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Get the inverse matrix:
Enter an invertible matrix, with each element separated by a comma and each row ending with a semicolon.
Note that mathematical functions and variables are not supported.
Enter an invertible matrix, with each element separated by a comma and each row ending with a semicolon.
Note that mathematical functions and variables are not supported.
Current location:Linear algebra >Inverse matrix >History of inverse matrices
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &1\ &5\ &4\ &7\ \\ &6\ &3\ &9\ &8\ \\ &4\ &4\ &7\ &5\ \\ &5\ &1\ &8\ &4\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &2\ &1\ &3\ &4\ \\ &1\ &3\ &4\ &2\ \\ &3\ &1\ &2\ &4\ \\ &3\ &4\ &2\ &1\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &2\ &1\ &3\ &4\ \\ &4\ &3\ &1\ &2\ \\ &1\ &3\ &4\ &2\ \\ &2\ &4\ &3\ &1\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &5\ &6\ &8\ &10\ &12\ \\ &6\ &8\ &10\ &12\ &15\ \\ &8\ &12\ &15\ &20\ &24\ \\ &12\ &15\ &20\ &24\ &25\ \\ &15\ &20\ &24\ &25\ &30\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &5\ &5\ &5\ &5\ &5\ \\ &6\ &6\ &6\ &6\ &6\ \\ &8\ &8\ &8\ &8\ &8\ \\ &10\ &10\ &10\ &10\ &10\ \\ &12\ &15\ &12\ &15\ &12\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
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$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &2\ &1\ &3\ &4\ \\ &1\ &3\ &4\ &2\ \\ &3\ &1\ &2\ &4\ \\ &3\ &4\ &2\ &1\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &2\ &1\ &3\ &4\ \\ &4\ &3\ &1\ &2\ \\ &1\ &3\ &4\ &2\ \\ &2\ &4\ &3\ &1\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &5\ &6\ &8\ &10\ &12\ \\ &6\ &8\ &10\ &12\ &15\ \\ &8\ &12\ &15\ &20\ &24\ \\ &12\ &15\ &20\ &24\ &25\ \\ &15\ &20\ &24\ &25\ &30\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
$$\begin{aligned}&\\ \color{black}{Calcu}&\color{black}{late\ the\ inverse\ matrix\ of\ } \ \ \begin{pmatrix} &5\ &5\ &5\ &5\ &5\ \\ &6\ &6\ &6\ &6\ &6\ \\ &8\ &8\ &8\ &8\ &8\ \\ &10\ &10\ &10\ &10\ &10\ \\ &12\ &15\ &12\ &15\ &12\ \end{pmatrix}\color{black}{\ .}\\ \end{aligned}$$
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Elementary transformations of matrices:
Definition:Applying the following three transformations to the rows (columns) of a matrix becomes the elementary transformation of the matrix:
(1) Swap the positions of two rows (columns) in a matrix;
(2) Using non-zero constants λ Multiply a certain row (column) of a matrix;
(3) Convert a row (column) of a matrix γ Multiply to another row (column) of the matrix.