Baby Rudin continuity problem question

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genericusrnme
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Sup guys, I was just going over my Baby Rudin and I came across a problem that I don't really know how to get started on.

Suppose f is a real function defined on R that satisfies, for all x [itex]Limit_{n\ \rightarrow \ 0} (f(x+n)-f(x-n)) = 0[/itex], does this imply f is continuous?

My first thoughts are that no, it doesn't imply f is continuous, it just implies that f doesn't have any simple discontinuities since [itex]f(x_+) = f_(x_-)[/itex]. I don't know how I can go about showing this though..

Could anyone nudge me in the right direction?

Thanks in advance!
 
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tiny-tim said:
hi genericusrnme! :smile:


does it ? :wink:

Ah yes, you're completely right
f(x+) = f(x-) but f(x+) isn't necessarily equal to f(x)

HallsofIvy said:
Well, what, exactly, do you mean by a "simple" discontinuity? If f(x)= 1 for all x except 0 and f(0)= 0, that looks like a pretty simple discontinuity to me!

Yep, I just got that

Thanks guys!