참고문헌
- Ministry of Education (2022). Mathematics curriculum (# 2022-33 supplement 8). Ministry of Education.
- Kim, D. G. (2012). Comparison of the development and composition of the [Property of Square] unit in the second year of middle school. Master's thesis, Ajou university.
- Kim, H-J., & Kang, W. (2008). An analysis on the teaching quadrilaterals in the elementary school mathematics textbooks. Education of Primary School Mathematics, 11(2), 141-159.
- Noh, Y-A., & Ahn, B-G. (2007). An analysis on error of fourth grade student in geometric domain. Journal of Elementary Mathematics Education in Korea, 11(2), 199-216.
- Noh, J. W., Lee, K-H., & Moon, S-J. (2019). Case study on the learning of the properties of quadrilaterals through semiotic mediation: Focusing on reasoning about the relationships between the properties. School Mathematics, 21(1), 197-214. https://doi.org/10.29275/sm.2019.03.21.1.197
- Moon, K. Y. (2016). An analysis of elementary students' concept image. Master's thesis, Seoul National University of Education.
- Park, J. H. (2017). An analysis on conjecturing tasks in elementary school mathematics textbook: Focusing on definitions and properties of quadrilaterals. The Journal of Educational Research in Mathematics, 27(3), 491-510.
- Shin, Y. J. (2017). An analysis of concept images of quadrilaterals of second-year elementary students. Master's thesis, Gyeongin National University of Education.
- Lim, J. Y. (2017). An analysis of the examples of triangles and quadrangles generated by elementary school mathematics textbooks, teachers, and students. Master's thesis, Seoul National University of Education.
- Yoon, M. J. (2012). An action research on rectangle teaching for 8th grade students. Master's thesis, Korea National University of Education Chung-Buk.
- Yi, G., & Choi, Y. (2016). A Study on the word 'is' in a sentence "A parallelogram is trapezoid." School Mathematics, 18(3), 527-539.
- Lee, C. H., & Whang, W. Y. (2010). A Study of the syllabus based on van Hiele theory using GSP in middle school geometry: Focused on the 2st grade middle school students. The mathematical Education, 49(1), 85-109.
- Chang, H. S., Kim, M. C., & Lee, B-J. (2022). An analysis on concept definition and concept image on quadrangle of middle and high school students. The Mathematical Education, 61(2), 323-338. http://doi.org/10.7468/mathedu.2022.61.2.323
- Choi, K. (2017). A design of teaching units for experiencing mathematising of elementary gifted students: Inquiry into the isoperimetric problem of triangle and quadrilateral. The Mathematical Education, 31(2), 223-239. https://doi.org/10.7468/jksmee.2017.31.2.223
- Choi, S. I., & Kim, S. J. (2012). A study on defining and naming of the figures in the elementary mathematics - Focusing to 4th grade geometric domains. Journal of the Korean School Mathematics Society, 15(4), 719-745.
- Atanasova-Pachemska, T., Gunova, V., Koceva Lazarova, L., & Pachemska, S. (2016). Visualization of the geometry problems in primary math education: needs and changes. Istrazivanje Matematickog Obrazovanja, 8(15), 33-37. https://bit.ly/3rR3BnQ
- Clements, D., & Battista, M. (1992). Geometry and spatial reasoning. In D. A. Grouws (Ed.), Handbook on mathematics teaching and learning (pp. 420-464), New York: Macmillan.
- Clements, D., Swaminathan, S., Hannibal, M., & Sarama, J. (1999). Young children's concepts of shape. Journal for Research in Mathematics Education, 30(2), 192-212.
- Davey, G., & Pegg, J. (1988). Research in geometry and measurement. In Research in mathematical education in Australasia, 1991, pp. 231-247.
- Denis, M. (1989). Les images mentales (Terauchi, R. Trans.). Tokyo: Keisosyobo (In Japanese).
- Fischbein, E. (2001). Tacit models and infinity. Educational Studies in Mathematics, 48, 309-329. https://doi.org/10.1023/A:1016088708705
- Fujita, T. (2012). Learners' level of understanding of the inclusion relations of quadrilaterals and prototype phenomenon. The Journal of Mathematical Behavior, 31, 60-72. https://doi.org/10.1016/j.jmathb.2011.08.003
- Gutierrez, A., Jaime, A., & Fortuny, J. M. (1991). An alternative paradigm to evaluate the acquisition of the van Hiele levels. Journal for Research in Mathematics Education, 22(3), 237-251.
- Guven, B., & Okumus, S. (2011). 8th grade Turkish students' van Hiele levels and classification of quadrilaterals. In Proceedings of the 35th conference of the international group for the psychology of mathematics education (Vol. 2, pp. 473-480). Ankara, Turkey: PME.
- Hershkowitz, R. (1989). Visualization in geometry: Two sides of the coin. Focus on Learning Problems in Mathematics, 11(1), 61-76.
- Lehrer, R., Jenkins, M., & Osana, H. (1998). Longitudinal study in children's reasoning about space and geometry. In R. Lehrer, & D. Chazan (Eds.), Designing learning environments for developing understanding of geometry and space (pp. 351-67), Mahwah, NJ: Lawrence Erlbaum Associates.
