Nodes of Wavefunctions
classification
🪐 quant-ph
keywords
nodesargumentconsecutiveequationgiveodingerone-dimensionalschr
read the original abstract
We give a simple argument to show that the $n$th wavefunction for the one-dimensional Schr\"odinger equation has $n-1$ nodes. We also show that if $n_1 < n_2$, then between two consecutive zeros of $\psi_{n_1}$, there is a zero of $\psi_{n_2}$.
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