58048 - Mathematics with Exercises

Academic Year 2018/2019

  • Docente: Paolo Negrini
  • Credits: 13
  • SSD: MAT/05
  • Language: Italian
  • Teaching Mode: Traditional lectures
  • Campus: Bologna
  • Corso: First cycle degree programme (L) in Industrial Chemistry (cod. 8513)

Learning outcomes

On successful completion of the course, students will have acquired the basic knowledge of one-variable calculus, vector calculus and linear algebra, the first elements of multivariable calculus, complex numbers and the most elementary methods for solving ordinary differential equations. In particular, students will be able to represent data or functions in graphical form, to apply one-variable and multivariable calculus and to perform operations on vectors and matrices and will know how to use some basic concepts of scientific computing, such as error analysis, approximation of experimental data, interpolation, numerical integration, nonlinear equations and systems of linear equations.

Course contents

Prerequisites: Elementary set theory. Algebra of real numbers. Algebraic equations and inequations. Elementary functions: powers, roots, exponential and logarithmic functions, circular functions. Analytic geometry in the Euclidean plane. Vectors in the plane and space.

Real numbers, inequalities, absolute value.
Elementary real functions: power functions, roots, exponential and logarithm, circular and hyperbolic functions and their inverses.
Elements of linear algebra:
Systems of linear equations, coefficient matrix and augmented matrix of a system of linear equations, (Gauss-Jordan) row reduction, rank of a matrix, Rouché-Capelli theorem, solving systems of linear equations by reducing the system to row echelon form (Gaussian elimination), determinant of a square matrix, Cramer's rule.
Vector space structure of R^n, linear dependence and independence of vectors, connection with the rank of suitable matrices, bases of subspaces, dimension of subspaces, linear transformations from R^n to R^m, kernel and image, matrix of a linear transformation, linear transformations from R^n to itself, eigenvalues and eigenvectors, eigenbases, positive definite, negative definite, and indefinite matrices.
Limits and continuity, basic theorems.
Derivatives, basic theorems and applications: tangents to curves, increasing and decreasing functions, convexity, graphs of functions, Taylor's formula.
Integrals in one variable, primitives, integration of rational functions, integration by substitution and by parts.
Ordinary differential equations (ODEs), methods to solve first order ODEs, of linear type or separate variables type, and linear ODEs of higher order with constant coefficients.
First elements of differential calculus of several variables, partial derivatives, gradient and Hessian matrix, maxima and minima.
Double integrals: geometric meaning, computing double integrals as iterated integrals, change of variables, use of polar coordinates.

Readings/Bibliography

M. Bramanti, C. D. Pagani, S. Salsa: 2a ed., Zanichelli, Bologna, 2004. [http://www.zanichelli.it/ricerca/prodotti/matematica-calcolo-infinitesimale-e-algebra-lineare]

M. Bramanti, C. D. Pagani, S. Salsa: 1 Zanichelli, Bologna, 2014. [http://www.zanichelli.it/ricerca/prodotti/analisi-matematica-1-bramanti-pagani-salsa]

M. Bramanti, C. D. Pagani, S. Salsa: 2, 2. Zanichelli, Bologna, 2009. [http://www.zanichelli.it/ricerca/prodotti/analisi-matematica-2]

S. Salsa, A. Squellati: Esercizi di Analisi matematica 1, 2 (two volumes), Zanichelli, Bologna, 2011.

E. Steiner: The Chemistry Maths Book, Second Edition. Oxford University Press, Oxford, 2008.

M.R. Spiegel: Theory and Problems of Advanced Calculus. Schaum's Outline Series, McGraw-Hill, 1974.

P. Negrini: Equazioni differenziali. Pitagora editrice, Bologna, 1999.

Teaching methods

Lessons accompanied by exercise classes with tutor.

Assessment methods

The course assessment consists of a 3 hour open book examination (5 exercises on the topics covered in the course) followed by an oral examination.
Each exercise of the written examination is graded on a 6-point scale, and the pass mark is 50%, that is, 15 points in total. The validity of the written exam is limited to one examination session. The oral exam aims to test knowledge acquisition and to discuss exercises. The final mark, on a 30-point scale, is based on both parts of the examination.

Teaching tools

Alma Mathematica [https://almaorienta.unibo.it/AlmaMathematica] : an online math-bridge course which with its diagnostic tests offers students the possibility to complete the missing pieces and refresh the material necessary for a successful study of mathematics. This self-study course is complemented by a virtual tutorial where students can get instant help by skype, e-mail and telephone.

Office hours

See the website of Paolo Negrini