题目内容
15.已知△ABC三个顶点的坐标分别是A(0,2),B(1,1),C(1,3).若△ABC在一个切变变换T作用下变为△A1B1C1,其中B(1,1)在变换T作用下变为点B1(1,-1).(1)求切变变换T所对应的矩阵M;
(2)将△A1B1C1绕原点按顺时针方向旋转45°后得到△A2B2C2.求B1变化后的对应点B2的坐标.
分析 (1)利用待定系数法,求切变变换T所对应的矩阵M;
(2)利用切变变换,求B1变化后的对应点B2的坐标.
解答 解:(1)设$M=[\begin{array}{l}1\\ c\end{array}\right.,\left.\begin{array}{l}b\\ 1\end{array}]$,则有$[\begin{array}{l}1\\ c\end{array}\right.,\left.\begin{array}{l}b\\ 1\end{array}][\begin{array}{l}1\\ 1\end{array}]=[\begin{array}{l}1\\-1\end{array}]$得$\left\{\begin{array}{l}b=0\\ c=-2\end{array}\right.$
所以$M=[\begin{array}{l}1\\-2\end{array}\right.,\left.\begin{array}{l}0\\ 1\end{array}]$…(7分)
(2)由$[\begin{array}{l}cos({-{{45}^0}})\\ sin({-{{45}^0}})\end{array}\right.,\left.\begin{array}{l}-sin({-{{45}^0}})\\ cos({-{{45}^0}})\end{array}][\begin{array}{l}1\\-1\end{array}]=[\begin{array}{l}\frac{{\sqrt{2}}}{2}\\-\frac{{\sqrt{2}}}{2}\end{array}\right.,\left.\begin{array}{l}\frac{{\sqrt{2}}}{2}\\ \frac{{\sqrt{2}}}{2}\end{array}][\begin{array}{l}1\\-1\end{array}]=[\begin{array}{l}0\\-\sqrt{2}\end{array}]$
得B2(0,$-\sqrt{2}$)…(15分)
点评 本题考查切变变换,考查学生的计算能力,属于中档题.
| X | 0 | a | 6 |
| P | 0.3 | 0.6 | b |
