I'll just outline the proof. You can write it out in two-column form. The proof is mainly based on this theorem: The segment joining the midpoints of two sides of a triangle is parallel to the third side. Using that theorem, DE is parallel to BC because D and E are the midpoints of AB and AC in triangle ABC FH is parallel to BC because F and H are the midpoints of GB and GC in triangle ABC Therefore DE is parallel to FH because they are both parallel to BC Next draw in line segment AGDH is parallel to AG because D and H are the midpoints of AC and GC in triangle ACG EF is parallel to AG because E and F are the midpoints of AB and BG in triangle ABG Therefore DH is parallel to EF because they are both parallel to AG Therefore DEFH is a parallelogram because both pairs of opposite sides are parallel. ----------------------- Since the diagonals of a parallelogram bisect each other, DG = GF, and we are given that GF = BF since F is the midpoint of BG. Similarly, GE = GH, and we are given that GH = HC since H is the midpoint of CG. Edwin