1. Balacheff, N. (1988). Aspects of proof in pupils’ practice of school mathematics. In D. Pimm (Ed.),Mathematics, teachers and children (pp. 316–230). London: Hodder and Stoughton.

2. Balacheff, N. (1991). The benefits and limits of social interaction: The case of a mathematical proof. In A. Bishop, S. Mellin-Olson, & J. van Doormolen (Eds.),Mathematical knowledge: Its growth through teaching (pp. 175–192). Dordrecht, The Netherlands: Kluwer Academic Publishers.

3. Ball, D. L., & Bass, H. (2003). Making mathematics reasonable in school. In J. Kilpatrick, W.G. Martin, & D. Schifter (Eds.),A research companion to the principles and standards for school mathematics (pp. 27–44). Reston, VA: National Council of Teachers of Mathematics.

4. Bulgar, S. (2002). Through a teacher’s lens: Children’s constructions of division of fractions.Dissertation Abstracts International, 63(5), 1754.

5. Cobb, P. (2000). The importance of a situated view of learning to the design of research and instruction. In L. Burton (Series Ed.) & J. Boaler (Vol. Ed.),A series in international perspectives on mathematics learning: Multiple perspectives on mathematics teaching and learning (pp. 45–82). London: Ablex.