# Download Geometry: From Euclid to Knots fb2

**Saul Stahl**

- Author:Saul Stahl
- ISBN:0130329274
- ISBN13:978-0130329271
- Genre:
- Publisher:Prentice Hall (August 10, 2002)
- Pages:458 pages
- Subcategory:Science & Mathematics
- Language:
- FB2 format1683 kb
- ePUB format1731 kb
- DJVU format1540 kb
- Rating:4.9
- Votes:579
- Formats:rtf lrf doc mbr

Designed to inform readers about the formal development of Euclidean geometry and to prepare prospective high school mathematics instructors to teach Euclidean geometry, this text closely follows Euclid's classic, Elements.

Designed to inform readers about the formal development of Euclidean geometry and to prepare prospective high school mathematics instructors to teach Euclidean geometry, this text closely follows Euclid's classic, Elements. In addition to providing a historical perspective on plane geometry, this text covers non-Euclidean geometries, allowing students to cultivate an appreciation.

Электронная книга "Geometry from Euclid to Knots", Saul Stahl

Электронная книга "Geometry from Euclid to Knots", Saul Stahl. Эту книгу можно прочитать в Google Play Книгах на компьютере, а также на устройствах Android и iOS. Выделяйте текст, добавляйте закладки и делайте заметки, скачав книгу "Geometry from Euclid to Knots" для чтения в офлайн-режиме.

Tracingthe formal development of Euclidean geometry, this text closely follows Euclid's classic, Elements. Includes 1,000 Tracing the formal development of Euclidean geometry, this text closely follows Euclid's classic, Elements.

series Dover Books on Mathematics. Designed to inform readers about the formal development of Euclidean geometry and to prepare prospective high school mathematics instructors to teach Euclidean geometry, this text closely follows Euclid's classic, Elements.

Автор: Stahl Saul Название: Geometry from Euclid to Knots . Non-Euclidean Geometry "first examines the various attempts to prove Euclid's parallel postulate-by the Greeks, Arabs, an. .

Поставляется из: США Описание: Tracing the formal development of Euclidean geometry, this text closely follows Euclids classic, Elements. Non-Euclidean Geometry "first examines the various attempts to prove Euclid's parallel postulate-by the Greeks, Arabs, and mathematicians of the Renaissance.

Euclidean geometry, this text closely follows Euclid's classic, Elements. The Neutral Geometry of the Triangle3. Nonneutral Euclidean Geometry4. Circles and Regular Polygons5.

Good book in undergraduate geometry. High school students can also get some insights here

Good book in undergraduate geometry. High school students can also get some insights here. The print quality is much better than most of the other Dover publications. The plots are clear and accurate.

General Geometry Books . This button opens a dialog that displays additional images for this product with the option to zoom in or out. Report incorrect product info or prohibited items. This text provides a historical perspective on plane geometry and covers non-neutral Euclidean geometry, circles and regular polygons, projective geometry, symmetries, inversions, informal topology, and more. Includes 1,000 practice problems.

Mathematics 2260H – Geometry I: Euclidean geometry. Trent University, Fall 2015. ISBN-13: 978-0-6151-7984-1. Free e-text at: farside. html The Foundations of Geometry, David Hilbert, translated into English by . Free e-text at: ww. utenberg. Lectures: Monday 12:00-13:50 GCS 103 and Wednesday 12:00-12:50 in GCS 106.

SAUL STAHL, PhD, is Professor in the Department of Mathematics at the University of Kansas and twice the winner of the Carl B. Allendoerfer Award from the Mathematical Association of America. CATHERINE STENSON, PhD, is Professor of Mathematics at Juniata College in Huntingdon, Pennsylvania.

The main purpose of this book is to inform the reader about the formal, or axiomatic, development of Euclidean geometry. It follows Euclid's classic text *Elements* very closely, with an excellent organization of the subject matter, and over 1,000 practice exercises provide the reader with hands-on experience in solving geometrical problems. Providing a historical perspective about the study of plane geometry, this book covers such topics as other geometries, the neutral geometry of the triangle, non-neutral Euclidean geometry, circles and regular polygons, projective geometry, symmetries, inversions, informal topology, graphs, surfaces, and knots and links.