If AD, BE and CF are medians of triangle ABC then prove that median AD divides line segment EF.

If AD, BE and CF be the median of a /_\ABC , prove that vec(AD)+vec(BE)+vec(CF) =0

AD, BE and CF are the medians of triangle ABC whose centroid is G. If the points A, F, G and E are concyclic, then prove that 2a^(2) = b^(2) + c^(2)

If AD , BE and CF are medians of DeltaABC , then bar(AD) + bar(BE) + bar(CF) =

Let BE and CF be the two medians of a triangle ABC and G be the intersection. Also, let EF cut AG at O, then AO : OG is

P is a point on the median AD of the triangle ABC.Prove that triangle APB = triangle APC.

The sides AB and BC and the median AD of triangle ABC are equal to the sides PQ and QR and the median PM of triangle PQR respectively. Prove that the triangles ABC and PQR are congruent.

AD, BE and CF asre the medians of a triangle ASBC intersectiing in G. Show that /_\AGB=/_\BGC=/_\CGA=1/3/_\ABC .

In Figure,AD, and BE are medians of ABC and BE||DF. Prove that CF=(1)/(4)AC .