如图,在▲ABC中,AD平分BC,CE平方AB,垂足分别为点D,E,AD和CE
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∵EF垂直平分AD∴EA=ED∴∠EAD=∠EDA∵AD平分角BAC,即∠BAD=∠CAD又∵∠EDA=∠B+∠BAD;∠EAD=∠CAE+∠CAD∴∠B=∠EDA-∠BAD=∠EAD-∠CAD=∠C
在AB上截取AF=AC,连接DF,∵∠DAB=∠DAC,AD=AD,∴ΔADF≌ΔADC,∴DF=DC,在ΔBDF中,BD-DF
∵CD=DF∴∠DCF=∠DFC∵∠DFC=∠AFE∴∠DCF=∠AFE∵CE⊥AB∴∠AFE+∠BAD=90°∠EBC+∠DCF=90°∴∠BAD=∠EBC∴BD=AD
延长CD交AB于点E∵AD平分∠BAC∴∠BAD=∠CAD∵CD⊥AD∴∠ADE=ADC∵AD=AD∴⊿ADE≌⊿ADC﹙ASA﹚∴∠AED=∠ACD∵∠AED是△BCE的外角∴∠AED>∠B即∠AC
证明:延长CE交AB于F,∵CE⊥AD,∴∠AEC=∠AEF,∵AD平分∠BAC,∴∠FAE=∠CAE,在△FAE和△CAE中∵∠FAE=∠CAEAE=AE∠AEF=∠AEC,∴△FAE≌△CAE(A
因为角EAD=角CAD,(AD平分角BAC)又:角EDA=角DAC,(DE//AC)所以,角EDA=角DAE又:EF垂直于AD所以,EF是AD的垂直平分线,∴FD=FA,(垂直平分线上的点到线段两个端
EF垂直平分AD所以AE=ED所以在三角形EAD中,∠EDA=∠EAD又∠EAD=∠EAC+∠CAD,∠EDC=∠B+∠DAB所以∠EAC+∠CAD=∠B+∠DAB又AD平分∠BAC所以∠DAB=∠C
1、不相等,在BC上取BE=AB,连接DEAB=BE,BD共用,BD平分∠ABC,△ABD≌△EBD,∠A=∠BED而∠BED=∠CED+∠C,因此∠A>∠C2、∠A大3、∠A+∠C=180度△
证明:∵AD平分∠BAC,∴∠BAD=∠CAD,在△ABD和△ACD中AB=AC∠BAD=∠CADAD=AD,∴△ABD≌△ACD.
应该证明:ab=ac+cd,在AB边取E使AE=AC,连接DE,∵AD平分∠BAC,∴∠EAD=∠CAD,AD为共用边,则△EAD≌△CAD,AE=AC,ED=CD,∠ACD=∠AED,∠AED=∠B
如图∵EF垂直平分AD∴EA=ED∴∠EAD=∠EDA∵AD平分角BAC,即∠BAD=∠CAD又∵∠EDA=∠B+∠BAD; ∠EAD=∠CAE+∠CAD∴∠B=∠EDA-∠BAD=∠EAD
∵EF垂直平分AD∴EA=ED∴∠EAD=∠EDA∵AD平分角BAC,即∠BAD=∠CAD又∵∠EDA=∠B+∠BAD;∠EAD=∠CAE+∠CAD∴∠B=∠EDA-∠BAD=∠EAD-∠CAD=∠C
∠CAE=∠B理由如下:∵EF垂直平分AD∴EA=ED∴∠EAD=∠EDA∵∠EAD=∠EAC+∠CAD,∠EDA=∠B+∠BAD又∵∠BAD=∠CAD∴∠CAE=∠B
证明:∵AD平分∠EAC,∴∠EAD=12∠EAC.又∵∠B=∠C,∠EAC=∠B+∠C,∴∠B=12∠EAC.∴∠EAD=∠B.所以AD∥BC.
设AB沿AD折叠点B落在AC上,这一点设为E,设BD=X,则AD=8-X,很容易证明:DE=BD=X,AE=AB=6,则由直角三角形的定理可知:AC=10=AE+CE则CE=4那么CE^2=16=CD
(1)因为角ABC=30°,角ACB=60°,所以角BAC=90°,又因为AE平分角BAC,所以角EAC=45°,AD⊥BC,所以角ADC=90°,角DAC=30°,那么角DAE=45°-30°=15
1.过D做BA的垂线,于BA延长线交于N;过D做BC垂线,于BC交于H因为D在∠ABC角平分线上所以DM=DH又因为DA=DC,所以三角形DAM全等于三角形DCH所以∠C=∠MAD因为∠MAD+∠BA
过E分别作BA,BC,AC的垂线,交BA,BC,AC于M,N,P,∵BE平分∠ABC,∴△BEM≌△BEN(A,A,S)∴EM=EN.同理:EP=EN,∴EM=EP,即△AEM≌△AEP(H,L)∴∠
∵∠B=∠ADE-∠BAD=∠ADE-∠A/2 ∠CAE=∠DAE-∠DAC=∠DAE-∠A/2∵EF是AD的中垂线∴∠ADE=∠DAE∴∠B=∠CAE