c) To find the average value of the position operator, we first need to show
thatThenThe expectation value of the position operator oscillates in time.5.20 Switched-on Field (MIT)
a) Operate on the eigenfunction by the kinetic energy term in the Hamil-
tonian:Consider the factor the 1 must give the eigenvalue and must
cancel the potential energy. These two constraints give the identitiesThe normalization constant is determined byb) The solution is given above:
264 SOLUTIONS