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Question

An ellipse passes through the foci of the hyperbola, 9x24y2=36 and its major and minor axis lie along the transverse and conjugate axis of the hyperbola respectively. If the product of eccentricities of the two conics is 12, then which of the following points does not lie on the ellipse?

A
(132,6)
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B
(13,0)
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C
(1213,32)
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D
(392,3)
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Solution

The correct option is C (1213,32)
9x24y2=36
x24y29=1
e1=1+94=132
Coordinates of foci are (±ae1,0)(±13,0).

Let e be the eccentricity of ellipse
Given, ee1=12
Eccentricity of ellipse, e=113
Let equation of the ellipse is x2a2+y2b2=1 (a>b)
Ellipse passes through the foci.
13a2=1a2=13
Also, e2=1b2a2=113
b2=12
Thus, equation of ellipse is x213+y212=1
(1213,32) does not lie on the ellipse.

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