Difference between revisions of "Quantum Qual Problems"
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− | <math> - \frac{h^2}{2m}\Delta^2 + V | + | <math> - \frac{h^2}{2m}\Delta^2 + V </math> |
Revision as of 02:38, 16 August 2007
1.) Given a quantum mechanical particle of mass
confined inside a box of sides . The particle is allowed to move freely between and .- Use the time-independent Schrodinger equation for this problem to obtain the general form for the eigenfunctions of the particle
- Now apply boundary conditions to obtain the specific eigenfunctions and eigenenergies for this specific problem.
- Assume and find the first 6 eigenenergies of the problem in terms of the box side length ( ), the particle mass ( ) and standard constants. What are their quantum number? Make a sketch of the eigenvalue spectrum, a table listing these eigenenergies and the quantum numbers of all the states that correspond to them.
Solution:
2.)