Draw AD, BE, CF three medians in a `Delta ABC`

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)).

Let AD be a median of the Delta ABC . If AE and AF are medians of the triangle ABD and ADC, respectively, and BD=a/2 AD = m_(1), AE = m_(2), AF = m_(3), " then a^(2)/8 is equal to

If D, E and F are three points on the sides BC, CA and AB, respectively, of a triangle ABC such that the lines AD, BE and CF are concurrent, then show that " "(BD)/(CD)*(CE)/(AE)*(AF)/(BF)=1

Verify by drawing a diagram if the median and altitude of an isosceles triangle can be same.

In Fig. 6.37, if Delta ABE~=Delta ACD , show that Delta ADE~Delta ABC .

BL and CM are medians of a triangle ABC right angled at A. Prove that 4 ( BL^2 + CM^2 ) = 5 BC^2 .

In an acute angled triangle ABC , let AD, BE and CF be the perpendicular opposite sides of the triangle. The ratio of the product of the side lengths of the triangles DEF and ABC , is equal to