Free vibration analysis of stepped rectangular plates resting on non-homogeneous elastic foundations

A finite element model is presented for the analysis of the free vibration of plates with multiple stepped variations in thickness resting on non-homogeneous elastic foundations. Based on Mindlin plate theory, the model includes transverse shear deformation as well as bending-extension coupling in c

Vibration analysis of a functionally graded rectangular plate resting on two parameter elastic foundation is presented here. The displacement filed based on the third order shear deformation plate theory is used. By considering the in-plane displacement components of an arbitrary material point on t

Solutions to free undamped large amplitude vibrations of arbitrarily laminated thin rectangular plates on elastic foundations, based on an assumed mode shape, are determined. Simply supported and clamped boundary conditions with both movable and immovable edges are considered. The governing equation