Let `vec a` and `vec b` be the position vectors of the points A and B. Prove that the position vectors of the points which trisects the line segment AB are `(veca+2vecb)/(3)and (vecb+2veca)/(3)`.

If vec a and vec b are position vectors of points A and B respectively,then find the position vector of points of trisection of AB

If veca and vecb are position vectors of the points A and B respectively, then position vector of a point C in AB produced such that AC = 3AB is :

The position vector of the points A and B are respectively vec(a) and vec(b) . Find the position vectors of the points which divide AB in trisection.

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

If veca and vecb are position vectors of A and B respectively, then the position vector of a point C in AB produced such ahat vec(AC) = vec(3AB) is :

If veca and vecb are position vectors of A and B respectively, then the position vector of a point C in vec(AB) produced such that vec(AC) =2015 vec(AB) is

If veca and vecb are position vectors of A and B respectively, then the position vector of a point C in vec(AB) produced such that vec(AC) =2015 vec(AB) is

If veca and vecb are position vectors of A and B respectively, then the position vector of a point C in vec(AB) produced such that vec(AC) =2015 vec(AB) is

If vec(a)=4vec(i)-3hat(j) " and " vec(b)=-2hat(i)+5hat(j) are the position vectors of the points A and B respectively, find (i) the position vector of the middle point of the line-segment bar(AB) , (ii) the position vectors of the points of trisection of the line-segment bar(AB) .