Thanks a lot Ishuda ! Really nice.
A question about the first answer when we took the definition of the exponential :
How to be sure that an infinite sum of terms converge towards zero in + inf ?
Suppose for example the limit in + inf of 1/n + 1/n2 + 1/n3 + ....+ 1/nk
All the terms converge but how to know if the sum converge towards the same limit ? (zero)
In general you don't have that an infinite sum of zeros converges and, in fact. that sum can be anything you like - think of an integral as \(\displaystyle \Sigma\, f(x_n)\, \Delta x\) and letting \(\displaystyle \Delta x\) go to zero so each term goes to zero.
However, for certain cases you do have the sum of an infinite number of zeros is a particular number. Certainly that works for certain power series. Looking at the problem here (and making the u substitution) we have
f(u) = \(\displaystyle \frac{e^u\, -\, 1\, -\, u}{u^2}\, =\, u^2\, [\frac{1}{2}\, +\, \underset{n=3}{\Sigma}\, \frac{u^{n-2}}{n!}]\, =\, u^2\, [\frac{1}{2}\, +\, s(u)]\)
Now, if we could show that if s(u) went to zero as u went to zero we would have
\(\displaystyle \underset{u\, \to\, 0}{lim}\, \frac{f(u)}{u^2}\, =\, \frac{1}{2}\)
Now,
s(u) = \(\displaystyle \underset{n=3}{\Sigma}\, \frac{u^{n-2}}{n!}]\, =\, u\, \underset{n=3}{\Sigma}\, \frac{u^{n-3}}{n!}]\, =\, u\, t(u)\)
Now, t(u) converges for all finite u (think ratio test for example) and thus for u in some neighborhood of zero, say |u|<a, |t(u)| < A for some positive A (why?) and
0 \(\displaystyle \le\) |s(u)| \(\displaystyle \le\) A u; |u| < a.
So, by the 'squeeze theorem' that means that
\(\displaystyle \underset{u\, \to\, 0}{lim}\, s(u)\, =\, 0\)
You can do this sort of thing for every power series representing an infinitely differentiable function although I'm not sure all derivatives of just any power series must converge to prove the sum of its infinite zeros is any particular value.
