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Let a, b, and c be three real numbers sa...

Let a, b, and c be three real numbers satifying `[(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) gt 0`. If `a=2` with b and c satisfying (E), then the value of `3/omega^(a)+1/omega^(b)+3/omega^(c)` is equal to

A

-2

B

2

C

3

D

-3

Text Solution

Verified by Experts

The correct Answer is:
A
`because a = 2 ` with b and c satisfying ( E)
`therefore 2+ 8b+ 7c = 0, 18 + 2b + 3c = 0`
and ` 2+ b + c= 0`
we get ` b = 12 and c= -14`
Hence, `3/omega^(a) + 1/omega^(b) + 3/omega^(c) = 3/omega^(2) + 1/omega^(12) + 3/omega^(-14) `
`= (3omega)/omega^(3) + 1/1 + 3omega^(14) `
`= 3 omega + 1 + 3omega^(2)`
`= 1 + 3(omega+omega^(2))`
`= 1+ 3(-1)=-2`
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