Find the maximum and minimum values of the given objective function on the indicated feasible region. М 3 300 - х —у maximum M = 291 minimum M = Enter an exact number. y 6f 1 X -1 1 2 3 4 5 6 2.
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A: We can solve this using method of LPP
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Q: Find the maximum and minimum values of the given objective function on the indicated feasible…
A: you can clearly understand if you follow the below solution
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Q: y 2x + y = 40 x + 5y = 100 |8x + 5y = 170 Find the corners of the feasible region. (Order your…
A: Given :- The graph of the feasible region is shown. f = 9x + 7y
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A: We have to find P value and point.
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A: As per bartleby guidelines we only give first question answers.
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Q: Find the maximum and minimum values of the given objective function on the indicated feasible…
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Q: Find the maximum and/or minimum value(s) of the objective function on the feasible set S. (If an…
A: This question is related to linear programming, we will solve it using given information.
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Q: 0, 255) (180, 120) (20,0) z = 12x + 10y
A: Explained below...
Q: Find the maximum and/or minimum value(s) of the objective function on the feasible set S. (If an…
A: To find the maximum and minimum value of the objective function Z = 9x + 12y. From the graph,
Q: Find the maximum and minimum values of the given objective function on the indicated feasible…
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Q: 4. Consider the feasible region below. 12 (4, 10) 10 (0, 8) 80 (8, 6) 6 4 |(10, 2) (0, 2) 2 6 8 10…
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A: Here, the feasible region is as shown.
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Q: The graph of the feasible region is shown. f = 8x + 6y y 2x + y = 40 %3D x + 5y = 100 8x + 5y 170…
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- maximize 2x₁ + x₂ - 3 subject to 4x₁ + x₂ + 3x3 ≤ 1, -2x2 + x3 ≤ ₁, 4x2 + 2x3 = -7, ₁ ₂ ≤ 0, unrestricted, T3 20Min Z = 12X1 + 18X2 + 8X3 5X1 + 8X2 +9X2 >= 18 9X1 + 15X2 + 12X3 >= 36 10X1 + 15X2 + 12X3 >= 45 X1, X2, X3 >= 0 Look for the Optimal SolutionMin Z = 12X1 + 18X2 + 8X3 5X1 + 8X2 +9X2 >= 18 9X1 + 15X2 + 12X3 >= 36 10X1 + 15X2 + 12X3 >= 45 X1, X2, X3 >= 0Look for the Optimal Solution
- A company operates two plants which manufacture the same item and whose total cost functions are C₁ = 8 +0.03q and C₂ = 3+0.04q2, where 9₁ and 92 are the quantities produced by each plant. The total quantity demanded, q = 9₁ +92, is related to the price, p, by p = 70 -0.04g. How much should each plant produce in order to maximize the company's profit? 91 = 92 Adapted from M. Rosser, Basic Mathematics for Economists, p. 318 (New York: Routledge, 1993).A company operates two plants which manufacture the same item and whose total cost functions are C₁ 5.1 + 0.03(9₁)² and C₂ 7.1 + 0.04(q2)², = where 9₁ and 92 are the quantities produced by each plant. The company is a monopoly. The total quantity demanded, q = 9₁ +92, is related to the price, p, by p = 80 -0.04g. 91 = = How much should each plant produce in order to maximize the company's profit?¹ 92 = ¹Adapted from M. Rosser and P. Lis, Basic Mathematics for Economists, 3rd ed. (New York: Routledge, 2016), p. 354.8) For selling x cakes, a baker will make b(x) = x2 - 5x - 150 hundreds of dollars in revenue. Determine the minimum number of cakes the baker needs to sell in order to make a profit.
- Suppose a company's profits are given by P = x^2 y, where x is the amount of money they spend on TV advertising, and y is the amount of money they spend on internet advertising. In total, this company will spend 12 (million) dollars on advertising (that is, TV plus internet). How much should they spend on each type to maximize profits? NOTE: You can just use 12 instead of 12.000,000 in your computations.Find two positive numbers satisfying the given requirements. The product is 432 and the sum of the first plus three times the second is a minimum. | (first number) (second number) Find the length and width (in feet) of a rectangle that has the given area and a minimum perimeter. Area: 25 square feet ft (smaller value) ft (larger value) Find the points on the graph of the function that are closest to the given point. fx) %3D х2 - 6, (0, —3) (x, y) = (smaller x-value) (х, у) %3D (larger x-value)A trailer manufactor has multiple products designed to be towed by a pickup (Ford F-150, Toyota Tacoma, etc). The production of one of their products - the XL7 5x10 trailer - referred to as XL7510 here, has a fixed 9 cost of $62,175 and a variable cost per unit of XL7510 equal to 181 + - dollars, where x is the total 10 number of XL7510s produced. Suppose further that the selling price of this product is 1085 The -values of the break-even points are The maximum revenue is Form the profit function: P(x) The maximum profit is = The price that will maximize profit is 1 - dollars per unit of XL7510. 10 dollars (round to the nearest cent) dollars (round to the nearest cent)
- a box with a a square base and open top must have a volume of 62,500cm3. Find the dimensions of the box that minimize the amount of material used. please provide the found objective function (optimization equation) and its derivate.A plane carrying food and water to a resort island can carry a maximum of 2700027000 pounds and is limited in space to carrying no more than 550550 cubic feet. Each container of water weighs 6060 pounds and takes up 11 cubic foot of cargo space. Each container of food weighs 150150 pounds and takes up 55 cubic feet. Hotels on the island will buy the food for 1919 dollars a pound and the water for 55 dollars per pound. What is the optimum number of containers of each item that will maximize the revenue generated by the plane? What is the maximum revenue? Let x represent the number of food containers and y represent the number of water containers.Find the number of units x that produces a maximum revenue R for R=450x-0.25x^2 A.) The feasible domain of the primary equation is [0,1800] . True or False? Why?