Deck 3: Relationships Between Quantitative Variables

A scatterplot of geographic latitude (X) and average January temperature (Y) for 20 cities in the United States is given below. Is there a positive association or a negative association? Explain what such an association means in the context of this situation.

A scatterplot of y = height and x = left forearm length (cm) for 55 college students is given below. Is there a positive association or a negative association? Explain what this association means in the context of this situation.

The following plot shows the association between weight (pounds) and age (months) for 19 female bears. Write an interpretation of this plot. Is the association negative or positive? Linear or curvilinear? Are there any outliers?

A car salesman is curious if he can predict the fuel efficiency of a car (in MPG) if he knows the fuel capacity of the car (in gallons). He collects data on a variety of makes and models of cars. The scatterplot below shows the association between fuel capacity and fuel efficiency for a sample of 78 cars. Is the association negative or positive? Linear or curvilinear? Are there any outliers?

In an attempt to model the relationship between sales price and assessed land value, a realtor has taken a simple random sample of houses recently sold in the area and obtained the following data (both are expressed in thousands of dollars). The scatterplot below shows the association between fuel capacity and fuel efficiency for a sample of 78 cars. Is the association negative or positive? Linear or curvilinear? Are there any outliers?

Which graph shows a pattern that would be appropriately described by the equation $\hat{y}$ = $b_{0}$ + $b_{1}x$ ?

A regression line is a straight line that describes how values of a quantitative explanatory variable (y) are related, on average, to values of a quantitative response variable (x).

The equation of a regression line is called the regression equation.

A regression line can be used to estimate the average value of y at any specified value of x.

A regression line can be used to predict the unknown value of x for an individual, given that individual's y value.

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The simple linear regression equation can be written as $\hat{y}$ = $b_{0}$ + $b_{1}x$

-In the simple linear regression equation, the symbol $\hat{y}$ represents the

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The simple linear regression equation can be written as $\hat{y}$ = $b_{0}$ + $b_{1}x$

-In the simple linear regression equation, the term $b_{0}$ represents the

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The simple linear regression equation can be written as $\hat{y}$ = $b_{0}$ + $b_{1}x$

-In the simple linear regression equation, the term $b_{1}$ represents the

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The simple linear regression equation can be written as $\hat{y}$ = $b_{0}$ + $b_{1}x$

-In the simple linear regression equation, the symbol x represents the

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The simple linear regression equation can be written as $\hat{y}$ = $b_{0}$ + $b_{1}x$

-In the simple linear regression equation, $b_{1}$ represents the slope of the regression line. Which of the following gives the best interpretation of the slope?

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A regression between foot length (response variable in cm) and height (explanatory variable in inches) for 33 students resulted in the following regression equation: $\hat{y}$ = 10.9 + 0.23x

-One student in the sample was 73 inches tall with a foot length of 29 cm. What is the predicted foot length for this student?

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A regression between foot length (response variable in cm) and height (explanatory variable in inches) for 33 students resulted in the following regression equation: $\hat{y}$ = 10.9 + 0.23x

-One student in the sample was 73 inches tall with a foot length of 29 cm. What is the residual for this student?

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A regression between foot length (response variable in cm) and height (explanatory variable in inches) for 33 students resulted in the following regression equation: $\hat{y}$ = 10.9 + 0.23x

-What is the estimated average foot length for students who are 70 inches tall?

The following scatterplot shows the relationship between the left and right forearm lengths (cm) for 55 college students along with the regression line, where y = left forearm length x = right forearm length. (Source: physical dataset on the CD.) Which is the appropriate equation for the regression line in the plot?

The regression line for a set of points is given by $\hat{y}$ = 12 - 6x. What is the slope of the line?

A regression analysis done with Minitab for left foot length (y variable) and right foot length (x variable) for 55 college students gave the following output. The regression equation for left foot length (y variable) and right foot length (x variable) is

In a certain study the relationship between (social) mobility of female foreign American residents and the number of years they have lived in the U.S. is examined. The researcher hopes to predict the mobility of these women based on their length of stay. Part of the SPSS output is shown below: What is the correct regression equation for summarizing this linear relationship?

