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Vibration of non-uniform thick plates on elastic foundation by differential quadrature method

โœ Scribed by P. Malekzadeh; G. Karami

Publisher
Elsevier Science
Year
2004
Tongue
English
Weight
321 KB
Volume
26
Category
Article
ISSN
0141-0296

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โœฆ Synopsis

This paper presents a differential quadrature (DQ) solution for free vibration analysis of thick plates of continuously varying thickness on two-parameter elastic foundations. The formulations are based on the first-order shear deformation theory taking into account the effects of rotary inertia. The thickness of the plate may vary in one or two directions. The thickness variation might be assumed linear or non-linear. Different types of boundary conditions, including free edges and corners, loaded edges with in-plane forces are formulated. The accuracy, convergence and versatility of the DQ procedure for the type of plate problems, with complicated governing differential equations and boundary conditions are examined and verified.

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A new numerical approach for solving the vibration of a beam resting on an elastic foundation is proposed. The approach uses the dierential quadrature (DQ) to discretize the dierential eigenvalue equation deยฎned on each element, the transition conditions deยฎned on the inter-element boundary of two a