If P(-2,-5) and Q(4,3) and point R divides the segment PQ is
the ratio `3:4` then find the coordinates of points R.

If point P(3,2) divides the line segment AB internally in the ratio of 3:2 and point Q(-2,3) divides AB externally in the ratio 4:3 then find the coordinates of points A and B.

The line segment joining points (2, -3) and (-4, 6) is divided by a point in the ratio 1: 2. Find the coordinates of the point.

Let P(2,-1,4) and Q(4,3,2) are two points and as point R on PQ is such that 3PQ=5QR , then the coordinates of R are

If point P(-4,6) divides the line segment AB with A(-6,10) in the ratio 2 :1 , then coordinates of the point B are _ _ _ _ _ _ _ _

If P(3,2,-4),Q(5,4,-6) and R(9,8,-10) are collinear, then R divides PQ in the ratio

If the point C(-1,2) divides internally the line segment joining A(2,5) and B in ratio 3:4, find the coordinates of B

Let P be a point on the parabola y^(2) - 2y - 4x+5=0 , such that the tangent on the parabola at P intersects the directrix at point Q. Let R be the point that divides the line segment PQ externally in the ratio 1/2 : 1. Find the locus of R.

If the point R(1, -2) divides externally the line segment joining P(2, 5) and Q in the ratio 3 : 4, what will be the coordinates of Q?

Find the point P divides the line segment joining the points (-1,2) and (4,-5) in the ratio 3:2