No other books are available which take this view specifically in mathematics education
Relevance both to researchers and practitioners
This is a collection of up-to-date insights into the application of theories of situated cognition
Authors are all experienced educators
Anne Watson is Reader in Mathematics Education at the University of Oxford. Before that she taught for many years in maintained secondary schools which served socially diverse areas. She now works in teacher education, and her work with students, and in local schools, and her research is characterised by a concern for social justice through education. In particular, the nature of mathematics classrooms and adolescents´ relationships within them are a central concern. She has published numerous books, articles and papers for both professional and academic audiences and is often asked to talk to national and international audiences of researchers and practitioners.
Peter Winbourne currently lectures in mathematics education at the London South Bank University. After a long career teaching mathematics in inner city multicultural maintained schools, his passion for mathematics and social equity took him into teacher education, preparing people to work in similar schools. His interests developed from specific focus on the uses of new technologies to support learning to answering difficult questions such as why people should bother to learn at all. In answering these questions he has developed his understanding and ideas of theories of situated cognition, seeing these as illuminating the experiences of individuals as they become the people they are going to be.
This book draws together a range of papers by experienced writers in mathematics education who have used the concept of situated cognition in their research in recent years. It provides an up-to-date overview of developments and applications to which other researchers can refer and which will inspire future research. The book examines the present state of the field, the papers all relate to situated cognition, showing how its application to mathematics education has matured and become usefully embedded in our approach to central issues about learning mathematics.
School Mathematics As A Developmental Activity.- Participating In What? Using Situated Cognition Theory To Illuminate Differences In Classroom Practices.- Social Identities As Learners And Teachers Of Mathematics.- Looking For Learning In Practice: How Can This Inform Teaching.- Are Mathematical Abstractions Situated?.- `We Do It A Different Way At My School´.- Situated Intuition And Activity Theory Fill The Gap.- The Role Of Artefacts In Mathematical Thinking: A Situated Learning Perspective.- Exploring Connections Between Tacit Knowing And Situated Learning Perspectives In The Context Of Mathematics Education.- Cognition And Institutional Setting.- School Practices With The Mathematical Notion Of Tangent Line.- Learning Mathematically As Social Practice In A Workplace Setting.- Analysing Concepts of Community of Practice.- `No Way is Can´t´: A Situated Account of One Woman´s Uses and Experiences of Mathematics.
New Directions for Situated Cognition in Mathematics Education
Edited by Anne Watson, University of Oxford
Peter Winbourne, London South Bank University
New Directions for Situated Cognition in Mathematics Education gathers current situated cognition theories as applied to the teaching and learning of mathematics by major thinkers in the field. Arranged to be read cover to cover or by the individual chapter, this unique volume examines situated cognition in all levels and contexts of math instruction, in traditional school settings, in adult education, at home, on the job, or on the street. Well-known authorities explore beyond traditional concepts of good practice and the relationship between knowledge and the learner while synthesizing insights from related perspectives, including semiotics, activity theory, ardinas practice, and Moll´s concept of funds of knowledge. The emphasis is not merely on achieving standards or even gaining skills, but on learning as a lifelong activity as chapter authors address such questions as:
- What can math teachers do to make learning vital to children´s identity?
- How does situated cognition relate to tacit knowledge?
- In what ways are mathematical abstractions situated?
- Can vocational math skills be learned away from the workplace?
- How is mathematics knowledge transferred from the class to the home environment?
New Directions for Situated Cognition in Mathematics Education provides a diverse, well-organized resource for educators, researchers, and students to approach this powerful theoretical strand.
New Directions for Situated Cognition in Mathematics Education represents the maturation and expansion of the situated cognition theories applied to mathematics education. All of the situations on which the chapters of this book are based exemplify activity which would be described as mathematical, whether they are classrooms, workplaces, homes or the street. In identifying mathematical activity, this book examines the ways people talk, what they talk about, what they focus on, how they classify experience, what levels and kinds of generality occur to them, what is varied and what is fixed, what relationships they observe or construct and how they express them-much they way music, musicality, and a musician are recognized.
In this book a dynamic view of knowledge is taken by all the authors. Although knowledge is considered what is produced in learning environments, each chapter offers a different perspective on its relationship to the individual, group, activity, historical conventions, and authoritarian views of meaning.
