![P460 - perturbation1 Perturbation Theory Only a few QM systems that can be solved exactly: Hydrogen Atom(simplified), harmonic oscillator, infinite+finite. - ppt download P460 - perturbation1 Perturbation Theory Only a few QM systems that can be solved exactly: Hydrogen Atom(simplified), harmonic oscillator, infinite+finite. - ppt download](https://images.slideplayer.com/17/5343588/slides/slide_6.jpg)
P460 - perturbation1 Perturbation Theory Only a few QM systems that can be solved exactly: Hydrogen Atom(simplified), harmonic oscillator, infinite+finite. - ppt download
![P460 - perturbation 21 Time Dependent Perturbation Theory Many possible potentials. Consider one where V'(x,t)=V(x)+v(x,t) V(x) has solutions to the S.E. - ppt download P460 - perturbation 21 Time Dependent Perturbation Theory Many possible potentials. Consider one where V'(x,t)=V(x)+v(x,t) V(x) has solutions to the S.E. - ppt download](https://images.slideplayer.com/16/5197189/slides/slide_4.jpg)
P460 - perturbation 21 Time Dependent Perturbation Theory Many possible potentials. Consider one where V'(x,t)=V(x)+v(x,t) V(x) has solutions to the S.E. - ppt download
![P460 - perturbation1 Perturbation Theory Only a few QM systems that can be solved exactly: Hydrogen Atom(simplified), harmonic oscillator, infinite+finite. - ppt download P460 - perturbation1 Perturbation Theory Only a few QM systems that can be solved exactly: Hydrogen Atom(simplified), harmonic oscillator, infinite+finite. - ppt download](https://images.slideplayer.com/17/5343588/slides/slide_8.jpg)
P460 - perturbation1 Perturbation Theory Only a few QM systems that can be solved exactly: Hydrogen Atom(simplified), harmonic oscillator, infinite+finite. - ppt download
![SOLVED: Time dependent perturbation theory Consider a quantum system with the two states, |1) and the unperturbed time-independent Hamiltonian Ho. where < 2. We want to study a time-dependent perturbation V(t)=hXf(t) with SOLVED: Time dependent perturbation theory Consider a quantum system with the two states, |1) and the unperturbed time-independent Hamiltonian Ho. where < 2. We want to study a time-dependent perturbation V(t)=hXf(t) with](https://cdn.numerade.com/ask_images/fbef5121a12a48dab49e610927bf3b8b.jpg)