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Question

If α,β,γ are the roots of the cubic x3+qx+r=0, then the value of Π(αβ)2=

A
(27q2+4r3)
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B
(27q+4r2)
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C
(27r2+4q3)
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D
(27r+4q2)
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Solution

The correct option is C (27r2+4q3)
Given that,
α,β,γ, are the roots of the cubic equation x3+qx+r=0

So,
α+β+γ=b/a=0
αβ+βγ+γα=c/a=q
αβγ=d/a=r

(αβ)2
=(αβ)2(βγ)2(γα)2
=[(αβ)(βγ)(γα)]2
=[α2γα2β+β2αβ2γ+γ2βγ2α]2
=[α(αγαβ)+β(βαβγ)+γ(γβγα)]2
=[α(2αγ+γαq)+β(2αβ+γαq)+γ(2βγ+αβq)]2 (αβ+βγ+γα=q)
=[2(αβ2+βγ2+γα2)+3αβγq(α+β+γ)]2
=[3αβγ+2αβγ(βα+γα+αβ)+0]2 (α+β+γ=0)

Another Approach: by value putting
Let, r=0 and q=1
Then the cubic equation becomes :
x3x=0
x(x+1)(x1)=0
x=0,1,1

So, α=0,β=1,γ=1
(αβ)2
=(αβ)2(βγ)2(γα)2
=4

For q=1 and r=0
only option C = 4

Hence, option C is correct.

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