In `triangleABC`, point D lies on side BC. E is the midpoint of AD. Prove that,
ar(EBC)=`1/2`ar(ABC)

In a triangle ABC , E is the midpoint of median AD. Show that ar(BED) = 1/4 ar(ABC)

In rectangle ABCD, E is the midpoint of side BC. Prove that, AE = DE.

In triangleABC , AD is a median . E is the midpoint of AD and F is the midpoint of AE. Prove that ar(ABF)= 1/8 ar(ABC).

In the given figure, AB and DC are both perpendicular to line segment AD. BC intersects AD at P and P is the midpoint of AD. Prove that, ( 1 ) AB = CD ( 2 ) P is the midpoint of BC.

In triangle ABC, AB gt AC and D is any point of BC. Prove that, AB gt AD.

In a triangle ABC (see figure), E is the midpoint of median AD, show that (i) ar DeltaABE = ar DeltaACE (ii) ar DeltaABE=1/4ar(DeltaABC)

In an equilateral triangle ABC, D is a point on side BC such that BD= (1)/(3)BC . Prove that 9AD^(2)= 7AB^(2) .

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

In the given figure, ABC and DBC are two triangles on the same base BC. Prove that (ar(ABC))/(ar(DBC))= (AO)/(DO) .

In triangleABC, /_C= 90^(@) and P and Q are the midpoints of BC and AC respectively. Prove that AP^(2)+ BQ^(2)= 5PQ^(2) .