Conjectures pertaining to repeated partitioning of a triangle
This note describes two conjectures pertaining to repeated partitioning of an arbitrary triangle. The first conjecture turns out to be true, and hence gives rise to a new, more general, conjecture that is also addressed in this article. Both conjectures can be explored in a dynamic geometry environment. The proofs to the conjectures addressed in this article require knowledge of high school Euclidean geometry.
Keywords: arbitrary triangle; conjectures; dynamic geometry environment; monotonic function
Document Type: Research Article
Affiliations: Department of Mathematics and Computer Science, Valdosta State University, Valdosta, GA, USA
Publication date: 01 September 2008
- Editorial Board
- Information for Authors
- Subscribe to this Title
- Ingenta Connect is not responsible for the content or availability of external websites
- Access Key
- Free content
- Partial Free content
- New content
- Open access content
- Partial Open access content
- Subscribed content
- Partial Subscribed content
- Free trial content