ABC的外角平分线 CP与内角平分线 CAP
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∠PCD=∠PBC+∠BPC=∠PBC+40°;(1)PB平分∠ABC,得∠PBC=∠ABC/2;PC平分∠ACD,得∠PCD=∠ACD/2;代入(1)得∠ACD-∠ABC=80°;在△ABC中,∠B
(1)、据题意,在△ABC中∠ABC+∠ACB=180°-∠A=120°,在△DBC中∠D=180°-(∠DBC+∠DCB)=180°-(1/2)(∠ABC=∠ACB)=180°-120°/2=120
(1)已知∠A等于30°,∴∠ABC+∠ACB=150°∵DC和DB平分∠ABC和∠ACB∴∠DBC+∠DCB=75°,∴∠D105°∵∠ABC+∠ACB,∴∠FCB+∠EBC=360°-150°=2
对的因为∠BAC+∠ABC=2(∠BPC+∠PBC),又因为∠ABC=2∠PBC,所以∠BAC+2∠PBC=2∠BPC+2∠PBC,∠BAC=2∠BPC
过P作PE,PF,PG垂直BA,AC,CD角平分线得PE=PGPF=PG即PE=PFPA=PA所以PEA全等PFAEAP=FAPBPC=PCD-PBC=1/2ACD-1/2ABC=1/2(ACD-AB
证明:在△APD和△APE中因为AP平分∠MAC所以DP=EP,(角平分线的性质)同理PE=PF所以PD=PF所以P在∠MBN的角平分线上所以PB平方∠MBN
∵△ABC的内角平分线BP与外角平分线CP交于P,∴∠PBC=12∠ABC,∠PCD=12∠ACD,∵∠ACD=∠A+∠ABC,∠PCD=∠PBC+∠P,∴12(∠A+∠ABC)=∠PBC+∠P=12
延长BA,做PN⊥BD,PF⊥BA,PM⊥AC,设∠PCD=x°,∵CP平分∠ACD,∴∠ACP=∠PCD=x°,PM=PN,∵BP平分∠ABC,∴∠ABP=∠PBC,PF=PN,∴PF=PM,∵∠B
延长BA,做PN⊥BD,PF⊥BA,PM⊥AC,设∠PCD=x°,∵CP平分∠ACD,∴∠ACP=∠PCD=x°,PM=PN,∵BP平分∠ABC,∴∠ABP=∠PBC,PF=PN,∴PF=PM,∵∠B
∠PCD=∠PBC+∠BPC=∠PBC+40°;(1)PB平分∠ABC,得∠PBC=∠ABC/2;PC平分∠ACD,得∠PCD=∠ACD/2;代入(1)得∠ACD-∠ABC=80°;在△ABC中,∠B
(1)已知BD,CD是内角平分线,∵∠A=30°,∴∠ABC+∠ACB=180°-∠A=180°-30°=150°,∴∠DBC+∠DCB=12(∠ABC+∠ACB)=12×150°=75°,∴∠BDC
∠BPC=1/2∠A列式:∠BPC=1/2C外角-1/2∠ABC=1/2(180-∠ACB-∠ABC)=1/2∠A
延长BA,做PN⊥BD,PF⊥BA,PM⊥AC,设∠PCD=x°,∵CP平分∠ACD,∴∠ACP=∠PCD=x°,PM=PN,∵BP平分∠ABC,∴∠ABP=∠PBC,PF=PN,∴PF=PM,∵∠B
∠PBC=40不会有结果,应为∠BPC=40则∠CAB=∠ACD-∠ABC=2(∠PCD-∠PBD)=2∠BPC=80向三角形三边作垂线分别相交于E,F,G.则有PE=PF=PG故PA是∠BAC外角的
延长BA,作PN⊥BD,PF⊥BA,PM⊥AC,设∠PCD=x°,∵CP平分∠ACD,∴∠ACP=∠PCD=x°,PM=PN,∵BP平分∠ABC,∴∠ABP=∠PBC,PF=PN,∴PF=PM,∵∠B
分两步进行.①先求∠BAC:∠PCD=∠PBC+∠BPC,即1/2∠ACD=40°+1/2∠ABC,∴∠ACD=∠ABC+80°,又∠ACD=∠ABC+∠BAC,∴∠BAC=80°;②证P在∠BAC的
(1)分别过P点别作BC延长线、BE、AC的的垂线,垂足分别为F,H、G因为CP为角ACF的平分线,所以PF=PG因为BP为角EBF的角平分线,所以PF=PH所以PH=PG,AP平分角CAE(2)因为
∠CAB=∠ACD-∠ABC∠PCD=∠PBC+40°∠ACD=2∠PCD=2∠PBC+80°因为∠ABC=2∠PBC,∠ACD=2∠PBC+80°所以∠CAB=2∠PBC+80°-∠ABC=80°
2∠BPC=∠BAC证:∠ACD=∠BAC+ABC=∠BAC+2∠PBC ∠PCD=∠PBC+∠BPC∵∠acd的平分线cp与内角∠abc的平分线bp交于点p∴∠PCD=∠ACP
115°延长BA,做PN⊥BD,PF⊥BA,PM⊥AC,设∠PCD=x°,∵CP平分∠ACD,∴∠ACP=∠PCD=x°,PM=PN,∵BP平分∠ABC,∴∠ABP=∠PBC,PF=PN,∴PF=PM