The locus of a point whose chord of cont...

The locus of a point whose chord of contact with respect to the circle `x^2+y^2=4` is a tangent to the hyperbola `x y=1` is a/an ellipse (b) circle hyperbola (d) parabola

A

ellipse

B

circle

C

hyperbola

D

parabola

Text Solution

Verified by Experts

The correct Answer is:

C

Let the point be (h, k).
Then the equation of the chord of contact is `hx+ky=4.`
Since `hx+ky=4` is tangent to xy = 1,
`x((4-hx)/(k))=1`
has two equal roots.
Therefore, discriminant of `hx^(2)-4x+k=0` is 0.
`therefore" "hk=4`
Thus, the locus of (h, k) is xy = 4.

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