• 한국수학사학회지
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• 제34권1호
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• pp.1-20
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• 2021

Logic and intuition are considered as the opposite extremes of teaching geometry, and any teaching method of geometry is to be placed between these extremes. The purpose of this study is to identify the characteristics of logical and intuitive approaches for teaching geometry and to derive didactical implications by taking Euclid's Elements and Clairaut's Elements respectively representing the extremes. To this end, comparing the composition and contents of each book, we analyze which propositions Clairaut chose from Euclid's Elements, how their approaches differ in definitions, proofs, and geometrical constructions, and what unique approaches Clairaut took. The results reveal that Clairaut mainly chose propositions from Euclid's books 1, 3, 6, 11, and 12 to provide the contexts that show why such ideas were needed, rather than the sudden appearance of abstract and formal propositions, and omitted or modified the process of justification according to learners' levels. These propose a variety of intuitive strategies in line with trends of teaching geometry towards emphasis on conceptual understanding and different levels of justification. Specifically, such as the general principle of similarity and the infinite geometric approach shown in Clairaut's Elements, we could confirm that intuition-based geometry does not necessarily aim for tasks with low cognitive demand, but must be taught in a way that learners can understand.

• 대한수학교육학회지:수학교육학연구
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• 제16권1호
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• pp.1-23
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• 2006

본 논문은 중학교 평면 논증기하를 원론 교육적 입장에서 분석 고찰한 것이다. 이를 위하여 먼저 'Euclid 원론'에 따른 고전적 원론 교육을 목적, 내용, 방법의 측면에서 분석하고 그 역사를 개관하였다. 이어 고전적 원론 교육에 대한 비판적 논의를 고찰하고 Clairaut의 '기하학 원론'과 Branford의 역사-발생적 기하 교육론을 중심으로 역사-발생적 기하 원론 교육을 목적, 내용, 방법의 측면에서 분석하였다. 그리고 이러한 분석과 근세 이후 기하교과서의 변천과정에 비추어 현재의 중학교 논증기하 교재의 기본가정을 분석하고, 그 내용 및 체제를 가설적 작도, 정리의 제시순서, 증명진술 방법, 정의제시 방법, 연습문제로 나누어 분석하였다. 마지막으로 이러한 논의를 바탕으로, 현 중학교 기하교재의 기본적 관점을 탐색하고 두 원론의 상보적 통합 방안을 모색하였다.

• 한국수학사학회지
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• 제15권2호
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• pp.15-32
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• 2002

The first part of this thesis gives some brief explanation of the theory and history of imaginary elements in analytic geometry in the 19th century. The second part of this thesis discusses the theory of imaginary elements of synthetic geometry in the first half of the 19th century. Then the next part mentions the theory of imaginary elements of geometry in the second half of that same century. Particularly Christian von Staudt's and Felix Klein's theories are handled in this part. Von Staudt, who has completed the system of the synthetic projective geometry, used ‘involution’ in order to introduce a new concept ‘imaginary elements’- imaginary points, imaginary lines and imaginary plane-in synthetic geometry. Klein applied von Staudt's theory as he convey the result of the research in algebraic geometry in a picture. Von Staudt's and Klein's research may be regarded as the top of the effort to investigate possible relationship between real and imaginary structures.

• 한국수학사학회지
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• 제31권6호
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• pp.291-313
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• 2018

This study aims to analyze Pardies' ${\ll}$Elements of geometry${\gg}$. This book is very interesting from the perspectives of mathematical history as well as of mathematical education. Because it was used for teaching Kangxi emperor geometry in the Qing Dynasty in China instead of Euclid's which was considered as too difficult to study geometry. It is expected that this book suggests historical and educational implications because it appeared in the context of instruction of geometry in the seventeenth century of mathematical history. This study includes the analyses on the contents of Pardies' ${\ll}$Elements of geometry${\gg}$, the author's advice for geometry learning, several geometrical features, and some features from the view of elementary school mathematics, of which the latter two contain the comparisons with other authors' as well as school mathematics. Moreover, some didactical implications were induced based on the results of the study.

• 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.

