Let `barp` is the `p.v.` of the orthocentre & `barg` is the p.v of the centroid of the triangle ABC where circumcente is the origin. If `barp=K bar g`, then K=

Let p be the position vector of orthocentre and g is the position vector of the centroid of DeltaABC , where circumcentre is the origin. If p=kg , then the value of k is

Let p be the position vector of orthocentre and g is the position vector of the centroid of DeltaABC , where circumcentre is the origin. If p=kg , then the value of k is

Let p be the position vector of orthocentre and g is the position vector of the centroid of DeltaABC , where circumcentre is the origin. If p=kg , then the value of k is

Let p be the position vector of orthocentre and g is the position vector of the centroid of DeltaABC , where circumcentre is the origin. If p=kg , then the value of k is

Let p be the position vector of orthocentre and g is the position vector of the centroid of DeltaABC , where circumcentre is the origin. If p=kg , then the value of k is

If G is the centroid of Delta ABC, then bar(CA) + bar(CB) =

In Delta ABC if the orthocentre is (1,2) and the circumcenter is (0,0) then centroid of Delta ABC is.

In Delta ABC if the orthocentre is (1,2) and the circumcenter is (0,0) then centroid of Delta ABC is.

In Delta ABC if the orthocentre is (1,2) and the circumcenter is (0,0) then centroid of Delta ABC is.

Ifc G be the centroid of the triangle ABC,then the value of bar(AG)+bar(BG)+bar(CG) equals (O being origin