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.

A point X on AB = 14cm divides it in the ratio of 3:4 . Find the length of Ax and XB.

Find the point A (x, y) when C divides AB in the ratio 2:3. Points B and C are given as(-5, 8) and (3, 6).

Points P and Q are both in the line segment AB and on the same side of its midpoint. P divides AB in the ratio 3: 2, and Q divides AB in the ratio 4:3. If PQ=2 then find the length of the line segment AB.

Points P and Q are both in the line. segment AB and on the same side of its midpoint. P divides AB in the ratio 2: 3, and Q divides AB in the ratio.3:4. If PQ =2, then find the length the line segment AB.

The length of a line segment AB is 38 cm. A point X on it divides it in the ratio 9:10. Find the length of the line segments AX and XB.

The length of a line segment AB is 38 cm. A point X on it divides it in the ratio of 9:10. Find the lengths of the line segments Ax and XB.

If the portion of a line intercepted between the coordinates axes is divided by the point (2,-1) in the ratio of 3:2, then the equation of that line is

Find the ratio in which point P(2,1) divides the line joining the points A (4,2) and B(8,4)

The portion of a line intercepted between the coordinate axes is divided by the point (2, -1) in the ratio 3:2 . The equation of the line is

An equation of a line whose segment between the coordinates axes is divided by the point ((1)/(2),(1)/(3)) in the ratio 2:3 is