Do the classical equations, using ψ(r, t), assume that you’ll get a different outcome from ψ(r, n)? That is, if the system is in the exact same configuration, but at a “different time”, would the classical equations suggest a different outcome?
(Mostly, this struck me as another approach for demonstrating that this ‘t’ thing is extraneous.)
Do the classical equations, using ψ(r, t), assume that you’ll get a different outcome from ψ(r, n)? That is, if the system is in the exact same configuration, but at a “different time”, would the classical equations suggest a different outcome?
(Mostly, this struck me as another approach for demonstrating that this ‘t’ thing is extraneous.)
Of course not.