题目内容
(2013•杭州二模)如图,已知直线y=2x-2与抛物线x2=2py(p>0)交于M1,M2两点,直线y=| p |
| 2 |
| p |
| 2 |
(I)求P的值;
(Ⅱ)设A是直线y=
| p |
| 2 |
| p |
| 2 |
| OA |
| OB |
分析:(Ⅰ)设出M1(x1,y1),M2(x2,y2),把直线和抛物线方程联立,由根与系数关系得到两点横坐标的和与积,直线y=
恰好平分∠M1FM2,说明kM1F+kM2F=0,写出斜率后代入两点横坐标的和与积,整理即可得到p的值;
(Ⅱ)把求出的p代入抛物线方程,设M3(x3,
),A(t,2),B(a,2),把M1,M2的坐标仅用横坐标表示,然后分别由A、M2、M3三点共线,B、M3、M1三点共线列斜率相等的式子,把得到的式子化简整理即可得到at的值,则
•
的值可求.
| p |
| 2 |
(Ⅱ)把求出的p代入抛物线方程,设M3(x3,
| x32 |
| 8 |
| OA |
| OB |
解答:解:(Ⅰ) 由
,整理得x2-4px+4p=0,
设M1(x1,y1),M2(x2,y2),
则
,
∵直线y=
平分∠M1FM2,∴kM1F+kM2F=0,
∴
+
=0,即
+
=0,
整理得:4-(2+
)•
=0,
则4-(2+
)•
=0,解得p=4,满足△>0,
∴p=4.
(Ⅱ) 由(1)知抛物线方程为x2=8y,
且
,M1(x1,
),M2(x2,
),
设M3(x3,
),A(t,2),B(a,2),
由A、M2、M3三点共线得kM2M3=kAM2,
∴
=
=
,即:x22+x2x3-t(x2+x3)=x22-16,
整理得:x2x3-t(x2+x3)=-16 ①
由B、M3、M1三点共线得kM1M3=kBM1,
∴
=
=
,即x12+x1x3-a(x1+x3)=x12-16
x1x3-a(x1+x3)=-16 ②
②式两边同乘x2得:x1x2x3-a(x1x2+x2x3)=-16x2,
即:16x3-a(16+x2x3)=-16x2 ③
由①得:x2x3=t(x2+x3)-16,代入③得:16x3-16a-ta(x2+x3)+16a=-16x2,
即:16(x2+x3)=at(x2+x3),∴at=16.
∴
•
=at+4=20.
|
设M1(x1,y1),M2(x2,y2),
则
|
∵直线y=
| p |
| 2 |
∴
y1-
| ||
| x1 |
y2-
| ||
| x2 |
2x1-2-
| ||
| x1 |
2x2-2-
| ||
| x2 |
整理得:4-(2+
| p |
| 2 |
| x1+x2 |
| x1•x2 |
则4-(2+
| p |
| 2 |
| 4p |
| 4p |
∴p=4.
(Ⅱ) 由(1)知抛物线方程为x2=8y,
且
|
| x12 |
| 8 |
| x22 |
| 8 |
设M3(x3,
| x32 |
| 8 |
由A、M2、M3三点共线得kM2M3=kAM2,
∴
| ||||
| x2-x3 |
| x2+x3 |
| 8 |
| ||
| x2-t |
整理得:x2x3-t(x2+x3)=-16 ①
由B、M3、M1三点共线得kM1M3=kBM1,
∴
| ||||
| x1-x3 |
| x1+x3 |
| 8 |
| ||
| x1-a |
x1x3-a(x1+x3)=-16 ②
②式两边同乘x2得:x1x2x3-a(x1x2+x2x3)=-16x2,
即:16x3-a(16+x2x3)=-16x2 ③
由①得:x2x3=t(x2+x3)-16,代入③得:16x3-16a-ta(x2+x3)+16a=-16x2,
即:16(x2+x3)=at(x2+x3),∴at=16.
∴
| OA |
| OB |
点评:本题考查了直线与圆锥曲线的关系,考查了直线的倾斜角与斜率的关系,考查了由两点求斜率的公式,训练了平面向量在圆锥曲线中的应用,体现了整体代换思想.属难题.
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