阿Q吧 > 如图,在△ABC中,角ACB=90°,AC=BC,点D为△ABC内一点,且DA=1,DC=2,DB=3.求角ADC的度数

如图,在△ABC中,角ACB=90°,AC=BC,点D为△ABC内一点,且DA=1,DC=2,DB=3.求角ADC的度数

2025-03-15 21:57:04
推荐回答(2个)
回答1:

如图,绕点C旋转△CDA,使得CA与CB重合,点D转至点E
则∠DCE=∠ACB=90°,且CD=CE,故△CDE为等腰直角三角形,即∠DEC=45°,
于是由勾股定理知DE=2√2,又EB=DA=1,DB=3,
于是DE²+EB²=9=DB²,因此∠DEB=90°
所以∠ADC=∠CEB=∠DEC+∠DEB=45°+90°=135°

回答2:

解:如图,把⊿ACD绕点C顺时针旋转90度到⊿BCE的位置,则:
CE=CD=2,BE=AD=1,∠BCE=∠ACD.
∴∠DCE=∠ACB=90°,则∠CED=45°;DE^2=CD^2+CE^2=8.
∵DE^2+BE^2=8+1=9=BD^2.
∴∠DEB=90°.故∠ADC=∠BEC=135°.

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