Section Exercises
Linear Equations
Use the following information to answer the next three exercises. A vacation resort rents SCUBA equipment to certified divers. The resort charges an up-front fee of $25 and another fee of $12.50 an hour.
1. What are the dependent and independent variables?
2. Find the equation that expresses the total fee in terms of the number of hours the equipment is rented.
3. Graph the equation from 2.
4. Find the equation that expresses the total fee in terms of the number of days the payment is late.
5. Graph the equation from 4.
6. Is the equation y = 10 + 5x – 3x2 linear? Why or why not?
7. Which of the following equations are linear?
a. y = 6x + 8
b. y + 7 = 3x
c. y – x = 8x2
d. 4y = 8
8. Does the graph show a linear equation? Why or why not?
The table below contains real data for the first two decades of AIDS reporting.
Year | # AIDS cases diagnosed | # AIDS deaths |
Pre-1981 | 91 | 29 |
1981 | 319 | 121 |
1982 | 1,170 | 453 |
1983 | 3,076 | 1,482 |
1984 | 6,240 | 3,466 |
1985 | 11,776 | 6,878 |
1986 | 19,032 | 11,987 |
1987 | 28,564 | 16,162 |
1988 | 35,447 | 20,868 |
1989 | 42,674 | 27,591 |
1990 | 48,634 | 31,335 |
1991 | 59,660 | 36,560 |
1992 | 78,530 | 41,055 |
1993 | 78,834 | 44,730 |
1994 | 71,874 | 49,095 |
1995 | 68,505 | 49,456 |
1996 | 59,347 | 38,510 |
1997 | 47,149 | 20,736 |
1998 | 38,393 | 19,005 |
1999 | 25,174 | 18,454 |
2000 | 25,522 | 17,347 |
2001 | 25,643 | 17,402 |
2002 | 26,464 | 16,371 |
Total | 802,118 | 489,093 |
9. Use the columns “year” and “# AIDS cases diagnosed. Why is “year” the independent variable and “# AIDS cases diagnosed.” the dependent variable (instead of the reverse)?
Use the following information to answer the next two exercises. A specialty cleaning company charges an equipment fee and an hourly labor fee. A linear equation that expresses the total amount of the fee the company charges for each session is y = 50 + 100x.
10. What are the independent and dependent variables?
11. What is the y-intercept and what is the slope? Interpret them using complete sentences.
Use the following information to answer the next three questions. Due to erosion, a river shoreline is losing several thousand pounds of soil each year. A linear equation that expresses the total amount of soil lost per year is y = 12,000x.
12. What are the independent and dependent variables?
13. How many pounds of soil does the shoreline lose in a year?
14. What is the y-intercept? Interpret its meaning.
15. What are the slope and y-intercept? Interpret their meaning.
17. For each of the following situations, state the independent variable and the dependent variable.
- A study is done to determine if elderly drivers are involved in more motor vehicle fatalities than other drivers. The number of fatalities per 100,000 drivers is compared to the age of drivers.
- A study is done to determine if the weekly grocery bill changes based on the number of family members.
- Insurance companies base life insurance premiums partially on the age of the applicant.
- Utility bills vary according to power consumption.
- A study is done to determine if a higher education reduces the crime rate in a population.
18. Piece-rate systems are widely debated incentive payment plans. In a recent study of loan officer effectiveness, the following piece-rate system was examined:
% of goal reached | < 80 | 80 | 100 | 120 |
Incentive | n/a | $4,000 with an additional $125 added per percentage point from 81–99% | $6,500 with an additional $125 added per percentage point from 101–119% | $9,500 with an additional $125 added per percentage point starting at 121% |
19. If a loan officer makes 95% of his or her goal, write the linear function that applies based on the incentive plan table. In context, explain the y-intercept and slope.
