If A and B are (-2,-2) and (2,-4), respectively, find the coordinates of P such that AP = `(3)/(7)` AB and P lies on the lie segment AB.

If A and B are quad (-2,-2) and (2,-4) ,respectively,find the coordinates of P such that AP=(3)/(7)AB and P lies on the line segment AB.

If A and B are (-2,-2) and (2,-4) respectively, find the coordinates of P(x,y) such that AB=7/3 and P lies on the line segment AB.

If the coordinates of points A and B are (-2, -2) and (2, -4) respectively, find the coordinates of the point P such that AP = (3)/(7)AB , where P lies on the line segment AB.

If A and B are (1,4) and (5,2) respectively, find the coordinates of P when AP/BP=3/4

If A and B are two points having coordinates (-2,-2) and (2,-4) respectively,find the coordinates of P such that AP=(3)/(7)AB

The coordinatse of two points A and B are (-1, 4) and (5, 1) , respectively. Find the coordinates of the point P which lie on extended line AB such that it is three times as far from B as from A.

A(30, 20) and B(6, -4) are two points. The coordinates of point P in AB such that 2PB= AP are:

Plotting the points A ( - 4, 6) and B ( - 4, -6) on the coordinate axes check if P ( - 4, 2) lies on the line segment AB

To find a point P on the line segment AB = 6 cm, such that (AP)/(AB) = (2)/(5) , in which ratio the line segment AB is divided.

If the points A(2,p,1),B(1,2,q) and C(3,2,1) are collinear, then find (1) the ratio in which the points C divides the line segment AB (2) the values of p and q.