Divide.

Find the midpoint of the line segment shown.

A. 4
B.
C.
D.

Solve the problem.Alan is building a garden shaped like a rectangle with a semicircle attached to one short side. If he has 30 feet of fencing to go around it, what dimensions will give him the maximum area in the garden?

A. width =  ? 5.4, length = 8.1
B. width =  ? 8.4, length = 10.8
C. width =  ? 8.4, length = 4.2
D. width =  ? 4.2, length = 8.4

Evaluate the function.Given that f(x) = 7 - 3x3, find f(-n).

A. 7 + 3n3 B. 7 - 3n3 C. -n - 3x3 D. 7 + nx3

Solve the problem.Daniel decides to feed his cat a combination of two foods: Max Cat and Mighty Cat. He wants his cat to receive four nutritional factors each month. The amounts of these factors (a, b, c, and d) contained in one bag of each food are shown in the chart, together with the total amounts needed.  The costs per bag are $43 for Max Cat and $37 for Mighty Cat. How many bags of each food should be blended to meet the nutritional requirements at the lowest cost? Set this up as a linear programming problem in the following form:Minimize cTx subject to Ax ? b and x ? 0. Do not find the solution.

A. Let x₁ be the number of bags of Max Cat and x₂ the number of bags of Mighty Cat. 
Then b = , x = , c = , and A = 
B. Let x₁ be the number of bags of Max Cat and x₂ the number of bags of Mighty Cat. 
Then b = , x = , c = , and A =  
C. Let x₁ be the number of bags of Max Cat and x₂ the number of bags of Mighty Cat. 
Then b = , x = , c = , and A = 
D. Let x₁ be the number of bags of Max Cat and x₂ the number of bags of Mighty Cat. 
Then b = , x = , c = , and A =