Course syllabus for Linear algebra

• explain the significance of basic concepts of linear algebra and the connections between them
• combine prior knowledge of mathematics and various concepts in linear algebra for practical problem solving
• present solutions to mathematical problems in writing
• supported by literature and the Internet solve problems that expand and deepen the student's knowledge in linear algebra
• use the mathematical software Matlab to support calculations
• write and document programs in Matlab for solving problems in linear algebra

Geometrical Vectors : Dot product, cross product, linear combinations, orthogonal projection, coordinate systems, lines and planes. Matrix Algebra : Addition, multiplication, transpose, identity and inverse. Linear transformations : Matrix representation, geometrical mappings, composition and inverse. Vectors in arbitrary dimension : Generalization of the geometric concepts to arbitrary dimension. Linear Equations : Matrixrepresentation, solution sets, Gaussian elimination and least squares solution. Determinant : Definition, computation and geometric interpretation. Bases and linear independence : Changing the base of coordinate systems and linear transformations, orthonormal basis and orthogonal matrices. Eigenvalues ​​and eigenvectors : Characteristic equation, spectral theorm, diagonalization and the power method. Graphs and grannmatriser : Graf concepts, transition matrices, random walks, stationary distribution and Markov chains.

The course consists of lectures, exercises and also group exercises that combine theoretical and computer exercises. More detailed information is given on the course homepage before the start of the course.

See course homepage.

The part Examination is examined through a written exam with grades U, 3, 4 and 5. The part Laboratory is examined through homework assignments.