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För oss betyder matematik väldigt mycket, det finns i livet! : Om hur fritidshemmet ger uppmuntran och utmaningar i elevers matematiska utvecklingAndersson, Eva January 2020 (has links)
The pedagogics of the leisure time center where the signifiers are the group, the experience and the situation, all these would make possibilities for the leisure time teachers to work with mathematics in an untraditional way, to complement the formal mathematics with an informal, everyday mathematics. This way to educate goes together with what the science depicts is missing in the traditional way of educating. The students need to work more with problem solving, creative, colloquial and practical with mathematics, preferably in interaction together. The purpose of the study is to try to get to know how the leisure time center operates to enable the development in mathematics of the students. Which are the activities the leisure time center offers where the students mathematical competence increases through encouragement and challenges. To get material for my analysis I have chosen two methods, observations and interviews, to get a broad and immerse comprehension of the scope of the survey. I have proceeded from the mathematician Alan Bishop and his theories about the six universal mathematical activities. I have also chosen to link my observations and the interviews to the social constructivism, i.e. that the human active construct knowledge in interaction together with others. The result of the survey is that the teachers has a good theoretical competence when it comes to informal mathematics. The presented activities are mostly sport and playing, and the equipment that is offered has to do with sport. These activities are according to Bishop mathematical activities themselves, but to encourage and challenge the students in their mathematical development, it requires mental presence, dedication and curious teachers.
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The Contextual, Academic, and Socio-Cultural Factors Influencing Kindergarten Students’ Mathematical Literacy DevelopmentMather, Mary K. January 2004 (has links)
No description available.
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Realistic Mathematics Education as a lens to explore teachers’ use of students’ out-of-school experiences in the teaching of transformation geometry in Zimbabwe’s rural secondary schoolsSimbarashe, Mashingaidze Samuel 12 November 2018 (has links)
The study explores Mathematics educators’ use of students’ out-of-school experiences in the teaching of Transformation Geometry. This thesis focuses on an analysis of the extent to which students’ out-of-school experiences are reflected in the actual teaching, textbook tasks and national examination items set and other resources used. Teachers’ teaching practices are expected to support students’ learning of concepts in mathematics. Freudenthal (1991) argues that students develop their mathematical understanding by working from contexts that make sense to them, contexts that are grounded in realistic settings.
ZIMSEC Examiners Reports (2010; 2011) reveal a low student performance in the topic of Transformation Geometry in Zimbabwe, yet, the topic has a close relationship with the environment in which students live (Purpura, Baroody & Lonigan, 2013). Thus, the main purpose of the study is to explore Mathematics teachers’ use of students’ out-of-school experiences in the teaching of Transformation Geometry at secondary school level.
The investigation encompassed; (a) teacher perceptions about transformation geometry concepts that have a close link with students’ out-of-school experiences, (b) how teachers are teaching transformation geometry in Zimbabwe’s rural secondary schools, (c) the extent to which students’ out-of-school experiences are incorporated in Transformation Geometry tasks, and (d) the extent to which transformation geometry, as reflected in the official textbooks and suggested teaching models, is linked to students’ out-of-school experiences.
Consistent with the interpretive qualitative research paradigm the transcendental phenomenology was used as the research design. Semi-structured interviews, Lesson observations, document analysis and a test were used as data gathering instruments. Data analysis, mainly for qualitative data, involved coding and categorising emerging themes from the different data sources. The key epistemological assumption was derived from the notion that knowing reality is through understanding the experiences of others found in a phenomenon of interest (Yuksel & Yildirim, 2015). In this study, the phenomenon of interest was the teaching of Transformation Geometry in rural secondary schools. In the same light, it meant observing teachers teaching the topic of Transformation Geometry, listening to their perceptions about the topic during interviews, and considering how they plan for their teaching as well as how students are assessed in transformation geometry.
The research site included 3 selected rural secondary schools; one Mission boarding high school, a Council run secondary school and a Government rural day secondary school. Purposive sampling technique was used carefully to come up with 3 different types of schools in a typical rural Zimbabwe. Purposive sampling technique was also used to choose the teacher participants, whereas learners who sat for the test were randomly selected from the ordinary level classes. The main criterion for including teacher participants was if they were currently teaching an Ordinary Level Mathematics class and had gained more experience in teaching Transformation Geometry. In total, six teachers and forty-five students were selected to participate in the study.
Results from the study reveal that some teachers have limited knowledge on transformation geometry concepts embedded in students’ out-of-school experience. Using Freudenthal’s (1968) RME Model to judge their effectiveness in teaching, the implication is teaching and learning would fail to utilise contexts familiar with the students and hence can hardly promote mastery of transformation geometry concepts. Data results also reveal some disconnect between teaching practices as espoused in curriculum documents and actual teaching practice. Although policy stipulates that concepts must be developed starting from concrete situations and moving to the abstract concepts, teachers seem to prefer starting with the formal Mathematics, giving students definitions and procedures for carrying out the different geometric transformations.
On the other hand, tasks in Transformation Geometry both at school level and the national examinations focus on testing learner’s ability to define and use procedures for performing specific transformations at the expense of testing for real understanding of concepts. In view of these findings the study recommends the revision of the school Mathematics curriculum emphasising pre-service programmes for teacher professional knowledge to be built on features of contemporary learning theory, such as RME theory. Such as a revision can include the need to plan instruction so that students build models and representations rather than apply already developed ones. / Curriculum and Instructional Studies / D. Ed. (Curriculum Studies)
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