Units of product must be transported from warehouses W1 and W2 to customers C1 and C2. Because of contractual rights, the amount of product shipped from W2 to C2 must be at least half of the amount of product shipped from W1 to C2. (For extra clarity on this last point, this means that if, for example, W1 were to ship 250 units to C2, then W2 would have to ship at least 125 units to (2.) The costs involved in shipping a unit from a particular warehouse to a particular customer are shown below, along with the supply available at each warehouse and the demand required by each customer. Transportation C1 C2 Supply Costs (S/unit) (units WI 15 10 350 W2 7 300 Demand (units) 175 330 Answer the following 4 questions to formulate and solve the transportation LP to minimize transportation costs while meeting constraints. 1) (1pt) Write down the list of decision variables. You'll need to introduce the variables, and provide a brief explanation. (For example, on one of the problems in the HW, you had to decide how many full-size ovens and how many compact ovens to produce. The variables would be F and C, where F represents the number of full-size ovens produced, etc. The letter/symbol you choose is arbitrary, but the explanations of the variables are not.) 2) (1pt) Write down the objective function, as a mathematical expression in term of the variables that you wrote above. Here you are not coding the Excel cells, but instead writing a mathematical expression, i.e. it's what you'd write on paper if you were writing the objective function. 3 (2 pts) Write down all applicable constraints as mathematical expressions in terms of the variables in part (a). Here you can use = for "greater than or equal." Your answer is not a coded cell but is instead a list of mathematical expressions, i.e. it's what you'd write on paper if you were writing the constraints