• 제목/요약/키워드: mathematics teaching model

검색결과 261건 처리시간 0.023초

초등 수학 영재를 위한 도형수 과제의 수준별 교수.학습 자료 개발 절차와 방법에 관한 연 (A Study on the Process of Teaching.Learning Materials Development According to the Level in the Figurate Number Tasks for Elementary Math Gifted Students)

  • 김양권;송상헌
    • 한국초등수학교육학회지
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    • 제14권3호
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    • pp.745-768
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    • 2010
  • 본 연구는 수준이 다른 여러 영재 집단의 소속 학생들이 도형수와 관련된 과제를 해결하고 창의적 산출물을 도출하는 가운데 그들의 수학적 사고력과 창의적인 아이디어를 발휘할 수 있도록 수준별 수학 영재 교수 학습 자료를 개발하는 절차와 방법을 탐구해 보는 데 그 목적이 있다. 이를 위해 교수 학습 자료 개발의 준거와 절차 모형에 따라 도형수 과제의 교수 학습 자료의 원형과 실제적인 자료를 개발하고 그것을 현장 수업에 적용하면서 학생들의 다양한 해결과정을 분석하면서 그 자료의 문제점과 개선점을 제시하였다. 그리고 초등학교에서 집단의 수준별로 산출물 탐구가 가능한 도형수의 내용 범위를 설정해 보면서 차후 유사한 다른 수학 영재 교수 학습 자료 개발할 때 고려한 네 가지의 시사점을 제안하였다.

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함수개념 지도를 위한 모델 비교 연구 (A Study on the comparison of models for teaching the concept of function)

  • 허혜자;김종명;김동원
    • 한국수학사학회지
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    • 제24권4호
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    • pp.97-118
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    • 2011
  • 수학사적으로 함수개념은 비례관계, 종속변수, 식, 대응 등으로 발달되어왔으며 수학교육과정에서는 3차, 7차, 7차 개정안에서 중학교 1학년에서 함수개념 도입을 위한 함수의 정의에서 강조점 바뀌었고 이러한 수정의 핵심은 "종속"과 "대응"이다. 본 연구는 종속과 대응에 초점을 둔 수업의 장단점을 비교하고자 각각을 대표할 수 있는 모델로서 물통 모델과 자판기 모델을 선정하여 중학교 1학년을 대상으로 함수의 개념과 함수의 표현에 대한 2차시 수업을 실시하고 형성평가 문항분석을 통하여 두 모델의 차이점과 효율성을 파악하였으며, 3개월 후 파지 효과를 조사하였다. 자판기모델은 중학교 1학년 학생의 함수의 정의 이해 뿐 아니라 특히 개념이미지를 만들고 회상하는데 도움을 주었다. 물통모델은 정의역의 모든 원소가 종속변수에 대응 된다는 "임의성"을 이해하는 데는 상대적으로 어려움을 나타냈지만, 함수식의 표현과 관련해서는 좋은 역할을 한 것으로 판단되었다.

수학교육방법 개선을 위한 협동학습 유형 연구 (A Study of Cooperative Learning Style to Improve Mathematics Teaching Methods)

  • 이중권
    • 한국수학교육학회지시리즈A:수학교육
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    • 제45권4호
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    • pp.493-505
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    • 2006
  • This research studied learning model for the purpose of renovation of mathematics teaching methods. Especially, this research classified the types of cooperative learning, the theoretical background for cooperative learning, the need of cooperative learning in school mathematics, and the differences between cooperative learning and traditional small group learning, This research also suggested special features of cooperative learning and various types of cooperative learning models. The main types of cooperative learning which this research supported are TAI(Team-Assisted Individualization, JIGSAW cooperative learning, JIGSAW II cooperative learning, JIGSAW III cooperative learning, STAD(Student Team-Achievement division) cooperative learning, and TGT(Teams-Games-Tournament).

