Personal, Nonlocal, Tacit: On Mathematical Knowledge in Teaching
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Barton, B., & Paterson, J. (2013). Does mathematics enhance teaching? Does summer hiking tone winter thighs? Canadian Journal of Science, Mathematics and Technology Education, 13(2), 198-212.
Chick, H., & Stacey, K. (2013): Teachers of Mathematics as Problem-Solving Applied Mathematicians, Canadian Journal of Science, Mathematics and Technology Education, 13(2), 121-136.
Cooper, J., & Pinto, A. (2017). Mathematical and pedagogical perspectives on warranting: approximating the root of 18. For the Learning of Mathematics, 37(2), 8-13.
Even, R. (2011). The relevance of advanced mathematics studies to expertise in secondary school mathematics teaching: Practitioners’ views. ZDM - Mathematics Education, 43(6–7), 941–950.
Glen, L., & Zazkis, R. (2020). On linear functions and their graphs: Refining the Cartesian connection. International Journal of Science and Mathematics Education. https://doi.org/10.1007/s10763-020-10113-6.
Hurst, C. (2017). Provoking contingent moments: Knowledge for ‘powerful teaching’ at the horizon. Educational Research, 59(1), 107-123.
Mamolo, A., & Pali, R. (2014). Factors influencing prospective teachers’ recommendations to students: Horizons, hexagons, and heed. Mathematical Thinking and Learning, 16(1), 32-50.
Marmur, O., Yan, K., & Zazkis, R. (2020). Fraction images: The case of six and a half. Research in Mathematics Education, 22(1), 22-47.
Mason, J., & Davis, B. (2013). The importance of teachers’ mathematical awareness for in-the-moment pedagogy. Canadian Journal of Science, Mathematics and Technology Education, 13(2), 182-197.
Papert, S. (1980). Mindstorms: Children, computers and powerful ideas. Basic Books
Rowland, T., & Zazkis, R. (2013). Contingency in the mathematics classroom: Opportunities taken and opportunities missed. Canadian Journal of Science, Mathematics and Technology Education, 13(2), 137-153.
Rowland, T., Thwaites, A., & Jared, L. (2011). Triggers of contingency in mathematics teaching. In B. Ubuz (Ed.), Proceedings of the 35th conference of the International Group for the Psychology of Mathematics Education (Vol. 4, pp. 73–80). Ankara, Turkey: International Group for the Psychology of Mathematics Education.
Wasserman, N. (2016) Nonlocal mathematical knowledge for teaching. In Csíkos, C., Rausch, A. & Szitányi, J. (Eds.). Proceedings of the 40th Conference of the International Group for the Psychology of Mathematics Education, Vol. 4, pp. 379–386. Szeged, HU: PME.
Wasserman, N. H. (2018). Knowledge of nonlocal mathematics for teaching. The Journal of Mathematical Behavior, 49, 116-128.
Watson, A., & Chick, H. (2013). Introduction to the Special Issue on Personal Mathematical Knowledge in the Work of Teaching. Canadian Journal of Science, Mathematics and Technology Education, 13(2), 111-120.
Watson, A., & Harel, G. (2013). The role of teachers’ knowledge of functions in their teaching: A conceptual approach with illustrations from two cases. Canadian Journal of Science, Mathematics and Technology Education, 13(2), 154-168.
Yan, K., Marmur, O., & Zazkis, R. (2020). Calculus for teachers: Perspectives and considerations of mathematicians. Canadian Journal of Science, Mathematics, and Technology Education, 20(2), 355–37.
Zazkis, R. (2017). Order of operations: On conventions, mnemonics and knowledge-in-use. For the Learning of Mathematics, 37(3), 18-20.
Zazkis, R. & Leikin, R. (2010). Advanced mathematical knowledge in teaching practice: Perceptions of secondary mathematics teachers. Mathematical Thinking and Learning, 12(4), 263-281.
Zazkis, R. & Mamolo, A. (2011). Reconceptualising knowledge at the mathematical horizon. For the Learning of Mathematics, 31(2), 8-13.