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

The coordinates of the points A and B are respectively (-3,2) and (2,3). P and Q are points on the line joining A and B such that AP=PQ. A square PQRS is constructed on PQ as one side, the coordinates of R can be

If A =(1,2,3) and B=(3,5,7) and P, Q are the points on AB such that AP= PQ =QB,then the mid point of PQ is

If P, Q are the points of trisection of A(1, -2), B(-5, 6) then PQ =

Find the mid point of the line segment joining (3,6) and (5,-2).

If X-coordinate of a point P on the line joining the points Q (2,2,1 ) and R(5,1,-2 ) is 4, then the z-coordinate of P is

Mid point of the line joining the points (1 , 1) and (0 , 0) is .....

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

If a line through A(1, 0) meets the lines of the pair 2x^2 - xy = 0 at P and Q. If the point R is on the segment PQ such that AP, AR, AQ are in H.P then find the locus of the point R.