- #1
Xyius
- 501
- 4
Homework Statement
The question is from Sakurai 2nd edition, problem 3.21. (See attachments)
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EDIT: Oops! Forgot to attach file! It should be there now..
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The Attempt at a Solution
Part a, I feel like I can do without too much of a problem, just re-write L as L=xp and then re-write x and p in terms of the raising and lowering operators. Part B is where I have no idea.
It says to write |01m> in TERMS of the eigenstates in cartesian coordinates. So I figure for q=0, l=1 the energy in spherical coordinates is..
E=\frac{5}{2}\hbar \omega
So, obtaining this energy in cartesian coordinates, we can have..
(n_x , n_y , n_z) = (1 0 0) OR (0 1 0) OR (0 0 1)
Since in the rectangular coordinate system
<br /> E=(n_x+n_y+n_z+3/2)\hbar \omega<br />
So if we were to write the spherical state in terms of the cartesian degenerate states, I would assume that would mean..
|0 1 0>_S=A|1 0 0>_C+B|0 1 0>C + C|0 0 1>_C
Where subscript C = Cartesian basis and subscript S = spherical basis.
Am I on the right track here? Because In order to find the coefficients I need to compute (for example)
A=_S<1 0 0|0 1 0>_C
And I am not sure how to do that!
