题目内容

设平面内的向量
OA
=(1,7)
OB
=(5,1)
OM
=(2,1),点P是直线OM上的一个动点,且
PA
PB
=-8,求
OP
的坐标及∠APB的余弦值.
(1)由题意,可设
OP
=(x,y),∵点P在直线OM上,
OP
OM
共线,而
OM
=(2,1)
∴x-2y=0,即x=2y,有
OP
=(2y,y),
PA
=
OA
-
OP
=(1-2y,7-y),
PB
=
OB
-
OP
=(5-2y,1-y),
PA
PB
=(1-2y)(5-2y)+(7-y)(1-y),即
PA
PB
=5y2-20y+12,
PA
PB
=-8,
∴5y2-20y+12=-8,解得y=2,x=4
此时
OP
=(4,2),
PA
=(-3,5),
PB
=(1,-1),
cos∠APB=
PA
PB
|
PA
||
PB
|
=
-8
34
×
2
=-
4
17
17
练习册系列答案
相关题目
设平面内的向量
OA
=(-1,-3)
OB
=(5,3)
OM
=(2,2),点P在直线OM上,且
PA
PB
=16
(Ⅰ)求
OP
的坐标;
(Ⅱ)求∠APB的余弦值;
(Ⅲ)设t∈R,求|
OA
+t
OP
|的最小值.
设平面内的向量
OA
=(1,7)
OB
=(5,1)
OM
=(2,1),点P是直线OM上的一个动点,且
PA
PB
=-8,求
OP
的坐标及∠APB的余弦值.
设平面内的向量
OA
=(1,7)
OB
=(5,1)
OM
=(2,1),点P是直线OM上的一个动点,求当
PA
PB
取最小值时,
OP
的坐标及∠APB的余弦值.
设平面内的向量
OA
=(1,7)
OB
=(5,1)
OM
=(2,1),点P是直线OM上的一个动点,求当
PA
PB
取最小值时,
OP
的坐标及∠APB的余弦值.
设平面内的向量
OA
=(-1,-3)
OB
=(5,3)
OM
=(2,2),点P在直线OM上,且
PA
PB
=16
(Ⅰ)求
OP
的坐标;
(Ⅱ)求∠APB的余弦值;
(Ⅲ)设t∈R,求|
OA
+t
OP
|的最小值.

违法和不良信息举报电话:027-86699610 举报邮箱:58377363@163.com

精英家教网