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Assignment 3 Q6 0.0[3.0 points (graded) For a function '1! (z,t) to be a solution of Schroedinger's timedependent equation at a specific time t1, which one of the following statements must be true? A) It must be a wave of the form exp [2' (k2 Etl /h)] where E is a positive real number. B) The wave must be of the form f (z vt), g (z + vt), or some linear combination of the two, where v is some positive real number. C) The wave can have any shape as a function of z at time t1 (presuming the function is appropriately continuous and smooth so all the necessary derivatives are well defined and finite) D) None of the above