Problem 2: A diet to contain at least 2400 units of vitamins, 1800 units of minerals, and 1200 calories. Two foods, Food A and Food B are to be purchased. Each unit of Food A provides 50 units of vitamins, 30 units of minerals and 10 calories. Each unit of Food B provides 20 units of vitamins, 20 units of minerals , and 40 calories. Food A costs 2 dollars per unit and Food B cost 1 dollars per unit. How many units of each food should be purchased to keep costs at a minimum? DATA SUMMARY CHART Variable Vitamins Minerals Cost Food A 50 30 2

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Solve the optimization problem using linear programming. Find the optimal solution with graph.

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Problem 2: A diet to contain at least 2400 units of vitamins, 1800 units of minerals, and 1200 calories. Two foods, Food A and Food B are to be purchased. Each unit of Food A provides 50 units of vitamins, 30 units of minerals and 10 calories. Each unit of Food B provides 20 units of vitamins, 20 units of minerals , and 40 calories. Food A costs 2 dollars per unit and Food B cost 1 dollars per unit. How many units of each food should be purchased to keep costs at a minimum? DATA SUMMARY CHART Variable Vitamins Minerals Cost Food A 50 30 Food B 20 20 1 A diet contain: 2400 1800 A. Decision variables Food A = X1 Food B = X2 B. Objective Function Minimize (z) = 2X1 + 1X2 C. Constraints vitamins = 50X1 + 20X2 s 2400 minerals = 30X1 + 20X2 s 1800 calories = 10X1 + 40X2 < 1200