PART 2 Instead of building the enclosure of maximum area, the company wishes to build only a 50,000 square foot enclosure still using up all the fencing and situated with one side on the river. Find the dimensions of the enclosure that will satisfy these requirements by doing the following: 13. What equation can be solved to find the possible widths? 14. Use your calculator to solve this equation graphically. Obtain a graph that shows your area function and the line for the 50,000 square foot enclosure. Label the axes with variable and word labels, and label the tic marks on each axis. Label each graph with its function. Give your graph a title. Write the window settings you used: Xmin, Xmax, Xsel, Ymin, Ymax, Yscl. On your graph, draw an arrow pointing to the point(s) that represents your answer to this question, and write the coordinates as an ordered pair. Write your solution(s) to the nearest tenth of a foot with appropriate units. 15. Using the widths from Question #14, find the corresponding lengths. Express your answers to the nearest tenth of a foot with appropriate units. 16. In sentence form, tell the company the dimensions (length x width) that it can use to satisfy its requirements. The sentence should include dimensions to the nearest tenth of a foot with appropriate units. 17. Now support your answers that you obtained graphically by showing how to solve the equation in Question #13 algebraically. Show all steps in the solution and write the resulting widths to the nearest tenth of a foot and with appropriate unit. PART 2 Instead of building the enclosure of maximum area, the company wishes to build only a 50,000 square foot enclosure still using up all the fencing and situated with one side on the river. Find the dimensions of the enclosure that will satisfy these requirements by doing the following: 13. What equation can be solved to find the possible widths? 14. Use your calculator to solve this equation graphically. Obtain a graph that shows your area function and the line for the 50,000 square foot enclosure. Label the axes with variable and word labels, and label the tic marks on each axis. Label each graph with its function. Give your graph a title. Write the window settings you used: Xmin, Xmax, Xsel, Ymin, Ymax, Yscl. On your graph, draw an arrow pointing to the point(s) that represents your answer to this question, and write the coordinates as an ordered pair. Write your solution(s) to the nearest tenth of a foot with appropriate units. 15. Using the widths from Question #14, find the corresponding lengths. Express your answers to the nearest tenth of a foot with appropriate units. 16. In sentence form, tell the company the dimensions (length x width) that it can use to satisfy its requirements. The sentence should include dimensions to the nearest tenth of a foot with appropriate units. 17. Now support your answers that you obtained graphically by showing how to solve the equation in Question #13 algebraically. Show all steps in the solution and write the resulting widths to the nearest tenth of a foot and with appropriate unit
