Archimedous tou Syrakousiou Psammites: Difference between revisions
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{{DISPLAYTITLE:''Archimedous tou Syrakousiou Psammites, kai Kyklou Metresis. Eutokiou Askalonitou eis Auten Hypomnema = Archimedis Syracusani Arenarius, et Dimensio Circuli. Eutocii Ascalonitæ, in hanc Commentarius''}} | {{DISPLAYTITLE:''Archimedous tou Syrakousiou Psammites, kai Kyklou Metresis. Eutokiou Askalonitou eis Auten Hypomnema = Archimedis Syracusani Arenarius, et Dimensio Circuli. Eutocii Ascalonitæ, in hanc Commentarius''}} | ||
===by Archimedes=== | ===by Archimedes=== | ||
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|shorttitle=Archimedous tou Syrakousiou Psamites | |shorttitle=Archimedous tou Syrakousiou Psamites | ||
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}} | }}Measurement of a Circle is a treatise that consists of three propositions by Archimedes. This is a short work consisting of three propositions. It is written in the form of a correspondence with Dositheus of Pelusium, who was a student of Conon of Samos. The treatise is only a fraction of what was a longer work. <ref> Heath, Thomas Little (1931), A Manual of Greek Mathematics, Mineola, N.Y.: Dover Publications, p. 146, ISBN 0-486-43231-9 </ref> This work contains a deduction of the constant ratio of a circle's circumference to its diameter. <ref>Ibid.</ref> This approximates what we now call the mathematical constant π. He found these bounds on the value of π by inscribing and circumscribing a circle with two similar 96-sided regular polygons <ref> Ibid. </ref> | ||
Measurement of a Circle is a treatise that consists of three propositions by Archimedes. This is a short work consisting of three propositions. It is written in the form of a correspondence with Dositheus of Pelusium, who was a student of Conon of Samos. The treatise is only a fraction of what was a longer work. <ref> Heath, Thomas Little (1931), A Manual of Greek Mathematics, Mineola, N.Y.: Dover Publications, p. 146, ISBN 0-486-43231-9 </ref> This work contains a deduction of the constant ratio of a circle's circumference to its diameter. <ref>Ibid.</ref> This approximates what we now call the mathematical constant π. He found these bounds on the value of π by inscribing and circumscribing a circle with two similar 96-sided regular polygons <ref> Ibid. </ref> | |||
==Evidence for Inclusion in Wythe's Library== | ==Evidence for Inclusion in Wythe's Library== | ||
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[[Category:Oxford]] | [[Category:Oxford]] | ||
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Revision as of 17:20, 26 June 2025
by Archimedes
| Archimedous tou Syrakousiou Psamites | ||
 at the College of William & Mary. |
||
| Author | Archimedes | |
| Published | Oxonii: e Theatro Sheldoniano | |
| Date | 1676 | |
Measurement of a Circle is a treatise that consists of three propositions by Archimedes. This is a short work consisting of three propositions. It is written in the form of a correspondence with Dositheus of Pelusium, who was a student of Conon of Samos. The treatise is only a fraction of what was a longer work. [1] This work contains a deduction of the constant ratio of a circle's circumference to its diameter. [2] This approximates what we now call the mathematical constant π. He found these bounds on the value of π by inscribing and circumscribing a circle with two similar 96-sided regular polygons [3]