• 대한수학교육학회지:수학교육학연구
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• 제13권3호
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• pp.351-364
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• 2003

Clairaut의 <기하학 원론>은 Euclid의 <원론>의 논리-연역적인 전개 방식에 대항하여 역사발생적 원리에 입각하여 쓰여진 최초의 기하 교재이다. 본 논문은 <기하학 원론>을 고찰함으로써 Clairaut가 생각한 역사발생적 원리를 파악하고, 아울러 학교 수학에의 적용 방안을 탐색하는 것을 목표로 한다. 이를 위해, <기하학 원론>의 내용 전개 방식으로부터 저자의 기본 아이디어에서 비롯된 다섯 가지 특징을 추출한다. 필요에 의한 기하의 출현, 실생활 문제 해결을 통한 접근, 초보자에게 자연스런 방법으로서 직관적 요소와 논리적 요소의 조화, 기본 원리의 파악, 활동적 원리의 구현. 이러한 특징은 Clairaut의 역사발생적 원리를 구체적으로 드러내며, 기하 영역의 교재 구성 및 교수 실제를 위한 시사점을 제공한다. 그리고, 학교 기하에서 매우 유용한 두 개의 정리를 예로 들어 그의 역사발생적 원리를 재음미한다.

• 한국음향학회지
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• 제14권1호
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• pp.115-122
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• 1995

균일한 소자 (안테나 또는 감지기) 간격으로 계수치를 체감하는 것보다 균일한 계수치로 소자의 간격을 체감하는 것이 실용적이며, 직사각형 어레이에서는, 삼각형 격자 구조가 직사각형 격자구조 보다 소자 수를 줄이는데 더 경제적이다. 접지판 위에 설치된 삼각형 격자 구조를 가진 직사각형 위상어레이의 성능을 향상시키기 위하여 소자간격 체감 방법을 제안하였다. 소자간격 체감이 주빔(main beam)의 폭과 측면로브(sidelobe)의 높이에 미치는 영향을 논의하였다. 제안된 방법을 사용한 결과 측면로브의 성능이 향상되었으나 주빔폭은 약간 넓어지는 것이 밝혀졌다.

• 한국수학사학회지
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• 제19권2호
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• pp.101-114
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• 2006

현 중학교 기하는 그 내용적 근원을 $\ll$Eulcid원론$\gg$ 에 두고 있으나, 그 체제 및 내용 전개 방식에 있어서는 $\ll$Eulcid원론$\gg$과 적지 않은 차이가 있다. 이는 현 수학 교과서의 기하 부분이 $\ll$Eulcid원론$\gg$이 가지고 있는 수학적 엄밀성과 형식성을 완화시켜 교육적으로 건전한 출발점을 찾고자 하였던 여러 파지 시도를 반영하고 있기 때문이다. 특히, 기하의 내용 중에서 기하 양 사이의 비례관계는 Euclid 당시의 그것과 오늘날의 방법이 매우 큰 차이를 보이고 있으며, 이는 비례관계가 교육적 난점을 가지고 있었음을 드러낸다. 본 논문은 비례관계를 교육함에 있어서의 어려움을 극복하고자 시도되었던 변화 과정을 역사적으로 고찰하여 이로부터 중학교 기하 교육에 대한 시사점을 도출하고자 한다.

• KIEAE Journal
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• 제16권3호
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• pp.35-46
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• 2016

Purpose: This paper aims to analyse the composition system of architectural elements including shape, kinetic and material elements of kinetic facades and establish the design parameter system as a common conceptual and practical knowledge sharing platform with mechanical and electrical experts. Method: This research has been conducted in a three steps. At first, 120 cases of external shading devices are analyzed and their classification criteria have been established. Secondly geometric, kinetic and material elements are categorized in a common kinetic facade coordinates system considering environmental effects and operation method, and the applicability of combination of each element are tested. Lastly core design parameters for each element have been established in a common office building installation coordinate. Result: Geometry elements are categorized into seven geometric shapes and kinetic elements is categorized into basic linear and rotational motion and combinational folding and rolling motion. The combined set of parameters for three elements composes the whole design parameters for architectural elements of kinetic façade. Design parameters of shape elements are composed of shape, installation and arrangement parameters; design parameters for kinetic elements are composed of axis and range parameters; and design parameters of material elements are composed of thermal, lighting and color parameters.

• International Journal of Fuzzy Logic and Intelligent Systems
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• 제6권2호
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• pp.144-149
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• 2006

This paper describes a novel automated analysis system for bellows of piping system. An automatic finite element (FE) mesh generation technique, which is based on the fuzzy theory and computational geometry technique, is incorporated into the system, together with one of commercial FE analysis codes and one of commercial solid modelers. In this system, a geometric model, i.e. an analysis model, is first defined using a commercial solid modelers for 3-D shell structures. Node is generated if its distance from existing node points is similar to the node spacing function at the point. The node spacing function is well controlled by the fuzzy knowledge processing. The Delaunay triangulation technique is introduced as a basic tool for element generation. The triangular elements are converted to quadrilateral elements. Practical performances of the present system are demonstrated through several analysis for bellows of piping system.