如图,AD平分BAC交BC于D,求证BD DC=AB AC
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证明:AO,BO,CO是角平分线∴∠BOD=∠OAB+∠OBA=1/2(∠BAC+∠ABC)=1/2(180°-∠ACB)=90°-1/2∠ACB∵OE⊥BC∴∠COE=90°-∠OCE=90°-1/
证明:∵AD的垂直平分线交BC的延长线于点P∴⊿APD是等腰三角形,PA=PD∴∠PAD=∠PDA∵∠PAC=∠PAD-∠CAD=∠PDA-∠CAD∠CAD=∠BAD【∵AD平分角BAC】∴∠PAC=
(1)从结论出发2∠DAE=∠B-∠C=2∠BAE-2∠BAD=∠CAB-2∠BAD=∠B-∠C,即∠BAD+∠C=2∠BAD+∠B∵∠CAB+∠B+∠C=180°,所以∠CAB+∠C=180°-∠B
1/2∠abc+∠3=∠21/2∠abc+∠4=90°1/2∠abc+∠2=90°∠4=∠1∠1=∠2∠4=∠3+1/2∠abc
(1)证明:连接DM.在Rt△ADE中,MD为斜边AE的中线,则DM=MA,∴∠MDA=∠MAD,∵AD平分∠BAC,∴∠MAD=∠DAC,∴∠MDA=∠DAC,∴MD∥AC,∵AC⊥BC,BF⊥BC
证明:∵AD⊥BC,∴∠BDA=90°,∵∠BAC=90°,∴∠ABC+∠C=90°,∠ABC+∠BAD=90°,∴∠BAD=∠C,∵AN平分∠DAC,∴∠CAN=∠DAN,∵∠BAN=∠BAD+∠D
证明:∵弧AB=弧AB∵∠AEB=∠ACD∵AD平分∠BAC∴∠BAE=∠DAC∴△ABE≈△ADC∴AB/AE=AD/AC∴AB*AC=AD*AE
证明:∵AD⊥BC,EG⊥BC∴AD∥EG∴∠E=∠2(同位角相等),∠EFA=∠1(内错角相等)∵AD平分∠BAC∴∠1=∠2∴∠E=∠EFA
∵CE是角平分线,EA⊥CA,EF⊥CF,CE=CE,∴△CAE≌△CFE,∴EA=EF,∠AEC=∠FEC,又AD⊥CB,EF⊥CB,∴AD∥EF,∴∠AGE=∠GEF,∴∠AEG=∠AGE,∴AG
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
(1)作DE⊥AB于点E∵BC=8,BD=5∴CD=3∵AD平分∠BAC∴DE=DC=3即:D到AB的距离等于3(2)作DE⊥AB于点E∵AD平分∠BAC,DE=6∴CD=DE=6∵BD:DC=3:2
(1)正确,理由:AD平分∠BAC,所以∠EAD=∠DAC,又∠ADE和∠ACD都是直角,所以∠AED+∠EAD=∠ADC+∠DAC=90º,所以∠AED=∠ADC(2)错误,理由:Rt△A
因为DE垂直ABDC垂直AC所以DE和DC分别是D到AB和AC距离D在角CAB平分线上所以D到AB和AC距离相等所以DE=CD
证明∵EA=EC∴三角形AEC为等腰三角形做三角形AEC的高EF∵AC=2ABAF=CF(等腰三角形三线合一)∴AF=AB在△ABE和△AFE中AB=AF∠BAE=∠FAEAE=AE∴△ABE全等于△
连接AE因为EF是AD的垂直平分线,所以DE=AE所以∠ADE=∠DAE又因为∠ADE=∠B+∠DAB∠DAE=∠CAE+∠DACAD是△ABC的角平分线,所以∠DAB=∠DAC所以∠B=∠CAE又因
相等理由:∠AHE=∠BAD+∠ABH(依据:外角定理)=1/2∠BAC+1/2∠ABC=1/2(∠BAC+∠ABC)=1/2(180-∠ACB)=90-1/2∠ACB∠CHG=90-∠GCH=90-
证明:∵∠ABG=∠CBG∴AG/GC=AB/BC∵AD⊥BC∴∠ADB=90°∴∠BED+∠CBG=90°∵∠BAC=90°∴∠AGE+ABG=90°∴∠AGE=∠BED∵∠BED=∠AEG∴∠AE
已插入图片在△ABC中,∠C=90°,CM⊥AB于M,AD平分∠A交CM于D,交BC于T,过D作DE∥AB交BC于E,过T做∠1=∠6=∠B、∠5=∠4=∠A∠2=∠1+∠a∠3=∠B+∠a∴∠2=∠