We know that, ∣logx∣ is continuous in (0,∞).
⇒f(x)=e−log∣x∣ is continuous in (0,∞)
Thus, the number of points where f(x) is discontinuous is 0.
⇒m=0
f(x)={\begin{matrix}{e}^{\mathrm{log}x}, & 0<x<1 \\ {e}^{-\mathrm{log}x}, & x\geq 1\end{matrix}
\Rightarrow f(x)={\begin{matrix}x, & 0<x<1 \\ \frac{1}{x}, & x\geq 1\end{matrix}
\Rightarrow {f}^{'}(x)={\begin{matrix}1, & 0<x<1 \\ \frac{-1}{{x}^{2}}, & x\geq 1\end{matrix}
\Rightarrow {f}^{'}({1}^{-})=1&{f}^{'}({1}^{+})=-1
So, the number of points where f(x) is non-differentiable is 1.
⇒n=1
⇒m+n=1