Here's a, b, and c .
a)
volume of box = (length )( width )(height)
V = (25 - 2x)(20 - 2x)(x)
V = (500 - 90x + 4x2)(x)
V = 500x - 90x2 + 4x3
V = 4x3 - 90x2 + 500x
Since x is folded up from a side that is 20 inches long, x can't be larger than 10 inches. If x were 10 inches, it would fold 20 in half, and the width would be 0 . So... the domain is all real x | 0 ≤ x ≤ 10 .
b)
To find the side length of the squares (x) that yield a volume of 300 in3 ,
plug in 300 for V and solve for x .
300 = 4x3 - 90x2 + 500x
Here I used a graph to find the approximate solutions.
x ≈ 0.68 inches and x ≈ 7.93 inches are the only values in the domain.
So...the size of the corner squares can be....
≈ 0.68 by 0.68 or ≈ 7.93 by 7.93
c)
We can look at the graph again to see that the x values that cause a volume bigger than 300 are those between 0.68 and 7.93 , and those greater than 13.89 .
Since those greater than 13.89 are outside the domain, the x values that cause the volume to be bigger than 300 are...... 0.68 < x < 7.93 .
So....for instance, the size of the corner square could be 0.5" by 0.5", or 1" by 1", or 3" by 3".