Probability amplitude

It is a complex number.

For example, as we seen earlier in Superposition

\ket{\psi}=\psi_0\ket{\psi_0}+\psi_1\ket{\psi_1}

In this case, $\psi_0$ and $\psi_1$ are probability amplitudes.

Note that the sum of all probability amplitudes squared add up to one.

\sum_n |\psi_n|^2 = 1

Another example is in Born Rule

\begin{gather*} P_{\psi_n}=|\left\langle \psi_n|\psi \right\rangle|^2 \end{gather*}

In this case, $\braket{\psi_n|\psi}$ is the probability amplitude. You could write it

\psi_n=\braket{\psi_n|\psi}

BE CAREFUL $\ket{\psi_n}$ is an STATE VECTOR, $\psi_n$ is a probability amplitude which is a COMPLEX NUMBER. Notation is really confusing in QM.