Question

A box with a square base and open top must have a volume of 108000 cm^3. We wish to find the dimensions of the box that minimize the amount of material used. First, find a formula for the surface area of the box in terms of only x, the length of one side of the square base. [Hint: use the volume formula to express the height of the box in terms of x.] Simplify your formula as much as possible. A(x)= Next, find the derivative, A'(x) A'(x)= Now, calculate when the derivative equals zero, that is, when A'(x)=0. [Hint: multiply both sides by x^2.] A'(x)=0 when x= We next have to make sure that this value of x gives a minimum value for the surface area. Let's use the second derivative test. Find A"(x) A"(x)= Evaluate A"(x) at the x-value you gave above. _

          A box with a square base and open top must have a
volume of 108000 cm^3. We wish to find the dimensions of the
box that minimize the amount of material used.
First, find a formula for the surface area of the box in terms of
only x, the length of one side of the square base.
[Hint: use the volume formula to express the height of the box in
terms of x.]
Simplify your formula as much as possible.
A(x)=____
Next, find the derivative, A'(x)
A'(x)=  ____
Now, calculate when the derivative equals zero, that is,
when A'(x)=0. [Hint: multiply both sides by x^2.]
A'(x)=0 when x=
We next have to make sure that this value of x gives
a minimum value for the surface area. Let's use the
second derivative test. Find A"(x)
A"(x)=____
Evaluate A"(x) at the x-value you gave
above.
_____

Added by James M.

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