@thecoshman You are confusing the term "sum", I think that's your biggest issue here at the moment. If you do 1 + 2, the sum of those numbers is 3. When you keep going with the summation all the way to infinity, you get something that "diverges", which means there isn't a concrete value given that is the actual sum. There are ways to try to "compute" the sum of an infinite series but these are not "actual" sums. They just take a partial form of it and do other computations with it.

These include things such as analytical continuation, "averaging", etc. The actual "sum" that we know the word dear is however still "infinitely big" I suppose. The real takeaway from this is: infinity is weird.