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References (49)
-
J. Friberg (2007)
A Remarkable Collection of Babylonian Mathematical Texts: Manuscripts in the Schøyen Collection: Cuneiform Texts I -
A. George (2005)
In search of the é.dub.ba.a: The ancient Mesopotamian school in literature and reality -
E. Robson (2008)
Mathematics in Ancient Iraq: A Social History -
D. Melville (2018)
The Area and the Side I Added : Some old Babylonian GeometryRevue d'histoire des mathématiques
-
E. Bruins, Marguerite Rutten, G. Contenau, R. Mecquenem (1961)
Textes mathématiques de Suse -
Raymond Jestin (1937)
Tablettes sumériennes de Šuruppak : conservées au Musée de Stamboul -
Theodore Widom, Dirk Schlimm (2012)
Methodological Reflections on Typologies for Numerical NotationsScience in Context, 25
-
J. Høyrup (1996)
Changing Trends in the Historiography of Mesopotamian Mathematics: An Insider's ViewHistory of Science, 34
-
J. Friberg (2000)
Mathematics at Ur in the old Babylonian period, 94
-
S. Tinney (1998)
Texts, tablets, and teaching: scribal education in nippur and urThe Expedition, 40
-
P. Davis (1994)
Otto Neugebauer: Reminiscences and AppreciationAmerican Mathematical Monthly, 101
-
F. Thureau-Dangin (1939)
Sketch of a History of the Sexagesimal SystemOsiris, 7
-
J. Høyrup, J. Steele (2015)
Lengths, widths, surfaces: a portrait of Old Babylonian algebra and its kinAestimatio : Critical Reviews in the History of Science, 1
-
Benjamin Foster, E. Robson (2004)
A New Look at the Sargonic Mathematical Corpus, 94
-
M. Powell (1972)
The Origin of the Sexagesimal System: The Interaction of Language and Writing.Visible Language
-
C. Proust (2012)
Eine Betrachtung von Kolophonen Mathematischen Inhalts auf Mesopotamischen TontafelnNTM Zeitschrift für Geschichte der Wissenschaften, Technik und Medizin, 20
-
G. Sarton (1940)
Remarks on the Study of Babylonian MathematicsIsis, 31
-
O. Neugebauer
Zur entstehung des sexagesimalsystems -
M. Powell (1976)
The antecedents of old Babylonian place notation and the early history of Babylonian mathematicsHistoria Mathematica, 3
-
S. Tinney (1999)
On the curricular setting of Sumerian LiteratureIraq, 61
-
J. Friberg (1996)
Pyramids and Cones in Cuneiform and Other Mathematical Texts: New Hints of a Common Tradition in Ancient Mathematics -
E. Robson (1999)
Mesopotamian Mathematics 2100-1600 BC: Technical Constants in Bureaucracy and Education -
J. Høyrup (1982)
Investigations of an early Sumerian division problem, c. 2500 B.C.Historia Mathematica, 9
-
S. Kramer (1949)
Schooldays: A Sumerian Composition Relating to the Education of a ScribeJournal of the American Oriental Society, 69
-
O. Neugebauer (1935)
Mathematische Keilschrift-Texte -
C. Proust (2016)
Mathematical and Philological Insights on Cuneiform Texts. Neugebauer’s Correspondence with Fellow Assyriologists -
E. Robson (2001)
The tablet House: a scribal school in old Babylonian Nippur, 93
-
Christopher Woods, Geoff Emberling, E. Teeter (2010)
Visible language : inventions of writing in the ancient Middle East and beyond -
J. Finkelstein, Raymond Jestin (1960)
Nouvelles Tablettes Sumeriennes de Suruppak au Musee d'IstanbulAmerican Journal of Archaeology, 64
-
S. Chrisomalis (2010)
Numerical Notation: A Comparative History -
J. Friberg (2005)
On the Alleged Counting with Sexagesimal Place Value Numbers in Mathematical Cuneiform Texts from the Third Millennium BC -
R. Englund, Harriet Martin, F. Pomponio, G. Visicato, A. Westenholz (2002)
The fara tablets in the University of Pennsylvania Museum of Archaeology and Anthropology (Robert K. Englund)Journal of Cuneiform Studies, 54
-
J. Ritter (2004)
Reading Strasbourg 368: A Thrice-Told TaleBoston studies in the philosophy of science, 238
-
E. Robson (2004)
Mathematical cuneiform tablets in the Ashmolean Museum, Oxford -
D. Knuth (1972)
Ancient Babylonian algorithmsCommun. ACM, 15
-
J. Friberg (2007)
A remarkable collection of Babylonian mathematical textsNotices of the American Mathematical Society, 55
-
J. Høyrup (1996)
The finer structure of the Old Babylonian mathematical corpus: Elements of classification, with some results -
J. Høyrup (2002)
Lengths, Widths, Surfaces -
E. Robson (2000)
Mathematical cuneiform tablets in Philadelphia, I: problems and calculations -
H. Hilprecht (1906)
Mathematical, metrological and chronological tablets from the Temple Library of Nippur -
Louis Speleers (1935)
Thureau-Dangin (F.). Esquisse d'une histoire du système sexagésimalRevue Belge De Philologie Et D Histoire, 14
-
R. Rashed, Lewis Pyenson (2012)
Otto Neugebauer, HistorianHistory of Science, 50
-
D. Melville (2002)
Weighing Stones in Ancient MesopotamiaHistoria Mathematica, 29
-
M. Powell (1972)
Sumerian Area Measures and the Alleged Decimal Substratum, 62
-
Christine Proust (2009)
Deux nouvelles tablettes mathématiques du Louvre: AO 9071 et AO 9072, 99
-
E. Robson (2002)
More than metrology: mathematics education in an Old Babylonian scribal school -
H. Nissen, P. Damerow, R. Englund (1994)
Archaic Bookkeeping: Early Writing and Techniques of Economic Administration in the Ancient Near East -
S. Gandz (1940)
Studies in Babylonian Mathematics II. Conflicting Interpretations of Babylonian MathematicsIsis, 31
-
A. Deimel, Deutsche Orient-Gesellschaft
Array
- Publisher
- Springer International Publishing
- Copyright
- © Springer International Publishing Switzerland 2016
- ISBN
- 978-3-319-25863-8
- Pages
- 237 –263
- DOI
- 10.1007/978-3-319-25865-2_8
- Publisher site
- See Chapter on Publisher Site
Abstract
[When Otto Neugebauer began writing on Old Babylonian mathematics in the late 1920s, despite a certain amount of pre-history and heroic efforts by early pioneers, it was still a little-studied and poorly understood area. Once he engaged with the subject, a torrent of papers followed, leading up to the publication of the monumental Mathematische Keilschrift-Texte (MKT) in three volumes in 1935 and 1937. The appearance in 1945 of Mathematical Cuneiform Texts (MCT (Neugebauer and Sachs 1945)), mostly concerned with publishing tablets from Yale that had not been available to him earlier in Europe, as well as the infamous Plimpton 322, essentially completed his project. Neugebauer had read, translated, understood and described in precise mathematical detail the known corpus of Old Babylonian problem texts, as well as giving a categorization of the various types of table texts. Neugebauer himself moved on and, while his work on astronomy continued for the rest of his life, he rarely published on mathematics again. What was there left to do?]
Published: Feb 4, 2016
Keywords: Multiplication Table; Mathematical Text; Problem Text; Metrological System; Mathematical Word Problem