Suppose that the equation $c=f(x)$ represents the cost (in dollars) of producing $x$ ounces of gold from a new gold mine.
a.) State what is the meaning of the derivative $f'(x)$ and its corresponding units.
b.) What does the statement $f'(800) = 17$ mean.
c.) Do you think the values of $f'(x)$ wll increase or decrease in the short term? What about the long term? Explain.
$\quad$a.) The meaning of the derivative $f'(x)$ is the rate at which the cost is changing per ounce of gold produced.
Its unit is dollars per ounces.
$\quad$b.) $f'(800) = 17$ means that when 800 ounces of gold have been produced, the rate at which the
production cost is increasing at 17 $\displaystyle \frac{\text{dollars}}{\text{ounce}}$.
$\quad$c.) $f'(x)$ will decrease in short term suppose that the gold is abundant and the cost of production is cheap at that time.
However, $f'(x)$ will increase in the long term such that the amount of gold starts to deplete while the
demand increases.
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