(Solved): In 2016 the Better Business Bureau settled 81% of complaints they received in the United States. Sup ...

In 2016 the Better Business Bureau settled 81% of complaints they received in the United States. Suppose you have been hired by the Better Business Bureau to investigate the complaints they received this year involving new car dealers. You plan to select a sample of new car dealer complaints to estimate the proportion of complaints the Better Business Bureau is able to settle. Assume the population proportion of complaints settled for new car dealers is .081, the same as the overall proportion of complaints settled in 2016. Use the z-table

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In 2016 the Better Business Bureau settled \( 81 \% \) of complaints they received in the United States. Suppose you have been hired by the Better Business Bureau to investigate the complaints they received this year involving new car dealers. You plan to select a sample of new car dealer complaints to estimate the same as the overall proportion of complaints settled in 2016. Use the z-table. a. Suppose you select a sample of 200 complaints involving new car dealers. Show the sampling distribution of \( \bar{p} \). \( E(\bar{p})=\quad \quad \) (to 2 decimals) \( \sigma_{\bar{p}}=\quad \) (to 4 decimals) b. Based upon a sample of 200 complaints, what is the probability that the sample proportion will be within \( 0.01 \) of the population 4 decimals probability \( = \) c. Suppose you select a sample of 410 complaints involving new car dealers. Show the sampling distribution of \( \bar{p} \). \( E(\bar{p})=\quad \) (to 2 decimals \( \sigma_{\bar{p}}=\quad \) (to 4 decimals) d. Based upon the larger sample of 410 complaints, what is the probability that the sample proportion will be with \( 0.01 \) of the populion decimals)? probability = e. As measured by the increase in probability, how much do you gain in precision by taking the larger sample in part (d)? The probability of the sample proportion being within \( 0.01 \) of the population mean is increased by (to 3 decimals). There is a gain in precision by the sample size.