MK - Modeling of structures
Course specification | ||||
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Type of study | Master academic studies | |||
Study programme | ||||
Course title | Modeling of structures | |||
Acronym | Status | Semester | Number of classes | ECTS |
MK | mandatory | 1 | 2L + 2E | 5.0 |
Lecturers | ||||
Lecturer | ||||
Lecturer/Associate (practicals) | ||||
Prerequisite | Form of prerequisites | |||
- | - | |||
Learning objectives | ||||
Introduction to numerical methods in engineering. Develop ability to apply numerical methods for the solution of practical problems in civil engineering. Develop ability to use licensed software for solving the practical problems in civil engineering. | ||||
Learning outcomes | ||||
Understanding of the basic theoretical concepts of numerical methods in engineering. Ability to adopt suitable calculation and mathematical model for the concrete problem. | ||||
Content | ||||
Introduction. Mechanical model. Calculation model. Mathematical model. Sources of errors in numerical analysis. Interpolation and approximation. Numerical integration. Numerical differentiation. Solving a nonlinear equation. Solving a system of linear equations. Solving a system of nonlinear equations. Ordinary differential equations in engineering. Partial differential equations in engineering. Numerical methods for solving (systems) of ordinary and partial differential equations. Boundary value problem of elastostatics and elastodynamics. Strong form. Weak form. Methods for the numerical solution of the boundary value problem. Finite element method. Finite difference method. Finite volume method. Collocations. Method of least squares. Method of random nodes. Eigenvalue problem. Use of licensed software packages. Defining individual semestral assignments. | ||||
Teaching Methods | ||||
Auditory lectures and practical exercises. Work on project assignments in computational center by consulting with the assistant. | ||||
Literature | ||||
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Evaluation and grading | ||||
It is compulsory to solve and defend project assignment during the semester. If the students do not pass colloquiums during the semester, they can take correctional colloquiums during the regular examination period. | ||||
Specific remarks | ||||
The course is common for all six modules. The content of the course is adopted with respect to the requirements of the specific module. |