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    Each individual state in a continuous distribution has pr... — Carmelics
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    Supports→Continuous probability distributions require a restriction to countable additivity rather than full additivity

    Each individual state in a continuous distribution has probability 0

    Modality & Possibility
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    Assigning probability 0 to each individual state while allowing uncountably many...Continuous probability distributions require a restriction to countable additivi...Events containing uncountably many states often have non-zero probabilityIn continuous distributions there are uncountably many states

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    However, many applications of probability require what are known as continuous distributions (such as the uniform/rectangular, normal, and beta distributions), and thus require a restriction to countable additivity. In a continuous distribution, there are uncountably many states, usually named by real numbers. Each individual state has probability 0, even though events containing uncountably many states often have non-zero probability. (This violates full additivity.) However, in the common cont

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