MAT 118-71 Project 1 Due February 21, 2022 in class You have a decision to make. You will be flying to East Lansing, Michigan for a one-day stay. You will need to rent a midsize car while you are there, and you want to do this in the most economical way possible. The cost to rent a car sometimes depends on the number of miles it is driven, but sometimes the cost includes unlimited mileage. You need to figure out which rental company gives you the best deal. As it turns out, the equations involved are linear, so the problem can be analyzed using techniques discussed in Chapter One. You begin by contacting two car rental companies: Avis and Enterprise. Avis offers a midsize car for $64.99 per day with unlimited mileage. This means that for this rental the number of miles driven dose not impact on the cost. Enterprise offers a midsize car for $45.87 per day with 150 miles free. But each mile beyond 150 that the car is driven costs $0.25. It is clear that Enterprise offers the better deal if the car is driven fewer than 150 miles. But what if the car is driven more than 150 miles? At what point will the Avis rental become a better deal? Let's analyze the situation. Let x denote the number of miles the car is driven. 1. Suppose A is the cost of renting at Avis. Find a linear equation involving A and x. 2. Now let E be the cost of renting at Enterprise. Find a linear equation involving E and x, if x 150. Find a linear equation involving E and x, if x > 150.. 3. Graph the linear equations found in part (1) and (2) on the same set of coordinate axes. Be careful about the restrictions on x for the equations found in part (2). 4. Find the mileage beyond which the Avis rental is more economical by finding the point of intersection of the two graphs. Label this point on this graph. 5. Explain how you can use the solution to part (4) to decide on which car rental is more economical. 6. In an effort to find an even better deal, you contact Auto Save Rental. They offer a