Advanced search
Publication Cover
Culture and Education
Cultura y Educación
Volume 20, 2008 - Issue 4
Journal homepage
48
Views
0
CrossRef citations to date
0
Altmetric
Original Articles

Aprendizaje de las matemáticas y práctica educative

Learning mathematics and educational practice

Josetxu OrrantiaUniversidad de Salamanca
&
Laura RodríguezUniversidad de Salamanca
Pages 381-389 | Received 01 Jul 2008, Accepted 01 Sep 2008, Published online: 23 Jan 2014

Referencias

  • Ashcraft, M. H. (1990). Strategic processing in children's mental arithmetic: A review and proposal. En D. H. Bjorklund (Ed.), Children's Strategies: Contemporary views of cognitive development (pp. 185–212). Hillsdale, NJ: Erlbaum.
  • Ashcraft, M. H. (1992). Cognitive arithmetic: A review of data and theory. Cognition, 44, 75–106.
  • Ashcraft, M. H. (1995). Cognitive psychology and simple arithmetic: A review and summary of new directions. Mathematical Cognition, 1, 3–34.
  • Briars, D. J. & Larkin, J. H. (1984). An integrated model of skill in solving elementary word problems. Cognition and instruction, 1, 245–296.
  • Brown, J. S. & Burton, R. R. (1978). Diagnostic models for procedural bugs in basic mathematical skills. Cognitive Sciences, 2, 155–192.
  • Brown, J. S. & Vanlehn, K. (1982). Towars a generative theory of bugs. En T. Carpenter, J. M. Moser & T. Romberg (Eds.), Addition and subtraction: A cognitive perspective (pp. 117–135). Hillsdale, NJ: Lawrence Erlbaum.
  • Campbell, J. I. D. (1992). The nature and origins of mathematical skills. Amsterdam: Elsevier.
  • Campbell, J. I. D. (2004). Handbook of mathematical cognition. Nueva York: Psychology Press.
  • Carpenter, T. P. & Fennema, E. (1992). Cognitively guided instruction: Building on, the knowledge of students and teachers. International Journal of Educational Research, 17, 457–470.
  • Carpenter, T. P., Fennema, E., Peterson, P. L., Chiang, C. P. & Loef, M. (1989). Using knowledge of children's mathematical thinking in classroom teaching: An experimental program. American Educational Research Journal, 26, 499–532.
  • COGNITION AND TECHNOLOGY GROUP AT VANDERBILT (1997). The Jasper project: Lessons in curriculum, instruction, assessment, and professional development. Mahwah, NJ: Lawrence Erlbaum Associates.
  • Coquin-Viennot, D. & Moreau, S. (2007). Arithmetic problems at School: When there is an apparent contradiction between the situation model and the problem model. British Journal of Educational Psychology, 77, 69–80
  • D'ambrosio, U. (1985). Ethnomathematics and its place in the history and pedagogy of mathematics. For the Learning of Mathematics, 5 (1), 44–48.
  • De corte, E. & Verschaffel, L. (1985). Working with simple word problems in early mathematics instruction. En L. Streefland (Ed.), Proceedings of the Ninth International Conference for the Psychology of Mathematics Education. Vol. 1. Individual contributions (pp. 304- 309). Utrecht: Research Group on Mathematics Education and Educational Computer Center, Subfaculty of Mathematics, University of Utrecht.
  • De corte, E., Greer, B. & Verschaffel, L. (1996). Learning and teaching mathematics. En D. Berliner & R. Calfee (Eds.), Handbook of educational psychology (pp. 491–549). Nueva York: Macmillan.
  • Dehaene, S. (1992). Varieties of numerical abilities. Cognition, 44, 1–42.
  • Fennema, E. & Romberg, T. A. (1999). Mathematics classrooms that promote understanding. Mahwah, NJ: Lawrence Erlbaum Associates.
  • Fuson, K. C. (1992a). Research on Whole number addition and subtraction. En D. A. Grouws (Ed.), Handbook oof research on mathematics teaching and learning (pp. 243–275). Nueva York: Macmillan.
