搜索资源列表
求解线性代数方程组
- 线性代数方程组的求解全选主元高斯消去法全选主元高斯约当消去法复系数方程组的全选主元高斯消去法-linear algebraic equations to solve all the main election yuan Gaussian Elimination entire election PCA about when Gaussian Elimination of complex equations of the entire election PCA Gaussian Eliminatio
矩阵的运算
- 矩阵运算实矩阵相乘复矩阵相乘实矩阵求逆的全选主元高斯约当法-matrix calculation real matrix multiplication complex matrix multiplication matrix inversion is a wholly-elected PCA Gaussian about when France, etc.
chenagaus
- 求解大型稀疏方程组的全选主元高斯-约当消去法--返回零表示原方程组的系数矩阵奇异,返回的标志值不为零,则表示正常返回。-solving large sparse linear system-wide elections PCA Gauss-Jordan elimination method -- to return to the original equation is expressed by the coefficient matrix, a sign of the return value
Matrix.rar
- 关于求矩阵秩的程序,用高斯—约当消元法实现,On the procedure for matrix rank, using Gauss- Jordan elimination method to achieve
xxfc
- 全主元高斯约当消去法 2.LU分解法 3.追赶法 4.五对角线性方程组解法 5.线性方程组解的迭代改善 6.范德蒙方程组解法 7.托伯利兹方程组解法 8.奇异值分解 9.线性方程组的共轭梯度法 10.对称方程组的乔列斯基分解法 11.矩阵的QR分解 12.松弛迭代法-PCA-wide Gauss Jordan elimination method 2.LU decomposition method 3. To catch up with law 4.
gauss_joud
- 本程序实现了在数值分析中矩阵的高斯——约当算法-This procedure has in the numerical analysis of the Gaussian matrix- about when the algorithm
VisualC
- 全主元高斯-约当(Gauss-Jordan)消去法-PCA-wide Gauss- Jordan (Gauss-Jordan) elimination method
include
- 用全选主元高斯约当消去法求N阶复矩阵的逆矩阵其中A=AR+JAI-Select All PCA using Gauss Jordan elimination method for N-order complex matrix in which the inverse matrix A = AR+ JAI
juzhengjiuni
- 矩阵求逆,经典算法,全主元高斯约当法,使用VC++开发-Matrix inversion, the classic algorithm, the entire principal Gauss Jordan method, using VC++ development
pointcloudpeizhun
- 根据标靶的坐标(控制点),运用高斯-约当法进行矩阵的求逆和转换,进行三维点云数据的配准,输入数据文件在压缩包中有原例,请参考!-In accordance with the target coordinates (control points), the use of Gauss- Jordan method of matrix inversion and transformation, three-dimensional point cloud data registration, enter
CH1
- 1.1 全选主元高斯消去法agaus.c 1.2 全选主元高斯-约当消去法agjdn.c-1.1 Select pivot Gaussian elimination agaus.c 1.2 Select pivot Gauss- Jordan elimination agjdn.c
inverse
- 主要内容:在visual studio上实现矩阵求逆的过程 矩阵求逆:用全选主元高斯约当消去法求n阶是矩阵A的逆矩阵A-1。其中包括矩阵求逆算法描述 -Main elements: the visual studio to achieve the process of matrix inversion matrix inversion: The Select pivot Gauss Jordan elimination order to n-order matrix A is the i
gaosiyuedangfa
- 建立网孔电流方程,使用高斯约当法求解,将结果保存在txt格式的文档中-The establishment of mesh-current equations, using Gauss Jordan Method, the results saved in txt format document
GaussJordan
- 利用高斯约当方法,求解线性方程组,包括VC++源码以及运行程序-Gauss-Jordan
liezu
- 全主元高斯-约当消元法 可以求解线性方程组-All Principal Gauss- Jordan elimination method for solving linear equations can be
Delphi_SHU
- 本书目录列表: 第1章线性代数方程组的解法 1.全主元高斯约当消去法 2.LU分解法 3.追赶法 4.五对角线性方程组解法 5.线性方程组解的迭代改善 -Directory listing of this book: Chapter 1 of the solution of linear algebraic equations 1. The whole PCA Gauss Jordan elimination 2.LU decomposition 3. To catc
Gauss-Jordan
- 高斯约当迭代法,是消元法的一种,很好用的原代码-Gauss-Jordan
LECalculator
- 3.1 线性方程组类设计 3.2 全选主元高斯消去法 3.3 全选主元高斯-约当消去法 3.4 复系数方程组的全选主元高斯消去法 3.5 复系数方程组的全选主元高斯-约当消去法 3.6 求解三对角线方程组的追赶法 3.7 一般带型方程组的求解 3.8 求解对称方程组的分解法 3.9 求解对称正定方程组的平方根法 3.10 求解大型稀疏方程组的全选主元高斯-约当消去法 3.11 求解托伯利兹方程组的列文逊方法 3.12 高斯-赛德尔
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