$\displaystyle \lim_{h \to 0} \frac{\sqrt[4]{16 + h} - 2}{h}$ represents the derivative of some function $f$ at some number $a$. State such an $f$ and $a$ in this case.
Recall the limit equation for the derivatives
$\lim\limits_{h \to 0} \displaystyle \frac{f(a + h) - f(a)}{h}$
We can see that the left side equation on the numerator is a square root base 4, So $f(x) = \sqrt[4]{x}$ and $a = 16$ as stated in the limit equation for derivatives.
To check if $a = 16$,
$f(a) = \sqrt[4]{a}$
$f(16) = \sqrt[4]{16} = 2$ just like the value of $f(a)$
Therefore,
$f(x) = \sqrt[4]{x}$ and $a = 16$
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