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diegoarmando
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Uncertainty - Harmonic Oscillator
The Wave function for the ground state of a quantum harmonic oscillator is
[tex]
\psi=(\alpha/\pi)^{1/4}e^{-\alpha x^2/2}
[/tex] where [tex] \alpha = \sqrt{ mk/ \hbar^2} [/tex].
Compute [tex] \Delta x \Delta p [/tex]known:
Heisenberg Uncertainty Principle:
[tex] \Delta p \Delta x >= \hbar/2[/tex]
In order to compute [tex] \Delta x \Delta p [/tex], what do I need to do? any integral?
The Wave function for the ground state of a quantum harmonic oscillator is
[tex]
\psi=(\alpha/\pi)^{1/4}e^{-\alpha x^2/2}
[/tex] where [tex] \alpha = \sqrt{ mk/ \hbar^2} [/tex].
Compute [tex] \Delta x \Delta p [/tex]known:
Heisenberg Uncertainty Principle:
[tex] \Delta p \Delta x >= \hbar/2[/tex]
In order to compute [tex] \Delta x \Delta p [/tex], what do I need to do? any integral?
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