Scatter Plots
20. Does the scatter plot appear linear? Strong or weak? Positive or negative?
21. Does the scatter plot appear linear? Strong or weak? Positive or negative?
22. Does the scatter plot appear linear? Strong or weak? Positive or negative?
23. The Gross Domestic Product Purchasing Power Parity is an indication of a country’s currency value compared to another country. The table below shows the GDP PPP of Cuba as compared to US dollars. Construct a scatter plot of the data.
Year | Cuba’s PPP | Year | Cuba’s PPP |
---|---|---|---|
1999 | 1,700 | 2006 | 4,000 |
2000 | 1,700 | 2007 | 11,000 |
2002 | 2,300 | 2008 | 9,500 |
2003 | 2,900 | 2009 | 9,700 |
2004 | 3,000 | 2010 | 9,900 |
2005 | 3,500 |
24. The following table shows the poverty rates and cell phone usage in the United States. Construct a scatter plot of the data
Year | Poverty Rate | Cellular Usage per Capita |
---|---|---|
2003 | 12.7 | 54.67 |
2005 | 12.6 | 74.19 |
2007 | 12 | 84.86 |
2009 | 12 | 90.82 |
25. Does the higher cost of tuition translate into higher-paying jobs? The table lists the top ten colleges based on mid-career salary and the associated yearly tuition costs. Construct a scatter plot of the data.
School | Mid-Career Salary (in thousands) | Yearly Tuition |
---|---|---|
Princeton | 137 | 28,540 |
Harvey Mudd | 135 | 40,133 |
CalTech | 127 | 39,900 |
US Naval Academy | 122 | 0 |
West Point | 120 | 0 |
MIT | 118 | 42,050 |
Lehigh University | 118 | 43,220 |
NYU-Poly | 117 | 39,565 |
Babson College | 117 | 40,400 |
Stanford | 114 | 54,506 |
26. If the level of significance is 0.05 and the p-value is 0.06, what conclusion can you draw?
27. If there are 15 data points in a set of data, what is the number of degree of freedom?
The Regression Equation
Use the following information to answer the next five exercises. A random sample of ten professional athletes produced the following data where x is the number of endorsements the player has and y is the amount of money made (in millions of dollars).
x | y | x | y |
---|---|---|---|
0 | 2 | 5 | 12 |
3 | 8 | 4 | 9 |
2 | 7 | 3 | 9 |
1 | 3 | 0 | 3 |
5 | 13 | 4 | 10 |
28. Draw a scatter plot of the data.
29. Use regression to find the equation for the line of best fit.
31. What is the slope of the line of best fit? What does it represent?
33. What does an r value of zero mean?
35. When n = 100 and r = -0.89, is there a significant correlation? Explain.
36. What is the process through which we can calculate a line that goes through a scatter plot with a linear pattern?
37. Explain what it means when a correlation has an r2 of 0.72.
Testing the Significance of the Correlation Coefficient
39. When testing the significance of the correlation coefficient, what is the null hypothesis?
40. When testing the significance of the correlation coefficient, what is the alternative hypothesis?
42. If the level of significance is 0.05 and the p-value is 0.06, what conclusion can you draw?
Prediction
Use the following information to answer the next two exercises. An electronics retailer used regression to find a simple model to predict sales growth in the first quarter of the new year (January through March). The model is good for 90 days, where x is the day. The model can be written as follows:
ŷ = 101.32 + 2.48x where ŷ is in thousands of dollars.
44. What would you predict the sales to be on day 60?
45. What would you predict the sales to be on day 90?
ŷ = 1350 – 1.2x where x is the number of hours and ŷ represents the number of acres left to mow.
46. How many acres will be left to mow after 20 hours of work?
47. How many acres will be left to mow after 100 hours of work?
48. How many hours will it take to mow all of the lawns? (When is ŷ = 0?)
Table contains real data for the first two decades of AIDS reporting.
