Two straight lines, drawn through the origin, trisect theportion of the line `4x+3y = 12` intercepted between the axes.Find the equations of the straight lines.

Two straight lines , drawn through the origin , trisect the portion of the line 4x+3y=12 intercepted between the axes. Find the equations of the straight lines.

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

A straight line passes through the point (3, -2) and this point bisects theportion of the line intercepted between the axes, find the equation of the line

A straight line passes through the point (3, -2) and this point bisects theportion of the line intercepted between the axes, find the equation of the line

The length of the portion of the straight line 3x + 4y = 12 intercepted between the axes is

Find the equations of the straight lines which go through the origin and trisect the portion of the straight line 3x+y=12 which is intercepted between the axes of coordinates.

Find the equations the straight lines which go through the origin and trisect the portion of the straight line 3x+y=12 which is intercepted beteen the axes of coordinates.

A straight line passes through the point (alpha,beta) and this point bisects the portion of the line intercepted between the axes.Show that the equation of the straight line is (x)/(2 alpha)+(y)/(2 beta)=1

A straight line passes through the point (alpha,beta) and this point bisects the portion of the line intercepted between the axes. Show that the equation of the straight line is x/(2alpha)+y/(2beta)=1.