Hamiltonian for classical harmonic oscillator

dimanche 29 juin 2014

I am working through Leonard Susskinds 'the theoretical minimum' and one of the exercises is to show that H=ω/2(p^2+q^2).



The given equations are H=1/2mq(dot)^2 + k/2q^2, mq(dot)=p and ω^2=k/m.



q is a generalisation of the space variable x, and (dot) is the time derivative if this helps. The solution I am getting contains variables in front of the q and p's inside the brackets, do these reduce somehow? Any proof/explanation would be much appreciated :)





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