Searching for the twofrequency motion modes of a threemass vibratory machine with a vibration exciter in the form of a passive autobalancer
DOI:
https://doi.org/10.15587/1729-4061.2020.209269Keywords:
inertial vibration exciter, two-frequency vibrations, three-mass vibratory machine, auto-balancer, resonance vibratory machine, Sommerfeld effectAbstract
The dynamics of a three-mass vibratory machine with the rectilinear translational motion of platforms and a vibration exciter in the form of a ball, roller, or pendulum auto-balancer have been analytically investigated.
The existence of steady state motion modes of a vibratory machine that are close to two-frequency regimes has been established. At these motions, the loads in an auto-balancer create constant imbalance, cannot catch up with the rotor, and get stuck at a certain frequency. These loads work as the first vibration exciter, thereby exciting vibrations in resonance with the frequency at which loads get stuck. The second vibration exciter is formed by an unbalanced mass on the body of the auto-balancer. The mass rotates at the rotor's rotation frequency and excites faster vibrations with this frequency. The auto-balancer excites almost ideal two-frequency vibrations. Deviations from the two-frequency law are proportional to the ratio of the mass of the loads to the mass of the platform, which hosts the auto-balancer, and do not exceed 5 %.
A three-mass vibratory machine has three resonant (natural) oscillation frequencies, q1, q2, q3 (q1<q2<q3), and three corresponding shapes of platform oscillations. Loads can only get stuck at speeds close to the resonance (natural) oscillation frequencies of the vibratory machine; and to the rotor rotation frequency.
A vibratory machine always has only one frequency of load jam, slightly less than the rotor speed.
For the case of small viscous resistance forces in the supports of a vibratory machine, an increase in the rotor speed leads to that the new frequencies of load jam:
‒ emerge in pairs in the vicinity of each natural frequency of the vibratory machine oscillations;
‒ one of the frequencies is slightly smaller, and the other is somewhat larger than the natural frequency of the vibratory machine oscillations.
Arbitrary viscous resistance forces in the supports can prevent the occurrence of new frequencies at which loads get stuck. Therefore, in the most general case, the number of such frequencies can be 1, 3, 5, or 7, depending on the rotor speed and the magnitudes of the viscous resistance forces in the supports.
The results obtained are applicable when designing new vibratory machines and for the numerical modeling of their dynamicsReferences
- Bukin, S. L., Maslov, S. G., Lyutyy, A. P., Reznichenko, G. L. (2009). Intensifikatsiya tehnologicheskih protsessov vibromashin putem realizatsii bigarmonicheskih rezhimov raboty. Obogashchenie poleznyh iskopaemyh, 36-37.
- Kryukov, B. I. (1967). Dinamika vibratsionnyh mashin rezonansnogo tipa. Kyiv: Naukova dumka, 210.
- Lanets, O. S. (2008). Vysokoefektyvni mizhrezonansni vibratsiyni mashyny z elektromahnitnym pryvodom (Teoretychni osnovy ta praktyka stvorennia). Lviv: Vydavnytstvo Natsionalnoho universytetu “Lvivska politekhnika”, 324.
- Filimonikhin, G., Yatsun, V. (2015). Method of excitation of dual frequency vibrations by passive autobalancers. Eastern-European Journal of Enterprise Technologies, 4 (7 (76)), 9–14. doi: https://doi.org/10.15587/1729-4061.2015.47116
- Lu, C.-J., Tien, M.-H. (2012). Pure-rotary periodic motions of a planar two-ball auto-balancer system. Mechanical Systems and Signal Processing, 32, 251–268. doi: https://doi.org/10.1016/j.ymssp.2012.06.001
- Artyunin, A. I., Eliseyev, S. V. (2013). Effect of “Crawling” and Peculiarities of Motion of a Rotor with Pendular Self-Balancers. Applied Mechanics and Materials, 373-375, 38–42. doi: https://doi.org/10.4028/www.scientific.net/amm.373-375.38
- Sommerfeld, A. (1904). Beitrage zum dinamischen Ausbay der Festigkeislehre. Zeitschriff des Vereins Deutsher Jngeniere, 48 (18), 631–636.
