FUNDAMENTAL FREQUENCY OF THIN ELASTIC PLATES

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?

The precise determination of the frequencies of elastic plates of arbitrary geometry and boundary conditions involves considerable difficulties in the integration of the fourth order partial differential equation. From the point of view of practical application, approximate methods of determination

An approximate solution is obtained in the present paper using the classical Ritz method. The use of polynomial coordinate functions allows .['or the treatment of edges elastically restrained against rotation.

The optimal laminate configurations of symmetric laminated plates for maximizing fundamental frequencies are examined. The coupling between bending and twisting is taken into consideration in the free vibration analysis of symmetric laminated plates. With the use of lamination parameters, the effect

A novel approach for the determination of the fundamental frequency of stiffened plates is presented. As a first stage, the governing differential equations for the structure are derived. Then, an energy formulation is presented in which the structure is idealized as assembled plate and stiffener el