Year | # AIDS cases diagnosed | # AIDS deaths |
Pre-1981 | 91 | 29 |
1981 | 319 | 121 |
1982 | 1,170 | 453 |
1983 | 3,076 | 1,482 |
1984 | 6,240 | 3,466 |
1985 | 11,776 | 6,878 |
1986 | 19,032 | 11,987 |
1987 | 28,564 | 16,162 |
1988 | 35,447 | 20,868 |
1989 | 42,674 | 27,591 |
1990 | 48,634 | 31,335 |
1991 | 59,660 | 36,560 |
1992 | 78,530 | 41,055 |
1993 | 78,834 | 44,730 |
1994 | 71,874 | 49,095 |
1995 | 68,505 | 49,456 |
1996 | 59,347 | 38,510 |
1997 | 47,149 | 20,736 |
1998 | 38,393 | 19,005 |
1999 | 25,174 | 18,454 |
2000 | 25,522 | 17,347 |
2001 | 25,643 | 17,402 |
2002 | 26,464 | 16,371 |
Total | 802,118 | 489,093 |
49. Graph “year” versus “# AIDS cases diagnosed” (plot the scatter plot). Do not include pre-1981 data.
50. Perform linear regression. What is the linear equation? Round to the nearest whole number.
52. Solve.
53. Does the line seem to fit the data? Why or why not?
54. What does the correlation imply about the relationship between time (years) and the number of diagnosed AIDS cases reported in the U.S.?
Obtain the graph on your calculator or computer.
56. Write the equation: ŷ= ____________
57. Hand draw a smooth curve on the graph that shows the flow of the data.
58. Does the line seem to fit the data? Why or why not?
60. What does the correlation imply about the relationship between time (years) and the number of diagnosed AIDS cases reported in the U.S.?
62. Enter your data into your calculator or computer. The pre-1981 data should not be included. Why is that so?
63. Write the linear equation, rounding to four decimal places:
- a = _____
- b = _____
- correlation = _____
- n = _____
65. Recently, the annual number of driver deaths per 100,000 for the selected age groups was as follows:
Age | Number of Driver Deaths per 100,000 |
---|---|
17.5 | 38 |
22 | 36 |
29.5 | 24 |
44.5 | 20 |
64.5 | 18 |
80 | 28 |
- For each age group, pick the midpoint of the interval for the x value. (For the 75+ group, use 80.)
- Using “ages” as the independent variable and “Number of driver deaths per 100,000” as the dependent variable, make a scatter plot of the data.
- Calculate the least squares (best–fit) line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Predict the number of deaths for ages 40 and 60.
- Based on the given data, is there a linear relationship between age of a driver and driver fatality rate?
- What is the slope of the least squares (best-fit) line? Interpret the slope.
66. The table below shows the life expectancy for an individual born in the United States in certain years.
Year of Birth | Life Expectancy |
---|---|
1930 | 59.7 |
1940 | 62.9 |
1950 | 70.2 |
1965 | 69.7 |
1973 | 71.4 |
1982 | 74.5 |
1987 | 75 |
1992 | 75.7 |
2010 | 78.7 |
- Decide which variable should be the independent variable and which should be the dependent variable.
- Draw a scatter plot of the ordered pairs.
- Calculate the least squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Find the estimated life expectancy for an individual born in 1950 and for one born in 1982.
- Why aren’t the answers to part e the same as the values in Table that correspond to those years?
- Use the two points in part e to plot the least squares line on your graph from part b.
- Based on the data, is there a linear relationship between the year of birth and life expectancy?
- Are there any outliers in the data?
- Using the least squares line, find the estimated life expectancy for an individual born in 1850. Does the least squares line give an accurate estimate for that year? Explain why or why not.
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
67. The maximum discount value of the Entertainment® card for the “Fine Dining” section, Edition ten, for various pages is given in the table below.
Page number | Maximum value ($) |
---|---|
4 | 16 |
14 | 19 |
25 | 15 |
32 | 17 |
43 | 19 |
57 | 15 |
72 | 16 |
85 | 15 |
90 | 17 |
- Decide which variable should be the independent variable and which should be the dependent variable.
