04607nam 2200661Ia 450 991082811750332120240722182830.0979-82-16-97644-81-280-31546-697866103154680-313-01603-810.5040/9798216976448(CKB)111087028192288(EBL)3000390(OCoLC)929144461(SSID)ssj0000190468(PQKBManifestationID)11189214(PQKBTitleCode)TC0000190468(PQKBWorkID)10179906(PQKB)10694175(Au-PeEL)EBL3000390(CaPaEBR)ebr10002019(MiAaPQ)EBC3000390(OCoLC)805255198(UkLoBP)BP9798216976448BC(EXLCZ)9911108702819228820240612e20012024 uy 0engur|n|---|||||txtrdacontentcrdamediacrrdacarrierLearning and teaching number theory research in cognition and instruction /edited by Stephen R. Campbell and Rina Zazkis1st ed.Santa Barbara :Praeger,2001.New York :Bloomsbury Publishing (US),2024.1 online resource (244 pages)Mathematics, Learning, and Cognition: Monograph Series of the Journal of MathematicsDescription based upon print version of record.1-56750-652-6 Includes bibliographical references and indexes.Toward Number Theory as a Conceptual Field by Stephen R. Campbell and Rina Zazkis Coming to Terms with Division: Preservice Teachers' Understanding by Stephen R. Campbell Conceptions of Divisibility: Success and Understanding by Anne Brown, Karen Thomas, and Georgia Tolias Language of Number Theory: Metaphor and Rigor by Rina Zazkis Understanding Elementary Number Theory at the Undergraduate Level: A Semiotic Approach by Pier Luigi Ferrari Integrating Content and Process in Classroom Mathematics by Anne R. Teppo Patterns of Thought and Prime Factorization by Anne Brown What Do Students Do with Conjecture? Preservice Teachers' Generalizations on a Number Theory Task by Laurie D. Edwards and Rina Zazkis Generic Proofs in Number Theory by Tim Rowland The Development of Mathematical Induction as a Proof Scheme: A Model for DNR-Based Instruction by Guershon Harel Reflections on Mathematics Education: Research Questions in Elementary Number Theory by Annie Selden and John Selden IndexesNumber theory has been a perennial topic of inspiration and importance throughout the history of philosophy and mathematics. Despite this fact, surprisingly little attention has been given to research in learning and teaching number theory per se. This volume is an attempt to redress this matter and to serve as a launch point for further research in this area. Drawing on work from an international group of researchers in mathematics education, this volume is a collection of clinical and classroom-based studies in cognition and instruction on learning and teaching number theory. Although there are differences in emphases in theory, method, and focus area, these studies are bound through similar constructivist orientations and qualitative approaches toward research into undergraduate students' and preservice teachers' subject content and pedagogical content knowledge. Collectively, these studies draw on a variety of cognitive, linguistic, and pedagogical frameworks that focus on various approaches to problem solving, communicating, representing, connecting, and reasoning with topics of elementary number theory, and these in turn have practical implications for the classroom. Learning styles and teaching strategies investigated involve number theoretical vocabulary, concepts, procedures, and proof strategies ranging from divisors, multiples, and divisibility rules, to various theorems involving division, factorization, partitions, and mathematical induction.Mathematics, Learning, and Cognition: Monograph Series of the Journal of Mathematics.EducationbicsscNumber theoryStudy and teachingEducationNumber theoryStudy and teaching.510 s512/.7071Campbell Stephen R.Zazkis RinaUkLoBPUkLoBPBOOK9910828117503321Learning and teaching number theory4170944UNINA