Revision as of 01:12, 5 July 2025 edit 2601:447:cd7e:1870:9dbf:9d14:5bc3:6ce6 (talk) numerous small corrections ← Previous edit		Revision as of 01:14, 5 July 2025 edit undo 2601:447:cd7e:1870:9dbf:9d14:5bc3:6ce6 (talk) →Common fallacies Next edit →
Line 317: === Assuming conditional probability is of similar size to its inverse === {{Main\|Confusion of the inverse}} [[File:Bayes theorem visualisation.svg\|thumb\|450x450px\|A geometric visualization of Bayes' theorem. In the table, the values 2, 3, 6 and 9 give the relative weights of each corresponding condition and case. The figures denote the cells of the table involved in each metric, the probability being the fraction of each figure that is shaded. This shows that <math>P(A\|\mid B) P(B) = P(B\mid A) P(A)</math> i.e. <math>P(A\mid B) = \frac{P(B\mid A)} {P(A)\~~cap~~cdot P(B)}</math> . Similar reasoning can be used to show that <math>P(\bar A\mid B) = \frac{P(B\mid\bar A) P(\bar A)}{P(B)}</math> etc.]] In general, it cannot be assumed that ''P''(''A''\|''B'') ≈ ''P''(''B''\|''A''). This can be an insidious error, even for those who are highly conversant with statistics.<ref>Paulos, J.A. (1988) ''Innumeracy: Mathematical Illiteracy and its Consequences'', Hill and Wang. {{ISBN\|0-8090-7447-8}} (p. 63 ''et seq.'')</ref> The relationship between ''P''(''A''\|''B'') and ''P''(''B''\|''A'') is given by [[Bayes' theorem]]: :<math>\begin{align}

Conditional probability: Difference between revisions