• Title/Summary/Keyword: open problem

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A Study on the Results of Use of Open-ended Problems for Evaluation in Elementary Mathematics (초등 수학 평가를 위한 개방형 문제의 활용 결과 분석)

  • Lee, Dae-Hyun
    • The Mathematical Education
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    • v.47 no.4
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    • pp.421-436
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    • 2008
  • Mathematics assessment doesn't mean examining in the traditional sense of written examination. Mathematics assessment has to give the various information of grade and development of students as well as teaching of teachers. To achieve this purpose of assessment, we have to search the methods of assessment. This paper is aimed to develop the open-ended problems that are the alternative to traditional test, apply them to classroom and analyze the result of assessment. 4-types open-ended problems are developed by criteria of development. It is open process problem, open result problem, problem posing problem, open decision problem. 6 grade elementary students who are picked in 2 schools participated in assessment using open-ended problems. Scoring depends on the fluency, flexibility, originality The result are as follows; The rate of fluency is 2.14, The rate of flexibility is 1.30, and The rate of originality is 0.11 Furthermore, the rate of originality is very low. Problem posing problem is the highest in the flexibility and open result problem is the highest in the flexibility. Between general mathematical problem solving ability and fluency, flexibility have the positive correlation. And Pearson correlational coefficient of between general mathematical problem solving ability and fluency is 0.437 and that of between general mathematical problem solving ability and flexibility is 0.573. So I conclude that open ended problems are useful and effective in mathematics assessment.

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The 'Open Approach' to Teaching School Mathematics

  • Becker Jerry P.;Epstein Judith
    • Research in Mathematical Education
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    • v.10 no.3 s.27
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    • pp.151-167
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    • 2006
  • The open approach to teaching school mathematics in the United States is an outcome of the collaboration of Japanese and U. S. researchers. We examine the approach by illustrating its three aspects: 1) Open process (there is more than one way to arrive at the solution to a problem; 2) Open-ended problems (a problem can have several of many correct answers), and 3) What the Japanese call 'from problem to problem' or problem formulation (students draw on their own thinking to formulate new problems). Using our understanding of the Japanese open approach to teaching mathematics, we adapt selected methods to teach mathematics more effectively in the United States. Much of this approach is new to U. S. mathematics teachers, in that it has teachers working together in groups on lesson plans, and through a series of discussions and revisions, results in a greatly improved, effective plan. It also has teachers actively observing individual students or groups of students as they work on a problem, and then later comparing and discussing the students' work.

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A Comparison of Students' Reasoning Shown in Solving Open-Ended and Multiple-Choice Problems (개방형 문제와 선택형 문제 해결에 나타난 학생의 추론 비교)

  • Lee, Myoung Hwa;Kim, Sun Hee
    • School Mathematics
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    • v.19 no.1
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    • pp.153-170
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    • 2017
  • This study conducted an analysis of types of reasoning shown in students' solving a problem and processes of students' reasoning according to type of problem by posing an open-ended problem where students' reasoning activity is expected to be vigorous and a multiple-choice problem with which students are familiar. And it examined teacher's role of promoting the reasoning in solving an open-ended problem. Students showed more various types of reasoning in solving an open-ended problem compared with multiple-choice problem, and showed a process of extending the reasoning as chains of reasoning are performed. Abduction, a type of students' probable reasoning, was active in the open-ended problem, accordingly teacher played a role of encouragement, prompt and guidance. Teachers posed a problem after varying it from previous problem type to open-ended problem in teaching and evaluation, and played a role of helping students' reasoning become more vigorous by proper questioning when students had difficulty reasoning.

Investigation of the Problem Solving in Open-Problem Related to Area (넓이관련 열린 문제에 관한 문제해결 과정 분석)

  • 김민경
    • The Mathematical Education
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    • v.43 no.3
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    • pp.275-289
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    • 2004
  • The purpose of the study is to investigate how children and preservice teachers would make a progress in solving the open-problems related to area. In knowledge-based information age, information inquiry, information construction, and problem solving are required. At the level of elementary school mathematics, area is mainly focused on the shape of polygon such as square, rectangle. However, the shape which we need to figure out at some point would not be always polygon-shape. With this perspective, many open-problems are introduced to children as well as preservice teacher. Then their responses are analyzed in terms of their logical thinking and their understanding of area. In order to make students improve their critical thinking and problem solving ability in real situation, the use of open problems could be one of the valuable methods to apply.

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The 'Open Approach' to Teaching School Mathematics

  • Becker Jerry P.
    • Proceedings of the Korea Society of Mathematical Education Conference
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    • 2006.10a
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    • pp.45-62
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    • 2006
  • The open approach to teaching school mathematics in the United States is an outcome of the collaboration of Japanese and U.S. researchers. We examine the approach by illustrating its three aspects: open process (there is more than one way to arrive at the solution to a problem; 2) open-ended problems (a problem can have several of many correct answers), and 3) what the Japanese call 'from problem to problem' or problem formulation (students draw on their own thinking to formulate new problems). Using our understanding of the Japanese open approach to teaching mathematics, we adapt selected methods to teach mathematics more effectively in the United States. Much of this approach is new to U.S. mathematics teachers, in that it has teachers working together in groups on lesson plans, and through a series of discussions and revisions, results in a greatly improved, effective plan. It also has teachers actively observing individual students or groups of students as they work on a problem, and then later comparing and discussing the students' work.

