如图,AB=AC,AD=AE,∠BAC=∠DAE=α,求∠AOE.
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如图,AB=AC,AD=AE,∠BAC=∠DAE=α,求∠AOE.
如图,AB=AC,AD=AE,∠BAC=∠DAE=α,求∠AOE.
如图,AB=AC,AD=AE,∠BAC=∠DAE=α,求∠AOE.
∵∠BAC=∠DAE=α
∴∠BAE=∠CAD
∵AB=AC,AD=AE,∠BAE=∠CAD
∴△ABE≌△ACD(SAS)
∴S△ABE=S△ACD,AB=AC,∠AEB=∠ADC
∴∠DOE=180°-(∠ODE+∠OED)=180°-(∠ODE+∠AEO+∠AED)=180°-(∠ODE+∠ADO+∠AED)=180°-(∠ADE+∠AED)=α
作△ABE与△ACD的两高AG与AH(如图)
∵S△ABE=S△ACD,AB=AC
∴AG=AH
∴∠AOD=∠AOB=½∠BOD=½(平角BOE-∠DOE)=½(180°-α)
∴∠AOE=∠AOD+∠DOE=½(180°-α)+α=90°+α/2
90+1/2a
简单 。
易证△ABE≌△ACD(SAS)
∴∠ADC=∠AEB
∴AOED四点共圆
∴∠EOD=∠EAD=α
∠DOA=∠DEA=(180°- α)/2
∴∠AOE=α+(180°- α)/2=90°+α/2
∵∠BAC=∠DAE=α
∴∠BAE=∠CAD
∵AB=AC,AD=AE,∠BAE=∠CAD
∴△ABE≌△ACD(SAS)
∴S△ABE=S△ACD,AB=AC,∠AEB=∠ADC
∴∠DOE=180°-(∠ODE+∠OED)=180°-(∠ODE+∠AEO+∠AED)=180°-(∠ODE+∠ADO+∠AED)=180°-(∠ADE+∠AED)=α
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∵∠BAC=∠DAE=α
∴∠BAE=∠CAD
∵AB=AC,AD=AE,∠BAE=∠CAD
∴△ABE≌△ACD(SAS)
∴S△ABE=S△ACD,AB=AC,∠AEB=∠ADC
∴∠DOE=180°-(∠ODE+∠OED)=180°-(∠ODE+∠AEO+∠AED)=180°-(∠ODE+∠ADO+∠AED)=180°-(∠ADE+∠AED)=α
作△ABE与△ACD的两高AG与AH(如图)
∵S△ABE=S△ACD,AB=AC
∴AG=AH
∴∠AOD=∠AOB=½∠BOD=½(平角BOE-∠DOE)=½(180°-α)
∴∠AOE=∠AOD+∠DOE=½(180°-α)+α=90°+α/2
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