• Title/Summary/Keyword: 수학 학습 상황

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A Study on the Application of Situated Cognition Theory in the Mathematics Education (수학교육에서 상황인지이론의 적용 방안)

  • Kim, Sang-Lyong
    • Education of Primary School Mathematics
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    • v.15 no.1
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    • pp.1-11
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    • 2012
  • Unlike traditional cognitive theory, situated cognition theory has been understood as a pedagogical theory that highly reflects the constructivist nature of learning. In order to practice situated learning in school, situations in the classroom are very important in which real teaching and learning occurs. Due to the fact that learning is the process of mental activities which is considerably dependent on conditions and context, it focuses more on the learning process and real-situation experiences rather than the result itself. In mathematics education, teaching students the ability to solve given problems in a conventional way is not enough anymore. The purpose of this research is to suggest the direction of mathematical education in the classroom by analyzing the implications of situated cognition theory and situated learning for 'doing mathematics' in classroom teaching. In this research, we introduce briefly about situated cognition theory and situated learning, compare the phenomenon of mathematics in the classroom to that in the mathematician's mind, and finally propose the applications of situated cognition theory in the mathematics education based on three perspectives of situated cognition theory the embodiment thesis, the embedding thesis, and the extension thesis.

The Effects of Situated Learning-Based Instruction of Mathematics on Students' Learning (상황학습 기반 수업이 초등학생의 수학 학습에 미치는 영향)

  • Yu, Wookhee;Oh, Youngyoul
    • School Mathematics
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    • v.16 no.3
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    • pp.633-657
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    • 2014
  • This study aims to verify the effect of the situated learning-based instruction on mathematics learning of sixth-grade elementary school students. For this purpose, this study examined the differences in mathematical learning achievement and mathematical attitude between a group participating in the situated learning-based class and a group participating in the normal instructor-led mathematics class. Moreover, this study verified the educational effect of the situated learning-based class by analyzing teacher's role in the class and students' way of participating in the class. The study results are as follows. First, the situated learning-based class positively influenced students' mathematics achievement and mathematical attitude. Second, teacher performed a role as a learning guide and facilitator. Third, other became an object to give help to or to learn from in the situated learning-based class. These situations had a positive influence on the organization of knowledge through active efforts of students for communication and problem solving which belongs to a cooperative socialization process happening in the class.

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상황에서의 수학 학습

  • Park, Seong-Seon
    • Communications of Mathematical Education
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    • v.8
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    • pp.343-353
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    • 1999
  • 최근 인간의 인지발달을 사회문화적 관점에서 연구하려는 노력이 커지고 있다. 특히, 학교 밖에서의 수학과 학교 내에서의 수학을 비교하고, 학교 밖의 일상적 활동에서의 수학적 지식에 대한 관심이 커지고 있다. 본 연구에서는 직접적인 교수가 아닌 상황에서의 수학적 지식 형성을 살펴보고 이를 학교 수학과 어떻게 연결시킬 것인지에 대하여 논하고자 한다. 이를 위하여 구체적으로 인지와 상황과의 관계, 인지발달과 사회문화적 관계를 논하고, 일상적 상황에서의 수학학습에 대하여 기술한다.

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Promoting Teacher Learning: Implications for Designing Professional Development Programs (수학교사의 수업전문성 신장을 위한 교사 연수 프로그램 개발의 기본 관점)

  • Kim, Goo-Yeon
    • Journal of the Korean School Mathematics Society
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    • v.13 no.4
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    • pp.619-633
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    • 2010
  • To offer insights in organizing professional development programs to promote teachers' substantial ongoing learning, this paper provides an overview of situative perspectives in terms of cognition as situated, cognition as social, and cognition as distributed. Then, it describes research findings on how mathematics teachers can enhance their knowledge and thus improve their instructional practices through participation in a professional development program that mainly provides opportunities to learn and analyze students' mathematical thinking and to perform mathematical tasks through which they interpret the understanding of students' mathematical thinking. Further, it shows that a knowledge of students' mathematical thinking is a powerful tool for teacher learning. In addition, it suggests that teacher-researcher and teacher-teacher collaborative activities influence considerably teachers' understanding and practice as such collaborations help teachers understand new ideas of teaching and develop innovative instructional practices.

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고등학교 이산수학의 의미와 교수-학습법

  • Go, Yeong-Mi;Lee, Sang-Uk
    • Communications of Mathematical Education
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    • v.18 no.2 s.19
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    • pp.209-216
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    • 2004
  • 제 7 차 수학과 교육 과정에서 이산수학이 수학과 선택과목으로 채택이 되었음에도 불구하고, 교사와 학생의 이산수학에 대한 인식이 부족하고 또한 교수-학습법에 대한 기준과 표본이 제시되어 있지 않은 상황에서 현재 고등학교에서 이산수학을 선택하는 학교와 학생의 수는 미미한 것으로 알려져 있다. 본 논문은 이러한 이산수학 교육의 상황 개선을 위한 고등학교 이산수학의 본연의 의미와 제 7 차 수학과 교육 과정에서의 이산수학 교육의 취지 및 목표 등을 고려하여 교육학적으로 보다 의미 있고 효과적인 교수-학습법을 제안하고자 한다.

