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龙格库塔求解微分方程数值解
- 龙格库塔求解微分方程数值解,非常有用的解题方法,一定会用到-Runge - Kutta numerical solution of differential equations to solve, a very useful method of solving problems, we will use
cal_direct
- 用龙格-库塔法直接解算微分方程,程序中的例子是求解10个线性微分方程组-using the Runge - Kutta method direct solution differential equations, the procedures for example is 10 linear equations
lgkt
- 用四阶龙格-库塔法求解微分方程初值问题 按照时间输出
digital
- 高阶微分方程分解成为两个方程后,使用改进欧拉法&龙格-库塔 解 高阶微分方程。
fuchitu
- 老虎吃兔子是一个典型的非线性系统,当老虎数量多的时候,兔子就容易被吃,兔子数量减少,兔子数量较少,老虎捕兔困难,老虎就饿死,老虎数量减少后,兔子繁殖加快,从而使得兔子数量增加,老虎捕食又变得容易了。利用C语言编程、利用4阶龙格-库塔法就可验证老虎与兔子的非线性生态现象。
龙格--库塔法
- 龙格-库塔法是工程中常用的求解微分方程的一种方法.而且具有四阶精度,因此应用很广泛.改程序给出了其源代码.-Runge - Kutta method is commonly used in engineering solving a differential equation methods. But with four bands precision, it is widely used. Changed its procedures is the source code.
龙格库塔法求解微分方程组
- 打靶法结合龙格库塔法求解微分方程组
龙格库塔法解常微分方程
- 解常微分方程的龙格库塔法C源程序
4阶龙格库塔
- 用C++编写的4阶龙格库塔公式
龙格库塔法 求微分方程 fortran
- 龙格库塔法 求微分方程 fortran,希望对大家有帮助
四阶龙格库塔法解一阶二元微分方程
- 四阶龙格库塔法解一阶二元微分方程 //dxi/dt=c*(xi-xi^3/3+yi)+K*(X-xi)+c*zi //dyi/dt=(xi-b*yi+a)/c //i=1,2,3 //X=sum(xi)/N
用指数龙格库塔方法求解时滞
- 用指数龙格库塔方法求解时滞(延迟)微分方程!,Using index method Runge-Kutta time-delay (delay) differential equations!
longgeceshi 四阶龙格库塔法解微分方程组实例
- 四阶龙格库塔法解微分方程组实例,没有调用函数,而是在基本含义基础上进行编译,有助于对龙格库塔法的理解。-Fourth-order Runge-Kutta method for solving differential equations instance, did not call the function, but on the basis of the basic meaning of compiler, contribute to the understanding of Runge-Ku
RungeKutta.rar
- 四阶龙格-库塔法模拟粒子三维空间轨迹,需给出立场函数,3D simulation of particle dynamic trajectories by Fourth-order Runge- Kutta method
MyRunge_Kutta
- 实现四阶龙格库塔算法,求解非线性方程或是非线性方程组。-To achieve fourth-order Runge-Kutta algorithm for solving nonlinear equations or nonlinear equations.
FourthorderRungeKutta
- 四阶龙格库塔法的C实现 四阶龙格库塔法的C实现 -Fourth-order Runge-Kutta
main
- 导弹弹道仿真计算程序,采用四阶龙格库塔法,为研究导弹弹道仿真提供有效计算方法-Missile trajectory simulation program, using fourth-order Runge-Kutta method for the study of the missile trajectory simulation provides an effective method
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
1
- 4阶龙格库塔方程,给出了一个实例,并且写出详细的步骤和过程,看到就能会。-4-order Runge-Kutta equations, given an instance, and write detailed steps and processes that can be.
EquationGUI-II
- 采用四阶龙格——库塔算法,应用MATLAB编写的常微分方程、偏微分方程求解算法及界面。 关键词:gui,ode,pde,difference method, runge kutta,euler,heun MATLAB版本:7.0 (R14)-EULER.m HEUN.m Rk4.M implement euler heun and runge kutta fourth order to solve ODE VANDERPOLODE.m LOGISTICOODE.m PREDAPREDA