Vibration of continuous skew plates

The Rayleigh-Ritz method has been used to study the transverse vibrations of skew plates of variable thickness with different combinations of boundary conditions at the four edges. The two-dimensional thickness variation is taken as the Cartesian product of linear variations along the two concurrent

The vibration of skew laminated composite plates with simply supported and clamped edges is studied. The skew plate is mapped into a unit square by linear transformation. Orthogonal polynomials are used with the Ritz method to determine the natural frequencies. The e!ects of skew angle and laminatio

This paper is concerned with the free vibration of skew sandwich plates composed of an orthotropic core and laminated facings. The p-Ritz method has been adopted for the analysis. The Ritz functions are formed from the product of mathematically complete polynomials and boundary equations raised to a

Free vibrations of a fully clamped symmetrically laminated skew plate are analyzed by a numerical approach in which the Green function for a static bending problem is used. As a numerical example, results are presented for a three-layered symmetrically laminated skew plate. The effects of the skew a

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