Ann and Ben are getting divorced, and they want to determine how to divide up their joint property: retirement account, home, summer cottage, investments, and miscellaneous assets. Ann and Ben are asked to allocate 100 total points to the assets. Their allocation is: Assuming that all assets are divisible (i.e. a fraction of each asset can be given to each person), how should the assets be allocated to maximize the total points with the restriction that both Ann and Ben will receive the same number of points? (Hint - this is not a fair division problem, it is a linear programming problem.) If all of the joint property (the assets) except the Retirement Account, could not be split up (i.e. goes to one or the other) how would your answer change?