FREE VIBRATIONS OF CLAMPED SYMMETRICALLY LAMINATED SKEW PLATES

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

This paper investigates the free vibration of symmetrically laminated, thick, doubly connected plates of arbitray plate perimeter for the outer boundary and a hole de"ned by a super-elliptical equation which is able to describe a rectangle, ellipse or quasi-rectangle. The laminated perforated plates

Free vibration analysis of symmetrically laminated composite rectangular plates with all edges elastically restrained against rotation was carried out based on the first order anisotropic shear deformation plate theory. The iterative Kantorovich method and the Rayleigh-Ritz method with three differe

Experiments were designed to measure the free, transverse vibrations for square, thin elastic plates with two types of edge support con"gurations. One con"guration was fully clamped on three edges and free on the fourth edge (CCCF), and the other was fully clamped on two adjacent edges and free on t