Tesla (unit) and Molecular symmetry: Difference between pages
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'''Molecular symmetry''' is a basic idea in [[chemistry]]. It is about the [[symmetry]] of [[molecule]]s. It puts molecules into groups according to their symmetry. It can [[predict]] or explain many of a molecule's [[chemical property|chemical properties]].<ref>''Quantum Chemistry'', Third Edition John P. Lowe, Kirk Peterson ISBN 012457551X</ref><ref>''Physical Chemistry: A Molecular Approach'' by Donald A. McQuarrie, John D. Simon ISBN 0935702997</ref><ref>''The chemical bond'' 2nd Ed. J.N. Murrell, S.F.A. Kettle, J.M. Tedder ISBN 047190760X</ref><ref>''Physical Chemistry'' P. W. Atkins ISBN 0716728710</ref><ref>G. L. Miessler and D. A. Tarr “Inorganic Chemistry” 3rd Ed, Pearson/Prentice Hall publisher, ISBN 0-13-035471-6.</ref> | |||
== | Chemists study symmetry to explain how [[crystal]]s are made up and how [[chemical reaction|chemicals react]]. The molecular symmetry of the [[reactant]]s help predict how the product of the reaction is made up and the [[Activation energy|energy]] needed for the reaction. | ||
:<math>\ | Molecular symmetry can be studied several different ways. [[Group theory]] is the most popular idea. Group theory is also useful in studying the symmetry of [[molecular orbital]]s. This is used in the [[Hückel method]], [[ligand field theory]], and the [[Woodward–Hoffmann rules]]. Another idea on a larger scale is the use of [[crystal system]]s to describe [[crystallography|crystallographic]] symmetry in bulk materials. | ||
= \ | |||
Scientists find molecular symmetry by using [[X-ray crystallography]] and other forms of [[spectroscopy]]. [[Spectroscopic notation]] is based on facts taken from molecular symmetry. | |||
== Historical background == | |||
Physicist [[Hans Bethe]] used characters of point group operations in his study of [[ligand field theory]] in 1929. [[Eugene Wigner]] used group theory to explain the selection rules of [[atomic spectroscopy]].<ref>''Group Theory and its application to the quantum mechanics of atomic spectra'', E. P. Wigner, Academic Press Inc. (1959)</ref> The first character tables were compiled by [[László Tisza]] (1933), in connection to vibrational spectra. [[Robert Mulliken]] was the first to publish character tables in English (1933). [[E. Bright Wilson]] used them in 1934 to predict the symmetry of vibrational [[normal mode]]s.<ref>''Correcting Two Long-Standing Errors in Point Group Symmetry Character Tables'' Randall B. Shirts [[J. Chem. Educ.]] 2007, 84, 1882. [http://jchemed.chem.wisc.edu/Journal/Issues/2007/Nov/abs1882.html Abstract]</ref> The complete set of 32 crystallographic point groups was published in 1936 by Rosenthal and Murphy.<ref>''Group Theory and the Vibrations of Polyatomic Molecules'' Jenny E. Rosenthal and G. M. Murphy Rev. Mod. Phys. 8, 317 - 346 (1936) {{DOI|10.1103/RevModPhys.8.317}}</ref> | |||
==Symmetry concepts== | |||
Mathematical [[group theory]] has been adapted to study of symmetry in molecules. | |||
=== Elements === | |||
The symmetry of a molecule can be described by 5 types of [[symmetry element]]s. | |||
[[File:Vannmolekyl.png|thumb|100px|right|Water molecule is symmetrical]] | |||
* '''Symmetry axis''': an axis around which a [[rotation]] by <math> \tfrac{360^\circ} {n} </math> results in a molecule that appears identical to the molecule before rotation. This is also called an ''n''-fold '''rotational axis''' and is shortened to C<sub>n</sub>. Examples are the C<sub>2</sub> in [[water]] and the C<sub>3</sub> in [[ammonia]]. A molecule can have more than one symmetry axis; the one with the highest ''n'' is called the '''principal axis''', and by convention is given the z-axis in a [[Cartesian coordinate system]]. | |||
