• Title/Summary/Keyword: 수학영재 수업

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A Case Study of Creativity Development Using Simpson's Paradox for Mathematically Gifted Students (Simpson의 패러독스를 활용한 영재교육에서 창의성 발현 사례 분석)

  • Lee, Jung-Yeon;Lee, Kyeong-Hwa
    • Journal of Educational Research in Mathematics
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    • v.20 no.3
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    • pp.203-219
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    • 2010
  • Several studies have reported on how and what mathematically gifted students develop superior ability or creativity in geometry and algebra. However, there are lack of studies in probability area, though there are a few trials of probability education for mathematically gifted students. Moreover, less attention has paid to the strategies to develop gifted students' creativity. This study has drawn three teaching strategies for creativity development based on literature review embedding: cognitive conflict, multiple representations, and social interaction. We designed a series of tasks via reconstructing, so called Simpson's paradox to meet these strategies. The findings showed that the gifted students made Quite a bit of improvement in creativity while participating in reflective thinking and active discussion, doing internal and external connection, translating representations, and investigating basic assumption.

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A study on the improvement of ability of a creative solving mathematical problem (수학문제의 창의적 해결력 신장에 관한 연구 -농어촌 중학교 수학영재를 중심으로-)

  • 박형빈;서경식
    • Journal of the Korean School Mathematics Society
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    • v.6 no.1
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    • pp.1-17
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    • 2003
  • In this paper, we study the methods of improving an ability of a creative solving mathematical problem belonging to an educational system which every province office of education has adopted for the mathematically talented students. Especially, we give an attention on a preferential reaction in teaching styles according to student's LQ., the relationship between student's LQ. and an ability of creative solving mathematical problems, and seeking for an appropriative teaching methods of the improvement ability of a creative solving problem. As results, we have the followings; 1. The group having excellent students who have a higher intelligential ability prefers inquiry learning which is composed of several sub-groups to a teacher-centered instruction. 2. The correlation coefficient between student's LQ. and an ability creative solving of mathematical is not high. 3. Although the contents and the model of thematic inquiry learning don't have a great influence on the divergent thinking (ex. fluency, flexibility, originality), they affect greatly the convergent thinking - a creative mathematical - problem solving ability. Accordingly, our results show that we should use a variety of mathematical teaching materials apart from our regular textbooks used in schools to improve a creative mathematical problem solving ability in the process of thematic inquiry learning. Also we can see that an inquiry learning which stimulates student's participation and discussion can be a desirable model in the thematic mathematical classroom activities.

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A Case Study of Constructions on Fractals of the Mathematically Gifted (초등수학 영재교육원 학생들의 프랙탈 구성 방법 분석)

  • Kim, Sang-Mee
    • Journal of Educational Research in Mathematics
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    • v.19 no.2
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    • pp.341-354
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    • 2009
  • The purpose of this study is to show the Fractals activities for mathematically gifted students, and to analyze the constructions on Fractals of the mathematically gifted. The subjects of this study were 5 mathematically gifted students in the Gifted Education Institut and also 6th graders at elementary schools. These activities on Fractals focused on constructing Fractals with the students' rules and were performed three ways; Fractal cards, colouring rules, Fractal curves. Analysis of collected data revealed in as follows: First, the constructions on Fractals transformed the ratios of lines and were changed using oblique lines or curves. Second, to make colouring rules on Fractals, students presented the sensitivities of initial and fractal dimensions on Fractals. In conclusion, this study suggested the importance of communication and mathematical approaches in the mathematics classrooms for the mathematically gifted.

