已知如图,BC为半圆O的直径,AD⊥BC,垂足为D,过点B作弦BF交AD于点E,交半圆O于点F,弦AC与BF交于点H,且AE=BE.
求证:(1);(2)AH?BC=2AB?BE.
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证明:(1)∵AE=BE,
∴∠BAD=∠ABE,
∵BC是直径,AD⊥BC,
∴∠ADB=∠BAC=90°,
∴∠ABD+∠BAD=∠ABC+∠C=90°,
∴∠BAD=∠C,
∴∠C=∠ABF,
∴;
(2)∵∠C=∠ABF,
Rt△ABH∽Rt△ACB,
∴AH:BH=AB:BC,即AH?BC=AB?BH,
∵∠EAH+∠BAD=∠AHB+∠ABH=90°,∠BAD=∠ABE,
∴∠EAH=∠AHB,
∴AE=EH=BE=BH,
∴AH?BC=2AB?BE.
解析分析:(1)等腰△ABE中,∠BAD=∠ABE;由同角的余角相等知,∠BAD=∠C,故有∠C=∠ABF.由圆周角定理知,;
(2)由于∠EAH=∠AHB,可得出AE=EH=BE=BH,易证得Rt△ABH∽Rt△ACB.则AH:AB=BH:BC,即AH?BC=2AB?BE.
点评:本题考查了等腰三角形的性质、圆周角定理、相似三角形的判定和性质等知识的综合应用.