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Sustained, job-embedded professional development and the learning environment of middle-level mathematics classroomsGabler, Craig Thomas January 2007 (has links)
As the need for educational reform is increasingly recognized, so too is the need for effective professional development (Guskey, 2000). Historically the evaluation of professional development experiences has been limited to exit surveys, noticeably failing to examine the long-term impact of the effort. This study assessed the impact on the classroom learning environment of a yearlong, job-embedded professional development opportunity for middle-school mathematics teachers. The application of learning environment instruments to the evaluation of professional development is a unique feature of this study. The research employed the Questionnaire on Teacher Interactions (QTI) and a modified version of the What Is Happening In this Class? (WillIC) survey with over 1000 middle-school mathematics students in 57 classrooms in the state of Washington. Both instruments were administered at the beginning and end of the school year. Teacher interviews were conducted with a sample of participants in order to further illuminate the impact of the professional development. Data from the study were examined for changes in the learning environment and to cross-validate the QTI and WIHIC with this specific population. Results indicate that the QTI and WIHIC are valid and reliable with the middle-school population is this study. Statistical analyses of learning environment data indicate that any pretest-posttest changes that were observed are mostly likely too small to be of educational significance. This study contributes to a better general understanding of the impact of this professional development, and its findings could be utilized in the preparation of future professional development opportunities.
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The effect on teachers of using mathematical investigation tasks as tools for assessment.Albert, Jeanne January 2002 (has links)
This study set out to determine the relationship between assessment practices and teaching methods. I wanted to investigate whether making mathematical investigation assessment tasks available to elementary-school mathematics teachers would have a positive effect on their teaching. Research tells us that standardized tests influence instruction. My research explored whether a national Assessment Task Bank of mathematical investigative tasks could influence teachers.With these aims in mind, the following research questions were formulated:1. Will the teachers' use of mathematical investigation tasks for assessment purposes influence their view of mathematics?2. Will the teachers' use of mathematical investigation tasks for assessment purposes influence the way they teach, and if so, in what ways?3. Will the teachers' use of mathematical investigation tasks for assessment purposes influence the way they assess their students, and if so, in what ways?My research was divided into two parts: 1) a national study involving teachers-leaders throughout the country; and 2) an intensive study in a small Israeli community, called Sharon. The first part examined how the national courses on assessment that I conducted affected the participating teacher-leaders in terms of their concept of mathematics, their teaching methods and their assessment practices. The second part examined the same issues with regard to the mathematics coordinators in the Sharon community. In each case, I have detailed my experiences so that the reader can gain a view of all facets of the study.The research methodology adopted was based on a constructivist paradigm, sometimes referred to as a "naturalistic inquiry", utilizing ethnographic principles wherein the data collection and analysis procedures were eclectic. In the course of the five years of my research, I used many strategies of data collection - ++ / for example, unstructured participant-observations, interviews, questionnaires and content analysis of artifacts (tests and tasks written by teachers).The ideas of reform mathematics (as defined in Ch 2 of this thesis) are based on a broadened vision of mathematics with emphasis on higher-order thinking. My research indicated that the use of mathematical investigation tasks helped the teachers in my study reach the awareness that mathematics, even on the elementary school level, involves generalizations, justifications and even creativity.Prior to my research, and because of my position, I was aware that Israeli teachers were concerned primarily with teaching routine procedures and that their work sheets for the most part involved single-answer exercises. My research indicated that the use of mathematical investigation tasks indeed influenced the way teachers teach. Verbalization-having the students explain "Why"-has become integral to the teaching practices of the participants in my study. Nowadays, the Israeli teachers I worked with use "authentic tasks" in their classrooms: real-life situations that involve some mathematics. Unfortunately, these tasks are not always planned properly.My research demonstrated that teachers attending my professional courses found the mathematical investigation tasks to be useful for assessment purposes, providing them with additional information about their pupils, not obtainable through conventional assessment methods. The additional criteria (I introduced) for evaluating the pupils' work aided in defining these additional areas. I found that while teachers were quite willing to use the mathematical investigation tasks to supplement the conventional tests, they were reluctant to use them as replacements.Exposure to the Assessment Task Bank influenced to a certain degree, the way the teachers in my study assessed their students. The ++ / tests of the teachers who were participants in my study now regularly include elements that were previously absent: questions requiring explanations and questions with more than one possible answer.Although the teachers of my study were increasingly using questions that required higher-order thinking, the tendency was to use the tests in a summative manner, rather than formatively. In other words, many teachers found it difficult to use test results for planning their subsequent lessons. While they were able to analyze their students' work and could report in some detail on each student's performance, they failed to understand how this should affect their teaching. Before they were exposed to the tasks they had administered tests merely in order to provide grades, whereas now the teachers were often trying to understand the students' thinking.While long-term change is still elusive, my research has demonstrated that exposure to reform mathematics through the mathematical investigative tasks of the Assessment Task Bank did have some influence on the teachers' view of mathematics, as well as their teaching and assessment practices.
