Valencia Products makes automobile radar detectors and assembles two models: LaserStop and SpeedBuster. Both models use the same electronic components. After reviewing the components required and the profit for each model, the firm found the following linear optimization model for profit, where Lis the number of LaserStop models produced and S is the number of SpeedBuster models produced. Implement the linear optimization model on a spreadsheet and use Solver to find an optimal solution. Interpret the optimal solution, identify the binding constraints, and verify the values of the slack variables. Maximize Profit = 122 L+134 S 19 L+ 12 SS 4000 (Availability of component A) (Availability of component B) 6L+8 Ss3500 L20 and S20 Implement the linear optimization model and find an optimal solution. Interpret the optimal solution. The optimal solution is to produce 0 LaserStop models and 363 SpeedBuster models. This solution gives the maximum possible profit, which is $ 5047 (Type integers or decimals rounded to two decimal places as needed.) Component A is not a binding constraint and it has 7 slack Component B is not a binding constraint and it has 31733 slack (Type integers or decimals rounded to two decimal places as needed.) O Time Remaining: 01:07 47 Next P Type here to search 70°F Cloudy 12:34 PM 局 5/12/2022

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Valencia Products makes automobile radar detectors and assembles two models: LaserStop and SpeedBuster. Both models use the same electronic components. After reviewing the components required and the profit for each model, the firm found the following linear optimization model for profit, where Lis the number of LaserStop models produced and S is the number of SpeedBuster models produced. Implement the linear optimization model on a spreadsheet and use Solver to find an optimal solution. Interpret the optimal solution, identify the binding constraints, and verify the values of the slack variables, Maximize Profit = 122 L+ 134 S 19 L+ 12 SS 4000 (Availability of component A) (Availability of component B) 6L+8SS3500 L20 and S20 Implement the linear optimization model and find an optimal solution. Interpret the optimal solution. The optimal solution is to produce 0 LaserStop models and 363 SpeedBuster models. This solution gives the maximum possible profit, which is S 5047 (Type integers or decimals rounded to two decimal places as needed) Component A is not a binding constraint and it has7 slack. Component B is not a binding constraint and it has 31733 slack. (Type integers or decimals rounded to two decimal places as needed.) O Time Remaining: 01:07.47 Next P Type here to search 70°F Cloudy ^O D A 0 12:34 PM 5/12/2022 ho 米 esc 10 144 ho insert prt sc delete @ %23 & 7. 3 4 6. 8. + backspace %3D home Q tab W R T. Y pg