_(3) are the roots of x^(4)-1=0andomega is a complex cube root of unity, find the value of ((omega^(2)-x_(1))(omega^(2)-x_(2))(omega^(2)-x_(3)))/((omega-x_(1))(omega-x_(2))(omega-x_(3)))

If 1,x_(1),x_(2),x_(3) are the roots of x^(4)-1=0andomega is a complex cube root of unity, find the value of ((omega^(2)-x_(1))(omega^(2)-x_(2))(omega^(2)-x_(3)))/((omega-x_(1))(omega-x_(2))(omega-x_(3)))

If 1,omega,omega^(2) are cube roots of unity, then the value of (1+omega)^(3)-(1+omega^(2))^(3) is :

If 1, -1, 3 are the roots of x^(3) + Ax^(2) + Bx + C = 0 then the ascending order of A, B, C is

If a, b, c, d are the roots of the equation x^(4) - 100x^(3)+2x^(2)+4x+10=0 , then the value of (1)/(a)+(1)/(b)+(1)/(c)+(1)/(d) is

Let a,b and c be the roots of x ^(3) -x+1 =0, then the ralue of ((1)/(a+1)+(1)/(b+1)+(1)/(c+1)) equals to :

Let a,b and c be the roots of x ^(3) -x+1 =0, then the ralue of ((1)/(a+1)+(1)/(b+1)+(1)/(c+1)) equals to :

If 1 , omega , omega^(2) are the cube roots of unity , then the roots of (x - 1)^(3) + 8 = 0 are