Download Free Readings In Cooperative Learning For Undergraduate Mathematics Book in PDF and EPUB Free Download. You can read online Readings In Cooperative Learning For Undergraduate Mathematics and write the review.

"Gilles focuses the majority of the book on the relationship in the classroom between the individual teacher and the students. She gives teachers ammunition to overcome resistance to cooperative learning by presenting well-substantiated research on virtually every page of her book showing the benefits of having students study together." —Ted Wohlfarth, PSYCCRITIQUES "This text′s greatest strengths are bringing together a range of powerful teaching strategies connected to students taking responsibility for their own learning and the learning of others. The focus on both teacher strategies to encourage effective group talk and student strategies to encourage effective discourse is helpful." —Nancy L. Markowitz, San Jose State University Although cooperative learning is widely endorsed as a pedagogical practice that promotes learning and socialization among students, teachers still struggle with how to introduce it into their classrooms. This text highlights the strategies teachers can use to challenge student thinking and scaffold their learning as well as the strategies students can be taught to promote discourse, problem—solving, and learning during cooperative learning. Key Features Presents cooperative learning in conjunction with national standards: The book situates cooperative learning within the context of No Child Left Behind and a climate of high stakes testing. Links theory with practice: Numerous case studies and small group exercises highlight how teachers can assess both the process and outcomes of cooperative learning. Emphasizes the key role teachers play in establishing cooperative learning: Guidelines are given on how teachers can establish cooperative learning in their classrooms to promote student engagement and learning across various levels and for students of diverse abilities. Incorporates the latest research on cooperative learning: An overview is provided of the major research and theoretical perspectives that underpin the development of cooperative learning pedagogy. Intended Audience This is an excellent supplementary text for several undergraduate and graduate level K—12 teacher preparation and certification courses regularly offered in schools of education. It can also be used as one of several texts in courses on cooperative learning and as a supplement in K—12 teaching methods courses.
Research has identified cooperative learning as one of the ten High Impact Practices that improve student learning. If you’ve been interested in cooperative learning, but wondered how it would work in your discipline, this book provides the necessary theory, and a wide range of concrete examples.Experienced users of cooperative learning demonstrate how they use it in settings as varied as a developmental mathematics course at a community college, and graduate courses in history and the sciences, and how it works in small and large classes, as well as in hybrid and online environments. The authors describe the application of cooperative learning in biology, economics, educational psychology, financial accounting, general chemistry, and literature at remedial, introductory, and graduate levels.The chapters showcase cooperative learning in action, at the same time introducing the reader to major principles such as individual accountability, positive interdependence, heterogeneous teams, group processing, and social or leadership skills.The authors build upon, and cross-reference, each others’ chapters, describing particular methods and activities in detail. They explain how and why they may differ about specific practices while exemplifying reflective approaches to teaching that never fail to address important assessment issues.
There is a gap between the extensive mathematics background that is beneficial to biologists and the minimal mathematics background biology students acquire in their courses. The result is an undergraduate education in biology with very little quantitative content. New mathematics courses must be devised with the needs of biology students in mind. In this volume, authors from a variety of institutions address some of the problems involved in reforming mathematics curricula for biology students. The problems are sorted into three themes: Models, Processes, and Directions. It is difficult for mathematicians to generate curriculum ideas for the training of biologists so a number of the curriculum models that have been introduced at various institutions comprise the Models section. Processes deals with taking that great course and making sure it is institutionalized in both the biology department (as a requirement) and in the mathematics department (as a course that will live on even if the creator of the course is no longer on the faculty). Directions looks to the future, with each paper laying out a case for pedagogical developments that the authors would like to see.
This is a text that contains the latest in thinking and the best in practice. It provides a state-of-the-art statement on tertiary teaching from a multi-perspective standpoint. No previous book has attempted to take such a wide view of the topic. The book will be of special interest to academic mathematicians, mathematics educators, and educational researchers. It arose from the ICMI Study into the teaching and learning of mathematics at university level (initiated at the conference in Singapore, 1998).
Offering first-hand insights from the early originators of Cooperative Learning (CL), this volume documents the evolution of CL, illustrating its historical and contemporary research, and highlights the personal experiences which have helped inspire and ground this concept. Each of the chapters in Pioneering Perspectives in Cooperative Learning foregrounds a key approach to CL, and documents the experiences, research, and fruitful collaborations which have shaped and driven their development. Contributions from leading scholars include Aronson, Davidson, Kagan, Johnson & Johnson, Schmuck, the Sharans, Slavin and Madden, as well as retrospective pieces on the work of Deutsch and Cohen. These chapters detail the historical development of cooperative learning, cooperation versus competition, and cover major approaches including the jigsaw classroom; complex instruction; the learning together model, and several more. Chapters include qualitative, personal, and retrospective accounts, whereby authors outline the research and theory which underpins each approach while highlighting practical strategies for classroom implementation. This text will primarily be of interest to professors, researchers, scholars, and doctorial students with an interest in the theory of learning, educational research, and educational and social psychology more broadly. Practitioners of CL with an interest in varied forms of small group learning and classroom practice, as well as those interested in the history and sociology of education, will also benefit from the volume.
The Scholarship of Teaching and Learning (SoTL) movement encourages faculty to view teaching “problems” as invitations to conduct scholarly investigations. In this growing field of inquiry faculty bring their disciplinary knowledge and teaching experience to bear on questions of teaching and learning. They systematically gather evidence to develop and support their conclusions. The results are to be peer reviewed and made public for others to build on. This Notes volume is written expressly for collegiate mathematics faculty who want to know more about conducting scholarly investigations into their teaching and their students’ learning. Envisioned and edited by two mathematics faculty, the volume serves as a how-to guide for doing SoTL in mathematics.
This book will help those wishing to teach a course in technical writing, or who wish to write themselves.
Are you looking for new ways to engage your students? Classroom voting can be a powerful way to enliven your classroom, by requiring all students to consider a question, discuss it with their peers, and vote on the answer during class. When used in the right way, students engage more deeply with the material, and have fun in the process, while you get valuable feedback when you see how they voted. But what are the best strategies to integrate voting into your lesson plans? How do you teach the full curriculum while including these voting events? How do you find the right questions for your students? This collection includes papers from faculty at institutions across the country, teaching a broad range of courses with classroom voting, including college algebra, precalculus, calculus, statistics, linear algebra, differential equations, and beyond. These faculty share their experiences and explain how they have used classroom voting to engage students, to provoke discussions, and to improve how they teach mathematics. This volume should be of interest to anyone who wants to begin using classroom voting as well as people who are already using it but would like to know what others are doing. While the authors are primarily college-level faculty, many of the papers could also be of interest to high school mathematics teachers. --Publisher description.
Mathematical Time Capsules offers teachers historical modules for immediate use in the mathematics classroom. Readers will find articles and activities from mathematics history that enhance the learning of topics covered in the undergraduate or secondary mathematics curricula. Each capsule presents at least one topic or a historical thread that can be used throughout a course. The capsules were written by experienced practitioners to provide teachers with historical background and classroom activities designed for immediate use in the classroom, along with further references and resources on the chapter subject. --Publisher description.