Form point P(8,27), tangent PQ and PR are drawn to the ellipse x24+y29=1.If the angle subtended by QR at origin is ϕ, then tanϕ=
A
√665
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B
4√665
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C
8√665
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D
48√6455
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Solution
The correct option is D48√6455
Chord of contact drawn from P(8,27) to the ellipse x24+y29=1 is T=0 ⇒2x+3y=1…(i) Now, to get the equation of the pair of lines passing through origin and points Q,R. Making equation of ellipse homogeneous using equation (i), we get x24+y29=(2x+3y)2 ⇒9x2+4y2=36(4x2+12xy+9y2) ⇒135x2+432xy+320y2=0 ∴∠QOR=ϕ⇒tanϕ=2√h2−aba+b ⇒tanϕ=2√2162−135×320455 ⇒tanϕ=48√6455