Skip to main content
CODE 60236
ACADEMIC YEAR 2022/2023
CREDITS
SCIENTIFIC DISCIPLINARY SECTOR MAT/07
LANGUAGE Italian
TEACHING LOCATION
  • GENOVA
SEMESTER 1° Semester
MODULES Questo insegnamento è un modulo di:
TEACHING MATERIALS AULAWEB

AIMS AND CONTENT

LEARNING OUTCOMES

The course provides mathematical methods for describing mechanical systems. In particular the motion of systems with many degrees of freedom is studied and the properties of the center-of-mass of continuous systems are analyzed. Rigid body, moments of inertia and specific rigid body motions are analyzed in details.

TEACHING METHODS

The course consists of lectures and exercises

SYLLABUS/CONTENT

Elements of vector calculus. Kinematics and relative kinematics. Dynamics and statics of material points. Cardinal equations. Center of mass. Conservation laws. Energy theorem. Mechanics of the rigid body. Moments of inertia. Rigid body with a fixed axis, a fixed point, without contraints. Statics of wires

 

RECOMMENDED READING/BIBLIOGRAPHY

F. Bampi, C. Zordan, Lezioni di Meccanica Razionale, Ecig, Genova, 1998.

F. Bampi, M. Benati, A. Morro, Problemi di Meccanica Razionale, Ecig, Genova, 1992.

TEACHERS AND EXAM BOARD

Exam Board

EDOARDO MAININI (President)

MAURIZIO CHICCO

ROBERTO CIANCI

MANUEL MONTEVERDE

FRANCO BAMPI (President Substitute)

LESSONS

Class schedule

The timetable for this course is available here: Portale EasyAcademy

EXAMS

EXAM DESCRIPTION

The examination consists of an oral test

ASSESSMENT METHODS

The oral exam assesses the student's ability to provide an adequate mathematical and formal basis for the study of systems mechanics.

Exam schedule

Data appello Orario Luogo Degree type Note
12/01/2023 08:30 GENOVA Orale
23/01/2023 09:00 GENOVA Scritto
02/02/2023 08:30 GENOVA Orale
14/02/2023 09:00 GENOVA Scritto
15/06/2023 08:30 GENOVA Orale
26/06/2023 09:00 GENOVA Scritto
06/07/2023 08:30 GENOVA Orale
18/07/2023 09:00 GENOVA Scritto
01/09/2023 09:00 GENOVA Scritto
14/09/2023 08:30 GENOVA Orale

FURTHER INFORMATION

Pre-requisites:

Knowledge and use of derivatives and of integral calculus; ordinary differential equations; elements of vector calculus; elements of general mechanics.