文件名称:MATLAB
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常用matlab数据运算的程序和集,是学习matlab
与数学的不错源码-Commonly used Matlab data operation of the program and set a good source to learn matlab with math
与数学的不错源码-Commonly used Matlab data operation of the program and set a good source to learn matlab with math
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《MATLAB语言常用算法程序集》一书 的源程序\光盘的算法程序索引.xls
.........................................\第10章 非线性方程组求解\DiffParam1.m
.........................................\........................\DiffParam2.m
.........................................\........................\mulBFS.m
.........................................\........................\mulConj.m
.........................................\........................\mulDamp.m
.........................................\........................\mulDFP.m
.........................................\........................\mulDiscNewton.m
.........................................\........................\mulDNewton.m
.........................................\........................\mulFastDown.m
.........................................\........................\mulGSND.m
.........................................\........................\mulGXF1.m
.........................................\........................\mulGXF2.m
.........................................\........................\mulMix.m
.........................................\........................\mulNewton.m
.........................................\........................\mulNewtonSOR.m
.........................................\........................\mulNewtonStev.m
.........................................\........................\mulNumYT.m
.........................................\........................\mulRank1.m
.........................................\........................\mulSimNewton.m
.........................................\........................\mulStablePoint.m
.........................................\........................\mulVNewton.m
.........................................\........................\SOR.m
.........................................\...1章 解线性方程组的直接法\conjgrad.m
.........................................\............................\Crout.m
.........................................\............................\Doolittle.m
.........................................\............................\followup.m
.........................................\............................\GaussJordanXQ.m
.........................................\............................\GaussXQAllMain.m
.........................................\............................\GaussXQByOrder.m
.........................................\............................\GaussXQLineMain.m
.........................................\............................\InvAddSide.m
.........................................\............................\qrxq.m
.........................................\............................\SymPos1.m
.........................................\............................\SymPos2.m
.........................................\............................\SymPos3.m
.........................................\............................\Yesf.m
.........................................\...2章 解线性方程组的迭代法\BGS.m
.........................................\............................\BJ.m
.........................................\............................\BSOR.m
.........................................\............................\conjgrad.m
.........................................\............................\crs.m
.........................................\............................\fastdown.m
.........................................\............................\gauseidel.m
.........................................\............................\grs.m
.........................................\............................\jacobi.m
.........................................\............................\JOR.m
.........................................\............................\preconjgrad.m
.........................................\............................\richason.m
.........................................\............................\rs.m
.........................................\............................\SOR.m
.........................
.........................................\第10章 非线性方程组求解\DiffParam1.m
.........................................\........................\DiffParam2.m
.........................................\........................\mulBFS.m
.........................................\........................\mulConj.m
.........................................\........................\mulDamp.m
.........................................\........................\mulDFP.m
.........................................\........................\mulDiscNewton.m
.........................................\........................\mulDNewton.m
.........................................\........................\mulFastDown.m
.........................................\........................\mulGSND.m
.........................................\........................\mulGXF1.m
.........................................\........................\mulGXF2.m
.........................................\........................\mulMix.m
.........................................\........................\mulNewton.m
.........................................\........................\mulNewtonSOR.m
.........................................\........................\mulNewtonStev.m
.........................................\........................\mulNumYT.m
.........................................\........................\mulRank1.m
.........................................\........................\mulSimNewton.m
.........................................\........................\mulStablePoint.m
.........................................\........................\mulVNewton.m
.........................................\........................\SOR.m
.........................................\...1章 解线性方程组的直接法\conjgrad.m
.........................................\............................\Crout.m
.........................................\............................\Doolittle.m
.........................................\............................\followup.m
.........................................\............................\GaussJordanXQ.m
.........................................\............................\GaussXQAllMain.m
.........................................\............................\GaussXQByOrder.m
.........................................\............................\GaussXQLineMain.m
.........................................\............................\InvAddSide.m
.........................................\............................\qrxq.m
.........................................\............................\SymPos1.m
.........................................\............................\SymPos2.m
.........................................\............................\SymPos3.m
.........................................\............................\Yesf.m
.........................................\...2章 解线性方程组的迭代法\BGS.m
.........................................\............................\BJ.m
.........................................\............................\BSOR.m
.........................................\............................\conjgrad.m
.........................................\............................\crs.m
.........................................\............................\fastdown.m
.........................................\............................\gauseidel.m
.........................................\............................\grs.m
.........................................\............................\jacobi.m
.........................................\............................\JOR.m
.........................................\............................\preconjgrad.m
.........................................\............................\richason.m
.........................................\............................\rs.m
.........................................\............................\SOR.m
.........................