Experimental study into rotational-oscillatory vibrations of a vibration machine platform excited by the ball auto-balancer
DOI:
https://doi.org/10.15587/1729-4061.2018.140006Keywords:
inertial vibration exciter, dual-frequency vibrations, resonance vibratory machine, auto-balancer, inertial vibratory machineAbstract
We have experimentally investigated the rotational-oscillatory vibrations of vibratory machine platform excited by the ball auto-balancer.
The law of change in the vibration accelerations at a platform was studied using the accelerometer sensors, a board of the analog-to-digital converter with an USB interface and a PC. The amplitude of rapid and slow vibratory displacements of the platform was investigated employing a laser beam.
It was established that the resonance frequency (frequency of natural oscillations) of the platform is: 62.006 rad/s for the platform with a mass of 2,000 gm; 58.644 rad/s ‒ of 2,180 gm; 55.755 rad/s ‒ of 2,360 gm. An error in determining the frequencies does not exceed 0.2 %.
The ball auto-balancer excites almost perfect dual-frequency vibrations of a vibratory machine platform. Slow frequency corresponds to the rotational speed of the center of balls around the longitudinal axis of the shaft, while the fast one ‒ to the shaft rotation speed, with the unbalanced mass attached to it. A dual-frequency mode occurs in a wide range of change in the parameters and it is possible to alter its basic characteristics by changing the mass of balls and the unbalanced mass, the angular velocity of shaft rotation.
It has been established experimentally that the balls get stuck at a frequency that is approximately 1 % lower than the resonance frequency of platform oscillations.
Assuming the platform executes the dual frequency oscillations, we employed the software package for statistical analysis Statistica to select coefficients for the respective law. It was found that:
– the process for determining the magnitudes of coefficients is steady (robust); coefficients almost do no change when altering the time interval for measuring the law of a platform motion;
– the amplitude of accelerations due to the low oscillations is directly proportional to the total mass of the balls and the square of the frequency at which balls get stuck;
– the amplitude of rapid oscillations is directly proportional to the unbalanced mass at the auto-balancer's casing and to the square of angular velocity of shaft rotation.
The discrepancy between the law of motion, obtained experimentally, and the law, obtained using the methods of statistical analysis, is less than 3 %. The results obtained add relevance to both the analytical studies into dynamics of the examined vibratory machine and to the creation of the prototype a vibratory machine.
References
- Bukin, S. L., Maslov, S. G., Ljutyj, A. P., Reznichenko, G. L. (2009). Intensification of technological processes through the implementation of vibrators biharmonic modes. Scientific and technical journal, 36 (77)-37 (78), 81–89.
- Kryukov, B. I. (1967). Dinamika vibratsionnyh mashin rezonansnogo tipa [Dynamics of vibratory machines of resonance type]. Kyiv: Naykova dumka, 210.
- Kuzo, I. V., Lanets, O. V., Gurskyi, V. M. (2013). Substantiation of technological efficiency of two-frequency resonant vibration machines with pulse electromagnetic disturbance. Naukoviy Visnyk Natsionalnoho Hirnychoho Universytetu, 3, 71–77. Available at: http://nbuv.gov.ua/UJRN/Nvngu_2013_3_23
- Filimonikhin, G. B., Yatsun, V. 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
- Sommerfeld, A. (1904). Beitrage zum dinamischen Ausbay der Festigkeislehre. Zeitschriff des Vereins Deutsher Jngeniere, 48 (18), 631–636.
- Yatsun, V., Filimonikhin, G., Dumenko, K., Nevdakha, A. (2017). Experimental research of rectilinear translational vibrations of a screen box excited by a ball balancer. Eastern-European Journal of Enterprise Technologies, 3 (1 (87)), 23–29. doi: https://doi.org/10.15587/1729-4061.2017.101798
- 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., Haleeva, A., Nevdakha, A. (2018). On stability of the dual-frequency motion modes of a single-mass vibratory machine with a vibration exciter in the form of a passive auto-balancer. Eastern-European Journal of Enterprise Technologies, 2 (7 (92)), 59–67. doi: https://doi.org/10.15587/1729-4061.2018.128265
- Artyunin, A. I. (1993). Research of motion of the rotor with autobalance. Proceedings of the higher educational institutions. Mechanical Engineering, 1, 15–19.
- Filimonihin, G. B. (2004). Zrivnovazhennja i vibrozahyst rotoriv avtobalansyramy z tverdymy koryguval'nymy vantazhamy [Balancing and protection from vibrations of rotors by autobalancers with rigid corrective weights]. Kirovohrad: KNTU, 352.
- Ryzhik, B., Sperling, L., Duckstein, H. (2004). Non-synchronous Motions Near Critical Speeds in a Single-plane Autobalancing Device. Technische Mechanik, 24, 25–36.
- Artyunin, A. I., Alhunsaev, G. G., Serebrennikov, K. V. (2005). Primenenie metoda razdeleniya dvizheniy dlya issledovaniya dinamiki rotornoy sistemyi s gibkim rotorom i mayatnikovyim avtobalansirom [The application of the method of separation of movements to study the dynamics of a rotor system with a flexible rotor and a pendulum autobalance]. Izvestiya vysshih uchebnyh zavedeniy. Mashinostroenie, 9, 8–14.
- Inoue, T., Ishida, Y., Niimi, H. (2012). Vibration Analysis of a Self-Excited Vibration in a Rotor System Caused by a Ball Balancer. Journal of Vibration and Acoustics, 134 (2), 021006. doi: https://doi.org/10.1115/1.4005141
- 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
- Jung, D., DeSmidt, H. A. (2016). Limit-Cycle Analysis of Planar Rotor/Autobalancer System Influenced by Alford's Force. Journal of Vibration and Acoustics, 138 (2), 021018. doi: https://doi.org/10.1115/1.4032511
- Jung, D., DeSmidt, H. A. (2016). Limit-Cycle Analysis of Three-Dimensional Flexible Shaft/Rigid Rotor/Autobalancer System With Symmetric Rigid Supports. Journal of Vibration and Acoustics, 138 (3), 031005. doi: https://doi.org/10.1115/1.4032718
- Jung, D., DeSmidt, H. (2017). Nonsynchronous Vibration of Planar Autobalancer/Rotor System With Asymmetric Bearing Support. Journal of Vibration and Acoustics, 139 (3), 031010. doi: https://doi.org/10.1115/1.4035814
- Jung, D. (2018). Supercritical Coexistence Behavior of Coupled Oscillating Planar Eccentric Rotor/Autobalancer System. Shock and Vibration, 2018, 1–19. doi: https://doi.org/10.1155/2018/4083897
- Thomson, W. T., Dahleh, M. D. (1997). Theory of vibration with applications. Prentice Hall, 534.
- Halafyan, A. A. (2007). STATISTICA 6. Statistical analysis of data. Moscow: OOO «Binom-Press», 512.
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Copyright (c) 2018 Volodymyr Yatsun, Gennadiy Filimonikhin, Andrey Nevdakha, Vladimir Pirogov
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