197k views
5 votes
Consider a particle of mass m which can move freely along the x axis from -a/2 to a/2, but which is strictly prohibited from being found outside this region. The wave function of the particle within the allowed region is

User Leonardloo
by
7.2k points

1 Answer

3 votes

Answer:

φ = B sin (2π n/a x)

Step-by-step explanation:

In quantum mechanics when a particle moves freely it implies that the potential is zero (V = 0), so its wave function is

φ = A cos kx + B sin kx

we must place the boundary conditions to determine the value of the constants A and B.

In our case we are told that the particle cannot be outside the boundary given by x = ± a / 2

therefore we must make the cosine part zero, for this the constant A = 0, the wave function remains

φ = B sin kx

the wave vector is

k = 2π /λ

now let's adjust the period, in the border fi = 0 therefore the sine function must be zero

φ (a /2) = 0

0 = A sin (2π/λ a/2)

therefore the sine argument is

2π /λ a/2 = n π

λ= a / n

we substitute

φ = B sin (2π n/a x)

User Daniel Stenberg
by
7.9k points