I am in the process of trying to learn algebraic geometry via schemes and am wondering if there are simple motivating examples of why you would want to consider these structures.
I think my biggest issue is the following: I understand (and really like) the idea of passing from a space to functions on a space. In passing from $k^n$ to $R:=k[x_1,\ldots,x_n]$, we may recover the points by looking at the maximal ideas of $R$. But why consider $\operatorname{Spec} R$ instead of $\operatorname{MaxSpec} R$? Why is it helpful to have non-closed points that don't have an analog to points in $k^n$? On a wikipedia article, it mentioned that the Italian school used a (vague) notion of a generic point to prove things. Is there a (relatively) simple example where we can see the utility of non-closed points?