  • Fuson, K. C. (1992b). Relationships between counting and cardinality from age 2 to age 8. En J. Bideaud, C. Meljac & J-P Fischer (Eds.), Pathways to number. Children's Developing numerical abilities (pp. 127–149). Hillsdale, NJ: Erlbaum.
  • Fuson, K. C. & Willis, G. B. (1989). Second graders' use of schematic drawings in solving addition and subtraction word problems. Journal of Educational Psychology, 81, 514–520.
  • Geary, D. C. (1994). Children's mathematical development. Washington, DC: American Psychological Association.
  • Greeno, J. G., Collins, A. M. & Resnick, L. B. (1996). Cognition and learning. En D. C. Berliner & R. C. Calfee (Eds.), Handbook of educational psychology (pp. 15–46). Nueva York, NY: Macmillan.
  • Groen, G. J. & Parkman, J. M. (1972). A chronometic analysis of simple addition. Psychological Review, 79, 323–343.
  • Hegarty, M., Mayer, R. E. & Monk, C. A. (1995). Comprehension of arithmetic word problems: A comparison of successful and unsuccessful problem solvers. Journal of Educational Psychology, 87, 18–32.
  • Kintsch, W. (1988). The role of knowledge in discourse comprehension: A construction-integration model. Psychological Review, 95, 163–182.
  • Kintsch, W. (1998). Comprehension: A paradigm for cognition. Cambridge: Cambridge University Press.
  • Kintsch, W. & Greeno, J. (1985). Understanding and solving word arithmetic problem. Psychological Review, 92, 109–129.
  • Lesh, R. & Doerr, H. M. (Eds.) (2003). Beyond constructivism. Models and modeling perspective on mathematical problem solving, learning and teaching. Mahwah, NJ: Erlbaum.
  • Littlefield, J. & Rieser, J. J. (1993). Semantic features of similarity and children's strategies for identification of relevant information in mathematical story problems. Cognition and Instruction, 11, 133–188.
  • Moreau, S. & Coquin-Viennot, D. (2003). Comprehension of arithmetic word problems by fifth-grade pupils: representations and selection of information. British Journal of Educational Psychology, 73, 109–121
  • Nesher, P. & Teubal, E. (1975). Verbal Cues as an Interfering Factor in Verbal Problem Solving. Educational Studies in Mathematics, 6, 41–51.
  • Orrantia, J. (2003). El rol del conocimiento conceptual en la resolución de problemas aritméticos con estructura aditiva. Infancia y Aprendizaje, 26, 451–468.
  • Orrantia, J. (2005). Diferencias individuales en aritmética cognitiva. Influencia de los procesos de recuperación de hechos. Cognitiva, 17, 71–84.
  • Orrantia, J., González, L. B. & Vicente, S. (2005). Un análisis de los problemas aritméticos en los libros de texto de Educación Primaria. Infancia y Aprendizaje, 28, 429–451.
  • Orrantia, J., Martínez, J., Morán, M. C. & Fernández, J. C. (2002). Dificultades en el aprendizaje de la aritmética: Un análisis desde los modelos cronométricos. Cognitiva, 14, 183–201.
  • Orrantia, J., Morán, M. C., Gracia, A. D. & González, L. (1995). ¡Tenemos un problema…! Propuesta de un programa para enseñar a resolver problemas de matemáticas. Comunicación, Lenguaje & Educación, 28, 15–28.
  • Rathmell, E. C. (1986). Helping children learn to solve story problems. En A. Zollman, W. Speer & J. Meyer (Eds.), The fifth mathematics methods conference papers (pp. 101–109). Bowling Green, Ohio: Bowling Green State University.
  • Reusser, K. (1990). From text to situation to equation: Cognitive simulation of understanding and solving mathematical word problems. En H. Mandl, E. De corte, N. Bennett & H. F. Friedrich (Eds.), Learning and Instruction (Vol. 2, pp. 477–498). Oxford: Pergamon.
