Free Vibration of Clamped Elliptical Plates

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

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

This paper is concerned with the vibration and buckling of a new class of plates, the periphery shape of which is defined by a super elliptical function. Such a piate shape has practical applications, as the advantageous curved corners help to diffuse stress concentrations. The loading considered fo

The natural vibrations of clamped rectangular orthotropic plates are analyzed using the extended Kantorovich method. The developed iterative scheme converges very rapidly to the final result. The obtained natural frequencies are evaluated for a square plate made of Kevlar 49 Epoxy and the obtained r

This paper reports a free vibration analysis of thick plates with rounded corners subject to a free, simply-supported or clamped boundary condition. The plate perimeter is defined by a super elliptic function with a power defining the shape ranging from an ellipse to a rectangle. To incorporate tran