anastasiasam8996
14.09.2019 •
Physics
Show that there is no acceptable solution to the time-inde, schrödinger equation for the infinite square well with e = 0 or e < 0. (tu special case of the general theorem in problem 2.2, but this time do it by solving the schrödinger equation, and showing that you cannot meet the bo conditions.) e do it by explicitly the boundary stationary state *problem 2.4 calculate (x), (x2), (p), (p2), 0x, and op, for the nth stationary of the infinite square well. check that the uncertainty principle is satisfied. wh state comes closest to the uncertainty limit?
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T
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