已知:如圖,在△ABC中,∠ABC=90°,以AB上的點(diǎn)O為圓心,OB的長(zhǎng)為半徑的圓與AB交于點(diǎn)E,與AC切于點(diǎn)D.

1.求證:BC=CD;

2.求證:∠ADE=∠ABD;

3.設(shè)AD=2,AE=1,求⊙O直徑的長(zhǎng).

 

 

1.∵∠ABC=90°,

∴OB⊥BC.······························································· 1分

∵OB是⊙O的半徑,

∴CB為⊙O的切線.·················································· 2分

又∵CD切⊙O于點(diǎn)D,

∴BC=CD;  

2.∵BE是⊙O的直徑,

∴∠BDE=90°.

∴∠ADE+∠CDB =90°.······································ 4分

又∵∠ABC=90°,

∴∠ABD+∠CBD=90°.··········································································· 5分

由(1)得BC=CD,∴∠CDB =∠CBD.

∴∠ADE=∠ABD;         6分

3.由(2)得,∠ADE=∠ABD,∠A=∠A.

∴△ADE∽△ABD.··················································································· 7分

.·························································································· 8分

,∴BE=3,············································································ 9分

∴所求⊙O的直徑長(zhǎng)為3.        10分

 解析:略

 

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