Lecturer(s)


Fürst Tomáš, RNDr. Ph.D.

Závodný Miloslav, RNDr.

Course content

A. Mathematical prerequisites: 1. On natural sciences, mathematics, logic and numbers. 2. What you should know from the high school. 3. Elements of probability. B. Linear algebra: 1. Mappings, linear mappings, matrices and systems of linear equations. C. Elements of mathematical analysis: 1. The notion of a function, operations with functions. 2. Continuity and limits. 3. Differentiation. 4. Integration and differential equations.

Learning activities and teaching methods

Lecture, Dialogic Lecture (Discussion, Dialog, Brainstorming)
 Attendace
 26 hours per semester
 Preparation for the Exam
 40 hours per semester

Learning outcomes

Understand the basic mathematical language for the description of Nature
Comprehension Understand the basics of mathematical analysis, linear algebra and statistical analysis.

Prerequisites

Elementary school mathematics.

Assessment methods and criteria

Oral exam, Written exam
Colloquium: The student is required to solve and to explain the solution of two problems. The two problems are chosen randomly from the list of problems which are assigned during the semester.

Recommended literature


J. Kopáček. (2005). Matematická analáza pro fyziky I. Matfyzpress, Praha.

J. Veselý. (2001). Matematická analýza pro učitele I. Matfyzpress.

K. Rektorys. (1963). Přehled užité matematiky. SNTL Praha.

Kovalt V. (2003). Základy matematiky pro biologické obory. Karolinum Praha.
