Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download Short notes on this section (theorem list)
Document related concepts
Noether's theorem wikipedia , lookup
Line (geometry) wikipedia , lookup
Geometrization conjecture wikipedia , lookup
Brouwer fixed-point theorem wikipedia , lookup
History of geometry wikipedia , lookup
Perceived visual angle wikipedia , lookup
History of trigonometry wikipedia , lookup
Rational trigonometry wikipedia , lookup
Trigonometric functions wikipedia , lookup
Four color theorem wikipedia , lookup
Integer triangle wikipedia , lookup
Transcript
Absolute geometry The exterior angle inequality and Saccheri-Legendre Material for this section references College Geometry: A Discovery Approach, 2/e, David C. Kay, Addison Wesley, 2001. In particular, see section 3.4, pp 152-161. Exterior angle inequality An exterior angle of a triangle has angle measure greater than that of either opposite interior angle. [Kay, p 156] This simple theorem is described as “the key theorem of absolute geometry.” The proof on page 156 is straightforward. It relies on the construction of a specific triangle: and most of the proof is justifying that the triangle can be constructed and gives a pair of congruent triangles. After reading the proof, there’s a lemma you need to work through, that claims that the triangle constructed above has one other property - the sum of the measures of its angles is equal to the angle sum of the original triangle (even though none of the individual angles are congruent!) Saccheri-Legendre theorem The angle sum of any triangle cannot exceed 180◦ . [Kay, p 156] The key point here of course is that the sum isn’t necessarily equal to 180◦ , but must be less than or equal to 180◦ . The theorem is simple; the proof is not. There’s some fairly technical stuff going on there, but the idea is interesting, and can be explained somewhat intuitively. See the posted lecture.
