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) = ?

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) .

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

In an equilateral triangle ABC , D is the mid-point of AB and E is the mid-point of AC. Find the ratio between ar ( triangleABC ) : ar(triangleADE)

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).

ABC is a triangle in which D is the midpoint of BC and E is the midpoint of AD. Which of the following statements is/are correct? 1. The area of triangle ABC is equal to four times the area of triangle BED. 2. The area of triangle ADC is twice the area of triangle BED. Select the correct answer using the code given below.

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