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Development of Creative Convergence Talent in the era of the 4th Industrial Revolution through Self-Directed Mathematical Competency

  • Seung-Woo, LEE;Sangwon, LEE
    • International Journal of Advanced Culture Technology
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    • 제10권4호
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    • pp.86-93
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    • 2022
  • To combine the science and technology creativity necessary in the era of the 4th Industrial Revolution, it is necessary to cultivate talents who can discover new knowledge and create new values by combining various knowledge with self-directed mathematical competencies. This research attempted to lay the foundation for the curriculum for fostering future creative convergence talent by preparing, executing, and reflecting on the learning plan after learners themselves understand their level and status through self-directed learning. Firstly, We would like to present a teaching-learning plan based on the essential capabilities of the future society, where the development of a curriculum based on mathematics curriculum and intelligent informatization are accelerated. Secondly, an educational design model system diagram was presented to strengthen the self-directed learning ability of mathematics subjects in the electronic engineering curriculum. Consequently, through a survey, we would like to propose the establishment of an educational system necessary for the 4th industry by analyzing learning ability through self-directed learning teaching methods of subjects related to mathematics, probability, and statistics.

전문가-현장교사-예비교사 수학수업 연구 공동체의 가능성 탐색 (A Study on Possibility of Research Community for Mathematics Classroom of Expert-Inservice Teacher-Preservice Teacher)

  • 강현영;탁병주;고은성
    • 대한수학교육학회지:학교수학
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    • 제18권4호
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    • pp.857-880
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    • 2016
  • 교사교육을 통한 교사의 수업 전문성 개발은 학교교육의 내실화에 핵심적인 요소이나, 우리나라의 수학교사교육은 예비교사 시기에 수업 경험의 기회가 충분히 부여되지 않는다는 비판이 있다. 이에 본 연구에서는 예비교사와 현장교사의 수업 전문성 개발을 위해, 전문가와 현장교사, 예비교사로 구성된 수학수업 연구 공동체 모델을 개발하였다. 그리고 과제 개발과 수정, 그리고 수업 관찰과 분석이라는 일련의 과정에 전문가와 현장교사, 예비교사가 모두 참여함으로써, 이 모델이 현장교사와 예비교사를 위한 교육의 장으로서 어떠한 가능성을 지니는지를 탐색하였다. 연구 결과, 전문가-현장교사-예비교사 수학수업 연구 공동체 모델을 통해 예비교사와 현장교사는 수업에 필요한 실제적인 경험과 이해를 높일 수 있었고, 나아가 (예비)교사로서의 정체성과 자긍심 등 교사효능감과 교직관에도 긍정적인 영향을 받았다. 이를 바탕으로 전문가-현장교사-현직교사 수학수업 연구 공동체 모델이 하나의 교사교육 체계로서 지니는 가능성을 확인하였고, 우리나라의 수학교사교육에 대한 유의미한 시사점을 도출할 수 있었다.

마이크로 컴퓨터를 이용한 수학 교수.학습법 개발에 관한 연구 (On the Development of Microcomputer-Assisted Mathematics Teaching/Learning Method)

