【答案】(1)證明見(jiàn)解析��;(2)
(3)
和
【解析】
(1)由題意利用弦心距即可求證結(jié)果����,
(2)此題關(guān)鍵先求出AO��,做輔助線構(gòu)造特殊三角形,并求證出∠AOD��,再根據(jù)平行線分線段成比例求出比值即可���,
(3)分情況討論兩種情況:OE=BE時(shí)或OB=BE時(shí)兩種情況�����,利用三角形相似即△COE
△CBO找到相似比,利用相似比求解即可.
(1)過(guò)點(diǎn)O作OP⊥AB,垂足為點(diǎn)P�����;OQ⊥BC���,垂足為點(diǎn)Q,
∵BO平分∠ABC�,
∴OP=OQ,
∵OP,OQ分別是弦AB�����、BC 的弦心距�,
∴AB= BC;
(2)∵OA=OB���,
∴∠A=∠OBD�,
∵CD=CB�,
∴∠CDB =∠CBD��,
∴∠A+∠AOD =∠CBO +∠OBD��,
∴∠AOD =∠CBO,
∵OC=OB�,
∴∠C =∠CBO,
∴∠DOB =∠C +∠CBO = 2∠CBO = 2∠AOD����,
∵AO⊥OB,
∴∠ AOB =∠AOD +∠BOD =3∠AOD = 90°����,
∴∠AOD=30°,
過(guò)點(diǎn)D作DH⊥AO�����,垂足為點(diǎn)H�����,
∴∠AHD=∠DHO=90°�����,
∴tan∠AOD =
=���,
∵∠AHD=∠AOB=90°,
∴HD‖OB�,
∴
�����,
∵OA=OB����,
∴HD=AH,
∵HD‖OB,
∴
;
(3)∵∠C=∠CBO�,
∴∠OEB =∠C+∠COE >∠CBO����,
∴OE≠OB���;
若OB = EB =2時(shí)�,
∵∠C=∠C����,∠COE =∠AOD =∠CBO����,
∴△COE△CBO���,
∴
���,
∴
�����,
∴
-2BC -4=0��,
∴BC =
+1 (舍去)或BC =
+1�,
∴BC =+1�����;
若OE = EB時(shí)�,
∵∠EOB =∠CBO����,
∵∠OEB =∠C+∠COE =2∠C =2∠CBO且∠OEB +∠CBO +∠EOB = 180°����,
∴4∠CBO=180°����,∠CBO=45°,
∴∠OEB=90°��,
∴cos∠CBO=
��,
∵OB=2,
∴EB =
,
∵OE過(guò)圓心,OE⊥BC���,
∴BC =2EB =2.
