If a,b and c are the position vectors of the vertices A,B and C of the `DeltaABC`, then the centroid of `DeltaABC` is

A(1,-1,-3), B(2, 1,-2) & C(-5, 2,-6) are the position vectors of the vertices of a triangle ABC. The length of the bisector of its internal angle at A 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 the position vectors of the vertices A,B and C of a DeltaABC are 7hatj+10k,-hati+6hatj+6hatk and -4hati+9hatj+6hatk , respectively, the triangle is

A variable plane is at a distance k from the origin and meets the coordinates axes is A,B,C. Then the locus of the centroid of DeltaABC is

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

If a,b are the position vectors of A,B respectively and C is a point on AB produced such that AC=3AB then the position vector of C is

If A, B, C are the vertices of a triangle whose position vectros are vec a,vec b, vec c and G is the centroid of the DeltaABC, then overline(GA)+overline(GB)+overline(GC) =

Consider the triangle with vertices A(0, 0), B(5, 12) and C(16, 12) , find the centroid of triangle ABC

If veca, vecb and vecc are position vectors of A,B, and C respectively of DeltaABC and if|veca-vecb|,|vecb-vec(c)|=2, |vecc-veca|=3 , then the distance between the centroid and incenter of triangleABC is

If the position vectors of the points A,B and C be a,b and 3a-2b respectively, then prove that the points A,B and C are collinear.