Because you're integrating over a singularity. (0,0,0) \in S and F diverges very badly at (0,0,0), too much so for it to be integrable at that point basically. Nice job catching Gauss's law! More precisely you could see it as "the 1/r² field only has a source at the origin", and Gauss's theorem tells you that you only need to measure the "strength" (in physics, this would be mass or charge depending on the force you're looking at) of the sources *within* the volume E to know the value of the integral. :D You could also link it to Laplace's equation, in a very similar way: F is the negative gradient of a 1/r potential, which is the fundamental solution of Laplace's equation, so by construction divF=0 everywhere but at the origin! :D

It has been a long time since I took E&M and I didn't even realize thats what I was getting at!! I should have mentioned it.