$ \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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If $A$ is a $n\times n$ matrix, then we can define its powers as $$\begin{align*} A^0&= I \\ A^1 &= A \\ A^2 &=A\cdot A \\ \vdots\\ A^n &=\underbrace{A\cdot \dots \cdot A}_{n\text{ times}} \end{align*}$$
Some matrices may also have square roots?

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If $A$ is a $n\times n$ matrix, then we can define its powers as $$\begin{align*} A^0&= I \\ A^1 &= A \\ A^2 &=A\cdot A \\ \vdots\\ A^n &=\underbrace{A\cdot \dots \cdot A}_{n\text{ times}} \end{align*}$$
Some matrices may also have square roots?

Concepts

Coming soon

Used In

Coming soon

Hypothesis

Coming soon

Results

Coming soon
FullPage
definition
concepts
used in
hypothesis
results
FullPage
definition
concepts
used in
hypothesis
results
If $A$ is a $n\times n$ matrix, then we can define its powers as $$\begin{align*} A^0&= I \\ A^1 &= A \\ A^2 &=A\cdot A \\ \vdots\\ A^n &=\underbrace{A\cdot \dots \cdot A}_{n\text{ times}} \end{align*}$$
Some matrices may also have square roots?

Concepts

Coming soon

Used In

Coming soon

Hypothesis

Coming soon

Results

Coming soon
If $A$ is a $n\times n$ matrix, then we can define its powers as $$\begin{align*} A^0&= I \\ A^1 &= A \\ A^2 &=A\cdot A \\ \vdots\\ A^n &=\underbrace{A\cdot \dots \cdot A}_{n\text{ times}} \end{align*}$$
Some matrices may also have square roots?

Concepts

Coming soon

Used In

Coming soon

Hypothesis

Coming soon

Results

Coming soon
FullPage
definition
concepts
used in
hypothesis
results