The scatter plot shows the sale price of several food items, y, and the cost of the ingredients used to produce those items, x, as well as a line that models the data. The line is also represented by the equation [br]y = 3.48x + 0.67.[br][img]data:image/png;base64,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[/img][br][br]What is the predicted sale price of an item that has ingredients that cost $1.50? Explain or show your reasoning.

What is the predicted ingredient cost of an item that has a sale price of $7? Explain or show your reasoning.

What is the slope of the linear model? What does that mean in this situation?

What is the y-intercept of the linear model? What does this mean in this situation? Does this make sense?[br][br]

Are the values obtained from looking at the graph close to the values calculated using the equation?