An acute triangle A B C is drawn. E is the midpoint of side A C. Segment A E and segment C E are labeled with double tick mark. F is the midpoint of side A B. Segment A F and segment F B are labeled with single tick mark. D is the midpoint of side B C. Segment B D and segment C D are labeled with triple tick mark. Line segment A D and C F and B F are medians of the triangle. Medians intersect with each other at an interior point labeled as G.
In any triangle, medians are concurrent and their common intersection point
divides each median in proportion 2:1, counting the median parts from the vertex.
So, if DG = 32 cm, then AG = 64 cm, and the entire median AD
