Given,
f(x)=∣[x]∣+x−[x]
x−[x]≥0⇒x∈R
Now using the property of greatest integer function and simplifying the function we get,
f(x)={\begin{matrix}2+\sqrt{x+2},-2<x<-1 \\ 1+\sqrt{x+1},-1\leq x<0 \\ \sqrt{x},0\leq x<1\end{matrix}
Now plotting the diagram we get,

Now from the diagram we can say that, f(x) is discontinuous at two points x=–1,0.