This question has several parts that must be completed sequentially. If you skip a part of the question, you will not the skipped part, and you will not be able to come back to the skipped part. Tutorial Exercise Find the values for each of the dimensions of an open-top box of length x, width y, and height 665,500/(xy) (in inches) such that the box requires the least amount of material to make. Step 1 We begin by finding the function for the surface area of the open box. To do this we add the areas of the bottom and the four sides. Determine each of these areas, in square inches, using the given dimensions. Area of the bottom Area of each of the two sides of width y Area of each of the two sides of length x x Now add the areas of the five sides of the box to determine the surface area function to be minimized .")- 2(x7 + 665500( # + #)) X Submit | Skip (you cannot come back) Need Help Read