If (1/a+ω)+(1/b+ω)+(1/c+ω)+(1/d+ω)=(1/ω), where a, b, c, d ∈ R and ω is a cube root of unity then Sigma (3/a2-a+1) is equal to

Question

If (1/a+ω)+(1/b+ω)+(1/c+ω)+(1/d+ω)=(1/ω), where a, b, c, d ∈ R and ω is a cube root of unity then Sigma (3/a2-a+1) is equal to (A) 1 (B) 2 (C) 3 (D) (1+/3)

Tardigrade Admin · Accepted Answer

Given that (1/a+ω)+(1/b+ω)+(1/c+ω)+(1/d+ω)=(1/ω) dots(i) Taking conjugate we get, (1/a+ω2)+(1/b+ω2)+(1/c+ω2)+(1/d+ω2)=(1/ω2) dots(ii) Subtract equation (ii) from equation (i) we get Sigma((1/a+ω) (1/a+ω2))=(1/ω)-(1/ω2) ⇒ Sigma (1/(a+ω)(a+ω2))=ω2-ω So Sigma (1/a2-a+1)=1 Sigma (3/a2-a+1)=3

Q. If $\frac{1}{a + ω} + \frac{1}{b + ω} + \frac{1}{c + ω} + \frac{1}{d + ω} = \frac{1}{ω}$ , where $a, b, c, d \in$ $R$ and $ω$ is a cube root of unity then $Σ \frac{3}{a ^{2} - a + 1}$ is equal to

1

2

3

$\frac{1 +}{3}$

Q. If a+ω1​+b+ω1​+c+ω1​+d+ω1​=ω1​, where a,b,c,d∈ R and ω is a cube root of unity then Σa2−a+13​ is equal to

1

2

3

31+​

Given that a+ω1​+b+ω1​+c+ω1​+d+ω1​=ω1​…(i) Taking conjugate we get, a+ω21​+b+ω21​+c+ω21​+d+ω21​=ω21​…(ii) Subtract equation (ii) from equation (i) we get Σ(a+ω1​a+ω21​)=ω1​−ω21​ ⇒Σ(a+ω)(a+ω2)1​=ω2−ω So Σa2−a+11​=1Σa2−a+13​=3

Q. If $\frac{1}{a + ω} + \frac{1}{b + ω} + \frac{1}{c + ω} + \frac{1}{d + ω} = \frac{1}{ω}$ , where $a, b, c, d \in$ $R$ and $ω$ is a cube root of unity then $Σ \frac{3}{a ^{2} - a + 1}$ is equal to

$\frac{1 +}{3}$