How do I take limits of the form $\lim_{x \rightarrow 1} \left((x - 1)\sin\left(\frac{x}{x-1}\right)\right)$?
Using boundedness of $\sin$ seems wrong.
How do I take limits of the form $\lim_{x \rightarrow 1} \left((x - 1)\sin\left(\frac{x}{x-1}\right)\right)$?
Using boundedness of $\sin$ seems wrong.
Clearly $- (x - 1) \leq (x - 1)\sin \left( {\frac{x}{{x - 1}}} \right) \leq (x - 1)$ and $\pm(x - 1) \to 0$ as $x \to 1$, so by the squeeze theorem we know that $(x - 1)\sin \left( {\frac{x}{{x - 1}}} \right) \to 0.$
Why does using boundedness seem wrong?
We have for all $x \in \mathbb R$ that \[ 0 \le \left|(x-1)\sin\frac x{x-1}\right| \le \left|x-1\right| \] As $\lim_{x\to 1} 0 = \lim_{x\to 1} \left|x-1\right| = 0$, we have \[ \lim_{x\to 1} (x-1)\sin\frac x{x-1} = 0 \] by the sandwich theorem.