IM 8.6.4 Lesson: Fitting a Line to Data
Here is a scatter plot that shows weights and fuel efficiencies of 20 different types of cars.
If a car weighs 1,750 kg, would you expect its fuel efficiency to be closer to 22 mpg or to 28 mpg? Explain your reasoning.
Here is a table that shows weights and prices of 20 different diamonds.
The scatter plot shows the prices and weights of the 20 diamonds together with the graph of y=5,520x-1,091.
The function described by the equation is a model of the relationship between a diamond’s weight and its price. This model predicts the price of a diamond from its weight. These predicted prices are shown in the third column of the table. Two diamonds that both weigh 1.5 carats have different prices. What are their prices? How can you see this in the table? How can you see this in the graph?
The model predicts that when the weight is 1.5 carats, the price will be $7,189. How can you see this in the graph? How can you see this using the equation?
One of the diamonds weighs 1.9 carats. What does the model predict for its price? How does that compare to the actual price?
Find a diamond for which the model makes a very good prediction of the actual price. How can you see this in the table? In the graph?
Find a diamond for which the model’s prediction is not very close to the actual price. How can you see this in the table? In the graph?
Here is a scatter plot that shows lengths and widths of 20 different left feet. Use the double arrows to show or hide the expressions list.
Estimate the widths of the longest foot and the shortest foot.
Estimate the lengths of the widest foot and the narrowest foot.
Click on the unchecked checkbox icon 
next to the words “The Line”.
The graph of a linear model should appear. Find the data point that seems weird when compared to the model. What length and width does that point represent?