設(shè)AF與BE相交于M,
DA=DC, ∠ADF=∠CDF=45°, FD=FD ==> △DAF≌△DCF ==> ∠DAF=∠DCF
AE=ED, ∠BAE=∠CDE=90°, AB=DC ==> △ABE≌△DCE ==> ∠BEA=∠CED
故∠DAF+∠BEA = ∠DCF+∠CED = 180°- ∠CDE = 90°
即∠EAM+∠MEA = 90°, 所以 ∠EMA = 180°- 90°= 90°,
即AF⊥BE.
佩服 shuxpp,但是他解答最后一步有問題,所以補充回答.