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Studies in Psychology
Estudios de Psicología
Volume 15, 1994 - Issue 51
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Original Articles

Competencia conceptual y de procedimiento: comprensión de la propiedad conmutativa de la adición y estrategias de solución

Conceptual and proceeding competence: Comprehension of the commutative property of addition and solving strategies

Vicente BermejoUniversidad. Complutense de Madrid;E. U. de Profesorado de EGB de Segovia
&
Purificación RodríguezUniversidad. Complutense de Madrid;E. U. de Profesorado de EGB de Segovia
Pages 3-21 | Published online: 23 Jan 2014

Referencias

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  • Baroody, A. J., y Ginsburg, H. P. (1986). The relationships between initial meaningful and mechanical knowledge of arithmetic. En J. Hiebert (Ed.), Conceptual and procedural knowledge: The case of mathematics (pp. 75–112). Hillsdale, NJ: LEA.
  • Baroody, A. J.; Ginsburg, H. P., y Waxman, B. (1983). Children's use of mathematical structure. Journal for Research in Mathematics Education, 14, 156–168.
  • Behr, M.; Erlwanger, S., y Nichols, E. (1976). How children view equality sentences (PMDC Technical Report N.o 3). Tallahassee: Florida State University. Citado por Kieran, C. 1981).
  • Bermejo, V. (1990). El niño y la aritmética. Barcelona: Paidós.
  • Bermejo, V., y Rodríguez, P. (1987). Estructura semántica y estrategias infantiles en la solución de problemas verbales de adición. Infancia y Aprendizaje, 39–40 71–81.
  • Bermejo, V., y Rodríguez, P. (en prensa). Conceptualización de la operación aditiva y estrategias de solución. Investigaciones Psicológicas.
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  • Briars, D. J., y Larkin, J. H. (1984). An integrated model of skills in solving elementary word problems. Cognition and Instruction, 1 245–296.
  • Carpenter, T. P. (1986). Conceptual knowledge as a foundation for procedural knowledge: implications from research on the initial learning of arithmetic. En J. Hiebert (Ed.), Conceptual and procedural knowledge: The case of mathematics (pp. 113–132). Hillsdale, NJ: LEA.
  • Carpenter, T. P., y Moser, J. M. (1982). The development of addition and subtraction problem-solving skills. En T. P. Carpenter, J. M. Moser y T. Romberg (Eds.), Addition and subtraction: A cognitive perspective (pp. 9–24). Hillsdale, NJ: LEA.
  • Carpenter, T. P., y Moser, J. M. (1984). The acquisition of addition and subtraction concepts in grades one through three. Journal of Research in Mathematics Education, 15, 179–202.
  • Greeno, J. G.; Riley, M. S., y Gelman, R. (1984). Conceptual competence and children's counting. Cognitive Psychology, 16, 94–143.
  • Hiebert, J., y Lefevre, P. (1986). Conceptual an procedural knowledge in mathematics: An introductory analysis. En J. Hiebert (Ed.), Conceptual and procedural knowledge: The case of mathematics (pp. 129). Hillsdale, NJ: LEA.
  • Kieran, C. (1981). Concepts associated with the equality symbol. Educational Studies in Mathematics, 12, 317–325.
  • Miller, K.; Keating, D., y Perlmutter, M. (1984). Cognitive arithmetic: Comparison of operations. Journal of Experimental Psychology: Learning, memory, and cognition, 10, 46–60.
  • Resnick, L. B. (1983). A developmental theory of number understanding. En H. Ginsburg (comp.), The development of mathematical thinking (pp. 136–155), Nueva York, Academic Press.
  • Resnick, L. B., y Neches, R. (1984). Factors affecting individual differences in learning ability. En R. J. Sternberg (Ed.), Advances in the psychology of human intelligence (pp. 275–323). Hillsdale, NJ: LEA.
  • Riley, M. S.; Greeno, J. G., y Heller, J. I. (1983). Development of children's problem-solving ability in arithmetic. En H. Ginsburg (Ed.), The development of mathematical thinking (pp. 153–196). Nueva York: Academic Press.
  • Rodríguez, P. (en prensa). Análisis de los procesos cognitivos que conducen a la adquisición d la propiedad conmutativa. Madrid: Universidad Complutense.
  • Silver, E. A. (1986). Using conceptual and procedural knowledge: A focus on relationships. En J. Hiebert (Ed.), Conceptual and procedural knowledge: The case of mathematics (pp. 181–198). Hillsdale, NJ: LEA.
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  • Weaver, J. F (1982). Interpretations of number operations and symbolic representations of addition and subtraction. En T. Carpenter, J. Moser y T. Romberg (Eds.), Addition and subtraction: A cognitive perspective (pp. 60–66). Hillsdale, NJ: LEA.

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