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Full Idea
Originally, the focus of geometry was space - matter and extension - and the subject matter of arithmetic was quantity. Geometry concerned the continuous, whereas arithmetic concerned the discrete. Mathematics left these roots in the nineteenth century.
Gist of Idea
Mathematics originally concerned the continuous (geometry) and the discrete (arithmetic)
Source
Stewart Shapiro (Philosophy of Mathematics [1997], Intro)
Book Ref
Shapiro,Stewart: 'Philosophy of Mathematics:structure and ontology' [OUP 1997], p.13
A Reaction
Mathematicians can do what they like, but I don't think philosophers of mathematics should lose sight of these two roots. It would be odd if the true nature of mathematics had nothing whatever to do with its origin.
11041 | Some quantities are discrete, like number, and others continuous, like lines, time and space [Aristotle] |
17843 | The idea of 'one' is the foundation of number [Aristotle] |
17850 | Each many is just ones, and is measured by the one [Aristotle] |
17851 | Number is plurality measured by unity [Aristotle] |
1600 | Euclid's common notions or axioms are what we must have if we are to learn anything at all [Euclid, by Roochnik] |
17783 | A number is not a multitude, but a unified ratio between quantities [Newton] |
9800 | Arithmetic is based on definitions, and Sums of equals are equal, and Differences of equals are equal [Mill] |
14116 | Numbers were once defined on the basis of 1, but neglected infinities and + [Russell] |
10205 | Mathematics originally concerned the continuous (geometry) and the discrete (arithmetic) [Shapiro] |
19093 | Greek mathematics is wholly sensory, where ours is wholly inferential [Macbeth] |