- Draw a scatter plot of the ordered pairs.
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Find the estimated maximum values for the restaurants on page ten and on page 70.
- Does it appear that the restaurants giving the maximum value are placed in the beginning of the “Fine Dining” section? How did you arrive at your answer?
- Suppose that there were 200 pages of restaurants. What do you estimate to be the maximum value for a restaurant listed on page 200?
- Is the least squares line valid for page 200? Why or why not?
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
68. The table below gives the gold medal times for every other Summer Olympics for the women’s 100-meter freestyle (swimming).
Year | Time (seconds) |
---|---|
1912 | 82.2 |
1924 | 72.4 |
1932 | 66.8 |
1952 | 66.8 |
1960 | 61.2 |
1968 | 60.0 |
1976 | 55.65 |
1984 | 55.92 |
1992 | 54.64 |
2000 | 53.8 |
2008 | 53.1 |
- Decide which variable should be the independent variable and which should be the dependent variable.
- Draw a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least squares line. Put the equation in the form of: ŷ = a + bx.
- Find the correlation coefficient. Is the decrease in times significant?
- Find the estimated gold medal time for 1932. Find the estimated time for 1984.
- Why are the answers from part f different from the chart values?
- Does it appear that a line is the best way to fit the data? Why or why not?
- Use the least-squares line to estimate the gold medal time for the next Summer Olympics. Do you think that your answer is reasonable? Why or why not?
State | # letters in name | Year entered the Union | Rank for entering the Union | Area (square miles) |
---|---|---|---|---|
Alabama | 7 | 1819 | 22 | 52,423 |
Colorado | 8 | 1876 | 38 | 104,100 |
Hawaii | 6 | 1959 | 50 | 10,932 |
Iowa | 4 | 1846 | 29 | 56,276 |
Maryland | 8 | 1788 | 7 | 12,407 |
Missouri | 8 | 1821 | 24 | 69,709 |
New Jersey | 9 | 1787 | 3 | 8,722 |
Ohio | 4 | 1803 | 17 | 44,828 |
South Carolina | 13 | 1788 | 8 | 32,008 |
Utah | 4 | 1896 | 45 | 84,904 |
Wisconsin | 9 | 1848 | 30 | 65,499 |
69. We are interested in whether or not the number of letters in a state name depends upon the year the state entered the Union.
- Decide which variable should be the independent variable and which should be the dependent variable.
- Draw a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx.
- Find the correlation coefficient. What does it imply about the significance of the relationship?
- Find the estimated number of letters (to the nearest integer) a state would have if it entered the Union in 1900. Find the estimated number of letters a state would have if it entered the Union in 1940.
- Does it appear that a line is the best way to fit the data? Why or why not?
- Use the least-squares line to estimate the number of letters a new state that enters the Union this year would have. Can the least squares line be used to predict it? Why or why not?
Outliers
Use the following information to answer the next four exercises. The scatter plot shows the relationship between hours spent studying and exam scores. The line shown is the calculated line of best fit. The correlation coefficient is 0.69.
70. Do there appear to be any outliers?
72. What effect did the potential outlier have on the line of best fit?
74. The Sum of Squared Errors for a data set of 18 numbers is 49. What is the standard deviation?
76. The height (sidewalk to roof) of notable tall buildings in America is compared to the number of stories of the building (beginning at street level).
Height (in feet) | Stories |
---|---|
1,050 | 57 |
428 | 28 |
362 | 26 |
529 | 40 |
790 | 60 |
401 | 22 |
380 | 38 |
1,454 | 110 |
1,127 | 100 |
700 | 46 |
- Using “stories” as the independent variable and “height” as the dependent variable, make a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables?
- Calculate the least squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Find the estimated heights for 32 stories and for 94 stories.
- Based on the data in Table, is there a linear relationship between the number of stories in tall buildings and the height of the buildings?
- Are there any outliers in the data? If so, which point(s)?
