Use the Maximum Revenue information above to answer this question. The price of a sandwich that yields the maximum revenue is $. per sandwich. Round to the nearest cent. Inventory Control Jesaki Publishing sells 50,000 copies of a certain book each year. It costs the company $1 to store a book for one year. Each time that they print additional copies, it costs the company $1,000 to set up the presses. NOTE: We assume that the demand is uniform. Let = number of books printed during each printing run . y = number of printing runs Use this information to answer questions 13-23 below.Use the Inventory Control information above to answer this question. The total setup cost for the year is y. Question 14 2 pts Use the Inventory Control information above to answer this question. Since we assume the demand is uniform, the number of books in storage between printing runs will decrease from a toUse the Inventory Control information above to answer this question. The total setup cost for the year is y. Question 14 2 pts Use the Inventory Control information above to answer this question. Since we assume the demand is uniform, the number of books in storage between printing runs will decrease from a toUse the Inventory Control information above to answer this question. Since it costs $1 to store a book for one year, the total storage cost is C. Note: The average number in storage for each day is Enter your answer as a decimal. Question 16 4 pts Use the Inventory Control information above to answer this question. The total cost is the sum of the setup cost and storage cost, so C = [ Select ] v yt [ Select ] yUse the Inventory Control information above to answer this question. Since it costs $1 to store a book for one year, the total storage cost is C. Note: The average number in storage for each day is Enter your answer as a decimal. Question 16 4 pts Use the Inventory Control information above to answer this question. The total cost is the sum of the setup cost and storage cost, so C = [ Select ] v yt [ Select ] yUse the inventory control information above to answer this question. In order to write the total cost as a function of one variable, we must find a relationship between a and y. Since Jesaki prints * books in each of the y printing runs, the total number of books printed is cy, so we must have Cy = We can use this to express y as a function of c. Question 18 2 pts Use the Inventory Control information above to answer this question. Since a is the number of books printed in each printing run, @ must satisfy In other words, * is in the closed interval [a, b], where a = 1 and b =Use the Inventory Control information above to answer this question. Using the calculations above, we can express the total cost Ce) as a function of @, with the restriction on * given in the previous problem. Find the critical number of O(@) by solving C' (x) = 0 NOTE: Because of the restriction on a, there is exactly one critical number c.Use the Inventoryr Control information above to answer this question. There is only one critical number c: in the interval: and the cost function C(m} is continuous. Since {3"ch [59'9\"] V and C\" (c) [50'0\"] V i we can use the [50'0\"] V to conclude that C(c} is the [59'9\"] V of the cost function on the interval I. Question 21 5 pts Use the Inventory Control information above to answer this question. How many books should be produced during each printing run to minimize total cost? books Question 22 2 pts Use the Inventory Control information above to answer this question. How many printing runs should be done? printing runsQuestion 23 4 pts Use the Inventory Control information above to answer this question. What is the minimum total cost\"? $ Maximum Revenue Jesaki Electronics manufactures and sells a smartphones per week. The weekly price-demand and cost equations are, respectively, p = 462 - 0.44 x and C(x) = 20,649 + 21 x. Suppose Jesaki Electronics wants to maximize weekly revenue. Compute the following quantities. 1. How many phones should be produced each week? phones. Round to 2 decimal places. 2. What price should Jesaki charge for the phones? $. per phone. Round to the nearest cent. 3. What is the maximum weekly revenue? $_ per week. Round to the nearest cent. Enter the result for 2.Maximum Profit aster Gadgets manufactures and sells @ smartphones per week. The weekly price-demand and cost equations are, respectively, p = 501 - 0.45 x and C(a) = 20, 114 + 17 c. Suppose Yaster Gadgets wants to maximize weekly profit. Compute the ollowing quantities. 1. How many phones should be produced each week? phones. Round to 2 decimal places. 2. What price should Jesaki charge for the phones? $ per phone. Round to the nearest cent. 3. What is the maximum weekly profit? $. per week. Round to the nearest cent. inter the result for 3.Question 26 5 pts Average Cost Graph The total daily cost (in dollars) of producing a mountain bikes is given by C(x) = 1,067 + 6 x+0.12 x2 The average cost function C(@) decreases until x = c and increases afterwards. If the goal of the company is to make the mountain bike as affordable as possible, they should target the production level of c mountain bikes daily. Find c. Round to 2 decimal places. mountain bikes dailyQuestion 1 5 pts Average Cost Jesaki Water Sports incurs the following costs in producing @ water ski vests in one day, for 0