Teaching and learning proof across the grades : a K-16 perspective
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Bibliographic Information
Teaching and learning proof across the grades : a K-16 perspective
(Studies in mathematical thinking and learning)
Routledge, 2011 [i.e. 2010], c2009
- : pbk
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Note
Includes bibliographical references (p. 371-385) and index
Description and Table of Contents
Description
A Co-Publication of Routledge for the National Council of Teachers of Mathematics (NCTM)
In recent years there has been increased interest in the nature and role of proof in mathematics education; with many mathematics educators advocating that proof should be a central part of the mathematics education of students at all grade levels. This important new collection provides that much-needed forum for mathematics educators to articulate a connected K-16 "story" of proof. Such a story includes understanding how the forms of proof, including the nature of argumentation and justification as well as what counts as proof, evolve chronologically and cognitively and how curricula and instruction can support the development of students' understanding of proof. Collectively these essays inform educators and researchers at different grade levels about the teaching and learning of proof at each level and, thus, help advance the design of further empirical and theoretical work in this area. By building and extending on existing research and by allowing a variety of voices from the field to be heard, Teaching and Learning Proof Across the Grades not only highlights the main ideas that have recently emerged on proof research, but also defines an agenda for future study.
Table of Contents
Series Editor's Foreword: The Soul of Mathematics, Alan H. Schoenfeld
Preface
List of Contributors
Introduction
Section I: Theoretical Considerations on the Teaching and Learning of Proof
1. What I Would Like My Students to Already Know About Proof, Reuben Hersh
2. Exploring Relationships Between Disciplinary Knowledge and School Mathematics: Implications For Understanding the Place of Reasoning And Proof in School Mathematics, Daniel Chazan and H. Michael Lueke
3. Proving and Knowing In Public: The Nature of Proof in A Classroom, Patricio Herbst and Nicolas Balacheff
Section II: Teaching and Learning of Proof in the Elementary Grades
4. Representation-based Proof in the Elementary Grades, Deborah Schifter
5. Representations that Enable Children To Engage in Deductive Argument, Anne K. Morris
6. Young Mathematicians At Work: The Role of Contexts And Models in the Emergence of Proof, Catherine Twomey Fosnot and Bill Jacob
7. Children's Reasoning: Discovering the Idea of Mathematical Proof, Carolyn A. Maher
8. Aspects of Teaching Proving In Upper Elementary School, David A. Reid and Vicki Zack
Section III: Teaching and Learning of Proof in Middle Grades and High School
9. Middle School Students' Production of Mathematical Justifications, Eric J. Knuth, Jeffrey M. Choppin and Kristen N. Bieda
10. From Empirical to Structural Reasoning in Mathematics: Tracking Changes Over Time, Dietmar Kuchemann and Celia Hoyles
11. Developing Argumentation and Proof Competencies in the Mathematics Classroom, Aiso Heinze and Kristina Reiss
12. Formal Proof in High School Geometry: Student Perceptions of Structure, Validity And Purpose, Sharon M. Soucy McCrone and Tami S. Martin
13. When is an Argument Just An Argument? The Refinement of Mathematical Argumentation, Kay McClain
14. Reasoning-and-Proving in School Mathematics: The Case of Pattern Identification, Gabriel J. Stylianides and Edward A. Silver
15. "Doing Proofs" in Geometry Classrooms, Patricio Herbst, Chialing Chen, Michael Weiss, and Gloriana Gonzalez, with Talli Nachlieli, Maria Hamlin and Catherine Brach
Section IV: Teaching and Learning of Proof in College
16. College Instructors' Views of Students Vis-a-Vis Proof, Guershon Harel and Larry Sowder
17. Understanding Instructional Scaffolding in Classroom Discourse on Proof, Maria L. Blanton, Despina A. Stylianou and M. Manuela David
18. Building a Community of Inquiry in a Problem-Based Undergraduate Number Theory Course: The Role of the Instructor, Jennifer Christian Smith, Stephanie Ryan Nichols, Sera Yoo and Kurt Oehler
19. Proof in Advanced Mathematics Classes: Semantic and Syntactic Reasoning in the Representation System of Proof, Keith Weber and Lara Alcock
20. Teaching Proving by Coordinating Aspects of Proofs with Students' Abilities, John Selden and Annie Selden
21. Current Contributions toward Comprehensive Perspectives on the Learning and Teaching of Proof, Guershon Harel & Evan Fuller
References
Index
by "Nielsen BookData"