题目内容
(2012•河南模拟)选修4-1:几何证明选讲如图,四边形ABCD是⊙O的内接四边形,延长BC,AD交于点E,且CE=AB=AC,连接BD,交AC于点F.
(I )证明:BD平分∠ABC;
(II)若AD=6,BD=8,求DF的长.
分析:(Ⅰ)由CE=AC,知∠E=∠CAE,由AB=AC,知∠ABC=∠ACB.由∠DBC=∠CAE,知∠DBC=∠E=∠CAE.由能够证明BD平分∠ABC.
(Ⅱ)由(Ⅰ)知∠CAE=∠DBC=∠ABD.由∠ADF=∠ADB,知△ADF∽△BDA,由此能求出DF的长.
(Ⅱ)由(Ⅰ)知∠CAE=∠DBC=∠ABD.由∠ADF=∠ADB,知△ADF∽△BDA,由此能求出DF的长.
解答:解:(Ⅰ)∵CE=AC,∴∠E=∠CAE,
∵AB=AC,∴∠ABC=∠ACB.
∵∠DBC=∠CAE,∴∠DBC=∠E=∠CAE.
∵∠ABC=∠ABD+∠DBC,∠ACB=∠E+∠CAE,
∴∠ABD=∠CAE,
∴∠ABD=∠DBC,即BD平分∠ABC.
(Ⅱ)由(Ⅰ)知∠CAE=∠DBC=∠ABD.
又∵∠ADF=∠ADB,∴△ADF∽△BDA,
∴
=
,
∵AD=6,BD=8.
∴DF=
=
=
.
∵AB=AC,∴∠ABC=∠ACB.
∵∠DBC=∠CAE,∴∠DBC=∠E=∠CAE.
∵∠ABC=∠ABD+∠DBC,∠ACB=∠E+∠CAE,
∴∠ABD=∠CAE,
∴∠ABD=∠DBC,即BD平分∠ABC.
(Ⅱ)由(Ⅰ)知∠CAE=∠DBC=∠ABD.
又∵∠ADF=∠ADB,∴△ADF∽△BDA,
∴
| AD |
| BD |
| DF |
| AD |
∵AD=6,BD=8.
∴DF=
| AD2 |
| BD |
| 36 |
| 8 |
| 9 |
| 2 |
点评:本题考查相似三角形的判断和应用,是基础题.解题时要认真审题,仔细解答,注意合理地进行等价转化.
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