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Some notes on probability

Published online by Cambridge University Press:  11 August 2014

M. T. L. Bizley
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‘Scientific method is systematic doubt.’

Dr Stuart Chase

We may approach our subject by considering how we are to define probability. This at once raises a number of questions which may be classified under a few broad headings in the following way. First, is the definition to be subjective? By a subjective definition we shall mean in this paper one that admits the possibility that two persons in the same state of relevant knowledge may reasonably hold different views as to the probability of a given event. Secondly, is probability to be only a theoretical concept, or must our definition be such that a probability can be determined by practical experiments and applied to practical problems? Thirdly, are we to embrace all types of event or only a restricted class, e.g. those that occur or can be imagined to occur on a large number of occasions? Fourthly, shall we define probability as a number or are we to admit the existence of a non-numerical probability? And if we stipulate that it is a number, must it be a rational one?

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Research Article
Information
Journal of the Staple Inn Actuarial Society , Volume 10 , Issue 3 , July 1951 , pp. 161 - 203
Copyright
Copyright © Institute of Actuaries Students' Society 1951

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References

Aitken, A. C. (1950). Theories of probability. T.F.A. XIX, 229.Google Scholar
Ball, W. W. Rouse (1939). Mathematical Recreations and Essays. London.Google Scholar
Bertrand, J. (1889). Calcul des Probabilites. Paris.Google Scholar
Boole, G. (1851). On the theory of probabilities and in particular on Michell's problem of the distribution of the fixed stars. Phil. Mag. Google Scholar
Burnside, W. (1936). Theory of Probability. Cambridge.Google Scholar
Carnap, R. (1936, 1937). Testability and meaning. Philosophy of Science, vols. III and IV.Google Scholar
Carnap, R. (1945). Philosophy and Phenomenological Research, issue of June 1945.Google Scholar
Chrystal, G. (1885). Algebra. Edinburgh.Google Scholar
Copeland, A. H. (1900). Admissible numbers in the theory of probability. Amer. J. Math. L.Google Scholar
Cramér, H. (1937). Random Variables and Probability Distributions. Cambridge.Google Scholar
Cramér, H. (1946). Mathematical Methods in Statistics. Princeton.Google Scholar
Fisher, Arne (1922). The Mathematical Theory of Probabilities andits application to Frequency Curves and Statistical Method, 2nd ed. New York.Google Scholar
Fisher, R. A. (1949). The Design of Experiments, 5th ed. London.Google Scholar
Good, I. J. (1950). Probability and the Weighing of Evidence. London.Google Scholar
Hogben, L. (1950). Chance and Choice by Cardpack and Chessboard. London.Google Scholar
Jeffreys, H. (1937). Scientific Inference. Cambridge.Google Scholar
Jeffreys, H. (1939). Theory of Probability. Oxford.Google Scholar
Jeffreys, H. (1946). An invariant form for the prior probability in estimation problems. Proc. Roy'. Soc. A, CLXXXVI, 453–61.Google Scholar
Jeffreys, H. (1948). Theory of Probability, 2nd ed. Oxford.Google Scholar
Kemble, E. C. (1942). Is the frequency theory of probability adequate for all scientific purposes? Amer. J. Phys. x, 616.Google Scholar
Keynes, J. M. (1921). A Treatise on Probability. London.Google Scholar
Kneale, W. (1949). Probability and Induction. Oxford.Google Scholar
Kolmogoroff, A. (1933). Grundbegriffe der Wahrscheinlichkeitsrechnung. Berlin.Google Scholar
Koopman, B. O. (1940). The basis of probability. Bull. Amer. Math. Soc. XLVI, 763–74.Google Scholar
Kraitchik, M. (1943). Mathematical Recreations. London.Google Scholar
Kries, von (1886). Principien der Wahrscheinlichkeitsrechnung.Google Scholar
Laplace, Pierre Simon, Marquis de (1812). Théorie Analytique des Probability. Paris.Google Scholar
Mises, R. von (1928). Wahrscheinlichkeit, Statistik und Wahrheit. Vienna.Google Scholar
Mises, R. von (1931). Wahrscheinlichkeitsrechnung. Leipzig.Google Scholar
Mises, R. von (1936). Probability Statistics and Truth. London (translation of item against (1928)).Google Scholar
Nagel, E. (1939). Principles of the theory of probability. International Encyclopedia of United Science, vol. I, no. 6. University of Chicago Press.Google Scholar
Northrop, E. P. (1945). Riddles in Mathematics. London.Google Scholar
Perks, W. (1947). Some observations on inverse probability including a new indifference rule. J.I.A. LXXIII, 285.Google Scholar
Popper, K. (1935). Logik der Forschung. Vienna.Google Scholar
Ramsey, F. P. (1922). Mr Keynes on probability. The Cambridge Magazine, xi, no. 1 (January 1922).Google Scholar
Ramsey, F. P. (1931). The Foundations of Mathematics. London and New York.Google Scholar
Russell, B. (1922). Math. Gaz. XI, 119–25.Google Scholar
Sheppard, W. F. (1923). Math. Gaz. XI, 405–9.Google Scholar
Smith, D. E. (1929). A Source Book in Mathematics. New York.Google Scholar
Steffensen, J. F. (1950). An introduction to the theory of probability. Proceedings of the Centenary Assembly of the Institute of Actuaries, II, p. 136. Cambridge.Google Scholar
Venn, J. (1866). The Logic of Chance. London.Google Scholar
Venn, J. (1886). The Logic of Chance. 3rd ed. London.Google Scholar