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- Math. Comp. 5 (1951), 11-27 Request permission
Corrigendum: Math. Comp. 5 (1951), 259.
References
- C. E. Bickmore & O. Western, โA table of complex prime factors in the field of 8th roots of unity,โ Messenger Math., v. 41, 1911, p. 52-64.
- S. M. Kerawala, The enumeration of the Latin rectangle of depth three by means of a difference equation, Bull. Calcutta Math. Soc. 33 (1941), 119โ127. MR 6991
- E. Bodewig, Bericht รผber die verschiedenen Methoden zur Lรถsung eines Systems linearer Gleichungen mit reellen Koeffizienten. IV, V, Nederl. Akad. Wetensch., Proc. 51 (1948), 53โ64, 211โ219=Indagationes Math. 10, 24โ35, 82โ90 (1948) (German). MR 25261
- W. G. Bickley, Formulae for numerical differentiation, Math. Gaz. 25 (1941), 19โ27. MR 3580, DOI 10.2307/3606475
- F. J. Anscombe, The transformation of Poisson, binomial and negative-binomial data, Biometrika 35 (1948), 246โ254. MR 28556, DOI 10.1093/biomet/35.3-4.246
- Ronald A. Fisher and Frank Yates, Statistical Tables for Biological, Agricultural and Medical Research, Oliver and Boyd, London, 1948. 3d ed. MR 0030288
- M. G. Kendall, Contributions to the Study of Oscillatory Time-Series, National Institute of Economic and Social Research. Occasional Papers. IX, Cambridge, at the University Press; New York, The Macmillan Company, 1946. MR 0019857 L. W. Pollak, Rechentafeln zur Harmonischen Analyse. Leipzig, 1926. J. Peters, Achtstellige Tafel der trigonometrischen Funktionen fรผr jede Sexagesimalsekunde des Quadranten. Berlin, 1939.
- J. Westenberg, Significance test for median and interquartile range in samples from continuous populations of any form, Nederl. Akad. Wetensch., Proc. 51 (1948), 252โ261. MR 25708 NBS, Tables of the Binomial Probability Distribution. NBS Applied Math. Series, No. 6, Washington, 1950 [MTAC, v. 4, p. 208-209]. G. N. Watson, A Treatise on the Theory of Bessel Functions. Cambridge, 1922.
- Harold Levine and Julian Schwinger, On the theory of diffraction by an aperture in an infinite plane screen. I, Phys. Rev. (2) 74 (1948), 958โ974. MR 26920, DOI 10.1103/PhysRev.74.958 G. N. Watson, A Treatise on the Theory of Bessel Functions. Cambridge, 1922, p. 666-685.
- Arnold N. Lowan and Milton Abramowitz, Table of the integrals $\int ^x_0J_0(t)dt$ and $\int ^x_0Y_0(t) dt$, J. Math. Phys. Mass. Inst. Tech. 22 (1943), 2โ12. MR 8335, DOI 10.1002/sapm19432212 MTAC, v. 3, p. 66.
Additional Information
- © Copyright 1951 American Mathematical Society
- Journal: Math. Comp. 5 (1951), 11-27
- DOI: https://doi.org/10.1090/S0025-5718-51-99446-X