Schmidt Industries makes four different snake traps; the Harlan, the Gaylen, the Leah and the Matthew. The Harlan sells for $200 and has $40 in parts and $40 in labor, the Gaylen sells for $150 and requires $30 in parts and $30 in labor, the Leah sells for $100 and has $20 in parts and $20 in labor, and the Matthew sells for $75 but requires only $10 of parts and $10 of labor. Schmidt Industries has four machines (we'll call them A, B, C, and D for convenience) that are used in the production of each of these products. Each of these machines is available for 40 hours a week and there is no setup time required when shifting from the production of one product to any other. The processing requirements to make one unit of each product are shown in the table. process time/machine Mach A Mach B Mach C Mach D Model Harlan 10 15 15 5 10 10 10 Gaylen Leah 5 10 15 10 Matthew 5 5 5 10 Schmidt Industries has weekly fixed costs of $5000 and has a demand forecast of 80 Harlans, 60 Gaylens, 40 Leahs and 20 Matthews for the coming week. How many of each of the four models should Susan, the operations manager, schedule for production this month if she wants to maximize contribution margin? Use the LP printout below for some of the questions? Schmidt Industries X2 X3 X4 RHS Dual 120 Maximize Constraint 1 10 Constraint 2 15 Constraint 3 15 Constraint 4 Constraint 5 1 Constraint 6 0 X1 8999 or 90 10 10 10 10 60 5 10 15 10 0 0 55557 10 DOOO 0 0 AAAA 10 Variable X1 X2 X3 X4 Constraint Constraint 1 Constraint 2 Constraint 3 Constraint 4 Constraint 5 60 Constraint 6 50 Constraint 7 0 Constraint 8 35 What is the value of my objective function? less than 5000 more than 5000 but less than 10,000 more than 10,000 but less than 20,000 moe than 20,000 15 15 5 1 0 0 10 10 10 01008 156 10 10 0 0 1 5 5 0 10 000 0 0 0 80 60 33.33 20 Value Reduced Cost Original Val 80 0 60 0 33.33 20 0 Dual Value Slack/Surplus 1 2400 0 2400 4 2400 0