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赵海祥 《佳木斯教育学院学报》2012,(1):192-193
《初中数学课程标准(2011版)》指出,数学课程能使学生掌握必备的基础知识和基本技能,培养学生的抽象思维和推理能力,培养学生的创新意识和实践能力数学的发散性思维能力是"问题解决"的基础,是培养数学推理能力和创新意识前提要求。数学发散性思维作为用学科自身的品质陶冶人、启迪人、充实人。"问题解决"是人的高级数学思维。高级思维的学习,可以使学生充分享受思维的快乐,可以让思维自由飞翔。本文就初中数学发散思维的培养谈几点体会,通过创设问题情景、设置开放性试题、发挥学科优势等教学策略,着力培养初中学生的数学发散性思维能力,实现有效教学。 相似文献
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Krilowicz B Johnston W Sharp SB Warter-Perez N Momand J 《CBE life sciences education》2007,6(1):74-83
A summer program was created for undergraduates and graduate students that teaches bioinformatics concepts, offers skills in professional development, and provides research opportunities in academic and industrial institutions. We estimate that 34 of 38 graduates (89%) are in a career trajectory that will use bioinformatics. Evidence from open-ended research mentor and student survey responses, student exit interview responses, and research mentor exit interview/survey responses identified skills and knowledge from the fields of computer science, biology, and mathematics that are critical for students considering bioinformatics research. Programming knowledge and general computer skills were essential to success on bioinformatics research projects. General mathematics skills obtained through current undergraduate natural sciences programs were adequate for the research projects, although knowledge of probability and statistics should be strengthened. Biology knowledge obtained through the didactic phase of the program and prior undergraduate education was adequate, but advanced or specific knowledge could help students progress on research projects. The curriculum and assessment instruments developed for this program are available for adoption by other bioinformatics programs at http://www.calstatela.edu/SoCalBSI. 相似文献
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培养学生的创造力是世界各地的课程改革也包括数学教育的一个重要目标。然而由于对创造力本身的界定有不同的认识,如何在教学中培养学生的创造力一直是困扰一线教师的难题。数学活动题作为一种开放性的问题,提供了丰富的问题情境,有助于学生探索和思考。学生在解决可操作的数学活动题时,表现出积极的情感体验,体现出多样的思维过程,并能对自己的解题思路进行反思和调整。利用数学活动题是培养学生数学创造力的一条可行的途径。 相似文献
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Oliver F. Jenkins 《Journal of Mathematics Teacher Education》2010,13(2):141-154
A structured interview process is proffered as an effective means to advance prospective teachers’ understandings of students
as learners of mathematics, a key component of pedagogical content knowledge. The interview process is carried out in three
phases with the primary objective of developing listening skills for accessing students’ mathematical thinking. The interviews
adhere to clinical interview procedures for discovering cognitive activities and, accordingly, are initiated by presenting
an open-ended mathematics task. Three rounds of interviews were completed by undergraduates enrolled in a middle school mathematics
methods course. Anecdotal data generated by their interview reports suggest that the structured interview process engenders
an interpretive orientation to listening to students and furthers awareness of how students make sense of mathematics. Features
of the interview process that may limit its potential benefits are discussed; recommendations for further study are proposed. 相似文献
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Teukava Finau David F. Treagust Mihye Won A. L. Chandrasegaran 《International Journal of Science and Mathematics Education》2018,16(1):183-202
This paper presents the effects of a cognitive acceleration program in mathematics classes on Tongan students’ achievements, motivation and self-regulation. Cognitive Acceleration in Mathematics Education (CAME) is a program developed at King’s College and implemented worldwide with the aim of improving students’ thinking skills, mathematics performance and attitudes. The first author adapted the program materials to Tongan educational context and provided support to participating teachers for 8 months. This study employed a quasi-experimental design with 219 Year 8 students as the experimental group and 119 Year 8 students as the comparison group. There were a significant differences in the mean scores between the pre-test and post-test of the three instruments that were employed in the study, indicating that learning mathematics under the CAME program had a positive effect on levels of students’ self-regulation, motivation and mathematics achievement. Students also reported changes to the ways they learn mathematics. 相似文献
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Allison Antink-Meyer Norman G. Lederman 《International Journal of Science Education》2013,35(10):1547-1563
The divergent thinking skills in science of 282 US high school students were investigated across 16 weeks of instruction in order to determine whether typical academic time periods can significantly influence changes in thinking skills. Students’ from 6 high school science classrooms completed the Scientific Structures Creativity Measure (SSCM) before and after a semester of instruction. Even the short time frame of a typical academic term was found to be sufficient to promote both improvements in divergent thinking skills as well as declining divergent thinking. Declining divergent thinking skills were more common in this time frame than were improvements. The nature of student performance on the SSCM and implications are discussed. 相似文献
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任晓松 《佳木斯教育学院学报》2011,(2):258-258
在数学教学中,应注意拓宽学生的思维空间,培养学生的创新思维能力。发散思维即求异思维,是一种创造性思维,本文探讨了如何在数列学习中培养学生的发散思维。 相似文献
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数学既是小学阶段就开始接触的学科,也是对小学生数学思维运用和解题能力要求较高的学科,没有问题可“问”的小学数学课堂无疑是枯燥和无趣的,难以真正实现对小学生思维能力的培养,因此,本文结合目前小学数学课堂出现的问题,探究怎样在小学数学教学中将学生问题意识培养起来。 相似文献
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谈如何培养学生的数学发散性思维 总被引:1,自引:0,他引:1
于莉 《廊坊师范学院学报(自然科学版)》2008,8(3)
发散性思维是培养学生创造性思维的重要环节,在数学教学中可采用多种方式培养学生的发散性思维:基础教学中多角度推倒公式定理,多用类比法得出结论,注重一题多解、一题多变。 相似文献
