How Does Griffiths Derive x Using Creation and Annihilation Operators?

kuahji
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Find the expectation value of the potential energy in the nth state of the harmonic oscillator.

This is his example 2.5 in the book, he uses a\pm=1/Sqrt[2hmw](\mpip+mwx) to get x=Sqrt[h/2mw](a_{+}+a_{-})

My question how does he do this? I can't seem to make the algebraic manipulations to get it into that form to follow out his example.
 
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You have two equations, one for a_+ and one for a_-.

All you have to do is solve them simultaneously for x and p. i.e. Solve one for x, solve the other for p, plug the first into the second, etc. etc.

It may help to simplify things by defining some constants A and B such that:

a_{\pm}=Ap\mp Bx
 
That was easy enough, thank you for the tip!
 
No problem! :smile:
 
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