Non-euclidean geometry and its possible role in the secondary school mathematics syllabus

Fish, Washiela

01 1900

There are numerous problems associated with the teaching of Euclidean geometry at secondary schools today. Students do not see the necessity of proving results which have been obtained intuitively. They do not comprehend that the validity of a deduction is independent of the 'truth' of the initial assumptions. They do not realise that they cannot reason from diagrams, because these may be misleading or inaccurate. Most importantly, they do not understand that Euclidean geometry is a particular interpretation of physical space and that there are alternative, equally valid interpretations. A possible means of addressing the above problems is tbe introduction of nonEuclidean geometry at school level. It is imperative to identify those students who have the pre-requisite knowledge and skills. A number of interesting teaching strategies, such as debates, discussions, investigations, and oral and written presentations, can be used to introduce and develop the content matter. / Mathematics Education / M. Sc. (Mathematics)

Euclidean geometry

Parallel postulate

non-Euclidean geometry

Mathematical-historical aspects

Hyperbolic geometry

Consistency

Poincare model

Philosophical implications

Senior secondary mathematics syllabus

Teaching-learning problems in geometry

Misconceptions about mathematics

Mathematical competency of teachers

Pre-assessment strategies

Teaching-learning strategies

Evaluation strategies

516.9

Geometry

Non-euclidean geometry and its possible role in the secondary school mathematics syllabus

Fish, Washiela

01 1900

There are numerous problems associated with the teaching of Euclidean geometry at secondary schools today. Students do not see the necessity of proving results which have been obtained intuitively. They do not comprehend that the validity of a deduction is independent of the 'truth' of the initial assumptions. They do not realise that they cannot reason from diagrams, because these may be misleading or inaccurate. Most importantly, they do not understand that Euclidean geometry is a particular interpretation of physical space and that there are alternative, equally valid interpretations. A possible means of addressing the above problems is tbe introduction of nonEuclidean geometry at school level. It is imperative to identify those students who have the pre-requisite knowledge and skills. A number of interesting teaching strategies, such as debates, discussions, investigations, and oral and written presentations, can be used to introduce and develop the content matter. / Mathematics Education / M. Sc. (Mathematics)

Euclidean geometry

Parallel postulate

non-Euclidean geometry

Mathematical-historical aspects

Hyperbolic geometry

Consistency

Poincare model

Philosophical implications

Senior secondary mathematics syllabus

Teaching-learning problems in geometry

Misconceptions about mathematics

Mathematical competency of teachers

Pre-assessment strategies

Teaching-learning strategies

Evaluation strategies

516.9

Geometry