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Anghileri, J. (2001). A study of progression in written calculation strategies for division. Support for Learning, 16(1), pp. 17–22.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 36.31%
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Arsenault, C., & Lemoyne, G. (2000). Une introduction non classique aux algorithmes d'addition et de soustraction (a non-classical introduction to algorithms of addition and subtraction). Educational Studies in Mathematics, 42(3), pp. 269–296.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 34.12%
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Babbitt, B. C., & Miller, S. P. (1996). Using hypermedia to improve the mathematics problem-solving skills of students with learning disabilities. Journal of learning disabilities, 29(4), p. p391–401.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 36.59%
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Bassok, M., Chase, V. M., & Martin, S. A. (1998). Adding apples and oranges: Alignment of semantic and formal knowledge. cognitive psychology, 35(2), p. p99–134.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 36.22%
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Bernardo, A. B. I., & Okagaki, L. (1994). Roles of symbolic knowledge and problem-information context in solving word problems. Journal of educational psychology, 86(2), p. p212–220.
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Ajoutée par: Lynda Taabane
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Pop. 33.94%
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Blankenberger, S., & Vorberg, D. (1997). The single-format assumption in arithmetic fact retrieval. Journal of experimental psychology: Learning, Memory, and Cognition, 23(3), p. p721–738.
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Ajoutée par: Lynda Taabane
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Pop. 36.13%
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Blöte, A. W., Van der Burg, E., & Klein, A. S. (2001). Students' flexibility in solving two-digit addition and subtraction problems: Instruction effects. Journal of educational psychology, 93(3), p. p627–638.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 32.94%
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Bonotto, C. (2005). How informal out-of-school mathematics can help students make sense of formal in-school mathematics: The case of multiplying by decimal numbers. mathematical thinking and learning, 7(4), p. p313–344.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 32.39%
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Brissiaud, R. (1994). Teaching and development : solving "missing addend” problems using substraction. Learning and development: contributions from Vygotsky. European Journal of Psychology of Education, 9(4), pp. 243–265.
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Dernièrement modifiée par: Jean-François Richard
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Pop. 41.33%
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Brissiaud, R. (2000). Apprendre l'arithmétique élémentaire: Les cas de concordance / discordance entre la représentation initiale d'un problème et l'économie de sa résolution numérique. Journées Internationales d'Orsay de Sciences Cognitives (JIOSC 2000): L'Apprentissage. Une Approche transdisciplinaire, Orsay . pp. 105–110.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 48.27%
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Brissiaud, R. (2002). Psychologie et didactique : choisir des problèmes qui favorisent la conceptualisation des opérations arithmétiques. In J. Bideaud & H. Lehalle (Eds.), Traité des Sciences Cognitives - Le développement des activités numériques chez l'enfant (pp. 265–291). Paris: Hermès.
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Ajoutée par: Lynda Taabane
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Pop. 43.16%
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Brissiaud, R., & Sander, E. (2004). Conceptualisation arithmétique, résolution de problèmes et enseignement des opérations arithmétiques à l'école : une étude longitudinale au ce1. Les processus de conceptualisation en débat : Hommage à Gérard Vergnaud (Clichy La Garenne), pp. 33–46.
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Ajoutée par: Sterenn Audo
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Pop. 37.5%
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Bruno, A., & Martinon, A. (1999). The teaching of numerical extensions: The case of negative numbers. International Journal of Mathematical Education in Science and Technology, 30(6), pp. 789–809.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 31.48%
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Bryant, P., Christie, C., & Rendu, A. (1999). Children's understanding of the relation between addition and subtraction: Inversion, identity, and decomposition. Journal of Experimental Child Psychology, 74(3), p. p194–212.
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Ajoutée par: Lynda Taabane
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Pop. 34.4%
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Campbell, J. I. D., & Xue, Q. (2001). Cognitive arithmetic across cultures. Journal of Experimental Psychology: General, 130(2), p. p299–315.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 34.4%
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Canobi, K. H., Reeve, R. A., & Pattison, P. E. (1998). The role of conceptual understanding in children's addition problem solving. Developmental Psychology, 34(5), pp. 882–891.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 30.47%
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Canobi, K. H., Reeve, R. A., & Pattison, P. E. (2002). Young children's understanding of addition concepts. Educational Psychology: An International Journal of Experimental Educational Psychology, 22(5), pp. 513–532.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 31.3%
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Canobi, K. H., Reeve, R. A., & Pattison, P. E. (2003). Patterns of knowledge in children's addition. Developmental Psychology, 39(3), p. p521–534.
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Dernièrement modifiée par: Lynda Taabane
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Pop. 37.5%
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Carpenter, T. P., & Moser, J. M. (1982). The development of addition and substraction problem-solving skills. In T. P. Carpenter, J. M. Moser & T. A. Romberg (Eds.), Addition and substraction : A cognitive perspective (pp. 9–24). Hillsdale, NJ: Erlbaum.
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Ajoutée par: Sterenn Audo
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Pop. 28.38%
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Case, L. P., & Others, A. (1992). Improving the mathematical problem-solving skills of students with learning disabilities: Self-regulated strategy development. Journal of Special Education, 26(1), pp. 1–19.
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Dernièrement modifiée par: Sterenn Audo
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Pop. 30.57%
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