- New
-
Topics
- All Categories
- Metaphysics and Epistemology
- Value Theory
- Science, Logic, and Mathematics
- Science, Logic, and Mathematics
- Logic and Philosophy of Logic
- Philosophy of Biology
- Philosophy of Cognitive Science
- Philosophy of Computing and Information
- Philosophy of Mathematics
- Philosophy of Physical Science
- Philosophy of Social Science
- Philosophy of Probability
- General Philosophy of Science
- Philosophy of Science, Misc
- History of Western Philosophy
- Philosophical Traditions
- Philosophy, Misc
- Other Academic Areas
- Journals
- Submit material
- More
A Study of Mathematical Determination through Bertrand’s Paradox
Philosophia Mathematica 26 (3):375-395 (2018)
Abstract
Certain mathematical problems prove very hard to solve because some of their intuitive features have not been assimilated or cannot be assimilated by the available mathematical resources. This state of affairs triggers an interesting dynamic whereby the introduction of novel conceptual resources converts the intuitive features into further mathematical determinations in light of which a solution to the original problem is made accessible. I illustrate this phenomenon through a study of Bertrand’s paradox.Author's Profile
Other Versions
No versions found
My notes
Similar books and articles
Bertrand's Paradox Revisited: Why Bertrand's 'Solutions' Are All Inapplicable.Darrell Patrick Rowbottom - 2013 - Philosophia Mathematica 21 (1):110-114.
Solving the hard problem of Bertrand's paradox.Diederik Aerts - 2014 - Journal of Mathematical Physics 55 (8):083503.
Bertrand’s paradox revisited.John Holbrook & Sung soo Kim - 2000 - The Mathematical Intelligencer 22 (4):16-19.
Bertrand’s Paradox Resolution and Its Implications for the Bing–Fisher Problem.Richard A. Chechile - 2023 - Mathematics 11 (15).
The following paradox may serve to illustrate M. Bertrand’s remark “ L’infini n’est pas un nombre” (Calcul des Probabilités, p. 4).C. S. Jackson - 1903 - The Mathematical Gazette 2 (42):360-360.
Brentano’s Solution To Bertrand’s Paradox.Nicholas Shackel - 2024 - Revue Roumaine de Philosophie 68 (1):161-168.
Random chord in a circle and bertrand's paradox: new generation method, extreme behaviour and length moments.Zoran Vidovic - 2021 - Bulletin of the Korean Mathematical Society 58 (2):433-444.
Analytics
Added to PP
2017-12-16
Downloads
81 (#259,026)
6 months
10 (#411,161)
2017-12-16
Downloads
81 (#259,026)
6 months
10 (#411,161)
Historical graph of downloads
Author's Profile
Citations of this work
Independence of the Grossone-Based Infinity Methodology from Non-standard Analysis and Comments upon Logical Fallacies in Some Texts Asserting the Opposite.Yaroslav D. Sergeyev - 2019 - Foundations of Science 24 (1):153-170.
Single-tape and multi-tape Turing machines through the lens of the Grossone methodology.Yaroslav Sergeyev & Alfredo Garro - 2013 - Journal of Supercomputing 65 (2):645-663.
References found in this work
Defusing Bertrand’s Paradox.Zalán Gyenis & Miklós Rédei - 2015 - British Journal for the Philosophy of Science 66 (2):349-373.
Bertrand's Paradox Revisited: Why Bertrand's 'Solutions' Are All Inapplicable.Darrell Patrick Rowbottom - 2013 - Philosophia Mathematica 21 (1):110-114.
In Defense of Bertrand: The Non-Restrictiveness of Reasoning by Example.D. Klyve - 2013 - Philosophia Mathematica 21 (3):365-370.
PhilPapers logo by Andrea Andrews and Meghan Driscoll.
This site uses cookies and Google Analytics (see our terms & conditions for details regarding the privacy implications). Use of this site is subject to terms & conditions.
All rights reserved by The PhilPapers Foundation
Server: philpapers-web-fcc9b7db9-xq25r uwo