在△ABc中.AD平分BAC,CD⊥AD于D,求证ACD>B
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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
证明:∵∠DBC=∠DCB∴DB=DC∵AB=AC,AD=AD∴△ABD≌△ACD(SSS)∴∠BAD=∠CAD即AD平分∠BAC
在△ABD和△ACD中,AB=AC,∠BAD=∠CAD,AD=AD∴△ABD△ACD(SAS)∴BD=CD
证明:如图,作DF⊥AB,DE⊥AC,∵AD平分∠BAC,∴DE=DF,∠BFD=∠CED=90°,∵D是BC的中点,∴BD=CD,在Rt△BDF和Rt△CDE中,DF=DE,BD=CD∴Rt△BDF
∵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
从D点向AB做垂线交AB于H,由于AD=BD,△ADB是等腰三角形,它的高DH平分AB,AB=2AH,由于AD平分∠BAC,CD⊥AC,所以AH=AC,所以AB=2AC.
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
证明:∵AD平分∠BAC,∴∠BAD=∠CAD,在△ABD和△ACD中AB=AC∠BAD=∠CADAD=AD,∴△ABD≌△ACD.
因为AD是BC的高线所以∠ADB=∠ADC=90°又因为AD=AD∠BAD=∠CAD所以△ABD和△ACD为全等三角形(ASA)则BD=CD即AD平分BC
证明:1、∵∠BAC=180-(∠B+∠ACB),AD平分∠BAC∴∠1=∠BAC/2=90-(∠B+∠ACB)/2∴∠ADC=∠1+∠B=90-(∠B+∠ACB)/2+∠B=90-(∠ACB-∠B)
∠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:过D引DE∥AB,交AC于E.∵AD是∠BAC的平分线,∠BAC=120°,∴∠BAD=∠CAD=60°.又∠BAD=∠EDA=60°,所以∴△ADE是正三角形,∴EA=ED=AD.①由于DE∥
证明∵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=
朋友这样做由三角形的正弦定律知sin∠AEB/AB=sin∠AEC/AC而AB>AC所以sin∠AEB>sin∠AEC因为AD平分∠BAC所以:∠ABE
(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
∵EF垂直平分AD∴AF=DF∴∠ADF=∠DAF∵∠ADF=∠B+∠BAD∴∠DAF=∠B+∠BAD∵AD平分∠BAC∴∠BAD=∠DAC∴∠DAF=∠B+∠DAC∴∠B=∠CAF
EF垂直平分AD则AE=DE∠EAD=∠ADE因∠EAD=∠EAC+∠CAD,∠ADE=∠B+∠BAD且∠CAD=∠BAD故∠EAC=∠B
证明:作出AB边的高DE交AB于E∵AD=BD∴E为AB的中点,AB=2AE∵AB=2AC∴AE=AC∵AD平分∠BAC∴∠EAD=∠CAD又AE=AC,AD为公共边∴ΔEAD≌ΔCAD∴∠ACD=∠
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)∴∠