If a,b,c are integers not all simultaneously equal, then the minimum value of `|a+ b omega + c omega ^(2)|` is-

If a,b,c are integers,not all simultaneously equal and w is cube root of unity (w!=1), then minimum value of |a+bw+cw^(2)|

If a,b,c are distinct integers and a cube root of unity then minimum value of x=|a+b omega+c omega^(2)|+|a+b omega^(2)+c omega|

a ,b , c are integers, not all simultaneously equal, and omega is cube root of unity (omega!=1) , then minimum value of |a+bomega+comega^2| is 0 b. 1 c. (sqrt(3))/2 d. 1/2

a ,b , c are integers, not all simultaneously equal, and omega is cube root of unity (omega!=1) , then minimum value of |a+bomega+comega^2| is 0 b. 1 c. (sqrt(3))/2 d. 1/2

a ,b , c are integers, not all simultaneously equal, and omega is cube root of unity (omega!=1) , then minimum value of |a+bomega+comega^2| is 0 b. 1 c. (sqrt(3))/2 d. 1/2

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

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

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