题目内容
12.矩阵A=$[\begin{array}{l}{a}&{k}\\{0}&{1}\end{array}]$(k≠0)的一个特征向量为$\overrightarrow{a}$=$[\begin{array}{l}k\\-1\end{array}]$,A的逆矩阵A-1对应的变换将点(3,1)变为点(1,1).则a+k=3.分析 由$[\begin{array}{l}{a}&{k}\\{0}&{1}\end{array}]$$[\begin{array}{l}k\\-1\end{array}]$=λ$[\begin{array}{l}k\\-1\end{array}]$,即$\left\{\begin{array}{l}{ak-k=kλ}\\{-1=-λ}\end{array}\right.$,由k≠0,解得:$\left\{\begin{array}{l}{λ=1}\\{a=2}\end{array}\right.$,根据矩阵的运算性质可知:A$[\begin{array}{l}{1}\\{1}\end{array}]$=$[\begin{array}{l}{3}\\{1}\end{array}]$,$[\begin{array}{l}{2}&{k}\\{0}&{1}\end{array}]$$[\begin{array}{l}{1}\\{1}\end{array}]$=$[\begin{array}{l}{3}\\{1}\end{array}]$,即可求得k的值,求得a+k的值.
解答 解:设特征向量为$\overrightarrow{a}$=$[\begin{array}{l}k\\-1\end{array}]$,对应的特征值为λ,λ,
则$[\begin{array}{l}{a}&{k}\\{0}&{1}\end{array}]$$[\begin{array}{l}k\\-1\end{array}]$=λ$[\begin{array}{l}k\\-1\end{array}]$,即$\left\{\begin{array}{l}{ak-k=kλ}\\{-1=-λ}\end{array}\right.$,
由k≠0,解得:$\left\{\begin{array}{l}{λ=1}\\{a=2}\end{array}\right.$,
由A-1$[\begin{array}{l}{3}\\{1}\end{array}]$=$[\begin{array}{l}{1}\\{1}\end{array}]$,即A$[\begin{array}{l}{1}\\{1}\end{array}]$=$[\begin{array}{l}{3}\\{1}\end{array}]$,
$[\begin{array}{l}{2}&{k}\\{0}&{1}\end{array}]$$[\begin{array}{l}{1}\\{1}\end{array}]$=$[\begin{array}{l}{3}\\{1}\end{array}]$,即$\left\{\begin{array}{l}{2+k=3}\\{1=1}\end{array}\right.$,解得:k=1,
∴a+k=2+1=3,
故答案为:3.
点评 本题考查矩阵的运算,考查矩阵的特征值与特征向量的计算,考查计算能力,属于中档题.
如图,在四棱锥P-ABCD中,平面PAD⊥平面ABCD,△PAD是等边三角形,底面ABCD是边长为2的菱形,∠BAD=60°,E是AD的中点,F是PC的中点.