矩阵定义网路的代数方程。
移项把(一个项)从代数方程的一边移到另一边。
To move (a term) from one side of an algebraic equation to the other side, reversing its sign to maintain equality.
最优偏置参数能用一个易于求解的代数方程表示。
Optimum bias is expressed through a simple algebraic equation.
后者以高斯的“代数方程的基本定理”作为结束。
The latter is concluded by Gauss's famous "Fundamental Theorem of Algebra".
离散后的三对角线性代数方程组用adi方法求解。
The discretized tri-diagonal linear algebraic equations are solved with ADI method.
问题最后可归结为求解一组无穷型的线性代数方程。
The solution of the problem is finally reduced to solving a set of infinite algebraic equations.
“可调节参数的修正迭代法”求解非线性代数方程组。
The value of linear solutions is treated as initial value of the nonlinear solutions for iteration.
提出了定性代数方程简明表达方法的实现及建模规则。
The modeling rules and concise expression methods for qualitative algebra equation were introduced.
飞行动力学研究中常遇到求解非线性代数方程组的问题。
The solution of nonlinear algebraic equations is usually met in the study of flight dynamics.
本文介绍了一种求实系数高次代数方程全部根的新方法。
This paper presents a new method in which all roots of a higher degree algebraic equation with real coefficients can be found out.
根据逻辑代数方程理论,提出了格蕴涵代数方程的概念。
According to the theory about logic algebraic equation, the notion of lattice implication algebraic equation was proposed.
本文提出求解微分代数方程的一类并行算法,进行误差估计。
In this paper, a class of parallel algorithms for the problems in differential algebraic equations are proposed. The errors of the algorithms are estimated.
提出一种求解非线性代数方程和非线性常微分方程的新方法。
A new approach for solution of nonlinear algebraic and differential equation sets was presented.
问题最后和初参数算法一样能归结为求解一个低阶代数方程组。
Finally, the problems can be reduced to solving a low order system of algebraic equations like the initial parameter algorithm.
这些系统能够用定常差分方程,有时甚至能用代数方程来描述。
They are described by ordinary difference equations, or in some cases by purely algebraic equations.
将偏微分控制方程化为三次代数方程,获得结构内力的精确解。
After partial differential equations was changed into cubic algebraic equation, accurate solution of the structure was able to be obtained.
基于线性代数方程的迭代解,并行计算步骤,在该方法中引入。
Based on the iterative solution of linear algebra equations, the parallel computational steps are introduced in this method.
常系数的常微分方程变换为代数方程可以用于实现传递函数的概念。
Ordinary differential equation with constant coefficients transform into algebraic equations that can be used to implement the transfer function concept.
也考虑了在根与解的问越上代数方程与具有滞后的代数方程的等价性。
The equivalauce of roots and solutions between algebraic equation and algebraic equation with time lags is considered.
使用简化的牛顿计算方法和弱队列搜索来解决一系列的非线性代数方程。
Uses a reduced-Newton algorithm with a weak line search to solve a set of non-linear algebraic equations.
利用完全笛卡尔坐标描述多刚体系统,建立多刚体系统动力学微分-代数方程。
Based on the fully Cartesian coordinates, a differential/algebraic equation system of multibod.
第二步通过求解非线性代数方程(组)来处理非线性并通过解饱和来满足约束。
The second step deals with nonlinearity by solving a nonlinear algebraic equation (group) and satisfies constraint by desaturation.
求解高次实系数代数方程的根,对于控制系统的分析和综合设计有着重要意义。
Solving the algebra equation with real-coefficients of nth degree is of great importance for analysis and synthesis of a control system.
另外,推荐了两种解算高次代数方程的方法:葛莱茀平方根法和牛顿—秦九韶法。
In addition, two methods for solving the higher algebraic equations are recommended, i. e., Grafull square root method and Newton-Jing Jiuzhao method.
本文用牛顿法解旋耕作业参数的代数方程,并通过计算机较准确地求出沟底不平度值。
An accurate solution for the roughness values of the furrow bottom is obtained by the Newton's method for the solution of algebraic equations with a computer.
根据复合材料平均应力与应变关系,获得了预测有效轴向模量的形式简单的代数方程。
Further a group of algebraic equations to predict effective longitudinal shear modulus of multiphase fiber composites were obtained by virtue of the averaged stress strain theorem.
时域仿真法利用系统非线性微分代数方程为数学模型,可以充分考虑系统的非线性性质。
Time Domain Simulation USES the dynamic and algebraic equations which are definitely non-linear. This method can take all the non-linear proprieties of the power system into consideration.
用这种方法,微分方程将变为一组代数方程.它们很容易求解。最后给出了一数值例子。
Using this method, the differential equation will be developed into a series of algebraic equations. and they are ea…
用这种方法,微分方程将变为一组代数方程.它们很容易求解。最后给出了一数值例子。
Using this method, the differential equation will be developed into a series of algebraic equations. and they are ea…
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