14.4 The Old Quantum Theory 643
In 1900 Max Planck devised a new theory of black-body radiation that agreed with
experimental results. This theory is the first part of what we call the “old quantum
theory.” The following statements are a simplified version of the assumptions that led
to his result:^3Max Planck, 1858–1947, received the
Nobel Prize in physics in 1918 for this
theory, although at first most physicists
were reluctant to believe that it was
correct.
- The walls of the box contain oscillating electric charges. Each oscillator has a char-
acteristic fixed frequency of oscillation, but many oscillators are present and many
frequencies are represented. - The standing waves in the box are equilibrated with the oscillators so that the average
energy of standing waves of a given frequency equals the average energy of the wall
oscillators of the same frequency. - The energy of an oscillator isquantized. That is, it is capable of assuming only one
of the values from the set:
E0,hν,2hν,3hν,4hν,...,nhν,... (14.4-3)whereνis the frequency of the oscillator and wherehis a new constant, now known
asPlanck’s constant. The quantityn, which can take on any non-negative integral
value, is called aquantum number. Figure 14.11 schematically shows this energy
quantization. Quantization has been compared to standing on a ladder. A person can
stand on any rung of a ladder, but nowhere between the rungs. The energy can take
on any of the values in Eq. (14.4-3), but cannot take on any value between these
values.6420Energy / (hν)Figure 14.11 The Quantized Ener-
gies of an Oscillator as Postulated
by Planck.The horizontal line segments
are plotted at the heights of the assumed
energy values, 0,hν,3hν,4hν,5hν,6hν,
7 hν, etc.- The probability of a state of energyEis given by theBoltzmann probability distri-
bution:
(probability of a state of energyE)∝e−E/kBT (14.4-4)where the symbol∝stands for “is proportional to,” whereTis the absolute temper-
ature, and wherekBis Boltzmann’s constant. We discuss the Boltzmann probability
distribution in Parts 2 and 4 of this textbook, but simply state it as an assumption of
Planck at this point.Planck’s theory removed the ultraviolet catastrophe because short wavelengths cor-
respond to large frequencies and large energy spacings. The excited states therefore
have very small populations. The result of Planck’s theory is thatη(λ)dλ2 πhc^2
λ^5 (ehc/λkBT−1)dλ (14.4-5)Planck was able to achieve agreement with experimental data by choosing a value of
happroximately equal to the presently accepted value, 6.62608× 10 −^34 J s. Planck’s
formula agrees with the Stefan–Boltzmann law and withWien’s law, which states that
the wavelength at the maximum in the spectral radiant emittance curve is inversely
proportional to the absolute temperature.(^3) M. Jammer,The Conceptual Development of Quantum Mechanics, McGraw-Hill, New York, 1966,
p. 10ff.