• Title/Summary/Keyword: The mathematically gifted

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Environmental and Interpersonal Factors on Development of the Mathematically Gifted: Cases of International Mathematical Olympiad Winners from Korea

  • Choi, Kyong Mi;McAninch, Melissa;Jensen, Jessica;Susadya, Laurentius
    • Research in Mathematical Education
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    • v.22 no.3
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    • pp.175-201
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    • 2019
  • Spending as much time outside of school as in school, gifted youth are affected by non-school aspects including parents, other family members, peers, mentors, mathematics competitions and camp participations. These influences have been known to shape children's intellectual development, academic achievement, interests, and eventually college and career choices. From interviews with five former Olympians from Korea to identify out-of-school influences on their academic achievement and development, we discovered, in addition to confirmation of previously identified factors, additional sources of positive influence seldom previously mentioned and more common to Korean culture were gleaned - mathematics workbooks and Ha-Gwon. The findings of this study are informative for teachers and parents who are interested in development of gifted youth in providing ways to accommodate their special needs and in showing how they can carefully individualize those sources to be positively affecting intellectual development as well as academic achievement.

Program development according to the Mathematically Gifted- Creative Problem Solving (MG-CPS) model (창의적 문제해결 학습 모형에 따른 초등학교 수학영재 프로그램 개발)

  • Nam, Heung Sook;Park, Moon Hwan
    • Journal of Elementary Mathematics Education in Korea
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    • v.16 no.2
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    • pp.203-225
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    • 2012
  • The purpose of this study is to suggest a program for improvement of the mathematical creativity of mathematical gifted children in the elementary gifted class and to examine the effect of developed program. Gifted education program is developed through analyzing relevant literatures and materials. This program is based on the operation bingo game related to the area of number and operation, which accounts for the largest portion in the elementary mathematics. According to this direction, the mathematically gifted educational program has been developed. According to the results which examine the effectiveness of the creative problem solving by the developed program, students' performance ability has been gradually improved by feeding back and monitoring their problem solving process continuously.

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A Note on Factors of Mathematical Creativity Assessment through Problem Posing (문제설정에서의 수학적 창의성 평가 요소에 대한 소고)

  • Kim, PanSoo
    • Journal of Gifted/Talented Education
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    • v.24 no.6
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    • pp.1053-1071
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    • 2014
  • Problem posing is used to develop the creativity program and adaption for the gifted, and to screen the gifted students in the selection process. However existing creativity assessment factors(fluence, flexibility, originality) has been recognized to have it's limitation to assess the mathematical creativity. To improve the creativity assessment, we propose new set of assessment factors for mathematical creativity test through problem posing. For this study, we let 19 mathematically gifted students to pose two good mathematical problems for a limited time after solving a certain problem so called a reference problem. A week late, we let the subjects, pre-service teachers, and experts to evaluate the problems posed by the subjects, and leave the reasons for evaluating highest mark and lowest mark. With this date, we propose fluence, flexibility, originality, anti-similarity, complexity, elaboration as the set of mathematics creativity assessment factors.

Evaluation of a Gifted Education Program for Mathematically Gifted Children in Seoul Area (초등 수학 영재 프로그램 평가 - 서울시 A 교육청 평가 사례를 중심으로 -)

  • Jeong, Soo Ji;Kim, Min Kyeong
    • Journal of Elementary Mathematics Education in Korea
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    • v.18 no.1
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    • pp.149-168
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    • 2014
  • Growing in its size, the contents of the teaching-learning programs for mathematically gifted children from A program in Seoul Metropolitan Office of Education were examined in terms of the individual subjects provided through the courses of gifted education programs, and it was evaluated based on the revised version of the existing module. As a result, the educational objectives of teaching-learning program were clear, differentiated and obtainable. Among the program, the advanced parts were more than the selective parts, which mainly consisted of numbers and calculation, shapes, regularity and problem solving parts and had latest contents of research in balance. Additionally, every part of the program needs mathematical and creative thinking and approach and has proper evaluation index for problem solving. The presented materials in the programs are specific and appropriate, though some of them did not suggest the evaluation index for cultivating personality and value clearly and the reference books. The teaching-learning programs were focusing on problem-based learning and cooperative learning and using performance assessment for evaluation.

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Mathematically Gifted Students' Problem Solving Approaches on Conditional Probability (수학 영재 학생들의 조건부 확률 문제해결 방법)

  • Na, Gwi-Soo;Lee, Kyung-Hwa;Han, Dae-Hee;Song, Sang-Hun
    • School Mathematics
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    • v.9 no.3
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    • pp.397-408
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    • 2007
  • This research intends to look into how mathematically gifted 6th graders (age12) who have not learned conditional probability before solve conditional probability problems. In this research, 9 conditional probability problems were given to 3 gifted students, and their problem solving approaches were analysed through the observation of their problem solving processes and interviews. The approaches the gifted students made in solving conditional probability problems were categorized, and characteristics revealed in their approaches were analysed. As a result of this research, the gifted students' problem solving approaches were classified into three categories and it was confirmed that their approaches depend on the context included in the problem.

