`barp and barq` are position vectors of two points `P and Q.` The position vectors of a point which divides `PQ` internally in the ratio `2:5` is

If P-=(2,-1,4),Q-=(3,2,1) then the co-ordinates of the point which divides PQ externally in the ratio 2:1 are

Position vectors of a point which divides line joining points A and B whose position vectors are 2hati+hatj-hatk and hati-hatj+2hatk externally in the ratio 5:2 is

If the position vector of p is 3barp+barq and barp divides PQ internally in the ratio 3:4 , the position vector of Q is

A and B are two points. The position vector of A is 6b-2a. A point P divides the line AB in the ratio 1:2. if a-b is the position vector of P, then the position vector of B is given by

The position vectors of the point which divides internally in the ratio 2:3 the join of the points 2bara-3barb and 3bara-2barb , is

L and M are two points with position vectors 2vec(a)-vec(b)andvec(a)+2vec(b) , respectively. The position vector of the pont N which divides the line segment LM in the ratio 2:1 externally is

If the position vector of a point A is vec a + 2 vec b and vec a divides AB in the ratio 2:3 , then the position vector of B, is

Equation of the line passing through the point (-4, 3) and the portion of the line intercepted between the axes which is divided internally in the ratio 5:3 by this point, is

bara,barb are position vectors of points A and B. If P divides AB in the ratio 3:1 and Q is the mid-point of AP, then position vectors of Q will be