BASIC MATHEMATICS
cod. 21669

Academic year 2018/19
1° year of course - First semester
Professor
Alessandra COSCIA
Academic discipline
Analisi matematica (MAT/05)
Field
Formazione matematica di base
Type of training activity
Basic
56 hours
of face-to-face activities
6 credits
hub:
course unit
in ITALIAN

Learning objectives

Formative purposes:
The aim of the course is to provide basic mathematical knowledge of the programmes of primary and secondary schools, necessary to follow all of the courses of the first year. During the formative activity the student can fill possible gaps or consolidate his knowledge.
At the end of the course the student is expected to be able:
Knowledge and understanding:
- to know the different sets of numbers and their properties
- to remember all the properties of equations, inequalities and systems
- to know function theory
- to know the basics of trigonometry
- to have understood the concepts of exponential and logarithm
- to know basic figures of analytical geometry and their equations
- to have understood logic of propositions and set theory
Applying knowledge and understanding:
- to order numbers, to factorize a polynomial
- to perform calculations with fractions, radicals, exponentials and logarithms
- to calculate sine, cosine and tangent of a known angle
- to solve equations, inequalities and systems of first and second degree, of degree larger than two, irrational, trigonometric, exponential and logarithmic
- to determine the domain, the range and the inverse image of a function whose graph is given; to prove that a function is injective, surjective, increasing or decreasing
- to draw the graph of an elementary function or of a piecewise defined function based on transformations of elementary functions
- to analyse and draw straight lines, parabolas, circumferences, ellipses, hyperbolas
- to analyse and to deny a proposition, to prove set’s properties
Making judgments:
- to be able to face an autonomous analysis of possible applications during the following courses
Communication skills:
- to have acquired the ability to work both autonomously and in groups
Learning skills:
- to be able to carry on with his scientific studies autonomously.

Prerequisites

Mandatory prerequisites: elementary mathematics.
All further mathematical knowledge from primary and secondary schools is useful.

Course unit content

Topics:
1. NUMBERS
2. LOGIC OF PROPOSITIONS, SET THEORY
3. EQUATIONS, INEQUALITIES, POLYNOMIALS
4. FUNCTIONS
5. ANALYTICAL GEOMETRY, TRIGONOMETRY
6. EXPONENTIAL FUNCTIONS, LOGARITHMS

Full programme

Topics:
1. NUMBERS
2. LOGIC OF PROPOSITIONS, SET THEORY
3. EQUATIONS, INEQUALITIES, POLYNOMIALS
4. FUNCTIONS
5. ANALYTICAL GEOMETRY, TRIGONOMETRY
6. EXPONENTIAL FUNCTIONS, LOGARITHMS

Bibliography

Reference books:
E. Acerbi, G. Buttazzo: Matematica Preuniversitaria di Base. Pitagora Editrice, Bologna (2003).
Additional material (on the platform ELLY):
Lectures 2017-18.
Exercises with solution.
Examinations with solution (2017-2018).

Teaching methods

Teaching methods:
Mathematics: 6 CFU, 56 hours in the lecture-hall (32 hours of lectures, 24 hours of practices).
Physics: 3 CFU, 28 hours in the lecture-hall (16 hours of lectures, 12 hours of practices).
The course takes place from the 17th of September to the 8th of October 2018, with 18 hours per week during the first three weeks and 2 hours on the 8th of October. Some hours between the 8th to the 12th of October will be devoted to reviewing and to the first exam (on the 12th of October).
The teaching activities consist of frontal lectures at the blackboard and practices. Some practices hours are devoted to guided exercises during which the students, autonomously or in small groups, solve the proposed exercises with the supervision of the teacher.
During the course three formative tests (each one hour long) are planned in order to point out gaps, evaluate the progress of the student’s learning and give a feedback to the students before the final test. The results of those tests will not affect the final test.
At the beginning of the course some additional material is uploaded on the platform Elly: lectures 2017-18, examinations 2017-18 with solution, exercises on the whole programme with solution. Moreover, every week worksheets of exercises will be uploaded on the platform in preparation of the formative tests and of the final exam (14 worksheets overall).
To download the teaching stuff the on-line registration is needed.
The uploaded lectures are an integral part of the teaching material.
Non-attending students are advised to check the available teaching material and the informations given by the teacher via the platform Elly.

