dr. said m. el-kurdi1 chapter 4 an introduction to molecular symmetry
TRANSCRIPT
Dr. Said M. El-Kurdi 1
Chapter 4
An introduction to molecular symmetry
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Understanding of symmetry is essential in discussions of molecular spectroscopy and calculations of molecular properties.
4.1 Introduction
consider the structures of BF3, and BF2H, both of which are planar
BF bond distancesare all identical (131 pm)
trigonal planar
the BH bond is shorter (119 pm) than the BF bonds (131 pm).
pseudo-trigonal planar
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the molecular symmetry properties are not the same
In this chapter, we introduce the fundamental language of group theory (symmetry operator, symmetry element, point group and character table).
Group theory is the mathematical treatment of symmetry.Group theory is the mathematical treatment of symmetry.
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4.2 Symmetry operations and symmetry elements
A symmetry operation is an operation performed on an object which leaves it in a configuration that is indistinguishable from, and superimposable on, the original configuration.
A symmetry operation is an operation performed on an object which leaves it in a configuration that is indistinguishable from, and superimposable on, the original configuration.
The rotations are performed about an axis perpendicular to the plane of the paper and passing through the boron atom; the axis is an example of a symmetry element.
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A symmetry operation is carried out with respect to points, lines or planes, the latter being the symmetry elements.
A symmetry operation is carried out with respect to points, lines or planes, the latter being the symmetry elements.
Rotation about an n-fold axis of symmetry
The symmetry operation of rotation about an n-fold axis(the symmetry element) is denoted by the symbol Cn, inwhich the angle of rotation is:
n is an integer, e.g. 2, 3 or 4.
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Applying this notation to the BF3 molecule
BF3 molecule contains a C3 rotation axis
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If a molecule possesses more than one type of n-axis, the axis of highest value of n is called the principal axis; it is the axis of highest molecular symmetry. For example, in BF3, the C3 axis is the principal axis.
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Reflection through a plane of symmetry(mirror plane)
If reflection of all parts of a molecule through a plane produces an indistinguishable configuration, the plane is a plane of symmetry
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the symmetry operation is one of reflection and the symmetry element is the mirror plane (denoted by )
If the plane lies perpendicular to the vertical principal axis, it is denoted by the symbol h.
If the plane contains the principal axis, it is labeled v.
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Consider the H2O molecule
A special type of plane which contains the principal rotation axis, but which bisects the angle between two adjacent 2-fold axes, is labeled d
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A square planar molecule: XeF4
One C2 axis coincides with the principal (C4) axis; the molecule lies in a h plane which contains two C2’ and two C2’’ axes.
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Each of the two v planes contains the C4 axis and one C2’ axis.
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Each of the two d planes contains the C4 axis and one C2’’ axis.
In the notation for planes of symmetry, , the subscripts h, v and d stand for horizontal, vertical and dihedral respectively.In the notation for planes of symmetry, , the subscripts h, v and d stand for horizontal, vertical and dihedral respectively.
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Reflection through a centre of symmetry (inversion centre)
If reflection of all parts of a molecule through the centre of the molecule produces an indistinguishable configuration, the centre is a centre of symmetry, also called a centre of inversion; it is designated by the symbol i.
CO2
SF6benzene
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H2Scis-N2F2 SiH4
Rotation about an axis, followed by reflection through a plane perpendicular to this axis
If rotation through about an axis, followed by reflection through a
plane perpendicular to that axis, yields an indistinguishable configuration,
the axis is an n-fold rotation–reflection axis, also called an n-fold
improper rotation axis. It is denoted by the symbol Sn.
No i
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Identity operator
All objects can be operated upon by the identity operator E.
The operator E leaves the molecule unchanged.
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4.3 Successive operations
For NH3
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For example, in planar BCl3, the S3 improper axis of rotation corresponds to rotation about the C3 axis followed by reflection through the h plane.
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Summary Table of Symmetry Elements and Operations
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4.4 Point groups
The number and nature of the symmetry elements of a given molecule are conveniently denoted by its point group
C1 point group
C1 = E
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Cv point group
-fold axis of rotation; that possessed by a linear molecule
It must also possess an infinite number of v planes but no h plane or inversion centre.
These criteria are met by Asymmetrical diatomics such as HF, CO and [CN], and linear polyatomics that do not possess a centre of symmetry, e.g. OCS and HCN.
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Dh point group
Symmetrical diatomics (e.g. H2, [O2]2) and linear polyatomics that contain a centre of symmetry
(e.g. [N3],CO2, HCCH) possess a h plane in addition to a C axis and an infinite number of v planes
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Td, Oh or Ih point groups
Molecular species that belong to the Td, Oh or Ih point groups possess many symmetry elements
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Determining the point group of a moleculeor molecular ion
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Determine the point group of trans-N2F2.
Apply the strategy shown in Figure 4.10:
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Determine the point group of PF5.
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