> Dnia 00-10-02 Howard Price pisze:
>
> > Is it just me, or did it suddenly get geekier in here? :-)
> What is it?
>
> > But is there really positive and negative zeroes? It's peaked
> > my geeky interest.
> They are only if you define them. I defined them as "value
> smaller (as absolute) tha
> Dnia 00-09-29 Ian Collier pisze:
>
> > You can use whatever filetypes you like - have one for
> > autoboot and one for not-autoboot if you really want (after
> > all, what's in a name? It's just an entry in the registry) -
> > but I'm not sure I see the point in the not-autoboot one so
> > one m
Dnia 00-09-29 Ian Collier pisze:
> You can use whatever filetypes you like - have one for
> autoboot and one for not-autoboot if you really want (after
> all, what's in a name? It's just an entry in the registry) -
> but I'm not sure I see the point in the not-autoboot one so
> one might as well j
Dnia 00-10-02 Howard Price pisze:
> Is it just me, or did it suddenly get geekier in here? :-)
What is it?
> But is there really positive and negative zeroes? It's peaked
> my geeky interest.
They are only if you define them. I defined them as "value
smaller (as absolute) than smalest value havi
Dnia 00-09-29 Ian Collier pisze:
> Lim (n->0) n / n^2 => 0/0 = infinity
because n/n^2 == 1/n
Try
Lim (n->0) n / (n+n^2)
and you get 1 as result.
--
Yarek.