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Geometric Transformations of the Euclidean Plane
Linnaeus University, Faculty of Science and Engineering, School of Computer Science, Physics and Mathematics.
2012 (English)Independent thesis Basic level (degree of Bachelor), 10 credits / 15 HE creditsStudent thesis
Abstract [en]

Klein defined a geometry as a study of the properties of a set S that remain invariant when its elements are subjected to the transformations of some transformation groups. The focus of this thesis is on the definitions, theorems and properties of transformations with a lot of different examples and figures. Also, this thesis aims to teach geometric transformations to future mathematics teachers at the Faculties of Education. In last sections, we will present frieze patterns which are mostly used in our daily life.

Place, publisher, year, edition, pages
2012. , 51 p.
National Category
URN: urn:nbn:se:lnu:diva-19737OAI: diva2:532495
Subject / course
Physics, Chemistry, Mathematics
Available from: 2012-06-11 Created: 2012-06-11 Last updated: 2012-06-11Bibliographically approved

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fulltext(1574 kB)220 downloads
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Type fulltextMimetype application/pdf

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Total: 220 downloads
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ReferencesLink to record
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