Achieve Inc. (2008). Achieve ADP Algebra I end-or-course exam content standards with comments and examples. Washington, DC: Achieve. Retrieved October 20, 2009 from http://www.achieve.org/AlgebraITestOverview
Achieve Inc. (2009). American Diploma Project Algebra II End-of-course exam: 2009 annual report. Washington, DC: Achieve.
Allensworth, E. M., & Nomi, T. (2009). College-preparatory curriculum for all: The consequences of raising mathematics graduation requirements on students’ course taking and outcomes in Chicago. Chicago, IL: Consortium on Chicago School Research, University of Chicago.
Bracey, G. W. (2008). The algebra hoax. Phi Delta Kappa, 90(4), 306-307.
The Carnegie Foundation for the Advancement of Teaching. (2010). Standard listings: Basic classification. Retrieved from http://classifications.carnegiefoundation.org/lookup_listings/standard.php
Chazan, D. (2008). The shifting landscape of school algebra in the United States. In C. E. Greenes and R. Rubenstein (Eds). Algebra and algebraic thinking in school mathematics. (pp. 19-23). Reston, VA: National Council of Teachers of Mathematics.
Common Core State Standards for Mathematics. (2010). Retrieved November 10, 2010 from http://www.corestandards.org/assets/CCSSI_Math%20Standards.pdf
Conference Board of the Mathematical Sciences. (2001). The Mathematical Education of Teachers. Providence RI and Washington DC: American Mathematical Society and Mathematical Association of America.
Conference Board of the Mathematical Sciences. (2012). The Mathematical Education of Teachers II. Providence RI and Washington DC: American Mathematical Society and Mathematical Association of America.
Creswell, J. W. (2009). Research design: Qualitative, quantitative, and mixed methods approaches (3rd Ed.). Thousand Oaks, CA: Sage Publications.
Even, R., & Ball, D. L. (Eds.) (2008). The professional education and development of teachers of mathematics: The 15th ICMI study. New York, NY: Springer.
Faul, F., Erdfelder, E., Buchner, A., & Lang, A. G. (2009). Statistical power analyses using G*Power 3.1: Tests for correlation and regression analyses. Behavior Research Methods, 41, 1149-1160.
Fast Facts. (n.d.). Retrieved October, 31, 2010 from http://www.indiana.edu/~dema/fastfacts.shtml
Greenberg, J., and Walsh, K. (2008). No common denominator: The preparation of elementary teachers in mathematics by America’s education schools. Washington, DC: National Council on Teacher Quality.
Hoffer, T. B., Venkataraman, L., Hedberg, E. C., & Shagle, S. (2007). Final report on the National Survey of Algebra Teachers for the National Math Panel: NORC at the University of Chicago.
Ingersoll, R. (2008). Core Problems: Out-of-field teaching persists in key academic courses, especially in America’s high-poverty and high-minority schools. Washington, DC: The Education Trust. Retrieved from http://www.edtrust.org/sites/edtrust.org/files/publications/files/SASSreportCoreProblems.pdf
Kieran, C. (2007). Learning and teaching algebra at the middle school through college levels: Building meaning for symbols and their manipulation. In F. K. Lester, Jr. (Ed.), Second handbook of research on mathematics teaching and learning (pp. 707-762). Charlotte, NC: Information Age Publishing.
Kilpatrik, J, & Izsák, A. (2008) A history of algebra in the school curriculum. In C.E. Greenes and R. Rubenstein (Eds.), Algebra and algebraic thinking in school mathematics. (pp. 1-18). Reston, VA: National Council of Teachers of Mathematics
Lobato, J., Ellis, A. B., & Muñoz, R. (2003). How “focusing phenomena” in the instructional environment afford students’ generalizations. Mathematical Thinking and Learning, 5(3), 1-36.
Loveless, T. (2008). The misplaced math student: Lost in eighth-grade algebra. Washington, DC: The Brown Center on Educational Policy.
McKnight, C., Crosswhite, F. J., Dossey, J. A., Kifer, E., Swafford, J. O., & Travers, K. J.(1987). The Underachieving Curriculum: Assessing U.S. School Mathematics from an International Perspective. A National Report on the Second International Mathematics Study. Champaign, IL: Stipes Publishing Company.
Moses, R. P. (1995). Algebra, the new civil right. In C. B. Lacampagne, W. Blair, & J. Kaput (Eds.), The algebra initiative colloquium (Vol. 2) (pp. 53-67). Washington, DC: U.S. Department of Education, Office of Educational Research and Development.
