$\left|\boldsymbol{A}^{*}\right|$ $=$ $|\boldsymbol{A}|^{n-1}$
$\left|\boldsymbol{A}^{-1}\right|$ $=$ $\frac{1}{|\boldsymbol{A}|}$
$\left|\boldsymbol{A}^{k}\right|$ $=$ $|\boldsymbol{A}|^{k}$
$|\boldsymbol{A B}|$ $=$ $|\boldsymbol{B} \boldsymbol{A}|$ $=$ $|\boldsymbol{A}||\boldsymbol{B}|$
$|\lambda \boldsymbol{A}|$ $=$ $\lambda^{n}$ $|\boldsymbol{A}|$
$\left|\boldsymbol{A}^{\mathrm{T}}\right|$ $=$ $|\boldsymbol{A}|$
则,下面对该行列式的计算结果,正确的是哪个?
$\left|\begin{array}{ccc} 1 & 1 & 1 \\ x_{1} & x_{2} & x_{3} \\ x_{1}^{2} & x_{2}^{2} & x_{3}^{2} \end{array}\right|$ $=$ $\left(x_{2}-x_{1}\right)$ $\cdot$ $\left(x_{3}-x_{1}\right)$ $\cdot$ $\left(x_{3}-x_{2}\right)$
范德蒙行列式的通用计算方式如下:
$\left|\begin{array}{ccccc} 1 & 1 & 1 & \cdots & 1 \\ x_{\textcolor{orange}{1}} & x_{\textcolor{orange}{2}} & x_{\textcolor{orange}{3}} & \cdots & x_{\textcolor{orange}{n}} \\ x_{\textcolor{orange}{1}}^{\textcolor{cyan}{2}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{2}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{2}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{2}} \\ \vdots & \vdots & \vdots & & \vdots \\ x_{\textcolor{orange}{1}}^{\textcolor{cyan}{n-1}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{n-1}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{n-1}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{n-1}} \end{array}\right|$ $=$
$\prod_{1 \leq j < i \leq n}$ $\left(x_{i} – x_{j} \right)$
总结:用右边的元素把左边的元素全减一遍并相乘。
$D_{n}$ $=$ $\left|\begin{array}{ccc} 1 & 1 & 1 \\ x_{1} & x_{2} & x_{3} \\ x_{1}^{2} & x_{2}^{2} & x_{3}^{2} \end{array}\right|$
范德蒙行列式的通用形式:
$\left|\begin{array}{ccccc} x_{\textcolor{orange}{1}}^{\textcolor{cyan}{0}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{0}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{0}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{0}} \\ x_{\textcolor{orange}{1}}^{\textcolor{cyan}{1}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{1}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{1}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{1}} \\ x_{\textcolor{orange}{1}}^{\textcolor{cyan}{2}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{2}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{2}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{2}} \\ \vdots & \vdots & \vdots & & \vdots \\ x_{\textcolor{orange}{1}}^{\textcolor{cyan}{n-1}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{n-1}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{n-1}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{n-1}} \end{array}\right|$ $\Rightarrow$
$\left|\begin{array}{ccccc} 1 & 1 & 1 & \cdots & 1 \\ x_{\textcolor{orange}{1}} & x_{\textcolor{orange}{2}} & x_{\textcolor{orange}{3}} & \cdots & x_{\textcolor{orange}{n}} \\ x_{\textcolor{orange}{1}}^{\textcolor{cyan}{2}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{2}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{2}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{2}} \\ \vdots & \vdots & \vdots & & \vdots \\ x_{\textcolor{orange}{1}}^{\textcolor{cyan}{n-1}} & x_{\textcolor{orange}{2}}^{\textcolor{cyan}{n-1}} & x_{\textcolor{orange}{3}}^{\textcolor{cyan}{n-1}} & \cdots & x_{\textcolor{orange}{n}}^{\textcolor{cyan}{n-1}} \end{array}\right|$.
则,如果利用 $A$ 和 $B$ 对行列式 $D$ 作化简运算?
$\left|\begin{array}{cc} \boldsymbol{O} & \boldsymbol{\textcolor{orange}{A}} \\ \boldsymbol{\textcolor{cyan}{B}} & \boldsymbol{C} \end{array}\right|$ $=$ $(-1)^{mn}$ $|\boldsymbol{\textcolor{orange}{A}}||\boldsymbol{\textcolor{cyan}{B}}|$
则,如果利用 $A$ 和 $B$ 对行列式 $D$ 作化简运算?
$\left|\begin{array}{ll} \boldsymbol{C} & \boldsymbol{\textcolor{orange}{A}} \\ \boldsymbol{\textcolor{cyan}{B}} & \boldsymbol{O} \end{array}\right|$ $=$ $(-1)^{mn}$ $|\boldsymbol{\textcolor{orange}{A}}||\boldsymbol{\textcolor{cyan}{B}}|$
则,如果利用 $A$ 和 $B$ 对行列式 $D$ 作化简运算?
$\left|\begin{array}{ll} \boldsymbol{O} & \boldsymbol{\textcolor{orange}{A}} \\ \boldsymbol{\textcolor{cyan}{B}} & \boldsymbol{O} \end{array}\right|$ $=$ $(-1)^{mn}$ $|\boldsymbol{\textcolor{orange}{A}}||\boldsymbol{\textcolor{cyan}{B}}|$
则,如果利用 $A$ 和 $B$ 对行列式 $D$ 作化简运算?
$\left|\begin{array}{ll} \boldsymbol{\textcolor{orange}{A}} & \boldsymbol{O} \\ \boldsymbol{C} & \boldsymbol{\textcolor{cyan}{B}} \end{array}\right|$ $=$ $|\boldsymbol{\textcolor{orange}{A}}||\boldsymbol{\textcolor{cyan}{B}}|$
则,如果利用 $A$ 和 $B$ 对行列式 $D$ 作化简运算?
$\left|\begin{array}{ll} \boldsymbol{\textcolor{orange}{A}} & \boldsymbol{C} \\ \boldsymbol{O} & \boldsymbol{\textcolor{cyan}{B}} \end{array}\right|$ $=$ $|\boldsymbol{\textcolor{orange}{A}}||\boldsymbol{\textcolor{cyan}{B}}|$
则,如果利用 $A$ 和 $B$ 对行列式 $D$ 作化简运算?
$\left|\begin{array}{ll} \boldsymbol{\textcolor{orange}{A}} & \boldsymbol{O} \\ \boldsymbol{O} & \boldsymbol{\textcolor{cyan}{B}} \end{array}\right|$ $=$ $|\boldsymbol{\textcolor{orange}{A}}||\boldsymbol{\textcolor{cyan}{B}}|$
则,该行列式 $D$ $=$ $?$
$\left|\begin{array}{cccc} 0 & & & \lambda_{1} \\ & & \lambda_{2} & * \\ & \cdots\ & \vdots & \vdots \\ \lambda_{n} & \cdots & * & * \end{array}\right|$ $=$ $(-1)^{\frac{n(n-1)}{2}}$ $\lambda_{1}$ $\lambda_{2}$ $\cdots$ $\lambda_{n}$
