in the picture below, the top vertex of a triangle is joined to the mid point of the bottom side of the triangle and then the mid point of this line is joined to the other two vertices. prove that the areasof all four triangles obtained thus are equal to a fourth of the area of the whole triangle.
Answers
Answered by
0
Step-by-step explanation:
Mid point of BC is D. Line AD divides ∆ ABC into 2 triangles with equal areas. E is the midpoint of AD. Line BE divide ∆ ADB into 2 triangles with equal areas. Similarly CE divides ∆ ADC. 4 triangles of equal area.
Answered by
0
please explain the answer of the given question
Similar questions