Physical Chemistry Third Edition

(C. Jardin) #1

646 14 Classical Mechanics and the Old Quantum Theory


The Wave–Particle Duality of Light


Since light exhibits a particle-like nature in some experiments and wave-like properties
in other experiments, we say that it exhibits awave–particle duality. We cannot give
a simple answer to the question: “What is light really like?” We use the wave descrip-
tion when it explains a particular experiment, and use the particle description when it
explains another experiment.

EXAMPLE14.4

The work function of nickel equals 5.0 eV. Find (a) the threshold wavelength for nickel and
(b) the maximum electron speed for a wavelength of 195 nm.
Solution
a. Whνthreshold hc
λthreshold

λthreshold
hc
W


(6. 6261 × 10 −^34 J s)(2. 9979 × 108 ms−^1 )
(5.0eV)(1. 6022 × 10 −^19 JeV−^1 )

 2. 5 × 10 −^7 m250 nm

b.^1
2

mv^2 max
hc
λ


hc
λthreshold


hc
λ

−W


(6. 6261 × 10 −^34 J s)(2. 9979 × 108 ms−^1 )
1. 95 × 10 −^7 m

−(5.0eV)(1. 6022 × 10 −^19 JeV−^1 )

 2. 18 × 10 −^19 J

v^2 max

(
2(2. 18 × 10 −^19 J)
9. 11 × 10 −^31 kg

)
 4. 78 × 1011 m^2 s−^2

vmax


4. 78 × 1011 m^2 s−^2  6. 91 × 105 ms−^1

Bohr’s Theory of the Hydrogen Atom


Excited hydrogen atoms emit light when excited by an electric spark. However, only
certain wavelengths are emitted. Four wavelengths are present in the visible region
and other wavelengths occur in the ultraviolet and in the infrared. When viewed in a
spectroscope, each wavelength produces an image of the slit of the instrument. These
images resemble line segments and are calledspectral lines. The set of separated lines
is called aline spectrum. Rydberg was able to represent the wavelengths of all of the
spectral lines of hydrogen atoms with a single empirical formula:

1

λ

RH

(

1

n^22


1

n^21

)

(14.4-10)
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