References
- Heiede T. History of mathematics and the teacher. In: Calinger R, editor. Vita mathematica. Washington, DC: The Mathematical Association of America; 1996. p. 231–243.
- Fauvel J, Maanen J. The role of the history of mathematics in the teaching and learning of mathematics: discussion document of an ICMI study. Math Sch. 1997;26(3):10--11.
- Bakker A, Gravemeijer K. A historical phenomenology of mean and median. Educ Stud Math. 2006;62(2):149–168.
- Thomaidis Y, Tzanakis C. Historical evolution and students’ conception of the order relation on the number line: the notion of historical “parallelism” revisited. Educ Stud Math. 2007;66(2):165–183.
- Tzanakis C, Arcavi A. Integrating history of mathematics in the classroom: an analytic survey. In: Fauvel J, van Maanen J, editors. History in mathematics education. An ICMI study. Dordrecht: Kluwer; 2000. p. 201–240.
- Radford L, Boero P, Vasco C. Epistemological assumptions framing interpretations of students’ understanding of mathematics. In: Fauvel J, van Maanen J, editors. History in mathematics education. Dordrecht: Kluwer; 2000. p. 162–167.
- Panaoura A, Elia I, Gagatsis A, Giatilis GP. Geometrical and algebraic approaches in the concept of complex numbers. Int J Math Educ Sci Technol. 2006;17(6):681–706.
- Radford L. On psychology, historical epistemology, and teaching of mathematics: towards a socio-cultural history of mathematics. Learn Math. 1997;17(1):26–33.
- Brousseau G. Theory of didactical situations in mathematics. In: Balacheff N, Cooper M, Sutherland R, Warfielf V, editors. Mathematics education library. Vol. 19. Dordrercht: Kluwer; 1997.
- Cornu B. Limits. In: Tall D, editor. Advanced mathematical thinking. Dordrecht: Kluwer; 1991. p. 153--166.
- Gagatsis A, Thomaidis Y. Eine Studie zur historischen Entwicklung und didaktischen Transposition des Begriffs absoluter Betrag [A study of a historical design, development and didactic transposition of the term “absolute value”].Journal fur Mathematik – Didaktik, 1995;16:3–46.
- Smith DE. A source book in Mathematics. New York: McGraw-Hill; 1959.
- Lagrange JL. Sur la solution des problèmes indéterminés du second degré. Ouevres. 1768;2:377–535.
- Lagrange JL. ELements of Algebra. London: Longman, Orme and Co; 1840.
- Hankel H. Theorie der Complexen Zahlensysteme. Leibzig: Leopold Voss; 1867.
- Cauchy AL. Cours d'Analyse. lre partie: Analyse Algebrique. Paris: Gauthier-Villars; 1897.
- Weierstrass K. Zur Theorie der Potenzreihen. Mathema-tische Werke. 1894;1:67--74.
- Gelman E, Kholodnaya M. The role of ways of information coding in students’ intellectual development. In: Novotna J, editor. Proceedings of the 2nd European Conference for Mathematics Education. Prague; 2001. p. 38–48
- Vinner S. The role of definitions in the teaching and learning of mathematics. In: Tall D, editor. Advanced mathematical thinking. Dordrercht: Kluwer; 1991. p. 65–81.
- Almog N, Hany B. Absolute value in equalities: high school students’ solutions and misconception. Educ Stud Math. 2012;81(3):346–364.
- Stupel M. A special application of absolute value techniques in authentic problem solving. Int J Math Educ Sci Technol. 2012:1–9.
- Gray E, Pinot M, Pitta D, Tall D. Knowledge construction and diverging thinking in elementary and advanced mathematics. Educ Stud Math. 1999;38:111–133.
- Sfard A. On the dual nature of mathematical conceptions: reflections on process and objects on different sides of the same coin. Educ Stud Math. 1992;22:1–36.
- Sierpinska A. On understanding the notion of function. In: Dubinsky E, Harel G, editors. The concept of function: aspects of epistemology and pedagogy. Washington, DC: The Mathematical Association of America; 1992. p. 25–28.
- Bodin A, Coutourier R, Gras R. CHIC: classification Hiérarchique implicative et Cohésive-version sous windows – CHIC 1.2. Rennes: Association pour la Recherche en Didactique des Mathématiques; 2000.
- Gras R. L’implication statistique. Collection associée a recherches en didactique de mathématiques. Grenoble: La Pensée Sauvage; 1996.
- Sfard, A. The development of algebra: confronting historical and psychological perspectives. J Math Behav. 1995;14:15–39.
- Duroux A. La valeur absolue. Difficultés majeures pour une notion mineure. Petit. 1983;10(3):43–67.
- Reusser K, Stebler R. Every word problem has a solution – the social rationality of mathematical modelling in schools. Learn Instr. 1997;7(4):309–327.
- Tall D, Gray EM, Bin Ali M, Crowley L, DeMarois P, McGowen M, Pitta D, Pinto M, Thomas M, Yusof Y. Symbols and the Bifurcation between procedural and conceptual thinking. Can J Math Sci Technol Educ. 2000;1(1):81–104.
- Hiebert J, Lefevre P. Conceptual and procedural knowledge in mathematics: an introductory analysis. In: Hiebert J, editor. Conceptual and procedural knowledge: the case of mathematics. Hillsdale, NJ: Erlbaum; 1986.
- Star JR. Reconceptualizing procedural knowledge. J Res Math Educ. 2005;36:404–411.
- Baroody A, Feil Y, Johnson A. An alternative reconceptualization of procedural and conceptual knowledge. J Res Math Educ. 2007;38(2):115–131.