Find the equation of the line through (2,3) so that the segment of the line intercepted between the axes is bisected at this point.

What is the equation of the line through (1, 2) so that the segment of the line intercepted between the axes is bisected at this point ?

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

The equation of the line through the origin which bisects the portion of the line 3x-y=12 intercepted between the axes is

find the equation of the line which passes through p(-5,4) and p divides the portion of the line intercepted between the axes in ration 1:2 find the equation of the line?

Equation of the line through (alpha, beta) which is the midpoint of the line intercepted between the coordinate axes is

Find the equation of the line so that the segment intercept between the axes is divided by the point P(5,-4) in the ratio 1:2

Find the equation of the line whose portion intercepted between the axes is bisected at the point (3,-2)

(i) Find the equation of the straight line,which passes through the point (1,4) and is such that the segment of the line intercepted between the axes is divided by the point in the ratio 1:2.

The equation straight line such that the portion of it intercepted between the coordinate axes is bisected at the point (h,k) is :