Summing a finitite series of natural numbers

Really we'll only treat the case starting with 1. Given a sequence of numbers <<latex(1, 2, 3, \ldots , N)>>, the series is given by <<latex(1+2+3+\ldots+N)>>. Finding the sum of the series is actually quite simple:

Given the series:
\[
     \sum_{i=1}^{N}i = 1+2+3+\ldots+N
\]
We can rearrange the series like so:
\[
     \sum_{i=1}^{N}i = (1+N)+(2+N-1)+\ldots
\]
The question is where does it stop? That is, how many $N+1$ terms do we have? Obviously if there is an even number of elements in the sequence you can do this exactly $N/2$ times.
This gives us:
\[
     \sum_{i=1}^{N}i = \frac{N(N+1)}{2}
\]
What what if its odd? Well, the middle term will now be $(N+1)/2$ (think about that a minute and it will be obvious to you), but you only have $N+1$ repeated $(N-1)/2$ times. That gives us the following
\begin{eqnarray}
     \sum_{i=1}^{N}i &=& \frac{(N+1)(N-1)}{2} + \frac{N+1}{2} \\
                     &=& \frac{N(N+1)}{2}
\end{eqnarray}
So we see that this series always converges to the same formula.