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

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

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)

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

If the medians of a triangle ABC intersect at G, show that ar(triangleAGB)=ar(triangleAGC)=ar(triangleBGC) =(1)/(3)ar(triangleABC) .

A(5, 4), B(-3, -2) and C(1,-8) are the vertices of a triangle ABC. Find the equation of median AD

AD BE and CF are the medians of a Delta ABC .Prove that 2(AD+BE+CF)<3(AB+BC+CA)<4(AD+BE+CF)

In a triangle ABC,AD,BE,CF intersects each other at G, show that BE+CF>(3)/(2)BC

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

The medians of Delta ABC intersect at point G. Prove that: area of Delta AGB = (1)/(3) xx " area of " Delta ABC

In A Delta ABC , AD ,BE and CF are three medians . The perimeter of Delta ABC is always