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1	The development of arithmetic Caldwell, Cordelia January 1928 (has links) No description available. Arithmetic -- Foundations. Fractions.
2	Factors contributing to understanding of selected basic arithmetical principles and generalizations Stoneking, Lewis William January 1960 (has links) There is no abstract available for this dissertation. Arithmetic -- Foundations. Number concept.
3	The refinement of a test of quantitative judgment. Tuttle, Cynthia L. 01 January 1965 (has links) (PDF) No description available. Arithmetic Foundations Cognition Perception.
4	Remarks on formalized arithmetic and subsystems thereof Brink, C January 1975 (has links) In a famous paper of 1931, Gödel proved that any formalization of elementary Arithmetic is incomplete, in the sense that it contains statements which are neither provable nor disprovable. Some two years before this, Presburger proved that a mutilated system of Arithmetic, employing only addition but not multiplication, is complete. This essay is partly an exposition of a system such as Presburger's, and partly an attempt to gain insight into the source of the incompleteness of Arithmetic, by linking Presburger's result with Gödel's. Gödel, Kurt Logic, Symbolic and mathematical Semantics (Philosophy) Arithmetic -- Foundations Number theory
5	An analysis of the influence of question design on pupils' approaches to number pattern generalisation tasks Samson, Duncan Alistair January 2008 (has links) This study is based on a qualitative investigation framed within an interpretive paradigm, and aims to investigate the extent to which question design affects the solution strategies adopted by children when solving linear number pattern generalisation tasks presented in pictorial and numeric contexts. The research tool comprised a series of 22 pencil and paper exercises based on linear generalisation tasks set in both numeric and 2-dimensional pictorial contexts. The responses to these linear generalisation questions were classified by means of stage descriptors as well as stage modifiers. The method or strategy adopted was carefully analysed and classified into one of seven categories. A meta-analysis focused on the formula derived for the nth term in conjunction with its justification. The process of justification proved to be a critical factor in being able to accurately interpret the origin of the sub-structure evident in many of these responses. From a theoretical perspective, the central role of justification/proof within the context of this study is seen as communication of mathematical understanding, and the process of justification/proof proved to be highly successful in providing a window of understanding into each pupil’s cognitive reasoning. The results of this study strongly support the notion that question design can play a critical role in influencing pupils’ choice of strategy and level of attainment when solving pattern generalisation tasks. Furthermore, this study identified a diverse range of visually motivated strategies and mechanisms of visualisation. An awareness and appreciation for such a diversity of visualisation strategies, as well as an understanding of the importance of appropriate question design, has direct pedagogical application within the context of the mathematics classroom. Mathematics -- Study and teaching Algebra -- Study and teaching Arithmetic -- Foundations Pattern perception

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