3.3 Solutions 211
u^2210 dτ=(
1
8 πa^30)[∫∞
0y^4 e−y(
dy
4 a^20)
a^50][
cos^3 θ
3] 1
− 1(2π)=
(
1
24
)
×4!= 1
Similarlyu^221 ± 1 dτ=π(2^1 a 0 ) 3∫e− 2 x
2 x(^2) sin (^2) θe±iφe∓iφr (^2) sinθdθdφdr
=
(
1
8 πa^30)∫∞
0(
e
−ar 02)(
r^4 dr
4 a^20)∫+ 1
− 1(1−cos^2 θ) d(cosθ)∫ 2 π0dφ=
(
a 05
64 πa^50)[∫∞
0y^4 e−ydy](
4
3
)
(2π)=
(
1
192
)
(4!)(8)= 1
3.67
∫
u 21 ± 1 u 210 dr=A(^22)
√
2
∫
e−xxcosθe−xxsinθe+φr^2 sinθdθdφdr
The integral∫ 2 π
0 e±iφdφ= 0
Thereforeu 21 ± 1 andu 210 are orthogonal.
Further the integral
∫
u∗ 211 U 21 − 1 dτinvolves the integral
∫ 2 π0e−iφe−iφdφor∫ 2 π0e−^2 iφdφ= 0So, the functionsu 211 andu 21 − 1 are also orthogonal.3.68 The degree of degenerating is given by 2n^2 .Soforn=1, degenerary is 2, for
n=2itis8,forn=3, it is 18 and forn=4, it is 32.
3.69 Parity of the state is determined by the factor (−1)l.For1s,l= 0 ,parity= +1,
for 2p,l= 1 ,parity=−1 and for 3d,l= 2 ,parity=+1.
3.70 To show that the probability density of the 3dstate is independent of the polar
angleθ.Weform
u∗u=u∗(3, 2 , 0)u(3, 2 ,0)+ 2 u∗(3, 2 ,1)u(3, 2 ,1)+ 2 u∗(3, 2 ,2)
u(3, 2 ,2)
The factor 2 takes care ofmvalues±1 and±2, as in Table 3.2. Inserting the
functions the azimuth part,eiφore−iφdrop off when we multiply with the
complex conjugate,
i.e.(
eiφ)∗
eiφ=1or(e−iφ)∗(e−iφ)= 1u∗u=A^23 e−^2 xx^4[(
1
18
)
(3 cos^2 θ−1)^2 +(
2
3
)
sin^2 θcos^2 θ+(
1
6
)
sin^4 θ