bd平分∠ABC,CP平分角ACD,当∠a=x度时,∠p等于多少度
来源:学生作业帮助网 编辑:作业帮 时间:2024/06/23 00:59:54
![bd平分∠ABC,CP平分角ACD,当∠a=x度时,∠p等于多少度](/uploads/image/f/479092-4-2.jpg?t=bd%E5%B9%B3%E5%88%86%E2%88%A0ABC%2CCP%E5%B9%B3%E5%88%86%E8%A7%92ACD%2C%E5%BD%93%E2%88%A0a%3Dx%E5%BA%A6%E6%97%B6%2C%E2%88%A0p%E7%AD%89%E4%BA%8E%E5%A4%9A%E5%B0%91%E5%BA%A6)
在BC上取一点E,使BE=AB.所以△ABD≌△BDEAD=DE,∠BED=∠A再在EC上取一点F,使DF=DE.DF=AD在等腰三角形DEF中,∠DFE=∠DEF=180°-∠A=2∠C所以,∠FD
∠ACF是∠ABC的补角吧∵BD平分∠ABC∴∠DBC=∠ABD=∠ABC/2∵∠ACF是△ABC的外角∴∠ACF=∠A+∠ABC∵CD平分∠ACF∴∠DCF=∠ACD=∠ACF/2=(∠A+∠ABC
∵∠ACD=∠A+∠ABC,CP平分∠ACD∴∠PCD=∠ACD/2=(∠A+∠ABC)/2∵BP平分∠ABC∴∠PBC=∠ABC/2∴∠PCD=∠P+∠PBC=∠P+∠ABC/2∴∠P+∠ABC/2
1、∠ABC=180°-∠A-∠ACB∠ACE=180°-∠ACB=180°-(180°-∠A-∠ABC)=∠A+∠ABC2、∠DBC=1/2∠ABC=1/2(180°-∠A-∠ACB)∠DCE=1/
解;因为三角形的外角等于不相邻的两个内角之和,所以设∠ACB的外角为∠ACE,∠ACE=∠ABC+∠BAC.又因为BD平分∠ABC,所以∠DBC=1/2∠ABC同理:∠ACD=1/2∠ACE=1/2(
证明:过点P作PM⊥AB于M,PN⊥AC于N,PG⊥BC于G∵PM⊥AB,PG⊥BC,BP平分∠CBD∴PM=PG∵PN⊥AC,PG⊥BC,CP平分∠BCE∴PN=PG∴PM=PN∴AP平分∠BAC
额,这个题目是不是错了,如果是要求证AD平分∠CAF 我就能做出来,不管你的题目,先把我的结果附上吧:如图先做三条垂线,交点分别是G、H、I,然后根据角平分线的公理还是定理可以得出DG=DH
∠PCD为△PBC外角,故①∠PCD=∠PBC+∠BPC∠ACD为△ABC外角,故②∠ACD=∠ABC+∠BAC将①式乘以2得2∠PCD=2∠PBC+2∠BPC...③其中2∠PCD=∠ACD.④2∠
∠A=50,所以∠ABC+∠ACB=130∠ACP=1/2(180-∠ACB)=90-∠ACB/2∠P=180-∠PBC-(∠ACB+∠ACP)因为∠PBC=∠ABC/2所以∠P=180-∠ABC/2
∠A=2∠D.自己作图:∠ABD为∠4,∠DBC为∠3,∠ACD为∠1,∠DCE∠2;∵BD平分∠ABC∴∠3=∠4=1/2∠ABC,∵DC平分∠ACE∴∠1=∠2=1/2∠ACE;在三角形ABC中,
证明:作PM⊥AB于点M,PN⊥AC于点N,PO⊥BC于点O∵BP平分∠DBC∴PM=PO∵CP平分∠BCE∴PN=PO∴PM=PN∴点在∠A的平分线上
∠ACM=∠A+ABC∠PCM=∠P+∠PBC已知∠ABC=2∠PBC∠ACM=2∠PCM则2∠PCM=∠A+ABC=∠A+2∠PBC=∠A+2∠PCM-2∠P可求∠A=∠P再问:∠A=∠P?
∵∠A=86°,∴∠ABC+∠ACB=94°又∵BP平分∠ABC,CP平分∠ACB∴∠PBC=1/2∠ABC,∠PCB=1/2∠ACB.∴∠PBC+∠PCB=1/1(∠ABC+∠ACB)=47°.∴∠
∵在△ABC中,∠A=50°,∴∠ABC+∠ACB=180°-50°=130°.∵BP平分∠ABC,CP平分∠ACB,∴∠PBC+∠PCB=12(∠ABC+∠ACB)=12×130°=65°,∴∠BP
解题思路:角平分线性质和全等三角形的性质和判定等的应解题过程:见附件最终答案:略
根据三角形外角的性质,有∠ACD=∠A+∠ABC,∠PCD=∠P+∠PBC而,BP、CP分别是∠ABC、∠ACD的平分线,即有,∠PBC=(1/2)*∠ABC,∠PCD=(1/2)*∠ACD代入化简得
/>115°60°70°2∠DEC+∠A=180°有疑问,
在△BCP中,∵∠PBC+∠P+∠PCB=180°∴∠P=180°-1/2∠ABC-(∠PCA+∠ACB)=180°-1/2∠ABC-(1/2∠ACD+∠ACB)=180°-1/2∠ABC-[1/2(
根据题意,∠PCD=∠P+∠PBC,∠ACD=∠A+∠ABC,∵BP平分∠ABC,CP平分∠ABC的外角∠ACD,∴∠ABC=2∠PBC,∠ACD=2∠PCD,∴∠A+∠ABC=2(∠P+∠PBC),