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.

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.

The line segment AB meets the coordinate axes in points A and B. If point P (3, 6) divides AB in the ratio 2:3, then find the points A and B.

veca, vecb, vecc are the position vectors of the three points A,B,C respectiveluy. The point P divides the ilne segment AB internally in the ratio 2:1 and the point Q divides the lines segment BC externally in the ratio 3:2 show that 3vec)PQ) = -veca-8vecb+9vecc .

veca, vecb, vecc are the position vectors of the three points A,B,C respectiveluy. The point P divides the ilne segment AB internally in the ratio 2:1 and the point Q divides the lines segment BC externally in the ratio 3:2 show that 3vec(PQ) = -veca-8vecb+9vecc .

A(2,5) and B(-3,-4) are two fixed points , the point P divides the line -segment overline(AB) internally in the ratio k:1 . Find the coordinates of P . Hence find the equation of the line joining A and B.

A line segment AB is internally divided by the point P(1,1) in the ratio 3:1.If the coordinates of A are (-5,4),then find the coordinates of B.

If the point C divides the line segment joining the points A(2, -1, -4) and B(3, -2, 5) externally in the ratio 3:2, then points C is

The line segment AB is divided at P(1,1) internally in the ratio 5:2 and coordinates of point B are (-1,-1) find the coordinates of point A.

If the point (0,4) divides the line-segment joining the points (-4,10) and ( 2, 1), internally in a definite ratio , find the coordinate of the point which divide the segment externally in the same ratio.

In the figure given below , the line segment AB meets X-axis at A and Y-axis at B. The point P (-3, 4) on AB divides it in the ratio 2:3 . Find the coordinates of A and B.