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A comparative study of lower secondary mathematics textbooks from the Asia Pacific regionTeh, Keng Watt January 2006 (has links)
The rationale behind this study concerns the issues school administrators and teachers of expatriate students face over the progress and placement of the growing number of these students in mathematics classrooms in various countries brought about by the demographical changes occurring in this globalization era. This study aimed to present a method of examining lower secondary school mathematics textbooks with the purpose of evaluating students' expected past learning and comparing students' expected mathematics learning across the different curricula. It is anticipated that such an investigation will be of value to those responsible for the correct level of placement of these students.Six sets of textbooks from four countries on the Asia-Pacific rim, namely Australia, Brunei, China and Singapore, were selected for this study. The textbook content of each country was analyzed in terms of strand weighting and content details, and then coupled with information gained from interviews with teachers. This led to the findings which addressed the various issues raised.The findings facilitated a comparison of the learning paths offered by the various textbooks, fleshed out the differences and similarities of the various curricula and made available detailed comparisons of the textbooks' content in terms of topics covered. The analytical procedure of the examination of text content as presented in this study is itself a diagnostic technique for assessment of the students' past learning, which addressed the main objective of the study.The findings will be of interest to all who are interested in the mathematics taught in the countries involved. / Outcomes will be particularly useful to curriculum planners and textbook writers as well as the administrators and teachers of International Schools and other schools enrolling expatriate students from these countries. The study offers a 'simplistic' way of evaluating textbooks to assess students' learning progress, and highlights the traits of the countries' curricula to provide a general idea of the mathematics ability expected from the expatriate students residing in these countries.
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Number Sense or No Sense: Pre-service teachers learning the mathematics they are required to teachHanrahan, Frances M, res.cand@acu.edu.au January 2002 (has links)
As a result of two years working with the pre-service primary teachers in a College in Fiji I became aware of the difficulty many of the students were having understanding the primary school mathematics they would be required to teach. During that time I had attempted to help them overcome the difficulties by using different teaching approaches and activities but was far from satisfied with my efforts. Hence I decided to make a concerted effort to help the students by planning, implementing and partially evaluating a mathematics education unit, known as the Teaching Program for the first semester of their course. This work formed the basis of my study. For the Teaching Program I chose a constructivist teaching approach with number sense as the underlying theme. To examine the aspects of the Program I used my observations and those of the students especially ones reported in their mathematics journals. To evaluate the effectiveness of the Teaching Program I collected and analysed quantitative data from traditional testing of the class of forty students as well as data from case studies of six of the pre-service teachers in the class. To determine what features of the Teaching Program were linked to positive changes my main source of data was the case studies, especially entries from their journal writings. The findings suggested that a significant development of the cognitive aspects of the students’ number sense did occur during the time of the Teaching Program but not as much as was hoped for. As a result of the analysis of the data I came to a greater realisation of the importance of the non-cognitive aspects of number sense and the necessity for a greater consideration of them in the development of a Program. I also realise now that a major development that did occur was in my understanding of the knowledge and learning of mathematics. My ideas of a teaching paradigm of social constructivism had not guided me sufficiently to incorporate activities and procedures to develop the non-cognitive aspects. I suggest that a paradigm which extends the theory of social constructivism to give greater consideration of these aspects of learning in general, and hence numeracy and number sense in particular, was needed. As a result of this study, my introduction to the theory of enactivism appears to be giving me some direction in this search at this stage.
