$證明:過(guò)點(diǎn)D作DG⊥CA于點(diǎn)G,連接DC����,DB.$
$∵AD是△ABC的外角平分線,DE⊥AB���,DG⊥CA�����,$
$∴DE=DG.$
$∵DF垂直平分BC�,DC=DB.$
$在Rt△CDG和Rt△BDE中\(zhòng) $
${{\begin{cases} {{DG=DE}} \\ {DC=DB} \end{cases}}}$
$∴Rt△CDG≌Rt△BDE(\mathrm {HL})��,$
$∴BE=CG.$
$在△ADG和△ADE中\(zhòng) $
${{\begin{cases} {{∠GAD=∠EAD}} \\ {∠AED=∠AGD} \\ {AD=AD} \end{cases}}}$
$∴△ADG≌△ADE(\mathrm {AAS})���,$
$∴AG=AE.$
$∵CG-AC=AG��,$
$∴BE-AC=AE.$
