Lecturer(s)
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Course content
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Content of lectures: 1. Functions, graphs, Inverse Functions, Trig Functions, Exponential Function, Logarithm Function 2. Limits, continuity, asymptotes 3. Derivatives (Product and Quotient Rule, Derivatives of Trig Functions, Derivatives of Exponential and Logarithm Functions, Trig Functions, Higher Order Derivatives) 4. Local extrem, convexity. 5. Elements of linear algebra (Matrix, Determinant, Systems of linear equations.) Content of practicals: Calculation of limits, derivatives and integrals. Various applications.
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Learning activities and teaching methods
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Monologic (reading, lecture, briefing), Demonstration
- Preparation for classes
- 28 hours per semester
- Preparation for exam
- 28 hours per semester
- Class attendance
- 12 hours per semester
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Learning outcomes
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To develop basic concepts of calculus and linear algebra.
Students will learn a differential calculus of one real variable, to find extremal points of such functions, and to draw their graphs. They will learn how to operate with vectors and matrices and such knowledge they will apply to solve systems of linear eautions.
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Prerequisites
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unspecified
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Assessment methods and criteria
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Written examination
To pass through the final writting exam.
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Recommended literature
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C. Neuhauser: Calculus for Biology and Medicine, Prentice Hall, 2003.
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I. Dostálková: Matematika 0, BF JU, Č. Budějovice,1992.
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