题目内容
11.
如图,在正四棱锥P-ABCD中,AB=2,PA=$\sqrt{6}$,E是棱PC的中点,过AE作平面分别与棱PB、PD交于M、N两点.(1)若PM=$\frac{2}{3}$PB,PN=λPD,求λ的值;
(2)求直线PA与平面AMEN所成角的正弦值的取值范围.
分析 (Ⅰ)连接AC、BD交于点O,以O为坐标原点建立如图所示的空间直角坐标系,则A(0,-$\sqrt{2}$,0),B ($\sqrt{2}$,0,0),C(0,$\sqrt{2}$,0),D(-$\sqrt{2}$,0,0),P(0,0,2),E(0,$\frac{\sqrt{2}}{2}$,1)由AN,AE,AM共面,$\overrightarrow{AE}=x\overrightarrow{AM}+y\overrightarrow{AN}$⇒$\left\{\begin{array}{l}{\frac{2\sqrt{2}x}{3}-\sqrt{2}λy=0}\\{\frac{3\sqrt{2}}{2}=\sqrt{2}x+\sqrt{2}y}\\{1=\frac{2}{3}x+(2-2λ)y}\end{array}\right.$⇒$\left\{\begin{array}{l}{x=y=\frac{3}{4}}\\{λ=\frac{2}{3}}\end{array}\right.$.
(Ⅱ)根据正四棱锥P-ABCD的对称性可知,当PM=PN时,P到面AMEN的距离最大,此时直线PA与平面AMEN所角最大,P到面AMEN的距离最小,此时直线PA与平面AMEN所角最小.利用向量分别求出求解直线PA与平面AMEN所成角的正弦值.
解答 解:(Ⅰ)连接AC、BD交于点O,以O为坐标原点建立如图所示的空间直角坐标系,则A(0,-$\sqrt{2}$,0),B ($\sqrt{2}$,0,0),C(0,$\sqrt{2}$,0),D(-$\sqrt{2}$,0,0),P(0,0,2),E(0,$\frac{\sqrt{2}}{2}$,1)
$\overrightarrow{AE}=(0,\frac{3\sqrt{2}}{2},1)$,$\overrightarrow{AP}=(0,\sqrt{2},2)$,$\overrightarrow{PB}=(\sqrt{2},0,-2)$,$\overrightarrow{PD}=(-\sqrt{2},0,-2)$,$\overrightarrow{AM}=\overrightarrow{AP}+\overrightarrow{PM}=(\frac{2\sqrt{2}}{3},\sqrt{2},\frac{2}{3})$.
$\overrightarrow{AN}=\overrightarrow{AP}+\overrightarrow{PN}=(-\sqrt{2}λ,\sqrt{2},2-2λ)$,
∵AN,AE,AM共面,∴$\overrightarrow{AE}=x\overrightarrow{AM}+y\overrightarrow{AN}$⇒$\left\{\begin{array}{l}{\frac{2\sqrt{2}x}{3}-\sqrt{2}λy=0}\\{\frac{3\sqrt{2}}{2}=\sqrt{2}x+\sqrt{2}y}\\{1=\frac{2}{3}x+(2-2λ)y}\end{array}\right.$⇒$\left\{\begin{array}{l}{x=y=\frac{3}{4}}\\{λ=\frac{2}{3}}\end{array}\right.$.
(Ⅱ)根据正四棱锥P-ABCD的对称性可知,当PM=PN时,P到面AMEN的距离最大,此时直线PA与平面AMEN所角最大,
,P到面AMEN的距离最小,此时直线PA与平面AMEN所角最小.
①由(Ⅰ)知当PM=PN时,λ=$\frac{2}{3}$,$\overrightarrow{AM}=(\frac{2\sqrt{2}}{3},\sqrt{2},\frac{2}{3}),\overrightarrow{AE}=(0,\frac{3}{2}\sqrt{2},1)$,
设面AMEN的法向量为$\overrightarrow{m}=(x,y,z)$,
由$\frac{3\sqrt{2}}{2}y+z=0$,$\frac{2\sqrt{2}}{3}x+\sqrt{2}y+\frac{2}{3}z=0$取$\overrightarrow{m}=(0,\sqrt{2},-3)$
设直线PA与平面AMEN所成角为θ,sinθ=|cos<$\overrightarrow{m},\overrightarrow{AP}$>|=$\frac{2\sqrt{66}}{33}$,
②当M在B时,因为AB∥面PDC,所以过AB,AE的面与面PDC的交线NE∥AB
设$\overrightarrow{n}=(a,b,c)$是面ABEN的法向量,
由$\left\{\begin{array}{l}{\overrightarrow{n}•\overrightarrow{AB}=\sqrt{2}a+\sqrt{2}b=0}\\{\overrightarrow{n}•\overrightarrow{AE}=\frac{3\sqrt{2}}{2}b+c=0}\end{array}\right.$,可取$\overrightarrow{n}=(-\sqrt{2},\sqrt{2},-3)$
sinθ=|cos<$\overrightarrow{n}•\overrightarrow{AP}$>|=$\frac{2\sqrt{78}}{39}$.
直线PA与平面AMEN所成角的正弦值的取值范围为[$\frac{2\sqrt{78}}{39}$,$\frac{2\sqrt{66}}{33}$]
点评 本题考查了空间存在性问题,通过向量共面证明四点共面,及向量法求线面角,属于中档题.
已知圆O:x2+y2=1和定点A(2,1),由圆外一点P(a,b)向圆O引切线PQ,切点为Q,且满足|PQ|=|PA|.| A. | (1,$\frac{55}{29}$] | B. | (1,$\frac{31}{21}$] | C. | [$\frac{31}{21}$,+∞) | D. | [$\frac{55}{29}$,+∞) |
| A. | {x|x≥0} | B. | {x|0<x<1} | C. | {x|x>1} | D. | {x|x<0或x>1} |
| A. | (0,$\frac{2}{3}$) | B. | (0,$\frac{1}{2}$] | C. | [$\frac{1}{3}$,1) | D. | [$\frac{1}{2}$,1) |
