Suppose that in a linear programming model, all resources have been paid for. Then at the...

The following constraints of a linear programming model have been graphed on the graph paper provided...

The following constraints of a linear programming model have been graphed on the graph paper provided to form a feasible region: 2X    + 6Y     >=    120 10X + 2Y     > =   200 X      +     Y     <=    120 X                     <=    100                  Y    <=      80 X,Y                  >=        0 Using the graphical method, determine the optional solution and the objective function value for the following objective functions. Graph the objective function as a dashed line on the feasible region described by the...

The following constraints of a linear programming model have been graphed on the graph paper provided...

The following constraints of a linear programming model have been graphed on the graph paper provided (same constraints found in problem #3) to form a feasible region: 2X    + 6Y     >=    120 10X + 2Y     > =   200 X      +     Y     <=    120 X                     <=    100                  Y    <=      80 X,Y                  >=        0 Using the graphical method, determine the optional solution and the objective function value for the following objective functions. Graph the objective function as a dashed line on...

2. The following linear programming problem has been solved by The Management Scientist. Use the output...

2. The following linear programming problem has been solved by The Management Scientist. Use the output to answer the questions. LINEAR PROGRAMMING PROBLEM MAX 25X1+30X2+15X3 S.T. 1) 4X1+5X2+8X3<1200 2) 9X1+15X2+3X3<1500 OPTIMAL SOLUTION Objective Function Value = 4700.000 Variable Variable Reduced Cost X1 140.000   0.000 X2 0.000 10.000 X3 80.000 0.000 Constraint   Slack/Surplus Dual Price 1   0.000   1.000 2 0.000 2.333 OBJECTIVE COEFFICIENT RANGES Variable   Lower Limit Current Value Upper Limit X1 19.286 25.000 45.000 X2 No Lower Limit 30.000 40.000...

The following is the mathematical model of a linear programming problem for profit: Maximize subject to...

The following is the mathematical model of a linear programming problem for profit: Maximize subject to Z = 2X1 + 3X2 4X1+9X2 ≤ 72 10X1 + 11X2 ≤ 110 17X1 + 9X2 ≤ 153 X1 , X2 ≥ 0 The constraint lines have been graphed below along with one example profit line (dashed). The decision variable X1 is used as the X axis of the graph. Use this information for questions 19 through 23. A). Which of the following gives...

Consider the following Linear Programming model: Maximize x+2.5y Subject to x+3y<=12 x+2y<=11 x-2y<=9 x-y>=0 x+5y<=15 x>=0...

Consider the following Linear Programming model: Maximize x+2.5y Subject to x+3y<=12 x+2y<=11 x-2y<=9 x-y>=0 x+5y<=15 x>=0 y>=0 (a) Draw the feasible region for the model, but DO NOT draw the objective function. Without graphing the objective function, find the optimal solution(s) and the optimal value. Justify your method and why the solution(s) you obtain is (are) optimal. (4 points) (b) Add the constraint “x+5y>=15” to the Linear Programming model. Is the optimal solution the same as the one in (a)?...

A factory produces canoes, dinghies, speedboats and catamarans. The resources required are steel, fibreglass, wood and...

A factory produces canoes, dinghies, speedboats and catamarans. The resources required are steel, fibreglass, wood and marine paint. The following table shows the per-unit resource quantities required for each product, the price we sell each product for, the per-unit resource prices, and the resource quantities available to us for purchase: Products Resources Selling price steel fibreglass wood marine paint canoes 0.000 27.000 1.000 7.000 $381.80 dinghies 15.000 4.000 2.500 2.100 $153.10 speedboats 36.000 4.000 1.000 2.300 $220.60 catamarans 11.000 64.000...

A factory produces cakes, pies, rolls and danishes. The resources required are flour, sugar, meat and...

A factory produces cakes, pies, rolls and danishes. The resources required are flour, sugar, meat and fruit. The following table shows the per-unit resource quantities required for each product, the price we sell each product for, the per-unit resource prices, and the resource quantities available to us for purchase: Products Resources Selling price flour sugar meat fruit cakes 0.500 0.900 0.000 0.100 $8.40 pies 0.430 0.090 0.500 0.000 $20.21 rolls 0.250 0.015 0.000 0.000 $1.45 danishes 0.180 0.290 0.000 0.050...

4. Suppose that no data has been recorded on the time that it takes for a...

4. Suppose that no data has been recorded on the time that it takes for a provider to see a patient in a particular clinic, but it has been estimated that the minimum amount of time is 10 minutes, the maximum amount of time is 50 minutes, and the most likely times is about 25 minutes. What probability distribution would you use to model the time that it takes this provider to see a patient in this clinic? What is...

Suppose that no data has been recorded on the time that it takes for a provider...

Suppose that no data has been recorded on the time that it takes for a provider to see a patient in a particular clinic, but it has been estimated that the minimum amount of time is 10 minutes, the maximum amount of time is 50 minutes, and the most likely times is about 25 minutes. What probability distribution would you use to model the time that it takes this provider to see a patient in this clinic? What is the...

Harriet is trying to determine how many units of two types of lawn mowers to produce...

Harriet is trying to determine how many units of two types of lawn mowers to produce each day. One of these is the Standard model, while the other is the Deluxe model. The profit per unit on the Standard model is $60, while the profit per unit on the Deluxe model is $40. The Standard model requires 20 minutes of assembly time, while the Deluxe model requires 35 minutes of assembly time. The Standard model requires 10 minutes of inspection...