Great circles: The analysis of a concept in mathematics and poetry

Research output: Contribution to journalArticle

Abstract

This article looks at analysis of concepts as a search for conditions of intelligibility, where intelligibility is recognized to be a value. Choosing the circle as an exemplary concept, we trace the discovery of a quadratic polynomial equation, the sine and cosine functions, and the nth roots of unity inside the circle, as mathematicians discover new conditions of intelligibility for the abstract notion of a circle. Then we trace the uses of circles in poems by Marlowe, Shakespeare and Keats. What we discover inside the circle there is of course quite different (a devil, a planet, a sleeping girl), for what the poet seeks are really conditions of the meaningfulness (intelligibility) of human life. The notion of containment and of intelligibility changes as we move from the investigation of mathematical problems to that of problematic human beings. Still, the circle remains as part of experience and part of our best conceptualization of the natural world.

Original languageEnglish (US)
Pages (from-to)24-30
Number of pages7
JournalJournal of Mathematics and the Arts
Volume8
Issue number1-2
DOIs
StatePublished - Sep 1 2014

Fingerprint

Great circle
Planets
Circle
Polynomials
Trace
nth root
Quadratic equation
Quadratic Polynomial
Polynomial equation
Roots of Unity
Concepts
Mathematics
Poetry
Intelligibility

All Science Journal Classification (ASJC) codes

  • Mathematics(all)
  • Visual Arts and Performing Arts
  • Computer Graphics and Computer-Aided Design

Cite this

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Great circles : The analysis of a concept in mathematics and poetry. / Grosholz, Emily Rolfe.

In: Journal of Mathematics and the Arts, Vol. 8, No. 1-2, 01.09.2014, p. 24-30.

Research output: Contribution to journalArticle

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