IN any /\ABC, a point p is on the side B...

IN any `/_\ABC,` a point `p` is on the side BC. If `vec(PQ)`is the resultant of the vectors `vec(AP)`,` vec(PB)` and `vec(PC)` the prove that `ABQC` is a parallelogram and hence Q is a fixed point.

Similar Questions

Explore conceptually related problems

ABC is a triangle and P any point on BC.if vec PQ is the sum of vec AP+vec PB+vec PC ,show that ABPQ is a parallelogram and Q, therefore,is a fixed point.

Prove that the resultant of the vectors represented by the sides vec(AB) and vec(AC) of a triangle ABC is 2 vec(AD) , where D is the mid - point of [BC].

What is the angle between vec(P) and the resultant of (vec(P)+vec(Q)) and (vec(P)-vec(Q)) ?

What is the angle between vec P and the resultant of (vec P+vec Q) and (vec P-vec Q)

If P is a point and ABCD is a quadrilateral and vec AP+vec PB+vec PD=vec PC, show that ABCD is a parallelogram.

P is a point on the side BC off the DeltaABC and Q is a point such that PQ is the resultant of AP,PB and PC. Then, ABQC is a

A parallelogram ABCD. Prove that vec(AC)+ vec (BD) = 2 vec(BC) '

If vec(P).vec(Q)= PQ , then angle between vec(P) and vec(Q) is

Vectors vec P and vec Q represent two adjacent sides of a parallelogram.The diagonal of the parallelogram represents:

IN any `/_\ABC,` a point `p` is on the side BC. If `vec(PQ)`is the resultant of the vectors `vec(AP)`,` vec(PB)` and `vec(PC)` the prove that `ABQC` is a parallelogram and hence Q is a fixed point.

Similar Questions

Recommended Questions