D is the midpoint of side BC of `triangleABC` and E is the midpoint of BD. If O is the midpoint of AE,
prove that `ar(triangleBOE)=(1)/(8)ar(triangleABC)`.

ABC is a triangle in which D is the midpoint of BC and E is the midpoint of AD. Prove that ar(triangleBED)=(1)/(4)ar(triangleABC) .

ABC is a triangle in which D is the mid-point of BC and E is the mid-point of AD. Prove that: ar(triangleBED) = 1/4 ar(triangleABC)

In triangleABC , if D is the midpoint of BC and E is the midpoint of AD then ar(triangleBED) = ?

The vertex A of triangle ABC is joined to a point D on the side BC. The midpoint of AD is E. Prove that ar(triangleBEC)=(1)/(2)ar(triangleABC) .

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 BC and E is the midpoint of BD. Also O is the midpoint of AE. Prove that area of triangle ABC is 8 X the area of triangle BOE.

In a triangle ABC, E is the mid-point of median AD. Show that ar (triangleBED)=1/4 ar( triangleABC ).

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

In the adjoining figure, BD||CA, E is the midpoint of CA and BD =(1)/(2) CA . Prove that ar(triangleABC)=2ar(triangleDBC) .