Розглянуто задачу руху маятника змінної д овжини, який являє собою вантаж із точковою масою, який здійснює 2D коливання на невагомому гнучкому канаті, що намотують на біциліндро-конічний барабан, який обертається навколо власної осі. Отримана математична модель системи, визначені рівняння руху і співвідношення між кутовими та декартовими координатами. Складена програма й виконаний числовий експеримент. Отримані залежності від часу лінійних та кутових переміщень та швидкостей, побудовані відповідні графіки, фазові портрети та траєкторія руху вантажу. Знайдено величину натягу підйомного канату.
A mechanical system, where the load in the form of material point is suspended on inextensible thread screwed on the rotating cylindrical drum, but the drum is connected to the boom rotating around fixed horizontal axis is considered. Using the Lagrange equation of the second kind, a mathematical model of the motion of the mechanical system is obtained. The system has three degrees of freedom, two of which are cylindrical. The investigation of the system motion is carried out using computer technology. As a result, the dependences of linear and angular coordinates and velocities in time at different values of the output data for two main modes of the system operation, namely – under the conditions of lifting and lowering the load are obtained. Appropriate graphs are constructed, including the trajectories of the cargo motion. The mathematical model takes into account nonlinearities of the system and allows you to find the amount of tension of the hoisting rope at any time. The analysis showed that vertical oscillations occur twice as fast as horizontal ones. The phase portrait of the generalized coordinate (angle of the rope with the vertical axis) is the focus, which is untwisted when lifting due to nonlinearity in the system, and when the load moves down, the focus, which twists and approaches the mathematical pendulum is obtained. The obtained results can be used in modeling of controlled pendulum motions for different mechanical systems. The methodology and program are recommended to the students and graduate students in terms of learning the principles of construction and analysis of complex nonlinear dynamical systems.
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