01273nam0-22003731i-450-99000518842040332120080306104717.03-8154-1703-1000518842FED01000518842(Aleph)000518842FED0100051884219990604d1992----km-y0itay50------bagrclatDEy---a---001yyTheodori Prodromi De Rhodanthes et dosiclis amoribus libri IXTheodori Prodromiedidit Miroslavs MarcovichStutgardiae et LipsiaeTeubner1992X, 230 p.21 cmBibliotheca scriptorum Graecorum et Romanorum TeubnerianaRil. telaDe Rhodanthes et dosiclis amoribus47432Letteratura grecaTheodorus ProdromusDe Rhodanthes et dosiclis amoribus880.02Theodorus :Prodromus386793Marcovich,MiroslavITUNINARICAUNIMARCBK990005188420403321P2B-620-TEUB.-THEODOR.48-436A-1992Bibl.12070FLFBCP2B-620-TEUB.-THEODOR.48-436A-1992 BISBibl.21933FLFBCFLFBCDe Rhodanthes et dosiclis amoribus47432UNINA03805nam 2200613Ia 450 991078404270332120230721025430.01-281-12135-59786611121358981-270-884-7(CKB)1000000000334162(EBL)312341(OCoLC)476099794(SSID)ssj0000101765(PQKBManifestationID)11138395(PQKBTitleCode)TC0000101765(PQKBWorkID)10043975(PQKB)11003465(MiAaPQ)EBC312341(WSP)00006338(Au-PeEL)EBL312341(CaPaEBR)ebr10188709(CaONFJC)MIL112135(OCoLC)317384466(EXLCZ)99100000000033416220070327d2007 uy 0engur|n|---|||||txtccrAmazing traces of a Babylonian origin in Greek mathematics[electronic resource] /Jöran FribergHackensack, N.J. ;London World Scientificc20071 online resource (497 p.)Description based upon print version of record.981-270-452-3 Includes bibliographical references and index.Preface; Contents; 1. Elements II and Babylonian Metric Algebra; 2. El. I.47 and the Old Babylonian Diagonal Rule; 3. Lemma El. X.28/29 1a, Plimpton 322, and Babylonian igi-igi.bi Problems; 4. Lemma El. X.32/33 and an Old Babylonian Geometric Progression; 5. Elements X and Babylonian Metric Algebra; 6. Elements IV and Old Babylonian Figures Within Figures; 7. El. VI.30, XIII.1-12, and Regular Polygons in Babylonian Mathematics; 8. El. XIII.13-18 and Regular Polyhedrons in Babylonian Mathematics; 9. Elements XII and Pyramids and Cones in Babylonian Mathematics10. El. I.43-44, El. VI.24-29, Data 57-59, 84-86, and Metric Algebra11. Euclid's Lost Book On Divisions and Babylonian Striped Figures; 12. Hippocrates' Lunes and Babylonian Figures with Curved Boundaries; 13. Traces of Babylonian Metric Algebra in the Arithmetica of Diophantus; 14. Heron's, Ptolemy's, and Brahmagupta's Area and Diagonal Rules; 15. Theon of Smyrna's Side and Diagonal Numbers and Ascending Infinite Chains of Birectangles; 16. Greek and Babylonian Square Side Approximations; 17. Theodorus of Cyrene's Irrationality Proof and Descending Infinite Chains of Birectangles18. The Pseudo-Heronic GeometricaAppendix 1. A Chain of Trapezoids with Fixed Diagonals; Appendix 2. A Catalog of Babylonian Geometric Figures; Index of Texts, Propositions, and Lemmas; Index of Subjects; Bibliography; Comparative Mesopotamian, Egyptian, and Babylonian TimelinesA sequel to Unexpected Links Between Egyptian and Babylonian Mathematics (World Scientific, 2005), this book is based on the author's intensive and ground breaking studies of the long history of Mesopotamian mathematics, from the late 4th to the late 1st millennium BC. It is argued in the book that several of the most famous Greek mathematicians appear to have been familiar with various aspects of Babylonian "metric algebra," a convenient name for an elaborate combination of geometry, metrology, and quadratic equations that is known from both Babylonian and pre-Babylonian mathematical clay tabMathematics, GreekMathematics, BabylonianMathematics, Greek.Mathematics, Babylonian.510.938Friberg Jöran756005MiAaPQMiAaPQMiAaPQBOOK9910784042703321Amazing traces of a Babylonian origin in Greek mathematics3855049UNINA