Subject description - BE5B01MA2
Summary of Study |
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Explanatory Notes
Instructions
http://math.feld.cvut.cz/vivi/
| BE5B01MA2 | Calculus 2 | ||
|---|---|---|---|
| Roles: | P | Extent of teaching: | 4P+2S |
| Department: | 13101 | Language of teaching: | EN |
| Guarantors: | Habala P. | Completion: | Z,ZK |
| Lecturers: | Vivi P. | Credits: | 7 |
| Tutors: | Vivi P. | Semester: | L |
Web page:
https://math.fel.cvut.cz/en/people/vivipaol/BE5B01MA2.htmlAnotation:
The subject covers an introduction to the differential and integral calculus in several variables and basic relations between curve and surface integrals. Fourier series are also introduced.Study targets:
The aim of the course is to introduce students to basics of differential and integral calculus of functions of more variables and theory of series.Course outlines:
| 1. | Real plane, three dimensional analytic geometry, vector functions. | |
| 2. | Functions of several variables: limits, continuity. | |
| 3. | Directional and partial derivative, tangent plane, gradient. | |
| 4. | Derivative of a composition of functions, higher order derivatives. | |
| 5. | Local extrema, Lagrange multipliers. | |
| 6. | Double integral, Fubini's Theorem. Polar coordinates. | |
| 7. | Triple integrals. Cylindrical and spherical coordinates. Change of variables in multiple integrals. | |
| 8. | Space curves. Line integrals. | |
| 9. | Potential of a vector field. Fundamental Theorem for line integrals. Green's Theorem. | |
| 10. | Parametric surfaces and their area. Surface integrals. | |
| 11. | Curl and divergence. Gauss, and Stokes theorem and their applications. | |
| 12. | Fourier series. | |
| 13. | Sine and cosine Fourier series. |
Exercises outline:
| 1. | Real plane, three dimensional analytic geometry, vector functions. | |
| 2. | Functions of several variables: limits, continuity. | |
| 3. | Directional and partial derivative, tangent plane, gradient. | |
| 4. | Derivative of a composition of functions, higher order derivatives. | |
| 5. | Local extrema, Lagrange multipliers. | |
| 6. | Double integral, Fubini's Theorem. Polar coordinates. | |
| 7. | Triple integrals. Cylindrical and spherical coordinates. Change of variables in multiple integrals. | |
| 8. | Space curves. Line integrals. | |
| 9. | Potential of a vector field. Fundamental Theorem for line integrals. Green's Theorem. | |
| 10. | Parametric surfaces and their area. Surface integrals. | |
| 11. | Curl and divergence. Gauss, and Stokes theorem and their applications. | |
| 12. | Fourier series. | |
| 13. | Sine and cosine Fourier series. |
Literature:
| 1. | L. Gillman, R. H. McDowell, Calculus, W.W.Norton & Co.,New York, 1973 | |
| 2. | S. Lang, Calculus of several variables, Springer Verlag, 1987 |
Requirements:
http://math.feld.cvut.cz/vivi/BE5B01MA2.pdf Subject is included into these academic programs:| Program | Branch | Role | Recommended semester |
| BPEECS_2018 | Common courses | P | 2 |
| BEECS | Common courses | P | 2 |
| Page updated 21.12.2024 12:51:19, semester: Z,L/2024-5, Z/2025-6, Send comments about the content to the Administrators of the Academic Programs | Proposal and Realization: I. Halaška (K336), J. Novák (K336) |