The statistical software output for this problem is :

Sample standard deviation = s = 6.261
A past study claimed that adults in America spent an average of 18 hours a week...
A past study claimed that adults in America spent an average of 18 hours a week on leisure activities. A researcher wanted to test this claim. She took a sample of 10 adults and asked them about the time they spend per week on leisure activities. Their responses (in hours) are as follows. 12.0 13.3 22.6 22.9 22.5 33.1 16 17.2 20.1 20.3 Assume that the times spent on leisure activities by all adults are normally distributed. Using the 5%...
The number of hours spent per week on household chores by all adults has a mean of 26.4 hours and a standard deviation of 6.9 hours. The probability, rounded to four decimal places, that the mean number of hours spent per week on household chores by a sample of 60 adults will be more than 26.75 is?
The number of hours spent per week on household chores by all adults has a mean of 26.4 hours and a standard deviation of 6.9 hours. The probability, rounded to four decimal places, that the mean number of hours spent per week on household chores by a sample of 60 adults will be more than 26.75 is:
QUESTION 2 Previously, an organization reported that teenagers spent 4.5 hours per week, on average, on the phone. The organization thinks that, currently, the mean is higher. Fifteen randomly chosen teenagers were asked how many hours per week they spend on the phone. The sample mean was 4.75 hours with a sample standard deviation of 2 hours. Assume that hours per week they spend on the phone are normally distributed. At a significance level of 5%, test the claim of...
The number of hours spent per week on household chores by all adults has a mean of 26.0 hours and a standard deviation of 6.5 hours. The probability, rounded to four decimal places, that the mean number of hours spent per week on household chores by a sample of 57 adults will be more than 26.75 is: 8082 the absolute tolerance is +-0.0001
Question 5 An carlier study claimed that U.S adults spent an average of 114 minutes per day with their family. A recently raken sample of 25 adults from a city show'eod that they spend an average of 109 minutes per day with their family, Ihe population deviation is I1 minutes. Assume that the times spent by adults with their families have an approximate normal distribution Using a 1% significance level test whether the mean time spent currently by all adults...
According to Nielsen Media Research, the average number of hours of TV viewing by adults (18 and over) per week in the United States is 36.07 hours. Suppose the standard deviation is 9.6 hours and a random sample of 54 adults is taken. a. What is the probability that the sample average is more than 37 hours? b. What is the probability that the sample average is less than 38.5 hours? c. What is the probability that the sample average...
1. To determine the average number of hours spent studying by college students per week, a sample of 39 students was randomly selected, and found to spend an average of 17.1 hours per week, with a standard deviation of 4.3 hours. Find the 90% confidence interval for the mean number of hours spent studying per week by all college students. What is the upper and lower bound? 2. If I asked a random student how many hours they study per...
According to Nielsen Media Research, the average number of hours of TV viewing by adults (18 and over) per week in the United States is 36.07 hours. Suppose the standard deviation is 8.6 hours and a random sample of 42 adults is taken. Appendix A Statistical Tables a. What is the probability that the sample average is more than 35 hours? b. What is the probability that the sample average is less than 36.7 hours? c. What is the probability...
According to Nielsen Media Research, the average number of hours of TV viewing by adults (18 and over) per week in the United States is 36.07 hours. Suppose the standard deviation is 9.7 hours and a random sample of 43 adults is taken. Appendix A Statistical Tables a. What is the probability that the sample average is more than 37 hours? b. What is the probability that the sample average is less than 36.5 hours? c. What is the probability...