- What is the estimated height of a building with six stories? Does the least squares line give an accurate estimate of height? Explain why or why not.
- Based on the least squares line, adding an extra story is predicted to add about how many feet to a building?
- What is the slope of the least squares (best-fit) line? Interpret the slope.
77. Ornithologists, scientists who study birds, tag sparrow hawks in 13 different colonies to study their population. They gather data for the percent of new sparrow hawks in each colony and the percent of those that have returned from migration.
Percent return:74; 66; 81; 52; 73; 62; 52; 45; 62; 46; 60; 46; 38
- Enter the data into your calculator and make a scatter plot.
- Use your calculator’s regression function to find the equation of the least-squares regression line. Add this to your scatter plot from part a.
- Explain in words what the slope and y-intercept of the regression line tell us.
- How well does the regression line fit the data? Explain your response.
- Which point has the largest residual? Explain what the residual means in context. Is this point an outlier? An influential point? Explain.
- An ecologist wants to predict how many birds will join another colony of sparrow hawks to which 70% of the adults from the previous year have returned. What is the prediction?
78. The following table shows data on average per capita wine consumption and heart disease rate in a random sample of 10 countries.
Yearly wine consumption in liters | 2.5 | 3.9 | 2.9 | 2.4 | 2.9 | 0.8 | 9.1 | 2.7 | 0.8 | 0.7 |
Death from heart diseases | 221 | 167 | 131 | 191 | 220 | 297 | 71 | 172 | 211 | 300 |
- Enter the data into your calculator and make a scatter plot.
- Use your calculator’s regression function to find the equation of the least-squares regression line. Add this to your scatter plot from part a.
- Explain in words what the slope and y-intercept of the regression line tell us.
- How well does the regression line fit the data? Explain your response.
- Which point has the largest residual? Explain what the residual means in context. Is this point an outlier? An influential point? Explain.
- Do the data provide convincing evidence that there is a linear relationship between the amount of alcohol consumed and the heart disease death rate? Carry out an appropriate test at a significance level of 0.05 to help answer this question.
79. The following table consists of one student athlete’s time (in minutes) to swim 2000 yards and the student’s heart rate (beats per minute) after swimming on a random sample of 10 days:
Swim Time | Heart Rate |
---|---|
34.12 | 144 |
35.72 | 152 |
34.72 | 124 |
34.05 | 140 |
34.13 | 152 |
35.73 | 146 |
36.17 | 128 |
35.57 | 136 |
35.37 | 144 |
35.57 | 148 |
- Enter the data into your calculator and make a scatter plot.
- Use your calculator’s regression function to find the equation of the least-squares regression line. Add this to your scatter plot from part a.
- Explain in words what the slope and y-intercept of the regression line tell us.
- How well does the regression line fit the data? Explain your response.
- Which point has the largest residual? Explain what the residual means in context. Is this point an outlier? An influential point? Explain.
80. A researcher is investigating whether non-white minorities commit a disproportionate number of homicides. He uses demographic data from Detroit, MI to compare homicide rates and the number of the population that are white males.
White Males | Homicide rate per 100,000 people |
---|---|
558,724 | 8.6 |
538,584 | 8.9 |
519,171 | 8.52 |
500,457 | 8.89 |
482,418 | 13.07 |
465,029 | 14.57 |
448,267 | 21.36 |
432,109 | 28.03 |
416,533 | 31.49 |
401,518 | 37.39 |
387,046 | 46.26 |
373,095 | 47.24 |
359,647 | 52.33 |
- Use your calculator to construct a scatter plot of the data. What should the independent variable be? Why?
- Use your calculator’s regression function to find the equation of the least-squares regression line. Add this to your scatter plot.
- Discuss what the following mean in context.
- The slope of the regression equation
- The y-intercept of the regression equation
- The correlation r
- The coefficient of determination r2.
- Do the data provide convincing evidence that there is a linear relationship between the number of white males in the population and the homicide rate? Carry out an appropriate test at a significance level of 0.05 to help answer this question.
