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http://dx.doi.org/10.14477/jhm.2020.33.6.327

A Study on the Educational Implications of Zeno's Paradoxes through Philosophical Investigation  

Baek, Seung Ju (Sejong Science High School)
Choi, Younggi (Dept. of Math. Edu., Seoul National Univ.)
Publication Information
Journal for History of Mathematics / v.33, no.6, 2020 , pp. 327-343 More about this Journal
Abstract
This study investigate philosophical discussions related to the Zeno's paradoxes in order to derive the mathematics educational implications. The paradox of Zeno's motion is sometimes explained by the calculus theories. However, various philosophical discussions show that the resolution of Zeno's paradox by calculus is not a real solution, and the concept of a continuum which is composed of points and the real number continuum may not coincide with the physical space and time. This is supported by the fact that the hyperreal number system of nonstandard analysis could be another model of a straight line or time and that an alternative explanation of Zeno's paradox was possible by the hyperreal number system. The existence of two different theories of the continuum suggests that teachers and students may not have the same view of the continuum. It is also suggested that the real world model used in school mathematics may not necessarily match the student's intuition or mathematical practice, and that the real world application of mathematics theory should be emphasized in education as a kind of 'correspondence.'
Keywords
Zeno's paradox; continuum; nonstandard analysis; intuition; mathematical practice;
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