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Lecturer(s)
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Bebčáková Iveta, Mgr. Ph.D.
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Course content
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1. Fundamentals of integral calculus: Indefinite integral, the Riemann integral, application in determination of curve length, area, surface and volume of a solid of revolution. 2. Functions of two variables: Partial derivative, local extremes, differential. 3. Introduction to differential equations: First order ordinary differential equations. 4. Fundamentals of numerical mathematics: Numerical solving of equations with one unknown variable - iterative method. Interpolation, least squares approximation method, differences, numerical differentiation and integration.
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Learning activities and teaching methods
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Lecture, Dialogic Lecture (Discussion, Dialog, Brainstorming)
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Learning outcomes
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Understand the principles ofintegral calculus and theory of differential equations.
Comprehension Understand basic principles ofintegral calculus and theory of differential equations.
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Prerequisites
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Differential calculus of functions of one variable.
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Assessment methods and criteria
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Written exam
Credit: Passing written tests (i.e. obtaining at least half of the possible points in each test).
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Recommended literature
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B. Budinský, J. Charvát. (1990). Matematika I. Praha.
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Bartch H. J. (1983). Matematické vzorce. Praha.
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J. Kopáček. (2002). Matematická analýza pro fyziky. Matfyzpress.
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Klůfa, J., Sýkorová, I. (2023). Učebnice matematiky (2) pro studenty VŠE. Jesenice.
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Kolda S., Krajňáková D., Kimla A. (1990). Matematika pro chemiky II. Praha.
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Kolda S., Krajňáková D., Kimla A. (1989). Matematika pro chemiky I. Praha.
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R. A. Adams. (1991). Calculus: A Complete Course. Addision.
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Tebbut P. (1995). Basic Mathematics for Chemists. Chichester.
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V. Kotvalt. (2003). Základy matematiky pro biologické obory. Praha.
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