* '''Plane of symmetry''': a plane of reflection through which an identical copy of the original molecule is given. This is also called a [[mirror plane]] and abbreviated [[Sigma|σ]]. Water has two of them: one in the plane of the molecule itself and one [[perpendicular]] (at right angles) to it. A symmetry plane [[Parallel (geometry)|parallel]] with the principal axis is dubbed ''vertical'' (σ<sub>v</sub>) and one perpendicular to it ''horizontal'' (σ<sub>h</sub>). A third type of symmetry plane exists: if a vertical symmetry plane additionally bisects the angle between two 2-fold rotation axes perpendicular to the principal axis, the plane is dubbed [[Dihedral angle|dihedral]] (σ<sub>d</sub>). A symmetry plane can also be identified by its Cartesian orientation, ''e.g.'', (xz) or (yz). | |||
[[File:Benz1.png|thumb|100px|left|Benzene]] | |||
* '''Center of symmetry''' or '''inversion center''', shortened to ''i''. A molecule has a center of symmetry when, for any atom in the molecule, an identical atom exists diametrically opposite this center an equal distance from it. There may or may not be an atom at the center. Examples are [[xenon tetrafluoride]] (XeF<sub>4</sub>) where the inversion center is at the Xe atom, and [[benzene]] (C<sub>6</sub>H<sub>6</sub>) where the inversion center is at the center of the ring. | |||
* '''Rotation-reflection axis''': an axis around which a rotation by <math> \tfrac{360^\circ} {n} </math>, followed by a reflection in a plane perpendicular to it, leaves the molecule unchanged. Also called an ''n''-fold '''improper rotation axis''', it is shortened to S<sub>n</sub>, with ''n'' necessarily even. Examples are present in tetrahedral [[silicon tetrafluoride]], with three S<sub>4</sub> axes, and the [[staggered conformation]] of [[ethane]] with one S<sub>6</sub> axis. | |||
* '''Identity''' (also '''E'''), from the German 'Einheit' meaning Unity.<ref>[http://dict.leo.org/ende?lp=ende&lang=de&searchLoc=0&cmpType=relaxed§Hdr=on&spellToler=on&search=einheit&relink=on LEO Ergebnisse für "einheit"<!-- Bot generated title -->]</ref> It is called "Identity" because it is like the number one (unity) in multiplication. (When a number is multiplied by one, the answer is the original number.) This symmetry element means no change. Every molecule has this element. The identity symmetry element helps chemists use mathematical group theory. | |||
=== Operations === | |||
Each of the five symmetry elements has a '''[[symmetry operation]]'''. People use a [[caret]] symbol (^) to talk about the operation rather than the symmetry element. So, Ĉ<sub>n</sub> is the rotation of a molecule around an axis and Ê is the identity operation. A symmetry element can have more than one symmetry operation associated with it. Since C<sub>1</sub> is equivalent to E, S<sub>1</sub> to σ and S<sub>2</sub> to ''i'', all symmetry operations can be classified as either proper or improper rotations. | |||
== Point groups == | |||
A [[point group]] is a set of symmetry operations forming a mathematical ''[[group (mathematics)|group]]'', for which at least one ''point'' remains fixed under all operations of the group. A [[crystallographic point group]] is a point group which will work with translational symmetry in three dimensions. There are a total of 32 crystallographic point groups, 30 of which are relevant to chemistry. Scientists use [[Schoenflies notation]] to classify point groups. | |||
=== Group theory === | |||
Mathematics define a ''[[Group (mathematics)|group]]''. A set of symmetry operations form a group when: | |||
* the result of consecutive application (composition) of any two operations is also a member of the group (closure). | |||
* the application of the operations is [[Associativity|associative]]: A(BC) = (AB)C | |||
* the group contains the [[identity element|identity operation]], denoted E, such that AE = EA = A for any operation A in the group. | |||
* For every operation A in the group, there is an [[inverse element]] A<sup>−1</sup> in the group, for which AA<sup>−1</sup> = A<sup>−1</sup>A = E | |||
The [[Order (group theory)|order of a group]] is the number of symmetry operations for that group. | |||
