Point M(-3,7) and N(-1,6) divides segment AB into three equal parts. Find the coordinates of point A and Point B.

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.

Consider the points A(-2,4,7) and B(3,-5,8) . i. If P divides AB in the ratio k : 1, then find the coordinates of P. ii. Find the coordinates of the point where the line segment AB crosses the YZ-plane.

The line segment joining A(6,3) and B(-1,-4) is doubled in length by adding half of AB to each . Find the coordinates of the new end points .

ABCD is a square Points E(4,3) and F(2,5) lie on AB and CD, respectively,such that EF divides the square in two equal parts. If the coordinates of A are (7,3) ,then the coordinates of other vertices can be

The centroid of a triangle ABC is at the point (1,1,1) . If the coordinates of A and B are (3,-5,7) and (-1,7,-6) , respectively, find the coordinates of the point C.

If A-P-Q-B, point P and Q trisects seg AB and A(3,1), Q(-1,3), then find coordinates of points B and P.

A point R with x-coordinate 4 lies on the line segment joining the points P(2,-3,4) and Q(8,0,10) . Find the coordinates of the point R.

Find the coordinates of the points of trisection (i.e., points dividing in three equal parts) of the line segment joining the points A(2, -2) and B(-7, 4) .