A tangent to the ellipse x225+y216=1 at any point P meets the line x=0 at a point Q. Let R be the image of Q in the line y=x, then the circle whose extremities of a diameter are Q and R passes through a fixed point. The fixed point is
A
(3,0)
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B
(5,0)
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C
(0,0)
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D
(4,0)
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Solution
The correct option is C(0,0) Equation of the tangent to the ellipse at P(5cosθ,4sinθ) is xcosθ5+ysinθ4=1.
It meets the line x=0 at Q(0,4cosecθ) Image of Q in the line y=x is R(4cosecθ,0)
Equation of the circle whose extremities of diameter are Q and R, is given by : x(x−4cosecθ)+(y−4cosecθ)y=0 ⇒x2+y2−4(x+y)cosecθ=0
It represents a family of circle, which always passes through the point of intersection of circle x2+y2=0 and line x+y=0, which is given by (0,0).