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Trends of Research on Gifted Education (1980s'~2007) in Korea (한국의 영재교육 연구경향(1980년대~2007년))

  • Ha, Jong-Duk;Moon, Jeong-Hwa;Park, Ji-Hyun
    • Journal of Gifted/Talented Education
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    • v.19 no.3
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    • pp.477-501
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    • 2009
  • The Purpose of this study is to investigate the general trends of research on gifted education in Korea, by analyzing the articles published during the last thirty years. A total of 347 articles from 14 academic journals which are registered were yearly and synthetically analyzed. The articles were examined in terms of their topics, domains, and age and grade. The most widely researched topic was the cognitive characteristics of the gifted followed by curriculum and affective characteristics of the gifted. Studies on scientifically, generally and mathematically gifted students occupied 86% of total researches. Researches utilized elementary students as their subjects more than middle school or high school students. There is a lack of research on the problems that the gifted students face and on the assessment of gifted education institutes. Moreover, there is hardly any longitudinal study.

A Study on Application of Teaching-Learning Program based on Constructivist Views for Mathematically gifted Students in Primary School (초등 영재 교육에서의 구성주의 교수.학습 모형 적용 연구 - 알고리즘 문제를 중심으로 -)

  • Choi, Keun-Bae;Kim, Hong-Seon
    • Communications of Mathematical Education
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    • v.21 no.2 s.30
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    • pp.153-176
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    • 2007
  • The purpose of this paper is to analyze teaching-learning program which can be applied to mathematically gifted students in primary school, Our program is based on constructivist views on teaching and learning of mathematics. Mainly, we study the algorithmic thinking of mathematically gifted students in primary school in connection with the network problems; Eulerian graph problem, the minimum connector problem, and the shortest path problem, The above 3-subjects are not familiar with primary school mathematics, so that we adapt teaching-learning model based on the social constructivism. To achieve the purpose of this study, seventeen students in primary school participated in the study, and video type(observation) and student's mathematical note were used for collecting data while the students studied. The results of our study were summarized as follows: First, network problems based on teaching-learning model of constructivist views help students learn the algorithmic thinking. Second, the teaching-learning model based on constructivist views gives an opportunity of various mathematical thinking experience. Finally, the teaching-learning model based on constructivist views needs more the ability of teacher's research and the time of teaching for students than an ordinary teaching-learning model.

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Development and Application of Teaching-Learning Materials for Mathematically-Gifted Students by Using Mathematical Modeling -Focus on Tsunami- (중학교 3학년 수학 영재 학생들을 위한 수학적 모델링 교수.학습 자료의 개발 및 적용: 쓰나미를 소재로)

  • Seo, Ji Hee;Yeun, Jong Kook;Lee, Kwang Ho
    • School Mathematics
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    • v.15 no.4
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    • pp.785-799
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    • 2013
  • The researchers developed the teaching-learning materials for 9th grade mathematically gifted students in terms of the hypothesis that the students would have opportunity for problem solving and develop various mathematical thinking through the mathematical modeling lessons. The researchers analyzed what mathematical thinking abilities were shown on each stage of modeling process through the application of the materials. Organization of information ability appears in the real-world exploratory stage. Intuition insight ability, spatialization/visualization ability, mathematical reasoning ability and reflective thinking ability appears in the pre-mathematical model development stage. Mathematical abstraction ability, spatialization/visualization ability, mathematical reasoning ability and reflective thinking ability appears in the mathematical model development stage. Generalization and application ability and reflective thinking ability appears in the model application stage. The developed modeling assignments have provided the opportunities for mathematically-gifted students' mathematical thinking ability to develop and expand.

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A Case Study on Utilizing Invariants for Mathematically Gifted Students by Exploring Algebraic Curves in Dynamic Geometry Environments (역동적 기하 환경에서 곡선 탐구를 통한 수학영재들의 불변량 활용에 관한 사례 연구)

  • Choi, Nam Kwang;Lew, Hee Chan
    • Journal of Educational Research in Mathematics
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    • v.25 no.4
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    • pp.473-498
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    • 2015
  • The purpose of this study is to examine thinking process of the mathematically gifted students and how invariants affect the construction and discovery of curve when carry out activities that produce and reproduce the algebraic curves, mathematician explored from the ancient Greek era enduring the trouble of making handcrafted complex apparatus, not using apparatus but dynamic geometry software. Specially by trying research that collect empirical data on the role and meaning of invariants in a dynamic geometry environment and research that subdivide the process of utilizing invariants that appears during the mathematically gifted students creating a new curve, this study presents the educational application method of invariants and check the possibility of enlarging the scope of its appliance.

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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