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11 Dec 2019
Need to understand steps to solve;
a. Show that the one-dimensional momentum operator isHermitian.
b.Suppose the operator T is defined by T=*Q**Q, where * is areal number, Q is an
operator (not necessarily Hermitian), and Q* is Q's adjoint. showthat T is
Hermitian.
KEY:
*= Alpha
**= Tau and in the upper right corner of the Q.
c. Show that for any (physically acceptable) wave function *, theoperator X, Px has
eigenvalue ih.
Thank you for your help.
Need to understand steps to solve;
a. Show that the one-dimensional momentum operator isHermitian.
b.Suppose the operator T is defined by T=*Q**Q, where * is areal number, Q is an
operator (not necessarily Hermitian), and Q* is Q's adjoint. showthat T is
Hermitian.
KEY:
*= Alpha
**= Tau and in the upper right corner of the Q.
c. Show that for any (physically acceptable) wave function *, theoperator X, Px has
eigenvalue ih.
Thank you for your help.
27 Apr 2023
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