Fundamentals of Mathematics
A.Y. 2022/2023
Learning objectives
The aim of the course is to provide the basic mathematical tools for the applications of Mathematics to the other sciences (in particular, to Chemistry), focussing on the basic notions of integral and differential calculus for real functions.
Expected learning outcomes
The student will be able to master the tools of differential and integral calculus and to apply them to solving problems, particularly of a chemical nature.
Lesson period: First semester
Assessment methods: Esame
Assessment result: voto verbalizzato in trentesimi
Single course
This course cannot be attended as a single course. Please check our list of single courses to find the ones available for enrolment.
Course syllabus and organization
Single session
Responsible
Lesson period
First semester
Course syllabus
Real and complex numbers. Elementary planar and spatial geometry. Elements of linear Aglebra: abstract vectorial spaces, matrixes, linear functionals, eigenvalues and eigenvectors. Sequences of real numbers. Differential calculus for real functions defined for one or more variables. Integral calculus for real functions defined on one variable. Resolution of linear differential equations of I and II order.
Prerequisites for admission
Rational and irrational equations and inequalities, and systems. Elementary algebra and geometry; knowledge of trigonometry, exponential and logarithmic functions and their applications to equations and inequalities. Basic notions of analytic geometry and applications: lines and conics.
Teaching methods
Traditional lessons and exercises. Tutoring activities will be proposed, in room and on line, on exercises suggested by the teachers.
Teaching Resources
M. Bramanti, C.D. Pagani, S. Salsa:
Matematica. Calcolo infinitesimale e algebra lineare.
Seconda edizione. Ed. Zanichelli, Bologna, 2004
(Eventual second choice) A.M. Bigatti, L. Robbiano
Matematica di base
Seconda Edizione. CEA, Ed. Zanichelli, 2021
Exercises and teaching material will be provided on the web page of the course on the web portal Ariel.
Matematica. Calcolo infinitesimale e algebra lineare.
Seconda edizione. Ed. Zanichelli, Bologna, 2004
(Eventual second choice) A.M. Bigatti, L. Robbiano
Matematica di base
Seconda Edizione. CEA, Ed. Zanichelli, 2021
Exercises and teaching material will be provided on the web page of the course on the web portal Ariel.
Assessment methods and Criteria
The exam consists of a written and an oral part.
The written exam usually lasts 150 minutes. It aims to verify the knolwdege and understanding of the topics of the course in concrete situations, through the resolution of exercises. Two midterm tests will be proposed: if passed, they will allow to avoid the written exam.
A positive evaluation in the written part is required to attend the oral one. It consists of a colloquim where the knowledge of the main topics of the course will be avaluated, as well as the critical capability of discussing new concrete problems. A final mark will be given, up to 30/30.
The written exam usually lasts 150 minutes. It aims to verify the knolwdege and understanding of the topics of the course in concrete situations, through the resolution of exercises. Two midterm tests will be proposed: if passed, they will allow to avoid the written exam.
A positive evaluation in the written part is required to attend the oral one. It consists of a colloquim where the knowledge of the main topics of the course will be avaluated, as well as the critical capability of discussing new concrete problems. A final mark will be given, up to 30/30.
MAT/01 - MATHEMATICAL LOGIC
MAT/02 - ALGEBRA
MAT/03 - GEOMETRY
MAT/04 - MATHEMATICS EDUCATION AND HISTORY OF MATHEMATICS
MAT/05 - MATHEMATICAL ANALYSIS
MAT/06 - PROBABILITY AND STATISTICS
MAT/07 - MATHEMATICAL PHYSICS
MAT/08 - NUMERICAL ANALYSIS
MAT/09 - OPERATIONS RESEARCH
MAT/02 - ALGEBRA
MAT/03 - GEOMETRY
MAT/04 - MATHEMATICS EDUCATION AND HISTORY OF MATHEMATICS
MAT/05 - MATHEMATICAL ANALYSIS
MAT/06 - PROBABILITY AND STATISTICS
MAT/07 - MATHEMATICAL PHYSICS
MAT/08 - NUMERICAL ANALYSIS
MAT/09 - OPERATIONS RESEARCH
Practicals: 32 hours
Lessons: 56 hours
Lessons: 56 hours
Professors:
Camere Chiara, Tarsi Cristina
Educational website(s)
Professor(s)