For example, the point group for the [[water]] molecule is C<sub>2v</sub>, with symmetry operations E, C<sub>2</sub>, σ<sub>v</sub> and σ<sub>v</sub>'. Its order is thus 4. Each operation is its own inverse. As an example of closure, a C<sub>2</sub> rotation followed by a σ<sub>v</sub> reflection is seen to be a σ<sub>v</sub>' symmetry operation: σ<sub>v</sub>*C<sub>2</sub> = σ<sub>v</sub>'. (Note that "Operation A followed by B to form C" is written BA = C). | |||
Another example is the [[ammonia]] molecule, which is pyramidal and contains a three-fold rotation axis as well as three mirror planes at an angle of 120° to each other. Each mirror plane contains an N-H bond and bisects the H-N-H bond angle opposite to that bond. Thus ammonia molecule belongs to the C<sub>3v</sub> point group which has order 6: an identity element E, two rotation operations C<sub>3</sub> and C<sub>3</sub><sup>2</sup>, and three mirror reflections σ<sub>v</sub>, σ<sub>v</sub>' and σ<sub>v</sub>". | |||
===Common point groups=== | |||
The following table contains a [[Point groups in three dimensions|list of point groups]] with representative molecules. The description of structure includes common shapes of molecules based on [[VSEPR theory]]. | |||
{|align="center" class="wikitable" | |||
|'''Point group''' | |||
| '''Symmetry elements''' || '''Simple description''', [[Chirality (chemistry)|chiral]] if applicable || '''Illustrative species''' | |||
|- | |||
|C<sub>1</sub> || E || no symmetry, chiral || CFClBrH, [[lysergic acid]] | |||
|- | |||
|C<sub>s</sub> || E σ<sub>h</sub> || planar, no other symmetry || [[thionyl chloride]], [[hypochlorous acid]] | |||
|- | |||
|C<sub>i</sub> || E ''i'' || Inversion center || [[anti conformation|''anti'']]-1,2-dichloro-1,2-dibromoethane | |||
|- | |||
|C<sub>∞v</sub> || E 2C<sub>∞</sub> σ<sub>v</sub> || linear || [[hydrogen chloride]], [[dicarbon monoxide]] | |||
|- | |||
|D<sub>∞h</sub> || E 2C<sub>∞</sub> ∞σ<sub>i</sub> ''i'' 2S<sub>∞</sub> ∞C<sub>2</sub> || linear with inversion center || [[dihydrogen]], [[azide]] anion, [[carbon dioxide]] | |||
|- | |||
|C<sub>2</sub> || E C<sub>2</sub> || "open book geometry," chiral || [[hydrogen peroxide]] | |||
|- | |||
|C<sub>3</sub> || E C<sub>3</sub> || propeller, chiral || [[triphenylphosphine]] | |||
|- | |||
|C<sub>2h</sub> || E C<sub>2</sub> ''i'' σ<sub>h</sub> || planar with inversion center || [[cis-trans isomerism|trans]]-[[1,2-dichloroethylene]] | |||
|- | |||
|C<sub>3h</sub> || E C<sub>3</sub> C<sub>3</sub><sup>2</sup> σ<sub>h</sub> S<sub>3</sub> S<sub>3</sub><sup>5</sup>|| propeller || [[Boric acid]] | |||
|- | |||
|C<sub>2v</sub> || E C<sub>2</sub> σ<sub>v</sub>(xz) σ<sub>v</sub>'(yz) || angular (H<sub>2</sub>O) or see-saw (SF<sub>4</sub>) || [[water (molecule)|water]], [[sulfur tetrafluoride]], [[sulfuryl fluoride]] | |||
|- | |||
|C<sub>3v</sub> || E 2C<sub>3</sub> 3σ<sub>v</sub> || trigonal pyramidal || [[ammonia]], [[phosphorus oxychloride]] | |||
|- | |||
|C<sub>4v</sub> || E 2C<sub>4</sub> C<sub>2</sub> 2σ<sub>v</sub> 2σ<sub>d</sub> || square pyramidal || [[xenon oxytetrafluoride]] | |||
|- | |||
|D<sub>2</sub> || E C<sub>2</sub>(x) C<sub>2</sub>(y) C<sub>2</sub>(z) || twist, chiral || [[cyclohexane conformation|cyclohexane twist conformation]] | |||
|- | |||
|D<sub>3</sub> || E C<sub>3</sub>(z) 3C<sub>2</sub>|| triple helix, chiral || [[Tris(ethylenediamine)cobalt(III) chloride|Tris(ethylenediamine)cobalt(III) cation]] | |||
|- | |||
|D<sub>2h</sub> || E C<sub>2</sub>(z) C<sub>2</sub>(y) C<sub>2</sub>(x) ''i'' σ(xy) σ(xz) σ(yz)|| planar with inversion center || [[ethylene]], [[dinitrogen tetroxide]], [[diborane]] | |||
|- | |||
|D<sub>3h</sub> || E 2C<sub>3</sub> 3C<sub>2</sub> σ<sub>h</sub> 2S<sub>3</sub> 3σ<sub>v</sub> || trigonal planar or trigonal bipyramidal || [[boron trifluoride]], [[phosphorus pentachloride]] | |||
|- | |||
|D<sub>4h</sub> || E 2C<sub>4</sub> C<sub>2</sub> 2C<sub>2</sub>' 2C<sub>2</sub>'' ''i'' 2S<sub>4</sub> σ<sub>h</sub> 2σ<sub>v</sub> 2σ<sub>d</sub> || square planar || [[xenon tetrafluoride]] | |||
|- | |||
|D<sub>5h</sub> || E 2C<sub>5</sub> 2C<sub>5</sub><sup>2</sup> 5C<sub>2</sub> σ<sub>h</sub> 2S<sub>5</sub> 2S<sub>5</sub><sup>3</sup> 5σ<sub>v</sub> || pentagonal || [[ruthenocene]], [[eclipsed conformation|eclipsed]] [[ferrocene]], C<sub>70</sub> [[fullerene]] | |||