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An Analysis of Using TI-73 Calculator for the 5th Grade Students in an Elementary Math Gifted Class (TI-73 계산기를 활용한 초등 5학년 수학 영재 학급의 수업 분석)

  • Kang, Young Ran
    • Education of Primary School Mathematics
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    • v.16 no.3
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    • pp.315-331
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    • 2013
  • In this study, lessons on coordinate, percentage, and factorization in prime factors were taken with TI-73 calculator for 20 elementary school students in the 5th grade math gifted class in Pohang city. Through these lessons, the researcher examined with cases how using the calculator would influenced the lessons for the gifted students, and attempted to obtain implications on using calculators as learning tools in class. Activity sheets were made for this study and a 80-minute lesson was held three times for three weeks. In order to collect data, the class was recorded on videotape, the students were interviewed, and documents used in the class were collected. Then all the data were transcribed. Data analysis was completed through several readings of transcripts and main themes were derived by classifying, comparing, and contrasting coding. As a result of the study, the calculator played a role the tool as the mediation to communicate and the challenge their solvable tasks beyond the limitation of paper and pencil environments. But, in using the calculator, there was differences in gender between boys and girls. Above all, to enter commands into the calculator resulted in obstacles for learning process.

An Analysis of Generalization Class using GSP for the 8th Grade Students in a Math Gifted Class - Focused on Viviani theorem - (GSP를 활용한 중학교 2학년 수학 영재학급의 일반화 수업 분석과 교육적 시사점 - Viviani 정리를 중심으로 -)

  • Kang, Jeong Gi
    • Communications of Mathematical Education
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    • v.30 no.1
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    • pp.23-46
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    • 2016
  • This study is aimed to implement a preferred generalization classes for gifted students. By designing and applying the generalization lesson using GSP, we tried to investigate the characteristics on the class. To do this, we designed a lesson on generalization of Viviani theorem and applied to 13 8th grade students in a math gifted class. As results, we could extract five subjects as followings; mediating the conjecture by GSP and checking the pattern, misunderstanding the confirm by GSP as a proof and its overcoming, digressing from the topic and cognitive gap, completing the proof by incomplete conjecture, gap between the generalization and understanding generality. Based on this subjects, we discussed the educational implications in order to help implement a preferred generalization classes for gifted students.

Development of teaching and learning materials by using GeoGebra and it's application effects for high school mathematically gifted students (GeoGebra를 활용한 교수.학습이 과학고등학교 수학영재들의 인지적 측면에 미치는 영향)

  • Kim, Mu Jin;Lee, Jong Hak;Kim, Wonkyung
    • Journal of the Korean School Mathematics Society
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    • v.17 no.3
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    • pp.359-384
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    • 2014
  • The purpose of this study is inquire the reaction and adaptability of the mathematically gifted student, in the case of introduce learning materials based on GeoGebra in real class. The study program using GeoGebra consist of 'construction of fundamental figures', 'making animation with using slider tools' (graph of a function, trace of a figure, definite integral, fixed point, and draw a parametric curve), make up the group report after class. In detail, 1st to 15th classes are mainly problem-solving, and topic-exploring classes. To analyze the application effects of developed learning materials, divide students in four groups and lead them to make out their own creative products. In detail, guide students to make out their own report about mathematical themes that based on given learning materials. Concretely, build up the program to make up group report about their own topics in six weeks, after learning on various topics. Expert panel concluded that developed learning materials are successfully stimulate student's creativity in various way, after analyze of the student's activities. Moreover, those learning programs also contributed to the develop of the mathematical ability to thinking that necessary to writing a report. As well, four creative products are assessed as connote mathematically gifted student's creative thinking and meaningful elements in mathematical aspects.

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An analysis on the products and process losses of group creativity among mathematically gifted students (수학영재의 집단창의성 발현에서 나타나는 산출 및 과정 손실 분석)

  • Sung, JiHyun;Lee, ChongHee
    • Journal of Elementary Mathematics Education in Korea
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    • v.21 no.3
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    • pp.505-530
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    • 2017
  • Although mathematically gifted students have potential and creative productivity, they might not manifest group level creative synergy. To manifest group creativity among them, the manifestation process should be facilitated and the process losses should be minimized. The purpose of this study is looking for the method to facilitate the manifestation process of group creativity and minimize the process losses of it. To do this, a case study method was adopted. The products and process losses of the manifestation process of group creativity was analysed. In conclusion, the processes and products of group creativity were concretized and the process losses were analysed by social/motivational and cognitive factors. In addition, the justification and agreement were necessary for the manifestation process of group creativity among mathematically gifted students.

