1. Provide an overview of the problem your group was given and what you were required to do for your client.
2. Explain how to obtain the best-possible recommendation for the problem. Be sure to include variable names, constraints and corresponding inequalities, the GeoGebra graph (properly labelled), the expression that you needed to maximize, and an explanation of how you know your recommendation is the best possible (be sure each vertex of the feasible region was tested!).
3. Explain the group roles (what they were responsible for and who was assigned the role).
4. Provide a reflection of your client engagement. Your reflection should include
a. One celebration for each group member, including yourself. Be sure to include the Habits of a Mathematician.
b. Your perspective on how well your group worked together. What did your group do really well? What contributed to that success? What was one challenge your group had? How did you overcome that challenge? If you did not overcome it, what would you do differently to overcome it if you were to do this again?
c. Reflecting on your role, what do you think was your biggest strength in that role? In what ways can you grow in that role (what could you do better with more practice and opportunity)?