Modelling Hyperbolic Space: Designing a Computational Context for Learning Non-Euclidean Geometry
I. Stevenson. International Journal of Computers for Mathematical Learning, 5 (2):
143--167(2000)
Abstract
This paper describes and analyses the iterative design and development of a computational context for non-euclidean geometry. Drawing on three episodes from the design process, the paper discusses the epistemological implications associated with interplay between learning hyperbolic geometry and context in which that learning takes place. In particular, it explores the ways in which learners can become designers of the computational context, and the designer can become a learner. The paper concludes with a discussion of the microworld paradigm in relation to what might be called ‘advanced’ mathematics.
%0 Journal Article
%1 stevenson2000mhs
%A Stevenson, Ian
%D 2000
%I Springer
%J International Journal of Computers for Mathematical Learning
%K design designresearch geometry hyperbolic learning mathematics microworlds non-euclidean
%N 2
%P 143--167
%T Modelling Hyperbolic Space: Designing a Computational Context for Learning Non-Euclidean Geometry
%U http://www.springerlink.com/content/q58554380v262rp2/
%V 5
%X This paper describes and analyses the iterative design and development of a computational context for non-euclidean geometry. Drawing on three episodes from the design process, the paper discusses the epistemological implications associated with interplay between learning hyperbolic geometry and context in which that learning takes place. In particular, it explores the ways in which learners can become designers of the computational context, and the designer can become a learner. The paper concludes with a discussion of the microworld paradigm in relation to what might be called ‘advanced’ mathematics.
@article{stevenson2000mhs,
abstract = {This paper describes and analyses the iterative design and development of a computational context for non-euclidean geometry. Drawing on three episodes from the design process, the paper discusses the epistemological implications associated with interplay between learning hyperbolic geometry and context in which that learning takes place. In particular, it explores the ways in which learners can become designers of the computational context, and the designer can become a learner. The paper concludes with a discussion of the microworld paradigm in relation to what might be called ‘advanced’ mathematics.},
added-at = {2008-08-01T12:52:00.000+0200},
author = {Stevenson, Ian},
biburl = {https://www.bibsonomy.org/bibtex/24abeca4b3704f3e7700bc7a87abae497/yish},
interhash = {633dfd79603051b8f13289d128af7086},
intrahash = {4abeca4b3704f3e7700bc7a87abae497},
journal = {International Journal of Computers for Mathematical Learning},
keywords = {design designresearch geometry hyperbolic learning mathematics microworlds non-euclidean},
number = 2,
pages = {143--167},
publisher = {Springer},
timestamp = {2008-08-01T12:52:00.000+0200},
title = {Modelling Hyperbolic Space: Designing a Computational Context for Learning Non-Euclidean Geometry},
url = {http://www.springerlink.com/content/q58554380v262rp2/},
volume = 5,
year = 2000
}