- Lipovec, A., & Podgorsek, M. (2016). Risba kot orodje za vpogled v matematicno razumevanje [Drawing as a tool for 25, mathematical understanding]. Psiholoska Obzorja, 25, 156-166. https://doi.org/10.20419/2016.25.452
- Lowrie, T., & Clements, M. A. (2001). Visual and non-visual processes in grade 6 students' mathematical problem solving. Journal of Research in Childhood Education, 16, 77-93. https://doi.org/10.1080/02568540109594976
- Matsuo, N. (1999). Understanding relations among concepts of geometric figures: Identifing states of understanding. Journal of Science Education in Japan, 23(4), 271-282. https://doi.org/10.14935/jssej.23.271
- Matsuo, N. (2000). States of understanding relations among concepts of geometric figures: Considered from the aspect of concept image and concept definition. In T. Nakahara, & M. Koyama (Eds.), Proceedings of the 24th conference of the international group for the psychology of mathematics education (Vol. 3, pp. 271-278). Hiroshima, Japan: PME.
- Matsuo, N. (2007). Differences of students' understanding of geometric figures based on their definitions. In Proceedings of the 24th conference of the international group for the psychology of mathematics education (Vol. 1, p. 264). PME.
- National Council of Teachers of Mathematics (2007). 학교 수학의 원리와 규준(류희찬, 조완영, 이경화, 나귀수, 김남균, 방정숙 역). 서울: 경문사 (원저 2000년 출판).
- Okazaki, M., & Fujita, T. (2007). Prototype phenomena and common cognitive paths in the understanding of the inclusion relations between quadrilaterals in Japan and Scotland. In Proceedings of the 31st conference of the international group for the psychology of mathematics education (Vol. 4, pp. 41-48). PME.
- Okazaki, M. (2009). Process and means of reinterpreting tacit properties in understanding the inclusion relations between quadrilaterals. In Proceedings of the 33th conference of the international group for the psychology of mathematics education (Vol. 4, pp. 249-236). PME.
- Pegg, J., & Baker, P. (1999). An exploration of the interface between van Hiele's level 1 and 2. In O. Zaslaysky (Ed.), Proceedings of the 23rd international group for the psychology of mathematics education (Vol. 4, pp. 25-32). Haifa: PME.
- Presmeg, N. C. (1997). Generalization using imagery. In L. D. English (Ed.), Mathematical reasoning: Analogies, metaphors, and images (pp. 299-312). Mahwah, NJ: Lawrence Erlbaum Associates.
- Presmeg, N. (2014). Contemplating visualization as an epistemological learning tool in mathematics. ZDM, 46, 151-157. https://doi.org/10.1007/s11858-013-0561-z
- Rosch, E., & Mervis, C. (1975). Family resemblances: studies in the internal structures of categories. Cognitive Psychology, 7, 573-605. https://doi.org/10.1016/0010-0285(75)90024-9
- Shimonaka, H. (1983). The encyclopedia of philosophy. Tokyo: Heibonsya. (In Japanese)
- Silfverberg, H., & Matsuo, N. (2008). Comparing Japanese and Finnish 6th and 8th graders' ways to apply and construct definitions. In Proceedings of the 32nd conference of international group for the psychology of mathematics education (Vol. 4, pp. 257-264). PME.
- Sinclair, N., & Yurita, V. (2008). To be or to become: How dynamic geometry changes discourse. Research in Mathematics Education, 10(2), 135-150. https://doi.org/10.1080/14794800802233670
- Sinclair, N., & Moss, J. (2012). The more it changes, the more it becomes the same: the development of the routine of shape identification in dynamic geometry environment. International Journal of Educational Research, 51-52, 28-44. http://dx.doi.org/10.1016/j.ijer.2011.12.009
- Sinclair, N., Bartolini Bussi, M. G., de Villiers, M. et al. (2016). Recent research on geometry education: An ICME-13 survey team report. ZDM Mathematics Education 48, 691-719. https://doi.org/10.1007/s11858-016-0796-6
- Van Hiele, P. M. (1985). The child's thought and geometry. In D. Geddes, & R. Tischler (Eds.), English translation of selected writings of Dina van Hiele-Geldof and Pierre M. van Hiele (pp. 243-252). Brooklyn: Brooklyn College, School of Education (Original work published 1959).
- Vinner, S., & Hershkowitz, R. (1980). Concept images and common cognitive paths in the development of some simple geometrical concepts. In R. Karplu (Ed.), Proceedings of the fourth international conference for the psychology of mathematics education (pp. 177-184), Berkeley, CA: Lawrence Hall of Science, University of California.
- Vinner, S., & Dreyfus, T. (1989). Images and definitions for the concept of function. Journal for Research in Mathematics Education, 20(4), 356-366.
- Walcott, C., Mohr, D., & Kastberg, S. E. (2009). Making sense of shape: An analysis of children's written responses. The Journal of Mathematical Behavior, 28(1), 30-40. https://doi.org/10.1016/j.jmathb.2009.04.001
- Wang, S., & Kinzel, M. (2014). How do they know it is a parallelogram? Analysing geometric discourse at van Hiele Level 3. Research in Mathematics Education, 16(3), 288-305. https://doi.org/10.1080/14794802.2014.933711
- Wheatley, G. H. (1997). Reasoning with images in mathematical activity. In L. D. English (Ed.), Mathematical reasoning: Analogies, metaphors, and images (pp. 281-298). Mahwah, NJ: Lawrence Erlbaum Associates.
- Wilson, P. S. (1990). Inconsistent ideas related to definitions and examples. Focus on Learning Problems in Mathematics, 12(3-4), 31-47.
- Zakelj, A., & Klancar, A. (2022). The role of visual representations in geometry learning. European Journal of Educational Research, 11(3), 1393-1411. https://doi.org/10.12973/eu-jer.11.3.1393