Based on Lagrange dynamics model of vibration machinery system is established. Natural frequency, vibration model and systemic response are worked out.
基于拉格朗日法建立振动筛系统动力学模型,分析出了该系统的固有频率、主振型及系统的响应。
ADAMS solves the model by adopting Lagrange dynamics equation and complementing with rigidity integral algorithm and sparse matrix technology.
ADAMS采用拉格朗日动力学方程,辅以刚性积分算法以及稀疏矩阵技术来求解模型。
A novel continuous torsional vibration dynamics model of rotary machinery was established, which was based on the Lagrange equation.
在考虑传动系统连续分布质量的基础上,采用拉格朗日方程建立了旋转机械传动系统的连续动力学模型。
Movable equation of the inverted pendulum is derived, according to the dynamics analysis method of Lagrange. By system feasible approximation, an easily analytical math model is deduced.
基于拉格朗日动力学分析方法,推导出倒立摆的运动方程,在对系统进行可行的近似化处理后,得出了便于分析的数学模型。
Movable equation of the inverted pendulum is derived, according to the dynamics analysis method of Lagrange. By system feasible approximation, an easily analytical math model is deduced.
基于拉格朗日动力学分析方法,推导出倒立摆的运动方程,在对系统进行可行的近似化处理后,得出了便于分析的数学模型。
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