If α,β,γ are the roots of the equation x3+px2+qx+r=0,r≠0 and βγ+1α,αγ+1β,αβ+1γ are the roots of the equation x3+ax2+bx+c=0,c≠0, then abc is equal to
A
pqr
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B
pq
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C
qr
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D
pr
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Solution
The correct option is Apqr x3+px2+qx+r=0...(1) x3+ax2+bx+c=0...(2)
Let m be a root of eqn(1) and n be a root of eqn(2). n=βγ+1α=αβγ+1α=1−rα[∵αβγ=−r] ⇒n=1−rm⇒m=1−rn
Substitute m=1−rn in eqn(1), we get (1−rn)3+p(1−rn)2+q(1−rn)+r=0 ⇒rn3+q(1−r)n2+p(1−r)2n+(1−r)3=0
Replacing n by x and dividing by r(∵r≠0), we get x3+q(1−r)rx2+p(1−r)2rx+(1−r)3r=0
Therefore, a=q(1−r)r,b=p(1−r)2r,c=(1−r)3r
Now, abc=pqr