ECTS Course Catalogue
Course details
Course code:
IBS20081o16Semester:
2016/2017 summerName:
MathematicsMajor:
Civil EngineeringStudy Type:
second cycleCourse type:
compulsoryStudy Semester:
1ECTS points:
3Hours (Lectures / Tutorials / Other):
15 / 15 / 0Lecturer:
dr inż. Zbigniew JurzykLanguage of instruction:
PolishLearning outcomes:
Knowledge:
student
• has knowledge about ordinary differential equations of 1st and 2nd order
• understands and distinguishes initial and boundary conditions
• has basic knowledge on systems of ordinary differential equations
• knows about partial differential equations and their classification (hyperbolic, parabolic, elliptic equations)
• knows applications of differential equations in technical sciences
• knows concept of trigonometric series
• knows the Euler-Fourier formulae and expansion of selected functions into the Fourier series
• knows elements of variational calculus, including the Euler theorem
• knows definition of tensor, its properties and fields of its applications
Skills:
• can solve typical ordinary differential equations of 1st and 2nd order
• can solve initial and boundary value problems for specified ODE
• can describe spmple engineering problems using ordinary differential equations and its systems
• can solve partial differential equations of hyperbolic, parabolic and elliptic type
• can state typical initial- and initial-boundary value problems for PDE
• can expand some function into Fourier series
• can apply the Euler principle in variational calculus
• can use tensor calculus methods
Competences:
Student is aware of applying differential equations methods to problems in technical and natural sciencesPrerequisites:
D differential and integral calculus of single variable ant their applications, function of two real variables; partial derivatives.
Course content:
• Ordinary differential equations of 1st and 2nd order: definitions, properties and solution methods.
• Solving systems of ordinary differential equations.
• Applications of ODE in technical sciences.
• Stating typical initial and initial-boundary value problems.
• Trigonometric series.
• Fourier transformation and Fourier series.
• Elements of variational calculus.
• Elements of tensor calculus.
Recommended literature:
1. M. Gewert, Z. Skoczylas, Równania różniczkowe zwyczajne, Oficyna Wydawnicza GiS, Wrocław 2008
2. W. Krysicki, L. Włodarski. Analiza matematyczna w zadaniach cz.2, PWN Warszawa 2006
3. M.M.Smirnow. Zadania z równań różniczkowych cząstkowych, PWN Warszawa 1974
4. L.S. Pontriagin. Równania różniczkowe zwyczajne, PWN Warszawa 1964
5. Goering, Elementarne metody rozwiązywania równań różniczkowych, PWN Warszawa 1967
Assessment methods:
3 tests + one essay.Comment: