If AD, BE and CF are the medians of a `Delta ABC,` then evaluate `(AD^(2)+BE^(2)+CF^(2)): (BC^(2) +CA^(2) +AB^(2)).`

In triangleABC , AD, BE, CF are the medians. Prove that, 4(AD^(2)+BE^(2)+CF^(2))= 3(AB^(2)+BC^(2)+AC^(2)) .

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

If D, E and F be the middle points of the sides BC,CA and AB of the DeltaABC , then AD+BE+CF is

In the given figure, AD is a median of a DeltaABC and AM bot BC . Prove that : AC^(2)+AB^(2)= 2AD^(2)+(1)/(2) BC^(2)

In the given figure, if AD bot BC , prove that AB^(2)+CD^(2)= BD^(2)+AC^(2)

In the given figure, AD is a median of a DeltaABC and AM bot BC . Prove that : AB^(2)= AD^(2)-BC*DM+((BC)/(2))^(2)

In the given figure, AD is a median of a DeltaABC and AM bot BC . Prove that : AC^(2)= AD^(2)+BC*DM+((BC)/(2))^(2)

If A(2,2) , B(-4,-4) and C(5,-8) are the vertices of Delta ABC then the length of the median through C is . . . . . Units

ABC is a right triangle right angled at B. Let D and E be any points on AB and BC respectively. Prove that AE^(2) + CD^(2) = AC^(2) + DE^(2) .

ABD is a triangle right angled at A and AC bot BD Show that (i) AB^(2) = BC .BD. (ii) AC^(2) = BC.DC (iii) AD^(2) = BD .CD.