已知AB∥CD,∠AEC=90°⑴当CE平分∠ACD时,求证:AE平分∠BAC
来源:学生作业帮助网 编辑:作业帮 时间:2024/10/07 02:37:04
过E作直线EF平行于AB再答:则有角A=角AEF,又因为角AEC=角A+角C,所以角CEF=角C,所以EF平行于CD,所以AB平行于CD
证明:过点E作EF∥AB.∵EF∥AB,∴∠A=∠AEF;又∵∠AEC=∠A+∠C,∴∠AEC=∠AEF+∠C;而∠AEC=∠AEF+∠CEF,∴∠CEF=∠C,∴EF∥CD,∴AB∥CD.再问:不能
过E做∠AEC的角平分线EF,用同旁内角互补可得出AB//EF,EF//CD所以AB//CD
过点E作EH∥AB,∵AB∥CD,∴EH∥AB∥CD;∴∠AEH=∠BAE=40°,∠CEH=∠ECD=70°,∴∠AEC=∠AEH+∠CEH=110°;∵EF平分∠AEC,∴∠AEF=12∠AEC=
做EG平行AB则∠AEG=140°,∠CEG=110°所以∠AEC=360-140-110=110°又因为平分所以∠AEF=55°
证明:方法一.延长CE交AB于F,因为角AEC是三角形AEF的外角,所以角AEC=角A+角AFE,因为角AEC=角A+角C,所以角AFE=角C,所以AB//CD.(内错角相等,两直线平行)方法二.连结
过E点向左做一条直线EF使得EF//AB因为EF//AB所以∠BAE=∠AEF因为∠AEC=∠A+∠C=∠BAE+∠C=∠AEF+∠C又∠AEC=∠AEF+∠FEC所以∠FEC=∠C因为∠FEC和∠C
过AB的中点O作OF⊥CD于F,连接OC∵AB=AE+BE=8∴OA=1/2AB=4=OC∴OE=OA-AE=2∵∠CEB=30°,∠OFE=90°∴OF=1/2OE=1∴CF=√(OC²-
证明:过点E作FE‖AB,∴∠AEF=∠A,∵∠AEC=∠A+∠C,即∠AEF+∠CEF=∠A+∠C.∴∠CEF=∠C.∴EF‖CD,∴AB‖EF,CD‖EF.∴AB‖CD.
延长AE交CD于H∵AB∥CD∴∠AHC=∠BAE=30∴∠AEC=∠AHC+∠DCE=30+60=90∵EF、EG三等分∠AEC∴∠GEF=∠AEC/3=90/3=30证明:∵∠AEC=90,EF、
证明:过E作EF∥AB,∵EF∥AB,∴∠A=∠AEF,又∵∠A+∠C=∠AEC,∴∠C=∠CEF,∴EF∥CD,又∵EF∥AB,∴AB∥CD.
连OE因为OA=OC,EA=EC所以三角形OECOEA全等(SSS)所以∠A=∠C所以∠CEO=∠AEO所以O在∠AEC的平分线上在△DCB和△DEA中{DB=DA{CB=EA{DC=DE∴△DCB≌
AE平分∠BAC理由:因为ab平行cd,所以∠bac+∠acd=180°又因为∠aec=90,所以∠ace+∠cae=90所以∠bac+∠acd=∠bae+∠cae+∠ace+∠dce即:∠bae+∠
证明:因为ab平行cd,所以∠bac+∠acd=180°又因为∠aec=90,所以∠ace+∠cae=90所以∠bac+∠acd=∠bae+∠cae+∠ace+∠dce即:∠bae+∠dce=90因为
过点e作ef||ab因为ab||cd所以ab||cd||ef则∠a+∠aef=180°(两条直线平行,同旁内角互补)∠c+∠cef=180°(两条直线平行,同旁内角互补)所以∠a+∠aec+∠c=∠a
过E作EF∥AB,∵EF∥AB,∴∠A=∠AEF(两直线平行内错角相等),又∵AB∥CD,EF∥AB,∴EF∥CD,∴∠C=∠CEF(两直线平行内错角相等),又∵∠AEC=∠AEF+∠CEF,∴∠AE
过E做EF//AB∴∠AEF+∠A=180∴∠AEF=60∴∠FEC=120-60=60∴∠FEC+∠C=60+120+180∴EF//CD因为EF//AB所以AB//CD
过E点作EG//AB,点G在E左边,则∠AEG=∠A因为∠AEC=∠A+∠C,∠AEC=∠AEG+∠CEG,所以∠CEG=∠C,所以EG//CD又因为EG//AB,所以AB//CD