Unit 2: Linear inequalities and Applications Consider the following problem: "A chocolate manufacturing company produces two types of chocolate: type A and type B. Each unit of A requires 1 unit of Milk and 3 units of Chocolate, and each unit of B requires 1 unit of Milk and 2 units of Chocolate. The company has a total of 500 units of Milk and 620 units of Chocolate. On each sale, the compary makes a profit of $6 per unit A sold, and $5 per unit B sold. How many units of A and B should be produced in order to maximize the profit?" Let x be the number of units of A to produce, let y be the number of units of B to produce, and let P be the profit earned. Which of the following is the objective function for this linear programming problem? Select one: O a. None of the other alternatives O b. P= 500x + 620y O. P=x+y O d. P= 6x + 5y O e. P= 3x + 2y Of. P=x+ 3y

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Unit 2: Linear inequalities and Applications Consider the following problem: "A chocolate manufacturing company produces two types of chocolate: type A and type B. Each unit of A requires 1 unit of Milk and 3 units of Chocolate, and each unit of B requires 1 unit of Milk and 2 units of Chocolate. The company has a total of 500 units of Milk and 620 units of Chocolate. On each sale, the comparıy makes a profit of $6 per unit A sold, and $5 per unit B sold. How many units of A and B should be produced in order to maximize the profit?" Let x be the number of units of A to produce, let y be the number of units of B to produce, and let P be the profit earned. Which of the following is the objective function for this linear programming problem? Select one: O a. None of the other alternatives O b. P= 500x + 620y O. P=x+y O d. P= 6x + Sy O e. P= 3x + 2y O f. P=x+ 3y