Answer:
Dimensions 30 in x 30 in x 15 in
Surface Area = 2,700 in²
Step-by-step explanation:
Let 'r' be the length of the side of the square base, and 'h' be the height of the bin. The volume is given by:
[tex]V=13,500=h*r^2\\h=\frac{13,500}{r^2}[/tex]
The total surface area is given by:
[tex]A=4*hr+r^2[/tex]
Rewriting the surface area function as a function of 'r':
[tex]A=4*\frac{13,500}{r^2} *r+r^2\\A=\frac{54,000}{r}+r^2[/tex]
The value of 'r' for which the derivate of the surface area function is zero, is the length for which the area is minimized:
[tex]A=54,000*r^{-1}+r^2\\\frac{dA}{dr}=0= -54,000*r^{-2}+2r\\\frac{54,000}{r^2}=2r\\ r=\sqrt[3]{27,000}\\r=30\ in[/tex]
The value of 'h' is:
[tex]h=\frac{13,500}{30^2}\\ h=15\ in[/tex]
The dimensions that will ensure the minimum surface area are 30 in x 30 in x 15 in.
The surface area is:
[tex]A=4*15*30+30^2\\A=2,700\ in^2[/tex]
