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Question

Let PQ:2x+y+6=0 is a chord of the curve x24y2=4. Coordinates of the point R(α,β) that satisfy α2+β210; such that area of triangle PQR is minimum, are given by :

A
(25,15)
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B
(25,15)
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C
(25,15)
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D
(25,15)
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Solution

The correct option is B (25,15)

x24y21=1
R(α,β) lies on or inside circle x2+y2=1

PQ length is fixed. So,triangle of minimum area will be formed only when the perpendicular distance from point R is least.
Any tangent to the given circle is
xcosθ+ysinθ=1
it has to be parallel to PQ
cotθ=2
So, point of contact will be
(cosθ,sinθ)(25,15),(25,15)
Hence for minimum distance R(25,15)

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