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A graduate student is doing a research project on stress among recent immigrants. She focused on parents of young children. All parents answered questions on a questionnaire (with the help of a translator if necessary). A stress score was calculated for all participants. SPSS was used to run a simple linear regression in which y = stress of the parent and x = age of the parent.


-A least squares line or least squares regression line has the property that the sum of squared differences between the observed values of y and the predicted values $\hat{y}$ is smaller for that line than it is for any other line. What is the value of the SSE for this regression line?

A basketball coach of a youth team wishes to predict the number of points the players will score in their first season as a junior (y) based on the number of points they scored in their last season as youth players (x). The average number of points the team scored as youth players was $\overline{x}$ =7.9 and the average number of points they scored in their first year as junior players was $\overline{y}$ = 10.2. The slope is b₁ = 0.79. What is the predicted number of goals for a player who scored 7 goals in his last season as a youth player?

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A regression was done for 20 cities with latitude as the explanatory variable (x) and average January temperature as the response variable (y). The latitude is measured in degrees and average January temperature in degrees Fahrenheit. The latitudes ranged from 26 (Miami) to 47 (Duluth) The regression equation is $\hat{y}$ = 49.4 - 0.313x
-The city of Pittsburgh, PA has latitude 40 degrees with average January temperature of 25 degrees Fahrenheit. What is the estimated average January temperature for Pittsburgh, based on the regression equation? What is the residual?

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A regression was done for 20 cities with latitude as the explanatory variable (x) and average January temperature as the response variable (y). The latitude is measured in degrees and average January temperature in degrees Fahrenheit. The latitudes ranged from 26 (Miami) to 47 (Duluth) The regression equation is $\hat{y}$ = 49.4 - 0.313x
-The city of Miami, Florida has latitude 26 degrees with average January temperature of 67 degrees Fahrenheit. What is the estimated average January temperature for Miami, based on the regression equation? What is the residual?

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A regression was done for 20 cities with latitude as the explanatory variable (x) and average January temperature as the response variable (y). The latitude is measured in degrees and average January temperature in degrees Fahrenheit. The latitudes ranged from 26 (Miami) to 47 (Duluth) The regression equation is $\hat{y}$ = 49.4 - 0.313x
-Mexico City has latitude 20 degrees. What is the problem with using the regression equation to estimate the average January temperature for Mexico City?

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The next three questions are based on a regression equation for 55 college students with x = left forearm length (cm) and y = height. The forearm lengths ranged from 22 cm to 31 cm. The regression equation is $\hat{y}$ = 30.3 + 1.49x
-One student's left forearm length was 27 cm, and his height was 75 inches. What is the estimated height for this student, based on the regression equation? What is the residual?

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The next three questions are based on a regression equation for 55 college students with x = left forearm length (cm) and y = height. The forearm lengths ranged from 22 cm to 31 cm. The regression equation is $\hat{y}$ = 30.3 + 1.49x
-One student's left forearm length was 22 cm, and her height was 63 inches. What is the estimated height for this student, based on the regression equation? What is the residual?

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The next three questions are based on a regression equation for 55 college students with x = left forearm length (cm) and y = height. The forearm lengths ranged from 22 cm to 31 cm. The regression equation is $\hat{y}$ = 30.3 + 1.49x
-The instructor's left forearm length is 35 cm. Is there any problem with using the regression equation to estimate the instructor's height?

The scatterplot below shows students' heights (y) versus father's heights (x) for a sample of 173 college students. The symbol "+" represents a male student and the symbol "o" represents a female student.
A linear regression equation is determined for the relationship between female students' heights and their father's heights and, separately, one for male students and their fathers. How do the y-intercepts compare for these two regression equations?

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The following output is for a simple regression in which y = grade point average (GPA) and x = number of classes skipped in a typical week. The results were determined using self-reported data for a sample of n = 1,673 students at a large northeastern university.


-What is the value of the slope of the sample regression line? Write a sentence that interprets this slope in the context of this situation.

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The following output is for a simple regression in which y = grade point average (GPA) and x = number of classes skipped in a typical week. The results were determined using self-reported data for a sample of n = 1,673 students at a large northeastern university.


