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- Math. Comp. 10 (1956), 227-260 Request permission
Corrigendum: Math. Comp. 11 (1957), 129-130.
Corrigendum: Math. Comp. 11 (1957), 129-130.
Corrigendum: Math. Comp. 11 (1957), 54.
References
- Marcel Boll, Tables Numériques Universelles des Laboratoires et Bureaux d’Étude, Dunod, Paris, 1947 (French). MR 0020335
- Fritz Emde, Tafeln elementarer Funktionen, B. G. Teubner, Leipzig, 1941 (German). MR 0005426
- H. J. A. Duparc, C. G. Lekkerkerker, and W. Peremans, Reduced sequences of integers and pseudo-random numbers, Math. Centrum, Amsterdam, 1953. Rapport ZW 1953-002,. MR 0053417 M. G. Kendall & B. Babington Smith, Tables of Random Sampling Numbers, Tracts for Computers, XXIV, Cambridge University Press, 1951.
- I. J. Good, The serial test for sampling numbers and other tests for randomness, Proc. Cambridge Philos. Soc. 49 (1953), 276–284. MR 60786, DOI 10.1017/s030500410002836x F. N. David & M. G. Kendall, “Tables of symmetric functions Part I; Parts II, and III"; Part IV, Biometrika, v. 36, 1949, p. 431-449; v. 38, 1951, p. 435-462; v. 40, 1953, p. 429-446. [MTAC, v. 4, p. 146, v. 6, p. 224-225; see also corrigendum, v. 8, p. 188, v. 8, p. 150.]
- A. A. Anis and E. H. Lloyd, On the range of partial sums of a finite number of independent normal variates, Biometrika 40 (1953), 35–42. MR 55627, DOI 10.1093/biomet/40.1-2.35 L. Chesere, M. Saffer, & L. L. Thurstone, Computing Diagrams for the Tetrachoric Correlation Coefficient, University Chicago Bookstore, Chicago, 1933.
- Frank E. Grubbs, On designing single sampling inspection plans, Ann. Math. Statistics 20 (1949), 242–256. MR 30177, DOI 10.1214/aoms/1177730033 E. C. Molina, Poisson’s Exponential Binomial Limit, D. van Nostrand Co., New York, 1945. E. C. Molina, Poisson’s Exponential Binomial Limit, D. van Nostrand Co., New York, 1945.
- E. Lord, The use of range in place of standard deviation in the $t$-test, Biometrika 34 (1947), 41–67. MR 19278, DOI 10.1093/biomet/34.1-2.41 L. Chesire, M. Saffir, & L. L. Thurstone, Computing Diagrams for the Tetrachoric Correlation Coefficient, University of Chicago Bookstore, Chicago, 1933. W. B. Michael, N. C. Perry, & J. P. Guilford, “The estimation of a point biserial coefficient of correlation from a phi coefficient,” Brit. Jn. Psych., Stat. Sec. 1952, v. 5, p. 139-150. H. E. Soper, “On the probable error for the biserial expression for the correlation coefficient,” Biometrika, v. 10, 1913, p. 384-390. F. Wilcoxon, “Individual comparisons by ranking methods,” Biometrica, v. 1, 1945, p. 80-83.
- Ronald A. Fisher and Frank Yates, Statistical Tables for Biological, Agricultural and Medical Research, Oliver and Boyd, London, 1948. 3d ed. MR 0030288
- Paul L. Dressel, Statistical seminvariants and their estimates with particular emphasis on their relation to algebraic invariants, Ann. Math. Statistics 11 (1940), 33–57. MR 1503, DOI 10.1214/aoms/1177731940 F. Benson & D. R. Cox, “The productivity of machine requiring attention at random intervals,” Roy. Stat. Soc., Jn., ser B, v. 13, 1951, p. 65-82.
- E. L. Kaplan, Auxiliary table of complete elliptic integrals, J. Math. Phys. Mass. Inst. Tech. 25 (1946), 26–36. MR 15903, DOI 10.1002/sapm194625126
- Francesco Tricomi, Generalizzazione di una formula asintotica sui polinomi di Laguerre e sue applicazioni, Atti Accad. Sci. Torino Cl. Sci. Fis. Mat. Natur. 76 (1941), 288–316 (Italian). MR 15909 E. Jahnke & F. Emde, Tafeln höherer Funktionen, ed. 4, Teubner, Leipzig, 1948, p. 32-33.
- Francesco G. Tricomi, Vorlesungen über Orthogonalreihen, Die Grundlehren der mathematischen Wissenschaften in Einzeldarstellungen mit besonderer Berücksichtigung der Anwendungsgebiete, Band LXXVI, Springer-Verlag, Berlin-Göttingen-Heidelberg, 1955 (German). MR 0070746, DOI 10.1007/978-3-662-13399-6
- Lucy J. Slater, A short table of the Laguerre polynomials, Proc. Inst. Elec. Engrs. C. 103 (1956), 46–50. MR 77249, DOI 10.1049/pi-c.1956.0005 T. Clausen, “Über die Zerlegung reeller gebrochener Funktionen,” J. f. d. reine u. angew. Math. (Crelle), v. 8, 1832, p. 298-300. F. W. Newman, The Higher Trigonometry, McMillan and Bowes, Cambridge, 1892. L. J. Comrie, Chambers’s Six-Figure Mathematical Tables, v. 2, Chambers, London, 1959, p. 518.
Additional Information
- © Copyright 1956 American Mathematical Society
- Journal: Math. Comp. 10 (1956), 227-260
- DOI: https://doi.org/10.1090/S0025-5718-56-99306-1