如圖,已知△PDC是⊙O的內(nèi)接三角形,CP=CD,若將△PCD繞點(diǎn)P順時(shí)針旋轉(zhuǎn),當(dāng)點(diǎn)C剛落在⊙O上的A處時(shí),停止旋轉(zhuǎn),此時(shí)點(diǎn)D落在點(diǎn)B處.                                                                     

(1)求證:PB與⊙O相切;                                                                  

(2)當(dāng)PD=2,∠DPC=30°時(shí),求⊙O的半徑長(zhǎng).                                    

                                                            


【考點(diǎn)】切線(xiàn)的判定與性質(zhì);全等三角形的判定與性質(zhì);旋轉(zhuǎn)的性質(zhì).                 

【專(zhuān)題】探究型.                                                                              

【分析】(1)連接OA、OP,由旋轉(zhuǎn)可得:△PAB≌△PCD,再由全等三角形的性質(zhì)可知AP=PC=DC,再根據(jù)∠BPA=∠DPC=∠D可得出∠BPO=90°,進(jìn)而可知PB與⊙O相切;                                               

(2)過(guò)點(diǎn)A作AE⊥PB,垂足為E,根據(jù)∠BPA=30°,PB=2,△PAB是等腰三角形,可得出BE=EP=,PA=2,PB與⊙O相切于點(diǎn)P可知∠APO=60°,故可知PA=2.                                           

【解答】(1)證明:連接OA、OP,OC,由旋轉(zhuǎn)可得:△PAB≌△PCD,                   

∴PA=PC=DC,                                                                                 

∴AP=PC=DC,∠AOP=∠POC=2∠D,∠APO=∠OAP=                   

又∵∠BPA=∠DPC=∠D,                                                                       

∴∠BPO=∠BPA+=90°                                                      

∴PB與⊙O相切;                                                                             

                                                                                                          

(2)解:過(guò)點(diǎn)A作AE⊥PB,垂足為E,                                                

∵∠BPA=30°,PB=2,△PAB是等腰三角形;                                           

∴BE=EP=,(6分)                                                                          

PA===2                                                                          

又∵PB與⊙O相切于點(diǎn)P,                                                                     

∴∠APO=60°,                                                                                 

∴OP=PA=2.                                                                                    

【點(diǎn)評(píng)】本題考查的是切線(xiàn)的判定與性質(zhì)、全等三角形的判定與性質(zhì)及圖形旋轉(zhuǎn)的性質(zhì),能根據(jù)題意作出輔助線(xiàn)是解答此題的關(guān)鍵.                                                                                        


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