Studying the steady­state vibrations of a two­mass vibratory machine excited by a passive auto­balancer

Authors

DOI:

https://doi.org/10.15587/1729-4061.2020.204882

Keywords:

inertial vibration exciter, two-frequency vibrations, resonance vibratory machine, auto-balancer, two-mass vibratory machine, Sommerfeld effect

Abstract

Analytical-numerical methods have been applied to investigate the steady-state vibrations of a two-mass vibratory machine with rectilinear translational motion of platforms and a vibration exciter in the form of a ball, a roller, or a pendulum auto-balancer. A procedure for studying the modes of load jamming has been devised for the systems similar to the one under consideration. The procedure is based on the idea of parametric solution to the problem of finding the frequencies of load jamming and a bifurcation theory of motion.

It has been established that a two-mass vibratory machine has two resonance frequencies of rotor rotation and two corresponding shapes of platform oscillations. The use of the procedure has shown that for the case of small resistance forces, a vibratory machine:

‒ has five possible modes of load jamming, with the first shape of resonance vibrations of platforms being excited under modes 1 and 2, the second shape ‒ 3 and 4, and, under the mode 5, the frequency of load jamming is close to the frequency of rotor rotation;

‒ demonstrates stable jamming modes under the odd (1, 3, 5) load jamming modes;

‒ shows that the jamming modes 1 and 2 are suitable to excite the resonance oscillations of platforms and for industrial application;

‒ exhibits that increasing the rotor speed monotonously increases the amplitudes of platform oscillations corresponding to a certain jamming mode;

‒ proves that the amplitude of resonance platform oscillations can be controlled by changing the rotor rotation velocity.

The viscous resistance forces acting on a first platform reduce (up to the complete elimination) the first range of rotor speeds, at which the first resonance shape of platform oscillations is excited.

The internal forces of viscous resistance, acting between the platforms, reduce (up to the complete elimination) the second range of rotor speeds, at which the second shape of resonance platform oscillations is excited.

The viscous resistance forces acting on the loads at motion relative to an auto-balancer reduce both ranges

Author Biography

Volodymyr Yatsun, Central Ukrainian National Technical University Universytetskyi ave., 8, Kropyvnytskyi, Ukraine, 25006

PhD, Associate Professor

Department of Road Cars and Building

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Published

2020-06-30

How to Cite

Yatsun, V. (2020). Studying the steady­state vibrations of a two­mass vibratory machine excited by a passive auto­balancer. Eastern-European Journal of Enterprise Technologies, 3(7 (105), 79–87. https://doi.org/10.15587/1729-4061.2020.204882

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Section

Applied mechanics