As a farmer, suppose you want to fence off a rectangular field that borders a river. You wish to find out the dimensions of the field that occupies the largest area. Select the amount of fencing you have, in feet, and address the following prompts: if you have 1200 feet of fencing. Draw several diagrams to express the situation and calculate the area for each configuration then estimate the dimension of largest possible field. Find the function that models the area in terms of one of its sides. Find the point that maximizes the function you found in above. Calculate the area of the field at the point you calculated and then compare your results with the estimates you made based on your diagram. Requirements: Your paper should be 2-3 pages in length (not counting the title page and references page) and cite and integrate at least one credible outside source. The CSU-Global Library (Links to an external site.) is a great place to find resources. Your textbook is a credible resource. Include a title page, introduction, body, conclusion, and a reference page. The introduction should describe or summarize the topic or problem. It might discuss the general applications of the topic or it might introduce the unique terminology associated with the topic. The body of your paper should address the questions posed in the problem. Explain how you approached and answered the question or solved the problem, and, for each question, show all steps involved. Be sure this is in paragraph format, not numbered answers like a homework assignment. The conclusion should summarize your thoughts about what you have determined from your analysis in completing the assignment. 