Answer to Problem 3.37P The proof for virial theorem is given. Explanation of Solution Using Equation 3.73, LHS of the given expression can be written as, ar (xp) = ([H, xpl) + < d(xp)/dt> ? = ([H, x]p+x[H, p]} Here, x is the position operator, p is the momentum operator and H is the Hamiltonian operator. Write the expression for Hamiltonian. H = m + V (x) Using the expression for H and the commutator relation between x and p,

In the solution here to problem 3.37 Griffiths, the first step is to use Eqn 3.73*

Can you show me why <d(xp)/dt> = 0  or why it isn't in the RHS of the equation?  (see my image)

 

* Equation 3.73:   d<Q>/dt = (i/h_bar) <[H,Q]> + <dQ/dt>

Transcribed Image Text:

Answer to Problem 3.37P The proof for virial theorem is given. Explanation of Solution Using Equation 3.73, LHS of the given expression can be written as, ar (xp) = (IH, xp]) + < d(xp)/dt> ? = {[H, x]p+x[H,p]} Here, x is the position operator, p is the momentum operator and H is the Hamiltonian operator. Write the expression for Hamiltonian. H = 2m + V (x) Using the expression for H and the commutator relation between x and p,