Let P and Q be the points on the line joining `A(-2, 5)` and B(3, 1) such that `AP = PQ=QB`. Then, the mid-point of PQ is

Let P and Q be points on the line joining A(-2, 5) and B(3, 1) such that AP = PQ = QB. If mid-point of PQ is (a, b), then the value of (b)/(a) is

P is a point on the line joining A (4, 3) and B (- 2, 6) such that (AP)/(BP)=2/5 . Find the co-ordinates of P.

Find the points on the line through the points A(1,2,3) and B(5,8, 15) at a distance of 14 units from the mid point of AB.

The points P (a, b) Q (- 3, - 1) and R (3, 4) are such that PQ = PR , express a in terms b.

Let P be the point (1,0) and Q be a point on the locus y^(2)=8x . The locus of the midpoint of PQ is

Find the distance of the point (1,2,3) from the line joining the points (-1,2,5) and (2,3,4).

Find the co-ordinates of the mid-point of the join of the points A (3, 5, 7) and B(-3,-3, 1).

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.

Q is a point on the side SR of a trianglePSR such that PQ=PR. Prove that PS>PQ.

AB is a line-segment. P and Q are points on opposite sides of AB such that each of them is equidistant from the points A and B (see Fig. 7.37). Show that the line PQ is the perpendicular bisector of AB.