School | Mid-Career Salary (in thousands) | Yearly Tuition |
---|---|---|
Princeton | 137 | 28,540 |
Harvey Mudd | 135 | 40,133 |
CalTech | 127 | 39,900 |
US Naval Academy | 122 | 0 |
West Point | 120 | 0 |
MIT | 118 | 42,050 |
Lehigh University | 118 | 43,220 |
NYU-Poly | 117 | 39,565 |
Babson College | 117 | 40,400 |
Stanford | 114 | 54,506 |
81. Using the data to determine the linear-regression line equation with the outliers removed. Is there a linear correlation for the data set with outliers removed? Justify your answer.
82. The average number of people in a family that received welfare for various years is given in Table.
Year | Welfare family size |
---|---|
1969 | 4.0 |
1973 | 3.6 |
1975 | 3.2 |
1979 | 3.0 |
1983 | 3.0 |
1988 | 3.0 |
1991 | 2.9 |
- Using “year” as the independent variable and “welfare family size” as the dependent variable, draw a scatter plot of the data.
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Pick two years between 1969 and 1991 and find the estimated welfare family sizes.
- Based on the data in Table, is there a linear relationship between the year and the average number of people in a welfare family?
- Using the least-squares line, estimate the welfare family sizes for 1960 and 1995. Does the least-squares line give an accurate estimate for those years? Explain why or why not.
- Are there any outliers in the data?
- What is the estimated average welfare family size for 1986? Does the least squares line give an accurate estimate for that year? Explain why or why not.
- What is the slope of the least squares (best-fit) line? Interpret the slope.
83. The percent of female wage and salary workers who are paid hourly rates is given in Table for the years 1979 to 1992.
Year | Percent of workers paid hourly rates |
---|---|
1979 | 61.2 |
1980 | 60.7 |
1981 | 61.3 |
1982 | 61.3 |
1983 | 61.8 |
1984 | 61.7 |
1985 | 61.8 |
1986 | 62.0 |
1987 | 62.7 |
1990 | 62.8 |
1992 | 62.9 |
- Using “year” as the independent variable and “percent” as the dependent variable, draw a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Find the estimated percents for 1991 and 1988.
- Based on the data, is there a linear relationship between the year and the percent of female wage and salary earners who are paid hourly rates?
- Are there any outliers in the data?
- What is the estimated percent for the year 2050? Does the least-squares line give an accurate estimate for that year? Explain why or why not.
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
Size (ounces) | Cost ($) | Cost per ounce |
---|---|---|
16 | 3.99 | |
32 | 4.99 | |
64 | 5.99 | |
200 | 10.99 |
84.
- Using “size” as the independent variable and “cost” as the dependent variable, draw a scatter plot.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- If the laundry detergent were sold in a 40-ounce size, find the estimated cost.
- If the laundry detergent were sold in a 90-ounce size, find the estimated cost.
- Does it appear that a line is the best way to fit the data? Why or why not?
- Are there any outliers in the given data?
- Is the least-squares line valid for predicting what a 300-ounce size of the laundry detergent would you cost? Why or why not?
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
85.
- Complete Table for the cost per ounce of the different sizes.
- Using “size” as the independent variable and “cost per ounce” as the dependent variable, draw a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- If the laundry detergent were sold in a 40-ounce size, find the estimated cost per ounce.
- If the laundry detergent were sold in a 90-ounce size, find the estimated cost per ounce.
- Does it appear that a line is the best way to fit the data? Why or why not?
- Are there any outliers in the the data?
- Is the least-squares line valid for predicting what a 300-ounce size of the laundry detergent would cost per ounce? Why or why not?
