First cycle
degree courses
Second cycle
degree courses
Single cycle
degree courses
School of Engineering
Course unit
ADVANCED MATHEMATICS FOR ENGINEERS (Ult. numero di matricola da 5 a 9)
IN01123530, A.A. 2019/20

Information concerning the students who enrolled in A.Y. 2018/19

Information on the course unit
Degree course First cycle degree in
IN0505, Degree course structure A.Y. 2011/12, A.Y. 2019/20
bring this page
with you
Degree course track Common track
Number of ECTS credits allocated 9.0
Type of assessment Mark
Course unit English denomination ADVANCED MATHEMATICS FOR ENGINEERS
Department of reference Department of Civil, Environmental and Architectural Engineering
E-Learning website
Mandatory attendance No
Language of instruction Italian
Single Course unit The Course unit can be attended under the option Single Course unit attendance
Optional Course unit The Course unit can be chosen as Optional Course unit

Teacher in charge GIULIO TRALLI MAT/05

Course unit code Course unit name Teacher in charge Degree course code
IN01123530 ADVANCED MATHEMATICS FOR ENGINEERS (Ult. numero di matricola da 5 a 9) GIULIO TRALLI IN0510

ECTS: details
Type Scientific-Disciplinary Sector Credits allocated
Basic courses MAT/05 Mathematical Analysis 9.0

Course unit organization
Period First semester
Year 2nd Year
Teaching method frontal

Type of hours Credits Teaching
Hours of
Individual study
Lecture 9.0 72 153.0 No turn

Start of activities 30/09/2019
End of activities 18/01/2020
Show course schedule 2019/20 Reg.2011 course timetable

Examination board
Board From To Members of the board
13 2019 01/10/2019 30/09/2020 GAROFALO NICOLA (Presidente)
TRALLI GIULIO (Membro Effettivo)

Target skills and knowledge: Basic notions of multivariable calculus, and in particular of differential calculus and of integration theory.
Examination methods: Written and oral examination.
Assessment criteria: The students need to exhibit a good understanding of the mathematical notions presented during the course, as well as to show the ability of solving the related problems and exercises.
Course unit contents: Euclidean spaces: topology, limits, and continuity. Differentiability of functions of several variables. Local maxima and minima. Curves and surfaces. Lagrange multipliers. Conservative and irrotational vector fields. Riemann integrals in R^n. Integral over curves and surfaces. The divergence theorem. Ordinary differential equations.
Planned learning activities and teaching methods: Lectures consisting of theory and exercises.
Textbooks (and optional supplementary readings)