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Learn how to calculate joint probabilities using the intersection of events and the multiplication rule for dependent and independent events. Discover the key formulas and examples to enhance your understanding of probability concepts.
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Intersection of Events and the Multiplication Rule Section 4.8
Intersection of Events • The outcomes that are common to both events. • Denoted by “A and B” or “A ∩ B”
Multiplication Rule for Dependent Events • To find the probability of two or more events happening together. • Joint Probability- P(A and B), is found by multiplying the marginal probability of one event by the conditional probability of the second event. • P(A and B) = P(A) P(B | A) • Joint Probability of mutually exclusive events is zero.
Example: Find the probability that the employee is female and a graduate. P(F ∩ G) = P(F) P(G | F)
Example: Find the probability that the employee is female and a graduate. P(F ∩ G) = P(F) P(G | F)
Example: Find the probability that the employee is female and a graduate. P(F ∩ G) = P(F) P(G | F)
Four out of 20 CD’s are defective, find P(2 CD’s are defective) if selected without replacement.
Calculating Conditional Probability • P(B | A) = P(A ∩ B) / P(A) • Example: P(student is a senior) = .2 and P(student is a senior and a science major) = .03. Find P(student is a science major | senior) .03/.2 = .15
Multiplication Rule for Independent Events • P(A ∩ B) = P(A) P(B) • Example: P(allergic to penicillin) = .2 Find P(3 patients are allergic) = .008 Find P(atleast one is not allergic) = complement of “all three are allergic” = 1-.008 = .992
