The OPQ Company owns two mines, each of which produces three grades of ore - high, medium, and low. The company has a contract to supply a smelting company with at least 26 tons of high-grade ore, 8 tons of medium-grade ore, and 24 tons of low-grade ore. Each mine produces a certain amount of each type of ore during each hour that it operates. Mine 1 produces 3 tons of high-grade ore, 2 tons of medium-grade ore, and 4 tons of low-grade ore per hour. Mine 2 produces 2, 2, and 12 tons, respectively, of high-, medium-, and low-grade ore per hour. It costs Copperfield $200 per hour to mine each ton of ore from mine 1, and it costs $160 per hour to mine each ton of ore from mine 2.
The company wants to determine the number of hours it needs to operate each mine so that its contractual obligations can be met at the lowest cost. [Note: X1 = number of hours needed to operate Mine 1. X2= number of hours needed to operate Mine 2.] One of the constraints for the model is 3X1 + 2X2 ≥ 26. True False