由非齐次线性方程组解的结构给出静态工作点的基础解;
Then, the basic solution set of conical magnetic bearing static operation points is given based on the solution structure of linear equation group.
给出了一个判定齐次线性方程组存在全非零解的充分必要条件。
We present a necessary and sufficient conditions of homogeneous linearity equations existing all-nonzero solution.
借助于辅助变量,或辅助平面,提出了齐次线性方程组的图解法。
With the help of auxiliary variables or plane, a graphical solution for homogeneous linear equations is presented.
本文对这一几何问题利用齐次线性方程组给予了代数方法的又一种证明。
This article given another kind of proof using algebra method by system of homogeneous linear equations to the geometry question.
给出了求齐次线性方程组正交的基础解系的一个简便方法和一个应用实例。
A simple method for the orthogonal fundamental solution of homogeneous linear equation system and the example in its application are given.
通过分析发现,预应力设计的结果实际上就是一个齐次线性方程组的解空间。
The result of the prestress design is actually the solution space of a homogeneous linear equation set.
通过分析发现,预应力设计的结果实际上就是一个齐次线性方程组的解空间。
The result of the prestress design is actually the solution space of a homo...
在线性方程组有解判别定理的基础上,给出了一个判定非齐次线性方程组存在全非零解的方法。
On the basis of the solution identification theorem in linear equations, a method is presented to ascertain whether there exists all-nonzero solutions to an inhomogeneous linear equation.
在线性方程组有解判别定理的基础上,给出了一个判定非齐次线性方程组存在全非零解的方法。
Homogeneous linear equations of n-variables have the non-zero solutions when the rank of its matrix is less than n.
利用齐次线性方程组解的理论讨论矩阵的秩,给出几个关于矩阵秩的著名不等式的证明,并证明了两个命题。
The article discusses rank of a matrix by the solution theorem of system of homogeneous linear equations, and proves several famous inequalities and two propositions on rank of a matrix.
利用齐次线性方程组解的理论讨论矩阵的秩,给出几个关于矩阵秩的著名不等式的证明,并证明了两个命题。
The judgment theorems for locating correctness were concluded by skillfully combining the solutions of homogenous linear equations with locating schemes.
将行列式的值、矩阵的秩、齐次线性方程组的解等知识运用于向量组线性相关性判定,归纳出六种判定向量组线性相关性的方法。
The judging methods of the vectors group related dependence from determinant values, rank of matrix, solution of system of linear equations etc were studied.
将行列式的值、矩阵的秩、齐次线性方程组的解等知识运用于向量组线性相关性判定,归纳出六种判定向量组线性相关性的方法。
The judging methods of the vectors group related dependence from determinant values, rank of matrix, solution of system of linear equations etc were studied.
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