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Female Students and Achievement in Secondary School MathematicsShildneck, Barry P. 26 October 2009 (has links)
Achievement and the experiences of women in secondary school mathematics have been well documented in the research literature (e.g., Benbow & Stanley, 1980, 1983; Tartre & Fennema, 1995; Sherman, 1982; Ryckman & Peckham, 1987; Keller & Dauenheimer, 2003). With respect to achievement, the research literature primarily focuses on how women are deficient to men (e.g., Benbow & Stanley, 1980, 1983) and the roles affective attributes (e.g., Sherman, 1982; Fennema, Petersen, Carpenter & Lubinski, 1990) and stereotype threat (e.g., Quinn & Spencer, 2001; Steele & Aronson, 1995) have played in women’s deficiencies. Despite the perspective and nature of this research, there are, however, women who have achieved at extraordinarily high levels in the secondary mathematics classroom. It is important to examine this historical research as it has impacted the views of teachers, researchers, and media with regard to female mathematics students’ opportunities. By reflecting upon the research literature and its far reaching impacts, high-achieving women in mathematics can begin to reverse the perceptions that limit their opportunities. Thus, the purpose of this study was to explore, through the experiences and stories relayed by the study’s participants, how young women might negotiate the (historic all male) mathematics domain. Employing a qualitative research designed within a phenomenological framework and analyzed through a combination of postmodern and standpoint feminisms, I examined the stories of four undergraduate female students who were identified as being high-achieving in secondary school mathematics. These young women, by reflecting upon their secondary school experiences, and by reflecting upon their experiences within the context of the existing research literature, not only identified the aspects of their lives they felt had the greatest impact upon their opportunities but also examined their personal definitions of success and the impacts their gender had on their (socially defined) achievements within secondary school mathematics.
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Dyskalkyli : Normativa data för svenska barn i årskurs 5 och 6 på Dyscalculia Screener och hur testresultat korrelerar med avkodningsförmåga och skolmatematikSahlberg, Anna, Taavola, Lina-Lotta January 2011 (has links)
Dyskalkyli (specifika räknesvårigheter) är en av flera orsaker till matematiksvårigheter. Studier har påvisat samband mellan dyskalkyli och dyslexi och att personer med dyskalkyli har svårt att klara skolmatematiken. Två skilda synsätt förklarar orsaken till dyskalkyli: systemteorin och modulärteorin. Dyscalculia Screener är ett screeningverktyg som bygger på modulärteorin och att dyskalkyli beror på svårigheter med grundläggande antalsuppfattning och ska urskilja personer med dyskalkyli från de som är dåliga på matematik av andra orsaker. Testet innehåller delar som testar reaktionstid (Simple Reaction Time), antalsuppfattning (Dot Enumeration och Numerical Stroop) och aritmetik (Addition och Multiplication). Denna studie undersökte hur svenska barn i årskurs 5 och 6 presterade på testet, för att ge referensdata för svenska förhållanden och undersöka hur väl de engelska normerna fungerar. Studien studerade även samband mellan avkodningsförmåga, av riktiga ord och non-ord (med testet LäSt) och prestation på Dyscalculia Screener samt samband mellan prestation i skolmatematik och resultat på respektive test. Studien innefattade 66 barn, 36 i årskurs 5 och 30 i årskurs 6. Svenska barns resultat skiljde sig till viss del från de engelska normvärdena. De presterade lägre än normvärdena på deltesten Simple Reaction Time och Multiplication. På Dot Enumeration och Numerical Stroop presterade barnen högre. På Addition låg barnen inom normvärdena. Samband mellan avkodningsförmåga och räkneförmåga kunde påvisas, framförallt för avkodning av non-ord. En skillnad i resultat fanns på deltesten Numerical Stroop, Addition och Multiplication mellan de som uppnådde målen i matematik och de som var tveksamma att uppnå eller inte uppnådde målen. / Dyscalculia (specific mathematics disorder) is one, among other causes of mathematical difficulties. Studies have indicated a correlation between dyscalculia and dyslexia and people with dyscalculia have problems managing school mathematics. Two different theories explain the cause of for dyscalculia: the system theory and the modular theory. Dyscalculia Screener is a screening tool based on the modular theory and that dyscalculia is caused by difficulties in basal number sense and should discriminate people with dyscalculia from those who are bad at mathematics for other reasons. The test