The curve that passes through the point `(2, 3)` and has the property that the segment of any tangent to it lying between the coordinate axes is bisected by the point of contact, is given by

Prove that the segment of tangent to xy=c^(2) intercepted between the axes is bisected at the point at contact .

A conic passes through the point (2,4) and is such that the segment of any of its tangents at any point contained between the co-ordinate axes is bisected at the point of tangency.Then the foci of the conic are:

For the curve xy=c, prove that the portion of the tangent intercepted between the coordinate axes is bisected at the point of contact.

The equation of the curve in which the portion of the tangent included between the coordinate axes is bisected at the point of contact, is

Prove that the segment of the tangent to the hyperbola y = (c )/(x) which is contained between the coordinate axes is bisected at the point of tangency.

The equation of the curve not passing through origin and having portion of the tangent included between the coordinate axes is bisected the point of contact is