The course is given by lectures on the blackboard (or at distance via TEAMS if required). No prerequisites are required and teaching is developed in a self-consistent way so that the understanding is made easy for all students. The exam involves an oral test; a written examination is required only if the presence in a room is allowed (not at distance).
The first part of the course develops numerical sequences and series the differential calculus of functions of a real variable. The second part develops integration and ordinary differential equations.The learning outcomes comprise both theoretical aspects (definitions, theorems, formal developments) and applications via exercises.
At the end of the course the student is required to know the concepts (definitions, theorems) and to apply them in practical problems. In the first part this concerns limits (of sequences and functions), continuity, differentiability, Taylor's formula. In the second part the learning outcomes concern methods of integration and solution of simple differential equations.
No prerequisites are required.
The teching method is via lectures on the blackboard, if presence in rooms is allowed. Otherwise lectures are given at distance by following the contents given in lecture notes.
Numerical sets. Induction. Numerical sequences and series. Differential calculus. Taylor's formula. Convex functions. Zeroes of nonlinear functions.
Integration. Ordinary differential equations.
Lecture notes made available via aulaweb.
Ricevimento: Monday 12-13 and 14-16 or by appointment
ANGELO MORRO (President)
MAURO BENATI
VALERIA BERTI
NICOLA PINAMONTI
MAURIZIO ROMEO
CLARA ZORDAN (President Substitute)
September 21, 2020.
The exam is done by an oral examination; a preliminary written examination is required if the presence in rooms is allowed.
Questions during the exam involve both theoretical aspects (theorems, formal developments) and applications via exercises.
