In: Math
Statistics Problem:
You have been asked to engage in one final project for the political organization for which you have been working. This time you wish to study the nature of the relationship between the ages of the donors to the campaign and the amount of money they plan to donate or have donated. Data is collected from a random sample of supporters of the candidate. This data is shown on the next page. Various questions need to be answered about the results you generate. These questions follow the presentation of the data. You should answer the questions posed in the narrative that should accompany your results.
Data:
Age of Supporter Donation
22 $ 75
38 135
50 100
46 50
60 200
28 0
25 10
69 35
75 75
28 100
55 250
37 100
36 100
43 125
35 0
19 0
48 50
70 25
31 115
30 105
Questions:
l) Find a 95% confidence interval for the slope of the population regression line. Provide an explanation of the meaning of this interval. Show how this interval can be used in order to answer the question posed (at the 5% level of significance) in the previous part of the problem.
m) Find a 95% confidence interval for the mean donation for supporters of the candidate who are 30 years of age. Provide an explanation of the meaning of this interval.
n) Suppose a 95% confidence interval for the mean donation for supporters of the candidate who is 50 years of age is desired. Find this interval, explain its meaning, and compare its width to that of the interval computed in the previous part of the problem. Give a reason for any difference in the width between this interval and the one in the previous part of the problem.
o) Find a 95% prediction interval for the donation of an individual supporter of the candidate who is 30 years of age. Explain its meaning relative to the problem. Compare the width of this interval to that of the interval calculated in part m) of the problem. Give a reason for any difference in the width of this interval and the one you found in part m) earlier.