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Question

A hyperbola has y-axis and x-axis as its conjugate axis and transverse axis respectively. If one of the points of intersection of x-axis with the hyperbola is (4,0) and equation of one of the tangents is xy=7, then the equation of the hyperbola is

A
x216y29=1
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B
x29y216=1
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C
x225y29=1
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D
x29y225=1
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Solution

The correct option is A x216y29=1
Let the equation of the hyperbola be x2a2y2b2=1
Transverse axis is x-axis and conjugate axis is y-axis, so
ab
Putting (4,0)
a2=16
Equation of the hyperbola,
x216y2b2=1

Now, equation of tangent to hyperbola is,
y=mx±a2m2b2
Given equation of tangent is
xy=7
Comparing both the equation,
m=1
Therefore, x7=x±a2(1)b2
7=±16b2
7=16b2
b2=9

Hence the equation of the hyperbola is
x216y29=1

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