# Question #11fb2

Feb 14, 2017

Because $f \left(- 2\right)$ is not defined, the function is not continuous in any way at $- 2$.
$f \left(0\right) = 0$ but ${\lim}_{x \rightarrow 0} f \left(x\right)$ does not exist. (The left and right limits are different.)
Because ${\lim}_{x \rightarrow {0}^{-}} f \left(x\right) = 0 = f \left(0\right)$, $f$ is continuous from the left at $0$.