• East Asian mathematical journal
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• 제37권4호
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• pp.461-480
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• 2021

There have been gradually a few studies on Noticing in the domestic and international area. For the purpose of increasing the concern on teacher noticing and pursuing the affluent studies on the noticing, this study tried to explore and understand the background, the meaning, and the properties of the teacher noticing while summing up the views of the various researchers. As a result, the teacher noticing could be defined as a cognitive process which is focused on mathematical objects, students' mathematical thinking, students' emotions, teaching strategies, classroom environment and interprets them to determine how to react. From this, noticing might be cognitive process which is a combined form of the objects and cognitive behavior, while the objects whom teachers notice covers up the mathematical objects and the teaching objects. Eventually, this study expects to serve as a basis to foster the in-depth understanding of teacher noticing and to derive the follow-up studies.

• 한국수학교육학회지시리즈A:수학교육
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• 제51권4호
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• pp.455-469
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• 2012

Given the importance of mathematical connections in instruction, this paper analyzed the objects and the methods of mathematical connections according to the lesson flow featured in 20 elementary lessons selected as effective instructional methods by local educational offices in Korea. Mathematical connections tended to occur mainly in the introduction, the first activity, and the sum-up period of each lesson. The connection between mathematical concept and procedure was the most popular followed by the connection between concept and real-life context. The most prevalent method of mathematical connections was through communication, specifically the communication between the teacher and students, followed by representation. Overall it seems that the objects and the methods of mathematical connections were diverse and prevalent, but the detailed analysis of such cases showed the lack of meaningful connection. These results urge us to investigate reasons behind these seemingly good features but not-enough connections, and to suggest implications for well-connected mathematics teaching.

• 한국수학교육학회지시리즈A:수학교육
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• 제63권2호
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• pp.319-334
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• 2024

본 연구의 목적은 인공지능 수학교과서의 최적화 내용에서 사용하는 구체적 대상이 명명하기와 담론적 조작을 통해 담론적 대상으로 전환되는 과정을 분석함으로써 인공지능 기반 수학적 대상들에 대한 담론적 구성을 밝히는 것이었다. 이러한 목적을 달성하기 위해 5종의 고등학교 인공지능 수학교과서의 최적화 내용에서 사용하는 구체적 대상을 추출하고, 담론적 대상을 분석할 수 있는 인공지능 기반 수학적 대상들에 대한 담론적 구성과 담론적 조작 분석틀을 개발하였다. 연구 결과, 최적화 내용의 손실함수 단원과 경사하강법 단원에서 사용하는 구체적 대상은 총 15개였으며, 명명하기와 담론적 조작을 통해 추상적 담론 대상으로 창발하는 구체적 대상은 1개인 것으로 나타났다. 이러한 연구 결과는 문서화된 교육과정 측면에서 인공지능 기반 수학적 대상들에 대한 담론적 구성을 구체화하고 학생들이 인공지능 기반 수학적 담론을 탐구적으로 개발할 수 있는 실천 방안을 제공할 수 있다는데 그 의의가 있을 뿐 아니라, 인공지능 기반 수학적 대상에 대한 효과적인 담론적 구성과정과 교육과정 개발에 시사점을 제공할 수 있을 것이다.

• East Asian mathematical journal
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• 제38권4호
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• pp.397-414
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• 2022

This study tried to explore and understand the meaning, and the properties of noticing. The result of this study were first, the difference in mathematical noticing is distinguished in either the object which is paid attention is different or the object is same but differently interpreted or react. The cause of each difference could be described as mathematical objects such as conceptual objects and perceptual features. Second, teachers' teaching strategies, which narrow the gap in attention and play a key role in the formation of mathematical meaning, appeared in various places. This teaching strategy was implemented to distract students' attention. This study confirmed that the mathematical attention of teachers and students in math classes will differ depending on the object to which they pay attention, and that difference will be narrowed through teacher's discourse practice and teaching strategies through communication strategies.

• 논리연구
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• 제12권2호
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• pp.1-29
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• 2009

유명론자인 필드에 따르면, 수학적 대상은 존재하지 않지만 존재할 수도 있었다. 이 글의 목적은 이런 필드의 '우연적' 유명론이 설득력이 있는지를 살펴보는 데 있다. 이를 위해 나는 여기서 필드와 플라톤주의자인 헤일과 라이트 사이에 벌어진 논쟁을 분석하고 평가한다. 나는 설명의 요구 논증은 여전히 유효하지만, 거기서 사용된 일반 원리를 뒷받침해줄 별도의 논증이 필요하다고 주장하며, 반절연 원리에 근거한 비판의 경우 그 원리 자체에 이미 각 진영의 철학적 입장이 전제되어 있다고 주장한다.

• 대한수학회지
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• 제46권4호
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• pp.813-826
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• 2009

In this paper, we generalize the notions of preserving and strongly preserving maps to arbitrary set based topological categories. Further, we obtain characterizations of each of these concepts as well as interprete analogues and generalizations of theorems of Gerlits at al [20] in the categories of filter and local filter convergence spaces.

• 호남수학학술지
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• 제45권2호
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• pp.269-284
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• 2023

In this paper we study generalizations of the concept of pure-direct-projectivity from module categories to Grothendieck categories. We examine for which categories or under what conditions pure-direct-projective objects are direct-projective, quasi-projective, pure-projective, projective and flat. We investigate classes all of whose objects are pure-direct-projective. We give applications of some of the results to comodule categories.

• 대한수학회논문집
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• 제21권3호
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• pp.559-567
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• 2006

We are interested in the distance problem between two objects in three dimensional Euclidean space. There are many distance problems for various types of objects including line segments, boxes, polygons, circles, disks, etc. In this paper we present an iterative algorithm for finding the distance between two given ellipses. Numerical examples are given.

• 한국초등수학교육학회지
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• 제19권4호
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• pp.527-544
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• 2015

2009 개정 교육과정에 따른 초등학교 수학 교과서의 주요한 특징 중의 하나는 단원 도입에 스토리텔링을 적용한 것이다. 특히 1학년 수학 교과서의 '비교하기' 단원은 단원 전체가 스토리텔링 방식으로 구성되었다. 본 논문은 비교하기 단원을 중심으로 교과서에 제시된 스토리의 내용과 학습 활동을 수학 교육적인 관점과 인성 교육적인 관점에서 분석하였다. 이를 바탕으로 스토리텔링 방식의 수학 교수 학습에 나타날 수 있는 문제점을 논의하고, 재구성한 활동을 대안으로 제시하고, 교육학적인 시사점을 도출하였다.

• 한국수학사학회지
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• 제1권1호
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• pp.14-32
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• 1984

The concepts of zero, minus, infinite, ideal point, etc. are not real existence, but are pure mathematical objects. These entities become mathematical objects through the process of a philosophical filtering. In this paper, the writer explores the relation between natural conditions of different cultures and philosophies, with its reference to fundamental philosophies and traditional mathematical patterns in major cultural zones. The main items treated in this paper are as follows: 1. Greek ontology and Euclidean geometry. 2. Chinese agnosticism and the concept of minus in the equations. 3. Transcendence in Hebrews and the concept of infinite in modern analysis. 4. The empty and zero in India.