Show that the line segment obtained by joining the points (5,6) and (-10,-12) passes through the origin.

Prove that the line segment obtained by joining the points (1,2) and (-2,-4) passes through the origin.

Find the ratio into which the line segment obtained by joining the points (-3, 8) and (7, -7) at the point (1, 2).

Show that the straight line joining the points (-3,2) and (6,-4) passes through the origin .

Show that the straight line joining the points (4,-3) and (-8,6) passes through the origin .

Find the ratio into which the line segment obtained by joining the points (4, 7) and (1, -2) at a point (-5, -20).

Find the ratio into which the line segment obtained by joining the points (4, 5) and (7, -1) is divided by the straight line 5x + 4y = 4.

The coordinates of the point which divides externally the line segment obtained by joining the points (2, -5) and (-3, -2) into the ratio 4 : 3 are

Prove that the mid-point of the lines segments obatained by joining the points (2,1) and (6,5) lies on the line obtained by joining the points (-4,-5) and (9,8).

Find the coordinates of the point at which the line segment obtained by joining the points (a, b) and (b, a) is divided externally into the ratio (a - b) : (a + b).

The coordinates of the point which divides internally the line segment obtained by joining the points (8, 9) and (-7, 4) into the ratio 2 : 3 are