Answer :
Answer:
The minimum unit cost is $5257
Step-by-step explanation:
Minimization
Given a function c(x), the minimum value of c can be found by computing the first derivative. Equating the first derivative to zero will provide the critical points, or candidate point to maximize or minimize the function. The second derivative criterion will make clear which type of point was obtained.
The cost in dollars to produce x machines is
[tex]C(x)=x^2-520x+72857[/tex]
Find the first derivative
[tex]C'(x)=2x-520[/tex]
Equate to 0
[tex]2x-520=0[/tex]
Solving:
[tex]x=260[/tex]
There must be produced 260 machines to minimize the cost. The minimum cost is
[tex]C(260)=260^2-520\cdot 260+72857[/tex]
[tex]C(260)=5257[/tex]
The minimum unit cost is $5257