-What is the predicted grade point average for a student who skips 4 classes per typical week?

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The 25 item "Parenting Hassles Scale" asks parents questions about certain situations in their family. They are asked to rate these situations on (1) how often they occur (frequency), and (2) how much they bother them (intensity). The score system for the frequency was 0-4 points (0 = never, 4 = all the time) and for the intensity 1-5 (1 = not much at all, 5 = very much). If an item received a 0 (zero) for frequency, it automatically received a 0 (zero) for intensity. The two variables, frequency and intensity, were formed by taking the total of the corresponding scores from the two rating scales across the various situations. In a scatterplot, these two variables showed an approximate linear relationship. They were then used to run a linear regression to predict intensity based on frequency.

-What is the predicted intensity score for someone who scores a 45 on the frequency scale?

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The 25 item "Parenting Hassles Scale" asks parents questions about certain situations in their family. They are asked to rate these situations on (1) how often they occur (frequency), and (2) how much they bother them (intensity). The score system for the frequency was 0-4 points (0 = never, 4 = all the time) and for the intensity 1-5 (1 = not much at all, 5 = very much). If an item received a 0 (zero) for frequency, it automatically received a 0 (zero) for intensity. The two variables, frequency and intensity, were formed by taking the total of the corresponding scores from the two rating scales across the various situations. In a scatterplot, these two variables showed an approximate linear relationship. They were then used to run a linear regression to predict intensity based on frequency.

-What is an estimate for the average intensity score for parents who score 33 on the frequency scale?

Use the following information for questions:
The 25 item "Parenting Hassles Scale" asks parents questions about certain situations in their family. They are asked to rate these situations on (1) how often they occur (frequency), and (2) how much they bother them (intensity). The score system for the frequency was 0-4 points (0 = never, 4 = all the time) and for the intensity 1-5 (1 = not much at all, 5 = very much). If an item received a 0 (zero) for frequency, it automatically received a 0 (zero) for intensity. The two variables, frequency and intensity, were formed by taking the total of the corresponding scores from the two rating scales across the various situations. In a scatterplot, these two variables showed an approximate linear relationship. They were then used to run a linear regression to predict intensity based on frequency.

-Dan filled out the "Parenting Hassles Scale". He scored 25 on the frequency scale and 41 on the intensity scale. What is the value of Dan's residual?

Use the following information for questions:
The 25 item "Parenting Hassles Scale" asks parents questions about certain situations in their family. They are asked to rate these situations on (1) how often they occur (frequency), and (2) how much they bother them (intensity). The score system for the frequency was 0-4 points (0 = never, 4 = all the time) and for the intensity 1-5 (1 = not much at all, 5 = very much). If an item received a 0 (zero) for frequency, it automatically received a 0 (zero) for intensity. The two variables, frequency and intensity, were formed by taking the total of the corresponding scores from the two rating scales across the various situations. In a scatterplot, these two variables showed an approximate linear relationship. They were then used to run a linear regression to predict intensity based on frequency.

-What is the value of the Sum of Squared Errors for this regression line?

The correlation between father's heights and student's heights for a sample of 79 male students is r = 0.669. What is the proportion of variation in son's heights explained by the linear relationship with father's heights?

The following output is for a simple regression in which y = grade point average (GPA) and x = number of classes skipped in a typical week. The results were determined using self-reported data for a sample of n = 1,673 at a large northeastern university.
What value is given in the output for R²? Based on this value, explain whether the association between GPA and classes skipped per week is a strong association or a weak association.

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The next two questions are based on a regression equation for 55 college students withx = left forearm length (cm) and y = height. The forearm lengths ranged from 22 cm to 31 cm. The regression equation is $\hat{y}$ = 30.3 + 1.49x.
-The total sum of squares (SSTO) = 1054.8, and the error sum of squares (SSE) = 464.5. What is the value of r², the proportion of variation in y explained by its linear relationship with x?

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The next two questions are based on a regression equation for 55 college students withx = left forearm length (cm) and y = height. The forearm lengths ranged from 22 cm to 31 cm. The regression equation is $\hat{y}$ = 30.3 + 1.49x.
-What is the correlation between left forearm length and height?