correspondence between time

correspondence between time - is a solution as well.'' Let...

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correspondence between time-dependent and time-independent solutions The time dependent Schrödinger equation is (10.1) As we remember, a solution of the form (10.2) leads to a solution of the time-independent Schrödinger equation of the form (10.3) Superposition of time-dependent solutions There has been an example problem, where I asked you to show ``that if and are both solutions of the time-dependent Schrödinger equation, than
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Unformatted text preview: is a solution as well.'' Let me review this problem (10.4) where in the last line I have use the sum rule for derivatives. This is called the superposition of solutions, and holds for any two solutions to the same Schrdinger equation! hy doesn't it work for the time-independent Schrdinger equation?...
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