题目内容
13.在长方体ABCD-A1B1C1D1中,如果对角线AC1与过点A的相邻三个面所成的角分别是α,β,γ,那么cos2α+cos2β+cos2γ=2.分析 由已知得cosα=$\frac{A{B}_{1}}{A{C}_{1}}$,cosβ=$\frac{A{D}_{1}}{A{C}_{1}}$,cosγ=$\frac{AC}{A{C}_{1}}$,由此能求出cos2α+cos2β+cos2γ的值.
解答 
解:∵在长方体ABCD-A1B1C1D1中,B1C1⊥面AB1,
∴AC1与面AB1所成的角为∠C1AB1=α,
同理AC1与面AD1所成的角为∠C1AD1=β,
AC1与面AC所成的角为∠C1AC=γ,
∵cosα=$\frac{A{B}_{1}}{A{C}_{1}}$,cosβ=$\frac{A{D}_{1}}{A{C}_{1}}$,cosγ=$\frac{AC}{A{C}_{1}}$,
∴cos2α+cos2β+cos2γ
=$\frac{A{{B}_{1}}^{2}}{A{{C}_{1}}^{2}}$+$\frac{A{{D}_{1}}^{2}}{A{{C}_{1}}^{2}}$+$\frac{A{C}^{2}}{A{{C}_{1}}^{2}}$
=$\frac{A{B}^{2}+A{{A}_{1}}^{2}}{A{{C}_{1}}^{2}}$+$\frac{A{D}^{2}+A{{A}_{1}}^{2}}{A{{C}_{1}}^{2}}$+$\frac{A{B}^{2}+A{D}^{2}}{A{{C}_{1}}^{2}}$
=$\frac{2(A{B}^{2}+A{D}^{2}+A{{A}_{1}}^{2})}{A{{C}_{1}}^{2}}$
=$\frac{2A{{C}_{1}}^{2}}{A{{C}_{1}}^{2}}$
=2.
故答案为:2.
点评 本题考查线面角的余弦值的平方和的求法,是中档题,解题时要认真审题,注意长方体的性质的合理运用.
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