Course: Differential Equations

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Course title Differential Equations
Course code USE/PU034
Organizational form of instruction Lecture + Lesson
Level of course Bachelor
Year of study 2
Semester Winter
Number of ECTS credits 4
Language of instruction Czech
Status of course Compulsory-optional
Form of instruction unspecified
Work placements unspecified
Recommended optional programme components None
Lecturer(s)
  • Kozakovič Martin, Mgr.
  • Zdráhal Tomáš, doc. RNDr. CSc.
Course content
1. Modeling of problems: physical and mathematical models. 2. Numerical methods and errors in numerical calculations. 3. Solution of nonlinear equations. 4. Solving systems of linear equations - direct and iterative methods. 5. Data interpolation. 6. Data approximation. 7. Numerical calculation of definite integral. 8. Numerical calculation of derivative in point. 9. Solving initial problems for ordinary differential equations: explicit methods. 10. Solution of initial problems for ordinary differential equations: implicit methods. 11. Solution of initial problems for systems of ordinary differential equations.

Learning activities and teaching methods
unspecified
Learning outcomes
The course introduces students to basic numerical methods used in technical practice. Individual methods are illustrated by their using in practical problems solving. Emphasis is placed on the verification of the conditions of use of the methods and the selection of suitable methods for solving the problems. Students are encouraged to verify the correctness of the results obtained and to estimate errors of numerical solutions.
Students will acquire knowledge and skills in the field of numerical methods for solving basic problems. They will gain knowledge of using appropriate software. He / she is familiar with numerical methods used for solving systems of linear equations, has knowledge in solving initial problems for ordinary differential equations. They can apply numerical methods in solving problems from technical practice.
Prerequisites
unspecified

Assessment methods and criteria
unspecified
Recommended literature
  • Diblík, J. a kol. Diferenciální rovnice. FEKT VUT Brno, 2014.
  • Kadlec, J. Diferenciální rovnice. Laplaceova transformace, ČVUT, Praha, 2005..
  • Přikryl P. Numerické metody matematické analýzy. SNTL, Praha, 1988.
  • Svoboda, Z., Vítovec, J. Matematika 2. FEKT VUT Brno, 2014.
  • Vitásek E. Numerické metody. SNTL, 1987.


Study plans that include the course
Faculty Study plan (Version) Category of Branch/Specialization Recommended year of study Recommended semester