New Directions for Situated Cognition in Mathematics Education provides a resource for educators, researchers and students to approach situated cognition through an organized and diverse source.
School Mathematics As A Developmental Activity.- Participating In What? Using Situated Cognition Theory To Illuminate Differences In Classroom Practices.- Social Identities As Learners And Teachers Of Mathematics.- Looking For Learning In Practice: How Can This Inform Teaching.- Are Mathematical Abstractions Situated?.- 'We Do It A Different Way At My School'.- Situated Intuition And Activity Theory Fill The Gap.- The Role Of Artefacts In Mathematical Thinking: A Situated Learning Perspective.- Exploring Connections Between Tacit Knowing And Situated Learning Perspectives In The Context Of Mathematics Education.- Cognition And Institutional Setting.- School Practices With The Mathematical Notion Of Tangent Line.- Learning Mathematically As Social Practice In A Workplace Setting.- Analysing Concepts of Community of Practice.- 'No Way is Can't': A Situated Account of One Woman's Uses and Experiences of Mathematics.
Anne Watson is Reader in Mathematics Education at the University of Oxford. Before that she taught for many years in maintained secondary schools which served socially diverse areas. She now works in teacher education, and her work with students, and in local schools, and her research is characterised by a concern for social justice through education. In particular, the nature of mathematics classrooms and adolescents' relationships within them are a central concern. She has published numerous books, articles and papers for both professional and academic audiences and is often asked to talk to national and international audiences of researchers and practitioners.
Peter Winbourne currently lectures in mathematics education at the London South Bank University. After a long career teaching mathematics in inner city multicultural maintained schools, his passion for mathematics and social equity took him into teacher education, preparing people to work in similar schools. His interests developed from specific focus on the uses of new technologies to support learning to answering difficult questions such as why people should bother to learn at all. In answering these questions he has developed his understanding and ideas of theories of situated cognition, seeing these as illuminating the experiences of individuals as they become the people they are going to be.
Inhaltsverzeichnis
School Mathematics As A Developmental Activity.- Participating In What? Using Situated Cognition Theory To Illuminate Differences In Classroom Practices.- Social Identities As Learners And Teachers Of Mathematics.- Looking For Learning In Practice: How Can This Inform Teaching.- Are Mathematical Abstractions Situated?.- `We Do It A Different Way At My School¿.- Situated Intuition And Activity Theory Fill The Gap.- The Role Of Artefacts In Mathematical Thinking: A Situated Learning Perspective.- Exploring Connections Between Tacit Knowing And Situated Learning Perspectives In The Context Of Mathematics Education.- Cognition And Institutional Setting.- School Practices With The Mathematical Notion Of Tangent Line.- Learning Mathematically As Social Practice In A Workplace Setting.- Analysing Concepts of Community of Practice.- `No Way is Can¿t¿: A Situated Account of One Woman¿s Uses and Experiences of Mathematics.
Klappentext
New Directions for Situated Cognition in Mathematics Education represents the maturation and expansion of the situated cognition theories applied to mathematics education. All of the situations on which the chapters of this book are based exemplify activity which would be described as mathematical, whether they are classrooms, workplaces, homes or the street. In identifying mathematical activity, this book examines the ways people talk, what they talk about, what they focus on, how they classify experience, what levels and kinds of generality occur to them, what is varied and what is fixed, what relationships they observe or construct and how they express them¿much they way music, musicality, and a musician are recognized.
In this book a dynamic view of knowledge is taken by all the authors. Although knowledge is considered what is produced in learning environments, each chapter offers a different perspective on its relationship to the individual, group, activity, historical conventions, and authoritarian views of meaning.
New Directions for Situated Cognition in Mathematics Education provides a resource for educators, researchers and students to approach situated cognition through an organized and diverse source.
This book draws together a range of papers by experienced writers in mathematics education who have used the concept of situated cognition in their research in recent years. It provides an up-to-date overview of developments and applications to which other researchers can refer and which will inspire future research. The book examines the present state of the field, the papers all relate to situated cognition, showing how its application to mathematics education has matured and become usefully embedded in our approach to central issues about learning mathematics.