|- | |||
|D<sub>6h</sub> || E 2C<sub>6</sub> 2C<sub>3</sub> C<sub>2</sub> 3C<sub>2</sub>' 3C<sub>2</sub> ''i'' 3S<sub>3</sub> 2S<sub>6</sub><sup>3</sup> σ<sub>h</sub> 3σ<sub>d</sub> 3σ<sub>v</sub> || hexagonal || [[benzene]], [[bis(benzene)chromium]] | |||
|- | |||
|D<sub>2d</sub> || E 2S<sub>4</sub> C<sub>2</sub> 2C<sub>2</sub>' 2σ<sub>d</sub> || 90° twist || [[allene]], [[tetrasulfur tetranitride]] | |||
|- | |||
|D<sub>3d</sub> || E C<sub>3</sub> 3C<sub>2</sub> ''i'' 2S<sub>6</sub> 3σ<sub>d</sub> || 60° twist || [[ethane]] (staggered [[rotamer]]), [[cyclohexane conformation|cyclohexane chair conformation]] | |||
|- | |||
|D<sub>4d</sub> || E 2S<sub>8</sub> 2C<sub>4</sub> 2S<sub>8</sub><sup>3</sup> C<sub>2</sub> 4C<sub>2</sub>' 4σ<sub>d</sub> || 45° twist || [[dimanganese decacarbonyl]] (staggered rotamer) | |||
|- | |||
|D<sub>5d</sub> || E 2C<sub>5</sub> 2C<sub>5</sub><sup>2</sup> 5C<sub>2</sub> ''i'' 3S<sub>10</sub><sup>3</sup> 2S<sub>10</sub> 5σ<sub>d</sub> || 36° twist || [[ferrocene]] (staggered rotamer) | |||
|- | |||
|T<sub>d</sub> || E 8C<sub>3</sub> 3C<sub>2</sub> 6S<sub>4</sub> 6σ<sub>d</sub> || [[tetrahedron|tetrahedral]] || [[methane]], [[phosphorus pentoxide]], [[adamantane]] | |||
|- | |||
|O<sub>h</sub> || E 8C<sub>3</sub> 6C<sub>2</sub> 6C<sub>4</sub> 3C<sub>2</sub> ''i'' 6S<sub>4</sub> 8S<sub>6</sub> 3σ<sub>h</sub> 6σ<sub>d</sub> || [[octahedron|octahedral]] or cubic || [[cubane]], [[sulfur hexafluoride]] | |||
|- | |||
|I<sub>h</sub> || E 12C<sub>5</sub> 12C<sub>5</sub><sup>2</sup> 20C<sub>3</sub> 15C<sub>2</sub> ''i'' 12S<sub>10</sub> 12S<sub>10</sub><sup>3</sup> 20S<sub>6</sub> 15σ || [[icosahedron|icosahedral]] || [[fullerene|C<sub>60</sub>]], [[Caesium dodecaborate|B<sub>12</sub>H<sub>12</sub><sup>2-</sup>]] | |||
|- <!-- | |||
| colspan=4 align=left style="background: #ccccff;" | ''Table 1. Point groups'' | |||
|- --> | |||
|} | |||
=== Representations === | |||
Symmetry operations can be [[group representation|written in many ways]]. A good way to write them is by using [[matrix (mathematics)|matrices]]. For any vector representing a point in [[Cartesian coordinates]], [[Matrix multiplication|left-multiplying]] it gives the new place of the point transformed by the symmetry operation. Composition of operations is done by [[matrix multiplication]]. In the C<sub>2v</sub> example this is: | |||
:<math> | |||
\underbrace{ | |||
\begin{bmatrix} | |||
-1 & 0 & 0 \\ | |||
0 & -1 & 0 \\ | |||
0 & 0 & 1 \\ | |||
\end{bmatrix} | |||
}_{C_{2}} \times | |||
\underbrace{ | |||
\begin{bmatrix} | |||
1 & 0 & 0 \\ | |||
0 & -1 & 0 \\ | |||
0 & 0 & 1 \\ | |||
\end{bmatrix} | |||
}_{\sigma_{v}} = | |||
\underbrace{ | |||
\begin{bmatrix} | |||
-1 & 0 & 0 \\ | |||
0 & 1 & 0 \\ | |||
0 & 0 & 1 \\ | |||
\end{bmatrix} | |||
}_{\sigma'_{v}} | |||
</math> | </math> | ||
Although an infinite (going on forever) number of such representations (ways of showing things) exist, the [[irreducible representation]]s (or "irreps") of the group are commonly used, as all other representations of the group can be described as a [[linear combination]] of the irreducible representations. (The irreps span the [[vector space]] of the symmetry operations.) Chemists use the irreps to sort the symmetry groups and to talk about their properties. | |||
== Character tables == | |||
For each point group, a '''character table''' summarizes information on its symmetry operations and on its irreducible representations. The tables are square because there are always equal numbers of irreducible representations and groups of symmetry operations. | |||
The table itself is made of '''characters''' which show how a particular irreducible representation changes when a particular symmetry operation is applied (put to it). Any symmetry operation in a molecule's point group acting on the molecule itself will leave it unchanged. But for acting on a general entity (thing), such as a [[Vector (geometric)|vector]] or an [[Atomic orbital|orbital]], this does not have to be what happens. The vector could change sign or direction, and the orbital could change type. For simple point groups, the values are either 1 or -1: 1 means that the sign or phase (of the vector or orbital) is unchanged by the symmetry operation (''symmetric'') and -1 denotes a sign change (''asymmetric''). | |||
