Section 14.2 Application of Extrema

1. Section 14.2 Application of Extrema

2. Revenue The sale of compact disks of “lesser” performers is very sensitive to price. If a CD manufacturer charges p dollars per CD, where p = 12 – q/8 , then q thousand CDs will be sold. Find the revenue function R(q). Find the number of CDs must be sold to maximize the revenue. Find the maximum revenue and price per CD that produces the maximum revenue.

3. Optimization Problem 1. Assign variables and draw a figure/diagram, if possible. 2.Write the condition/constrain for the situation 3.Write an equation that relates the quantity to be optimized to other variables. 4.Use the conditions of the problem to write the quantity to be optimized as a function of ONE variable. 5.Find the feasible domain of that function 6.Find the absolute extremaof the function on the specified domain.

4. Area Find the dimensions of the rectangular field of maximum area that can be made from 300 m of fencing material. 25 m 50 m 125 m 100 m 10 m 75 m 140 m 75 m

5. Packing Design A television manufacturing firm needs to design an open-topped box with a square base. The box must hold 32 cu. in. Find the dimensions of a box that can be built with the minimum amount of materials.

6. Volume An open box is to be made by cutting a square from each corner of a 12-in. by 12-in piece of metal and then folding up the sides. What size square should be cut from each corner to produce a box of maximum volume?

7. Minimum Cost A fence must be build to enclose a rectangular area of 20,000 sq. ft. Fencing material costs $2.50 per foot for the two sides facing north and south, and $3.20 per foot for the other two sides. Find the cost of the least expensive fence.

8. A Classic Problem You have 40 feet of fence to enclose a rectangular garden along the side of a barn. What is the maximum area that you can enclose?

9. A Classic Problem You have 40 feet of fence to enclose a rectangular garden along the side of a barn. What is the maximum area that you can enclose?