题干
如图,在△ABC中,BA=BC,以AB为直径的⊙O分别交AC,BC于点D,E,BC的延长线与⊙O的切线AF交于点F.
(1)求证:∠ABC=2∠CAF;
(2)若AC=210
答案(点此获取答案解析)
(1)证明:如图,连接BD.∵AB为⊙O的直径,∴∠ADB=90°,∴∠DAB+∠ABD=90°.∵AF是⊙O的切线,∴∠FAB=90°,即∠DAB+∠CAF=90°.∴∠CAF=∠ABD.∵BA=BC,∠ADB=90°,∴∠ABC=2∠ABD.∴∠ABC=2∠CAF.(2)解:如图,连接AE.∴∠AEB=90°.设CE=x,∵CE:EB=1:4,∴EB=4x,BA=BC=5x,AE=3x.在Rt△ACE中,AC2=CE2+AE2.即(2<