have expert understanding within one or a few selected elements of a central mathematical subject area based on high level research, or has a broader insight into a central mathematical subject area regarding theories and methods as well as central elements and their interrelationships
must be able to understand and on a scientific basis reflect upon the knowledge of the mathematical subject area and be able to identify scientific problems
must be able to identify, formulate and analyse a scientific problem independently, systematically and critically
must be able to relate the problem to the mathematical subject area, including explaining the choices that have been made in connection to the delimitation of the problem
must be able to independently make and justify the choice of mathematical theories and methods
must be able to independently and critically evaluate the chosen theories and methods as well as the analyses, results and conclusions in the project, both during and at the end of the project period
must be able to evaluate and choose between the scientific theories, methods, tools, and general skills within the mathematical subject area
must be able to control work and development situations which are complex, unpredictable and require new mathematical models or methods for solution
must be able to initiate and complete mathematically oriented collaborations, and if relevant also interdisciplinary collaborations, as well as assume professional responsibility
must be able to independently assume responsibility for own professional development and specialisation
Projekt work including PBL elements.
Module extent is 50 ECTS and the expected workload is equivalent to 1500 hours.
Name of exam | Master’s Thesis |
Type of exam | Master's thesis/final project |
ECTS | 50 |
Permitted aids | Please see the semester description / module description |
Assessment | 7-point grading scale |
Type of grading | External examination |
Criteria of assessment | The criteria of assessment are stated in the Examination Policies and Procedures |
Danish title | Kandidatspeciale |
Module code | K-MAT3-PRO50 |
Module type | Project |
Duration | 2 semesters |
Semester | Autumn
|
ECTS | 50 |
Language of instruction | Danish and English |
Location of the lecture | Campus Aalborg |
Responsible for the module |
Education owner | Master of Science (MSc) in Mathematics |
Study Board | Study Board of Mathematical Sciences |
Department | Department of Mathematical Sciences |
Faculty | The Faculty of Engineering and Science |