The representations are labeled according to a set of conventions: | |||
* A, when rotation around the principal axis is symmetrical | |||
* B, when rotation around the principal axis is asymmetrical | |||
* E and T are doubly and triply [[Degeneracy (mathematics)|degenerate]] representations, respectively | |||
* when the point group has an inversion center, the subscript g ({{lang-de|gerade}} or even) signals no change in sign, and the subscript u (''ungerade'' or uneven) a change in sign, with respect to inversion. | |||
* with point groups C<sub>∞v</sub> and D<sub>∞h</sub> the symbols are borrowed from [[angular momentum]] description: [[sigma|Σ]], [[Pi (letter)|Π]], [[Delta (letter)|Δ]]. | |||
</ | |||
The tables also tell the Cartesian [[basis vector]]s, [[rotation]]s about them, and [[quadratic function]]s of them transformed by the symmetry operations of the group. The table also shows which irreducible representation transforms in the same way (on the right hand side of the tables). Chemists use this because chemically important orbitals (in particular ''p'' and ''d'' orbitals) have the same symmetries as these entities. | |||
The character table for the C<sub>2v</sub> symmetry point group is given below: | |||
= | {| class="wikitable" | ||
! C<sub>2v</sub> || E || C<sub>2</sub> || σ<sub>v</sub>(xz) || σ<sub>v</sub>'(yz) || || | |||
|- | |||
| A<sub>1</sub> || 1 || 1 || 1 || 1 || ''z'' | |||
| ''x''<sup>2</sup>, ''y''<sup>2</sup>, ''z''<sup>2</sup> | |||
|- | |||
| A<sub>2</sub> || 1 || 1 || -1 || -1 || R<sub>z</sub> || ''xy'' | |||
|- | |||
| B<sub>1</sub> || 1 || -1 || 1 || -1 || ''x'', R<sub>y</sub> || ''xz'' | |||
|- | |||
| B<sub>2</sub> || 1 || -1 || -1 || 1 || ''y'', R<sub>x</sub> || ''yz'' | |||
|} | |||
For example, water (H<sub>2</sub>O) which has the C<sub>2v</sub> symmetry described above. The 2''p''<sub>x</sub> [[atomic orbital|orbital]] of oxygen is oriented perpendicular to the plane of the molecule and switches sign with a C<sub>2</sub> and a σ<sub>v</sub>'(yz) operation, but remains unchanged with the other two operations (obviously, the character for the identity operation is always +1). This orbital's character set is thus {1, -1, 1, -1}, corresponding to the B<sub>1</sub> irreducible representation. Similarly, the 2''p''<sub>z</sub> orbital is seen to have the symmetry of the A<sub>1</sub> irreducible representation, 2''p''<sub>y</sub> B<sub>2</sub>, and the 3''d''<sub>xy</sub> orbital A<sub>2</sub>. These assignments and others are in the rightmost two columns of the table. | |||
== References == | ==References== | ||
{{reflist}} | {{reflist}} | ||
[[Category: | ==Other websites== | ||
[[Category: | * [http://www.phys.ncl.ac.uk/staff/njpg/symmetry/ Molecular symmetry at the University of Exeter]{{dead link|date=January 2012}} | ||
* [http://www.ch.ic.ac.uk/local/symmetry/ Molecular symmetry at Imperial College London] | |||
* [http://www.webqc.org/symmetry.php Molecular Point Group Symmetry Tables] | |||
* [http://symmetry.otterbein.edu/ Molecular symmetry at Otterbein University] | |||
*[http://newton.ex.ac.uk/research/qsystems/people/goss/symmetry/Solids.html Pictorial overview of the 32 groups] | |||
[[Category:Symmetry]] | |||
[[Category:Theoretical chemistry]] | |||
Latest revision as of 21:36, 4 November 2015
Molecular symmetry is a basic idea in chemistry. It is about the symmetry of molecules. It puts molecules into groups according to their symmetry. It can predict or explain many of a molecule's chemical properties.[1][2][3][4][5]
Chemists study symmetry to explain how crystals are made up and how chemicals react. The molecular symmetry of the reactants help predict how the product of the reaction is made up and the energy needed for the reaction.
