Print Works Sited

  1. Bardzell, Michael and Kathleen Shannon, Fractal Dimensions of Group Generated 1-Dimensional Cellular Automata, preprint Salisbury University.
  2. Bardzell, Michael and Kathleen Shannon, The PascGalois Triangle: A Tool for Visualizing Absract Algebra, Innovations in Teaching Abstract Algebra. Ed. Allen C. Hibbard and Ellen J. Maycock. MAA Notes #60 Washington, D.C.: Mathematical Association of America, 2002. pp. 115-123.
  3. Boyer, Charles (revised by Uta C. Merzbach), A History of Mathematics. 2nd ed. New York: Wiley, 1991.
  4. Brown, S. and D. Hathaway, Fibonacci Powers and a Facinating Triangle, The College Mathematics Journal, 28 1997, No. 2, pp.124-128
  5. Burger Edward B. and Michael Starbird, The Heart of Mathematics: An inviation to effective thinking. Emeryville, CA.: Key College Publishing, 2000.
  6. Field, Michael and Martin Golubitsky Symmetry in Chaos: A Search for Pattern in Mathematics Art and Nature Oxford: Oxford University Press, 1992.
  7. Gleick, James, Chaos: Making a New Science. New York: Viking Penguin Inc., 1987.
  8. Granville, A., Zaphod Beeblebrox's Brain and the Fifty-ninth row of Pascal's Triangle, The American Mathematical Monthly, 99 (1992), pp. 318-331.
  9. Granville, A., Correction to: Zaphod Beeblebrox's Brain and the Fifty-ninth row of Pascal's Triangle, The American Mathematical Monthly, 104 (1997), pp. 848-851.
  10. Gymnich, Stephen, A Classification of Simple 1-Dimensional Automata generated over Cyclic Groups. Proceedings of the National Conference on Undergraduate Research(NCUR) 2002 University of Wisconsin-Whitewater.
  11. Long, C., Pascal's Triangle Modulo p, Fibonacci Quarterly 19 (1981), 458-463.
  12. Miller, Nicole, Periodicity and Long-Term Evolution of 2-D Cellular Automata. Proceedings of the National Conference on Undergraduate Research(NCUR) 2001 University of Kentucky, Lexington, KT.
  13. Phillips, Hubert, My Best Puzzles in Logic and Reasoning. New York: Dover Publications, 1961.
  14. Wolfram, S., Geometry of Binomial Coefficients; The American Mathematical Monthly, 91, Nov. 1984, pp. 566-571.
Also see these additional Web resources (available as of 10/31/02):