Theory of structures
Differential equation of beams for axial, flexural and shear deformations. Virtual work theorem.
Stress and Strain
Properties of stress and infinitesimal strain tensors.
Constitutive equations, elastic equilibrium problem and resistance criteria
De Saint Venant problem
Axial force, pure bending, eccentric axial force, torsion, shear.
Elastic stability
Euler’s formula, “omega” method.
Course Content - Last names E-M
Theory of structures
Differential equation of beams for axial, flexural and shear deformations. Virtual work theorem.
Stress and Strain
Properties of stress and infinitesimal strain tensors.
Constitutive equations, elastic equilibrium problem and resistance criteria
De Saint Venant problem
Axial force, pure bending, eccentric axial force, torsion, shear.
Elastic stability
Euler’s formula, “omega” method.
L. Gambarotta, L. Nunziante, A. Tralli, Scienza delle costruzioni, McGraw-Hill, Milano, 2003.
M. Capurso, Lezioni di Scienza delle Costruzioni, Pitagora Editrice, Bologna, 1998.
O. Belluzzi, Scienza delle Costruzioni, Vol. I, Zanichelli editore, Bologna, 1996.
L. Gambarotta, L. Nunziante, A. Tralli, Scienza delle costruzioni, McGraw-Hill, Milano, 2003.
M. Capurso, Lezioni di Scienza delle Costruzioni, Pitagora Editrice, Bologna, 1998.
O. Belluzzi, Scienza delle Costruzioni, Vol. I, Zanichelli editore, Bologna, 1996.
Claudia Comi, Leone Corradi Dell'Acqua: Introduzione alla Meccanica Strutturale 3a ediz., McGraw-Hill.
Salvatore Di Pasquale : Scienza delle Costruzioni - Introduzione alla progettazione strutturale, Tamburini ed.
Stephan Timoshenko: Scienza delle Costruzioni, vol. 1, Viglongo.
Odone Belluzzi: Scienza delle Costruzioni, vol. 1, Zanichelli.
Learning Objectives - Last names A-D
The course's goal is to provide the necessary tools for solving simply structural problems . Such a objective is reached by means of the study of fundamental of solid mechanics (stress, strain, stress-strain relationship) and its application to structural problems.
Learning Objectives - Last names E-M
The course's goal is to provide the necessary tools for solving simply structural problems . Such a objective is reached by means of the study of fundamental of solid mechanics (stress, strain, stress-strain relationship) and its application to structural problems.
Learning Objectives - Last names N-Z
structural design
Prerequisites - Last names A-D
Knowledge of mechanics and mathematics learned in previous courses of “Statica” and “Istituzioni di matematiche”
Prerequisites - Last names E-M
Knowledge of mechanics and mathematics learned in previous courses of “Statica” and “Istituzioni di matematiche”
Prerequisites - Last names N-Z
statica (8cfu)
Teaching Methods - Last names N-Z
attending classes and lessons is strongly advised
Further information - Last names N-Z
enrollment at: e-l.unifi.it; list will be closed when 120 students have been enrolled; enrollment start: 23 sept. 2014
Type of Assessment - Last names E-M
Write and oral exam
Type of Assessment - Last names N-Z
written/oral test
Course program - Last names A-D
Theory of structures
Differential equation of beams for axial, flexural and shear deformations. Virtual work theorem.
Stress and Strain
Properties of stress and infinitesimal strain tensors.
Constitutive equations, elastic equilibrium problem and resistance criteria
De Saint Venant problem
Axial force, pure bending, eccentric axial force, torsion, shear.
Elastic stability
Euler’s formula, “omega” method.
Course program - Last names E-M
Theory of structures
Differential equation of beams for axial, flexural and shear deformations. Virtual work theorem.
Stress and Strain
Properties of stress and infinitesimal strain tensors.
Constitutive equations, elastic equilibrium problem and resistance criteria
De Saint Venant problem
Axial force, pure bending, eccentric axial force, torsion, shear.
Elastic stability
Euler’s formula, “omega” method.
Course program - Last names N-Z
Scienza delle Costruzioni
Prof. Alberto Bove
(Scuola di Architettura di Firenze)
start date: 22 settembre 2014 (1° semestre)
PROGRAM
[rev. 21/7/14]
Truss, frames (2d and 3d), stability (simple cases)
principal stresses, strength criteria,
free vibrations of a multi degrees-of-freedom finite element model
reference to Eurocodes/NTC2008