• 한국수학사학회지
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• 제18권1호
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• pp.33-48
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• 2005

가정법은 중세 서양에서 상용된 대수 방정식의 산술적 해법이며, 보통 그 근원을 중국 수학의 영부족술이라 말한다. 이와 관련하여 중국 및 조선의 산학서와 이집트, 아랍, 인도 및 서양의 수학 교재를 고찰함으로써 수학사에 있어 그 역사적 자취를 추적하고 두 가지 사실을 확인한다. 첫째, 중국의 영부족술은 일차연립방정식의 해법인 방정술과는 구별되어 일차방정식으로 해석되는 특정 수량 관계를 다루기 위한 계산 알고리즘이며, 둘째, 동양의 영부족술과 서양의 가정법의 명확한 관계는 전자에서의 가정을 포함하는 응용 부분이 후자에서의 이중 가정법과 상응한다는 것이다. 나아가 가정법의 수학적 가치를 수학 교육적 가치로 환원하기 위한 제안을 포함한다.

• 한국수학사학회지
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• 제12권2호
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• pp.143-149
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• 1999

Every finite solvable group is only a subgroup of an M-groups and all M-groups are solvable. Supersolvable group is an M-groups and also subgroups of solvable or supersolvable groups are solvable or supersolvable. But a subgroup of an M-groups need not be an M-groups . It has been studied that whether a normal subgroup or Hall subgroup of an M-groups is an M-groups or not. In this note, we investigate some historical research background on the M-groups and also we give some conditions that a normal subgroup of an M-groups is an M-groups and show that a solvable group is an M-group.

• 한국수학사학회지
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• 제17권2호
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• pp.15-20
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• 2004

본 논문에서는 밀도 추정에 관한 통계량으로서 불편성과 일치성에 관하여 제시하고 밀도함수에 관한 평활 방법으로서 히스토그램과 커널 밀도 추정 및 극소적응평활(local adaptive smoothing)에 관하여 보이고자 한다. 그리고 과거에서 현재까지 비모수 밀도 추정에 관한 연구에 관하여 조사하고 논하고자 한다.

• 한국수학사학회지
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• 제22권4호
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• pp.145-160
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• 2009

20세기말 p-진 공간에서 p-진 q-적분의 개념이 김태균에 의해서 처음 도입 되었다([11]). 이러한 적분은 복소수 공간에서 잭슨의 q-적분을 p-진 공간으로 확장 시킨 것이며 또한 울트라 비 아르키메디언 적분의 존재성에 대한 질문의 답으로 볼 수 있다. 본 논문에서는 이러한 p-진 q-적분의 수학사적 배경을 살펴보고, 현재 어떠한 방향으로 연구가 진행되고 있는지를 고찰한다.

• 한국수학사학회지
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• 제33권1호
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• pp.33-53
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• 2020

Euclid's Elements has been considered as the stereotype of logical and deductive approach to mathematics in the history of mathematics. Nonetheless, it has been criticized by its dryness and difficulties for learning. It is worthwhile to noticing mathematicians' struggle for providing some alternatives to Euclid's Elements. One of these alternatives was written by a French scientist, Pardies who called it 'Elemens de Geometrie ou par une methode courte & aisee l'on peut apprendre ce qu'il faut scavoir d'Euclide, d'Archimede, d'Apllonius & les plus belles inventions des anciens & des nouveaux Geometres.' A precedent research presented its historical meaning in traditional mathematics of China and Joseon as well as its didactical meaning in mathematics education with the overview of this book. However, it has a limitation that there isn't elaborate comparison between Euclid's and Pardies'in the aspects of contents as well as the approaching method. This evokes the curiosity enough to encourage this research. So, this research aims to compare Pardies' Elements and Euclid's Elements. Which propositions Pardies selected from Euclid's Elements? How were they restructured in Pardies' Elements? Responding these questions, the researcher confirmed his easy method of learning geometry intended by Pardies.

• Korea-Australia Rheology Journal
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• 제11권4호
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• pp.265-268
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• 1999

The main events in the historical development of Rheology are traced and particular attention is paid to the leading players, the controversies, the priority disputes and the nomenclature disagreements. Some of the lessons to be learned from the past are then highlighted and a positive assessment is given of the prospects for rheological research in the next millennium

• 한국수학교육학회지시리즈A:수학교육
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• 제42권2호
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• pp.137-157
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• 2003

Mathematical Problem solving has had the largest focus in the spread of mathematical topics since 1980. In Korea, most of the articles on problem solving appeared 1980s and 1990s, during which there were special concerns on this issue. And there is general acceptance of the idea that the famous statement "Problem solving must be the focus of school mathematics"(NCTM, 1980, p.1) in Agenda for Action, reflected in the curriculum of Korea. In a historical review focusing on the problem solving in the National Curriculum of Mathematics, we can infer that the primary goal of mathematics instruction should be to have students become competence problem solver. However, the practices of mathematics classroom and the trends of research in mathematical problem solving have oriented to ′teaching about problem solving′ and ′teaching for problem solving′. The issue of teaching via problem solving′ remain unsolved in the community of mathematics education and we need much more attention to this issue.

• 대한수학교육학회지:수학교육학연구
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• 제12권1호
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• pp.29-48
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• 2002

The purpose of this paper is to investigate the transfer in mathematics learning, especially focussing on arithmetic and algebra. There are many obstacles at the stage of transfer in learning. In the case of mathematics, each learning contents are definitely categorized by the learning level, therefore these obstacles are more happened than other subjects. First of all, this paper investigates the historical transfer from arithmetic to algebra by Sfard's perspectives. And we define prealgebra as the stage between arithmetic and algebra, which may be revised obstacles or misconceptions happened in the early algebra learning. Also, this paper discusses various obstacles and concrete examples happened in the transfer from arithmetic to algebra. To advance the understanding in the learning of algebra, we consider the core contents of the algebra learning which should be stressed at the prealgebra stage. Finally we present the teaching units of (pre)algebra which are sequenced from the variable concepts to equations.

• 한국수학교육학회지시리즈D:수학교육연구
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• 제19권3호
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• pp.177-193
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• 2015

Mathematical creativity, an important goal in mathematics education, can be promoted through an integrated learning environment where students explore mathematics with other subject areas such as science, technology, engineering and art. Establishing such learning environments is not a trivial task. Therefore, this creates a need for the development of instructional resources promoting meaningful integration. This paper focuses on integration of the fields of mathematics and music. Beginning with some of the historical discoveries and views of the connections between mathematics and music, this paper attends to several musical concepts correlating to middle school mathematical content and then provides ideas for teaching.

• 한국수학사학회지
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• 제21권3호
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• pp.97-112
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• 2008

이 연구에서는 한국어 수사 하나, 둘, ..., 열의 어원에 대한 현재까지의 연구 결과를 수학사적인 관점에서 비판적으로 조망했다. 수학사적인 관점에서 보면, 하나, 둘, 셋의 어원을 찾는 일은 사실상 가능해 보이지 않는다. 셋과 넷, 넷과 다섯 사이에는 단절이 있었을 가능성이 있다. 하나, 둘, 셋, 넷의 어원은 다섯, 여섯, ..., 열의 어원과는 다른 측면에서 찾아야 할 것이다. 여섯과 일곱 사이에 단절이 있었을 가능성이 있다. 일곱, 여덟, 아홉의 조어 메커니즘은 동일할지 모른다. 아홉과 열 사이에 단절이 있었을 가능성이 있다. 현재까지의 연구에서는 이러한 단절에 충분히 주목하지 않고 있으나, 수학사에 따르면 수사의 발달에는 여러 번의 단절이 존재 했다.