Course syllabus
Differential Equations, 7.5 credits
| Course code: | MA164G | Credits: | 7.5 |
|---|---|---|---|
| Main field of study: | Mathematics | Progression: | G2F |
| Last revised: | 11/09/2020 | ||
| Education cycle: | First cycle | Approved by: | Head of school |
| Established: | 02/12/2019 | Reading list approved: | 11/09/2020 |
| Valid from: | Spring semester 2021 | Revision: | 1 |
Aims and objectives
General aims for first cycle education
First-cycle courses and study programmes shall develop:
- the ability of students to make independent and critical assessments
- the ability of students to identify, formulate and solve problems autonomously, and
- the preparedness of students to deal with changes in working life.
In addition to knowledge and skills in their field of study, students shall develop the ability to:
- gather and interpret information at a scholarly level
- stay abreast of the development of knowledge, and
- communicate their knowledge to others, including those who lack specialist knowledge in the field.
(Higher Education Act, Chapter 1, Section 8)
Course objectives
Competence and Skills
After completed studies, the student shall be able to
- use the concepts, definitions, and theorems used in the course,
- model the mathematical applications covered during the course,
- choose the appropriate method for problem solving within the framework of the course, and
- present solutions to problems in a clear, comprehensible, and pedagogical way.
Evaluation Ability and Approach
After completed studies, the student shall be able to
- assess the reasonableness of results in problem solving.
Main content of the course
Method of reduction of order. Exact solutions of linear ODE. Harmonic oscillator. Kepler's laws. Picard's theorem. Sturm's theorem. Series solutions. Fourier series. Laplace transforms. Nonlinear systems of ODE. Critical points. Stability. Conservative systems. Periodic solutions. Boundary value problems. Laplace equation. Heat equation. Wave equation. Applications in biology and economy.
Teaching methods
Teaching is done in the form of lectures.
The teaching methods may be altered, should only a few students take the course.
Students who have been admitted to and registered on a course have the right to receive tuition and/or supervision for the duration of the time period specified for the particular course to which they were accepted (see, the university's admission regulations (in Swedish)). After that, the right to receive tuition and/or supervision expires.
Examination methods
Examination, 7.5 credits (Code: A001)
Written examination.
For students with a documented disability, the university may approve applications for adapted or other forms of examinations.
For further information, see the university's local examination regulations (in Swedish).
Grades
According to the Higher Education Ordinance, Chapter 6, Section 18, a grade is to be awarded on the completion of a course, unless otherwise prescribed by the university. The university may prescribe which grading system shall apply. The grade is to be determined by a teacher specifically appointed by the university (an examiner).
In accordance with university regulations regarding grading systems for first and second-cycle courses (Vice-Chancellor’s decision ORU 2018/00929), one of the following grades shall be used: Fail (U), Pass (G) or Pass with Distinction (VG). For courses that are included in an international Master’s programme (60 or 120 credits) or offered to the university’s incoming exchange students, the grading scale of A-F shall be used. The vice-chancellor, or a person appointed by the vice-chancellor, may decide on exceptions from this provision for a specific course, if there are special grounds.
Grades used on course are Fail (F), Sufficient (E), Satisfactory (D), Good (C), Very Good (B) or Excellent (A).
Examination
Grades used are Fail (F), Sufficient (E), Satisfactory (D), Good (C), Very Good (B) or Excellent (A).
For further information, see the university's local examination regulations (in Swedish).
Specific entry requirements
Mathematical Modelling and Problem Solving, 6 Credits and Komplex Analysis, 6 Credits.
For further information, see the university's admission regulations (in Swedish).
Transfer of credits for previous studies
Students who have previously completed higher education or other activities are, in accordance with the Higher Education Ordinance, entitled to have these credited towards the current programme, providing that the previous studies or activities meet certain criteria.
For further information, see the university's local credit transfer regulations (in Swedish).
Other provisions
All or part of the course may be given in English.
Reading list and other teaching materials
Required Reading
Simmons, George F. (latest edition)
Differential Equations with Applications and Historical Notes
CRC Press