Let me explain in details. Let Ψ=Ψ(x,t) be the wave function of a particle moving in a unidimensional space. Is there a way of writing Ψ(x,t) so that |Ψ(x,t)|2 represents the probability density of finding a particle in classical mechanics (using a Dirac delta function, perhaps)?
Subscribe to:
Post Comments (Atom)
classical mechanics - Moment of a force about a given axis (Torque) - Scalar or vectorial?
I am studying Statics and saw that: The moment of a force about a given axis (or Torque) is defined by the equation: $M_X = (\vec r \times \...
-
Are C1, C2 and C3 connected in parallel, or C2, C3 in parallel and C1 in series with C23? Btw it appeared as a question in the basic physics...
-
I have read the radiation chapter, where I have been introduced with the terms emissivity and absorptivity. emissivity tells about the abili...
-
Since the charged pions decay into two particles, a muon and a muon neutrino Fractional electric Charge disappeared, why? The decay proceeds...
No comments:
Post a Comment