Скачать книгу

accomplished using the integral relationship

      Figure 2.3a also shows that the wavefunctions for the states with quantum number larger than 1 have nodal points, or points with no amplitude. This is familiar from classical wave behavior, for example, for a vibrating string. Since the meaning of the squared amplitude of the wavefunction can be visualized for the particle in a box as the probability of finding the electron, these nodal points represent regions in which the electron is not found.

       Example 2.3

      1 What is the probability P of finding a PiB in the center third of the box for n = 1?

      2 What is P for the same range for a classical particle?

      Answer:

      1 The probability P of finding a quantum mechanical particle–wave is given by the square of the amplitude of the wavefunction. Thus,(E2.3.1)The integral over the sin2 function can be evaluated using(E2.3.2)Then the probability is(E.2.3.3)

      2 A classical particle would be found with equal probability anywhere in the box; thus, the probability of finding it in the center third would just 1/3. Note that for higher values of n, the probability of finding it in the center third will decrease.

      2.4.1 Particle in a 2D Box

      The principles derived in the previous section can easily by expanded to a two‐dimensional (2D) case. Here, an electron would be confined in a box with dimensions Lx in the x‐direction and Ly in the y‐direction, with zero potential energy inside the box and infinitely high potential energy outside the box:

      (2.42)upper V Subscript x comma y Baseline equals StartBinomialOrMatrix 0 for 0 less-than-or-equal-to x less-than-or-equal-to upper L Subscript x Baseline and 0 less-than-or-equal-to normal y less-than-or-equal-to upper L Subscript y Baseline Choose infinity equals for x less-than 0 and for x greater-than upper L Subscript x Baseline and normal y less-than 0 and for y greater-than upper L Subscript y Baseline EndBinomialOrMatrix

      The Hamiltonian for this system is

      (2.43)ModifyingAbove upper H With Ì‚ equals minus StartFraction normal h with stroke squared Over 2 m EndFraction left-brace StartFraction d squared Over normal d x squared EndFraction plus StartFraction d squared Over normal d y squared EndFraction right-brace

      and the total wavefunction ψx, y can be written as

      (2.44)normal psi Subscript n Sub Subscript x Subscript n Sub Subscript y Baseline left-parenthesis x comma y right-parenthesis equals upper A sine StartFraction n Subscript x Baseline normal pi x Over upper L Subscript x Baseline EndFraction sine StartFraction n Subscript y Baseline normal pi y Over upper L Subscript y Baseline EndFraction

      where A as before is an amplitude (normalization) constant. The total energy of the system is

      (2.45)upper E Subscript n Sub Subscript x Subscript n Sub Subscript y Baseline equals StartFraction n Subscript x Superscript 2 Baseline h squared Over 8 m upper L Subscript x Superscript 2 Baseline EndFraction plus StartFraction n Subscript y Superscript 2 Baseline h squared Over 8 m upper L Subscript y Superscript 2 Baseline EndFraction

Schematic illustration of the wavefunctions of the two-dimensional particle in a box for (a) nx = 1 and ny = 2 and (b) nx = 2 and ny = 1.

      (2.46)upper E Subscript n Sub Subscript x Subscript n Sub Subscript y Baseline equals StartFraction left-parenthesis n Subscript x Superscript 2 Baseline plus n Subscript y Superscript 2 Baseline right-parenthesis h squared Over 8 m upper L squared EndFraction

      (2.47)upper E 21 equals upper E 12 equals StartFraction 5 h squared Over 8 m upper L squared EndFraction

      When two or more energy eigenvalues for different combination of quantum numbers are the same, these energy states are said to be degenerate. Here, for nx = 2 and ny = 1 and nx = 1 and ny = 2, the same energy eigenvalues are obtained; consequently, E21 and E12 are degenerate. This is a common occurrence in quantum mechanics, as will be seen later in the discussion of the hydrogen atom (Chapter 7), where all the three 2p orbitals, the five 3d orbitals, and the seven 4f orbitals are found to be degenerate.

      2.4.2 The Unbound Particle

      Next, the case of a system without the restriction of the boundary conditions (an unbound particle) will be discussed. This discussion starts with the same Hamiltonian used before:

      (2.23)StartFraction d squared Over normal d x squared EndFraction normal psi left-parenthesis 
				<p style= Скачать книгу