3 The structures of simple solids
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a b c
α β γ None Monoclinic a ≠ b ≠ c , α = γ = 90°, β ≠ 90°
β
One two-fold rotation axis and /or a mirror plane Orthorhombic a ≠ b ≠ c , α = β = γ = 90° a b c Three perpendicular two-fold axes and /or mirror planes Rhombohedral a = b = c , α = β = γ ≠ 90°
α Tetragonal a = b ≠ c , α = β = γ = 90° a c One four-fold rotation axis Hexagonal a = b ≠ c , α = β = 90°, γ = 120° a c One six-fold rotation axis Cubic
a = b = c , α = β = γ = 90° a Four three-fold rotation axes tetrahedrally arranged
β
b γ α β c α
a c a a α α Cubic Triclinic Hexagonal Tetragonal Orthorhombic Monoclinic Rhombohedral (trigonal) 120° Figure 3.2 The seven crystal systems. a b c (+1,0,0)
O Figure 3.3 Lattice points describing the translational symmetry of a primitive cubic unit cell. The translational symmetry is just that of the unit cell; for example the a lattice point at the origin, O, translates by ( +1,0,0)
to another corner of the unit cell. a b c (+½,½,½)
O Figure 3.4 Lattice points describing the translational symmetry of a body-centred cubic unit cell. The translational symmetry is that of the unit cell and ( +½,+½,+½), so a lattice point at the origin, O, translates to the body centre of the unit cell. a b c O (+½,0,½) Figure 3.5 Lattice points describing the translational symmetry of a face-centred cubic unit cell. The translational symmetry is that of the unit cell and ( +½,+½,0) , ( +½,0,+½), and (0,+½,+½) so a lattice point at the origin, O, translates to points in the centres of each of the faces. 2523_Ch03.indd 67 2523_Ch03.indd 67 10/1/2013 7:03:48 PM 10/1/2013 7:03:48 PM 68 3 The structures of simple solids Thus, for the face-centred cubic lattice depicted in Fig. 3.5 the total number of lattice points in the unit cell is ( ) ( )
6 4 1 8 1 2 × × + = . For the body-centred cubic lattice depicted in Fig. 3.4 , the number of lattice points is ( ) ( )
8 2 1 8 × × + = .
E X A MPLE 3.1 Identifying lattice types Determine the translational symmetry present in the structure of cubic ZnS ( Fig. 3.6 ) and identify the lattice type to which this structure belongs. Download 207.23 Kb. Do'stlaringiz bilan baham: 
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