Molecular symmetry can be studied several different ways. Group theory is the most popular idea. Group theory is also useful in studying the symmetry of molecular orbitals. This is used in the Hückel method, ligand field theory, and the Woodward–Hoffmann rules. Another idea on a larger scale is the use of crystal systems to describe crystallographic symmetry in bulk materials.
Scientists find molecular symmetry by using X-ray crystallography and other forms of spectroscopy. Spectroscopic notation is based on facts taken from molecular symmetry.
Historical background
Physicist Hans Bethe used characters of point group operations in his study of ligand field theory in 1929. Eugene Wigner used group theory to explain the selection rules of atomic spectroscopy.[6] The first character tables were compiled by László Tisza (1933), in connection to vibrational spectra. Robert Mulliken was the first to publish character tables in English (1933). E. Bright Wilson used them in 1934 to predict the symmetry of vibrational normal modes.[7] The complete set of 32 crystallographic point groups was published in 1936 by Rosenthal and Murphy.[8]
Symmetry concepts
Mathematical group theory has been adapted to study of symmetry in molecules.
Elements
The symmetry of a molecule can be described by 5 types of symmetry elements.
- Symmetry axis: an axis around which a rotation by [math]\displaystyle{ \tfrac{360^\circ} {n} }[/math] results in a molecule that appears identical to the molecule before rotation. This is also called an n-fold rotational axis and is shortened to Cn. Examples are the C2 in water and the C3 in ammonia. A molecule can have more than one symmetry axis; the one with the highest n is called the principal axis, and by convention is given the z-axis in a Cartesian coordinate system.
- Plane of symmetry: a plane of reflection through which an identical copy of the original molecule is given. This is also called a mirror plane and abbreviated σ. Water has two of them: one in the plane of the molecule itself and one perpendicular (at right angles) to it. A symmetry plane parallel with the principal axis is dubbed vertical (σv) and one perpendicular to it horizontal (σh). A third type of symmetry plane exists: if a vertical symmetry plane additionally bisects the angle between two 2-fold rotation axes perpendicular to the principal axis, the plane is dubbed dihedral (σd). A symmetry plane can also be identified by its Cartesian orientation, e.g., (xz) or (yz).
- Center of symmetry or inversion center, shortened to i. A molecule has a center of symmetry when, for any atom in the molecule, an identical atom exists diametrically opposite this center an equal distance from it. There may or may not be an atom at the center. Examples are xenon tetrafluoride (XeF4) where the inversion center is at the Xe atom, and benzene (C6H6) where the inversion center is at the center of the ring.
- Rotation-reflection axis: an axis around which a rotation by [math]\displaystyle{ \tfrac{360^\circ} {n} }[/math], followed by a reflection in a plane perpendicular to it, leaves the molecule unchanged. Also called an n-fold improper rotation axis, it is shortened to Sn, with n necessarily even. Examples are present in tetrahedral silicon tetrafluoride, with three S4 axes, and the staggered conformation of ethane with one S6 axis.
- Identity (also E), from the German 'Einheit' meaning Unity.[9] It is called "Identity" because it is like the number one (unity) in multiplication. (When a number is multiplied by one, the answer is the original number.) This symmetry element means no change. Every molecule has this element. The identity symmetry element helps chemists use mathematical group theory.
Operations
Each of the five symmetry elements has a symmetry operation. People use a caret symbol (^) to talk about the operation rather than the symmetry element. So, Ĉn is the rotation of a molecule around an axis and Ê is the identity operation. A symmetry element can have more than one symmetry operation associated with it. Since C1 is equivalent to E, S1 to σ and S2 to i, all symmetry operations can be classified as either proper or improper rotations.
Point groups
A point group is a set of symmetry operations forming a mathematical group, for which at least one point remains fixed under all operations of the group. A crystallographic point group is a point group which will work with translational symmetry in three dimensions. There are a total of 32 crystallographic point groups, 30 of which are relevant to chemistry. Scientists use Schoenflies notation to classify point groups.
Group theory
Mathematics define a group. A set of symmetry operations form a group when:
- the result of consecutive application (composition) of any two operations is also a member of the group (closure).
- the application of the operations is associative: A(BC) = (AB)C
- the group contains the identity operation, denoted E, such that AE = EA = A for any operation A in the group.
