Concise Physical Chemistry

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c18 JWBS043-Rogers September 13, 2010 11:29 Printer Name: Yet to Come


288 EXPERIMENTAL DETERMINATION OF MOLECULAR STRUCTURE

z 0

FIGURE 18.1 A classical harmonic oscillator. The equilibrium position on the vertical axis
isz 0.

called theforce constant, andzis a function of timez(t). The sign is negative because
the force is a restoring force acting in opposition to the excursion of the mass away
fromz 0.
By Newton’s second law,f=mawhereais the acceleration,d^2 z(t)/dt^2. These
two expressions for the force can be set equal to one another:

m

d^2 z(t)
dt^2

=−kfz(t)

d^2 z(t)
dt^2

=−


kf
m

z(t)

This is a wave equation of the kind described in Section 16.2:

d^2 φ(x)
dx^2

=−


4 π^2
λ^2

φ(x)

In the analogous harmonic oscillator case, we have

d^2 z(t)
dt^2

=−


4 π^2
λ^2

z(t)

Comparing the two expressions for acceleration,

kf
m

=


4 π^2
λ^2

leads to

1
λ

=


1


2 π


kf
m

The speed of propagation of electromagnetic radiation isc= 2. 998 × 108 ms−^1 ,
which is the number of waves per second (frequencyν) times the distance covered
by each wave (wavelengthλ)c=νλ. When electromagnetic radiation of many fre-
quencies falls upon an idealquantumharmonic oscillator, most of it bounces off but a
selected frequency is absorbed, the one that promotes the oscillator from one quantum
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