Figure 1.61 Two tetrahedra in a centrosymmetric arrangement.
In summary, therefore, the unit cell in space group P
Although only one centre of symmetry is necessary to generate the equivalent positions in P
The positions x, y, z and
The coordinates of the general and special positions for each space group are listed in International Tables for X‐ray Crystallography together with additional information, as shown in Table 1.30 for P
1.18.5.2 Monoclinic C2
By common convention, the unique 2‐fold axis in a monoclinic unit cell is labelled b. Unfortunately, this is different to the use of с as the unique axis in tetragonal, trigonal and hexagonal cells but this usage for monoclinic cells is now so well established that it is unlikely to be altered. With b as the unique axis, the unit cell projects onto the xy plane as a rectangle (because γ = 90°), as shown in Fig. 1.62. Since β ≠ 90°, the z axis is not perpendicular to the plane of the paper but is inclined to the vertical.
Table 1.30 Coordinates and labelling of equivalent positions in space group P
| Number of positions | Wyckoff notation | Point symmetry | Coordinates of equivalent positions |
|---|---|---|---|
| 2 | I | 1 |
xyz, |
| 1 | h |
|
½, ½, ½ |
| 1 | g |
|
0, ½, ½ |
| 1 | f |
|
½, 0, ½ |
| 1 | e |
|
½, ½, 0 |
| 1 | d |
|
½, 0, 0 |
| 1 | c |
|
0, ½, 0 |
| 1 | b |
|
0, 0, ½ |
| 1 | a |
|
0, 0, 0 |
The C‐centring in space group C2 means that if the Bravais lattice has a lattice point at the origin (with coordinates 0, 0, 0), it also has an equivalent lattice point in the middle of the side bounded by a and b, at ½, ½, 0. For any position x, y, z in this space group, there will, therefore, be an equivalent position at x + ½, y + ½, z. This C‐centring has no representation in the right‐hand diagram of Fig. 1.62 but can be seen in the left‐hand diagram; for example, positions 1 and 2 are related by the C‐centring.