includes parts that test reaction time (Simple Reaction Time), number sense (Dot Enumeration and Numerical Stroop) and arithmetics (Addition and Multiplication). This study investigated how Swedish children, in year 5 and 6, scored on the test, to get reference data for Swedish relations and see whether the normes from England could be used. The study also investigated correlations between decoding, of real words and non-words (with the test LäSt) and score on Dyscalculia Screener and correlations between ability to manage school mathematics and score on each test. The study included 66 children, 36 in year 5 and 30 in year 6. Swedish children scored different in some ways from the English norms. They scored lower than the norms on the testparts Simple Reaction Time and Multiplication. On Dot Enumeration and Numerical Stroop they scored higher. On Addition, they scored within the norms. A correlation between decoding and counting ability was found, especially for decoding of non-word. A difference in score was seen on the testparts Numerical Stroop, Addition och Multiplication between children that achieved the goals in mathematics and those who were unsure to achieve them or did not.
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The study of middle school teachers' understanding and use of mathematical representation in relation to teachers' zone of proximal development in teaching fractions and algebraic functionsWu, Zhonghe 15 November 2004 (has links)
This study examined teachers' learning and understanding of mathematical representation through the Middle School Mathematics Project (MSMP) professional development, investigated teachers' use of mathematics representations in teaching fractions and algebraic functions, and addressed patterns of teachers' changes in learning and using representation corresponding to Teachers' Zone of Proximal Development (TZPD).
Using a qualitative research design, data were collected over a 2-year period, from eleven participating 6th and 7th grade mathematics teachers from four school districts in Texas in a research-designed professional development workshop that focused on helping teachers understand and use of mathematical representations. Teachers were given two questionnaires and had lessons videotaped before and after the workshop, a survey before the workshop, and learning and discussion videotapes during the workshop. In addition, ten teachers were interviewed to find out the patterns of their changes in learning and using mathematics representations.
The results show that all teachers have levels of TZPD which can move to a higher level with the help of capable others. Teachers' knowledge growth is measurable and follows a sequential order of TZPD. Teachers will make transitions once they grasp the specific content and strategies in mathematics representation. The patterns of teacher change depend on their learning and use of mathematics representations and their beliefs about them.
This study advocates teachers using mathematics representations as a tool in making connections between concrete and abstract understanding. Teachers should understand and be able to develop multiple representations to facilitate students' conceptual understanding without relying on any one particular representation. They must focus on the conceptual developmental transformation from one representation to another. They should also understand their students' appropriate development levels in mathematical representations.
The findings suggest that TZPD can be used as an approach in professional development to design programs for effecting teacher changes. Professional developers should provide teachers with opportunities to interact with peers and reflect on their teaching. More importantly, teachers' differences in beliefs and backgrounds must be considered when designing professional development. In addition, professional development should focus on roles and strategies of representations, with ongoing and sustained support for teachers as they integrate representation strategies into their daily teaching.
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The investigation of the relationship between middle school organizational health, school size, and school achievement in the areas of reading, mathematics, and languageBarth, Janice Johnston. January 2001 (has links)
Thesis (Ed. D.)--West Virginia University, 2001. / Title from document title page. Document formatted into pages; contains xi, 156 p. Vita. Includes abstract. Includes bibliographical references (p. 125-138).
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The role of productive struggle in teaching and learning middle school mathematicsWarshauer, Hiroko Kawaguchi 03 February 2012 (has links)
Students’ struggle with learning mathematics is often cast in a negative light.
