Answer:
Step-by-step explanation:
Given that rectangle has side length 23x13 feet.
When squares of side x are cut from all the four sides we have dimensions as
23-2x and 13-2x and height x
Volume [tex]=x(23-2x)(13-2x)[/tex]
[tex]=x(299-72x+4x^2)\\=299x-72x^2+4x^3[/tex]
Use derivative test
First derivative V'(x) [tex]V'(x)= 299-144x+12x^2\\V"(x) = -144+24x[/tex]
Equate I derivative to 0
We get approximate value of x = 2.671, 9.329
Since width is 13 feet it cannot be 9.329
Hence x = 2.671
V"(x) = -80 <0
So maximum volume is
[tex]299x-72x^2+4x^3\\=299(2.671)-72(2.671)^2 +4(2.671)^3\\\\=361.186[/tex]
