Respuesta :
Answer:
The dimensions of the rectangular box is 29.08 ft×29.08 ft×4.85 ft.
Minimum cost= 26,779.77 cents.
Step-by-step explanation:
Given that a rectangular box with a volume of 684 ft³.
The base and the top of the rectangular box is square in shape.
Let the length and width of the rectangular box be x.
[since the base is square in shape, length=width]
and the height of the rectangular box be h.
The volume of rectangular box is = Length ×width × height
=(x²h) ft³
According to the problem,
[tex]x^2h=684[/tex]
[tex]\Rightarrow h=\frac{684}{x^2}[/tex].....(1)
The area of the base and top of rectangular box is = x² ft²
The surface area of the sides= 2(length+width) height
=2(x+x)h
=4xh ft²
The total cost to construct the rectangular box is
=[(x²×20)+(x²×10)+(4xh×2.5)] cents
=(20x²+10x²+10xh) cents
=(30x²+10xh) cents
Total cost= C(x).
C(x) is in cents.
∴C(x)=30x²+10xh
Putting [tex]h=\frac{684}{x^2}[/tex]
[tex]C(x)=30x^2+10x\times\frac{684}{x^2}[/tex]
[tex]\Rightarrow C(x)=30x^2+\frac{6840}{x}[/tex]
Differentiating with respect to x
[tex]C'(x)=60x-\frac{6840}{x^2}[/tex]
To find minimum cost, we set C'(x)=0
[tex]\therefore60x-\frac{6840}{x^2}=0[/tex]
[tex]\Rightarrow60x=\frac{6840}{x^2}[/tex]
[tex]\Rightarrow x^3=\frac{6840}{60}[/tex]
[tex]\Rightarrow x\approx 4.85[/tex] ft.
Putting the value x in equation (1) we get
[tex]h=\frac{684}{(4.85)^2}[/tex]
≈29.08 ft.
The dimensions of the rectangular box is 29.08 ft×29.08 ft×4.85 ft.
Minimum cost C(x)=[30(29.08)²+10(29.08)(4.85)] cents
=29,779.77 cents
