The position vectors of points `A, B, C` are respectively `bara,bar b,bar c`. If `L` divides AB in `3:4 & M` divides BC in `2:1` both externally, then `vec (LM)` is-

The position vectors of two points A and B are respectively 6vec(a)+2vec(b) and vec(a)-3bar(b) . If the point C divides AB internally in the ratio 3 : 2 then the position vector of C is ……………

If bar(a),bar(b),bar(c) are the position vectors of the points A,B,C respectively such that 3bar(a)+5bar(b)=8bar(c) , the ratio in which A divides BC is

If bar(a),bar(b),bar(c) are the position vectors of the points A, B, C respectively and 2bar(a)+3bar(b)-5bar(c)=bar(0) , then find the ratio in which the point C divides line segment AB.

If bar(a),bar(b),bar(c) are the position vectors of the points A, B, C respectively and 2bar(a)+3bar(b)-5bar(c)=bar(0) , then find the ratio in which the point C divides line segment AB.

If the position vectors of the points A,B,C are bara,barb and 3bara-2barb respectively, then the position A,B,C are

If the position vectors of the four points A, B, C, D are 2bar(a), bar(b), 6bar(b) and 2bar(a)+5bar(b) then ABCD is

If bar(a), bar(b) and bar(c) are position vectors of the points A, B, C respectively and 5 bar(a) - 3 bar(b) - 2 bar(c) = bar(0) , then find the ratio in which the point C divides the lines segment BA.

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.