116 2 Quantum Mechanics – I
Term SPDF
l 0123
Parity=(−1)l + 1 − 1 + 1 − 12.47 J=l+s= 0 + 1 / 2 = 1 / 2
F=I+J,I+J− 1 ,...I−J
= 2 , 1 , 0
2.48 The observed frequency (ω) of radiation from an atom that moves with the
velocity v at an angleθto the line of sight is given by
ω=ω 0 (1+(v/c) cosθ)(1)whereω 0 is the frequency that the atom radiates in its own frame of referenece.
The Doppler shift is then
Δω
ω 0=
ω−ω 0
a 0=
(v
c)
cosθ (2)As the radiating atoms are subject to random thermal motion, a variety of
Doppler shifts will be displayed. In equilibrium the Maxwellian distribution
gives the fractiondNNof atoms with x-component of velocity lying betweenvx
andvx+dvxFig. 2.4Thermal broadening
due to random thermal
motion
dN
N=
exp[
−
(vx
U) 2 ]
√
πdvx
U(3)
whereu/√
2 is the root-mean-square velocity for particles of massMat tem-
peratureT.Nowu=(
2 kT
M) 1 / 2
(4)
wherek= 1. 38 × 10 −^23 J/K is Boltzmann’s constant.
Introducing the Doppler widthsΔωDandΔλDin frequency and wavelength
ΔωD
ω 0=
ΔλD
λ 0=
U
c=
(
2 kT
Mc^2