题目内容
6.设矩阵A满足:A$[\begin{array}{l}{1}&{2}\\{0}&{6}\end{array}]$=$[\begin{array}{l}{-1}&{-2}\\{0}&{3}\end{array}]$,求矩阵A的逆矩阵A-1.分析 设B=$[\begin{array}{l}{1}&{2}\\{0}&{6}\end{array}]$,求得B*,则B-1=$\frac{1}{丨B丨}$×B*,由矩阵的乘法,A=$[\begin{array}{l}{-1}&{-2}\\{0}&{3}\end{array}]$×B-1,即可求得矩阵A,则A-1=$\frac{1}{丨A丨}$×$[\begin{array}{l}{\frac{1}{2}}&{0}\\{0}&{-1}\end{array}]$.,即可求得A-1.
解答 解:A$[\begin{array}{l}{1}&{2}\\{0}&{6}\end{array}]$=$[\begin{array}{l}{-1}&{-2}\\{0}&{3}\end{array}]$,设B=$[\begin{array}{l}{1}&{2}\\{0}&{6}\end{array}]$,则丨B丨=6,B*=$[\begin{array}{l}{6}&{-2}\\{0}&{1}\end{array}]$,
则B-1=$\frac{1}{丨B丨}$×B*=$\frac{1}{6}$×$[\begin{array}{l}{6}&{-2}\\{0}&{1}\end{array}]$=$[\begin{array}{l}{1}&{-\frac{1}{3}}\\{0}&{\frac{1}{6}}\end{array}]$,
A=$[\begin{array}{l}{-1}&{-2}\\{0}&{3}\end{array}]$×B-1=$[\begin{array}{l}{-1}&{-2}\\{0}&{3}\end{array}]$$[\begin{array}{l}{1}&{-\frac{1}{3}}\\{0}&{\frac{1}{6}}\end{array}]$=$[\begin{array}{l}{-1}&{0}\\{0}&{\frac{1}{2}}\end{array}]$,
A=$[\begin{array}{l}{-1}&{0}\\{0}&{\frac{1}{2}}\end{array}]$,丨A丨=-$\frac{1}{2}$,A*=$[\begin{array}{l}{\frac{1}{2}}&{0}\\{0}&{-1}\end{array}]$
A-1=$\frac{1}{丨A丨}$×$[\begin{array}{l}{\frac{1}{2}}&{0}\\{0}&{-1}\end{array}]$=$[\begin{array}{l}{-1}&{0}\\{0}&{2}\end{array}]$,
矩阵A的逆矩阵A-1=$[\begin{array}{l}{-1}&{0}\\{0}&{2}\end{array}]$.
点评 本题考查矩阵与逆矩阵,考查逆矩阵的求法,矩阵的乘法,考查计算能力,属于中档题.
| A. | 2 | B. | 3 | ||
| C. | 4 | D. | 与点位置有关的值 |
如图,在平面直角坐标系xOy中,已知椭圆C:$\frac{{x}^{2}}{{a}^{2}}$+$\frac{{y}^{2}}{{b}^{2}}$=1(a>b>0)的离心率为$\frac{\sqrt{2}}{2}$,且经过点$(0,\;-2\sqrt{2})$,过椭圆的左顶点A作直线l⊥x轴,点M为直线l上的动点(点M与点A不重合),点B为椭圆右顶点,直线BM交椭圆C于点P.| A. | 81π | B. | 16π | C. | $\frac{32π}{3}$ | D. | $\frac{16π}{9}$ |
| A. | (2,3] | B. | [2,3] | C. | (2,3) | D. | [2,3) |
| A. | 3 | B. | -3 | C. | $\sqrt{3}$ | D. | -$\sqrt{3}$ |
| A. | $\frac{1}{5}$ | B. | $-\frac{1}{5}$ | C. | 1 | D. | -1 |