ON THE THEORY OF LAMINATED PLATES,
Abstract
From the variational principle equations are derived for the bending of elastic plates, consisting of alternating 'rigid' and 'soft' layers, and corresponding natural boundary conditions. Specific cases are investigated. Various variants are evaluated for the selection of sought functions and corresponding to them, variants of basic equations. Pointed out are the possibilities of formulating exact solutions in the case of laminated plates with regular structure. As an example, a solution is given of the problem of bending a regular multilayer plate, rectangular in plan. The explained results may be considered as a generalization of the bending theory of triple layer plates with soft filler. (Author)
Document Details
- Document Type
- Technical Report
- Publication Date
- Aug 24, 1966
- Accession Number
- AD0645835
Entities
People
- V. V. Bolotin
Organizations
- National Air and Space Intelligence Center