Let $f$ be a real non polynomial analytic function. Suppose that the function $f$ assumes arbitrarily large and arbitrarily small values, i.e., for all $K>0$, there are $a,b$ with $f(a)<−K$ and $f(b)>K$.
My question is:
Does this property persists for the derivatives $f^{(k)}, k=1,2,..$
Consider $f(x) = x + \sin(x)$.