c18 JWBS043-Rogers September 13, 2010 11:29 Printer Name: Yet to Come
292 EXPERIMENTAL DETERMINATION OF MOLECULAR STRUCTURE
expected transitions are conspicuously absent from experimental spectra owing to
selection rules which do not permit them. Despite these deviations from the simple
models described here, much invaluable bond distance information has been ob-
tained from microwave rotational spectra. For example, CO has a rotational spacing
of ̄ν= 3 .9cm−^1 (in the far-infrared region), which leads to a bond length of 113 pm.
By the way, your microwave oven activates a rocking frequency in H 2 O molecules,
thereby transmitting energy (heat) to your morning coffee.
18.5 MICROWAVE SPECTROSCOPY: BOND STRENGTH
AND BOND LENGTH
Given the input experimental data of the fundamental vibrational frequencyν 0 and the
line separation 2
(
h ̄^2
2 I
)
usually written 2B, in a vibration–rotation band of a diatomic
molecule, the bond strength in terms of the Hooke’s law force constantkfand the
bond length in picometers (pm) can be calculated.
18.6 ELECTRONIC SPECTRA
Electronic transitions require more energy than vibrational or rotational transitions.
They produce spectral peaks that frequently fall in the UV or visible part of the
electromagnetic spectrum. Theπ→π∗transition in ethene is an electronic transition
from the highest occupied molecular orbital (HOMO) to the lowest unoccupied
molecular orbital (LUMO). A simple model of electronic transition spectroscopy of
this kind is that of afree electrontrapped in a one-dimensional potential well, which
is the length of theπsystem in unsaturated molecules. An MM calculation (Chapter
19) of the distances between the terminal carbon atoms in ethene and 1,3-butadiene
gives the values 134 and 359 nm. The two electrons in ethene are in the lowest energy
level withE=h^2 / 8 mel^2 .Intheπ→π∗transition, one of them progresses to the
next higher energy state withE∗= 4 h^2 / 8 mel^2. The energy difference is
E=
3 h^2
8 mel^2
=
3 h^2
8 me( 134 )^2
= 5. 56 × 10 −^5
(
3 h^2
8 me
)
The 1,3-butadiene case has 4 electrons in twoπbonds (Fig. 18.4); hence the lowest
two levels are occupied and the transition is from then=2tothen=3orn^2 = 4
to then^2 =9level:
E=
(
9 h^2
8 mel^2
−
4 h^2
8 mel^2
)
=
5 h^2
8 mel^2
=
5 h^2
8 me( 359 )^2
= 3. 88 × 10 −^5
(
3 h^2
8 me
)
Even though the quantum number change in the second case is larger (5 vs. 3), the
transition for 1,3-butadiene is the smaller of the two energy differences because of