Remaining places in the M.Ed. seminar after the school practical semester can be allocated as undergraduate seminar places. For more information see there!
In HISinOne: no course registration, but exam registration until 8 October 2025.
Teacher: Susanne Knies
Assistant: Jonah Reuß
Language: in German
Undergraduate Seminar (2HfB21, BSc21, MEH21, MEB21)
Supplementary Module in Mathematics (MEd18)
The seminar is preferably intended for M.Ed. students. Remaining places can be allocated as undergraduate seminar places.
In HISinOne: no course registration, but exam registration until 8 October 2025.
Teacher: Susanne Knies
Assistant: Jonah Reuß
Language: in German
Undergraduate Seminar (2HfB21, BSc21, MEH21, MEB21)
Supplementary Module in Mathematics (MEd18)
Lecture: Mi, 10-12h, HS Weismann-Haus, Albertstr. 21a
Tutorial: 2 hours, various dates
Sit-in exam 29.07., 08:30-11:30, HS Rundbau, Albertstr. 21
Sit-in exam (resit) 08.10., 08:30-11:30, HS Weismann-Haus, Albertstr. 21a
Teacher: Nadine Große
Assistant: Jonah Reuß
Language: in German
The lecture gives an introduction to elementary geometry in Euclidian and non-Euclidian space and its mathematical foundations. We get to know Euclidean, hyperbolic, and projective geometry as examples of incidence geometries, and study their symmetry groups.
The next main topic is the axiomatic characterization of the Euclidean plane. The focus is on the story of the fifth Euclidian axiom (and the attempts to get rid of it).
Linear Algebra I
Elementary Geometry (2HfB21, MEH21, MEB21, MEdual24)
Compulsory Elective in Mathematics (BSc21)
30.09.–02.10. and 04.10.; begins on 30.09. at 9h15 in HS Rundbau.
Teacher: Nadine Große
Assistant: Jonah Reuß
Language: in German
Further Chapters in Analysis
Lecture: Mi, 8-10h, HS Weismann-Haus, Albertstr. 21a
Tutorial: 2 hours, various dates
Sit-in exam 12.02., 08:30-11:30, GHS Chemie (HS -1028), Flachbau Chemie, Albertstr. 21
Sit-in exam (resit) 09.04., 08:30-11:30, HS II, Albertstr. 23b
Teacher: Nadine Große
Assistant: Jonah Reuß
Language: in German
\textit{Multiple integration:} Jordan content in \(\mathbb R^n\), Fubini's theorem, transformation theorem, divergence and rotation of vector fields, path and surface integrals in \(\mathbb R^3\), Gauss' theorem, Stokes' theorem.\ \textit{Complex analysis:} Introduction to the theory of holomorphic functions, Cauchy's integral theorem, Cauchy's integral formula and applications.
Required: Analysis~I and II, Linear Algebra~I and II
Further Chapters in Analysis (MEd18, MEH21, MEdual24)
Lecture: Di, Do, 10-12h, SR 404, Ernst-Zermelo-Str. 1
Teacher: Nadine Große
Assistant: Jonah Reuß
Lecture: Mo, Mi, 8-10h, SR 404, Ernst-Zermelo-Str. 1
Teacher: Christian Ketterer
Assistant: Jonah Reuß
general: