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  • About
  • The Global ETD Search service is a free service for researchers to find electronic theses and dissertations. This service is provided by the Networked Digital Library of Theses and Dissertations.
    Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
1

Developing a Quantitative Reasoning Course for College Consumption

Kish, David A. 07 September 2017 (has links)
No description available.
2

A Case Study of Integrative Agricultural Education: Integrating Mathematics to Develop Students Quantitative Reasoning

Robinson, Kelly Denise 24 May 2017 (has links)
Preparing students to be life-long learners that are career and college ready is a goal of agricultural education. Changing expectations of education have pointed to agriculture educators as potential leaders in the STEM education movement. Literature related to STEM education in agricultural education is lacking in guidance for teachers, administrators, and curriculum developers in integrating academic content related to STEM content areas. A review of STEM education literature coupled with the framework of quantitative reasoning, lead to a conceptualization of a framework for integrative agricultural education. This framework was implemented through a case study to investigate collaborative efforts in curriculum development in agricultural education with a specific focus on integrating mathematics to develop students' quantitative reasoning skills. Teacher characteristics were identified that seemed to support the implementation of integrative agricultural education practices. Teaching and planning strategies were also identified in the case study. Recommendations suggest support of collaboration between agriculture and mathematics teachers would best support curriculum design and aid in the quality of instruction that follows. / Ph. D. / Agricultural education teachers work to prepare students to be life-long learners that are career and college ready. STEM education has become vogue in education. As expectations change about what students should learn and how they learn it, agriculture educators have potential to be leaders in the STEM movement. STEM education in agricultural education is lacking in guidance for teachers, administrators, and curriculum developers in integrating academic content related to STEM content areas. This dissertation presents a conceptualization of a framework for integrative agricultural education that combines elements characteristic of STEM education coupled with the concept of quantitative reasoning. The framework was used to research collaborative efforts in curriculum development in agricultural education with a specific focus on integrating mathematics to develop students’ quantitative reasoning skills. Results provide teacher characteristics that seemed to support implementation of integrative agricultural education practices. Teaching and planning strategies were also identified that lead to recommendations suggesting support of collaboration between agriculture and mathematics teachers would best support curriculum design and aid in the quality of instruction that follows.
3

Raciocínio quantitativo e memória de trabalho na aprendizagem matemática : um estudo comparativo entre grupos

Maluf, Joanne Lamb January 2010 (has links)
Esta pesquisa situa-se no campo dos processos cognitivos subjacentes à aprendizagem da matemática. Procurou-se avaliar a relação entre o raciocínio quantitativo e a memória de trabalho na aprendizagem da matemática em 30 alunos da 4ª série do Ensino Fundamental, com idades entre 9 e 10 anos em duas escolas públicas de Porto Alegre. Os participantes foram divididos igualmente em dois grupos, um com alto desempenho em matemática e outro com baixo desempenho em matemática. Avaliamos os processos cognitivos dos grupos através de tarefas que envolveram: desempenho matemático (DM), memória de trabalho (MT), memória de curto prazo (MCP), habilidades numéricas (HN) e raciocínio quantitativo (RQ). Os resultados foram analisados quanti-qualitativamente. Para verificar as correlações entre as funções avaliadas, foi utilizado o teste não paramétrico de Spearman. O grupo de alunos com alto desempenho em matemática apresentou melhores resultados em todas as funções avaliadas nessa pesquisa. Tal resultado sugere que todas essas habilidades desempenham um papel essencial na aprendizagem da matemática. Além disso, foram utilizadas medidas estatísticas para verificar a significância das diferenças entre os grupos. Os resultados apontam que houve diferença estatisticamente significativa entre os grupos quanto às funções avaliadas, exceto a MT. Destacamos o fato de que, o RQ foi a única função a correlacionar-se de forma estatisticamente significativa com todas as demais. A correlação entre RQ e MT foi estatisticamente significativa (p ≤ 0,05) ressaltando que os recursos da MT são importantes para o RQ, uma vez que evitam sobrecarga e garantem fluidez no raciocínio. Os resultados do estudo oferecem uma importante implicação educacional: a necessidade de incluir-se, ao longo do Ensino Fundamental, tarefas escolares que tenham em vista competências conceituais e procedurais, como tarefas desafiadoras em que os alunos devam manter a atenção, raciocinar quantitativamente demonstrando flexibilidade e adaptação na utilização de aprendizagens anteriores. / This research stands on the underlying cognitive processes and Math learning field. It intended to evaluate the relation between quantitative reasoning and working memory on the math learning with 30 elementary school fourth-grade students, with ages varying from 9 to 10 years in two Porto Alegre public schools. Participants were divided equally into two groups, one with high performance in mathematics, and other with low performance in mathematics. We evaluated the groups cognitive processes through tasks which involved: mathematical achievement (MA), working memory (WM), short-term memory (STM), numeracy skills (NS), and quantitative reasoning (RQ). Results were analyzed quantiqualitatively. The Spearman non-parametric test was used in order to verify the correlations among the evaluated functions. In this research, the students group with good performance in Mathematics presented better results in all evaluated functions. This result suggests that all these skills play an essential role on math learning. Statistical measures were used to verify the significance of the differences between the groups. Results indicate that there was statistically significant difference between the groups in relation to all evaluated function, except WM. We emphasize the fact that QR was the only function to be correlated in a statistically significant way with all the other functions. Correlation between QR and WM was statistically significant (p ≤ 0,05) highlighting the fact that the WM resources are important for QR, since they avoid overload and guarantee fluidity of reasoning. The study results offer an important educational implication: the need to include, along the elementary school, academic tasks that aim conceptual and procedural competencies, as challenging tasks in which the students must maintain attention, reason quantitatively, showing flexibility and adaptation in the use of early learnings.
4

Raciocínio quantitativo e memória de trabalho na aprendizagem matemática : um estudo comparativo entre grupos

Maluf, Joanne Lamb January 2010 (has links)
Esta pesquisa situa-se no campo dos processos cognitivos subjacentes à aprendizagem da matemática. Procurou-se avaliar a relação entre o raciocínio quantitativo e a memória de trabalho na aprendizagem da matemática em 30 alunos da 4ª série do Ensino Fundamental, com idades entre 9 e 10 anos em duas escolas públicas de Porto Alegre. Os participantes foram divididos igualmente em dois grupos, um com alto desempenho em matemática e outro com baixo desempenho em matemática. Avaliamos os processos cognitivos dos grupos através de tarefas que envolveram: desempenho matemático (DM), memória de trabalho (MT), memória de curto prazo (MCP), habilidades numéricas (HN) e raciocínio quantitativo (RQ). Os resultados foram analisados quanti-qualitativamente. Para verificar as correlações entre as funções avaliadas, foi utilizado o teste não paramétrico de Spearman. O grupo de alunos com alto desempenho em matemática apresentou melhores resultados em todas as funções avaliadas nessa pesquisa. Tal resultado sugere que todas essas habilidades desempenham um papel essencial na aprendizagem da matemática. Além disso, foram utilizadas medidas estatísticas para verificar a significância das diferenças entre os grupos. Os resultados apontam que houve diferença estatisticamente significativa entre os grupos quanto às funções avaliadas, exceto a MT. Destacamos o fato de que, o RQ foi a única função a correlacionar-se de forma estatisticamente significativa com todas as demais. A correlação entre RQ e MT foi estatisticamente significativa (p ≤ 0,05) ressaltando que os recursos da MT são importantes para o RQ, uma vez que evitam sobrecarga e garantem fluidez no raciocínio. Os resultados do estudo oferecem uma importante implicação educacional: a necessidade de incluir-se, ao longo do Ensino Fundamental, tarefas escolares que tenham em vista competências conceituais e procedurais, como tarefas desafiadoras em que os alunos devam manter a atenção, raciocinar quantitativamente demonstrando flexibilidade e adaptação na utilização de aprendizagens anteriores. / This research stands on the underlying cognitive processes and Math learning field. It intended to evaluate the relation between quantitative reasoning and working memory on the math learning with 30 elementary school fourth-grade students, with ages varying from 9 to 10 years in two Porto Alegre public schools. Participants were divided equally into two groups, one with high performance in mathematics, and other with low performance in mathematics. We evaluated the groups cognitive processes through tasks which involved: mathematical achievement (MA), working memory (WM), short-term memory (STM), numeracy skills (NS), and quantitative reasoning (RQ). Results were analyzed quantiqualitatively. The Spearman non-parametric test was used in order to verify the correlations among the evaluated functions. In this research, the students group with good performance in Mathematics presented better results in all evaluated functions. This result suggests that all these skills play an essential role on math learning. Statistical measures were used to verify the significance of the differences between the groups. Results indicate that there was statistically significant difference between the groups in relation to all evaluated function, except WM. We emphasize the fact that QR was the only function to be correlated in a statistically significant way with all the other functions. Correlation between QR and WM was statistically significant (p ≤ 0,05) highlighting the fact that the WM resources are important for QR, since they avoid overload and guarantee fluidity of reasoning. The study results offer an important educational implication: the need to include, along the elementary school, academic tasks that aim conceptual and procedural competencies, as challenging tasks in which the students must maintain attention, reason quantitatively, showing flexibility and adaptation in the use of early learnings.
5

Students' Ways of Thinking about Two-Variable Functions and Rate of Change in Space

January 2012 (has links)
abstract: This dissertation describes an investigation of four students' ways of thinking about functions of two variables and rate of change of those two-variable functions. Most secondary, introductory algebra, pre-calculus, and first and second semester calculus courses do not require students to think about functions of more than one variable. Yet vector calculus, calculus on manifolds, linear algebra, and differential equations all rest upon the idea of functions of two (or more) variables. This dissertation contributes to understanding productive ways of thinking that can support students in thinking about functions of two or more variables as they describe complex systems with multiple variables interacting. This dissertation focuses on modeling the way of thinking of four students who participated in a specific instructional sequence designed to explore the limits of their ways of thinking and in turn, develop a robust model that could explain, describe, and predict students' actions relative to specific tasks. The data was collected using a teaching experiment methodology, and the tasks within the teaching experiment leveraged quantitative reasoning and covariation as foundations of students developing a coherent understanding of two-variable functions and their rates of change. The findings of this study indicated that I could characterize students' ways of thinking about two-variable functions by focusing on their use of novice and/or expert shape thinking, and the students' ways of thinking about rate of change by focusing on their quantitative reasoning. The findings suggested that quantitative and covariational reasoning were foundational to a student's ability to generalize their understanding of a single-variable function to two or more variables, and their conception of rate of change to rate of change at a point in space. These results created a need to better understand how experts in the field, such as mathematicians and mathematics educators, thinking about multivariable functions and their rates of change. / Dissertation/Thesis / Ph.D. Mathematics 2012
6

Raciocínio quantitativo e memória de trabalho na aprendizagem matemática : um estudo comparativo entre grupos

Maluf, Joanne Lamb January 2010 (has links)
Esta pesquisa situa-se no campo dos processos cognitivos subjacentes à aprendizagem da matemática. Procurou-se avaliar a relação entre o raciocínio quantitativo e a memória de trabalho na aprendizagem da matemática em 30 alunos da 4ª série do Ensino Fundamental, com idades entre 9 e 10 anos em duas escolas públicas de Porto Alegre. Os participantes foram divididos igualmente em dois grupos, um com alto desempenho em matemática e outro com baixo desempenho em matemática. Avaliamos os processos cognitivos dos grupos através de tarefas que envolveram: desempenho matemático (DM), memória de trabalho (MT), memória de curto prazo (MCP), habilidades numéricas (HN) e raciocínio quantitativo (RQ). Os resultados foram analisados quanti-qualitativamente. Para verificar as correlações entre as funções avaliadas, foi utilizado o teste não paramétrico de Spearman. O grupo de alunos com alto desempenho em matemática apresentou melhores resultados em todas as funções avaliadas nessa pesquisa. Tal resultado sugere que todas essas habilidades desempenham um papel essencial na aprendizagem da matemática. Além disso, foram utilizadas medidas estatísticas para verificar a significância das diferenças entre os grupos. Os resultados apontam que houve diferença estatisticamente significativa entre os grupos quanto às funções avaliadas, exceto a MT. Destacamos o fato de que, o RQ foi a única função a correlacionar-se de forma estatisticamente significativa com todas as demais. A correlação entre RQ e MT foi estatisticamente significativa (p ≤ 0,05) ressaltando que os recursos da MT são importantes para o RQ, uma vez que evitam sobrecarga e garantem fluidez no raciocínio. Os resultados do estudo oferecem uma importante implicação educacional: a necessidade de incluir-se, ao longo do Ensino Fundamental, tarefas escolares que tenham em vista competências conceituais e procedurais, como tarefas desafiadoras em que os alunos devam manter a atenção, raciocinar quantitativamente demonstrando flexibilidade e adaptação na utilização de aprendizagens anteriores. / This research stands on the underlying cognitive processes and Math learning field. It intended to evaluate the relation between quantitative reasoning and working memory on the math learning with 30 elementary school fourth-grade students, with ages varying from 9 to 10 years in two Porto Alegre public schools. Participants were divided equally into two groups, one with high performance in mathematics, and other with low performance in mathematics. We evaluated the groups cognitive processes through tasks which involved: mathematical achievement (MA), working memory (WM), short-term memory (STM), numeracy skills (NS), and quantitative reasoning (RQ). Results were analyzed quantiqualitatively. The Spearman non-parametric test was used in order to verify the correlations among the evaluated functions. In this research, the students group with good performance in Mathematics presented better results in all evaluated functions. This result suggests that all these skills play an essential role on math learning. Statistical measures were used to verify the significance of the differences between the groups. Results indicate that there was statistically significant difference between the groups in relation to all evaluated function, except WM. We emphasize the fact that QR was the only function to be correlated in a statistically significant way with all the other functions. Correlation between QR and WM was statistically significant (p ≤ 0,05) highlighting the fact that the WM resources are important for QR, since they avoid overload and guarantee fluidity of reasoning. The study results offer an important educational implication: the need to include, along the elementary school, academic tasks that aim conceptual and procedural competencies, as challenging tasks in which the students must maintain attention, reason quantitatively, showing flexibility and adaptation in the use of early learnings.
7

Conceptualizing and Reasoning with Frames of Reference in Three Studies

January 2019 (has links)
abstract: This dissertation reports three studies about what it means for teachers and students to reason with frames of reference: to conceptualize a reference frame, to coordinate multiple frames of reference, and to combine multiple frames of reference. Each paper expands on the previous one to illustrate and utilize the construct of frame of reference. The first paper is a theory paper that introduces the mental actions involved in reasoning with frames of reference. The concept of frames of reference, though commonly used in mathematics and physics, is not described cognitively in any literature. The paper offers a theoretical model of mental actions involved in conceptualizing a frame of reference. Additionally, it posits mental actions that are necessary for a student to reason with multiple frames of reference. It also extends the theory of quantitative reasoning with the construct of a ‘framed quantity’. The second paper investigates how two introductory calculus students who participated in teaching experiments reasoned about changes (variations). The data was analyzed to see to what extent each student conceptualized the variations within a conceptualized frame of reference as described in the first paper. The study found that the extent to which each student conceptualized, coordinated, and combined reference frames significantly affected his ability to reason productively about variations and to make sense of his own answers. The paper ends by analyzing 123 calculus students’ written responses to one of the tasks to build hypotheses about how calculus students reason about variations within frames of reference. The third paper reports how U.S. and Korean secondary mathematics teachers reason with frame of reference on open-response items. An assessment with five frame of reference tasks was given to 539 teachers in the US and Korea, and the responses were coded with rubrics intended to categorize responses by the extent to which they demonstrated conceptualized and coordinated frames of reference. The results show that the theory in the first study is useful in analyzing teachers’ reasoning with frames of reference, and that the items and rubrics function as useful tools in investigating teachers’ meanings for quantities within a frame of reference. / Dissertation/Thesis / Doctoral Dissertation Mathematics 2019
8