- Artyunin, A. I., Barsukov, S. V., Sumenkov, O. Y. (2019). Peculiarities of Motion of Pendulum on Mechanical System Engine Rotating Shaft. Proceedings of the 5th International Conference on Industrial Engineering (ICIE 2019), 649–657. doi: https://doi.org/10.1007/978-3-030-22041-9_70
- Yaroshevich, N. P., Silivoniuk, A. V. (2013). About some features of run-updynamicof vibration machines with self-synchronizing inertion vibroexciters. Naukovyi visnyk Natsionalnoho hirnychoho universytetu, 4, 70–75. Available at: http://nbuv.gov.ua/UJRN/Nvngu_2013_4_14
- Kuzo, I. V., Lanets, O. V., Hurskyi, V. M. (2013). Syntez nyzkochastotnykh rezonansnykh vibratsiynykh mashyn z aeroinertsiynym zburenniam. Naukovyi visnyk Natsionalnoho hirnychoho universytetu, 2, 60–67. Available at: http://nbuv.gov.ua/UJRN/Nvngu_2013_2_11
- Korendiy, V., Zakharov, V. (2017). Substantiation of Parameters and Analysis of Operational Characteristics of Oscillating Systems of Vibratory Finishing Machines. Ukrainian Journal of Mechanical Engineering and Materials Science, 3 (2), 67–78. doi: https://doi.org/10.23939/ujmems2017.02.067
- Kuzio, I., Zakharov, V., Korendiy, V. (2018). Substantiation of inertial, stiffness and excitation parameters of vibratory lapping machine with linear oscillations of laps. Ukrainian Journal of Mechanical Engineering and Materials Science, 4 (2), 26–39. doi: https://doi.org/10.23939/ujmems2018.02.026
- Gursky, V., Lanets, O. (2015). Modernization of high-frequency vibratory table with an electromagnetic drive: theoretical principle and modeling. Mathematical Models in Engineering, 1 (2), 34–42. Available at: https://www.jvejournals.com/article/16483
- Korendiy, V., Kachur, O., Novitskyi, Y., Mazuryk, V., Sereda, V. (2019). Substantiation of parameters and modelling the operation of three-mass vibratory conveyer with directed oscillations of the working element. Avtomatizacìâ Virobničih Procesìv u Mašinobuduvannì Ta Priladobuduvannì, 53, 84–100. doi: https://doi.org/10.23939/istcipa2019.53.084
- Solona, O., Kupchuk, I. (2020). Dynamic synchronization of vibration exciters of the three-mass vibration mill. Przegląd Elektrotechniczny, 1 (3), 163–167. doi: https://doi.org/10.15199/48.2020.03.35
- Neyman, L. A., Neyman, V. Y. (2016). Dynamic model of a vibratory electromechanical system with spring linkage. 2016 11th International Forum on Strategic Technology (IFOST). doi: https://doi.org/10.1109/ifost.2016.7884234
- Zhao, J., Liu, L., Song, M., Zhang, X. (2015). Influencing Factors of Anti-Resonant Inertial Resonant Machine Vibration Isolation System. 2015 3rd International Conference on Computer and Computing Science (COMCOMS). doi: https://doi.org/10.1109/comcoms.2015.22
- Li, X., Shen, T. (2016). Dynamic performance analysis of nonlinear anti-resonance vibrating machine with the fluctuation of material mass. Journal of Vibroengineering, 18 (2), 978–988. Available at: https://www.jvejournals.com/article/16559
- Yatsun, V., Filimonikhin, G., Dumenko, K., Nevdakha, A. (2017). Equations of motion of vibration machines with a translational motion of platforms and a vibration exciter in the form of a passive auto-balancer. Eastern-European Journal of Enterprise Technologies, 5 (1 (89)), 19–25. doi: https://doi.org/10.15587/1729-4061.2017.111216
- Yatsun, V., Filimonikhin, G., Dumenko, K., Nevdakha, A. (2017). Search for two-frequency motion modes of single-mass vibratory machine with vibration exciter in the form of passive auto-balancer. Eastern-European Journal of Enterprise Technologies, 6 (7 (90)), 58–66. doi: https://doi.org/10.15587/1729-4061.2017.117683
- Yatsun, V., Filimonikhin, G., Dumenko, K., Nevdakha, A. (2018). Search for the dualfrequency motion modes of a dualmass vibratory machine with a vibration exciter in the form of passive autobalancer. Eastern-European Journal of Enterprise Technologies, 1 (7 (91)), 47–54. doi: https://doi.org/10.15587/1729-4061.2018.121737
- Goncharov, V., Filimonikhin, G., Nevdakha, A., Pirogov, V. (2017). An increase of the balancing capacity of ball or roller-type auto-balancers with reduction of time of achieving auto-balancing. Eastern-European Journal of Enterprise Technologies, 1 (7 (85)), 15–24. doi: https://doi.org/10.15587/1729-4061.2017.92834
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Copyright (c) 2020 Volodymyr Yatsun, Gennadiy Filimonikhin, Antonina Haleeva, Larisa Krivoblotsky, Yurii Machok, Mareks Mezitis, Nataliia Podoprygora, Mykola Sadovyi, Guntis Strautmanis
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