If `omega` is cube root of unity, then a root of the equation `|(x + 1,omega, omega^2),(omega, x + omega , 1),(omega^2 , 1, x + omega)| = 0` is

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

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

If omega!=1 is a complex cube root of unity, then prove that [{:(1+2omega^(2017)+omega^(2018)," "omega^(2018),1),(1,1+2omega^(2018)+omega^(2017),omega^(2017)),(omega^(2017),omega^(2018),2+2omega^(2017)+omega^(2018)):}] is singular

If omegane1 is the complex cube root of unity and matix H = {:[(omega,0),(0,omega)] , then H^70 is equal to

If omega(ne1) is a cube root of unity, then (1-omega+omega^(2))(1-omega^(2)+omega^(4))(1-omega^(4)+omega^(8)) …upto 2n is factors, is

If omega is a cube root of unity and (1+omega)^7=A+Bomega then find the values of A and B

If a,b,c are distinct integers and omega(ne 1) is a cube root of unity, then the minimum value of |a+bomega+comega^(2)|+|a+bomega^(2)+comega| is

Let omega!=1 be cube root of unity and S be the set of all non-singular matrices of the form [1a bomega1comega^2omega1],w h e r e each of a ,b ,a n dc is either omegaoromega^2dot Then the number of distinct matrices in the set S is a. 2 b. 6 c. 4 d. 8

If omega is a cube root of unity but not equal to 1, then minimum value of abs(a+bomega+comega^(2)) , (where a,b and c are integers but not all equal ), is

Value of |{:(1,omega,omega^(2)),(omega,omega^(2),1),(omega^(2),1,omega):}| is zero, where omega,omega^(2) are imaginary cube roots of unity.