Kepler s equations can be solved with the gradual approach, which can be further extended to the solution of the non-linear equations.
求解开普勒方程可用逐次逼近法,这种方法还可推广到非线性方程的求解问题中。
The dynamic equation of motion chain is a group of high non-linear differential equations, the solution is difficulty.
锚泊线的运动方程是一组高非线性的偏微分方程组,求解困难。
The difficulty in solving this system of non-linear equations is the choice of an initial value, close enough to the true solution to assure convergence.
求解时遇到的主要困难是选择一组足够靠近真解的初值,以保证迭代过程的收敛。
Precise integration method for a kind of non-homogeneous linear ordinary differential equations is presented. This method can give precise numerical results approaching the exact solution.
提出了一种求解一类非齐次线性常微分方程的精细积分方法,通过该方法可以得到逼近计算机精度的结果。
Process solving helicopter structural bearing capacity in iteration method and solution of non-linear equations are present in the paper.
介绍用迭代方法求解直升机结构承载能力的过程,求解非线性方程。
Process solving helicopter structural bearing capacity in iteration method and solution of non-linear equations are present in the paper.
介绍用迭代方法求解直升机结构承载能力的过程,求解非线性方程。
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