Search for dissertations about: "textbook analysis"
Showing result 1 - 5 of 21 swedish dissertations containing the words textbook analysis.
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1. Syllogistic Analysis and Cunning of Reason in Mathematics Education
Abstract : This essay explores the issue of organizing mathematics education by means of syllogism. Two aspects turn out to be particularly significant. One is the syllogistic analysis while the other is the cunning of reason. READ MORE
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2. Pedagogic practice between tradition and renewal : A study of the new mathematics curriculum in Mozambique
Abstract : The new school mathematics curriculum in Mozambique, introduced in 2008, is partly competency-based and it advocates a more student-centred pedagogy. The most salient innovative features are the incorporation of mathematical competencies related to the development of students’ reasoning skills, including argumentation, justification and analytical thinking, and the use of heuristic or inductive methods that promote meaningful students’ participation. READ MORE
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3. Problem solving in mathematics textbooks
Abstract : The aim of this study is to analyse how mathematical problem solving (MPS) is represented in mathematical textbooks for Swedish upper secondary school. The analysis comprises dominating Swedish textbook series, and relates to uncovering a) the quantity of tasks that are actually mathematical problems (MPs), b) their location in the chapter, c) their difficulty level, and d) their context. READ MORE
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4. Redox models in chemistry : A depiction of the conceptions held by secondary school students of redox reactions
Abstract : According to previous research, students show difficulties in learning redox reactions. By the historical development different redox models exist to explain redox reactions, the oxygen model, the hydrogen model, the electron model and the oxidation number model. READ MORE
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5. Proof-related reasoning in upper secondary mathematics textbooks : Characteristics, comparisons, and conceptualizations
Abstract : Proofs and proving are difficult to learn and difficult to teach. A common problem is that many students use specific examples as evidence for general statements. Difficulties with proofs are also part of the transition problems that exist between secondary and tertiary schooling in mathematics. READ MORE