- For every operation A in the group, there is an inverse element A−1 in the group, for which AA−1 = A−1A = E
The order of a group is the number of symmetry operations for that group.
For example, the point group for the water molecule is C2v, with symmetry operations E, C2, σv and σv'. Its order is thus 4. Each operation is its own inverse. As an example of closure, a C2 rotation followed by a σv reflection is seen to be a σv' symmetry operation: σv*C2 = σv'. (Note that "Operation A followed by B to form C" is written BA = C).
Another example is the ammonia molecule, which is pyramidal and contains a three-fold rotation axis as well as three mirror planes at an angle of 120° to each other. Each mirror plane contains an N-H bond and bisects the H-N-H bond angle opposite to that bond. Thus ammonia molecule belongs to the C3v point group which has order 6: an identity element E, two rotation operations C3 and C32, and three mirror reflections σv, σv' and σv".
Common point groups
The following table contains a list of point groups with representative molecules. The description of structure includes common shapes of molecules based on VSEPR theory.
| Point group | Symmetry elements | Simple description, chiral if applicable | Illustrative species |
| C1 | E | no symmetry, chiral | CFClBrH, lysergic acid |
| Cs | E σh | planar, no other symmetry | thionyl chloride, hypochlorous acid |
| Ci | E i | Inversion center | anti-1,2-dichloro-1,2-dibromoethane |
| C∞v | E 2C∞ σv | linear | hydrogen chloride, dicarbon monoxide |
| D∞h | E 2C∞ ∞σi i 2S∞ ∞C2 | linear with inversion center | dihydrogen, azide anion, carbon dioxide |
| C2 | E C2 | "open book geometry," chiral | hydrogen peroxide |
| C3 | E C3 | propeller, chiral | triphenylphosphine |
| C2h | E C2 i σh | planar with inversion center | trans-1,2-dichloroethylene |
| C3h | E C3 C32 σh S3 S35 | propeller | Boric acid |
| C2v | E C2 σv(xz) σv'(yz) | angular (H2O) or see-saw (SF4) | water, sulfur tetrafluoride, sulfuryl fluoride |
| C3v | E 2C3 3σv | trigonal pyramidal | ammonia, phosphorus oxychloride |
| C4v | E 2C4 C2 2σv 2σd | square pyramidal | xenon oxytetrafluoride |
| D2 | E C2(x) C2(y) C2(z) | twist, chiral | cyclohexane twist conformation |
| D3 | E C3(z) 3C2 | triple helix, chiral | Tris(ethylenediamine)cobalt(III) cation |
| D2h | E C2(z) C2(y) C2(x) i σ(xy) σ(xz) σ(yz) | planar with inversion center | ethylene, dinitrogen tetroxide, diborane |
| D3h | E 2C3 3C2 σh 2S3 3σv | trigonal planar or trigonal bipyramidal | boron trifluoride, phosphorus pentachloride |
| D4h | E 2C4 C2 2C2' 2C2 i 2S4 σh 2σv 2σd | square planar | xenon tetrafluoride |
| D5h | E 2C5 2C52 5C2 σh 2S5 2S53 5σv | pentagonal | ruthenocene, eclipsed ferrocene, C70 fullerene |
| D6h | E 2C6 2C3 C2 3C2' 3C2 i 3S3 2S63 σh 3σd 3σv | hexagonal | benzene, bis(benzene)chromium |
| D2d | E 2S4 C2 2C2' 2σd | 90° twist | allene, tetrasulfur tetranitride |
| D3d | E C3 3C2 i 2S6 3σd | 60° twist | ethane (staggered rotamer), cyclohexane chair conformation |
| D4d | E 2S8 2C4 2S83 C2 4C2' 4σd | 45° twist | dimanganese decacarbonyl (staggered rotamer) |
| D5d | E 2C5 2C52 5C2 i 3S103 2S10 5σd | 36° twist | ferrocene (staggered rotamer) |
| Td | E 8C3 3C2 6S4 6σd | tetrahedral | methane, phosphorus pentoxide, adamantane |
| Oh | E 8C3 6C2 6C4 3C2 i 6S4 8S6 3σh 6σd | octahedral or cubic | cubane, sulfur hexafluoride |
| Ih | E 12C5 12C52 20C3 15C2 i 12S10 12S103 20S6 15σ | icosahedral | C60, B12H122- |
Representations
Symmetry operations can be written in many ways. A good way to write them is by using matrices. For any vector representing a point in Cartesian coordinates, left-multiplying it gives the new place of the point transformed by the symmetry operation. Composition of operations is done by matrix multiplication. In the C2v example this is:
- [math]\displaystyle{ \underbrace{ \begin{bmatrix} -1 & 0 & 0 \\ 0 & -1 & 0 \\ 0 & 0 & 1 \\ \end{bmatrix} }_{C_{2}} \times \underbrace{ \begin{bmatrix} 1 & 0 & 0 \\ 0 & -1 & 0 \\ 0 & 0 & 1 \\ \end{bmatrix} }_{\sigma_{v}} = \underbrace{ \begin{bmatrix} -1 & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & 1 \\ \end{bmatrix} }_{\sigma'_{v}} }[/math]
Although an infinite (going on forever) number of such representations (ways of showing things) exist, the irreducible representations (or "irreps") of the group are commonly used, as all other representations of the group can be described as a linear combination of the irreducible representations. (The irreps span the vector space of the symmetry operations.) Chemists use the irreps to sort the symmetry groups and to talk about their properties.
