If the line y−√3x+3=0 cuts the curve y2=x+2 at A and B,P is a point on the line whose ordinate is 0. Then |PA.PB|=
A
43(√3+2)
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B
43(2−√3)
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C
23(√3+2)
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D
23(2−√3)
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Solution
The correct option is A43(√3+2) y=√3x−3 So, Point P≡(√3,0)
Let PA=r, inclination of PA=π/3 Using parametric form coordinates of A≡(√3+rcosπ3,0+rsinπ3)=(√3+r2,r√32) ∵A lies on curve y2=x+2 ⇒(r√32)2=√3+r2+2 ⇒3r2=2r+4(2+√3) ⇒3r2−2r−4(2+√3)=0 Which is a quadratic in r. Roots r1and r2 indicates PAandPB So, PA.PB=4(2+√3)3