(1)答:AB=CF,证明:∵四边形ABCD是平行四边形,∴AB∥CD,∴∠BAE=∠CFE,∠ABE=∠FCE,∵E为BC的中点,∴EB=EC,∴△ABE≌△FCE,∴AB=CF;(2)解:当BC=AF时,四边形ABFC是矩形.理由如下:∵AB∥CF,AB=CF,∴四边形ABFC是平行四边形,∵BC=AF,∴四边形ABFC是矩形.
