Fundamental Ideas / Part I: |
The meaning of probability / 1: |
Probability in relation to the theory of knowledge / 2: |
The measurement of probabilities / 3: |
The principle of indifference / 4: |
Other methods of determining probabilities / 5: |
The weight of arguments / 6: |
Historical retrospect / 7: |
The frequency theory of probability / 8: |
The constructive theory of Part I summarised / 9: |
Fundamental Theories / Part II: |
Introductory / 10: |
The theory of groups, with special inference, and logical priority / 11: |
The definitions and axioms of inference and probability / 12: |
The fundamental theorems of necessary inference / 13: |
The fundamental theorems of probable inference / 14: |
Numerical measurement and approximation of probabilities / 15: |
Observations on the theorems of Chapter 14 and their developments including testimony / 16: |
Some problems in inverse probability, including averages / 17: |
Induction and Analogy / Part III: |
Introduction / 18: |
The nature of argument by analogy / 19: |
The value of multiplication of instances, or pure induction / 20: |
The nature of inductive argument continued / 21: |
The justification of these methods / 22: |
Some historical notes on induction notes on Part III / 23: |
Some Philosophical Applications of Probability / Part IV: |
The meanings of objective chance, and of randomness / 24: |
Some problems arising out of the discussion of chance / 25: |
The application of probability to conduct / 26: |
The Foundations of Statistical Inference / Part V: |
The nature of statistical inference / 27: |
The law of great numbers / 28: |
The use of a priori probabilities for the prediction of statistical frequency âÇô the theorems of Bernoulli, Poisson, and Tchebycheff / 29: |
The mathematical use of statistical frequencies for the determination of probability a posteriori âÇô the methods of Laplace / 30: |
The inversion of Bernoulli's theorem / 31: |
The inductive use of statistical frequencies for the determination of probability a posteriori âÇô the methods of Lexis / 32: |
Outline of a constructive theory / 33: |
Fundamental Ideas / Part I: |
The meaning of probability / 1: |
Probability in relation to the theory of knowledge / 2: |