Answer:
Maximum Volume = 29,659.5 cubic inches
Step-by-step explanation:
We can write the perimeter as 2*(x+h) and this is equal to 117
So
[tex]2(x+h) = 117\\x+h=58.5\\h=58.5-x[/tex]
The volume is [tex]x^2(h)[/tex]
Plugging the expression for h, we have:
[tex]V=x^2 h\\V=x^2(58.5-x)\\V=58.5x^2-x^3[/tex]
The max volume can be found when this differentiated is equal to 0, or dV/dx=0
[tex]V=58.5x^2-x^3\\\frac{dV}{dx}=117x-3x^2=0\\3x(39-x)=0\\x=0,39[/tex]
x can't be 0, so we take x = 39
and thus h=58.5-x = 58.5-39=19.5
Max Volume = [tex]x^2h=(39)^2 (19.5)=29,659.5[/tex]
