Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download Mineralogy - Carleton College
Document related concepts
Transcript
Mineralogy Carleton College Winter 2003 Lattice and its properties • Lattice: An imaginary 3-D framework, that can be referenced to a network of regularly spaced points each of which represents the position of a motif. Lattice and its properties • line lattice • plane lattice • space lattice – unit cell – primitive and non-primitive cells Lattice and its properties • I can generate a lattice line from a lattice point by translating my lattice point with a vector (a) Lattice and its properties • I can generate a lattice line from a lattice point by translating my lattice point with a vector (a) vector a Lattice and its properties • I can generate a lattice line from a lattice point by translating my lattice point with a vector (a) vector a Lattice and its properties • I can generate a lattice line from a lattice point by translating my lattice point with a vector (a) vector a Lattice and its properties • Plane lattice: by introducing another vector b, that is not in the same direction as a, I can produce a plane lattice vector a vector b Lattice and its properties • Space lattice, by introducing another vector c, which is not in the same plane as a and b, I can generate a space lattice c b Unit Cell • The smallest representative unit of structure which when repeated in 3-D gives the whole crystal. Structure: • Nearly all minerals are crystalline solids composed of atoms or ions held in an orderly, 3-D array by inter atomic forces. Such array of atoms are called crystal structure and are characterized by periodic duplication of any grouping of atoms along any line through the structure. • In other wards the ordered arrangement of atoms or group of atoms within crystalline substance. Unit Cell • How to choose a Unit cell from plane lattice? Choice of a Unit Cell Choice of a Unit Cell • Look at this pattern, it is produced by simple translations. • There are several possible choices for the Unit Cell. Choice of a Unit Cell Choice of a Unit Cell Choice of a Unit Cell C Choice of a Unit Cell • A lattice point occurs where the corners of four cells meet, and therefore, 1/4 point per corner lies in a give cell (1/4 * 4=1) C Choice of a Unit Cell • Unit Cells that include one lattice point, such as A, and B are called primitive Cells. • Unit Cell C is Nonprimitive. C Choice of a Unit Cell • Many different cells containing a single lattice point may be chosen. C Choice of a Unit Cell • How do you chose the Unit Cell? C – To keep the translations short – To provide as highly specialized a lattice geometry as possible – To have the cell shape comparable with the shape of the crystal Symmetry of a Lattice: • Lets see what symmetry exist in a lattice for a moment and we will come back to Unit Cell Elements of symmetry operations: • Symmetry operations: Movements performed on an object such that when completed, the object looks the same as when you started. – These include: Elements of symmetry: – – – – – – – – Translation Reflection Rotation Inversion Roto-inversion Roto-reflection Glide screw axis Elements of symmetry: • What elements of repetition exist? – Translation vector a vector b Elements of symmetry: • What elements of repetition exist? – Reflection/Mirror • Mirror plane: plane passed through object such that the images on opposite sides of the plane are mirror images of one another Elements of symmetry: • What elements of repetition exist? – Reflection Elements of symmetry: • What elements of repetition exist? – Rotation • Rotation Axis - An axis through the object, around which the object is rotated such that the original "motif" (or appearance) is repeated a specific number of times during 360 degrees Elements of symmetry: • What elements of repetition exist? – Rotation Elements of symmetry: • What elements of repetition exist? – Rotation of 90 degrees will give me.. Elements of symmetry: • What elements of repetition exist? – Rotation of 90 degrees will give me.. Elements of symmetry: • What elements of repetition exist? – Rotation of 90 degrees will give me.. Elements of symmetry: • What elements of repetition exist? – Rotation of 90 degrees will give me.. Elements of symmetry: • What elements of repetition exist? – Rotation of 90 degrees will give me.. Elements of symmetry: • What elements of repetition exist? – Here is a different unit cell Elements of symmetry: • What elements of repetition exist? – Here is a different unit cell Elements of symmetry: • What elements of repetition exist? – Rotation of 60 degrees gives me another motif Elements of symmetry: • What elements of repetition exist? – Rotation • 1 axis • 2 axes • 3 axes • 4 axes • 6 axes 360 degrees 180 degrees 120 degrees 90 degrees 60 degrees Elements of symmetry: • What elements of repetition exist? – Inversion Elements of symmetry: • What elements of repetition exist? – Roto-inversion • first a rotation, then an inversion of 180 degrees Elements of symmetry: • What elements of repetition exist? – Roto-reflection Elements of symmetry: • What elements of repetition exist? – Glide Elements of symmetry: • What elements of repetition exist? – Glide Elements of symmetry: • What elements of repetition exist? – Glide Elements of symmetry: • What elements of repetition exist? – Glide Elements of symmetry: • What elements of repetition exist? – Glide Elements of symmetry: • What elements of repetition exist? – Glide Elements of symmetry: • What elements of repetition exist? – Glide Elements of symmetry: • What elements of repetition exist? – screw axis • This include translation and rotation together Screw Axis , , , , , Rotation of 90 degrees t1 Unit Cell • Unit Cell parameters – a, b, c – ( c sides) – a, b, g – angles b Unit Cell • Unit Cell parameters c b a a – a, b, c – sides – a, b, g – b angles Translation Symmetry • A translation is simply moving an object in some direction (a, b, c) without a rotation. Hence a point (x, y, z) is translated to the point (x+a, y+b, z+c). Translation Symmetry • Crystalline materials have structures with translational symmetry. The unit cell of the crystal contains the smallest atomic group that is needed to define the structure under repetition. Translational Nets in 2-D • There are five different ways to translate a point in twodimensions. Here is the first simple net. Translational Nets in 2-D • There are five different ways to translate a point in twodimensions. Here is the second simple net. Translational Nets in 2-D • There are five different ways to translate a point in twodimensions. Here is the third simple net. Translational Nets in 2-D • There are five different ways to translate a point in twodimensions. Here is the fourth simple net. Translational Nets in 2-D • There are five different ways to translate a point in twodimensions. Here is the fifth simple net. Translational Nets in 2-D (cont.) • The diamond net can also be defined in terms of a “centered rectangular net” with a1 = a2 and g = 90degrees.
