I need to prove that any monotonic function whose domain is an interval $[a;b]$ can have only finite or countable number of discontinuity points...
I don't seem to have any insightful ideas. It even raises more questions in my head. What happens if we remove a requirement for monotonicity? Can you tell me any function (whose domain is all real numbers for example) have more than countable number of discontinuity points?
$f(x)=\begin {cases} 1&x \in \mathbb Q \\ 0 & x \not \in \mathbb Q \end {cases}$
is discontinuous at every point.
Assume $f$ is non-decreasing first.
At a discontinuity point $x_0$, you have $$\lim_{x\rightarrow x_0^-}f(x)< \lim_{x\rightarrow x_0^+} f(x).$$
Now try to find a one-to-one mapping from the set of discontinuity points into $\mathbb{Q}$.
The non-increasing case can be treated similarly.
Your second question has already been answered many times, so I will stop here.
Sorry for that but I will raise even more questions in your head : there exists functions that are not continuous in any point. Moreover, these kind of "monstruous functions" are dense ...