  • 김창동;이태욱
    • 한국수학교육학회지시리즈A:수학교육
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    • 제27권1호
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    • pp.15-23
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    • 1988
  • We are at the onset of a major revolution in education, a revolution unparalleled since the invention of the printing press. The computer will be the instrument of this revolution. Computers and computer application are everywhere these days. Everyone can't avoid the influence of the computer in today's world. The computer is no longer a magical, unfamiliar tool that is used only by researchers or scholars or scientists. The computer helps us do our jobs and even routine tasks more effectively and efficiently. More importantly, it gives us power never before available to solve complex problems. Mathematics instruction in secondary schools is frequently perceived to be more a amendable to the use of computers than are other areas of the school curriculum. This is based on the perception of mathematics as a subject with clearly defined objectives and outcomes that can be reliably measured by devices readily at hand or easily constructed by teachers or researchers. Because of this reason, the first large-scale computerized curriculum projects were in mathematics, and the first educational computer games were mathematics games. And now, the entire mathematics curriculum appears to be the first of the traditional school curriculum areas to be undergoing substantial trasformation because of computers. Recently, many research-Institutes of our country are going to study on computers in orders to use it in mathematics education, but the study is still start ing-step. In order to keep abreast of this trend necessity, and to enhance mathematics teaching/learning which is instructed lecture-based teaching/learning at the present time, this study aims to develop/present practical method of computer-using. This is devided into three methods. 1. Programming teaching/learning method This part is presented the following five types which can teach/learn the mathematical concepts and principle through concise program. (Type 1) Complete a program. (Type 2) Know the given program's content and predict the output. (Type 3) Write a program of the given flow-chart and solve the problem. (Type 4) Make an inference from an error message, find errors and correct them. (Type 5) Investigate complex mathematical fact through program and annotate a program. 2. Problem-solving teaching/learning method solving This part is illustrated how a computer can be used as a tool to help students solve realistic mathematical problems while simultaneously reinforcing their understanding of problem-solving processes. Here, four different problems are presented. For each problem, a four-stage problem-solving model of polya is given: Problem statement, Problem analysis, Computer program, and Looking back/Looking ahead. 3. CAI program teaching/learning method This part is developed/presented courseware of sine theorem section (Mathematics I for high school) in order to avail individualized learning or interactive learning with teacher. (Appendix I, II)

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수학교육에서 창의성 신장을 위한 열린교육 방안에 대한 연구1) (A Study on Open Education for Developing Creativity in Mathematics Education)

  • 전평국;이재학;백석윤;박성선
    • 한국수학교육학회지시리즈C:초등수학교육
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    • 제5권2호
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    • pp.71-94
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    • 2001
  • The purposes of this study were to design small group collaborative learning models for developing the creativity and to analyze the effects on applying the models in mathematics teaching and loaming. The meaning of open education in mathematics learning, the relation of creativity and inquiry learning, the relation of small group collaborative learning and creativity, and the relation of assessment and creativity were reviewed. And to investigate the relation small group collaborative learning and creativity, we developed three types of small group collaborative learning model- inquiry model, situation model, tradition model, and then conducted in elementary school and middle school. As a conclusion, this study suggested; (1) Small group collaborative learning can be conducted when the teacher understands the small group collaborative learning practice in the mathematics classroom and have desirable belief about mathematics instruction. (2) Students' mathematical anxiety can be reduced and students' involvement in mathematics learning can be facilitated, when mathematical tasks are provided through inquiry model and situation model. (3) Students' mathematical creativity can be enhanced when the teacher make classroom culture that students' thinking is valued and teacher's authority is reduced. (4) To develop students' mathematical creativity, the interaction between students in small group should be encouraged, and assessment of creativity development should be conduced systematically and continuously.

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수학적 은유의 사회 문화적 분석 (Analysis of Mathematical Metaphor from a Sociocultural Perspective)

  • 주미경
    • 대한수학교육학회지:수학교육학연구
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    • 제11권2호
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    • pp.239-256
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    • 2001
  • The notion of metaphor has been increasingly popular in research of mathematics education. In particular, metaphor becomes a useful unit for analysis to provide a profound insight into mathematical reasoning and problem solving. In this context, this paper takes metaphor as an analytic unit to examine the relationship between objectivity and subjectivity in mathematical reasoning. Specifically, the discourse analysis focuses on the code switching between literal language and metaphor in mathematical discourse. It is shown that the linguistic code switching is parallel with the switching between two different kinds of mathematical knowledge, that is, factual knowledge and mathematical imagination, which constitute objectivity and subjectivity in mathematical reasoning. Furthermore, the pattern of the linguistic code switching reveals the dialectical relationship between the two poles of mathematical reasoning. Based on the understanding of the dialectical relationship, this paper provides some educational implications. First, the code-switching highlights diverse aspects of mathematics learning. Learning mathematics is concerned with developing not only technicality but also mathematical creativity. Second, the dialectical relationship between objectivity and subjectivity suggests that teaching and teaming mathematics is socioculturally constructed. Indeed, it is shown that not all metaphors are mathematically appropriated. They should be consistent with the cultural model of a mathematical concept under discussion. In general, this sociocultural perspective on mathematical metaphor highlights the sociocultural organization of teaching and loaming mathematics and provides a theoretical viewpoint to understand epistemological diversities in mathematics classroom.

