First, ve need to test whether the two events are independent. Use X to denote the event described by "A person used Brand X," and G to describe the event "A person gave up doing laundry." Recall that the two events are independent if and only if the probability of GnX is equal to the product of the probabilities of X and of G. That is, if and only if P(Gn x) = P(G) · P(X). To ansvier the question, calculate P(G), P(X), and P(G N X) and then compare P(Gn X) to P(G) • P(X). Because 8% of the population gave up doing laundry, the probability that someone quit doing laundry is P(G) = 0.08. Similarly, 70% of the population used Brand X, so the probability that someone was a Brand X user is P(X) = 7 Furthermore, 7% of the population used Brand X and then gave up doing laundry, so the probability that someone vas initially a Brand X user and then quit doing laundry is P(GN X) - I Enter a number.

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Step 1 First, we need to test whether the two events are independent. Use X to denote the event described by "A person used Brand X," and G to describe the event "A person gave up doing laundry." Recall that the two events are independent if and only if the probability of GnX is equal to the product of the probabilities of X and of G. That is, if and only if P(G Nx) = P(G) · P(X). To answer the question, calculate P(G), P(X), and P(GNX) and then compare P(Gn X) to P(G) · P(X). Because 8% of the population gave up doing laundry, the probability that someone quit doing laundry is P(G) = 0.08. Similarly, 70% of the population used Brand X, so the probability that someone was a Brand X user is P(X) = 7 Furthermore, 7% of the population used Brand X and then gave up doing laundry.so.the probability that someone was initially a Brand X user and then quit doing laundry is P(GNX) =| Enter a number. Submit || Skip (you cannot come back)