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The second part of the mathematical analysis course for students of computer science with the focus on the
differential function of several variables.
Students will learn to use partial derivatives and differentials to analyze
multivariate functions (extremes, approximations).
The knowledge of integrals obtained in Mathematical Analysis 1
will be deepened and extended.
A comprehensive framework for the whole study will be provided by a study of
metric spaces.
It will be assumed that the students understand material covered by Mathematical Analysis 1.
Last update: Töpfer Pavel, doc. RNDr., CSc. (26.01.2018)
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The credit will be given for active participation in tutorials, homeworks and successful completion of tests (the exact weight of each of these criteria is determined by the TA). The nature of the first two requirements does not make it possible for repeated attempts for the credit. The teacher can, however, determine alternative conditions for replacing the missing requirements.
The exam oral, possibly in distance form. Obtaining the credit is necessary before the final exam. Last update: Pultr Aleš, prof. RNDr., DrSc. (25.09.2020)
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T. M. Apostol, Mathematical Analysis, Addison-Wesley, 1974 (2nd edition).
Ch. Ch. Pugh, Real Mathematical Analysis, Undergraduate Text in Mathematics, Springer, 2002.
T. Tao, Analysis I, Hindustan Book Agency, 2006.
T. Tao, Analysis II, Hindustan Book Agency, 2006.
V. A. Zorich, Mathematical Analysis I, Universitext, Springer, 2004.
V. A. Zorich, Mathematical Analysis II, Universitext, Springer, 2004. Last update: Klazar Martin, doc. RNDr., Dr. (26.11.2012)
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Exam will be written. A student must obtain credit from the tutorial to take the exam. The material for the exam corresponds to the syllabus to the extent to which topics were covered during lectures and tutorials and in reading assignments. Ability to generalize and apply theoretical knowledge to solving problems will be required. Last update: Klimošová Tereza, Mgr., Ph.D. (18.02.2019)
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More details of integrals of functions of one variable: partial fractions decomposition, simple standard substitutions, fundamental theorem of calculus.
Integrals of functions of several variables: Riemann's integral on a box, Fubini's theorem, calculation by repeated integration.
Differential calculus of functions of several variables:
Metric spaces: a framework for the whole analysis, limits, continuity, informatively topology. Last update: Töpfer Pavel, doc. RNDr., CSc. (26.01.2018)
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