搜索资源列表
MTALABandsimulink
- 用四阶龙格库塔法求非线性系统的输入相应,同时用simulink建模比较。 -Using fourth-order Runge-Kutta method for the corresponding input nonlinear systems, and modeling using simulink comparison.
用四阶龙格库塔法求解
- 用四阶龙格库塔法求解一阶微分方程组的通用程序,C++编写-Fourth-order Runge-Kutta method for solving a common procedure order differential equations, C++ writing
DifferentialEquation
- 利用龙格库塔法(等步长,变步长)计算椭圆方程,双曲线方程,抛物线方程等。对各类微分方程进行数值计算。-The use of Runge-Kutta method (such as step, variable step size) calculated elliptic equations, hyperbolic equations, such as parabolic equation. Various types of differential equations for numerical
four-stepRunge-Kuttastatutoryfour-stepRunge-Kuttam
- 解微分方程(组)的定步长四阶龙格库塔法算法源代码-Solution of differential equations (Group) of fixed step size fourth-order Runge-Kutta method algorithm source code
changweifenfangchengshuzhijie
- 自编常微分方程初值问题的常用算法,包括折线法、改进欧拉法、4阶龙格-库塔法-Self-compiled initial value problems of ordinary differential equations commonly used algorithms, including the broken line method, improved Euler' s method, 4-order Runge- Kutta method
GRKT10
- 最常用的四阶龙格—库塔法求解一阶常微分方程的C语言实现方法-The most commonly used fourth-order Runge- Kutta method for solving a first-order ordinary differential equations of the C language implementation method
LGKT4
- 四阶龙格库塔法解一阶二元微分方程 应用于数值计算-Fourth-order Runge-Kutta method for solving a class of binary differential equations for numerical calculation
runge-kutta
- 四阶龙格-库塔法求微分方程,通过实数编码方法实现简单易懂--Runge- Kutta Method to solve derivative Equations
四阶龙格库塔法解振荡方程VC++实现及画图
- 四阶龙格库塔法解振荡方程VC++实现及画图,一般使用VB编写不能画图,此程序经过改进能很好拟合。
四阶龙格库塔法程序——_FORTRAN语言编写
- 关于Runge-Kutta方法,该方法是用来解形如y'=f(t,y)的常微分方程的经典的4阶R-K方法,用fortran语言编写(With respect to the Runge-Kutta method, the method is used to solve the classical 4 order R-K method of ordinary differential equations such as y'=f (T, y), and is written in FORTRAN la
RDFL_exact
- 龙格库塔法求模拟双包层掺铒光纤激光器的输出功率(we use R-K methods YDFL)
W3
- 里边包括四阶龙格库塔法,属于数值求解方法之一,可用于求解非线性微分方程。(fourth-oeder Runge-Kutta is one of the most efficient method to solve the non-linear differential equation)
ode5
- 定步长五阶龙格库塔法,可解变参微分方程组,亲测可用。。。。。。。。(runge-kutta fixed-step)
RK_numb
- 利用四阶龙格库塔法求解微分方程,可以较快的得到结果(Solving differential equations by using four order Runge Kutta method)
龙格库塔法解振动方程
- 运用龙格库塔法-ode45求解一个多自由度的振动方程,得到振动的时域响应曲线(Using Runge Kutta method, -ode45 solved a multi degree of freedom vibration equation, and obtained the time domain response curve of vibration.)
MATLAB
- MATLAB四阶龙格库塔法 求解微分方程数值解 源程序代码(MATLAB four Runge Kutta method is applied to solve the numerical solution source code of differential equations.)
jsff
- 用四阶龙格-库塔法编写MATLAB程序求解炮弹从初始发射到落地的运动过程(The four order Runge Kutta method is used to write MATLAB program to solve the motion process of projectile from initial launch to landing.)
龙格库塔法求解微分方程
- 运用龙格库塔法实现了x'=-Lx的微分方程求解,内有注释,简单明了
四阶龙格库塔法
- 四阶龙格库塔法以及梆梆控制的程序,在最优控制中应用非常广泛,该程序具有学习指导作用
龙格库塔法
- 使用MATLAB仿真软件,实现4阶龙格库塔法求解常微分方程,结果精确