AD是△ACD外角角EAC的平分线,AD与△ABC的外接圆交于点D
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∵AD∥BC,∴∠1=∠B,∠2=∠C,∵∠1=∠2,∴∠B=∠C,∴AB=AC.
证明:∵AD∥BC,∴∠EAD=∠B,∠DAC=∠C.∵AD平分∠EAC,∴∠EAD=∠DAC.∴∠B=∠C.∴AB=AC.
∵∠ACB=∠CAD+∠D∠B=∠EAD-∠D∠EAD=∠CAD∴∠ACB=∠CAD+∠D>∠CAD-∠D=∠B
1正确,因为∠ABC=∠ACB,∠EAC是三角形ABC的外角所以∠ACB=1/2∠EAC又因为AD平分∠EAC所以∠DAC=1/2∠EAC所以∠ACB=∠DAC所以AD平行BC2正确因为AD平行BC所
∠ACB>∠B证明:∵∠EAC=∠B+∠ACB,AD平分∠EAC∴∠CAD=∠EAC/2=(∠B+∠ACB)/2∵∠ACB=∠CAD+∠D∴∠ACB=(∠B+∠ACB)/2+∠D∴∠ACB=∠B+2∠
由得AB=AC,BD平分∠ABC.得角ABD=CBD=1/2ACB又AD是外角∠EAC的角平分线,得角EAD=DAB=1/2(ABC+ACB),得DAC=ACB,得AD//BC所以ADB=DBC又AB
∠DCB=∠EAD(圆内接四边形的一个外角等于它的内接角)∠DAC=∠EAD(角平分线定义)∠DAC=∠DBC(同弧所对的圆周角相等)∴∠DCB=∠DBC∴DB=DC
∵A、B、C、D四点共圆,∴∠DCB=∠EAD,∵AD是△ABC外角∠EAC的平分线,∴∠BAC=∠CAD=12∠BAD,∵∠EAD+∠BAD=180°,∴∠BAC=∠CAD=∠BCD=∠EAD.
∵AD∥BC∴∠1等于∠ABC∠2=∠ACB∵AD平分∠EAC∴∠1=∠2∴∠ABC=∠ACB∴△ABC为等腰三角形
④是错误的,∠BDC=1/2∠ABC,∠ADB=1/2∠ABC,∵∠BAC≠∠ABC,∴∠ADB≠∠BDC,∴BD不是∠ADC的平分线.③∠DAC+∠DCA=1/2(∠EAC+∠ACF)=1/2(∠A
∵AD平分∠EAC,∴∠EAC=2∠EAD,∵∠EAC=∠ABC+∠ACB,∠ABC=∠ACB,∴∠EAD=∠ABC,∴AD∥BC,∴①正确;∵AD∥BC,∴∠ADB=∠DBC,∵BD平分∠ABC,∠
分析:由AD∥BC,根据平行线的性质同位角∠EAD=∠B,内错角∠DAC=∠C,又AD是角平分线,所以∠EAD=∠DAC,所以∠B=∠C.∵AD∥BC,∴∠EAD=∠B,∠DAC=∠C,∵AD是∠EA
证明:在BA的延长线上取一点E,则AD平分∠EAC,∠EAD=∠CAD∵四边形ABCD是圆O的内接四边形∴∠EAD=∠DCB【圆外接四边形外角等于内对角】∠DAC=∠DBC【同弧所对的圆周角相等】∴∠
∠DAE=65°又因为∠EAD为△ABD的外角所以∠EAD=∠B+∠D,所以∠D=65°-30°=35°
证明:AD平分EAC,所以角EAC=DAC又因为:三角形内角和为180度既角A+B+C=180度;已知角EAD+DAC+A=180所以角B+C=角EAD+DAC由已知条件知道角B=角c所以角B=EAD
∵AB=AC∴∠B=∠C∵AD是角EAC的平分线∴∠1=∠2∵∠1+∠2=∠B+∠C∴∠2=∠C∴AD‖BC
证明:(1)∵四点A、B、C、D共圆,∴∠EAD=∠BCD,∠DAC=∠DBC,∵AD是△ABC外角∠EAC的平分线,∴∠EAD=∠DAC,∴∠DBC=∠BCD.∴DB=DC.(2)连接BM,CM.则
∵∠ACD=∠A+∠ABC,CA1平分∠ACD∴∠A1CD=∠ACD/2=(∠A+∠ABC)/2∵BA1平分∠ABC∴∠A1BC=∠ABC/2∴∠A1CD=∠A1+∠A1BC=∠A1+∠ABC/2∴∠
证明:(1)∵AB=AC,∴∠B=∠ACB,∵∠FAC=∠B+∠ACB=2∠ACB,∵AD平分∠FAC,∴∠FAC=2∠CAD,∴∠CAD=∠ACB,∵在△ABC和△CDA中∠BAC=∠DCAAC=A