Assessment methods and criteria

Method of testing learning:
The final evaluation on the learning consists of a 3 hours long written test; books, notes and electronic devices are not allowed.
The student must prove he has understood, and he is able to apply, the basic concepts of every topic in the programme.
The written test is splitted into two parts: a theoretical test only for students of Mathematics and an applying knowledge test for all students in Mathematics and Phisics.
The two tests are strucured as follow:
1) theoretical test (1 hour) with 4 questions on logic of propositions, set theory and function theory (0-31 points) and an optional short proof (0-2 points)
2) applying knowledge test (2 hours) with 5 exercises (0-33 points for Mathematics and 0-32 for Physics) and an optional exercise for Physics (0-2 points). A first preliminary exercise (0-15 points) contains eight simple questions on the whole programme, the second is an irrational or absolute value inequality (0-4 points), in the third it is asked to draw the graph of a piecewise defined function (0-7 points), the fourth consists of the analysis of a function whose graph is given (0-4 points for Mathematics, 0-3 points for Physics), while the fifth exercise concerns analytical geometry (0-3 points).
The final mark is calculated by adding the mark of the optional exercise to the points of the written test (0-32 points, for Mathematics the mean value of the two parts). The exam is passed with a final mark of minimum 18/30.
For Physics the written test programme does not contain logic of propositions, definitions and proofs.
The results of the exam will be published on the platform Elly within two weeks from the written test’s date.
The students can examine their written tests during the time specified by the teacher or by appointment.

Other information

Other information:
This course (6CFU) is mandatory for all students in Mathematics.
Part of this course (3CFU) is mandatory for all students in Physics.
The course of Basic Mathematics is a prerequisite to Algebra and Mathematical Analysis 1. Attending to the course is mandatory (75%) for all students who have not passed their self-evaluation test or are relieved from it, for instance with the certificate of the final test of the CORDA Project with two bonus points. For the full list of relieving conditions see the OFA (added formative obligations) in the Manifesto degli studi 2018-19 at the entry: ESONERO TEST VPI. Moreover for these students the course of Basic Mathematics is a prerequisite to all other exams in the degree course.
Attending to the course is strongly recommended to all students.

2030 agenda goals for sustainable development

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Contacts

Toll-free number

800 904 084

Student registry office

E. segreteria.scienze@unipr.it
T. +39 0521 905116

Quality assurance office

Education manager
dott.ssa Giulia Bonamartini

T. +39 0521 906968
E. servizio smfi.didattica@unipr.it
E. del manager giulia.bonamartini@unipr.it

President of the degree course

Prof. Luca Lorenzi
E. luca.lorenzi@unipr.it

Faculty advisor

Prof. Luca Lorenzi
E. luca.lorenzi@unipr.it

Career guidance delegate

Prof. Francesco Morandin
E. francesco.morandin@unipr.it

Tutor Professors

Prof. Emilio Acerbi
E. emilio.acerbi@unipr.it

Prof. Marino Belloni
E. marino.belloni@unipr.it

Prof.ssa Maria Groppi
E. maria.groppi@unipr.it

Prof.ssa Chiara Guardasoni
E. chiara.guardasoni@unipr.it

Prof. Luca Lorenzi
E. luca.lorenzi@unipr.it

Prof. Costantino Medori
E. costantino.medori@unipr.it

Prof. Adriano Tomassini
E. adriano.tomassini@unipr.it

Erasmus delegates

Prof.ssa Fiorenza Morini
E. fiorenza.morini@unipr.it

Quality assurance manager

Prof.ssa Maria Groppi
E. maria.groppi@unipr.it

Tutor students

Dott. Matteo Mezzadri
E. matteo.mezzadri@studenti.unipr.it