- Inbunden (Hardback)
- Antal sidor
- 1st ed. 2018
- Springer International Publishing AG
- Stylianides, Andreas (ed.), Harel, Guershon (ed.)
- Bibliographie 48 schwarz-weiße Abbildungen
- 48 Illustrations, black and white; XI, 301 p. 48 illus.
- 234 x 156 x 19 mm
- Antal komponenter
- 1 Hardback
- 617 g
Du kanske gillar
Advances in Mathematics Education Research on Proof and Proving
An International Perspective
Fri frakt inom Sverige för privatpersoner.
Fler böcker av författarna
Research in Collegiate Mathematics Education. V
Seven papers by mathematicians and educators reflect current research concerning the understanding, teaching, and learning of mathematics at the post-secondary level. Focusing on the ways students think about and learn mathematics, rather than on ...
Proving in the Elementary Mathematics Classroom
Andreas J Stylianides
Although proving is core to mathematics as a sense-making activity, it currently has a marginal place in elementary classrooms internationally. Blending research with practical perspectives, this book addresses what it would take to elevate the pl...
Recensioner i media
"The contents cover new trends and developments in mathematics education on proof and proving. ... will give readers an idea of what can be found in this volume." (Annie Selden, MAA Reviews, March 29, 2019)
Bloggat om Advances in Mathematics Education Researc...
Preface Andreas J. Stylianides*; Guershon Harel email@example.com THEME 1: EPISTEMOLOGICAL ISSUES RELATED TO PROOF AND PROVING Chapter 1. Reflections on proof as explanation Gila Hanna - firstname.lastname@example.org Chapter 2. Working on proofs as contributing to conceptualization - The case of IR completeness Viviane Durand-Guerrier*; Denis Tanguay email@example.com Chapter 3. Types of epistemological justifications, with particular reference to complex numbers Guershon Harel firstname.lastname@example.org Chapter 4. Mathematical argumentation in elementary teacher education: The key role of the cultural analysis of the content Paolo Boero*; Giuseppina Fenaroli; Elda Guala email@example.com Chapter 5. Toward an evolving theory of mathematical practice informing pedagogy: What standards for this research paradigm should we adopt? Keith Weber*; Paul Dawkins firstname.lastname@example.org THEME 2: CLASSROOM-BASED ISSUES RELATED TO PROOF AND PROVING Chapter 6. Constructing and validating the solution to a mathematical problem: The teacher's prompt Maria Alessandra Mariotti*; Manuel Goizueta email@example.com Chapter 7. Addressing key and persistent problems of students' learning: The case of proof Andreas J. Stylianides*; Gabriel J. Stylianides firstname.lastname@example.org Chapter 8. How can a teacher support students in constructing a proof? Bettina Pedemonte email@example.com Chapter 9. Proof validation and modification by example generation: A classroom-based intervention in secondary school geometry Kotaro Komatsu*; Tomoyuki Ishikawa; Akito Narazaki firstname.lastname@example.org Chapter 10. Classroom-based issues related to proofs and proving Ruhama Even email@example.com THEME 3: COGNITIVE AND CURRICULAR ISSUES RELATED TO PROOF AND PROVING Chapter 11. Mathematical argumentation in pupils' written dialogues Gjert-Anders Askevold; Silke Lekaus* firstname.lastname@example.org Chapter 12. The need for "linearity" of deductive logic: An examination of expert and novice proving processes Shiv Smith Karunakaran email@example.com Chapter 13. Reasoning-and-proving in algebra in school mathematics textbooks in Hong Kong Kwong-Cheong Wong*; Rosamund Sutherland firstname.lastname@example.org Chapter 14. Irish teachers' perceptions of reasoning-and-proving amidst a national educational reform Jon D. Davis email@example.com Chapter 15. About the teaching and learning of proof and proving: Cognitive issues, curricular issues and beyond Lianghuo Fan*; Keith Jones firstname.lastname@example.org THEME 4: ISSUES RELATED TO THE USE OF EXAMPLES IN PROOF AND PROVING Chapter 16. How do pre-service teachers rate the conviction, verification and explanatory power of different kinds of proofs? Leander Kempen email@example.com Chapter 17. When is a generic argument a proof? David Reid*; Estela Vallejo Vargas firstname.lastname@example.org Chapter 18. Systematic exploration of examples as proof: Analysis with four theoretical frameworks Orly Buchbinder email@example.com Chapter 19. Using examples of unsuccessful arguments to facilitate students' reflection on their processes of proving Yosuke Tsujiyama*; Koki Yui firstname.lastname@example.org Chapter 20. Genericity, conviction, and conventions: Examples that prove and examples that don't prove Orit Zaslavsky email@example.com