Course detail
Mathematical Analysis I
FSI-SA1Acad. year: 2010/2011
In the introductory course “Mathematical Analysis I”, students majoring in Mathematical Engineering are familiarised with the fundamental concepts of differential and integral calculus of functions in one real variable. The acquired knowledge is a starting point not only for further study of Mathematical Analysis, but also a necessary assumption for study of physics and theoretical technical disciplines, as well as for practical solving of problems in these disciplines.
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Learning outcomes of the course unit
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Planned learning activities and teaching methods
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Course curriculum
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Aims
Specification of controlled education, way of implementation and compensation for absences
Lectures: recommended
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Prerequisites and corequisites
Basic literature
V. Jarník: Diferenciální počet I, Academia, 1984. (CS)
V. Jarník: Integrální počet I, Academia, 1984. (CS)
Recommended reading
V. Novák: Integrální počet v R, 3. vyd., Masarykova univerzita, 2001. (CS)
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Lecture
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Syllabus
2. Polynomials. Roots of polynomials.
3. Sequences. Limits.
4. Limits of functions. The continuity.
5. Derivations. The L'Hospital rule.
6. Differentials. Higher order derivations and differentials. Taylor polynomials.
7. Stationary points and extremes.
8. Inflection points. Asymptotes.
9. Curves.
10. The indefinite integral.
11. Methods of integration.
12. The Riemann integral.
13. Applications of the Riemann integral.
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