in a random sample of 24 people the average number of minutes spent sleeping each day...

In a random sample of 39 individuals, the average number of minutes spent exercising each week...

In a random sample of 39 individuals, the average number of minutes spent exercising each week was 124.7 minutes with a population standard deviation of 34.3 minutes. Find the 91% confidence interval for the mean. Show your work to receive credit

In a random sample of 39 individuals the average number of minutes spent exercising in each...

In a random sample of 39 individuals the average number of minutes spent exercising in each week what is 124.7 minutes with a population standard deviation of 34.3 minutes.Find the 91% confidence interval for the mean

in a simple random sample of 50 people. it was found that the sample mean time...

in a simple random sample of 50 people. it was found that the sample mean time they spend on social media each day was 42 minutes .suppose it is know that the population standard deviation is 8 minutes. construct a 90% confidence interval of the population mean time spent on social media each day

In a random sample of 23 people aged 18-24, the mean amount of time spent using...

In a random sample of 23 people aged 18-24, the mean amount of time spent using the internet is 45.1 hours per month with a standard deviation of 28.4 hours per month. Assume that the amount of time spent using the internet in this age group is normally distributed. 1. if one were to calculate a confidence interval for the population mean, would it be a z or t confidence interval? use the flow chart to explain your answer. 2....

in a random sample of 24 people, the mean commute time to work was 33.7 minutes...

in a random sample of 24 people, the mean commute time to work was 33.7 minutes and the standard deviation was 7.1 minuets . assume the population is normally distributed and use a t-distribution to construct a 99% confidence interval for the population mean. what is the margin of error of the mean? interpret the results.

in a random sample of 8 people the mean commute time to work was 34.5 minutes...

in a random sample of 8 people the mean commute time to work was 34.5 minutes and the standard deviation was 7.2 minutes. A 90% confidence interval using the t distribution was calculated to be (29.7, 39.3). After researching commute times to work, it was found that the population standard deviation is 9.2 minutes. Find the margin of error and construct a 90% confidence interval using the standard normal distribution with the appropriate calculations for a standard deviation that is...

1. The average number of minutes spent per day using social media by a population of...

1. The average number of minutes spent per day using social media by a population of college sophomores is 29.6 minutes. If we take a random sample of size n = 87 from this population and find that the sample standard deviation is 7.3 minutes, we know the sampling distribution of the sample mean in this case would have a standard deviation equal to A. 4.05 minutes. B. 1.60 minutes. C. 0.78 minutes. D. 7.30 minutes. E. 3.17minutes. 2. Return...

A researcher claims that the mean number of minutes people spend reading a book each day...

A researcher claims that the mean number of minutes people spend reading a book each day is less than 5 minutes. A random sample of 30 people read a mean of 4.7 minutes with a standard deviation of 1.36. Test the researchers claim at the 0.01 level of significance. statistics. determine hypothesis and calculate

In a random sample of 8 ​people, the mean commute time to work was 33.5 minutes...

In a random sample of 8 ​people, the mean commute time to work was 33.5 minutes and the standard deviation was 7.2 minutes. A 90​% confidence interval using the​ t-distribution was calculated to be left parenthesis 28.7 comma 38.3 right parenthesis. After researching commute times to​ work, it was found that the population standard deviation is 9.3 minutes. Find the margin of error and construct a 90​% confidence interval using the standard normal distribution with the appropriate calculations for a...

The waiting times​ (in minutes) of a random sample of 20 people at a bank have...

The waiting times​ (in minutes) of a random sample of 20 people at a bank have a sample standard deviation of 4.1 minutes. Construct a confidence interval for the population variance and the population standard deviation . Use a 90% level of confidence. Assume the sample is from a normally distributed population.