Character tables
For each point group, a character table summarizes information on its symmetry operations and on its irreducible representations. The tables are square because there are always equal numbers of irreducible representations and groups of symmetry operations.
The table itself is made of characters which show how a particular irreducible representation changes when a particular symmetry operation is applied (put to it). Any symmetry operation in a molecule's point group acting on the molecule itself will leave it unchanged. But for acting on a general entity (thing), such as a vector or an orbital, this does not have to be what happens. The vector could change sign or direction, and the orbital could change type. For simple point groups, the values are either 1 or -1: 1 means that the sign or phase (of the vector or orbital) is unchanged by the symmetry operation (symmetric) and -1 denotes a sign change (asymmetric).
The representations are labeled according to a set of conventions:
- A, when rotation around the principal axis is symmetrical
- B, when rotation around the principal axis is asymmetrical
- E and T are doubly and triply degenerate representations, respectively
- when the point group has an inversion center, the subscript g (Template:Lang-de or even) signals no change in sign, and the subscript u (ungerade or uneven) a change in sign, with respect to inversion.
- with point groups C∞v and D∞h the symbols are borrowed from angular momentum description: Σ, Π, Δ.
The tables also tell the Cartesian basis vectors, rotations about them, and quadratic functions of them transformed by the symmetry operations of the group. The table also shows which irreducible representation transforms in the same way (on the right hand side of the tables). Chemists use this because chemically important orbitals (in particular p and d orbitals) have the same symmetries as these entities.
The character table for the C2v symmetry point group is given below:
| C2v | E | C2 | σv(xz) | σv'(yz) | ||
|---|---|---|---|---|---|---|
| A1 | 1 | 1 | 1 | 1 | z | x2, y2, z2 |
| A2 | 1 | 1 | -1 | -1 | Rz | xy |
| B1 | 1 | -1 | 1 | -1 | x, Ry | xz |
| B2 | 1 | -1 | -1 | 1 | y, Rx | yz |
For example, water (H2O) which has the C2v symmetry described above. The 2px orbital of oxygen is oriented perpendicular to the plane of the molecule and switches sign with a C2 and a σv'(yz) operation, but remains unchanged with the other two operations (obviously, the character for the identity operation is always +1). This orbital's character set is thus {1, -1, 1, -1}, corresponding to the B1 irreducible representation. Similarly, the 2pz orbital is seen to have the symmetry of the A1 irreducible representation, 2py B2, and the 3dxy orbital A2. These assignments and others are in the rightmost two columns of the table.
References
Other websites
- Molecular symmetry at the University of ExeterTemplate:Dead link
- Molecular symmetry at Imperial College London
- Molecular Point Group Symmetry Tables
- Molecular symmetry at Otterbein University
- Pictorial overview of the 32 groups
- ↑ Quantum Chemistry, Third Edition John P. Lowe, Kirk Peterson ISBN 012457551X
- ↑ Physical Chemistry: A Molecular Approach by Donald A. McQuarrie, John D. Simon ISBN 0935702997
- ↑ The chemical bond 2nd Ed. J.N. Murrell, S.F.A. Kettle, J.M. Tedder ISBN 047190760X
- ↑ Physical Chemistry P. W. Atkins ISBN 0716728710
- ↑ G. L. Miessler and D. A. Tarr “Inorganic Chemistry” 3rd Ed, Pearson/Prentice Hall publisher, ISBN 0-13-035471-6.
- ↑ Group Theory and its application to the quantum mechanics of atomic spectra, E. P. Wigner, Academic Press Inc. (1959)
- ↑ Correcting Two Long-Standing Errors in Point Group Symmetry Character Tables Randall B. Shirts J. Chem. Educ. 2007, 84, 1882. Abstract
- ↑ Group Theory and the Vibrations of Polyatomic Molecules Jenny E. Rosenthal and G. M. Murphy Rev. Mod. Phys. 8, 317 - 346 (1936) Template:DOI
- ↑ LEO Ergebnisse für "einheit"