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- https://stats.libretexts.org/Courses/Fresno_City_College/New_FCC_DS_21_Finite_Mathematics_-_Spring_2023/11%3A_Probability/11.05%3A_Independent_Events/11.5.01%3A_Independent_Events_(Exercises)The distribution of the number of fiction and non-fiction books checked out at a city's main library and at a smaller branch on a given day is as follows. If \(P(E) = .6\), \(P(F) = .2\), and \(E\) an...The distribution of the number of fiction and non-fiction books checked out at a city's main library and at a smaller branch on a given day is as follows. If \(P(E) = .6\), \(P(F) = .2\), and \(E\) and \(F\) are independent, find \(P\)(\(E\) and \(F\)). John's probability of passing statistics is 40%, and Linda's probability of passing the same course is 70%. If the two events are independent, find the following probabilities.
- https://stats.libretexts.org/Under_Construction/Purgatory/FCC_-_Finite_Mathematics_-_Spring_2023/11%3A_Probability/11.05%3A_Independent_Events/11.5.01%3A_Independent_Events_(Exercises)The distribution of the number of fiction and non-fiction books checked out at a city's main library and at a smaller branch on a given day is as follows. If \(P(E) = .6\), \(P(F) = .2\), and \(E\) an...The distribution of the number of fiction and non-fiction books checked out at a city's main library and at a smaller branch on a given day is as follows. If \(P(E) = .6\), \(P(F) = .2\), and \(E\) and \(F\) are independent, find \(P\)(\(E\) and \(F\)). John's probability of passing statistics is 40%, and Linda's probability of passing the same course is 70%. If the two events are independent, find the following probabilities.
- https://stats.libretexts.org/Sandboxes/JolieGreen/Finite_Mathematics_-_Spring_2023_-_OER/11%3A_Probability/11.05%3A_Independent_Events/11.5.01%3A_Independent_Events_(Exercises)The distribution of the number of fiction and non-fiction books checked out at a city's main library and at a smaller branch on a given day is as follows. If \(P(E) = .6\), \(P(F) = .2\), and \(E\) an...The distribution of the number of fiction and non-fiction books checked out at a city's main library and at a smaller branch on a given day is as follows. If \(P(E) = .6\), \(P(F) = .2\), and \(E\) and \(F\) are independent, find \(P\)(\(E\) and \(F\)). John's probability of passing statistics is 40%, and Linda's probability of passing the same course is 70%. If the two events are independent, find the following probabilities.
