@@NickHeumannUniversity its here I have exam on these please help me Q1/At time t = O, the wave function for the hydrogen atom is Ψ(r, 0) = (1/√7)(2ψ100 + ψ210 + ψ211 + √3ψ21,-1) , Calculate the value of the uncertainty (ΔLxΔLy) and explain in detail. Q2/ For the nth state of the linear harmonic oscillator. Evaluate: The expectation value of the potential energy < V > for an eigenstate of a one-dimensional harmonic oscillator. The expectation value kinetic energy < T > for an eigenstate of a one-dimensional harmonic oscillator. What is the value of the uncertainty (ΔT ΔV). Explain in details. Q3/For the particle of mass m in the one dimensional box with width a, the wave function of the particle at time (t = 0) inside the box is : Ψ(x) = Asin(3πx/2a) cos(πx/2a) 1- Find Ψ(x, t > 0). 2- A measurement is made of the energy. What energies can be found? What is the probability of obtaining each value of the energy?
Unfortunately, I cannot help you solve your exam. But I'm pretty sure that I have made video that may help you solve those problems. Make sure to check out my Quantum mechanics problems playlist and see if there is something that can help. Best of luck!
Can you provide an intuitive explanation of why the inner product is important to QM?
Hello…i have 3 questions in quantum mechanics can you help me and solve these for me?I appreciate your help.please help me
Hi! If you have a question, you can ask and I can see if I can help you!
@@NickHeumannUniversity its here I have exam on these please help me
Q1/At time t = O, the wave function for the hydrogen atom is Ψ(r, 0) = (1/√7)(2ψ100 + ψ210 + ψ211 + √3ψ21,-1)
, Calculate the value of the uncertainty (ΔLxΔLy) and explain in detail.
Q2/ For the nth state of the linear harmonic oscillator. Evaluate:
The expectation value of the potential energy < V > for an eigenstate of a one-dimensional harmonic oscillator.
The expectation value kinetic energy < T > for an eigenstate of a one-dimensional harmonic oscillator.
What is the value of the uncertainty (ΔT ΔV). Explain in details.
Q3/For the particle of mass m in the one dimensional box with width a, the wave function of the particle at time (t = 0)
inside the box is :
Ψ(x) = Asin(3πx/2a) cos(πx/2a)
1- Find Ψ(x, t > 0).
2- A measurement is made of the energy.
What energies can be found? What is the probability of obtaining each value of the energy?
Unfortunately, I cannot help you solve your exam. But I'm pretty sure that I have made video that may help you solve those problems. Make sure to check out my Quantum mechanics problems playlist and see if there is something that can help.
Best of luck!