搜狗做题网一道简单的中学几何题!
来源:学生作业帮 编辑:搜狗做题网作业帮 分类:数学作业 时间:2024/05/29 23:19:52
一道简单的中学几何题!
如图,AB是⊙O的直径,∠BAC=60度,P是AB上一点,过P作AB的垂线与AC的延长线交与点Q,过点C的切线CD交PQ与D,连接OC.
(1)求证:△CDQ是等腰三角形;
(2)如果△CDQ≌△COB,求BP:PO的值.
希望能快点,过程尽量清楚一点,先回答正确的给分,后边的就不好意思了!
图小了点,不好意思
如图,AB是⊙O的直径,∠BAC=60度,P是AB上一点,过P作AB的垂线与AC的延长线交与点Q,过点C的切线CD交PQ与D,连接OC.
(1)求证:△CDQ是等腰三角形;
(2)如果△CDQ≌△COB,求BP:PO的值.
希望能快点,过程尽量清楚一点,先回答正确的给分,后边的就不好意思了!
图小了点,不好意思
(1)由已知得∠ACB = 90,∠ABC = 30,
∴ ∠Q = 30,∠BCO = ∠ABC = 30.
∵ CD是⊙O的切线,CO是半径,
∴ CD⊥CO,
∴ ∠DCQ =∠BCO = 30,
∴ ∠DCQ =∠Q,故△CDQ是等腰三角形.
(2)设⊙O的半径为1,则AB = 2,OC = 1,AC = AB∕2 = 1,BC =根号3 .
∵ 等腰三角形CDQ与等腰三角形COB全等,∴ CQ = BC = 根号3.
于是 AQ = AC + CQ = 1 +根号3 ,进而 AP = AQ∕2 =(1 +根号3 )∕2,
∴ BP = AB-AP = 2-(1 +根号3 )∕2 =(3-根号3 )∕2,
PO = AP-AO =(1 +根号3 )∕2-1 =( 根号3-1)∕2,
∴ BP:PO =根号3.
∴ ∠Q = 30,∠BCO = ∠ABC = 30.
∵ CD是⊙O的切线,CO是半径,
∴ CD⊥CO,
∴ ∠DCQ =∠BCO = 30,
∴ ∠DCQ =∠Q,故△CDQ是等腰三角形.
(2)设⊙O的半径为1,则AB = 2,OC = 1,AC = AB∕2 = 1,BC =根号3 .
∵ 等腰三角形CDQ与等腰三角形COB全等,∴ CQ = BC = 根号3.
于是 AQ = AC + CQ = 1 +根号3 ,进而 AP = AQ∕2 =(1 +根号3 )∕2,
∴ BP = AB-AP = 2-(1 +根号3 )∕2 =(3-根号3 )∕2,
PO = AP-AO =(1 +根号3 )∕2-1 =( 根号3-1)∕2,
∴ BP:PO =根号3.