Solid Mechanics I
The course is expected to provide the student a strong knowledge on the characterization of stress and strain states on solid bodies subjected to applied forces. The concepts of stress vector, stress and infinitesimal strain tensors are introduced, together with their dependencies on the referential used. Stress and strain invariants and methods to obtain principal stresses and strains are also taught.
The general stress-strain behavior for brittle and for ductile materials is taught, together with a more detailed analysis of this behavior for mild steel. Stress-strain relations are presented for materials with linear elastic behavior.
Two methodologies to obtain stresses and strains on general solids with applied loads are referred. First, the beam theory is introduced and its range of applicability specified. Equations for the determination of stresses, strains and displacements are deduced for the cases of beams subjected to axial loads and also torques. Secondly, for cases with more complex geometries, that cannot be properly analyzed with beam theory, a quick reference to the finite element method is made and a small problem is solved in the course work.
Raquel Albuquerque Soares Brás de Almeida, Tiago Alexandre Narciso da Silva
Weekly - 4
Total - 70
It is recommended that students have obtained frequency/approval for the discipline Applied Mechanics I.
F. P. Beer, E. R. Johnston, Jr., J. T. DeWolf, D. F. Mazurek. Mecânica dos Materiais / Resistência dos Materiais / Mechanics of Materials (diversas edições). McGraw-Hill.
R. C. Hibbeler. Mechanics of Materials (diversas edições). Pearson.
L.S. Srinath. Advanced Mechanics of Solids. McGraw-Hill.
A.P. Boresi, R.J. Schmidt. Advanced Mechanics of Materials. John Wiley \& Sons.
J. N. Reddy (2010). Principles of Continuum Mechanics - A Study of Conservation Principles with Applications. Cambridge Uni. Press.
Elasticity: Definition of stress. Stress vector. Normal stress and shear stress. Stress tensor. Equilibrium equations. Symmetry of the stress tensor. Transformation of stress. Principal stresses. Mohr''''''''s circle for stress. Stress invariants. Analysis of strain. Strain tensor. Infinitesimal strain tensor. Mohr''''''''s circle for strain. Strain measurement using strain gage. Principal axis. Compatibility equations. Linear elasticity. Generalized Hooke''''''''s law. Young''''''''s modulus and Poisson''''''''s ratio. Isotropy. Plane stress and plane strain. Tensile test. Norm EN 10 002 - Tensile test of metallic materials. Models of material behaviour.
Axial loading: Linear members. Saint-Venant''''''''s principle. Plastic deformations, residual stresses.
Torsion: Stresses and deformations in cylindrical shafts. Plastic deformations, residual stresses. Membrane analogy. Torsion of members with non-circular cross section. Thin-walled hollow shafts.
Programs where the course is taught: