Theoretical Free Vibration Analysis of Rectangular Cantilever Plates with Rigid Point Supports

This paper deals with the practical engineering problem of cantilever plates with rigid point supports. A highly accurate, experimental procedure is outlined for the transverse free vibration analysis of these plates. The modal properties of these plates are obtained from the experimental data. In t

An analytical procedure based on the method of superposition is described for obtaining the free vibration frequencies and mode shapes of partially clamped cantilevered rectangular plates with and without rigid point supports. The supports are of the type provided by bolts with stand-offs. Good agre

A procedure using the "nite strip element method in combination with a spring system is proposed to treat the free vibration analysis of plates on elastic intermediate supports. Results indicate that the spring system can successfully simulate elastic intermediate supports such as point supports, l

Estimates of flexural vibration frequencies and modes of homogeneous rectangular plates are initially obtained by the dynamic edge effect method (Bolotin's asymptotic method). After separation of temporal and spatial variables all functions of the dynamic equations are represented by series expansio

An approximate method for analyzing the free vibration of thin and moderately thick rectangular plates with arbitrary variable thickness is proposed. The approximate method is based on the Green function of a rectangular plate. The Green function of a rectangular plate with arbitrary variable thickn

An analy'ical sol'tion based on the superposition method is developed for the first time for the free vibration of the title problem. While it will be seen that the line support is replaced by point supرrorts, convergence tests show that a limited number of point supports provide exceflent solution