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Mathematical Analysis 2

* Exchange students do not have to consider this information when selecting suitable courses for an exchange stay.

Course Unit Code470-2111/03
Number of ECTS Credits Allocated3 ECTS credits
Type of Course Unit *Compulsory
Level of Course Unit *First Cycle
Year of Study *First Year
Semester when the Course Unit is deliveredSummer Semester
Mode of DeliveryFace-to-face
Language of InstructionCzech
Prerequisites and Co-Requisites Course succeeds to compulsory courses of previous semester
Name of Lecturer(s)Personal IDName
BOU10prof. RNDr. Jiří Bouchala, Ph.D.
VOD03doc. Mgr. Petr Vodstrčil, Ph.D.
Summary
This subject contains following topics:
-----------------------------------
differential calculus of two and more-variable real functions,
integral calculus of more-variable real functions or differential equations (according to the version)
Learning Outcomes of the Course Unit
Students will learn about differential calculus of more-variable real functions.
In the second part students will get the basic practical skills for working with fundamental concepts, methods and applications of integral calculus of more-variable real functions.
Course Contents
Lectures:

- More-variable real functions. Partial and directional derivatives,
differential and gradient.
- Taylor's theorem.
- Extremes of more-variable real functions.
- Definition of double integral, basic properties. Fubini theorems for
double integral.
- Transformation of double integral, aplications of double integral.
- Definition of triple integral, basic properties. Fubini theorems for triple
integral.
- Transformation of triple integral, aplications of triple integral.

Exercises:

- More-variable real functions. Partial and directional derivatives,
differential and gradient.
- Taylor's theorem.
- Extremes of more-variable real functions.
- Definition of double integral, basic properties. Fubini theorems for double
integral.
- Transformation of double integral, aplications of double integral.
- Definition of triple integral, basic properties. Fubini theorems for triple
integral.
- Transformation of triple integral, aplications of triple integral.
Recommended or Required Reading
Required Reading:
L. Gillman, R. H. McDowell: Calculus, New York, W.W. Norton & Comp. Inc. 1973.
J. Bouchala: Matematika III, www.am.vsb.cz/bouchala, 2000.
J. Kuben, Š. Mayerová, P. Račková, P. Šarmanová: Diferenciální počet funkcí více proměnných (http://mi21.vsb.cz/modul/diferencialni-pocet-funkci-vice-promennych), 2012.
P. Vodstrčil, J. Bouchala: Integrální počet funkcí více proměnných
(http://mi21.vsb.cz/modul/integralni-pocet-funkci-vice-promennych), 2012.
B. Krajc, P. Beremlijski: Obyčejné diferenciální rovnice (http://mi21.vsb.cz/modul/obycejne-diferencialni-rovnice), 2012.
L. Gillman, R. H. McDowell: Calculus, New York, W.W. Norton & Comp. Inc. 1973.
Recommended Reading:
J. Bouchala, M. Sadowská: Mathematical Analysis I, VŠB-TUO.
J. Bouchala: Sbírka příkladů z matematické analýzy 1, 2 a 3, www.am.vsb.cz/bouchala.
J. Brabec, B. Hrůza: Matematická analýza II, SNTL, Praha, 1986.
B. Budinský, J. Charvát: Matematika II, SNTL, Praha, 1990.
L. Gillman, R. H. McDowell: Calculus, New York, W.W. Norton & Comp. Inc. 1973.
J. Bouchala, M. Sadowská: Mathematical Analysis I, VŠB-TUO.
Planned learning activities and teaching methods
Lectures, Tutorials
Assesment methods and criteria
Task TitleTask TypeMaximum Number of Points
(Act. for Subtasks)
Minimum Number of Points for Task Passing
Graded creditGraded credit100 (100)51
        Test 1Written test20 0
        Test 2Written test20 0
        Závěrečný testWritten test60 0