The vector field of the primary forces of quantum space-time is given by F(x,y,z)=Mi+Nj+Pk where ijk are the unit vectors in a Cartesian system and where M(x,y,z)=0, N(x,y,z)=x²-2x+z², and P=x²+z². The curl of F (Ñ×F) is then defined as (P/y-N/z)i-(P/x-M/z)j+(N/x-M/y)k. Next, by partial differentiations give P/y=2y, N/z=2z, P/x=2x, M/z=0, N/x=2x-2, and M/y=0. Direct substitutions give the curl of F as (2y-2z)i-2xj+2(x-1)k. It can be shown that this particular curl is nonconservative, contrary to what Feynman believed (see The Feynman Lectures on Physics, Volume I, and Page 14-6). The curl never vanishes for all 0,+1,-1 permutated values of x, y, and z. At the point (0,0,0) the curl is -2k, curl(1,0,0)=-2j, curl(0,1,0)=2i-2k, curl(0,0,1)=-2i-2k, curl( 1,1,0)=2i-2j, curl(1,0,1)=-2i-2j, curl(0,1,1)=-2k, curl(1,1,1)=-2j, curl(-1,0,0)=2j-4k, curl(0,-1,0)=-2i-2k, curl(0,0,-1)=2i-2k, curl(-1,-1,0)=-2i-2j-4k, curl(-1,0,-1)=2i+2j-4k, curl(0,-1,-1)=-2k, curl(-1,-1,-1)=2j-4k, curl(1,1,-1)=4i-2j, curl1,-1,-1)=-2j, curl(-1,1,1)=2j-4k, curl(-1,1,-1)=4i+2j-4k, curl(-1,-1,1)=-4i+2j-4k, curl(1,-1,1)=-4i-2j. There are 21 distinct permutations with their respective norms (absolute values) as 2, 2, 2Ö2, 2Ö2, 2Ö2, 2Ö2, 2, 2, 2Ö5, 2Ö2, 2Ö2, 2Ö6, 2Ö6, 2, 2Ö5, 2Ö5, 2, 2Ö5, 6, 6, 2Ö5, arranged in ascending order give: 2, 2, 2, 2, 2, 2, 2Ö2, 2Ö2, 2Ö2, 2Ö2, 2Ö2, 2Ö2, 2Ö5, 2Ö5, 2Ö5, 2Ö5, 2Ö5, 2Ö6, 2Ö6, 6, 6. The statistical average or mean is 2.397222771…, median is 2Ö2. It is bimodal of 2 and 2Ö2, the range is 4. These statistics show that for unit Planck length of the space-time quantum the minimum zero-point energy configuration is 2 units and the maximum is 6, suggesting that the maximum matter configuration is 8(2+6) and the maximum equipartition energy configuration derivable from the quantum vacuum fluctuations is also 6 for each degree of freedom.