Search Loci: Convergence:
One can measure the importance of a scientific work by the number of earlier publications rendered superfluous by it.
In H. Eves, Mathematical Circles Revisited, Boston: Prindle, Weber and Schmidt, 1971.
Plimpton 322, an Old Babylonian tablet from Larsa, has four columns of numbers, two of which, most experts believe, contain, in each of the fifteen rows, two of the three numbers in a Pythagorean triple. This tablet was first analyzed by Otto Neugebauer and Abraham Sachs in their 1945 book, Mathematical Cuneiform Texts (New Haven, American Oriental Society). There have been numerous discussions of this tablet since that time. In particular, two articles, "Sherlock Holmes in Babylon," (1980) by R. Creighton Buck, and "Words and Pictures: New Light on Plimpton 322," (2002) by Eleanor Robson are included in Marlow Anderson, Victor Katz, & Robin Wilson, eds., Sherlock Holmes in Babylon and Other Tales of Mathematical History (Washington: Mathematical Association of America, 2004), pp. 5-26. Further references to the literature are included in those two articles. More recently, Jöran Friberg, in A Remarkable Collection of Babylonian Mathematics Texts (New York: Springer, 2007) (pp. 433-452) has challenged the interpretation of the numbers on the tablet as parts of Pythagorean triples.