Use the following problem statement to answer questions 1-6. Gale wants to determine the values of X1 and X2 to maximize total profit. The two types of biscuits require the following resources: sausage, ham, flour, and labor. The linear model and the sensitivity report are given as below. Round to two decimal places. Variable Cells XI no. of sausage biscuits Final X2=no. of ham biscuits Reduced Objective Allowable Allowable Cost Coefficient Increase Decrease Cell Value 0 -40 20 40 1E+30 Max Z=20X1 + 60X2 10 0 60 1E+30 40 C1: X1 + 2X2 ≤ 40. Sausage (lb.) C2: 4X1 +4X2 ≤ 84. Ham (lb.) Shadow Constraint Allowable Allowable Price R.H. Side Increase Decrease C3: 2X1 + X2 ≤ 50. Flour (lb.) 20 0 40 1E+30 C4: X1 + X2 ≤ 10. Labor 0 84 1E+30 (hr.) 50 1E+30 C5: X1, X220 10 10 $B$3 $C$3 Constraints Cell $M$6 $M$7 SMS8 $M$9 Name X1 X2 Name C1 2002 C3 C4 Final Value 2929 40 10 10 0 60 2499 20 44 40 10 W Which additional resources would you recommend that Gale try to obtain? O ham O labor Question 2 8 pts A local supplier offers to sell Gale 9 pounds of sausage for $0.70 per pound (see C1). What should he do? O refuse to buy any sausage O buy 9 pounds for $0.70 per pound Question 3 8 pts Gale thinks that the profit contribution of Product 1 is too low to make profit. By how much would the profit contribution of Product 1 have to change to make it worthwhile to produce Product 1? 00 O 40 Question 4 8 pts If he can obtain additional flour and labor, but not both, which one should he select? flour O labor D Question 5 8 pts By how much would total profit increase if he could obtain additional two hours of labor in C4? O 10 O 120 Question 6 8 pts By how much would total profit increase if he could increase the amount of ham from 84 to 90 pounds? 00 O 100