286 4 Thermodynamics and Statistical Physics
p=1
3
ρ<ν^2 >whereρis the mass density. In the case of photon gas, the speed of all photons
is identical being equal toc. Furthermore, from Einstein’s relation
u=ρc^2
whereuis the energy density. Replacing<ν^2 >byc^2
prad=1
3
ρc^2 =u
34.64 LetTandT 0 be the Kelvin temperatures of the body and the surroundings.
Then, by Stefan–Boltzmann law, the rate of loss of heat per unit area of the
body is
dQ
dt
=σ(T^4 −T 04 )=σ(T−T 0 )(T+T 0 )(T^2 +T 02 )
If (T−T 0 ) be small, (T≈T 0 ), and
dQ
dt=σ(T−T 0 )× 4 T 03SinceT 0 is constant,
dT
dt∝(T−T 0 ); (Newton’s law of cooling).4.65 The energy densityuand pressurepof radiation are related by
p=u
3
Furthermore,u= 4 σT^4 /c
Eliminatingu,T=(
3 cp
4 σ) 1 / 4
=
(
3 × 3 × 108 × 4 × 108 × 1. 013 × 105
4 × 5. 67 × 10 −^8
) 1 / 4
= 2 × 107 K
4.66 (a)Power,P=σAT^4 = 4 πR^2 σT^4
= 4 π(7× 108 )^2 (5. 67 × 10 −^8 )(5,700)^4
= 3. 68 × 1026 WMass lost per second,m=P/c^2 =3. 68 × 1026
(3× 108 )^2
= 4. 1 × 109 kg/s(b) Time taken for the mass of sun (M) to decrease by 1% ist=M
100
×
1
m=
2 × 1030
100
×
1
4. 1 × 109
= 4. 88 × 1018 s=
4. 88 × 1018
3. 15 × 107
= 1. 55 × 1011 years