REFERENCES
- Allis , V. and Koetsier , T. 1995 . On some paradoxes of the infinite II . The British Journal for the Philosophy of Science , 46 : 235 – 247 .
- Asiala , M. , Brown , A. , DeVries , D. , Dubinsky , E. , Mathews , D. and Thomas , K. 1996 . “ A framework for research and curriculum development in undergraduate mathematics education ” . In Research in collegiate mathematics education II , Edited by: Kaput , J. , Schoenfeld , A. H. and Dubinsky , E. 1 – 32 . Providence , RI : American Mathematical Society .
- Borasi , R. 1985 . Errors in the enumeration of infinite sets . Focus on Learning Problems in Mathematics , 7 : 77 – 78 .
- Brown , A. , McDonald , M. and Weller , K. 2010 . “ Step by step: Infinite iterative processes and actual infinity ” . In Research in collegiate mathematics education , Edited by: Hitt , F. , Holton , D. and Thompson , P. Vol. 8 , 115 – 142 . Providence , RI : American Mathematical Society .
- Cantor , G. 1915 . Contributions to the founding of the theory of transfinite numbers (P. Jourdain, Trans.) , New York , NY : Dover Publications . (Original work published 1915)
- Cottrill , J. , Dubinsky , E. , Nichols , D. , Schwingendorf , K. , Thomas , K. and Vidakovic , D. 1996 . Understanding the limit concept: Beginning with a coordinated process scheme . Journal of Mathematical Behaviour , 15 : 167 – 192 .
- Dubinsky , E. , Arnon , I. and Weller , K. 2013 . “ Preservice teachers' understanding of the relation between a fraction or integer and its decimal expansion: The case of 0.999 … and 1 ” . In Canadian Journal of Science, Mathematics and Technology Education Vol. 13(3) , 232 – 258 .
- Dubinsky , E. , Weller , K. , McDonald , M. A. and Brown , A. 2005a . Some historical issues and paradoxes regarding the concept of infinity: An APOS-based analysis: Part 1 . Educational Studies in Mathematics , 58 : 335 – 359 .
- Dubinsky , E. , Weller , K. , McDonald , M. A. and Brown , A. 2005b . Some historical issues and paradoxes regarding the concept of infinity: An APOS-based analysis: Part 2 . Educational Studies in Mathematics , 60 : 253 – 266 .
- Dubinsky , E. , Weller , K. , Stenger , C. and Vidakovic , D. 2008 . Infinite iterative processes: The tennis ball problem . European Journal of Pure and Applied Mathematics , 1 ( 1 ) : 99 – 121 .
- Ely , R. 2011 . Envisioning the infinite by projecting finite properties . Journal of Mathematical Behavior , 30 : 1 – 18 .
- Fischbein , E. , Tirosh , D. and Hess , P. 1979 . The intuition of infinity . Educational Studies in Mathematics , 10 : 3 – 40 .
- Hahn , H. 1956 . “ Infinity ” . In The world of mathematics , Edited by: Newman , J. Vol. 3 , 1593 – 1613 . New York , NY : Dover Publications .
- Hazzan , O. 1999 . Reducing abstraction level when learning abstract algebra concepts . Educational Studies in Mathematics , 40 ( 1 ) : 71 – 90 .
- Lakoff , G. and Nunez , R. 2000 . Where mathematics comes from: How the embodied mind brings mathematics into being , New York , NY : Basic Books .
- Mamolo , A. and Bogart , T. 2011 . Riffs on the infinite ping-pong ball conundrum . International Journal of Mathematical Education in Science and Technology , 42 ( 5 ) : 615 – 623 .
- Mamolo , A. and Zazkis , R. 2008 . Paradoxes as a window to infinity . Research in Mathematics Education , 10 ( 2 ) : 167 – 182 .
- McDonald , M. A. and Brown , A. 2008 . “ Developing notions of infinity ” . In Making the connection: Research and teaching in undergraduate mathematics Edited by: Carlson , M. and Rasmussen , C. 55 – 64 . Washington, DC: The MAA.
- Moore , A. W. 1995 . A brief history of infinity . Scientific American , 272 ( 4 ) : 112 – 116 .
- Radu , I. and Weber , K. 2011 . Refinements in mathematics undergraduate students’ reasoning on completed infinite iterative processes . Educational Studies in Mathematics , 78 : 165 – 180 .
- Tirosh , D. and Tsamir , P. 1996 . The role of representations in students’ intuitive thinking about infinity . International Journal of Mathematical Education in Science and Technology , 27 ( 1 ) : 33 – 40 .
- Tsamir , P. 1999 . The transition from the comparison of finite sets to the comparison of infinite sets: Teaching prospective teachers . Educational Studies in Mathematics , 38 : 209 – 234 .
- Tsamir , P. 2003 . “ Primary intuitions and instruction: The case of actual infinity ” . In Research in collegiate mathematics education V , Edited by: Selden , A. , Dubinsky , E. , Harel , G. and Hitt , F. 79 – 96 . Providence , RI : American Mathematical Society .
- Tsamir , P. and Tirosh , D. 1999 . Consistency and representations: The case of actual infinity . Journal for Research in Mathematics Education , 30 : 213 – 219 .
- Van Bendegem , J. P. 1994 . Ross' Paradox is an impossible super-task . The British Journal for the Philosophy of Science , 45 : 743 – 748 .
- Weller , K. , Arnon , A. and Dubinsky , E. 2009 . Preservice teachers’ understanding of the relation between a fraction or integer and its decimal expansion . Canadian Journal of Science, Mathematics, and Technology Education , 9 ( 1 ) : 5 – 28 .
- Weller , K. , Arnon , A. and Dubinsky , E. 2011 . Preservice teachers’ understanding of the relation between a fraction or integer and its decimal expansion: Strength and stability of belief . Canadian Journal of Science, Mathematics, and Technology Education , 11 ( 2 ) : 129 – 159 .
- Weller , K. , Brown , A. , Dubinsky , E. , McDonald , M. and Stenger , C. 2004 . Intimations of infinity . Notices of the AMS , 51 ( 7 ) : 740 – 750 .