f(x)={\begin{matrix}\mathrm{min}{|x|,2-{x}^{2}},-2\leq x\leq 2 \\ [|x|],2<|x|\leq 3\end{matrix}
⇒x∈[−3,−2)∪(2,3]

Number of points of non-differentiability in (−3,3)=5
A function f is defined on [−3,3] as
f(x)={\begin{matrix}\mathrm{min}{|x|,2-{x}^{2}},-2\leq x\leq 2 \\ [|x|],2<|x|\leq 3\end{matrix}
where [x] denotes the greatest integer ≤x. The number of points, where f is not differentiable in (−3,3) is ___ .
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