834 20 The Electronic States of Diatomic Molecules
this calculation, but the result is that the variation energy is minimized whencAcB.
An approximation to the first excited state wave functionψ 2 σ∗uis obtained when the
energy has its maximum value, and this corresponds tocA−cB.^3 Another procedure
is to choose values ofcAandcBso that the approximate orbital is an eigenfunction
of the same symmetry operators as the exact orbitals. The exact Born–Oppenheimer
orbitalψ 1 σgis an eigenfunction of the inversion operator with eigenvalue+1. In order
to obtain an LCAOMO with this eigenvalue, we must choose
cAcB (20.2-4)
In order to obtain a molecular orbital with the same symmetry properties as the exact
Born–Oppenheimer orbitalψ 2 σ∗u, we must choose
cA−cB (20.2-5)
We introduce the symbols for our two LCAOMOs:
ψσg 1 scg(ψ 1 sA+ψ 1 sB) (20.2-6)
ψσ∗u 1 scu(ψ 1 sA−ψ 1 sB) (20.2-7)
These LCAOMOs are eigenfunctions of all of the symmetry operators that belong to
the H+ 2 molecule.
Exercise 20.5
a.Argue thatψσg 1 shas an eigenvalue of+1 for thêσhoperator and for thêC 2 aoperator, where
̂C 2 ais a rotation operator whose symmetry element lies anywhere in thexyplane.
b.Argue thatψσ∗u 1 shas an eigenvalue of−1 for thêσhoperator and for thêC 2 aoperator.
Figure 20.7 schematically shows the orbital regions for theσg 1 sLCAOMO and
theσ∗u 1 sLCAOMO, as well as the orbital regions for the 1satomic orbitals. The
intersection of the two atomic orbital regions is called theoverlap region. For the
σg 1 sorbital the two atomic orbitals combine with the same sign in the overlap region,
producing a molecular orbital region with no nodal surface between the nuclei. For
theσ∗u 1 sorbital the atomic orbitals combine with opposite signs in the overlap region,
canceling to produce a nodal surface between the nuclei. The orbital regions of the
LCAOMOs have the same general features as the “exact” Born–Oppenheimer orbitals
whose orbital regions were depicted in Figure 20.4.
Figure 20.8 shows the electronic energy for each of these LCAOMOs for H+ 2 along
with the exact Born–Oppenheimer energies. As we expect from the variational theorem,
the approximate energies lie above the exact energies for all values ofr. The value ofDe
for theσg 1 sorbital is equal to 1.76 eV atre132 pm 1. 32 × 10 −^10 m 1 .32 Å.
LCAOMOs can be constructed that are linear combinations of more than two atomic
orbitals. For example, to representψ 1 σgandψ 2 σ∗uwe could have written a linear
combination of six atomic orbitals:
ψc 1 sAψ 1 sA+c 1 sBψ 1 sB+c 2 sAψ 2 sA+c 2 sBψ 2 sB+c 2 pzAψ 2 pzA+c 2 pzBψ 2 pzB
(20.2-8)
(^3) J. C. Davis, Jr.,Advanced Physical Chemistry, The Ronald Press, New York, 1965, p. 404.