Revision as of 23:26, 29 April 2023 by Admin (Created page with "'''Solution: C''' Let C be the event that the employee contributes to a supplemental retirement plan and let F be the event that the employee is female. Then, by Bayes’ The...")
Exercise
Apr 30'23
Answer
Solution: C
Let C be the event that the employee contributes to a supplemental retirement plan and let F be the event that the employee is female. Then, by Bayes’ Theorem,
[[math]]
\operatorname{P}(F | C) = \frac{\operatorname{P}(C | F ) \operatorname{P}( F )}{\operatorname{P}(C | F ) \operatorname{P}( F ) + \operatorname{P}(C | F ) \operatorname{P}( F )} = \frac{0.2(0.45)}{0.2(0.45) + 0.3(0.55)} = 0.353.
[[/math]]
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