Answer:
The company should made 240 copy machines for the minimum unit cost
Explanation:
We have to found what is the minimum quantity of copy machines that should have been made ("x") when the derived of the cost respect to "x" is zero. That calls the First Derivative Test.
It means:
[tex]C(x) = 0.3x^{2} -144x+22433[/tex]
So, the derived of C(x) respect to "x" is:
[tex]C'(x)=2(0.3)x-144=0.6x-144[/tex]
Now, we make the previous expression equal to zero and clear "x":
[tex]0.6x-144=0\\x=144/0.6\\x=240[/tex]
So, now, we know that we will have a maximum or a minimum reached when the company makes 240 copy machines. So, with the Second Derivative Test we are going to find if the cost is maximum or minimum.
Let's find the second derived of the function:
[tex]C(x) = 0.3x^{2} -144x+22433\\C'(x)= 0.6x-144\\C''(x)=0.6[/tex]
As the second derived is bigger than zero, the Second Derivative Test says to us that there is a minimum when "x" is equal to 240 units
