FREE VIBRATION ANALYSIS OF SYMMETRICALLY LAMINATED COMPOSITE RECTANGULAR PLATES

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

A general spline "nite strip method is presented which allows the spline knots to be located arbitrarily along the plate strip and also facilitates the use of analytical integration in evaluating strip properties. The development takes place in the contexts of "rst-order shear deformation plate theo

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

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

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