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References
Artigue, M. What can we learn from Educational Research at the University Level, this volume, pp.207–220.
Asiala, M., Brown, A., de Vries, D., Dubinsky, E., Mathews, D., and Thomas, K. (1996). A framework for research and curriculum development in undergraduate mathematics education. In J. Kaput, A. Schoenfeld, and E. Dubinsky (Eds.), Research in Collegiate Mathematics Education. II, pp. 1–32. Washington, DC: Conference Board of the Mathematical Sciences.
Ausubel, D. P. (1968). Educational psychology: A cognitive view. New York: Holt. Reinhardt, and Winston.
Brown, J. S. and Burton, R. R. (1978). Diagnostic models for procedural bugs in basic mathematical skills. Cognitive Science, 2, 155–192.
Brousseau, G. (1997). The theory of didactic situations. Dordrecht: Kluwer.
Cohen, J. (1969). On the nature of mathematical proofs. In R. A. Baker (Ed.), A stress analysis of a topless evening gown (pp. 93–99). Garden City, NY: Doubleday.
Douglas. R. G. (Ed.). (1986). Toward a lean and lively calculus. (MAA Notes Number 6). Washington, DC: Mathematical Association of America.
LeCompte, M., Millroy, W., and Preissle, J. (1992). Handbook of Qualitative Research in Education. New York: Academic Press.
Leinhardt, G. (1998). On the messiness of overlapping goals in real settings. Issues in Education, Volume 4, Number 1, 125–132.
Miller, G. (1956). The magic number seven, plus or minus two: some limits on our capacity for processing information. Psychological Review, 63, 81–97.
Schoenfeld, A. H. (Ed.). (1997). Student Assessment in Calculus. (MAA Notes Number 43). Washington, DC: Mathematical Association of America.
Schoenfeld, A. H. (1985). Mathematical problem solving. Orlando, FL: Academic Press.
Schoenfeld, A. H. (1998a). On Theory and models: the case of Teaching-in-Context. Plenary address. In Sarah B. Berenson (Ed.), Proceedings of the XX annual meeting of the International Group for Psychology and Mathematics Education. Raleigh, NC: PME.
Schoenfeld, A. H. (1998b). Toward a theory of teaching-in-context Issues in Education, Volume 4, Number 1, 1–94.
Schoenfeld, A. H. (2000a). Purposes and Methods of Research in Mathematics Education. Notices of the American Mathematical Society, 47(6), 641–649.
Schoenfeld, A. H. (2000b). Models of the teaching process. Journal of Mathematical Behavior, 18 (3), 243–261.
Tall, D. and Vinner, S. (1981). Concept definitions and concept images in mathematics with particular references to limits and continuity. Educational Studies in Mathematics, 12, 151–169.
Tall, D. (Ed.) (1991). Advanced Mathematical Thinking. Dordrecht: Kluwer Academic Publishers.
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Schoenfeld, A.H. (2001). Purposes and Methods of Research in Mathematics Education. In: Holton, D., Artigue, M., Kirchgräber, U., Hillel, J., Niss, M., Schoenfeld, A. (eds) The Teaching and Learning of Mathematics at University Level. New ICMI Study Series, vol 7. Springer, Dordrecht. https://doi.org/10.1007/0-306-47231-7_22
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DOI: https://doi.org/10.1007/0-306-47231-7_22
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