801257 PS Introductory Seminar Linear Algebra and Geometry 1 (2004S)
Introductory Seminar Linear Algebra and Geometry 1
Continuous assessment of course work
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Groups
Group 1
Language: German
Lecturers
Classes (iCal) - next class is marked with N
Monday
15.03.
19:00 - 20:30
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Group 2
Language: German
Lecturers
Classes (iCal) - next class is marked with N
Tuesday
23.03.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
30.03.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
20.04.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
27.04.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
04.05.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
11.05.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
18.05.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
25.05.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
08.06.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
15.06.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
22.06.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Tuesday
29.06.
15:10 - 16:40
Hörsaal 2 Eduard Suess, 2A122 1.OG UZA II Geo-Zentrum
Information
Aims, contents and method of the course
Assessment and permitted materials
Minimum requirements and assessment criteria
understanding of the subject
Examination topics
The active solution of excercises by students should deepen the understanding of the subject.
Reading list
(kleine Auswahl) H. Anton, Lineare Algebra, Spektrum 1998; H. Rindler, Lineare Algebra, Univ. Wien (Vorlesungsskriptum); H. Kowalsky und G. Michler, Lineare Algebra, de Gruyter 2003; K. Jänich, Lineare Algebra, Springer-Verlag 2002.
Association in the course directory
Currently no association information is available.
Last modified: Sa 02.04.2022 00:30
the search for solutions of systems of linear equations. The appropriate and fundamental abstract concept in this context is that of a finite
dimensional vector space (over a field K) and that of a linear mapping. In the first part of this lecture the following chapters are treated: 1) The
3-dimensional space, 2) Vectorspaces, 3) Linear mappings and matrices, 4) Systems of linear equations, 5) Determinants, 6) Euclidean and unitary vector spaces.