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This mixed methods study investigates the ways in which secondary mathematics prospective teachers acquire skills needed to attend to, interpret, and respond to students’ mathematical thinking and the ways in which their perceived strengths and weaknesses influence their skills when this type of formalized training is not part of their program. These skills (attending, interpreting, and responding) are defined as teachers’ professional noticing of students’ thinking. Results indicate that seniors respond to students’ thinking in significantly different ways from juniors and sophomores. Converging the data highlighted inconsistencies in how participants’ were making sense of students’ mathematical thinking, as well as in participants’ self-identified strengths and weaknesses. 相似文献
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Leigh N. Wood Glyn Mather Peter Petocz Anna Reid Johann Engelbrecht Ansie Harding Ken Houston Geoff H. Smith Gillian Perrett 《International Journal of Science and Mathematics Education》2012,10(1):99-119
We report on an international study about mathematics students’ ideas of how they will use mathematics in their future study
and careers. This builds on our previous research into students’ conceptions of mathematics. In this paper, we use data from
two groups of students studying mathematics: those who participated in an in-depth interview and those who completed an open-ended
questionnaire. We found that their responses could be grouped into four categories: don’t know; procedural skills; conceptual
skills; and professional skills. Although some students held clear ideas about the role of mathematics, many were not able
to articulate how it would be used in their future. This has implications for their approach to learning and our approach
to teaching. 相似文献
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从夯实专业基础,培养学生基本能力、发散思维、直觉思维,在数学教育中浸透数学美等几个方面,探讨了应用型本科院校数学专业基础课教学中创新素质教育的有关问题,鼓励学生的创新性思维,为学生提供更多的思考空间。 相似文献
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数学教育硕士、本科生解决开放性数学应用问题仍然是困难的,具有较高数学理论知识未必天然地能较好解决那些只用较低数学理论知识就能解答的数学应用问题;解决策略开放、结论开放、条件开放数学应用问题的难度逐渐显著增加,数学新课程重视数学应用教育促进了学生数学应用问题解决能力的发展;解决开放性数学应用问题的策略选择具有显著性差异,呈现数学思维的单一性、近迁移性等特征,误解信息、隐喻干扰等因素对被试的策略选择产生影响. 相似文献
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Y. J. Dori A. Zohar D. Fischer-Shachor J. Kohan-Mass M. Carmi 《International Journal of Science Education》2018,40(6):595-620
This paper describes an Israeli national-level research examining the extent to which admissions of elementary school students to the gifted programmes based on standardised tests are gender-fair. In the research, the gifted students consisted of 275 boys, 128 girls, and additional 80 girls who were admitted to the gifted programme through affirmative action (AA). To assess these young students’ scientific thinking skills, also referred to as science practices, open-ended questions of case-based questionnaires were developed. The investigated scientific thinking skills were question posing, explanation, graphing, inquiry, and metacognition. Analysis of the students’ responses revealed that gifted girls who entered the programmes through AA performed at the same level as the other gifted students. We found significant differences between the three research groups in question posing and graphing skills. We suggest increasing gender-fairness by revising the standard national testing system to include case-based narratives followed by open-ended questions that assess gifted students’ scientific thinking skills. This may diminish the gender inequity expressed by the different number of girls and boys accepted to the gifted programmes. We show that open-ended tools for analysing students’ scientific thinking might better serve both research and practice by identifying gifted girls and boys equally well. 相似文献
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John Paul Cook 《PRIMUS》2015,25(3):248-264
AbstractThis paper details an inquiry-based approach for teaching the basic notions of rings and fields to liberal arts mathematics students. The task sequence seeks to encourage students to identify and comprehend core concepts of introductory abstract algebra by thinking like mathematicians; that is, by investigating an open-ended mathematical context, identifying patterns, and venturing conjectures. A sequence of open-ended instructional tasks that aim to capitalize on students’ prior experiences with equation solving is provided along with notes and sample student responses for prospective instructors. 相似文献
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Creativity assessment commonly uses open-ended divergent thinking tasks. The typical methods for scoring these tasks (uniqueness scoring and subjective ratings) are time-intensive, however, so it is impractical for researchers to include divergent thinking as an ancillary construct. The present research evaluated snapshot scoring of divergent thinking tasks, in which the set of responses receives a single holistic rating. We compared snapshot scoring to top-two scoring, a time-intensive, detailed scoring method. A sample of college students (n = 226) completed divergent thinking tasks and measures of personality and art expertise. Top-two scoring had larger effect sizes, but snapshot scoring performed well overall. Snapshot scoring thus appears promising as a quick and simple approach to assessing creativity. 相似文献
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In an experimental study to explain the effect of structured Building Block Play with LEGO? bricks on 6-year-old student mathematics achievement and in the areas of logical thinking, divergent thinking, nonverbal reasoning, and mental imagery, students in the experimental group scored significantly higher (p ≤ .05) in mathematics achievement and in the areas of divergent thinking, nonverbal reasoning abilities, and mental imagery. 相似文献