In a parallelogram OABC vectors a,b,c respectively, THE POSITION VECTORS OF VERTICES A,B,C with reference to O as origin. A point E is taken on the side BC which divides it in the ratio of 2:1 also, the line segment AE intersects the line bisecting the angle `angleAOC` internally at point P. if CP when extended meets AB in points F, then
Q. The position vector of point P, is

In a parallelogram OABC, vectors vec a, vec b, vec c are respectively the positions of vectors of vertices A, B, C with reference to O as origin. A point E is taken on the side BC which divide the line 2:1 internally. Also the line segment AE intersect the line bisecting the angle O internally in point P. If CP, when extended meets AB in point F. Then The position vector of point P, is

If a and b are position vector of two points A,B and C divides AB in ratio 2:1, then position vector of C 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

If position vector of points A,B and C are respectively hati,hatj, and hatk and AB=CX , then position vector of point X is

The position vector of a point laying on the line joining the points whose position vectors are i+j-k and i-j+k is

P is a point equidistant from two lines l and m intersecting at point A (see figure). Show that the line AP bisects the angle between them.

The position vector of the point which divides the join of points 2 vec a - 3 vec b and vec a + vec b in the ratio 3:1 is

If the position vector of one end of the line segment AB be 2hati+3hatj-hatk and the position vector of its middle point be 3(hati+hatj+hatk) , then find the position vector of the other end.

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

Find the position vector of the mid point of the line-segment AB, where A is the point (3, 4, -2) and B is the point (1,2,4).