A one-dimensional harmonic oscillator begins in its ground state at time t = 0. For t > 0, the oscillator is subject to a time dependent force of F(t) Foet/ (2) Using time-dependent perturbation theory to first order, obtain the probabililty of finding the particle in its first excited state for t > 0. Show that your result is independent of time as t > o0. Is this surprising?

icon
Related questions
Question

It's a quantum mechanics question.

A one-dimensional harmonic oscillator begins in its ground state at time t = 0. For t > 0, the
oscillator is subject to a time dependent force of
F(t) Foet/
(2)
Using time-dependent perturbation theory to first order, obtain the probabililty of finding the particle
in its first excited state for t > 0. Show that your result is independent of time as t > o0. Is this
surprising?
Transcribed Image Text:A one-dimensional harmonic oscillator begins in its ground state at time t = 0. For t > 0, the oscillator is subject to a time dependent force of F(t) Foet/ (2) Using time-dependent perturbation theory to first order, obtain the probabililty of finding the particle in its first excited state for t > 0. Show that your result is independent of time as t > o0. Is this surprising?
Expert Solution
trending now

Trending now

This is a popular solution!

steps

Step by step

Solved in 7 steps with 5 images

Blurred answer