| Statistical Independence |
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| CATEGORIES ABOUT STATISTICAL INDEPENDENCE | |
| probability theory | |
Similarly, two Random Variable s are independent if the conditional probability distribution of either given the observed value of the other is the same as if the other's value had not been observed. INDEPENDENT EVENTS The standard definition says: :Two events ''A'' and ''B'' are independent If And Only If Pr(''A'' ∩ ''B'') = Pr(''A'')Pr(''B''). Here ''A'' ∩ ''B'' is the Intersection of ''A'' and ''B'', that is, it is the event that both events ''A'' and ''B'' occur. More generally, any collection of events -- possibly more than just two of them -- are mutually independent if and only if for any finite subset ''A''1, ..., ''A''''n'' of the collection we have : This is called the ''multiplication rule'' for independent events. If two events ''A'' and ''B'' are independent, then the Conditional Probability of ''A'' given ''B'' is the same as the unconditional (or marginal) probability of ''A'', that is, : There are at least two reasons why this statement is not taken to be the definition of independence: (1) the two events ''A'' and ''B'' do not play symmetrical roles in this statement, and (2) problems arise with this statement when events of probability 0 are involved. | ||
| : P(''X'' &le''x'', ''Y'' &le''y'' ''Z'' | ''z'') = P(''X'' &le''x'' ''Z'' = ''z'') · P(''Y'' &le ''y'' ''Z'' = ''z'') |
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| : ''p''<sub>''XY''''Z''</sub>(''x'', ''y'' ''z'') | ''p''<sub>''X''''Z''</sub>(''x'' ''z'') · ''p''<sub>''Y''''Z''</sub>(''y'' ''z'') |
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| : P(''X'' | ''x'' ''Y'' = ''y'', ''Z'' = ''z'') = P(''X'' = ''x'' ''Z'' = ''z'') |
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