Young Students Exploring Cardinality by Constructing Infinite Processes

In this paper, we describe the design and implementation of computer programming activities aimed at introducing young students (9–13 years old) to the idea of infinity, and in particular, to the cardinality of infinite sets. This research was part of the WebLabs project where students from several European countries explored topics in mathematics and science by building computational models and programs, which they shared and discussed. We focus on a subset of the work in which students explored concepts of cardinality of infinite sets by interpreting and constructing computer programs in ToonTalk, a programming language and environment that is especially well-suited for young students. Our hypothesis is that via carefully designed computational explorations within an appropriately constructed medium, infinity can be approached in a learnable way that does not sacrifice the rigour necessary for mathematical understanding of the concept, and at the same time contributes to introducing the real spirit of mathematics to the school classroom.

[1]  Seymour Papert,et al.  Teaching Children to be Mathematicians vs. Teaching About Mathematics. Artificial Intelligence Memo Number 249. , 1971 .

[2]  Dina Tirosh,et al.  The intuition of infinity , 1979 .

[3]  Mary Tiles,et al.  Georg Cantor: His Mathematics and Philosophy of the Infinite. , 1982 .

[4]  Serge Lang Math!: Encounters with High School Students , 1985 .

[5]  Gerald J. Sussman,et al.  Structure and interpretation of computer programs , 1985, Proceedings of the IEEE.

[6]  Richard K. Guy,et al.  To Infinity and Beyond: A Cultural History of the Infinite , 1986 .

[7]  M.N. Sastry,et al.  Structure and interpretation of computer programs , 1986, Proceedings of the IEEE.

[8]  Jean Piaget,et al.  Psychogenesis and the History of Science , 1988 .

[9]  Peter Hilton The Mathematical Component of a Good Education , 1991 .

[10]  Celia Hoyles,et al.  Windows on Mathematical Meanings , 1996 .

[11]  Celia Hoyles,et al.  Windows on Mathematical Meanings: Learning Cultures and Computers , 1996 .

[12]  Sacristán Rock,et al.  Windows on the infinite : constructing meanings in a Logo-based microworld. , 1997 .

[13]  Andrea A. diSessa,et al.  Changing Minds: Computers, Learning, and Literacy , 2000 .

[14]  David Tall A child thinking about infinity , 2001 .

[15]  Pessia Tsamir,et al.  When `The Same' is not perceived as such: The case of infinite sets , 2001 .

[16]  John Monaghan Young Peoples' Ideas of Infinity , 2001 .

[17]  Ken Kahn,et al.  Generalizing by Removing Detail , 2001, Your Wish is My Command.

[18]  Lyn D. English,et al.  Handbook of International Research in Mathematics Education , 2002 .

[19]  Celia Hoyles,et al.  Developing new notations for a learnable mathematics in the computational era , 2002 .

[20]  Martin A. Simon,et al.  Explicating the Role of Mathematical Tasks in Conceptual Learning: An Elaboration of the Hypothetical Learning Trajectory , 2004 .

[21]  Richard Noss,et al.  Computational Construction as a Means to Coordinate Representations of Infinity , 2008, Int. J. Comput. Math. Learn..