QUANTUM THEORY
55
/
Hence by (40-61)
q 2 c 2 b 2
.(40-63),
q x 8ttv 12 2 8p
where 1 /b 21 is interpreted simply as the average duration of state 2 before
a spontaneous relapse occurs, and 8p is the width of the spectral line
emitted by such relapses*.
The number of atoms in a gram is 1 / Ah , where A is the atomic weight
and h the mass of a hydrogen atom. Hence the mass absorption coefficient
k, or absorption coefficient per gm. per sq. cm. is
k
a
ATh
<h
.(40-64).
q x 8 ttv 12 2 AnS p
The coefficients in (40-63) and (40-64) refer to the absorption of mono
chromatic radiation of frequency p 12 by material composed wholly of
atoms in state 1 . Also if the atom has more than one electron which by
excitation can absorb frequency p 12 , the coefficients become multiplied by
the corresponding factor.
Planck’s Law (37-9) can now be given fully as
( v> ¿T-^hv/RT T (40-7).
By Stefan’s Law
aT 4 = I" I (p, T) dp
877 -h /ETA f 00 x 3 dx
(x — JipjRT).
.(40-8).
h J J 0 e x - 1
The integral is equal to 7 t 4 /15, so that
87 r 5 R i
a 15 c z h 3
Some of the chief properties of Planck’s Law may be stated here for
reference. The mean frequency of the radiation is given by
3 x^dx f 00 x z dx
0 e x ^ 1 ~ Jo 1
= 24 (l - 5 + 2 - 5 + 3 - 5 + ...) -r 6 (l - 4 + 2 - 4 + 3 - 4 + ...)
= 3-8322,
so that hv = 3-83 RT (40-91).
The number of quanta per cubic centimetre is
'RT z x 2 dx
he ) 1 0 e® — 1 *
x =
877
* More precisely a is the average absorption coefficient over any width 8p
sufficient to cover the absorption line, so that a8p gives the whole absorption of the
line. If we were to take 8p to cover only part of the absorption line the coefficient
b 21 would refer to a fraction only of the emissions and would not then be equal to
the reciprocal of the duration of the excited state.
