The line segment joining `A(6, 3)` to `B(-1, -4)` is doubled in length by having its length added to each end , then the ordinates of new ends are

Find the ratio in which the line segment joining A (1,- 5) and B (- 4, 5) is divided by the x-axis. Also find the co ordinates of the point of division.

The line segment joining the points (-3,-4) and (1,-2) is divided by y-axis in the ratio:

The line segment joining the points (1,2) and (-2,1) is divided by the line 3x+4y=7 in the ratio:

A line segment has length 63 and direction ratios are 3,-2 and 6. The components of line vector are

Find the ratio in which the line segment joining (2,-3) and (5, 6) is divided by xaxis, Also find the co-ordinates of point of intersection.

The line joining the points A (- 3,- 10) and B (- 2, 6) is divided by the point P such that 5 PB = AB. Find the co-ordinates of P.

A line segment has length 63 and direction ratios are 3, -2, 6. The components of the line vector are

P is a point on the line segment joining the points (3, 2, -1) and (6, 2,-2). If x co-ordinates of P is 5, then its y co-ordinate is

If C is a point on the line segment joining A (-3, 4) and B (2, 1) such that AC = 2BC, then the co-ordinates of C are :

P (-4, 5) is the mid-point of line segment AB asshown in the following figure. Find the co-ordinates of points A and B. .