Affichage de 1 - 15 of 15 (Bibliographie: Bibliographie WIKINDX globale)
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Keyword: MATHEMATICS
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Bryant, D. P., Hartman, P., & Kim, S. A. (2003). Using explicit and strategic instruction to teach division skills to students with learning disabilities. Exceptionality, 11(3), p. p151.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 32.12%
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Coquin-Viennot, D., & Moreau, S. (2003). Highlighting the role of the episodic situation model in the solving of arithmetical problems. European Journal of Psychology of Education - EJPE, 18(3), p. p267–279.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 35.22%
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Foley, T. B., & Cawley, J. F. (2003). About the mathematics of division: Implications for students with disabilities. Exceptionality, 11(3), p. p131.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 29.47%
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Mauro, D. G., LeFevre, J.-A., & Morris, J. (2003). Effects of problem format on division and manipulation performance: Division facts are mediated via multiplication-based representations. Journal of experimental psychology: Learning, Memory, and Cognition, 29(2), p. p163–170.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 31.84%
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Montague, M. (2003). Teaching division to students with learning disabilities: A constructivist approach. Exceptionality, 11(3), p. p165–175.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 33.03%
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Núñez, R. E. (2005). Creating mathematical infinities: Metaphor, blending, and the beauty of transfinite cardinals. Journal of Pragmatics, 37(10), p. p1717–1741.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 33.39%
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Nesher, P. (1986). Learning mathematics: A cognitive perspective. American Psychologist, 41(10), p. p1114–1122.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 26.37%
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Novick, L. R., & Holyoak, K. J. (1991). Mathematical problem solving by analogy. Journal of experimental psychology: Learning, Memory, and Cognition, 17(3), p. p398–415.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 28.74%
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Reed, S. K., Dempster, A., & Ettinger, M. (1985). Usefulness of analogous solutions for solving algebra word problems. Journal of experimental psychology: Learning, Memory, and Cognition, 11(1), p. p106–125.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 29.29%
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Robinson, K. M., Arbuthnott, K. D., & Gibbons, K. A. (2002). Adults' representations of division facts: A consequence of learning history? Canadian Journal of Experimental Psychology, 56(4), p. p302–309.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 32.85%
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Robinson, K. M., & Ninowski, J. E. (2003). Adults' understanding of inversion concepts: How does performance on addition and subtraction inversion problems compare to performance on multiplication and division inversion problems? Canadian Journal of Experimental Psychology/Revue canadienne de psychologie expérimentale, 57(4), p. p321–330.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 34.22%
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Squire, S., & Bryant, P. (2002). From sharing to dividing: Young children’s understanding of division. Developmental Science, 5(4), p. p452–466.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 32.76%
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Thevenot, C., Barrouillet, P., & Fayol, M. (2004). Représentation mentale et procédures de résolution de problèmes arithmétiques: L'effet du placement de la question. L'année Psychologique, 104(4), p. p683–699.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 32.85%
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Thevenot, C., & Oakhill, J. (2005). The strategic use of alternative representations in arithmetic word problem solving. The Quarterly Journal of Experimental Psychology A: Human Experimental Psychology, 58(7), p. p1311–1323.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 33.67%
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Verschaffel, L., de Corte, E., & Pauwels, A. (1992). Solving compare problems: An eye movement test of lewis and mayer's consistency hypothesis. Journal of educational psychology, 84(1), p. p85–94.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 32.39%
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