A student researcher compares the heights of men and women from the student body of a certain college in order to estimate the difference in their mean heights. A random sample of 6 men had a mean height of 68.3 inches with a standard deviation of 1.68 inches. A random sample of 11 women had a mean height of 63.2 inches with a standard deviation of 1.67 inches. Determine the 95% confidence interval for the true mean difference between the mean height of the men and the mean height of the women. Assume that the population variances are equal and that the two populations are normally distributed. Step 1 of 3: Find the critical value that should be used in constructing the confidence interval. Round your answer to three decimal places.
df = n1 + n2 - 2 = 6 + 11 - 2 = 15
From T table,
t critical value at 0.05 level with 15 df = 2.131
A student researcher compares the heights of men and women from the student body of a...
A student researcher compares the heights of men and women from the student body of a certain college in order to estimate the difference in their mean heights. A random sample of 12 men had a mean height of 70.7 inches with a standard deviation of 2.41 inches. A random sample of 17 women had a mean height of 62.7 inches with a standard deviation of 3.07 inches. Determine the 98 % confidence interval for the true mean difference between...
7. A student researcher compares the heights of men and women from the student body of a certain college in order to estimate the difference in their mean heights. A random sample of 14 men had a mean height of 67.7 inches with a standard deviation of 3.06 inches. A random sample of 17 women had a mean height of 64.7 inches with a standard deviation of 1.97 inches. Determine the 90% confidence interval for the true mean difference between...
A student researcher compares the heights of men and women from the student body of a certain college in order to estimate the difference in their mean heights. A random sample of 15 men had a mean height of 70.5 inches with a standard deviation of 1.69 inches. A random sample of 5 women had a mean height of 67.2 inches with a standard deviation of 3.13 inches. Determine the 98% confidence interval for the true mean difference between the...
1) A researcher is studying the heights of men with a certain medical condition. She collects a sample of 37 such men and finds the mean height of the sample to be x̄ = 66.9 inches. Assume that the standard deviation of heights of men with the condition is the same as that of the general population, σ = 2.8 inches. a) Find a 99% confidence interval for the true mean height of the population of mean with this condition....
A researcher was interested in comparing the heights of ninjas in two independent villages. A random sample of 9 ninjas from the Hidden Leaf Village has an average height of 64.744 inches, with a standard deviation of 2.192 inches. A random sample of 9 ninjas from the Hidden Sand Village has an average height of 62.556 inches, with a standard deviation of 2.697 inches. Determine a 90% confidence interval for the difference between the mean height of ninjas in the...
A student researcher compares the ages of cars owned by students and cars owned by faculty at a local state college. A sample of 78 cars owned by students had an average age of 5.04 years. A sample of 118 cars owned by faculty had an average age of 8 years. Assume that the population standard deviation for cars owned by students is 3.06 years, while the population standard deviation for cars owned by faculty is 3.24 years. Determine the...
The admissions officer at a small college compares the scores on the Scholastic Aptitude Test (SAT) for the school's male and female applicants. A random sample of 12 male applicants results in a SAT scoring mean of 1053 with a standard deviation of 30. A random sample of 18 female applicants results in a SAT scoring mean of 1155 with a standard deviation of 42. Using this data, find the 90% confidence interval for the true mean difference between the...
in a certain country the heights of adult men are normally distributed with a mean of 68.3 inches and a standard deviation of 2.8 inches. The country's military requires that men have heights between 63 inches and 78 inches. determine what percentage of men are eligible for military based on height.
The admissions officer at a small college compares the scores on
the Scholastic Aptitude Test (SAT) for the school's male and female
applicants. A random sample of 15 male applicants results in a SAT
scoring mean of 1151 with a standard deviation of 37. A random
sample of 6 female applicants results in a SAT scoring mean of 1095
with a standard deviation of 38. Using this data, find the 95%
confidence interval for the true mean difference between the...
The admissions officer at a small college compares the scores on the Scholastic Aptitude Test (SAT) for the school's in-state and out-of-state applicants. A random sample of 19 in-state applicants results in a SAT scoring mean of 1228 with a standard deviation of 39. A random sample of 11 out-of-state applicants results in a SAT scoring mean of 1168 with a standard deviation of 31. Using this data, find the 80% confidence interval for the true mean difference between the...