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gaosixiaoyuanfa
- 高斯消去法是求解线性方程组的基础的重要方法,也是计算机上常用的解低阶稠密矩阵方程组的有效方法。,高斯消去法或称高斯-约当消去法,由高斯和约当得名(很多人将高斯消去作为完整的高斯-约当消去的前半部分),它是线性代数中的一个算法,用于决定线性方程组的解,决定矩阵的秩,以及决定可逆方矩阵的逆。当用于一个矩阵时,高斯消去产生“行消去梯形形式”。-Gaussian elimination is the basis for solving line
Gauss_Jordan
- 全选主元Gauss-Jordan消去法求解线性代数方程组。其中a是方程组系数矩阵,b先存右端的m组常数向量,之后存解向量。n是阶数,m是右端常数向量组数。-Select the main element Gauss-Jordan Elimination method for solving linear algebraic equations. Where a is the coefficient matrix, b right sid
C_J_Complex
- 采用全选主元高斯-约当消去法求解复系数线性代数方程组。其中ar存放复系数矩阵实部,ai存放复系数矩阵虚部。br存放右端复常数向量实部,返回解向量实部;bi存放右端复常数向量虚部,返回解向量虚部。-With full pivoting Gauss- Jordan elimination method for solving linear algebraic equations with complex coefficients. Whic
BaseMath
- C#实现的基本数值算法:利用高斯消元法求线性方程组的解、利用约当消元法求线性方程组的解、一元非线性方程实根的数值算法及程序实现-C# implementation of basic numerical algorithms: Gaussian elimination method of solution of linear equations using Jordan Elimination Method of linear equat
jordanMatrix
- 基于MPI的jordan算法求解矩阵方程,运行前需安装第三方插件MPICH-MPI algorithm based on Jordan matrix equation, third-party plug-ins to be installed before running MPICH
gausjord
- gause-jordan method it is m-file
metodo_de_gauss_jordan.2977
- Reduccion por metodo de gaus jordan
gausjord
- Gauss-Jordan routine, single RHS
Jor
- 用matlab实现使用约当消去法实现Ax=b的实验及算法-Use with matlab Jordan elimination method to achieve realization of Ax = b of the experiment and algorithm
Gau_jor
- 求线性方程组的列主元Gauss-jordan消元法-Linear Equations of the column main element Gauss-jordan elimination method
inv
- 用Gauss-Jordan消去法求N阶实矩阵A的逆矩阵-Gauss-Jordan elimination method using N-order real matrix A find the inverse matrix
JORDAN2
- This is program gauss jordan in C++ this is very usefull for studennt
Gaus_jor
- The Gauss-Jordan Method a quick introduction
GJ-elim
- gauss jordan elimination part 2
Equation-Set-Solution-All-Methods
- This software source allows you to solve equation by 2 methods Gauss & Gauss-Jordan
inv_matric
- 自己编写的一个基于高斯约当消元算法的矩阵求逆运算,比较小巧实用,方便移植-I have written a Gauss Jordan Elimination on the matrix inversion algorithm, more compact and practical, easy to transplant
EliminasiGaussJordan
- gauss jordan elimination method
rinv
- 用C++语言实现求一般矩阵的逆。方法为高斯约当法。-C++ language by Finding the inverse matrix. Methods for the Gauss Jordan method.
Method-for-solving-EM-problems
- 提出了一种求解电磁场有限元 边界元混合法所生成的线性方程组的有效方法 ———内观 法结合多波前法.由于该线性方程组的系数是一个部分稀疏部分满填充的矩阵,为了加速求解,应用内观法将系数矩阵分为 2块,一块是有限元法形成的稀疏矩阵,另一块是边界元法生成的满阵,然后用多波前法求解稀疏矩阵方程,用高斯 约当消去法解满阵方程. 采用该方法,计算了二维多层介质柱体的雷达散射截面.计算结果表明,该方法的计算效率远远高于传统的高斯法.-Propos
gos_os
- A Game of Stones is a browser-based Massively Multiplayer Online Role Playing Game (MMORPG) set in the universe of Robert Jordan s Wheel of Time series. You control your character as he/she duels other players, battles N