Prove that `GvecA+GvecB+GvecC=vec0`, if G is the centroid of `Delta` ABC.

If A, B, C are vertices of a triangle whose position vectors are vec a, vec b and vec c respectively and G is the centroid of Delta ABC, " then " vec(GA) + vec(GB) + vec(GC), is

G is a point inside the plane of the triangle ABC,vec GA+vec GB+vec GC=0, then show that G is the centroid of triangle ABC.

If A,B and C are the vertices of a triangle with position vectors vec(a) , vec(b) and vec(c ) respectively and G is the centroid of Delta ABC , then vec( GA) + vec( GB ) + vec( GC ) is equal to

If A,B and C are the vertices of a triangle with position vectors vec(a) , vec(b) and vec(c ) respectively and G is the centroid of Delta ABC , then vec( GA) + vec( GB ) + vec( GC ) is equal to

If A, B, C are the vertices of a triangle whose position vectors are vec a, vec b, vec c and G is the centroid of the triangle ABC, then vec GA + vec GB + vec GC =

G is a point inside the plane of the triangle ABC, vecGA + vecGB + vecGC=0 , then show that G is the centroid of triangle ABC.

If G is the centroid of /_\ABC, prove that vec(GA)+vec(GB)+vec(GC) =0. Further if G_1 bet eh centroid of another /_\PQR , show that vec(AP)+vec(BQ)+vec(CR)=3vec(GG_1)

If G is the centroid of /_\ABC, prove that vec(GA)+vec(GB)+vec(GC) =0. Further if G_1 bet eh centroid of another /_\PQR , show that vec(AP)+vec(BQ)+vec(CR)=3vec(GG_1)

Find the ratio of the areas of an equilateral triangle ABC and square EFGC, if G is the centroid of the triangle ABC.

G is a point inside the plane of the triangle ABC, if vec(GA)+vec(GB)+vec(GC)=vec(0) , then show that G is the centroid of the triangle ABC.