Moses, R. P., & Cobb, C. E., Jr. (2001). Radical equations: Math literacy and civil rights. Boston: Beacon Press.
Moses, R. P., Kamii, M., Swap, S. M., Howard, J. (1989). The Algebra Project: Organizing in the spirit of Ella. Harvard Educational Review, 59(4), 423-443.
Nathan, M. J., & Koedinger, K. R. (2000). An investigation of teachers’ beliefs of students’ algebra development. Cognition and Instruction, 18(2), 209-237.
Nathan, M. J., & Petrosino, A. (2003). Expert blind spot among preservice teachers. American Educational Research Journal, 40, 905-928.
National Council of Teachers of Mathematics (2000). Principles and standards for school mathematics. Reston, VA: National Council of Teachers of Mathematics.
National Council of Teachers of Mathematics (2009). Focus in high school mathematics: Reasoning and sense making in algebra. Reston, VA: Author.
National Research Council (2010). Preparing Teachers: Building Evidence for Sound Policy. Committee on the Study of Teacher Preparation Programs in the United States. Washington DC: The National Academies Press.
NEIU: At a Glance (n.d.). Retrieved from http://www.neiu.edu/About%20NEIU/NEIU%20at%20a%20Glance/NEIU_at_a_Glance.html
Perie, M., Moran, R., & Lutkus, A. (2005). NAEP 2004 trends in academic progress: Three decades of student performance in reading and mathematics. Washington, D.C.: National Center for Education Statistics.
Quick Facts: 2009-2010(n.d.). Retrieved on November 11, 2010 from http://www.gvsu.edu/ia/index.cfm?id=BDEEE750-981D-A20F-B1A6E294415FFC67
Rech, J. F. & Harrington, J. (2000). Algebra as a gatekeeper: A descriptive study at an urban university. Journal of African American Studies, 4(4), 63–71.
Schmidt, W. H., Tatto, M. T., Bankov, K., Blömeke, S., Cedillo, T., Cogan, L., et al. (2007). The teacher preparation gap: Teacher education for middle school mathematics in six countries. East Lansing, MI: MT21 Report, Center for Research in Mathematics and Science Education.
Senk, S. L., Tatto, M. T., Peck, R., & Bankov, K. (in preparation). Future teachers’ mathematical content knowledge and pedagogical content knowledge: A comparative perspective. ZDM – The International Journal on Mathematics Education.
Stein, M. K., Smith, M. S., Henningsen, M. A., & Silver, E. A. (2000). Implementing Standards-based Mathematics Instruction: A Casebook for Professional Development. New York, NY: Teachers College Press.
Tatto, M. T., Schwille, J., Senk, S., Ingvarson, Peck, R., & Rowley, G. (2008). IEA Teacher Education Study in Mathematics (TEDS-M) Conceptual Framework: Policy, Practice and Readiness to Teach Primary and Secondary Mathematics. Amsterdam: International Association for the Evaluation of Educational Achievement (IEA).
Tatto, M. T., Schwille, J., Senk, S., Ingvarson, Peck, R., & Rowley, G. (in preparation a). IEA Teacher Education Study in Mathematics (TEDS-M), Technical Manual. Amsterdam: International Association for the Evaluation of Educational Achievement (IEA).
Tatto, M. T., Schwille, J., Senk, S., Ingvarson, Peck, R., & Rowley, G. (in preparation b). IEA Teacher Education Study in Mathematics (TEDS-M), First Findings. Amsterdam: International Association for the Evaluation of Educational Achievement (IEA).
Tatto. M.T. & Senk, S. L (in press). The mathematics education of future primary and secondary teachers: Methods and findings from the Teacher Education and Development Study in Mathematics. Journal of Teacher Education.
U.S. Department of Education (2009, October 22). Teacher Preparation: Reforming the Uncertain Profession Remarks of Secretary Arne Duncan at Teachers College, Columbia University [Ed.gov speech]. Retrieved from http://www.ed.gov/news/speeches/teacher-preparation-reforming-uncertain-profession
U.S. News & World Report. (2010). Best Colleges: Racial Diversity: Regional Universities (Midwest). Retrieved from http://colleges.usnews.rankingsandreviews.com/best-colleges/masters-midwest-campus-ethnic-diversity
Usiskin, Z. (1987). Why elementary algebra can, should, and must be an eighth-grade course for average students. Mathematics Teacher, 80(6), 428-428.
Weiss, I. R., Banilower, E. R., McMahon, K. C., & Smith, P. S. (2001). Report of the 2000 national survey of science and mathematics education. Chapel Hill, NC: Horizon Research, Inc.