Mee Co. would like to find the least-cost production schedule for a seasonal product. The demand is 2500 units in May, 4100 in June, 6300 in July, 6500 in August and 2200 in September. The product cannot be kept in storage for more than 2 months; e.g. if produced n May, it has to be sold by the end of July. Mee Co. may hire or fire workers at the start of very month. Any worker newly hired for a given month must undergo training; training costs per worker amount to $200. Each worker can produce 400 units a month on regular ime and, if desired, up to an additional 75 units on overtime. Each worker costs $800 per nonth for regular time and $3 per unit produced in overtime. Units produced are available or sale that same month. Each unit put into storage incurs a handling cost of $0.50. The cost of holding one unit in storage amounts to $0.40 per month stored. Determine the optimal iring plan and production plan of Mee Co. A. (100 point) Formulate the Linear Programming Problem. Declare all necessary variables and, if possible, label all constraint clusters (i.e. Ratio Constraints)