Teacher
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GIULIANI ALESSANDRO
(syllabus)
INTEGRATION IN ONE VARIABLE The notion of area. Riemann sums and definite integral. The fundamental theorem of calculus. Integration techniques: integral by subbstitution and by parts; integral of rational functions. Area enclosed by curves. The mean value of a function. Improper integrals. Length of a curve and curvilinear integral.
ORDINARY DIFFERENTIAL EQUATIONS Separable differential equations. Linear first order differential equations. Second order differential equations with constant coefficients. Vectorial fields. The theorem of existence and uniqueness. The Euler method.
INTEGRALS IN TWO OR MORE VARIABLES The notion of volume. Integrals in planar domains and in the three-dimensional space. Surface area and integral on a surface. Change of variables. The divergence theorem, Green's theorem and Stokes' theorem.
PARTIAL DIFFERENTIAL EQUATIONS The wave and heat equations on an interval.
(reference books)
- D. Benedetto, M. Degli Espositi, C. Maffei, Matematica per le scienze della vita. - P. Marcellini, C. Sbordone, Calcolo. - P. Marcellini, C. Sbordone, Esercitazioni di Analisi Matematica I, prima parte e seconda parte. - J. Stewart, Calculus - Early trascendentals.
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