An engineer wants to determine how the weight of a car, x, affects gas mileage, y. The following data represent the weights of various cars and their miles per gallon. Car D Weight (pounds), x Miles per Gallon, y 2545 3070 3375 3805 4250 24.5 24.6 32.6 24 18.2 (a) Find the least-squares regression line treating weight as the explanatory variable and miles per gallon as the response variable. Write the equation for the least-squares regression line. (Round the x coefficient to five decimal places as needed. Round the constant to one decimal place as needed.) (b) Interpret the slope and intercept, if appropriate. Choose the best interpretation for the slope. O A. The slope indicates the mean change in miles per gallon for an increase of 1 pound in weight. O B. The slope indicates the mean miles per gallon. O C. The slope indicates the ratio between the mean weight and the mean miles per gallon. O D. The slope indicates the mean weight. O E. It is not appropriate to interpret the slope because it is not equal to zero. Choose the best interpretation for the y-intercept. O A. The y-intercept indicates the miles per gallon of the lightest car in the population. O B. The y-intercept indicates the mean miles per gallon for a car that weighs 0 pounds. O C. The y-intercept indicates the miles per gallon for a new car. O D. The y-intercept indicates the mean miles for a car that weighs 0 pounds. O E. It is not appropriate to interpret the y-intercept because does not make sense to talk about a car that weighs 0 pounds.

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An engineer wants to determine how the weight of a car, x, affects gas mileage, y. The following data represent the weights of various cars and their miles per gallon. Car A B D E Weight (pounds), x Miles per Gallon, y 2545 3070 3375 3805 4250 24 32.6 24.5 24.6 18.2 (a) Find the least-squares regression line treating weight as the explanatory variable and miles per gallon as the response variable. Write the equation for the least-squares regression line. (Round the x coefficient to five decimal places as needed. Round the constant to one decimal place as needed.) (b) Interpret the slope and intercept, if appropriate. Choose the best interpretation for the slope. O A. The slope indicates the mean change in miles per gallon for an increase of 1 pound in weight. O B. The slope indicates the mean miles per gallon. O C. The slope indicates the ratio between the mean weight and the mean miles per gallon. O D. The slope indicates the mean weight. O E. It is not appropriate to interpret the slope because it is not equal to zero. Choose the best interpretation for the y-intercept. O A. The y-intercept indicates the miles per gallon of the lightest car in the population. O B. The y-intercept indicates the mean miles per gallon for a car that weighs 0 pounds. O C. The y-intercept indicates the miles per gallon for a new car. O D. The y-intercept indicates the mean miles for a car that weighs 0 pounds. O E. It is not appropriate to interpret the y-intercept because does not make sense to talk about a car that weighs 0 pounds.