Malloy Milling grinds calcined alumina to a standard granular size. The mill produces two different size​ products, regular grind and super​ grind, from the same raw materials. After reviewing the...


Malloy Milling grinds calcined alumina to a standard granular size. The mill produces two different size​ products, regular grind and super​ grind, from the same raw materials. After reviewing the production​ rate, demand, and profit for each of the two types of​ grind, Malloy Milling found the following linear optimization model for​ profit, where R is the number of tons of regular grind produced and S is the number of tons of super grind produced. Implement the linear optimization model on a spreadsheet and use Solver to find an optimal solution. Interpret the Solver Answer​ Report, identify the binding​ constraints, and verify the values of the slack variables.




































Maximize Profit


=


900 R+1600 S








R+S≥700


​(Total production)






R5+S3≤168


​(Time limitation)







R≥400



​(Demand for regular​ grind)







S≥200



​(Demand for super​ grind)


Implement the linear optimization model and find an optimal solution. Interpret the optimal solution.


The optimal solution is to produce ? tons of regular grind and
? tons of super grind. This solution gives the




maximum possible​ profit, which is ​$?.





​(Type integers or decimals rounded to two decimal places as​ needed.)


Jun 10, 2022
SOLUTION.PDF
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