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Question

If e1 is the eccentricity of the ellipse x216+y225=1 and e2 is the eccentricity of the hyperbola passing through the foci of the ellipse and e1.e2=1, then the equation of the hyperbola is

A
16x281y29=1
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B
16x281y29=1
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C
x2916y281=1
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D
x2916y281=1
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Solution

The correct option is A 16x281y29=1
x216+y225=1

e1=251625=35
e1.e2=1 e2=53

Equation of hyperbola :
x2a2y2b2=1 (Assume)
e22=1+b2a2b2=169a2
x2a2y2169a2=1
Hyperbola passes through the foci of ellipse (0,±3)
9169a2=1a2=8116
So, our assumption is wrong.

Therefore, equation of hyperbola is
x2a2y2b2=1
x2(8116)y2169.8116=1
16x281y29=1

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