A nutritionist wants to determine how much time nationally people spend eating and drinking. Suppose for a random sample of 985 people age 15 or older, the mean amount of time spent eating or drinking per day is 1.13 hours with a standard deviation of 0.63 hour. Complete parts (a) through (d) below. LOADING... Click the icon to view the table of critical t-values. (a) A histogram of time spent eating and drinking each day is skewed right. Use this result to explain why a large sample size is needed to construct a confidence interval for the mean time spent eating and drinking each day. A. Since the distribution of time spent eating and drinking each day is highly skewed right, a large sample size is needed to ensure that it contains at least 5% of the population. B. Since the distribution of time spent eating and drinking each day is highly skewed right, a large sample size is needed to maximize the margin of error to ensure that both tails are accounted for in the confidence interval. C. Since the distribution of time spent eating and drinking each day is highly skewed right, a large sample size is needed to minimize the margin of error to ensure only the peak of the sampling distribution is captured in the confidence interval. D. Since the distribution of time spent eating and drinking each day is highly skewed right, a large sample size is necessary to ensure that the distribution of the sample mean is approximately normal. (b) In 2010, there were over 200 million people nationally age 15 or older. Explain why this, along with the fact that the data were obtained using a random sample, satisfies the requirements for constructing a confidence interval. A. The sample size is greater than 10% of the population. B. The sample size is greater than 5% of the population. C. The sample size is less than 10% of the population. D. The sample size is less than 5% of the population. (c) Determine and interpret a 99% confidence interval for the mean amount of time Americans age 15 or older spend eating and drinking each day. Select the correct choice below and fill in the answer boxes, if applicable, in your choice. (Type integers or decimals rounded to three decimal places as needed. Use ascending order.) A. The nutritionist is 99% confident that the mean amount of time spent eating or drinking per day is between nothing and nothing hours. B. There is a 99% probability that the mean amount of time spent eating or drinking per day is between nothing and nothing hours. C. The nutritionist is 99% confident that the amount of time spent eating or drinking per day for any individual is between nothing and nothing hours. (d) Could the interval be used to estimate the mean amount of time a 9-year-old spends eating and drinking each day? Explain. A. Yes; the interval is about individual time spent eating or drinking per day and can be used to find the mean amount of time a 9-year-old spends eating and drinking each day. B. Yes; the interval is about the mean amount of time spent eating or drinking per day for people age 15 or older and can be used to find the mean amount of time spent eating or drinking per day for 9-year-olds. C. No; the interval is about individual time spent eating or drinking per day and cannot be used to find the mean time spent eating or drinking per day for specific age. D. No; the interval is about people age 15 or older. The mean amount of time spent eating or drinking per day for 9-year-olds may differ.
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