Answer:
See details on explanation below...
Step-by-step explanation:
By having a value for volume (v) the solution is as followed:
Let's develop expression for the cost of materials based on one of the dimensions.
Let w= width of the base;
d= depth of the base; and
h= height of the aquarium
C= cost
C= cost of base + cost of walls
=(5)(w×d)+(1)(2(w+d)×h)
Minimum will be performed when the width and the depth are the same.
So we are only need the case (substituting w for d)
C=5w^2+4wh
Volume in this case is expressed as
v=w^2h
So if we re-write our Cost equation as
C=5w^2+4w^2h/w
So we obtain
C=5w^2+4vw^−1
By finding the minimum cost, we take the derivative of this and set the result to zero.
dC/dw=10w−4vw^−2
So this equation is solved for w and via substitution for d and h. Once a value has been established for the volume (v)