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The Effects of Open-Ended Mathematical Problem Solving Learning on Mathematical Creativity and Attitudes of Elementary Students (개방형 문제해결학습이 초등학생들의 수학적 창의성 및 수학적 태도에 미치는 영향)

  • Seo, YoungMin;Park, Mangoo
    • Communications of Mathematical Education
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    • v.35 no.3
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    • pp.277-293
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    • 2021
  • The purpose of this study was to find out how problem solving learning with open-ended mathematics problems for elementary school students affects their mathematical creativity and mathematical attitudes. To this end, 9 problem solving lessons with open-ended mathematics problems were conducted for 6th grade elementary school students in Seoul, The results were analyzed by using I-STATistics program to pre-and post- t-test. As a result of the study, problem solving learning with open-ended problems was effective in increasing mathematical creativity, especially in increasing flexibility and originality, which are sub-elements of creativity. In addition, problem solving learning with open-ended problems has helped improve mathematical attitudes and has been particularly effective in improving recognition needs and motivation among subfactors. In problem solving learning with open-ended problems, students were able to share various responses and expand their thoughts. Based on the results of the study, the researchers proposed that it is necessary to continue the development of quality materials and teacher training to utilize mathematical problem solving with open-ended problems at school sites.

Fostering Mathematical Thinking and Creativity: The Percent Problem

  • Foong, Pui Yee
    • Research in Mathematical Education
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    • v.14 no.1
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    • pp.51-65
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    • 2010
  • Open-ended problems can foster deeper understanding of mathematical ideas, generating creative thinking and communication in students. High-order thinking tasks such as open-ended problems involve more ambiguity and higher level of personal risks for students than they are normally exposed to in routine problems. To explore the classroom-based factors that could support or inhibit such higher-order processes, this paper also describes two cases of Singapore primary school teachers who have successfully or unsuccessfully implemented an open-ended problem in their mathematics lessons.

The Effects of Psychological Family Environment, Self-control and Friend Characteristics of Middle School Students on Their Problem Behaviors (가족의 심리적 환경과 청소년의 자기통제력 및 친구특성이 청소년의 문제행동에 미치는 영향)

  • 남현미;옥선화
    • Journal of the Korean Home Economics Association
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    • v.39 no.7
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    • pp.37-58
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    • 2001
  • The Purpose of this study was to examine the direct or indirect effects of psychological family environment self-control, and friends characteristics of middle school students on their problem behaviors. Data were corrected from 520 senior students of middle school (266 boys and 254 girls) who reside in Inchon. The level of problem behaviors was directly influenced positively by closeness with friends and negatively by self-control and open communication with mothers. And the level of problem behaviors was indirectly influenced positively by intrafamily conflicts and negatively by self-control, parental monitoring and open communication with parents. Self-control was the most powerful predicator of problem behaviors of middle school students. Self-control was directly influenced positively by open communication with fathers and negatively by intrafamily conflicts. Closeness with friends was directly influenced positively by parental monitoring and negatively by self-control and open communication with mothers.

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How to Pose an Open Problem? : Two Cases of Posing an Open-ended Problem by Reorganizing Given Closed Problems (개방형 문제를 어떻게 만들 것인가?: 두 개의 개방형 문제 제작 사례를 중심으로)

  • Do, Jong-Hoon
    • Journal of the Korean School Mathematics Society
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    • v.10 no.2
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    • pp.221-235
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    • 2007
  • Open problems can provide experiences for students to yield originative and various products in their level, because it is open with respect to its departure situation, goal situation, or solving method. Teachers need to pose and utilize open problems in forms of solution-finding or proving problems. For this we first have to specify which resource and method to use by concrete examples. In this article, we exemplify a method and procedure of posing an open problem by the two cases in which we pose open problems by reorganizing given closed problems. And we analyze students' responses for the two posed open problems. On the basis of these, we reflect implications for mathematical education of open problems.

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Software Similarity Measurement based on Dependency Graph using Harmony Search

  • Yun, Ho Yeong;Joe, Yong Joon;Jung, Byung Ok;Shin, Dong myung;Bahng, Hyo Keun
    • Journal of the Korea Society of Computer and Information
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    • v.21 no.12
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    • pp.1-10
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    • 2016
  • In this paper, we attempt to prevent certain cases by tracing a history and making genogram about open source software and its modification using similarity of source code. There are many areas which use open source software actively and widely, and open source software contributes their development. However, there are many unconscious cases like ignoring license or intellectual properties infringe which can lead litigation. To prevent such situation, we analyze source code similarity using program dependence graph which resembles subgraph isomorphism problem, a typical NP-complete problem. To solve subgraph isomorphism problem, we utilized harmony search of metaheuristic algorithm and compared its result with a genetic algorithm. For the future works, we represent open source software as program dependence graph and analyze their similarity.