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1923] mathematischen und nalurzoissenschaftlichen Unterricht, vol. 56, 1925, pp. 129–137. Thoughtfully informing and critical. References include Eisenlohr (1877), Simon (1905), Cantor (1907), Weidner (1916), Zimmern (1916), Heath (1921), Tropfke (1921), Borchardt (1922), Wolf? 1924 [1923], Archibald 1924 [1923]. Points out that in Peet‘s references to what is known of Babylonian mathematics the papers of Weidner, Zimmern and Ungnad had been overlooked.

Review by G. Wolff, Unterrichlsblātler für Mathematik und Naturwissenschaften, vol. 30, 1924, pp. 107-108.

Review (anonymous) Discovery, vol. 5, June, 1924, pp. 106-107.

Review (anonymous) The Times Literary Supplement, vol. 23, March 20, 1924, p. 175.

, "A Greco-Egyptian mathematical papyrus," Classical Philology, vol. 18, October, 1923, pp. 328–333.

An account of a Greek papyrus at the University of Michigan which came originally from the Fayûm and dates from approximately the fourth century A.D. It is earlier than the Akhmtm papyrus, Baillet (1892), but contains tables similar to those in this, as well as in the earlier Rhind papyrus. Robbins states that the account of this papyrus by L. C. Karpinski was based on information furnished by him; this account is: "Michigan mathematical papyrus, no. 621," Isis, vol. 5, October, 1922, pp. 20-25 + 1 plate.

, History of Mathematics, Boston, Mass., vol. 1, 1923, pp. 41-53; vol. 2. 1925. pp. 45-47. 209-211, 270, 386, 410, 431-432, 435-437, 498-501, 634-635.

, "A numeraçãao fraccionária no papiro de Rhind e em Herāo de Alexandria," ''Associção Portuguesa para o Progresso das Sciéncias, Congresso do Porto, Primero Congresso. . .1921'', Secções de Matemática, Astronomia e Sciências Físico-Químicas, Coimbre, 1923, pp. 43-93.

Also in Anais do I nstituto Superior de Agronomia, Lisbon, vol. 2 1924, 50 pp.

With references to Eisenlohr (1877), Tannery (1884), Loria (1914) Baillet (1892).

, "Egyptiské děleni" [Egyptian division], Jahresberichte der koniglich-böhmischen Gesellschaft der Wissenschaften, Class II, Prague, for 1921-22, no. 14, 1923, pp. 1-23; résumé in French, pp. 23-25.

First paragraph of the résumé. "L’article présent cherche à démontrer que les Égyptiens divisaient d'après le système, suivi dans la grande tabelle d'Ahmes $$\scriptstyle [2:\;(2\pi + 1)]$$, c'est-a-dire en cherchant pour le quotient a : b un nombre c qui, multiplié par b, donne a. On commence par démontrer la maniére de procéder des Égyptiens lorsque a, b, c sont des nombres entiers."