References
- Academy of Inquiry-Based Learning. http://www.inquirybasedlearning.org/. Accessed May 2016.
- Askew, M., M. Brown, V. Rhodes, D. Johnson, and D. Wiliam. 1997. Effective Teachers of Numeracy. London, UK: Kings College.
- Chalice, D. R. 1995. How to teach a class by the modified Moore method. American Mathematical Monthly. 102: 317–321.
- Discovering the Art of Mathematics. www.artofmathematics.org. Accessed May 2016.
- Discovering the Art of Mathematics Blog. Making mistakes. www.artofmathematics.org/blogs/cvonrenesse/making-mistakes. Accessed May 2016.
- Discovering the Art of Mathematics Blog. Strategies for grouping students. https://www.artofmathematics.org/blogs/cvonrenesse/strategies-for-grouping-students. Accessed May 2016.
- Freeman, S., S. L. Eddy, M. McDonough, M. K. Smith, O. Okoroafor, H. Jordt, and M. P. Wenderoth. 2014. Active learning increases student performance in science, engineering, and mathematics. Proceedings of the National Academy of Sciences of the United States of America. 111: 8410–8415. http://www.pnas.org/content/111/23/8410.full
- Gagne, R. M. 1962. The acquisition of knowledge. Psychological Review. 69(4): 355–365.
- Greene, M. and P. Shorter. Inquiry materials for calculus I and II. www.iblcalculus.com. Accessed May 2016.
- Greene, M. and P. Shorter. 2012. Building conceptual understanding in precalculus. Transformative Dialogues. 6(2): 1–16.
- Hughes-Hallett, D., W. G. McCallum, A. M. Gleason, D. E. Flath, P. F. Lock, S. P. Gordon, D. O. Lomen, D. Lovelock, B. G. Osgood, A. Pasquale, D. Quinney, J. Tecosky-Feldman, J. Thrash, K. R. Rhea, and T. W. Tucker. 2013. Calculus: Single and Multivariable. NJ: Wiley.
- Hung, W. 2006. The 3c3r model: A conceptual framework for designing problems in PBL. Interdisciplinary Journal of Problem-Based Learning. 1(1): 55–77
- Ksir, A. and C. von Renesse. 2015. Inquiry materials for calculus III. www.artofmathematics.org/sites/default/files/calculus_3_first_draft_jan_2015.pdf. Accessed May 2016.
- Laursen, S. L., M. L. Hassi, M. Kogan, and T. J. Weston. 2014. Benefits for women and men of inquiry-based learning. College Mathematics: A Multi-Institution Study. Journal for Research in Mathematics Education. 45, 406–418. See also http://www.colorado.edu/eer/research/documents/LaursenInnovationToImplementation_Delta2013.pdf
- Lithner, Johan 2008. A Research Framework for Creative and Imitative Reasoning. Educational Studies in Mathematics: an International Journal. 67(3): 255–276.
- Swan, M. 2008. Designing a multiple representation learning experience in secondary algebra. Journal of the International Society for Design and Development in Education. 1(1): 1–17. Available at http://www.educationaldesigner.org/ed/volume1/issue1/article3/.
- Weiss, R. E. 2003. Designing Problems to Promote Higher-Order Thinking. New Directions for Teaching and Learning. 95(95): 25–31.
- Williams, S. R. 1991. Models of limit held by college calculus students. Journal for Research in Mathematics Education. 22(3): 219–236.