FUNDAMENTAL FREQUENCY OF VIBRATION OF RECTANGULAR MEMBRANES WITH AN INTERNAL OBLIQUE SUPPORT

An approximate solutton to the tttle problem is presented The results, obtained by the Galerkm method and usmg polynomial approxlmattons, are compared with values obtamed by means of a fintte element algortthm

The present study deals with the solution of the title problem in the case of clamped and simply supported edges, see Figure 1. For the sake of generality it is assumed that the plate carries a centrally located concentrated mass. This note deals with an extension of the problem tackled in reference

A free vibration analysis of moderately thick skew plates with oblique internal line supports is presented. Mindlin's plate theory is employed and the \(p b-2\) Rayleigh-Ritz method is applied to obtain the governing eigenvalue equation for internally supported skew plates. A set of natural frequenc

The title problem is approximately solved in a unified manner in the case of rectangular and circular plates elastically restrained against rotation along the boundary. Polynomial coordinate Junctions and a variational approach are used in order to obtain an approximatejrequency equation. JudgingJ?