- Docente: Maria Manfredini
- Credits: 9
- Language: Italian
- Moduli: Maria Manfredini (Modulo 1) Giovanni Cupini (Modulo 2)
- Teaching Mode: Traditional lectures (Modulo 1) Traditional lectures (Modulo 2)
- Campus: Bologna
- Corso: First cycle degree programme (L) in Civil Engineering (cod. 0919)
Course contents
Mathematical Analysis 60 hours
Limits and continuity for function in several variables
Definition of bounded, open and closed sets. Real and vectorial
functions of several variables: generalities, limits and
continuity.
Weierstrass's Theorem, Bolzano's Theorems.
Differential calculus for functions of several variables
Partial derivatives and differential for functions of several
variables. DEfinition of Jacobian matrix and gradient of a
function. The chain rule. Partial derivatives of higher
order. Schwarz's Theorem.Taylor's formula of the second order
for functions of several variables.
Relative extrema for real functions of several variables:
definitions, necessary conditions (Fermat's Theorem), sufficient
conditions. The theorem of Lagrange's multipliers.
Multiple integrals
Integral of a continuous function. Properties of the integral. Reduction and change of variable theorems for multple integrals.
Differential equations
The Cauchy problem for differential equations. Theorems on
existence and uniqueness of solutions.
First order linear differential equations, explicit solution
formula.
Homogeneous and non homogeneous order linear differential equations
of second order; constant coefficient equations.
Equations with separable variables.
Regular curves and curve integrals
Definition of regular curves, length of a curve and
Integral of a function over a curve.
Vector fields
The integral of a vector field over an oriented curve. Conservative vector fields and their potentials.
Probability Calculation 30 hours (Prof. Giovanni Cupini)
Probability models
Basic definitions and rules, conditional probability, independence, elements of combinatorial analysis.
Discrete random variables
Definitions and samples (binomial, geometric, hypergeometric, Poisson distributions), multiple random variables.
Continuous random variables
Definitions and samples (uniform distribution, exponential distribution, Gaussian distribution), central limit theory.
Introductory statistics
Elementary descriptive statistics.
Readings/Bibliography
Elementi di Analisi Matematica Due, Fusco, Marcellini, Sbordone, Liguori Editore.
Analisi Matematica, Michiel Bertsch, Roberta Dal Passo, Lorenzo
Giacomelli Ed. McGraw-Hill.
Introduzione alla probabilità, P.Baldi, Ed. Mc Graw Hill.
Teaching methods
Lectures and exercises in the classroom.
Assessment methods
Preliminary written examination and oral examination.
Links to further information
http://www.dm.unibo.it/~manfredi
Office hours
See the website of Maria Manfredini
See the website of Giovanni Cupini