OVERVIEW

The aim of the course is to provide the basic elements of integral calculus for functions of one variable,  of the theory of ordinary differential equations and of differential calculus for functions of several variables.

AIMS AND CONTENT

LEARNING OUTCOMES

To provide the initial tools for mathematical modeling: integral calculus, series, ordinary differential equations, and the basic theory of functions of several variables.

AIMS AND LEARNING OUTCOMES

The main expected learning outcomes are

• the knowledge of the analytical and geometrical meaning of integral calculus
• the knowledge of the basic tools of differential calculus for functions of several variables
• the knowledge of the basic methods for solving ordinary differential equations
• the ability to solve exercises, discussing the reasonableness of the results

Transversal skills:

Learn to learn (basic level): awareness of one's preferred learning strategies, organization and assessment of personal learning according to what has been understood and learned

PREREQUISITES

Contents of the course Mathematical Analysis 1A.

TEACHING METHODS

Lecture classes and exercise classes.

For the transversal skills, a problems solving based approach will be used.

We advice working students and students with dysfunctionalities or disabilities or other special educational needs to contact the professor at the beginning of the course in order to devise an adequate teaching method and exams, which are in line with the learning outcomes as well as the individual learning skills.

SYLLABUS/CONTENT

Integral calculus and series.  Definite and indefinite integrals. Improper integrals. Numerical series and convergence criteria.

Functions of several variables. Continuity, directional and partial derivatives, gradient.  Differentiability and tangent plane. Level sets. Local minima and maxima: second order derivatives and the Hessian. Schwarz theorem.

Differential equations. Separation of variables.  Linear differential equations: solving methods. Systems of differential equations. Existence and uniqueness for the Cauchy problem. General solution for systems of linear equations.

RECOMMENDED READING/BIBLIOGRAPHY

• C. Canuto, A. Tabacco, Analisi Matematica 1, 4a edizione, Springer-Verlag Italia, 2014,
• C. Canuto, A. Tabacco, Analisi Matematica 2, 2a edizione, Springer-Verlag Italia, 2014
• M. Baronti, M., F. De Mari,  R. van der Putten, I. Venturi,  Calculus Problems, Springer International Publishing Switzerland, 2016

TEACHERS AND EXAM BOARD

LESSONS

LESSONS START

February 2026: https://easyacademy.unige.it/portalestudenti/index.php?view=easycourse&_lang=it&include=corso

Class schedule

The timetable for this course is available here: Portale EasyAcademy

EXAMS

EXAM DESCRIPTION

The exam consists of

• Written exam 
• Oral test (optional)

To enroll the exam you must register by the deadline on the website
https://servizionline.unige.it/studenti/esami/prenotazione

Students with learning disorders ("disturbi specifici di apprendimento", DSA) will be allowed to use specific modalities and supports that will be determined on a case-by-case basis in agreement with the delegate of the Engineering courses in the Committee for the Inclusion of Students with Disabilities.
 

ASSESSMENT METHODS

Written exam. This part includes open questions and exercises. It is aimed to verify the knowledge of the main tools of  calculus that have been introduced through the course. The written exam consists of exercises with several questions of different difficulty.   The student must be able to solve the exercises correctly and to justify the necessary steps to obtain the final result, and to use the correct formalism. 
Optional oral test. It is aimed at verifying the logical/deductive reasoning skills and consists of an oral test on the topics covered in the lectures, with particular focus on the correct statement of the theorems, the proofs of the results discussed during the lectures, and the solution to exercises. In particular, the student's logical/deductive ability and the degree of understanding of the concepts are assessed.

FURTHER INFORMATION

Students with disabilities or specific learning disorders (SLD) are reminded that, in order to request accommodations during exams, they must first upload their certification to the university website at servizionline.unige.it under the “Students” section. The documentation will be verified by the University’s Services for the Inclusion of Students with Disabilities and SLD.

Subsequently, well in advance (at least 7 days) before the exam date, students must send an email to the instructor of the course in which the exam will be taken. The email must also be copied to both the School Inclusion Coordinator for students with disabilities and SLD (contact list available at this link) and the Inclusion Services office mentioned above. The email should include:

• the course title
• the exam date
• the student’s surname, first name, and student ID number
• the compensatory tools and dispensatory measures considered necessary and being requested

The Coordinator will confirm to the instructor that the student is entitled to request exam accommodations and that these accommodations must be agreed upon with the instructor. The instructor will respond, indicating whether the requested accommodations can be granted.

Requests must be sent at least 10 days before the exam date to allow the instructor sufficient time to review them. In particular, if you intend to use concept maps during the exam (which must be much more concise than those used for studying), failure to submit them within the required time frame may result in insufficient time for any necessary adjustments.

For more information on requesting services and accommodations, please consult the document: Guidelines for requesting services, compensatory tools, and/or dispensatory measures and specific aids.