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고등학교 확률과 통계영역에서 현실적 수학교육의 적용을 위한 문맥 연구

  • Kim, Won-Gyeong;Baek, Gyeong-Ho
    • Communications of Mathematical Education
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    • v.18 no.1 s.18
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    • pp.137-155
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    • 2004
  • 현실적 수학교육은 탐구학습, 열린학습 등을 통해 수학적 사고력, 문제해결력을 신장하려는 최근의 수학교육의 방향에 걸맞는 새로운 교수${\cdot}$학습 방법의 하나로 주목받고 있다. 이에 따라 본 연구에서는 고등학교 확률과 통계 영역에서 현실적 수학교육을 적용하기 위한 문맥을 개발하였다. 이 문맥들은 수학사, 자연 및 사회 현상, 실생활의 상황, 타 교과에서의 활용 상황 등 다양한 분야에서 고등학교 2${\sim}$2학년 수준에 알맞게 개발되었다.

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What is School Mathematics? (학교수학이란 무엇인가?)

  • Lee, Seoung Woo
    • Journal of Educational Research in Mathematics
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    • v.25 no.3
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    • pp.381-405
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    • 2015
  • The nature of school mathematics has not been asked from the epistemological perspective. In this paper, I compare two dominant perspectives of school mathematics: ethnomathematics and didactical transposition theory. Then, I show that there exist some examples from Old Babylonian (OB) mathematics, which is considered as the oldest school mathematics by the recent contextualized anthropological research, cannot be explained by above two perspectives. From this, I argue that the nature of school mathematics needs to be understand from new perspective and its meaning needs to be extended to include students' and teachers' products emergent from the process of teaching and learning. From my investigation about OB school mathematics, I assume that there exist an intrinsic function of school mathematics: Linking scholarly Mathematics(M) and everyday mathematics(m). Based on my assumption, I suggest the chain of ESMPR(Educational Setting for Mathematics Practice and Readiness) and ESMCE(Educational Setting For Mathematical Creativity and Errors) as a mechanism of the function of school mathematics.

Exploring the factors of situational interest in learning mathematics (수학 학습에 대한 상황적 흥미 요인 탐색)

  • Park, Joo Hyun;Han, Sunyoung
    • The Mathematical Education
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    • v.60 no.4
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    • pp.555-580
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    • 2021
  • The purpose of this study is to explore the factors of situational interest in math learning, and based on the results, to reveal the factors of situational interest included in teaching and learning methods, teaching and learning activities in mathematics class, and extracurricular activities outside of class. As a result of conducting a questionnaire to high school students, the factors of situational interest in learning mathematics were divided into 10 detail-domain(Enjoy, Curiosity, Competence / Real life, Other subjects, Career / Prior knowledge, Accumulation knowledge / Transformation, Analysis), 4 general-domain(Emotion, Attitude / Knowledge, Understanding), 2 higher-domain(Affective / Cognitive) were extracted. In addition, it was revealed that various factors of situational interest were included teaching and learning methods, teaching and learning activities and extracurricular activities. When examining the meaning of 10 situational interest factors, it can be expected that the factors for developing individual interest are included, so it can be expected to serve as a basis for expanding the study on the development of individual interest in mathematics learning. In addition, in order to maintain individual interest continuously, it is necessary to maintain situational interest by seeking continuous changes in teaching and learning methods in the school field. Therefore, it can be seen that the process of exploring the contextual interest factors included in teacher-centered teaching and learning methods and student-centered teaching and learning activities and extracurricular activities is meaningful.

A Study on Mathematics Teaching through Evaluations (평가를 통한 수학 학습지도에 관한 연구)

  • Seo, Jong-Jin;Yoon, Yeon-Soo
    • Journal of the Korean School Mathematics Society
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    • v.13 no.2
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    • pp.185-203
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    • 2010
  • The level of mathematics study of students may vary depending on the area or contents of school mathematics. The use of Integrated evaluation frame is beneficial for evaluating and utilizing the study situation of mathematics study. In this article, I formulated evaluation table for evaluation by type and by question based on the contents of 'equation of the first degree' and examined mathematics teaching through integrated evaluation based on the two evaluations. It was concluded from this study that the evaluation table I formulated was beneficial for individual mathematic teaching by providing information about the study situation of each student.

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Non-Textual Elements as Opportunities to Learn: An Analysis of Korean and U.S. Mathematics Textbooks (학습기회로서의 비문자적 표상 분석: 한미 중등 수학교과서 사례 연구)

  • Kim, Rae-Young
    • School Mathematics
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    • v.12 no.4
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    • pp.605-617
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    • 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.

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