Could one-sided limits not exist but not equal to $\pm\infty$
e.g. $\displaystyle \lim_{x->c^+}f(x)$ DNE and $\displaystyle \lim_{x->c^+}f(x)\neq\pm\infty$
2026-04-24 03:48:33.1777002513
Is $\pm\infty$ the only case for one-sided limits to not exist?
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Yes.
Consider the function $$f(x)= \sin(1/x)$$ on the interval $(0,1).$
$$ \lim_{x\to {0^+}} f(x)$$ does not exist due to oscillations and the function is bounded.