Phy5645/HO problem1: Difference between revisions

Revision as of 01:31, 6 December 2009

Problem 1: Calculate the expectation value of x in eigenstate.

Solution:

We can compute the expectation value of x simply.

$\langle \Psi _{n}|x|\Psi _{n}\rangle ={\sqrt {\frac {\hbar }{2m\omega }}}\langle \Psi _{n}|{\hat {a}}+{\hat {a}}^{\dagger }|\Psi _{n}\rangle$

$={\sqrt {\frac {\hbar }{2m\omega }}}(\langle \Psi _{n}|{\hat {a}}\Psi _{n}\rangle +\langle \Psi _{n}|{\hat {a}}^{\dagger }\Psi _{n}\rangle )$

$={\sqrt {\frac {\hbar }{2m\omega }}}({\sqrt {n}}\langle \Psi _{n}|\Psi _{n}-1\rangle +{\sqrt {n+1}}\langle \Psi _{n}|\Psi _{n}+1\rangle )=0$

We should have seen that coming. Since each term in the operator changes the eigenstate, the dot product with the original (orthogonal) state must give zero.

(Submitted by Team 4-Hang Chen)

@@ Line 7: / Line 7: @@
 <math>\langle\Psi_n|x|\Psi_n\rangle=\sqrt{\frac{\hbar}{2m\omega}}\langle\Psi_n|\hat{a}+\hat{a}^{\dagger}|\Psi_n\rangle</math>
-           <math>=\sqrt{\frac{\hbar}{2m\omega}}(\langle\Psi_n|\hat{a}\Psi_n\rangle+\langle\Psi_n|\hat{a}^{\dagger}\Psi_n\rangle)</math>
+<math>=\sqrt{\frac{\hbar}{2m\omega}}(\langle\Psi_n|\hat{a}\Psi_n\rangle+\langle\Psi_n|\hat{a}^{\dagger}\Psi_n\rangle)</math>
-           <math>\sqrt{\frac{\hbar}{2m\omega}}(\sqrt{n}\langle\Psi_n|\Psi_n-1\rangle+\sqrt{n+1}\langle\Psi_n|\Psi_n+1\rangle)=0</math>
+<math>=\sqrt{\frac{\hbar}{2m\omega}}(\sqrt{n}\langle\Psi_n|\Psi_n-1\rangle+\sqrt{n+1}\langle\Psi_n|\Psi_n+1\rangle)=0</math>
 We should have seen that coming. Since each term in the  operator changes the eigenstate, the dot product with the original (orthogonal) state must give zero.
 (Submitted by Team 4-Hang Chen)

Phy5645/HO problem1: Difference between revisions

Revision as of 01:31, 6 December 2009

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