Mathematics educators and researchers, however, suggest that struggling to make
sense of mathematics is a necessary component of learning mathematics with
understanding. In order to investigate the possible connection between struggle
and learning, this study examined students’ productive struggle as students worked
on tasks of higher cognitive demand in middle school mathematics classrooms.
Students’ productive struggle refers to students’ “effort to make sense of
mathematics, to figure something out that is not immediately apparent” (Hiebert &
Grouws, 2007, p. 287) as opposed to students’ effort made in despair or frustration.
As an exploratory case study using embedded multiple cases, the study
examined 186 episodes of student‐teacher interactions in order to identify the kinds
and nature of student struggles that occurred in a naturalistic classroom setting as
students engaged in mathematical tasks focused on proportional reasoning. The
study identified the kinds of teacher responses used in the interaction with the
students and the types of resolutions that occurred.
The participants were 327 6th and 7th grade students and their six
mathematics teachers from three middle schools located in mid‐size Texas cities.
Findings from the study identified four basic types of student struggles: get started,
carry out a process, give a mathematical explanation, and express misconception
and errors. Four kinds of teacher responses to these struggles were identified as
situated along a continuum: telling, directed guidance, probing guidance, and
affordance. The outcomes of the student‐teacher interactions that resolved the
students’ struggles were categorized as: productive, productive at a lower level, or
unproductive. These categories were based on how the interactions maintained the
cognitive level of the implemented task, addressed the externalized student
struggle, and built on student thinking.
Findings provide evidence that there are aspects of student‐teacher
interactions that appear to be productive for student learning of mathematics. The
struggle‐response framework developed in the study can be used to further
examine the phenomenon of student struggle from initiation, interaction, to its
resolution, and measure learning outcomes of students who experience struggle to
make sense of mathematics. / text
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To become, or not to become, a primary school mathematics teacher. : A study of novice teachers’ professional identity development.Palmér, Hanna January 2013 (has links)
This thesis is about the process of becoming, or not becoming, a primary school mathematics teacher. The aim is to understand and describe the professional identity development of novice primary school mathematics teachers from the perspective of the novice teachers themselves. The study is a case study with an ethnographic direction where seven novice teachers have been followed from their graduation and two years onwards. The ethnographic direction has been used to make visible the whole process of identity development, both the individual and the social part. The empirical material in the study consists of self-recordings made by the respondents, observations and interviews. The empirical material is analysed in two different but co-operating ways. First a conceptual framework was developed and used as a lens. Second, methods inspired by grounded theory are used. The purpose of using them both is to retain the perspective of the respondents as far as possible. At the time of graduation the respondents are members in a community of reform mathematics teaching and they want to reform mathematics teaching in schools. In their visions they strive away from their own experiences of mathematics in school and practice periods. Four cases are presented closely in the thesis as they show four various routes into, and out of, the teaching profession. These four cases make visible that the respondents’ patterns of participation regarding teaching mathematics changes when they become members in new communities of practice with mathematics teaching as part of the shared repertoire. But, the four cases also make visible that the existence of such communities of practice seems to be rare and that the respondents’ different working conditions limit their possibilities of becoming members in those that exist. During the time span of this study, the respondents hardly receive any feedback for their performance as mathematics teachers. Even if they teach mathematics they don´t teach it as they would like to and they don´t think of themselves as mathematics teachers. Two years after graduation none of the respondents has developed a professional identity as primary school mathematics teacher. A primary school teacher in Sweden is a teacher of many subjects but they are the first teachers to teach our school children mathematics. For the respondents to develop a sense of themselves as a kind of primary school mathematics teacher, mathematics teaching has to become part of their teacher identities. For this to become possible, mathematics must become a part of their image of a primary school teacher as an image of a primary school mathematics teacher. Furthermore memberships in communities of practice with mathematics in the shared repertoire must be accessible, both during teacher education and after graduation. Then professional identity development as a primary school teacher would include becoming and being a teacher of mathematics.
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