Análise Matemática I
A. Differential Calculus in R: Review of fundamentals of differentiation. Increments, differentials and linear approximations. The mean-value theorem for derivatives. Polynomial approximations to functions: The Taylor polynomials generated by a function. Taylors formula with remainder. Estimates for...
| Autor principal: | |
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| Formato: | other |
| Idioma: | por |
| Publicado em: |
2007
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| Assuntos: | |
| Texto completo: | https://hdl.handle.net/10216/67110 |
| País: | Portugal |
| Oai: | oai:repositorio-aberto.up.pt:10216/67110 |
| Resumo: | A. Differential Calculus in R: Review of fundamentals of differentiation. Increments, differentials and linear approximations. The mean-value theorem for derivatives. Polynomial approximations to functions: The Taylor polynomials generated by a function. Taylors formula with remainder. Estimates for the error in Taylors formula. The Taylor series as a limit of Taylor polynomials. Numerical series: properties, convergence criteria, alternating series. Reference of functional series. Concept of convergence interval. B. Integral Calculus in R: Riemann sums and the integral. Integrability of bounded monotonic functions. The integrability theorem for continues functions. Properties of the integral. Mean-value theorem for integrals. The derivative of an indefinite integral. The first fundamental theorem of calculus. Primitive functions and the second fundamental theorem of calculus. Integration by substitution. Integration by parts. Areas of plane regions. Polar coordinates. Area calculation in polar coordinates. Volume calculations by the method of cross sections. Integration by rational partial fractions. Rational trigonometric integrals. Integrals containing quadratic polynomials. C. Additional topics: Hyperbolic functions. Improper integral. First order differential equations |
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