6.2.1: Calculating Probabilities from Amplitudes

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Suppose that you have the amplitude \(\ A\) for a particle to be in a given state. Sometimes, this is all you want. You may need to use it to calculate the interference of this state with another state. However, often, what you really want is the probability \(\ P\) for that particle to be found in that given state. You can calculate \(\ P\) by A by taking the absolute square of \(\ A\), written as \(\ |A|^{2}\). This is different from squaring \(\ A\), in that you don’t multiply the number \(\ A\) by itself, but rather you multiply \(\ A\) by its complex conjugate. So, if \(\ A\) is the amplitude for a particle to be in a given state, then the probability \(\ P\) for that particle to be in that state is:

\(\ P=|A|^{2}=A^{*} A\)

As an example, suppose that you’ve calculated that the amplitude for a particle in state \(\ |\psi\rangle\) to be subsequently measured to have \(\ +z\) spin (and thus go into the state \(\ |+z\rangle\)) is \(\ (2+i) / 3\). If we wanted to calculate the probability, we’d need to multiply this by its complex conjugate:

\(\ \begin{aligned}
P &=\left(\frac{2+i}{3}\right)^{*}\left(\frac{2+i}{3}\right) \\
&=\left(\frac{2-i}{3}\right)\left(\frac{2+i}{3}\right) \\
&=\frac{(2-i)(2+i)}{9} \\
&=\frac{4+2 i-2 i-i^{2}}{9} \\
&=\frac{4+1}{9} \\
&=\frac{5}{9}=0.55555 \ldots
\end{aligned}\)

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