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Question

Tangents are drawn from the points on a tangent of the hyperbola x2y2=a2 to the parabola y2=4ax. If all the chords of contact pass through a fixed point Q, then the locus of the point Q for different tangents on the hyperbola is

A
x2a2+y24a2=1
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B
x2a2+y23a2=1
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C
x2a2y24a2=1
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D
x2a2y23a2=1
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Solution

The correct option is A x2a2+y24a2=1
Tangent at a point (asecθ,atanθ) on the hyperbola x2y2=a2 is
xsecθytanθ=a(1)
Any point on (1) will be of the form
(t,tsecθatanθ)
Equation of chord of contact of the point w.r.t parbola y2=4ax will be
y(tsecθatanθ)2a(x+t)=0
(aytanθ2ax)+t(ysecθtanθ2a)=0(2)
Here (2) represents family of straight lines each member of which passes through the point of intersection Q(α,β) of straight lines
aytanθ2ax=0 and ysecθtanθ2a=0
(α,β)(acosθ,2asinθ)
α2a2+β24a2=1
So locus of Q is
x2a2+y24a2=1

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