如图,ad平分角bac,∠BFE=∠G,∠B-∠C=20°
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证明:因为:AE=AF所以:
∵BF⊥ACCE⊥AB∴∠BED=∠AED=∠CFD=∠AFD∵∠EDB=∠CDF∠BED=∠CFDBE=CF∴△BED≌△CFD∴DE=DF∵DE=DFAD=AD∠AED=∠AFD∴△AED≌△AF
∠ABF=∠DBF∠ABF+∠AFB=90°∠DBF+∠BED=90°所以∠BED=∠ABF
1.BE=CF,∠BDE=∠CDF(对顶角),∠BED=∠CFD=90°三角形BED全等于三角形CFD(AAS),所以DE=DF.又AD=AD,∠AED=∠BFD=90°所以三角形AED全等于三角形A
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
1/2∠abc+∠3=∠21/2∠abc+∠4=90°1/2∠abc+∠2=90°∠4=∠1∠1=∠2∠4=∠3+1/2∠abc
证明:根据已知条件在三角形ABF和三角形ACE中:角ABF=角CAE,角AFB=角AEC所以,三角形ABF和三角形ACE相似.AB/AC=BF/CE(1)在三角形BDF和三角形CDE中:角BDF=角C
证明:将AF与BE的交点设为O∵AD⊥BC∴∠C+∠CAD=90∵∠BAC=90∴∠C+∠ABC=90,∠BAF+∠CAF=90∴∠CAD=∠ABC∵BE平分∠ABC∴∠ABE=∠CBE=∠ABC/2
证明:∵BF平分∠ABC∴∠ABF=∠EBD在Rt△ABF中∠AFE=90°-∠ABF在Rt△EBD中∠BED=90°-∠EBD∴∠AFE=∠BED又∵∠BED=∠AEF∴∠AEF=∠AFE
∠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
已知,EF是AD的垂直平分线,可得:FA=FD,∠FAD=∠FDA;则有:∠CAF=∠FAD-∠CAD=∠FDA-∠BAD=∠B;因为,在△ABF和△CAF中,∠ABF=∠CAF,∠AFB=∠CFA,
∠DAC=20∠BOA=120
稍微给个提示好了由AD是角平分线,及BE是AD的垂线.只要证明BF=CF,即,∠EBD=∠C就行了.可以证明的是AF=AB,BE=EF,∠ABE=∠AFE,∠AFE=∠EBD+∠C,==>我假设,∠A
M是中点,∴BM=MCAD平行EM∴角DAC=角E又∵AD是角平分线,∴角BAD=DAC∴角BAD=角E∵AD平行EMF点又在ME上∴F为AB中点又有角B=角A∴三角形BFM全等三角形EFA∴角B=角
∠CAD=180°-90°-70°=20°∠BOA=∠EOF=360°-90°-70°-∠AEC=200°-[180°-70-(∠CAE)]=200°-[110°-30]=120°
连接FA,可得到很多角相等,因为AF=BF=CF角B+角FAD=45(1)2角B+角FAD+角FED=90两式想减得到:角B+角FED=45(2)又(1)(2)可得角FAD=角FED所以AF=EF所以
设BF交AE于H则:∠BHA=180-∠ABF-∠BAD-∠DAE∠ABF=1/2∠B∠BAD=∠90-∠ABC=∠C∠DAE=1/2(90-∠C)=1/2∠B所以∠BHA=180-∠ABF-∠BAD
证明:∵BF⊥AC,CE⊥AB,∴∠BED=∠CFD=90°.在△BED和△CFD中,∠BED=∠CFD∠BDE=∠CDFBE=CF,∴△BED≌△CFD(AAS),∴DE=DF.∵DF⊥AC,DE⊥
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)∴∠