Answer:
The average cost of belt is decreasing at a rate 0.085 dollars per belt when 180 belts have been produced.
Step-by-step explanation:
We are given the following in the question:
Cost function:
[tex]C(x) = 720 + 35x-0.063x^2[/tex]
where x is the number of belts.
Average cost =
[tex]A(x) = \dfrac{C(x)}{c} = \dfrac{720 + 35x-0.063x^2}{x}\\\\A(x) = \dfrac{720}{x} + 35 -0.063x[/tex]
Rate of change of average function:
[tex]\dfrac{d(A(x))}{dx} = \dfrac{d}{dx}( \dfrac{720}{x} + 35 -0.063x)\\\\\dfrac{d(A(x))}{dx} = \dfrac{-720}{x^2}-0.063[/tex]
Change in average cost when 180 belts have been produced
[tex]\dfrac{d(A(180))}{dx} = \dfrac{-720}{(180)^2}-0.063 = -0.085[/tex]
Thus, the average cost of belt is decreasing at a rate 0.085 dollars per belt when 180 belts have been produced.
