$ \newcommand{\braket}[1]{\langle #1 \rangle} \newcommand{\abs}[2][]{\left\lvert#2\right\rvert_{\text{#1}}} \newcommand{\ket}[1]{\left\lvert#1 \right.\rangle} \newcommand{\bra}[1]{\langle\left. #1\right\rvert} \newcommand{\braket}[1]{\langle #1 \rangle} \newcommand{\dd}{\text{d}} \newcommand{\dv}[2]{\frac{\dd #1}{\dd #2}} \newcommand{\pdv}[2]{\frac{\partial}{\partial #1}} $
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Overview
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The fluctation of an operatr is the standard deviation of it's expected value.

Notations

The flunctation is denoted with $$\begin{align*} \Delta A=\sqrt{\langle(A-\langle A\rangle)^2\rangle} \end{align*}$$

Concepts

The fluctation is denoted as the standard deviation. We can simplify the equation.
The fluctation of an operatr is the standard deviation of it's expected value.

Notations

The flunctation is denoted with $$\begin{align*} \Delta A=\sqrt{\langle(A-\langle A\rangle)^2\rangle} \end{align*}$$

Concepts

The fluctation is denoted as the standard deviation. We can simplify the equation.
FullPage
Overview
Notations
Concepts
FullPage
Overview
Notations
Concepts
The fluctation of an operatr is the standard deviation of it's expected value.

Notations

The flunctation is denoted with $$\begin{align*} \Delta A=\sqrt{\langle(A-\langle A\rangle)^2\rangle} \end{align*}$$

Concepts

The fluctation is denoted as the standard deviation. We can simplify the equation.
The fluctation of an operatr is the standard deviation of it's expected value.

Notations

The flunctation is denoted with $$\begin{align*} \Delta A=\sqrt{\langle(A-\langle A\rangle)^2\rangle} \end{align*}$$

Concepts

The fluctation is denoted as the standard deviation. We can simplify the equation.
FullPage
Overview
Notations
Concepts