In 1931 de Finetti proved what is known as his Dutch Book Theorem. This result implies that the finite additivity {it axiom} for the probability of the disjunction of two incompatible events becomes a {it consequence} of de Finettis logic-operational consistency notion. Working in the context of boolean algebras, we prove de Finettis theorem. The mathematical background required is little more than that which is taught in high school. As a preliminary step we prove what de Finetti called ``the Fundamental Theorem of Probability, his main contribution both to Booles probabilistic inference problem on the object of probability theory, and to its modern reformulation known as the optimization version of the probabilistic satisfiability problem. In a final section, we give a self-contained combinatorial proof of de Finettis exchangeability theorem.
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