Close-packing
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Close-packing of spheres is the arranging of an infinite lattice of spheres so that they take up the greatest possible fraction of an infinite 3-dimensional space. Carl Friedrich Gauss proved that the highest average density that can be achieved by a regular lattice arrangement is [\frac \simeq 0.74048]. The Kepler conjecture states that this is the highest density that can be achieved by any arrangement of spheres, either regular or irregular.
There are two regular lattices that achieve this highest average density. They are called face-centred cubic (FCC) and hexagonal close-packed (HCP), based on their symmetry. Both are based upon sheets of spheres arranged at the vertices of a triangular tiling; they differ in how the sheets are stacked upon one another. In both arrangements each sphere has twelve neighbors. For every sphere there is one gap surrounded by six spheres (octahedral) and two smaller gaps surrounded by four spheres (tetrahedral).
Relative to a reference layer with positioning A, two more positionings B and C are possible. Every sequence of A, B, and C without immediate repetition of the same one is possible and gives an equally dense packing for spheres of a given radius.
The most regular ones are:
- HCP = ABABABA
- FCC = ABCABCA
The coordination number of HCP and FCC is 12 and its atomic packing factor (APF) is the number mentioned above, 0.74.
See also
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