试射法解二阶线性常微分方程模拟反应动力学过程

Simulating chemical reaction kinetic process by resolving second-order ordinary differential equation with shooting method

试射法可用于解二阶线性常微分方程，其原理在于把边值问题化为初值问题处理。该文采用龙格-库塔法求解，给出了模拟电化学二阶线性常微分方程求解方法及VB6．0程序源代码，可直观地看到该反应动力学曲线，并打印、输出结果。

Shooting method can be used to resolve second-order ordinary differential equation with its principle of transforming boundary value problem to initial value problem. How to use Runge-Kutta method to resolve second-order ordinary differential equation of electrochemistry is presented with the source code of Visual Basic 6.0 program. Thus, the kinetic curves of this reaction can be seen intuitionally, and the results and the graphs can be printed.