已知:AB=AD,AC=AE,∠BAD=∠CAE=90°BF=EF求证:AF⊥CD

来源：学生作业帮助网编辑：作业帮时间：2024/08/16 23:04:28

x��RMk�@�+�BO6�I&�Na�L��2�jbm76+�7=mE JA=�H��OY�ڞ�/8�d뀧��<��3�r�>�� 0��b��%>��#;��`\|~ry�xD��G;��bk��cU��j'��|:-G�� '�I5�X�<Ɠ-�Q^$l�>��t�` z6jUllc��,[�C(6,-13h[23GSu�H!�2�,�b;cr�mX��pbGO��nɥ�7��r-�JKdfV'��cChF�c@�QA�� s��_$�gG�r��{8Eg!�ې�]�g��ݮ᫠ūc��g� ��PH#.l�'i��q�H��Ō�#�Ź|cn(�e2��mqВv=A �z-� ѵr5�p�+d��c��{͚$��>�b�*3 ��t��!R�C�]��5n�8+�Ҟ�T��=�Z�l[|��י��

已知:AB=AD,AC=AE,∠BAD=∠CAE=90°BF=EF求证:AF⊥CD
已知:AB=AD,AC=AE,∠BAD=∠CAE=90°BF=EF求证:AF⊥CD

已知:AB=AD,AC=AE,∠BAD=∠CAE=90°BF=EF求证:AF⊥CD
证明：延长AF到P,使AF=FP
∠AFB=∠PFE（对顶角）
∵BF=EF
∴△ABF≌△PEF
∴AB=PE,∠ABE=∠PEF
∴∠AEP=∠AEB+∠∠PEF
又∵∠BAD=∠CAE=90°,∴∠BAC=∠EAD
∴∠ABE +∠BAC+∠AEB=∠EAD+∠CAD
∴∠CAD=∠ABE +∠AEB=∠AEP
又∵AB=AD,AC=AE
∴在△ACD和△APE中
AC=AP,∠CAD=∠AEP,AB=PE
∴△ ACD≌△APE
∴∠C=∠PAD
∠PAD+∠CAF=90°
∠C+∠CAF=90°,
∴AF⊥CD