References
- Arbaugh, F., Herbel-Eisenmann, B., Ramirez, N., Knuth, E., Kranendonk, H., & Quander, J. R. (2010). Linking Research and Practice: The NCTM Research Agenda Conference Report. http://www.netm.org/uploadedfiles/Research,_Issues,_and_News/Research/Linking_Research_20100414.pdf
- Conradie, J., & Frith, J. (2000). Comprehension tests in mathematics. Educational Studies in Mathematics, 42, 225-235.
- Dubinsky, E. and Leron, U. (1994). Learning abstract algebra with ISETL. New York: Springer-Verlag.
- Evens, H. & Houssart, J. (2004). Categorizing pupils’ written answers to a mathematics test questions: “I know but I can’t explain.” Educational Research, 46, 269-282.
- Freedman, H. (1983). A way of teaching abstract algebra. The American Mathematical Monthly, 90(9), 641-644.
- Greeno, J. G. (1973). The structure of memory and the process of solving problems. In R. L. Solso (Ed.), Contemporary issues in cognitive psychology: The Loyola symposium, Winston, Washington, D.C.
- Harel, G. (2001). The development of mathematical induction as a proof scheme: A model for DNR based instruction. In S. Campbell and R. Zazkis (Eds.), The learning and teaching of number theory (pp. 185-212). Dordrecht, The Netherlands: Kluwer.
- Harel, G. & Sowder, L. (1998). Students’ proof schemes: Results from exploratory studies. In A. Schoenfeld, J. Kaput, and E. Dubinsky (Eds.), Research in collegiate mathematics education III (pp. 234-283). Providence, RI: American Mathematics Society.
- Hazzan, O. (1999). Reducing abstraction level when learning abstract algebra concepts. Educational Studies in Mathematics Education, 40, 71-90.
- Hazzan, O. & Leron, U. (1996). Students’ use and misuse of mathematical theorems: The case of Lagrange’s Theorem. For the Learning of Mathematics, 16, 23-26.
- Healy, L. & Hoyles, C. (2000). A study of proof conceptions in algebra. Journal for Research in Mathematics Education, 31(4), 396-428.
- Hillman, A. P. & Alexanderson, G. L. (1994). Abstract algebra a first undergraduate course, (5th ed.). Prospect Heights, IL: Waveland Press.
- Myers, N. C. (2000). An oral-intensive abstract algebra course. PRIMUS, 10(3), 193-205.
- Mathematical Association of America, (1999). Assessment practices in undergraduate mathematics. Washington, DC: Author.
- National Council of Teachers of Mathematics (1995). Assessment standards for school mathematics. Author.
- National Council of Teachers of Mathematics (2000). Principles and standards for school mathematics. Reston, VA: Author.
- Patton, M. Q. (2002). Qualitative research and evaluation methods (3rd ed.). Thousand Oaks, CA: SAGE.
- Rowland, T. (2001). Generic proofs in number theory. In S. Campbell and R. Zazkis (Eds.), Learning and teaching number theory: Research in cognition and instruction (pp. 157-184). Westport, CT: Ablex Publishing.
- Schoenfeld, A. (1988). When good teaching leads to bad results: The disasters of “well-taught” mathematics courses. Educational Psychologist, 23(2), 145-166.
- Selden, A. & Selden, J. (1987). Errors and misconceptions in college level theorem proving. In J. D. Novak (Ed.), Proceedings of the second international seminar on misconceptions and educational strategies in science and mathematics (pp. 457-470). Ithaca, NY: Cornell University.
- Soto-Johnson, H., Yestness, N., & Dalton, C. (2009). Assessing multiple abstract algebra assessments. Investigations in Mathematics Learning, 1(3), 1-26.
- Steen, L. A. (1999) Assessing assessment. In B. Gold et al. (Eds.), Assessment in undergraduate mathematics: MAA Notes #49, (pp. 1-6). Washington, DC: MAA.
- Weber, K. (2001). Student difficulty in constructing proofs: The need for strategic knowledge. Educational Studies in Mathematics, 48(1), 101-119.