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Analysis of the Behavior of a Square Plate in Free Vibration by FEM in Ansys

DOI: 10.4236/wjm.2020.102002, PP. 11-25

Keywords: Free Vibration, Vibration Modes, Modal Analysis, Natural Frequencies, Modal Deformations, Thin Rectangular Plate, Finite Element Method (FEM)

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Abstract:

In the realization of mechanical structures, achieving stability and balance is a problem commonly encountered by engineers in the field of civil engineering, mechanics, aeronautics, biomechanics and many others. The study of plate behavior is a very sensitive subject because it is part of the structural elements. The study of the dynamic behavior of free vibration structures is done by modal analysis in order to calculate natural frequencies and modal deformations. In this paper, we present the modal analysis of a thin rectangular plate simply supported. The analytical solution of the differential equation is obtained by applying the method of separating the variables. We are talking about the exact solution of the problem to the limit values. However, numerical methods such as the finite element method allow us to approximate these functions with greater accuracy. It is one of the most powerful computational methods for predicting dynamic response in a complex structure subject to arbitrary boundary conditions. The results obtained by MEF through Ansys 15.0 are then compared with those obtained by the analytical method.

References

[1]  Nowacki, W. (1963) Dynamics of Elastic Systems. John Wiley and Sons, New York.
[2]  Kalita, K. and Haldar, S. (2016) Free Vibration Analysis of Rectangular Plates with Central Cutout. Cogent Engineering, 3, 1163781.
https://doi.org/10.1080/23311916.2016.1163781
[3]  Leissa, A.W. (1978) Recent Research in Plate Vibrations, 1973-1976: Classical Theory. Shock and Vibration Inform. Center the Shock and Vibration Digest, 9, 13-24.
https://doi.org/10.1177/058310247700901005
[4]  Leissa, A.W. (1987) Literature Review: Survey and Analysis of the Shock and Vibration Literature: Recent Studies in Plate Vibrations: 1981-85 Part I. Classical Theory. The Shock and Vibration Digest, 19, 11-18.
https://doi.org/10.1177/058310248701900204
[5]  Liew, K.M., Xiang, Y. and Kitipornchai, S. (1993) Transverse Vibration of Thick Rectangular Plates—I. Comprehensive Sets of Boundary Conditions. Computers & Structures, 49, 1-29.
https://doi.org/10.1016/0045-7949(93)90122-T
[6]  Clough, R.W. and Tocher, J.L. (1965) Finite Element Stiffness Matrices for Analysis of Plates in Bending. Proceedings of Conference on Matrix Methods in Structural Analysis, 1, 515-545.
[7]  Zienkiewicz, O.C. and Taylor, R.L. (2005) The Finite Element Method for Solid and Structural Mechanics. Butterworth-Heinemann, Oxford.
[8]  Batoz, J.L., Bathe, K.J. and Ho, L.W. (1980) A Study of Three-Node Triangular Plate Bending Elements. International Journal for Numerical Methods in Engineering, 15, 1771-1812.
https://doi.org/10.1002/nme.1620151205
[9]  Park, I., Lee, U. and Park, D. (2015) Transverse Vibration of the Thin Plates: Frequency-Domain Spectral Element Modeling and Analysis. Mathematical Problems in Engineering, 2015, Article ID 541276.
https://doi.org/10.1155/2015/541276
[10]  Pouladkhan, A.R., Emadi, J., Safamehr, M. and Habibolahiyan, H. (2011) The Vibration of Thin Plates by Using Modal Analysis. World Academy of Science, Engineering and Technology, 59, 2880-2885.

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