An open box is to be made from a rectangular piece of material 9 inches by 12 inches by cutting equal squares from each corner and turning up the sides.

The questions for this problem would be:

1. What is the dimensions of the box that has the maximum volume?

2. What is the maximum volume of the box?

Volume of a rectangular box = length x width x height

From the problem statement,

length = 12 - 2x

width = 9 - 2x

height = x

where x is the height of the box or the side of the equal squares from each corner and turning up the sides

V = (12-2x) (9-2x) (x)

V = (12 - 2x) (9x - 2x^2)

V = 108x - 24x^2 - 18x^2 + 4x^3

V = 4x^3 - 42x^2 + 108x

To maximize the volume, we differentiate the expression of the volume and equate it to zero.

V = 4x^3 - 42x^2 + 108x

dV/dx = 12x^2 - 84x + 108

12x^2 - 84x + 108 = 0x^2 - 7x + 9 = 0

Solving for x,

x1 = 5.30; Volume = - 11.872 (cannot be negative)

x2 = 1.70; Volume = 81.872

So, the answers are as follows:

1. What is the dimensions of the box that has the maximum volume?

length = 12 - 2x = 8.60

width = 9 - 2x = 5.60

height = x = 1.70

2. What is the maximum volume of the box?

Volume = 81.872