Calculus I

Code	16133
Year	1
Semester	S1
ECTS Credits	6
Workload	TP(60H)
Scientific area	Mathematics
Entry requirements	-
Learning outcomes	With this Curricular Unit it is intended that students acquire basic knowledge of Differential and Integral Calculus of real functions of real variable. At the end of this Curricular Unit the student should be able to: 1) Compute limits of real functions of real variable; 2) Study the continuity of real functions of real variable; 3) Compute derivatives of real functions of real variable; 4) Apply the derivatives to the computation of maxima and minima of real functions of real variable; 5) Compute primitives and integrals of real functions of real variable; 6) Use integral calculus to determine areas and volumes of surfaces generated by revolution, as well as length of plain curves.
Syllabus	1. Real functions of real variable: generalities and examples 1.1 Generalities about functions 1.2 Examples of functions: exponential and logarithmic; trigonometric and respective inverses; hyperbolic 2. Real functions of real variable: limits and continuity 2.1 Limits 2.2 Continuity 3. Differential Calculus 3.1 Definition and examples; derivation rules 3.2 Rolle's, Lagrange's and Cauchy's Theorems 3.3 Higher order derivatives and Taylor's formula 3.4 Monotony and local extremes; concavity and inflection points 3.5 Applications 4. Integral Calculus 4.1 Immediate primitives 4.2 Primitive techniques 4.3 Riemann integral 4.4 Fundamental Theorem of Integral Calculus 4.5 Change of variable and integration by parts 4.6 Applications of integral calculus to the determination of areas and volumes
Main Bibliography	Main Bibliography: – James Stewart, Daniel Clegg, Saleem Watson – Cálculo, Volume 1, Cengage (2022) Additional Bibliography: – Apostol, T.M., Cálculo, Vol. 1, Reverté, 1993 – H. Anton, I. Bivens, S. Davis, Cálculo, volume I, 8.ª Edição, Bookman, 2007 – Adams, Robert Alexander_ Essex, Christopher - Calculus a complete course, Pearson (2018) – João Paulo Santos, Cálculo numa Variável Real, IST Press, 2012 – Mann, W. R., Taylor, A. E., Advanced Calculus, John Wiley and Sons, 1983 – Swokowski, E. W., Cálculo com Geometria Analítica, Vol. 1 e 2, McGrawHill, 1983
Language	Portuguese. Tutorial support is available in English.