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The locus of the point which is such tha...

The locus of the point which is such that the chord of contact of tangents drawn from it to the ellipse `(x^2)/(a^2)+(y^2)/(b^2)=1` forms a triangle of constant area with the coordinate axes is a straight line (b) a hyperbola an ellipse (d) a circle

A

a straight line

B

a hyperbola

C

an ellipse

D

a circle

Text Solution

Verified by Experts

The correct Answer is:
B
The chord of contact of tangents from `(x_(1),y_(1))` is
`(x x_(1))/(a^(2))+(yy_(1))/(b^(2))=1`
It meets the axes at the points `(a^(2)//x_(1),0) and (0, b^(2)//y_(1))`.
Area of triangle `=(1)/(2)(a^(2))/(x_(1))(b^(2))/(y_(1))=k("constant")`
`"or "x_(1)y_(1)=(a^(2)b^(2))/(2k)=c^(2)" (c is constant)"`
Therefore, `xy=c^(2)` is the required locus.
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