1. 1. Vertex 2. Fundamental Theorem of Linear Programming 3. Linear Programming Steps 1

2.  The boundary of the feasible set is composed of line segments. The line segments intersect in points, each of which is a corner of the feasible set. Such a corner is called a vertex. 2

3.  Find the vertices of  y < -2 x + 32  y < - x + 18  y < - x /3 + 12  x > 0, y > 0. 3 (0,0) (0,12) (9,9) (14,4) (16,0)

4.  Fundamental Theorem of Linear Programming The maximum (or minimum) value of the objective function in a linear programming problem is achieved at one of the vertices of the feasible set. 4 The point that yields the maximum (or minimum) value of the objective function is called an optimal point.

5.  Find the point which maximizes Profit = 80 x + 70 y for the feasible set with vertices (0,0), (0,12), (9,9), (14,4) and (16,0). Vertex 80x + 70y = Profit (0,0)80(0) + 70(0) = 0 (0,12)80(0) + 70(12) = 840 (9,9)80(9) + 70(9) = 1350 (14,4)80(14) + 70(4) = 1400 (16,0)80(16) + 70(0) = 1280 5

6. Step 1Translate the problem into mathematical language. A.Organize the data. B.Identify the unknown quantities and define corresponding variables. C.Translate the restrictions into linear inequalities. D.Form the objective function. 6

7. Step 2Graph the feasible set. A.Put the inequalities in standard form. B.Graph the straight line corresponding to each inequality. C.Determine the side of the line belonging to the graph of each inequality. Cross out the other side. The remaining region is the feasible set. 7

8. Step 3Determine the vertices of the feasible set. Step 4Evaluate the objective function at each vertex. Determine the optimal point. 8

9.  Rice and soybeans are to be part of a staple diet. One cup of uncooked rice costs 21 cents and contains 15 g of protein, 810 calories, and 1/9 mg of B 2 (riboflavin). One cup of uncooked soybeans costs 14 cents and contains 22.5 g of protein, 270 calories, and 1/3 mg of B 2. The minimum daily requirements are 90 g of protein, 1620 calories and 1 mg of B 2. Find the optimal point that will minimize cost. 9

10. RiceSoybeans Required level per day Protein (g/cup)1522.590 Calories (per cup)8102701620 B 2 (mg/cup)1/91/31 Cost (cents/cup)2114 10 Organize the data.

11.  B. Identify the unknown quantities and define corresponding variables.  x = number of cups of rice per day  y = number of cups of soybeans per day 11

12.  C. Translate the restrictions into linear inequalities.  Protein:15 x + 22.5 y > 90  Calories:810 x + 270 y > 1620  B 2 :(1/9) x + (1/3) y > 1  Nonnegative: x > 0, y > 0 12

13.  D. Form the objective function.  Minimize the cost in cents:  [Cost] = 21 x + 14 y 13

14.  A. Put the inequalities in standard form.  Protein: y > (-2/3) x + 4  Calories: y > -3 x + 6  B 2 : y > (-1/3) x + 3  Nonnegative: x > 0  y > 0 14

15. Example Step 2B B. Graph the straight line corresponding to each inequality. 1. y = (-2/3)x + 4 2. y = -3x + 6 3. y = (-1/3)x + 3 4. x = 0 5. y = 0 15 1 2 3 4 5

16. Example Step 2C C. Determine the side of the line. y > (-2/3)x + 4 y > -3x + 6 y > (-1/3)x + 3 x > 0 y > 0 16 feasible set

17. Example Step 3 Determine the vertices of the feasible set. x = 0 & y = -3x + 6: (0,6) y = -3x + 6 & y = (-2/3)x + 4: (6/7,24/7) y = (-2/3)x + 4 & y = (-1/3)x + 3: (3,2) y = (-1/3)x + 3 & y = 0: (9,0) 17 (0,6) (6/7,24/7) (3,2) (9,0)

18. 18  Determine the objective function at each vertex. Determine the optimal point. VertexCost = 21x + 14y (0,6)21(0) + 14(6) = 84 (6/7,24/7)21(6/7) + 14(24/7) = 66 (3,2)21(3) + 14(2) = 91 (9,0)21(9) + 14(0) = 189 The minimum cost is 66 cents for 6/7 cups of rice and 24/7 cups of soybeans.

19.  The fundamental theorem of linear programming states that the optimal value of the objective function for a linear programming problem occurs at a vertex of the feasible set. 19

20.  To solve a linear programming word problem, assign variables to the unknown quantities, translate the restrictions into a system of linear inequalities involving no more than two variables, form a function for the quantity to be optimized, graph the feasible set, evaluate the objective function at each vertex, and identify the vertex that gives the optimal value. 20