1) Jordan canonical form
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约当标准形<自>
2) Jordan Canonical Form
![点击朗读](/dictall/images/read.gif)
约当标准形
1.
Count of Transformation Matrix of Complex Matrix Jordan Canonical Form;
![点击朗读](/dictall/images/read.gif)
关于方阵的约当标准形的变换矩阵的计算
3) jordan canonical form of matrix
![点击朗读](/dictall/images/read.gif)
矩阵的约当标准形
4) Jordan canonical form
![点击朗读](/dictall/images/read.gif)
约当标准型
1.
The basic solution matrix of linear homogeneous system with constant coefficients is found completely through using Jordan canonical form.
利用约当标准型求解常系数齐次线性微分方程组基解矩阵。
5) Jordan canonical form
![点击朗读](/dictall/images/read.gif)
若当标准形
1.
The theory of matrix s Jordan canonical form is a important theory in linear algebra.
![点击朗读](/dictall/images/read.gif)
若当标准形定理是线性代数的一个重要定理 。
2.
By jordan canonical form of a matrix gave one necessary and sufficient conditions of of the matrix equation having the uniquesolution,according to the above gives two important deduction.
利用矩阵的若当标准形给出了矩阵方程Am×mX+X Bn×n=Cm×n有唯一解的一个充要条件,并据此给出了两个重要的推论。
3.
The method to calculate an invertible matrix is introduced, when matrix is similar to Jordan canonical form.
给出矩阵与若当标准形相似时所使用可逆矩阵的求法 ,并借用若当标准形简化计算矩阵多项式和解线性微分方程
6) Jordan standard form
![点击朗读](/dictall/images/read.gif)
若当标准形
1.
Applying the theory of the characteristic polynomial and characteristic root,this article introduces a few solution to the Jordan standard form of complex coeffieient three rank matrix in advanced algebra,making use of well known conclusions.
运用特征多项式及特征根理论 ,借助已知的几个结论 ,探讨高等代数中三阶复系数矩阵的若当标准形的若干求法 。
补充资料:德国国家标准(见德国标准化学会、德国标准体系)
德国国家标准(见德国标准化学会、德国标准体系)
National Standards of Germany: see Deutsches Institut für Normung, DIN;standards system of Germany
Oeguo Guol心日icozhun德国国家标准(Natio.吐S加Ln山切曲of Gen”旧ny)见德国标准化学会;德国标准体系。
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