如图,∠ABC=∠CAE=90°,AB=AD,AE=AC
来源:学生作业帮助网 编辑:作业帮 时间:2024/04/30 19:48:49
∠AFD=∠AFE.理由:过A作AM⊥DC于M,AN⊥BE于N.∵∠BAD=∠CAE=90°,∴∠BAD+∠BAC=∠CAE+∠BAC,即∠DAC=∠BAE;在△ABE和△ADC中,AB=AD(已知)
DE与AB的交点为O.∠D+∠DOA+∠DAO=180,∠B+∠BOE+∠BEO=180..因为∠D=∠B,∠BOE=∠DOA,所以∠DAO=∠BEO..因为∠DEB=∠CAE,所以∠DAB=∠EAC
∠dae=∠dac+∠cae又∵∠bad=∠cae∴∠bac=∠dae,∠abc=∠ade∴三角形△abc和△ade两个角相等∴△abc∽△ade∴ab/ad=ac/ae(相似三角形相等角的两夹边成比
(1)△ABC∽△ADE,△ABD∽△ACE(2分)(2)①证△ABC∽△ADE,∵∠BAD=∠CAE,∠BAD+∠DAC=∠CAE+∠DAC,即∠BAC=∠DAE.(4分)又∵∠ABC=∠ADE,∴
△ABD∽△ACE你已经证明△ABC∽△ADE那么得AB/AC=AD/AE∠BAD=∠CAE△ABD∽△ACE(边角边)
证明:∵BD平分∠ABC∴∠ABD=∠DBC∵AB=AC∴∠ABC=∠ACB∵∠CAE=∠ABC+∠ACB=2∠ACB∴∠CAD=½∠CAE=∠ACB∴AD//BC∴∠D=∠DBC=∠ABD
∵AD∥BC,∴∠1=∠B,∠2=∠C,∵∠1=∠2,∴∠B=∠C,∴AB=AC.
∵AD∥BC∴∠1等于∠ABC∠2=∠ACB∵AD平分∠EAC∴∠1=∠2∴∠ABC=∠ACB∴△ABC为等腰三角形
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
相似因为∠BAD=∠CAE,所以∠BAC=∠DAE又因为∠ABC=∠ADE所以△ABC∽△ADE所以AD/AE=AB/AC在△ABD和△ACE中AD/AE=AB/AC,∠BAD=∠CAE所以△ABD∽
因为三角形全等,所以角bac等于角dae所以角bad等于角cae
20°因为△ABC≌△ADE,所以∠BAC=∠DAE∠BAD=∠BAC-∠DAC∠CAE=∠DAE-∠DAC=20
∠BAC=∠DAE所以∠CAE=∠BAD再问:等于多少度
延长AE交BC于Q,因为垂直角平分线,得三角形ACQ为等腰,因为,∠AED﹢∠CAE=180°,所以,∠AED+∠CQA=180°.所以,∠AED=∠AQB,所以平行再问:你说详细点再答:也就那么回事
设角EAD=5x则角CAE=8x因为ED为中垂线所以EA=EB角B=∠EAD=5x因为∠C=90°则∠CAE+∠B=90°解得x=5°则∠CAE=40°在RT△CAE中可得∠CEA=50°
∵∠DAB=∠CAE∴∠DAE=∠BAC∴当∠D=∠B或∠AED=∠C或AD:AB=AE:AC或AD•AC=AB•AE时两三角形相似.故答案为:∠D=∠B(答案不唯一).
证明:∵CE平分∠ACB∴∠ACE=∠ECD∵AE⊥CE,且∠AED+∠CAE=180°∴∠CAE=∠CED在△ACE和△ECD中∠ACE=∠ECD,∠CAE=∠CED,CE=CE∴△ACE≌△ECD
证明:∵AD平分∠CAE,∴∠EAD=∠CAD,∵AD∥BC,∴∠EAD=∠B,∠CAD=∠C,∴∠B=∠C,∴AB=AC.故△ABC是等腰三角形.
证明:∵AD平分∠CAE,CD平分∠ACF∠CAD+∠ACD=(∠B+∠BCA)/2+(∠B+∠BAC)/2=(∠B+∠BCA+∠B+∠BAC)/2=135°∠D+∠CAD+∠ACD=180°∴∠D=
(1)∵∠BAD=∠CAE,∠DAC=∠DAC.∴∠BAC=∠DAE,又∵∠ABC=∠ADE.∴△ABC∽△ADE,(AA)∴AB:AC=AD:AE°∵∠BAD=∠CAE∴△ABD∽ACE(SAS)(