Question

`lim(x->0)` sin(x)*sin(`1/x`) solve the limit?

Answer 1

`0`

Explanation:

Notice, that `-1\le \sin\theta\le 1\ \forall \ \ \theta\in \mathbb R`

`\therefore -1\le \sin(1/x)\le 1\ \forall \ \ x\in \mathbb R`

Given that

`\lim_{x\to 0}\sin x\cdot \sin(1/x)`

`=\lim_{x\to 0}\sin x\cdot \lim_{x\to 0}\sin(1/x)`

`=0\cdot (k)\ \quad (\text{where}, \ -1\le k\le 1)`

`=0`