• School Mathematics
• /
• v.12 no.4
• /
• pp.605-617
• /
• 2010

This study explores the characteristics and roles of non-textual elements in secondary mathematics textbooks in the United States and South Korea, using a conceptual framework that I have developed: variety, contextuality, and connectivity. Analyzing five U.S. standards-based textbooks and 13 Korean textbooks, this study shows that although non-textual elements in mathematics textbooks are free of literal language, they exhibit different emphases and reflect assumptions about what is important in learning mathematics and how it can be taught and learned in a particular societal context (Mishra, 1999; Zazkis & Gadowsky, 2001). While there are similar patterns in the use of different types of non-textual elements in textbooks from both countries, different opportunities are provided for students to learn mathematics between the two countries.

• Journal of Educational Research in Mathematics
• /
• v.21 no.1
• /
• pp.57-65
• /
• 2011

The conceptions of definition and proof radically change in the transition from secondary to tertiary mathematics. Specifically this paper analyses the historical development of the axiomatic method from Greek to modern mathematics. To understand Greek and modern axiomatic method, it is important to know the different characteristics of the primitive terms, constant and variable. Especially this matter of primitive terms explains the change of conceptions of definition, proof and mathematics. This historical analysis is useful for introducing the meaning of formal definition and proof.

• Journal of Elementary Mathematics Education in Korea
• /
• v.15 no.2
• /
• pp.385-415
• /
• 2011

To investigate the more effective mathematical communication process, a recommended teacher and a selected class as an exemplary model was analyzed with Flanders system. The mathematical communicative level was examined to measure content level using the framework analysing the mathematical communicative level(Park & Pang) based on describing levels of math-talk learning community(Hufferd-Ackles). The purposes of this paper are to describe the verbal flow pattern between teacher and students in the elementary school class for mathematically gifted students, and to propose the effective communication model of math-talk with analysis of verbal teaching behavior in the active class. In addition the whole and the parts of the exemplary class sample is respectively analysed to be used practically by elementary school teachers. The results show the active communication process with higher level presents a pattern 'Ask Question${\rightarrow}$Activity (Silence, Confusion or work)${\rightarrow}$Student-Initiated Talk${\rightarrow}$Activity (Silence, Confusion or work), and the teacher's verbal behavior promoting math communication actively is exhibited by indirect influence especially accepting or using ideas.

• School Mathematics
• /
• v.12 no.2
• /
• pp.239-257
• /
• 2010

In school mathematics the derivative concept is intuitively taught with the tangents and the concept of instantaneous velocity. In this paper, I investigated the long historical developments of the derivative concepts and analysed the relationships between the definition of derivative and the related elements. Finally I proposed some educational implications based on the analysis.

• Journal of Elementary Mathematics Education in Korea
• /
• v.20 no.1
• /
• pp.149-162
• /
• 2016

The focus of the present study is to seek the ways of using popular culture for teaching mathematics. Thus, this study theoretically investigated concepts of popular culture and the meanings of using popular culture for mathematics teaching and learning. And the current study analyzed both the influence of popular culture of mathematics learning and how mathematics is represented through popular culture. Finally, this study suggested teaching models using popular culture and implications for further research in mathematics education about popular culture.

• School Mathematics
• /
• v.19 no.1
• /
• pp.1-18
• /
• 2017

In this study we analyse the features of process of problem posing and explore the development of mathematical knowledge of primary preservice teachers as result of their engagement in problem posing activity. Data was collected through the preservice teachers' class discussions. Analysis of the data shows that preservice teachers developed their ability to understand connections among mathematical concepts.

• Education of Primary School Mathematics
• /
• v.25 no.2
• /
• pp.143-160
• /
• 2022

This study was conducted to discuss educational implications by analyzing the types of mathematical thinking that appeared in challenge math in 5th and 6th grade math teacher's guidebooks. To this end, mathematical thinking types that can be evaluated and nurtured based on teaching and learning contents were organized, a framework for analyzing mathematical thinking was devised, and mathematical thinking appearing in Challenge Math in the 5th and 6th grade math teachers' guidebooks was analyzed. As a result of the analysis, first, 'challenge mathematics' in the 5th and 6th grades of elementary school in Korea consists of various problems that can guide various mathematical thinking at the stage of planning and implementation. However, it is feared that only the intended mathematical thinking will be expressed due to detailed auxiliary questions, and it is unclear whether it can cause mathematical thinking on its own. Second, it is difficult to induce various mathematical thinking at that stage because the questionnaire of the teacher's guidebooks understanding stage and the questionnaire of the reflection stage are presented very typically. Third, the teacher's guidebooks lacks an explicit explanation of mathematical thinking, and it will be necessary to supplement the explicit explanation of mathematical thinking in the future teacher's guidebooks.

• Journal of Elementary Mathematics Education in Korea
• /
• v.22 no.4
• /
• pp.497-516
• /
• 2018

The purpose of this study is to compare the process of mathematical modeling in mathematical modeling class according to group organization, and to investigate whether it shows improvement in mathematical reasoning ability. A total of 24 classes with 3 mathematical modeling activities were designed to investigate the research problem. The result of this study showed that the heterogeneous groups performed better than the homogeneous groups in terms of both the performance ability of mathematical modeling and mathematical reasoning ability. This study implies that, with respect to group design for applying mathematical modeling in teaching mathematics, heterogeneous group design would be more efficient than homogeneous group design.

• Communications of Mathematical Education
• /
• v.18 no.2 s.19
• /
• pp.239-250
• /
• 2004

수학적 힘의 함양과 문제해결력의 신장을 위한 수학교육에서 확률영역은 중요한 학습소재임에도 불구하고, 확률영역은 어려운 것으로 고착되었다. 이 연구에서는 학생들이 확률영역의 어떤 부분을 어려워하고 이해하기 힘들어하는지를 구체적 문항분석을 통하여 알아봄으로서 교수-학습의 기초자료를 제공하고자한다. 이를 위하여, 지난 10년간 출제되었던 대학수학능력시험의 확률영역 16문항을 고등학교 학생 220명에게 실시하고, 고전검사이론과 문항반응이론울 적용하여 그 결과를 분석하였다. 고전검사이론에서는 신뢰도와 변별도를 측정하였고, 문항반응이론에서는 Rasch 1-모수 문항반응모형에 근거한 BIGSTEP을 사용하여 내적타당도와 난이도를 측정하였다.

• Journal for History of Mathematics
• /
• v.26 no.1
• /
• pp.33-56
• /
• 2013

This is a literature study about the concept of 'Division into Equal Parts' in middle school geometry. First, we notice that the concept of the division into equal parts in middle school geometry is given in four themes, which are those of line segments, angles, arches and areas. Second, we investigate and analyse the historical backgrounds of these four kinds of divisions into equal parts. Third, the possibility of extension in terms of method and concept was researched. Through the result of this study, we suggest that it is desirable to use effective utility of history in mathematical teaching and learning in middle school.