The Use of Qualitative Representations with Ranking Task Exercises in Physics

Vreeland, Peter Michael January 2012 (has links)
This study examined the use of ranking task exercises in physics as a means to elicit student's quantitative and/or qualitative understanding of four different physics concepts. Each ranking task exercise in physics asked students to examine several different scenarios that contain a number of quantitative features and then arrange the scenarios in an ordered sequence according to some other quantitative feature. In this study, students completed four different ranking task exercises as part of their coursework in their high school physics class. The responses of students to these ranking task exercises were scored, analyzed, and categorized according to the extent to which a student's response was primarily quantitative or primarily qualitative in nature. The results show that while students relied on a combination of both qualitative and quantitative representations as they completed the exercises, the majority of students used qualitative representations in their solutions to the ranking task exercises in physics. While the students' qualitative and quantitative representations supported the students' rankings of the scenarios in each ranking task exercise, the qualitative representations used by the students provided insight into the student's current understanding of the physics concepts being investigated. The findings suggest that regardless of the representation used by the student to complete the ranking task exercise, students had difficulty in correctly ranking the scenarios in all of the ranking task exercises used in this study. While the students used both quantitative and qualitative representations in their solutions to ranking task exercises in physics that contained two quantitative variables, the study found that students relied exclusively on qualitative representations in their solutions to the ranking task exercise in physics that contained four quantitative variables. / CITE/Mathematics and Science Education
9

Choosing a foundational mathematics course in higher education: How is the decision made?

Wood, Heather Marie 10 May 2024 (has links) (PDF)
This qualitative research used the tenants of phenomenological research to structure a study that begins to identify faculty coordinator’s decision processes in selecting a general education mathematics course. In this study, I examined the question if a faculty member's experiences or beliefs had any influence on the decision process. The interviews occurred with faculty in degree programs grouped by the following a) no specific mathematics requirements (e.g., Humanities) degree programs, b) mathematics-light degree programs (e.g., Social Sciences) and c) mathematics-intensive degrees (e.g., Computer Science). The results of this study are varied but suggest that faculty tasked making decisions on mathematics should understand current recommendations and trends in mathematics selection.
10

GRAPHING UNDER THE MICROSCOPE: EXAMINING UNDERGRADUATES’ GRAPH KNOWLEDGE IN INTRODUCTORY BIOLOGY COURSES

Nouran E. Amin (19202728) 27 July 2024 (has links)
<p dir="ltr">In 2011, the American Association for the Advancement of Science (AAAS) published a report titled “Vision & Change: A Call to Action” that called for reform in undergraduate biology education. The report proposed core competencies that educators should target so students are graduating ready to tackle 21st-century challenges. Of these core competencies is the ability to reason quantitatively, which includes graphing. However, undergraduate biology students struggle with applying essential graph knowledge. The following dissertation project addresses these challenges by exploring two graphing tasks: constructing versus evaluating graphs. We primarily focused on introductory biology students' reasoning practices in applying graph knowledge between these two tasks. As such, we used a digital performance-based assessment tool, <i>GraphSmarts</i>, to analyze students' graphing choices and their justifications in an ecology-based scenario. Chapter 2 discusses the findings of these analyses (n=301), which revealed a disconnect in graph knowledge application between students' graph construction and evaluation skills. While students tend to create basic bar graphs when constructing graphs, they prefer more sophisticated representations, such as bar graphs with averages and error bars, during evaluation tasks—suggesting that the framing of a task influences students' application of graph knowledge between their recognition of effective data representation and their ability to produce such graphs independently. While insightful, we needed to explore ‘why’ this variation exists. Chapter 3 explores the root of this variation through student interviews (n=12). Students would complete the two tasks, followed by questions that help clarify their thought processes. Through the lens of the Conceptual Dynamics framework and the Dynamic Mental Construct model, the study identified two critical cognitive patterns, ‘mode-switching’ and ‘mode-stability.’ Results reaffirm the context-dependent nature of students' graphing knowledge and the influence of task framing on their reasoning processes, as seen in Chapter 2. Results from this project can inform recommendations that biology educators can consider, including 1) having students conduct multiple types of graphing tasks beyond construction, 2) teaching statistical features more explicitly by integrating them into course content, and 3) encouraging students to reflect on their graphing practices. That would be expected to address these instructional needs and foster characteristics of quantitative reasoning and graphing that transfer out of biology. Future directions on this work include exploring other standard graphing tools (Excel, R studio) on graph knowledge, examining the transferability of graphing skills across biological sub-disciplines, and developing targeted interventions for gaps in students' graphing competencies across various graphing tasks. Overall, the work contributes toward developing evidence-based instructional strategies that will be supportive in cultivating competent, robust quantitative reasoning and graphing skills among undergraduate biology students.</p>

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