SOLUTION: A rectangular solid with a square base has a surface area of 37.5 square centimeters. ( let x represent the length of the sides of the square base and let y represent the height.)

Algebra ->  Surface-area -> SOLUTION: A rectangular solid with a square base has a surface area of 37.5 square centimeters. ( let x represent the length of the sides of the square base and let y represent the height.)       Log On


   

Question 1068080: A rectangular solid with a square base has a surface area of 37.5 square centimeters. ( let x represent the length of the sides of the square base and let y represent the height.)
(a) Determine the dimensions that yield the maximum volume.
x=
y=
(b) Find the maximum volume.
Answer by KMST(5328) About Me  (Show Source):
You can put this solution on YOUR website!
THE QUICK ANSWER:
The maximum area within a given perimeter is the most symmetrical shape you are allowed to choose.
The maximum volume within a given surface area is the most symmetrical shape you can choose.
In this case, the most symmetrical shape you can choose with planar perpendicular faces is a cube.
A cube has 6 congruent faces,
so in a cube with a total surface area of 37.5cm%5E2 ,
each square face has a surface area of
37.5cm%5E2%2F6=6.25cm%5E2 .
The length of the edge of such a square face is
sqrt%286.25cm%5E2%29=highlight%282.5cm%29 .

THE EXPECTED SOLUTION:
With x and y in cm, the surface area, in square cm, is
2x%5E2%2B4xy=37.5 <---> y=%2837.5-2x%5E2%29%2F%224+x%22 ,
and the volume, in cubic cm, is
V=x%5E2y=x%5E2%28%2837.5-2x%5E2%29%2F%224+x%22%29=%2837.5x-2x%5E3%29%2F4
dV%2Fdx=%2837.5-6x%5E2%29%2F4
That derivative will be zero only for x=2.5 , and x=-2.5 ,
and changes sign from positive to negative only at highlight%28x=2.5%29 ,
meaning that V is maximum for x=2.5 .
Substituting 2.5 for x in
y=%2837.5-2x%5E2%29%2F4 we find
y=%2837.5-2%2A6.25%294=%2837.5-12.5%29%2F4=25%2F4=highlight%282.5%29