题目内容
9.
如图所示,已知底面ABCD是正方形的四棱柱ABCD-A1B1C1D1,C1C=C1D,且∠C1CB=C1CD,线段AC与BD的交点为O.(1)求证:C1O⊥平面ABCD;
(2)若C1O=CO,设点E在线段AD上,且满足$\overrightarrow{AE}$=λ$\overrightarrow{ED}$,当λ为何值时,二面角D1-OE-A的余弦值为$\frac{\sqrt{6}}{6}$?
分析 (1)由△C1CB≌C1CD,得C1B=C1D,即可得C1O⊥DB;由△C1OC≌△C1OD可得C1O⊥OC,即可证得⊥平面ABCD;
(2)如图以O为原点建立如图所示的空间直角坐标系O-xyz.设底面ABCD的边长为2,则${C}_{1}O=CO=DO=AO=BO=\sqrt{2}$,可得O(0,0,0),D($\sqrt{2}$,0,0),A(0,$\sqrt{2}$,0),C(0,-$\sqrt{2}$,0),C1(0,0,$\sqrt{2}$)由$\overrightarrow{C{C}_{1}}=\overrightarrow{D{D}_{1}}$,得${D}_{1}(\sqrt{2},\sqrt{2},\sqrt{2})$.∴$\overrightarrow{O{D}_{1}}=(\sqrt{2},\sqrt{2},\sqrt{2})$,$\overrightarrow{AD}=(\sqrt{2},-\sqrt{2},0)$,设$\overrightarrow{AE}=k\overrightarrow{AD}$=($\sqrt{2}k,-\sqrt{2}k,0)$,(k∈[0,1]),则$\overrightarrow{OE}=\overrightarrow{OA}$+$\overrightarrow{AE}$=$(\sqrt{2}k,\sqrt{2}-\sqrt{2}k,0)$求出面OED1的法向量$\overrightarrow{m}=(k-1,k,1-2k)$,可得面OEA的法向量为$\overrightarrow{n}=(0,0,1)$,由二面角D1-OE-A的余弦值为$\frac{\sqrt{6}}{6}$,解得k=$\frac{1}{3}$,或k=$\frac{2}{3}$,即可.
解答 解:(1)∵$\left\{\begin{array}{l}{{C}_{1}C={C}_{1}C}\\{∠{C}_{1}CB=∠{C}_{1}CD}\\{CD=CB}\end{array}\right.$∴△C1CB≌△C1CD,∴C1B=C1D
∵底面ABCD是正方形,线段AC与BD的交点为O,∴C1O⊥DB
∵$\left\{\begin{array}{l}{{C}_{1}O={C}_{1}O}\\{{C}_{1}C={C}_{1}D}\\{OC=OD}\end{array}\right.$∴△C1OC≌△C1OD,$∠{C}_{1}OD=∠{C}_{1}OC=9{0}^{0}$,即C1O⊥OC
且OC∩OD=O,∴C1O⊥平面ABCD.
(2)如图以O为原点建立如图所示的空间直角坐标系O-xyz.
设底面ABCD的边长为2,则${C}_{1}O=CO=DO=AO=BO=\sqrt{2}$,
可得O(0,0,0),D($\sqrt{2}$,0,0),A(0,$\sqrt{2}$,0),C(0,-$\sqrt{2}$,0),C1(0,0,$\sqrt{2}$)
由$\overrightarrow{C{C}_{1}}=\overrightarrow{D{D}_{1}}$,得${D}_{1}(\sqrt{2},\sqrt{2},\sqrt{2})$.∴$\overrightarrow{O{D}_{1}}=(\sqrt{2},\sqrt{2},\sqrt{2})$,$\overrightarrow{AD}=(\sqrt{2},-\sqrt{2},0)$
设$\overrightarrow{AE}=k\overrightarrow{AD}$=($\sqrt{2}k,-\sqrt{2}k,0)$,(k∈[0,1]),则$\overrightarrow{OE}=\overrightarrow{OA}$+$\overrightarrow{AE}$=$(\sqrt{2}k,\sqrt{2}-\sqrt{2}k,0)$
设面OED1的法向量为$\overrightarrow{m}=(x,y,z)$
由$\left\{\begin{array}{l}{\overrightarrow{m}•\overrightarrow{O{D}_{1}}=\sqrt{2}x+\sqrt{2}y+\sqrt{2}z=0}\\{\overrightarrow{m}•\overrightarrow{OE}=\sqrt{2}kx+(\sqrt{2}-\sqrt{2}k)y=0}\end{array}\right.$,可得$\overrightarrow{m}=(k-1,k,1-2k)$
可得面OEA的法向量为$\overrightarrow{n}=(0,0,1)$
∵二面角D1-OE-A的余弦值为$\frac{\sqrt{6}}{6}$,∴|cos$<\overrightarrow{m},\overrightarrow{n}>$|=$\frac{\sqrt{6}}{6}$.
得9k2-9k+2=0,解得k=$\frac{1}{3}$,或k=$\frac{2}{3}$,
即$λ=\frac{1}{2}或2$λ时,二面角D1-OE-A的余弦值为$\frac{\sqrt{6}}{6}$.
点评 本题考查了空间线面垂直的判定,向量法处理动点问题,考查了运算能力,属于中档题.
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