1. Calculating marginal revenue from a linear demand curve The blue curve on the following graph represents the demand curve facing a firm that can set its own prices. Use the graph input tool to help you answer the following questions. You will not be graded on any changes you make to this graph. Note: Once you enter a value in a white field, the graph and any corresponding amounts in each grey field will change accordingly.Graph Input Tool 150 Market for Goods 135 Quantity 120 Demanded 25 PRICE (Dollars per unit) (Units) 105 Demand Price 90 (Dollars per unit) 75.00 75 60 45 Demand 30 15 5 10 15 20 25 30 35 40 45 50 QUANTITY (Units)On the previous graph, change the number found in the Quantity Demanded field to determine the prices that correspond to the production of 0, 10, 20, 25, 30, 40, or 50 units of output. Calculate the total revenue for each of these production levels. Then, on the following graph, use the green points (triangle symbol) to plot the results.\fCalculate the total revenue if the firm produces 10 versus 9 units. Then, calculate the marginal revenue of the 10th unit produced. The marginal revenue of the 10th unit produced is $ Calculate the total revenue if the firm produces 20 versus 19 units. Then, calculate the marginal revenue of the 20th unit produced. The marginal revenue of the 20th unit produced is $ Based on your answers from the previous question, and assuming that the marginal-revenue curve is a straight line, use the black line (plus symbol) to plot the firm's marginal-revenue curve on the following graph. (Round all values to the nearest increment of 30.)CENGAGE |MINDTAP Q Search this course ProblemSets 150 120 Marginal Revenue MARGINAL REVENUE (Dollars) 90 30 30 10 15 20 25 30 35 40 45 50 QUANTITY (Units) Comparing your total-revenue graph to your marginal-revenue graph, you can see that total revenue is v at the output at which marginal revenue is equal to zero