题目内容
在△ABC中,AD是角平分线,AE是高线
①如图1所示,∠ABC=40°,∠ACB=70°,求∠DAE.
②如图2所示,∠ABC=30°,∠ACB=110°,求∠DAE.
③根据①、②两题的计算结果,请猜想∠DAE与∠ABC和∠ACB之间的关系.(用等式表示出来)
①如图1所示,∠ABC=40°,∠ACB=70°,求∠DAE.
②如图2所示,∠ABC=30°,∠ACB=110°,求∠DAE.
③根据①、②两题的计算结果,请猜想∠DAE与∠ABC和∠ACB之间的关系.(用等式表示出来)
①∵∠ABC=40°,∠ACB=70°,
∴∠BAC=180°-∠ABC-∠ACB=70°,
∵AD平分∠BAC,
∴∠CAD=
∠BAC=
×70°=35°,
∵AE⊥BC,
∴∠AEC=90°,
∵∠C=70°,
∴∠EAC=180°-90°-70°=20°,
∴∠DAE=∠DAC-∠EAC=35°-20°=15°.
②∵∠ABC=30°,∠ACB=110°,
∴∠BAC=180°-∠ABC-∠ACB=40°,
∵AD平分∠BAC,
∴∠CAD=
∠BAC=
×40°=20°,
∵AE⊥BC,
∴∠AEC=90°,
∵∠C=110°,
∴∠EAC=∠ACB-∠AEC=110°-90°=20°,
∴∠DAE=∠DAC+∠EAC=20°+20°=40°.
③∠DAE=
∠ACB-
∠ABC,理由如下:
分为两种情况:如图1,
∠BAC=180°-(∠ABC+∠ACB),
∵AD平分∠BAC,
∴∠DAC=
[180°-(∠ABC+∠ACB)]=90°-
∠ABC-
∠ACB,
∵AE⊥BC,
∴∠AEC=90°,
∴∠CAE=90°-∠ACB,
∴∠DAE=∠DAC-∠EAC=(90°-
∠ABC-
∠ACB)-(90°-∠ACB)=
∠ACB-
∠ABC;
如图2,
∠BAC=180°-∠ABC-∠ACB,
∵AD平分∠BAC,
∴∠CAD=
∠BAC=
×(180°-∠ABC-∠ACB)=90°-
∠ABC-
∠ACB,
∵AE⊥BC,
∴∠AEC=90°,
∴∠EAC=∠ACB-∠AEC=∠ACB-90°,
∴∠DAE=∠DAC+∠CAD=90°-
∠ABC-
∠ACB+∠ACB-90°=
∠ACB-
∠ABC.
∴∠BAC=180°-∠ABC-∠ACB=70°,
∵AD平分∠BAC,
∴∠CAD=
| 1 |
| 2 |
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∵AE⊥BC,
∴∠AEC=90°,
∵∠C=70°,
∴∠EAC=180°-90°-70°=20°,
∴∠DAE=∠DAC-∠EAC=35°-20°=15°.
②∵∠ABC=30°,∠ACB=110°,
∴∠BAC=180°-∠ABC-∠ACB=40°,
∵AD平分∠BAC,
∴∠CAD=
| 1 |
| 2 |
| 1 |
| 2 |
∵AE⊥BC,
∴∠AEC=90°,
∵∠C=110°,
∴∠EAC=∠ACB-∠AEC=110°-90°=20°,
∴∠DAE=∠DAC+∠EAC=20°+20°=40°.
③∠DAE=
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| 2 |
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理由如下:分为两种情况:如图1,
∠BAC=180°-(∠ABC+∠ACB),
∵AD平分∠BAC,
∴∠DAC=
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
∵AE⊥BC,
∴∠AEC=90°,
∴∠CAE=90°-∠ACB,
∴∠DAE=∠DAC-∠EAC=(90°-
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如图2,
∠BAC=180°-∠ABC-∠ACB,
∵AD平分∠BAC,
∴∠CAD=
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
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∵AE⊥BC,
∴∠AEC=90°,
∴∠EAC=∠ACB-∠AEC=∠ACB-90°,
∴∠DAE=∠DAC+∠CAD=90°-
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