Let $$f(0)=0,\;\;f(x)=e^{-2/x}\sin\left(e^{1/x}\right),$$ is $f$ bounded variation on $[0,1]$?
Here is my thinking:
Since $f$ is differentiable on $(0,1]$ and continuous on $[0,1]$
If $f^\prime$ is bounded, we can use mean value theorem to prove it.
2026-03-28 23:10:30.1774739430
$f(0)=0,\;\;f(x)=e^{-2/x}\sin\left(e^{1/x}\right)$, is $f$ bounded variation on [0,1]?
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