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

In Figure 2, AD _|_ BC . Prove that AB^2 + CD^2 = BD^2 + AC^2 .

In a rhombus ABCD, prove that AC^(2) + BD^(2) = 4AB^(2)

If in a triangle ABC, the altitude AM be the bisector of /_BAD , where D is the mid point of side BC, then prove that (b^2-c^2)= (a^2)/(2) .

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

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

In triangle ABC,D is the midpoint of AB, E is the midpoint of DB and F is the midpoint of BC. If the area of DeltaABC is 96, the area of DeltaAEF is

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

In a rectangle ABCD, prove that : AC^(2)+BD^(2)=AB^(2)+BC^(2)+CD^(2)+DA^(2) .

Construct a triangle ABC in which AC=5cm, BC= 7 cm and AB= 6cm. Construct a circle which touches BC at C and passes through D, where D is the midpoint of AB.

In any Delta ABC , prove that cos C = (a^2+b^2-c^2)/(2ab) with the help of vectors