If G be the centroid of a triangle ABC, prove that,  AB2+BC2+CA2=3(GA2+GB2+GC2)

If G be the centroid of a triangle ABC, prove that, AB^2 + BC^2 + CA^2 = 3(GA^2 + GB^2 + GC^2)

AD is a median of triangle ABC. Prove that : AB+BC+AC gt 2AD

AD is a median of triangle ABC. Prove that : AB+AC gt 2AD

In a tetrahedron OABC, the edges are of lengths, |OA|=|BC|=a,|OB|=|AC|=b,|OC|=|AB|=c. Let G_1 and G_2 be the centroids of the triangle ABC and AOC such that OG_1 _|_ BG_2, then the value of (a^2+c^2)/b^2 is

lf G be the centroid of a triangle ABC and P be any other point in the plane prove that PA^2+PB^2+PC^2=GA^2+GB^2+GC^2+3GP^2

If G is the centroid of a DeltaABC , then GA^(2)+GB^(2)+GC^(2) is equal to

In the following figure, OP, OQ and OR are drawn perpendiculars to the sides BC, CA and AB repectively of triangle ABC. Prove that : AR^(2)+BP^(2)+CQ^(2)=AQ^(2)+CP^(2)+BR^(2)

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)

In any triangle ABC, prove that AB^2 + AC^2 = 2(AD^2 + BD^2) , where D is the midpoint of BC.

If G is the centroid of triangle with vertices A(a,0),B(-a,0) and C(b,c) then (AB^(2)+BC^(2)+CA^(2))/(GA^(2)+GB^(2)+GC^(2))=