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Question

Let the curves x2a2+y2b2=4 and x2a2y2b2=1 have same foci. If the eccentricity of the given curves are e1 and e2 respectively, then

A
e2=3217
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B
e1=217
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C
e2=85
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D
e1=25
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Solution

The correct option is D e1=25
From the equation of the hypberbola, the foci of the hyperbola lie on x axis
Ellipse will be horizontal ellipse.
Here e1 is the eccentricity of ellipse and e2 is eccentricity of hyperbola.
Now, x2a2+y2b2=4
x2(2a)2+y2(2b)2=1
e21=1(2b)2(2a)2
e22=b2a2+1
e21+e22=2(1)
As foci of the ellipse will be same as that of hyperbola
2ae1=ae2e2=2e1(2)
From (1) and (2), we get
e1=25,e2=85

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