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Last update: doc. Dipl.-Math. Erik Jurjen Duintjer Tebbens, Ph.D. (19.09.2022)
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Last update: doc. Dipl.-Math. Erik Jurjen Duintjer Tebbens, Ph.D. (19.09.2022)
Conditions for granting the credit – Mathematics seminars 1. Active participation during all seminars – in the case of absence a written excuse by the physician must be brought. |
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Last update: doc. Dipl.-Math. Erik Jurjen Duintjer Tebbens, Ph.D. (19.09.2022)
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Last update: doc. Dipl.-Math. Erik Jurjen Duintjer Tebbens, Ph.D. (19.09.2022)
Functions of one variable · important types of functions and their characteristics · main rules for graphs drawing and graphical representation of functions · graphical solution of equations · function identification using transformation of coordinates Derivatives · properties, physical and geometrical meaning of derivatives · extrema and behaviour of functions · Taylor series and error estimates Integrals · indefinite integrals · definite integrals · basic properties of differential equations Functions of multiple variables · definition and geometrical meaning of partial derivatives · extrema of functions of two variables Matrices · basic matrix operations
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Last update: doc. Dipl.-Math. Erik Jurjen Duintjer Tebbens, Ph.D. (07.10.2021)
The guarantor lectures, teachers conduct seminars. Consultation may be based on a personal, telephone or email order. |
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Last update: doc. Dipl.-Math. Erik Jurjen Duintjer Tebbens, Ph.D. (19.09.2022)
The exam is a written exam with 20 standard multiple choice (4 possible answers, only one is correct) questions and 2 advanced multiple choice questions. To pass the exam it is necessary to have at least 12 correct answers to standard questions, which will result in the mark „good“ (3). At least 16 correct answers to standard questions are necessary to obtain the mark „very good“ (2). A student with the mark „very good“ (2) can obtain the mark „excellent“ (1) when, in addition, she/he answers correctly to the advanced questions.
The 20 standard questions are questions about the contents of all seminars. The 2 advanced questions are about the contents of not only all seminars, but of all lectures as well. The emphasis is on deeper understanding of mathematical principles (instead of merely learning by heart the computational procedure) and on the ability of abstract thinking. Some (simple) proofs may be required.
The maximally allowed time is 60 min. Admitted tools are: writing accessories, ruler, a simple calculator (without internet connection or modules to directly compute derivatives, integrals or matrix operations; not a cell phone). |