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

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 line segment AB

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.

Find the coordinates of the point P on AD such that AP : PD = 2 : 1.

If A and B be the points (3, 4, 5) and (-1, 3, -7) respectively, find the equation of the set of points P such that PA^(2)+PB^(2)=k^(2) , where k is a constant.

In Figure, if P is (2, 4, 5), find the coordinates of F.

If the first and the n^("th") term of a G.P. are a and b, respectively, and if P is the product of n terms, prove that P^2 = (ab)^n .

If the coordinates of the points A, B, C, D be (1, 2, 3), (4, 5, 7), (-4, 3, -6) and (2, 9, 2) respectively, then find the angle between the lines AB and CD.

Let A, B, C be the feet of perpendiculars from a point P on the X, Y, Z - axis respectively. Find the coordinates of A, B and C in each of the following where the point P is : (i) P(3, 4, 2) (ii) P(-5, 3, 7) (iii) P(4, -3, -5)

Let AP and BQ be two vertical poles at points A and B respectively. If AP = 16 m, BQ = 22m and AB = 20 m, then find the distance of a point R on AB from the point A such that RP^(2)+RQ^(2) is minimum.