Limit involving dirac delta distributions

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thrillhouse86
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Hey All,

I am trying to evaluate the limit:
[tex] \lim_{x\to 0^{+}} \frac{\delta''(x)}{\delta''(x)}[/tex]

Where [tex]\delta'(x)[/tex] is the first derivative of the dirac distribution and [tex]\delta''(x)[/tex] is the second derivative of the dirac distribution.

I thought about the fact that this expression will be infinity / infinity and then using L'Hospitals but that doesn't help.

I guess my question (as someone with an engineering / physics background and not a mathematician) is this limit impossible to evaulate ? and if so is it impossible because taking the limiting value of a dirac distribution doesn't make a whole lot of sense ?

Thanks
 
on Phys.org
Sorry I mean to evaulate:
[tex] \lim_{x\to 0^{+}} \frac{\delta'(x)}{\delta''(x)}[/tex]
 
Try writing the delta function as limit of a Gaussian, for example.