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수학과 단계형 수준별 교육과정 편성.운영에 관한 연구 (A Study of Formation & Application of step-wise level curriculum of Mathematics)

  • 최택영;함석돈
    • 한국수학교육학회지시리즈A:수학교육
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    • 제40권2호
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    • pp.179-194
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    • 2001
  • The seventh curriculum put into operation gradually from first-year student in 2000 academic years of elementary school is subject to form and apply a step-wise level curriculum. Mathematics(correspond to junior high school course from 7th school year to 9th school year) should apply a step-wise level curriculum from 7th school year in 2001 academic years. Accordingly, mathematics teachers must diagnose actual conditions of educations, distribution tables of test results, step-wise teaching-studying programs etc. They also make proper plans suitable for actual situations of each school, prepare appropriate teaching materials and aids. I investigated preceding studies planned for preparation of putting into operation of a step-wise level curriculum. It showed that most of the studies were conducted at schools of medium or large scale and studies conducted at schools of small scale was rare. There were 113 small scale middle schools out of total 297 middle schools in Kyongsangbuk-do area in 2000. In this situation, I felt necessities of modeling of a step-wise level curriculum suitable for small scale schools. In this study, I modeled a step-wise level curriculum suitable for small scale middle schools, applied this model to 44 students in M middle school. I modeled two types of curriculum. One is a step-wise level curriculum that execute special supplementation process to students who do not complete 7-가 step successfully. The other is a step-wise level curriculum which is a regular model for a step-wise level of 7-나 step. I carried out an academic achievement test and intimacy test about mathematics before and after the application of the model. In this study, I found out that this model was very effective in academic achievement of students and helpful to declined students in scholarship. In the intimacy test, It was found out that most of the students gained confidence in mathematics, felt less anxiety, formed positive self consciousness. Therefore, I think that this model will be helpful to the application of the seventh step-wise level curriculum.

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수학교사의 노티싱(Noticing) 분석을 통한 중심신념 탐색 (Exploring Central Beliefs through Noticing Analysis of Mathematics Teachers)

  • 강성권;홍진곤
    • 한국수학교육학회지시리즈E:수학교육논문집
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    • 제35권4호
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    • pp.377-411
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    • 2021
  • 본 연구는 교수학습 맥락에서 수학교사의 중심신념과 주변신념의 탐색을 목적으로 한다. 이러한 목적을 위해 본 연구는 고등학교 현직교사 8명을 대상으로 가상의 수학 수업 동영상을 활용하여 수학적 신념 측면에서 교사 노티싱(noticing)을 분석하였다. 분석결과, 노티싱하는 교사는 동영상 속 수업교사의 교수학습 문제 상황에 대하여 자신의 수학적 신념을 반영하여 비판하고, 교수학습 대안을 제시하였다. 그리고, 본 연구의 노티싱 분석은 '교수학습의 학생참여'와 같은 특정 노티싱 주제에 반영된 교사들의 수학적 신념을 비교하여 교사 개인의 상대적 중심신념과 주변신념을 드러내었다. 이러한 연구 결과를 통하여 본 연구는 노티싱을 활용하여 교수학습 맥락의 제약조건에서 수학교사의 중심신념과 주변신념을 추출하는 모형을 제안하였으며 부가적으로 수학교사의 교수학습-의사결정-전문성을 관찰할 수 있었다.