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LINEAR PROGRAMMING: ALGEBRAIC METHODS Have you been thinking this since the last lesson? “There’s got to be an easier way than testing all those possible combinations.”
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LESSON OBJECTIVES: 1)How can constraints and objectives of linear programming problems be expressed in symbolic form? 2)How can algebraic and graphical methods be combined to help solve the problems?
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1)Objective Function: It shows how the goal of the problem is a function of, or depends on, the independent variable x and y. 2)Feasible Region: Set of all points whose coordinates satisfy all given constraints. 3)Constraint: Limitation on values.
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You will be able to express the constraints for the linear programming problems with inequalities and use these symbolic expressions to create boundaries separating the feasible and not feasible regions.
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This removes the doubt about the shape of the feasible region and makes it possible to search for optimal points.
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ASTRONAUT DIET PLANNING REVISITED: Think again about the objective and constraints in the astronaut diet-planning problem from Lesson #7. Each food bar weighs 65 grams, and each drink carton weighs 118 grams. But the diet plan is constrained by the minimum daily requirements of fat, carbohydrate, and protein.
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1)If f represents the number of food bars and d represents the number of drink cartons in a daily diet, what algebraic rule shows how to calculate total weight W of that food?
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2)Recall that each food bar provides 5 grams of fat, 40 grams of carbohydrates, and 8 grams of protein. Each drink carton provides 6 grams of fat, 25 grams of carbohydrates, and 15 grams of protein.
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Write inequalities that express the constraints of providing the daily astronaut diet with: a)At least 61 grams of fat. b)At least 350 grams of carbohydrate. c)At least 103 grams of protein.
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3)The attached graph show the feasible region for the astronaut diet problem. The feasible region for this problem is shown as the unshaded region in the graph.
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a.On a copy of the graph, label each segment of the feasible region boundary with its corresponding linear equation. b.Use the graph to estimate coordinates of points at the corners of the feasible region.
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c.Now think about the objective function W = 65f + 118d. i.How does the value of W change as the numbers f and d decrease within the feasible region? ii.Where in the feasible region do you expect a pair of numbers (f, d) to give minimum weight?
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iii.List coordinates of some likely minimum weight points. Evaluate the weight corresponding to each point. iv.Of these diet options, which gives minimum weight?
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1) W = 65 f + 118 d 2)Inequalities: a.5 f + 6 d ≥ 61 b.40 f + 25 d ≥ 350 c.8 f + 15 d ≥ 103
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3)The coordinates of corners of the feasible region are (0, 14), (5, 6), (11, 1), and (12.875, 0). The (12.875, 0) corner should be considered as (13, 0) since 13 is the first integer value for food bars associated with 0 drink cartons in the feasible region.
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4) W = 65 f + 118 d i.As f decreases and/or d decreases, the value of W decreases. ii.On the boundary of the feasible region. iii.Fill out table. iv.The minimum weight occurs at the point (11, 1).
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LET’S GO BACK TO THE JUNIOR CLASS OF OAKLAND MILLS HIGH SCHOOL! Use C to represent the number of batches of Carnival Juice and L to represent the number of batches of Lemon Punch to be mixed.
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A.Write inequalities or expressions that represent: i.The constraint on amount of orange juice available. ii.The constraint on amount of lemonade available. iii.The objective function.
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B.Use the constraint inequalities you wrote to create a graph showing the feasible region of the juice sale problem. Label each segment of the feasible region boundary with the equation of that line. C.Find the plan that will maximize profit for the Junior Class from drink sales.
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B.The feasible region is unshaded. C.The corners of the feasible region are (0, 66.67), (40, 40) and (60, 0). If 40 batches of each drink are made, then the profit will be maximized at $840, compared to $540 at (60, 0) and $792 at (0, 66).
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HOMEWORK!! Complete the homework assignment and quiz. You are allowed to work in groups for the homework and for the quiz. Have a great day!!
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