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An Analysis on the Responses and the Behavioral Characteristics between Mathematically Promising Students and Normal Students in Solving Open-ended Mathematical Problems (수학 영재교육 대상 학생과 일반 학생의 개방형 문제해결 전략 및 행동 특성 분석)

  • Kim, Eun-Hye;Park, Man-Goo
    • Journal of Elementary Mathematics Education in Korea
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    • v.15 no.1
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    • pp.19-38
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    • 2011
  • The purpose of this study was to analyze the responses and the behavioral characteristics between mathematically promising students and normal students in solving open-ended problems. For this study, 55 mathematically promising students were selected from the Science Education Institute for the Gifted at Seoul National University of Education as well as 100 normal students from three 6th grade classes of a regular elementary school. The students were given 50 minutes to complete a written test consisting of five open-ended problems. A post-test interview was also conducted and added to the results of the written test. The conclusions of this study were summarized as follows: First, analysis and grouping problems are the most suitable in an open-ended problem study to stimulate the creativity of mathematically promising students. Second, open-ended problems are helpful for mathematically promising students' generative learning. The mathematically promising students had a tendency to find a variety of creative methods when solving open-ended problems. Third, mathematically promising students need to improve their ability to make-up new conditions and change the conditions to solve the problems. Fourth, various topics and subjects can be integrated into the classes for mathematically promising students. Fifth, the quality of students' former education and its effect on their ability to solve open-ended problems must be taken into consideration. Finally, a creative thinking class can be introduce to the general class. A number of normal students had creativity score similar to those of the mathematically promising students, suggesting that the introduction of a more challenging mathematics curriculum similar to that of the mathematically promising students into the general curriculum may be needed and possible.

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An Activity Theoretical Analysis on the Instrumenatal Orchestration of the Teacher: Focusing on the Calculator-Based Classroom Activities of Gifted Elementary Math Students (교사의 도구적 오케스트레이션에 관한 활동이론적 분석: 계산기 기반 초등 수학 영재 수업을 중심으로)

  • Kang, Young Ran;Cho, Cheong Soo
    • School Mathematics
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    • v.17 no.2
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    • pp.273-287
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    • 2015
  • The purpose of this study was to obtain a deeper understanding of didactic processing in the class that unified with engineering by analyzing on the types of the teacher's instumental orchestration and schematizing it as an activity system. In order to do so, a qualitative study of a 5th grade class for math-gifted students in Y elementary school with ethnography was conducted. Interviews with the students were held and various document data were collected during the participational observation of the class. The collected qualitative data were gone through the analytical induction while the instrumental orchestration of Drijvers, Boon, Doorman, Reed, & Gravemeijer as well as the secondgeneration activity theory of Engestrom were using as the frame of conceptional reference. According to the result of this study, there exist 4 types, such as 'technical demo' 'link screen board', 'detection-exploring small group' and 'explain the screen and technical demo'.

The Study on the Educational program for the gifted students in Mathematics -The regularity and generalization of Hanoi Tower with 4 pillars- (수학분야 영재 수업 프로그램 연구 -기둥이 4개인 하노이 탑의 규칙성과 일반항-)

  • Bang, Seung-Jin;Choi, Jung-Oh;Lim, Jin-A;Koh, Jung-Ho;Lee, Jung-Seung;Nam, Ju-Gang;Jeon, Gyu-Min
    • Communications of Mathematical Education
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    • v.21 no.1 s.29
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    • pp.19-31
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    • 2007
  • Currently the mathematics gifted students educational program is plentifully being developed for the elementary and the junior high school students. But the educational program for the gifted students who comes and goes to the high school is not many. This study look for the regularity and generalization of Hanoi Tower with 4 pillars, from the regularity and generalization of Hanoi Tower with 3 pillars. I think this study will be a clue to find the regularity and generalization of Hanoi Tower with n pillars, it's not solved still.

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