[" 2.If "omega(!=1)" is a cube root of unity,then "],[[1,1+i+omega^(2)quad omega^(2)],[1-i,-1quad omega^(2)-1=],[-i,-i+omega-1quad -1]]

If omega ne 1 is a cube root of unity, then 1, omega, omega^(2)

If omega(ne 1) is a cube root of unity, then |{:(1,1+omega^(2),omega^(2)),(1-i,-1,omega^(2)-1),(-i,-1+omega,-1):}| equals :

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

If (omega ne1) is a cube root of unity , then {:(1 , 1 + i+ omega^(2) , omega^(2)) , (1-i, -1 , omega^(2) -1) , (-i , -1 + omega - i, -1):}|

If omega is the complex cube root of unity then 1quad 1+i+omega^(2),omega^(2)1-i,-1-iquad -i+omega-1]|=

If omega is the complex cube root of unity then |[1,1+i+omega^2,omega^2],[1-i,-1,omega^2-1],[-i,-i+omega-1,-1]|=

If omega is the complex cube root of unity then |[1,1+i+omega^2,omega^2],[1-i,-1,omega^2-1],[-i,-i+omega-1,-1]|=

If omega is the complex cube root of unity then |[1,1+i+omega^2,omega^2],[1-i,-1,omega^2-1],[-i,-i+omega-1,-1]|=

If omega is a cube root of unity |(1, omega, omega^(2)),(omega, omega^(2), 1),(omega^(2), omega, 1)| =