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 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 Delta ABC , AD is a median and E is the midpoint of AD. BE is extended to intersect AC at F. Prove that AF = (1)/(3)AC .

In triangle ABC, AD is a median. Prove that AB + AC gt 2AD

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 , medians AC, BE and CF intersect at point G. Prove that ar(GAB)=ar(GBC)=ar(GCA)= 1/3 ar(ABC).

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

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

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.