3.3 Solutions 189
None of the numbersnx,ny,ornzcan be zero, otherwiseψ(x,y,z) itself
will vanish.
For an infinitely deep potential wellEn= h
2
8 ma^2
[
n^2 x+n^2 y+n^2 z
]
. The com-
binationnx=ny=nz=0 is ruled out because the wave function will be
zero. Table 3.4 gives various energy levels along with the value ofg, the degen-
eracy. The values ofnx,nyand nzare such thatn^2 x+n^2 y+n^2 z= 8 ma^2 En/h^2 =
constant for a given energyEn. The energies of the excited states are expressed
in terms of the ground state energyE 0 =h^2 / 8 ma^2
Table 3.4
nx ny nz gEn
0 0 1 3-fold E 0 =h^2 / 8 ma^2
010
100
0 1 1 3-fold 2 E 0
101
110
1 1 1 Non-degenerate 3 E 0
0 0 2 3-fold 4 E 0
020
200
0 1 2 6-fold 5 E 0
102
120
021
201
210
1 1 2 3-fold 6 E 0
121
211
3.41 (a) Case (i)U 0 <E,Regionx 0
PuttingV(x)=0, Schrodinger’s equation is reduced to
d^2 ψ
dx^2
+
(
2 mE
^2
)
ψ=0(1)
which has the solution
ψ 1 =Aexp(ik 1 x)+Bexp(−ik 1 x)(2)
wherek^21 =
2 mE
^2
(3)
ψ 1 represents the incident wave moving from left to right (first term in (2))
plus the reflected wave (second term in (2)) moving from right to left
Regionx0:
d^2 ψ
dx^2
+
[
2 m(E−U 0 )
^2
]
ψ=0(4)
which has the physical solution