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
86. According to a flyer by a Prudential Insurance Company representative, the costs of approximate probate fees and taxes for selected net taxable estates are as follows:
Net Taxable Estate ($) | Approximate Probate Fees and Taxes ($) |
---|---|
600,000 | 30,000 |
750,000 | 92,500 |
1,000,000 | 203,000 |
1,500,000 | 438,000 |
2,000,000 | 688,000 |
2,500,000 | 1,037,000 |
3,000,000 | 1,350,000 |
- Decide which variable should be the independent variable and which should be the dependent variable.
- Draw a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx.
- Find the correlation coefficient. Is it significant?
- Find the estimated total cost for a next taxable estate of $1,000,000. Find the cost for $2,500,000.
- Does it appear that a line is the best way to fit the data? Why or why not?
- Are there any outliers in the data?
- Based on these results, what would be the probate fees and taxes for an estate that does not have any assets?
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
87. The following are advertised sale prices of color televisions at Anderson’s.
Size (inches) | Sale Price ($) |
---|---|
9 | 147 |
20 | 197 |
27 | 297 |
31 | 447 |
35 | 1177 |
40 | 2177 |
60 | 2497 |
- Decide which variable should be the independent variable and which should be the dependent variable.
- Draw a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Find the estimated sale price for a 32 inch television. Find the cost for a 50 inch television.
- Does it appear that a line is the best way to fit the data? Why or why not?
- Are there any outliers in the data?
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
88. Table shows the average heights for American boy s in 1990.
Age (years) | Height (cm) |
---|---|
birth | 50.8 |
2 | 83.8 |
3 | 91.4 |
5 | 106.6 |
7 | 119.3 |
10 | 137.1 |
14 | 157.5 |
- Decide which variable should be the independent variable and which should be the dependent variable.
- Draw a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. Is it significant?
- Find the estimated average height for a one-year-old. Find the estimated average height for an eleven-year-old.
- Does it appear that a line is the best way to fit the data? Why or why not?
- Are there any outliers in the data?
- Use the least squares line to estimate the average height for a sixty-two-year-old man. Do you think that your answer is reasonable? Why or why not?
- What is the slope of the least-squares (best-fit) line? Interpret the slope.
State | # letters in name | Year entered the Union | Ranks for entering the Union | Area (square miles) |
---|---|---|---|---|
Alabama | 7 | 1819 | 22 | 52,423 |
Colorado | 8 | 1876 | 38 | 104,100 |
Hawaii | 6 | 1959 | 50 | 10,932 |
Iowa | 4 | 1846 | 29 | 56,276 |
Maryland | 8 | 1788 | 7 | 12,407 |
Missouri | 8 | 1821 | 24 | 69,709 |
New Jersey | 9 | 1787 | 3 | 8,722 |
Ohio | 4 | 1803 | 17 | 44,828 |
South Carolina | 13 | 1788 | 8 | 32,008 |
Utah | 4 | 1896 | 45 | 84,904 |
Wisconsin | 9 | 1848 | 30 | 65,499 |
89. We are interested in whether there is a relationship between the ranking of a state and the area of the state.
- What are the independent and dependent variables?
- What do you think the scatter plot will look like? Make a scatter plot of the data.
- Does it appear from inspection that there is a relationship between the variables? Why or why not?
- Calculate the least-squares line. Put the equation in the form of: ŷ = a + bx
- Find the correlation coefficient. What does it imply about the significance of the relationship?
- Find the estimated areas for Alabama and for Colorado. Are they close to the actual areas?
- Use the two points in part f to plot the least-squares line on your graph from part b.
- Does it appear that a line is the best way to fit the data? Why or why not?
- Are there any outliers?
- Use the least squares line to estimate the area of a new state that enters the Union. Can the least-squares line be used to predict it? Why or why not?
- Delete “Hawaii” and substitute “Alaska” for it. Alaska is the forty-ninth, state with an area of 656,424 square miles.
- Calculate the new least-squares line.
- Find the estimated area for Alabama. Is it closer to the actual area with this new least-squares line or with the previous one that included Hawaii? Why do you think that’s the case?
- Do you think that, in general, newer states are larger than the original states?