the roots of equation x^2-x+1=0 are (1-s...

the roots of equation `x^2-x+1=0` are `(1-sqrt3i)/2 and (1+sqrt3i) /2.` these are written as `-omega, -omega^2.` how these are -`omega and - omega^2.` kindly explain.

Similar Questions

Explore conceptually related problems

If omega = (-1+sqrt3i)/2 , find the value of |(1, omega, omega^2),(omega, omega^2, 1),(omega^2, 1 , omega)|

If omega=-(1)/(2)+i (sqrt(3))/(2) , the value of [[1, omega, omega^(2) ],[ omega, omega^(2), 1],[ omega^(2),1, omega]] is

if omega=(-1+sqrt(3)i)/(2), then arg(omega^(2)) is

If omega=(-1+i sqrt(3))/(2) then (3+omega+3 omega^(2))^(4)=

Given the complex number z= (-1 + sqrt3i)/(2) and w= (-1- sqrt3i)/(2) (where i= sqrt-1 ) Represent z and w accurately on the complex plane.

Given the complex number z= (-1 + sqrt3i)/(2) and w= (-1- sqrt3i)/(2) (where i= sqrt-1 ) Calculate the modulus and argument of w and z

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

If 1, omega, omega^2 be three roots of 1, show that: (1+omega)^3-(1+omega^2)^3=0