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Psycopathak
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Homework Statement
Please bear with me, I'm not that good with LaTeX.
Consider the harmonic oscillator problem. Define [tex]\Phi[/tex]n(x) as the n-th wave function for one particle, with coordinate x and energy (n+1/2) [tex]\overline{h}[/tex][tex]\omega[/tex], where n=0, 1,… Now, let’s consider a system consisting of two particles which have the same mass; each particle experiences the same potential energy function and therefore each has the same angular frequency [tex]\omega[/tex]. Consider a situation where the total energy of this two-particle system is Etotal = 3 [tex]\overline{h}[/tex][tex]\omega[/tex]. We write the wave functions [tex]\Psi[/tex](xA,xB) for the system of two particles, where xA and xB are the positions of the two particles.
You will be asked below whether the following state is (or is not) allowed; it is a product of two n=1 wave functions (one for each particle):
[tex]\Psi[/tex]maybe(xA,xB) =[tex]\Phi[/tex]1(xA)[tex]\Phi[/tex]1(xB)
(a) Suppose first that the particles are of different species, called A and B. Is the state [tex]\Psi[/tex]maybe(xA,xB) an allowed state of the two-particle system, or not?
(b) For this “different species case”, what is the degeneracy g of the 2-particle system with total energy Etotal=3 [tex]\overline{h}[/tex][tex]\omega[/tex]?
(c) Now, consider instead the case when both particles are identical bosons. Is the state labeled [tex]\Psi[/tex]maybe(xA,xB) possible, or not?
From what I know, the time independent schrodinger wave equation.
H[tex]\Psi[/tex] = (-h/2m)([tex]\partial[/tex]2/[tex]\partial[/tex]x2) + V[tex]\Psi[/tex] = E[tex]\Psi[/tex]
Right Moving particle solution
[tex]\Psi[/tex](x) = Aexp(ipx)/[tex]\overline{h}[/tex])
E = p2/2m + C
I am pretty confused with what this problem is asking, so I don't have an attempt at a solution to offer. I figured that if you have [tex]\Psi[/tex]maybe(xa,xb) could be looked at as:
[tex]\Psi[/tex](xa) * [tex]\Psi[/tex](xb)
Unfortunately from here, I am really not sure where to go on. I've been reading this problem for a week with no such luck.
Please bear with me, I'm not that good with LaTeX.
Consider the harmonic oscillator problem. Define [tex]\Phi[/tex]n(x) as the n-th wave function for one particle, with coordinate x and energy (n+1/2) [tex]\overline{h}[/tex][tex]\omega[/tex], where n=0, 1,… Now, let’s consider a system consisting of two particles which have the same mass; each particle experiences the same potential energy function and therefore each has the same angular frequency [tex]\omega[/tex]. Consider a situation where the total energy of this two-particle system is Etotal = 3 [tex]\overline{h}[/tex][tex]\omega[/tex]. We write the wave functions [tex]\Psi[/tex](xA,xB) for the system of two particles, where xA and xB are the positions of the two particles.
You will be asked below whether the following state is (or is not) allowed; it is a product of two n=1 wave functions (one for each particle):
[tex]\Psi[/tex]maybe(xA,xB) =[tex]\Phi[/tex]1(xA)[tex]\Phi[/tex]1(xB)
(a) Suppose first that the particles are of different species, called A and B. Is the state [tex]\Psi[/tex]maybe(xA,xB) an allowed state of the two-particle system, or not?
(b) For this “different species case”, what is the degeneracy g of the 2-particle system with total energy Etotal=3 [tex]\overline{h}[/tex][tex]\omega[/tex]?
(c) Now, consider instead the case when both particles are identical bosons. Is the state labeled [tex]\Psi[/tex]maybe(xA,xB) possible, or not?
Homework Equations
From what I know, the time independent schrodinger wave equation.
H[tex]\Psi[/tex] = (-h/2m)([tex]\partial[/tex]2/[tex]\partial[/tex]x2) + V[tex]\Psi[/tex] = E[tex]\Psi[/tex]
Right Moving particle solution
[tex]\Psi[/tex](x) = Aexp(ipx)/[tex]\overline{h}[/tex])
E = p2/2m + C
The Attempt at a Solution
I am pretty confused with what this problem is asking, so I don't have an attempt at a solution to offer. I figured that if you have [tex]\Psi[/tex]maybe(xa,xb) could be looked at as:
[tex]\Psi[/tex](xa) * [tex]\Psi[/tex](xb)
Unfortunately from here, I am really not sure where to go on. I've been reading this problem for a week with no such luck.