题目内容
19.
如图,正四棱柱ABCD-A1B1C1D1中,AA1=2AB=4,点E在CC1上且C1E=3EC.(Ⅰ)证明:A1C⊥平面BED;
(Ⅱ)求向量$\overrightarrow{{A_1}C}$和$\overrightarrow{D{C_1}}$所成角的余弦值.
分析 (Ⅰ)建立空间直角坐标系,求出$\overrightarrow{{A}_{1}C}$•$\overrightarrow{BD}$=0,$\overrightarrow{{A}_{1}C}$•$\overrightarrow{DE}$=0,证明A1C⊥平面DBE.
(Ⅱ)根据向量的夹角公式,即可求出余弦值.
解答 
解:(Ⅰ)以D为坐标原点,射线DA为x轴的正半轴,建立如图所示直角坐标系D-xyz.
依题设,B(2,2,0),C(0,2,0),E(0,2,1),A1(2,0,4),C1=(0,2,4),D(0,0,0)
$\overrightarrow{DE}$=(0,2,1),$\overrightarrow{DB}$=(2,2,0),$\overrightarrow{{A}_{1}C}$=(-2,2,-4),$\overrightarrow{D{C}_{1}}$=(0,2,4),
∴$\overrightarrow{{A}_{1}C}$•$\overrightarrow{BD}$=-2×2+2×2+0×(-4)=0,$\overrightarrow{{A}_{1}C}$•$\overrightarrow{DE}$=0+4-4=0
∴A1C⊥BD,A1C⊥DE
又DB∩DE=D,
∴A1C⊥平面DBE.
(Ⅱ)∵$\overrightarrow{{A}_{1}C}$=(-2,2,-4),$\overrightarrow{D{C}_{1}}$=(0,2,4),
∴$\overrightarrow{{A}_{1}C}$•$\overrightarrow{D{C}_{1}}$=-2×0+2×2+(-4)×4=-12,|$\overrightarrow{{A}_{1}C}$|=$\sqrt{4+4+16}$=2$\sqrt{6}$,$\overrightarrow{D{C}_{1}}$=$\sqrt{0+4+16}$=2$\sqrt{5}$
∴cos<$\overrightarrow{{A_1}C}$,$\overrightarrow{D{C_1}}$>=$\frac{\overrightarrow{{A}_{1}C}•\overrightarrow{D{C}_{1}}}{|\overrightarrow{{A}_{1}C}|•|\overrightarrow{D{C}_{1}}|}$=$\frac{-12}{2\sqrt{6}•2\sqrt{5}}$=$-\frac{{\sqrt{30}}}{10}$.
点评 本题考查直线与平面垂直的判定,线线角的求法,考查空间想象能力,逻辑思维能力,是中档题.
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