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Research in Collegiate Mathematics Education. VII
 
Edited by: Fernando Hitt Université du Québec á Montréal, Montréal, QC, Canada
Derek Holton University of Melbourne, Parkville, Victoria, Australia
Patrick W. Thompson Arizona State University, Tempe, AZ
A co-publication of the AMS and CBMS
Research in Collegiate Mathematics Education. VII
Softcover ISBN:  978-0-8218-4996-5
Product Code:  CBMATH/16
List Price: $62.00
MAA Member Price: $55.80
AMS Member Price: $49.60
eBook ISBN:  978-1-4704-1565-5
Product Code:  CBMATH/16.E
List Price: $62.00
MAA Member Price: $55.80
AMS Member Price: $49.60
Softcover ISBN:  978-0-8218-4996-5
eBook: ISBN:  978-1-4704-1565-5
Product Code:  CBMATH/16.B
List Price: $124.00 $93.00
MAA Member Price: $111.60 $83.70
AMS Member Price: $99.20 $74.40
Research in Collegiate Mathematics Education. VII
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Research in Collegiate Mathematics Education. VII
Edited by: Fernando Hitt Université du Québec á Montréal, Montréal, QC, Canada
Derek Holton University of Melbourne, Parkville, Victoria, Australia
Patrick W. Thompson Arizona State University, Tempe, AZ
A co-publication of the AMS and CBMS
Softcover ISBN:  978-0-8218-4996-5
Product Code:  CBMATH/16
List Price: $62.00
MAA Member Price: $55.80
AMS Member Price: $49.60
eBook ISBN:  978-1-4704-1565-5
Product Code:  CBMATH/16.E
List Price: $62.00
MAA Member Price: $55.80
AMS Member Price: $49.60
Softcover ISBN:  978-0-8218-4996-5
eBook ISBN:  978-1-4704-1565-5
Product Code:  CBMATH/16.B
List Price: $124.00 $93.00
MAA Member Price: $111.60 $83.70
AMS Member Price: $99.20 $74.40
  • Book Details
     
     
    CBMS Issues in Mathematics Education
    Volume: 162010; 261 pp
    MSC: Primary 97; 00

    The present volume of Research in Collegiate Mathematics Education, like previous volumes in this series, reflects the importance of research in mathematics education at the collegiate level. The editors in this series encourage communication between mathematicians and mathematics educators, and as pointed out by the International Commission of Mathematics Instruction (ICMI), much more work is needed in concert with these two groups. Indeed, editors of RCME are aware of this need and the articles published in this series are in line with that goal.

    Nine papers constitute this volume. The first two examine problems students experience when converting a representation from one particular system of representations to another. The next three papers investigate students learning about proofs. In the next two papers, the focus is instructor knowledge for teaching calculus. The final two papers in the volume address the nature of “conception” in mathematics.

    Whether they are specialists in education or mathematicians interested in finding out about the field, readers will obtain new insights about teaching and learning and will take away ideas that they can use.

    This series is published in cooperation with the Mathematical Association of America.

    Readership

    Research mathematicians and people interested in education or math education departments interested in mathematical education.

  • Table of Contents
     
     
    • Articles
    • Rina Zazkis and Natasa Sirotic — 1. Representing and defining irrational numbers: Exposing the missing link
    • Matías Camacho Machín, Ramón Depool Rivero and Manuel Santos-Trigo — 2. Students’ use of Derive software in comprehending and making sense of definite integral and area concepts
    • Lara Alcock — 3. Mathematicians’ perspectives on the teaching and learning of proof
    • Lara Alcock and Keith Weber — 4. Referential and syntactic approaches to proving: Case studies from a transition-to-proof course
    • Anne Brown, Michael A. McDonald and Kirk Weller — 5. Step by step: Infinite iterative processes and actual infinity
    • David T. Kung — 6. Teaching assistants learning how students think
    • Kimberly S. Sofronas and Thomas C. DeFranco — 7. An examination of the knowledge base for teaching among mathematics faculty teaching calculus in higher education
    • Nicolas Balacheff and Nathalie Gaudin — 8. Modeling students’ conceptions: The case of function
    • Vilma Mesa — 9. Strategies for controlling the work in mathematics textbooks for introductory calculus
  • Additional Material
     
     
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Accessibility – to request an alternate format of an AMS title
Volume: 162010; 261 pp
MSC: Primary 97; 00

The present volume of Research in Collegiate Mathematics Education, like previous volumes in this series, reflects the importance of research in mathematics education at the collegiate level. The editors in this series encourage communication between mathematicians and mathematics educators, and as pointed out by the International Commission of Mathematics Instruction (ICMI), much more work is needed in concert with these two groups. Indeed, editors of RCME are aware of this need and the articles published in this series are in line with that goal.

Nine papers constitute this volume. The first two examine problems students experience when converting a representation from one particular system of representations to another. The next three papers investigate students learning about proofs. In the next two papers, the focus is instructor knowledge for teaching calculus. The final two papers in the volume address the nature of “conception” in mathematics.

Whether they are specialists in education or mathematicians interested in finding out about the field, readers will obtain new insights about teaching and learning and will take away ideas that they can use.

This series is published in cooperation with the Mathematical Association of America.

Readership

Research mathematicians and people interested in education or math education departments interested in mathematical education.

  • Articles
  • Rina Zazkis and Natasa Sirotic — 1. Representing and defining irrational numbers: Exposing the missing link
  • Matías Camacho Machín, Ramón Depool Rivero and Manuel Santos-Trigo — 2. Students’ use of Derive software in comprehending and making sense of definite integral and area concepts
  • Lara Alcock — 3. Mathematicians’ perspectives on the teaching and learning of proof
  • Lara Alcock and Keith Weber — 4. Referential and syntactic approaches to proving: Case studies from a transition-to-proof course
  • Anne Brown, Michael A. McDonald and Kirk Weller — 5. Step by step: Infinite iterative processes and actual infinity
  • David T. Kung — 6. Teaching assistants learning how students think
  • Kimberly S. Sofronas and Thomas C. DeFranco — 7. An examination of the knowledge base for teaching among mathematics faculty teaching calculus in higher education
  • Nicolas Balacheff and Nathalie Gaudin — 8. Modeling students’ conceptions: The case of function
  • Vilma Mesa — 9. Strategies for controlling the work in mathematics textbooks for introductory calculus
Review Copy – for publishers of book reviews
Accessibility – to request an alternate format of an AMS title
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