Write one possible & complete QM Hamiltonian operator for a particle of mass, m, moving in 3D (x,y,z), which would have an eigenvalue solution of the form: E = E(x,z) + E(y).
Write one possible & complete QM Hamiltonian operator for a particle of mass, m, moving in 3D (x,y,z), which would have an eigenvalue solution of the form: E = E(x,z) + E(y).
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![Write one possible & complete QM Hamiltonian operator for a particle of mass, m, moving
in 3D (x,y,z), which would have an eigenvalue solution of the form: E = E(x,z) + E(y).](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F3ef791f1-2f21-45a4-adc2-87f93db2f3ad%2F690dc4ae-5a77-41af-b324-d951e1120148%2Fr67mlsl.png&w=3840&q=75)
Transcribed Image Text:Write one possible & complete QM Hamiltonian operator for a particle of mass, m, moving
in 3D (x,y,z), which would have an eigenvalue solution of the form: E = E(x,z) + E(y).
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