Crystals and Symmetry

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Crystals and Symmetry

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Crystals and Symmetry. Why Is Symmetry Important?. Identification of Materials Prediction of Atomic Structure Relation to Physical Properties Optical Mechanical Electrical and Magnetic. Repeating Atoms in a Mineral. Unit Cell. Unit Cells. - PowerPoint PPT Presentation

Transcript of Crystals and Symmetry

Page 1: Crystals and Symmetry

Crystals and Symmetry

Page 2: Crystals and Symmetry

Why Is Symmetry Important?

• Identification of Materials• Prediction of Atomic Structure• Relation to Physical Properties

– Optical– Mechanical– Electrical and Magnetic

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Repeating Atoms in a

Mineral

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Unit Cell

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Unit Cells All repeating patterns can be described in

terms of repeating boxes

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The problem in Crystallography is to reason from the outward shape to the unit cell

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Which Shape Makes Each Stack?

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Stacking Cubes

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Some shapes that result from stacking cubes

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Symmetry – the rules behind the shapes

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Symmetry – the rules behind the shapes

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Single Objects Can Have Any Rotational Symmetry Whatsoever

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Rotational Symmetry May or May Not be Combined With Mirror

Symmetry

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The symmetries possible around a point are called point groups

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What’s a Group?

• Objects plus operations New Objects• Closure: New Objects are part of the Set

– Objects: Points on a Star– Operation: Rotation by 72 Degrees

• Point Group: One Point Always Fixed

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What Kinds of Symmetry?

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What Kinds of Symmetry Can Repeating Patterns Have?

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Symmetry in Repeating Patterns

• 2 Cos 360/n = Integer = -2, -1, 0, 1, 2• Cos 360/n = -1, -1/2, 0, ½, 1• 360/n = 180, 120, 90, 60, 360• Therefore n = 2, 3, 4, 6, or 1• Crystals can only have 1, 2, 3, 4 or 6-Fold

Symmetry

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5-Fold Symmetry?

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No. The Stars Have 5-

Fold Symmetry, But Not the

Overall Pattern

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5-Fold Symmetry?

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5-Fold Symmetry?

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5-Fold Symmetry?

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Symmetry Can’t Be Combined Arbitrarily

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Symmetry Can’t Be Combined Arbitrarily

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Symmetry Can’t Be Combined Arbitrarily

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Symmetry Can’t Be Combined Arbitrarily

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Symmetry Can’t Be Combined Arbitrarily

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The Crystal Classes

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Translation• p p p p p p p p p p p p p• pq pq pq pq pq pq pq pq pq pq• pd pd pd pd pd pd pd pd pd pd• p p p p p p p p p p p p p

b b b b b b b b b b b b b• pd pd pd pd pd pd pd pd pd pd

bq bq bq bq bq bq bq bq bq bq• pd bq pd bq pd bq pd bq pd bq pd bq pd bq• p b p b p b p b p b p b p b

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Space Symmetry• Rotation + Translation = Space Group• Rotation• Reflection• Translation• Glide (Translate, then Reflect)• Screw Axis (3d: Translate, then Rotate)• Inversion (3d)• Roto-Inversion (3d: Rotate, then Invert)

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There are 17 possible repeating patterns in a plane. These are

called the 17 Plane Space Groups

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Triclinic, Monoclinic and Orthorhombic Plane Patterns

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Trigonal Plane

Patterns

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Tetragonal Plane Patterns

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Hexagonal Plane Patterns

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Why Is Symmetry Important?

• Identification of Materials• Prediction of Atomic Structure• Relation to Physical Properties

– Optical– Mechanical– Electrical and Magnetic

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The Five Planar Lattices

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The Bravais Lattices

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Hexagonal Closest Packing

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Cubic Closest Packing


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