c16 JWBS043-Rogers September 13, 2010 11:28 Printer Name: Yet to Come
THE PARTICLE IN A CUBIC BOX 255
n12 3
Pnx( ) sin n x()()^2 n^2
2
4
6
8
10
P(1 x)
P(2 x)
P(3 x)
x
FIGURE 16.3 AMathcad©Csketch of the born probability densities at the first three levels
of the particle in a box. The lowest wave function has no internal nodes, the second wave
function has one, and the third has two.
nodes of a square plate or membrane. It can be solved in 3-space to produce solutions
to the vibratory motions in a solid cube. Other geometries are possible such as a
circle, rectangle, parallelepiped, cylinder, and so on. Each problem lends insight and
is recommended to the interested reader.
16.6 THE PARTICLE IN A CUBIC BOX
In the case of a particle confined to the interior of a cube, we have a three-dimensional
wave equation of the form
−
h ̄^2
2 m
∇^2 (x,y,z)+V(x,y,z)=E(x,y,z)