Ch 5.3

Surveying 200 college students and recording their favorite TV show

No, because there are more than two possible outcomes

Determine whether the given procedure results in a binomial distribution. If it is not​ binomial, identify the requirements that are not satisfied.

There are certain requirements for a binomial probability experiment. A binomial probability experiment results from a procedure that meets all the following requirements. 1. The procedure has a fixed number of trials. 2. The trials must be independent.​ (The outcome of any individual trial​ doesn't affect the probabilities in the other​ trials.) 3. Each trial must have all outcomes classified in two categories​ (commonly referred to as success and​ failure.) 4. The probability of success remains the same in all trials.

​Multiple-choice questions each have four possible answers (a, b, c, d)​, one of which is correct. Assume that you guess the answers to three such questions. a. Use the multiplication rule to find ​P(WCW​), where C denotes a correct answer and W denotes a wrong answer. b. Beginning with WCW​, make a complete list of the different possible arrangements of one correct answer and two wrong answers​, then find the probability for each entry in the list. c. Based on the preceding​ results, what is the probability of getting exactly one correct answer when three guesses are​ made?

a. 3/4 x 1/4 x 3/4 = 0.140625 b. P(WCW)=0.140625 P(CWW)=0.140625 P(WWC)=0.140625 c. P(WCW) + P(CWW) + P(WWC)=0.421875

A certain TV show recently had a share of 80​, meaning that among the TV sets in​ use, 80​% were tuned to that show. Assume that an advertiser wants to verify that 80​% share value by conducting its own​ survey, and a pilot survey begins with 10 households having TV sets in use at the time of the TV show broadcast. Complete parts​ (a) through​ (d) below. a. Find the probability that all of the households are tuned to the TV show. b. Find the probability that exactly 9 households are tuned to the TV show. c. Find the probability that at least 9 households are tuned to the TV show. d. If at least 9 households are tuned to the TV​ show, does it appear that the 80​% share value is​ wrong? Why or why​ not?

a. p(10)= (0.80)^10 = 0.107 b. p(9)= 10!/(10-9)!9! x (0.8)^9 x (0.2)^(10-9)= 0.268 c. at least 9= 0.268 + 0.107= 0.375 d. No​, because 9 households tuned to the TV show is not unusually high if the share is 80​%. ****To determine if the share value may be​ wrong, recall that x successes among n trials is an unusually high number of successes if P(x or more)≤0.05; and x successes among n trials is an unusually low number of successes if P(x or fewer)≤0.05.

Assume that a procedure yields a binomial distribution with a trial repeated n times. Use the binomial probability formula to find the probability of x successes given the probability p of success on a single trial. n=7​, x=3​, p=0.35

q = 1 − p = 0.65 Now substitute the values of​ n, x,​ p, and q into the formula. P(x)=n!/(n-x)!x! * p^x*q^(n-x) 7!/(7-3)!3! x 0.35^3 x 0.65^(7-3) Subtract 7!/4!3! x 0.35^3 x 0.65^(7-3) Simplify 5040/(6)(24)​ x (0.0429)(0.1785​) 5040/144 x (0.0429)(0.1785​) 35 x (0.0429)(0.1785​) =0.268 p(3)=0.268

Four cards are selected from a standard​ 52-card deck without replacement. The number of sevens selected is recorded.

​No, because the trials of the experiment are not independent and the probability of success differs from trial to trial.

An experimental drug is administered to 40 randomly selected​ individuals, with the number of individuals responding favorably recorded.

​Yes, because the experiment satisfies all the criteria for a binomial experiment.