After successful completion of the course, students are able to understand and apply the basic concepts of linear algebra. Especially for small dimensions, they shall be able to solve systems of linear equations, eigenvalue problems and linear differential equations (IVP and BVP). Moreover, they shall know the basic concepts such as basis, kernel, domain of a matrix (linear mapping) and be able to describe the solvability of a linear system of equations.
algebraic structures, vectorspaces, linear mappings, matrices, determinants, systems of linear equations, eigenvalueproblems, linear differential equations
The exam consists of practical assignments and theoretical questions related to the lecture content and made available electronically. Therefore a notebook is necessary to participate in the exam, detailed information is provided in the TUWEL course of the lecture. The maximum number of points is 48. The exam is graded with a positive grade if at least half the points have been achieved. Grades are issued according to a nonlinear grading key. The registration for the exam is necessary and has to be done via TISS.
Well-founded knowledge of mathematics from secondary school II (AHS upper level, BHS, etc.), harmonisation course in mathematics.