  • Riley, M. S. & Greeno, J. G. (1988). Developmental analysis of understanding language about quantities and solving problems. Cognition and instruction, 5, 49–101.
  • Riley, N. S., Greeno, J. & Heller, J. I. (1983). Development of children's problem solving ability in aritmetic. En H. P. Ginsburg (Ed.), The development of mathematical thinking (pp. 153–196). Nueva York: Academic Press.
  • Robitaille, D. F. & Travers, K. J. (1992). International studies of achievement in mathematics teaching and learning. En D. A. Grouws (Ed.), Handbook of research on mathematics teaching and learning (pp. 687–702). Nueva York: Macmillan.
  • Sánchez, E. (2001). Ayudando a ayudar. El reto de la investigación educativa. Cultura & Educación, 13, 249–266.
  • Sánchez, E. & Rosales, J. (2005). La práctica educativa. Una revisión a partir del estudio de la interacción profesor-alumnos en el aula. Cultura & Educación, 17 (2), 147–173.
  • Sánchez, E. Rosales, J. & Suárez, S. (1999). Interacción profesor/alumnos y comprensión de textos. Qué se hace y qué se puede hacer. Cultura & Educación, 15, 71–89.
  • Sowder, L. (1988). Children's solutions of story problems. Journal of Mathematical Behavior, 7, 227–238.
  • Thevenot, C., Devidal, M., Barrouillet, P. & Fayol, M. (2007). Why does placing the question before an arithmetic word problem improve performance? A situation model account. The Quartely Journal of Experimental Psychology, 60, 43–56.
  • Vanlehn, K. (1990). Mind bugs: The origins of procedural misconceptions. Cambridge, MA: MIT Press.
  • Vergnaud, G. (1982). A classification of cognitive tasks and operations of thought involved in addition and substration problem. En T. P. Carpenter, J. M. Moser, & T. A. Romberg (Eds.), Adition and subtraction: A cognitive perspective (pp. 39–59). Hillsdale, NJ: Erlbaum.
  • Verschaffel, L. & De corte, E. (1997). World problems: a vehicle for promoting authentic mathematical understanding and problem solving in the primary school. En T. Nunes & P. Bryant (Eds.), Learning and teaching mathematics. An international perspective (pp. 69–97). Hove: Psychology Press.
  • Verschaffel, L., De corte, E. & Borghart, I. (1997). Pre-service teachers' conceptions and beliefs about the role of real-world knowledge in mathematical modelling of school word problems. Learning and Instruction, 4, 339–359.
  • Verschaffel, L., De corte, E. & Pauwels, A. (1992). Solving compare problems: An eye movement test of Lewin and Mayers's consistency hypothesis. Journal of Educational Psychology, 94, 85–94.
  • Verschaffel, L., De corte, E. & Lasure, S. (1994). Realistic considerations in mathematical modelling of school arithmetic word problems. Learning and Instruction, 4, 273–294.
  • Verschaffel, L., De corte, E., Lasure, S., Van vaerenbergh, G., Bogaerts, H. & Ratinckx, E. (1999). Design and evaluation of a learning environment for mathematical modeling and problem solving in upper elementary school children. Mathematical Thinking and Learning, 1, 195–229.
  • Verschaffel, L., Greer, B. & De corte, E. (2007). Whole number concepts and operations. En F. K. Lester (Ed.), Second handbook of research on mathematics teaching and learning (pp. 557–628). Reston, VA: NCTM
  • Vicente, S. & Orrantia, J. (2007). Resolución de problemas y comprensión situacional. Cultura & Educación, 19 (1), 61–85.
  • Vicente, S., Orrantia, J. & Verschaffel, L. (2007). Influence of situational and conceptual rewording on word problem solving. British Journal of Educational Psychology, 77 (4), 829–840.
  • Wolters, M. A. D. (1983). The part-whole schema and arithmetical problems. Educational Studies in Mathematics, 14, 127–138.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.