Christine is driving to New York City. Suppose that the remaining distance to drive (in miles) is a linear function of her driving time (in minutes). When graphed, the function gives a line with a slope of −0.85. Christine has 67 miles remaining after 46 minutes of driving. How many miles will be remaining after 62 minutes of driving?
Christine is driving to New York City. Suppose that the remaining distance to drive (in miles) is a linear function of her driving time (in minutes). When graphed, the function gives a line with a slope of −0.85. Christine has 67 miles remaining after 46 minutes of driving. How many miles will be remaining after 62 minutes of driving?
Christine is driving to New York City. Suppose that the remaining distance to drive (in miles) is a linear function of her driving time (in minutes). When graphed, the function gives a line with a slope of −0.85. Christine has 67 miles remaining after 46 minutes of driving. How many miles will be remaining after 62 minutes of driving?
Christine is driving to New York City. Suppose that the remaining distance to drive (in miles) is a linear function of her driving time (in minutes). When graphed, the function gives a line with a slope of −0.85.
Christine has 67 miles remaining after 46 minutes of driving. How many miles will be remaining after 62 minutes of driving?
Expression, rule, or law that gives the relationship between an independent variable and dependent variable. Some important types of functions are injective function, surjective function, polynomial function, and inverse function.
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