Let `omega` be the solution of `x^(3)-1=0` with `"Im"(omega) gt 0`. If a=2 with b and c satisfying `[abc][{:(1,9,7),(2,8,7),(7,3,7):}]=[0,0,0]`, then the value of `3/omega^(a) + 1/omega^(b) + 1/omega^( c)` is equal to

Let a,b, and c be three real numbers satistying [a,b,c][(1,9,7),(8,2,7),(7,3,7)]=[0,0,0] Let omega be a solution of x^3-1=0 with Im(omega)gt0. I fa=2 with b nd c satisfying (E) then the vlaue of 3/omega^a+1/omega^b+3/omega^c is equa to (A) -2 (B) 2 (C) 3 (D) -3

log_((1)/(9))w=log_(3)7, then the value of w is

Let omega be a complex cube root of unity with 0

If w ne 1 is a cube root of unity and Delta=|{:(x+w^(2),w,1),(w,w^(2),1+x),(1,x+w,w^(2)):}|=0 , then value of x is

2x^(2) + 3x - alpha - 0 " has roots "-2 and beta " while the equation "x^(2) - 3mx + 2m^(2) = 0 " has both roots positive, where " alpha gt 0 and beta gt 0. If omega, omega^(2) are the cube roots of unity, then (1+omega) (1+omega^(2))(1+omega^(3)) (1+ omega + omega ^(2)) is equal to