Let M be the midpoint of side BC of an equilateral triangle ABC. The point D is on CA extended such that A is between D and C. The point E is on AB extended such that B is between A and E, and ∣MD∣=∣ME∣. The point F is the intersection of MD and AB. Prove that ∠BFM=∠BME. equal anglesgeometryEquilateral Triangle