Difference between revisions of "Invert Command"
From GeoGebra Manual
m (command syntax: changed [ ] into ( )) |
m |
||
Line 12: | Line 12: | ||
::{{example|1=<div>Both <code><nowiki>Invert(PartialFractions((x + 1) / (x + 2)))</nowiki></code> and <code><nowiki>Invert(CompleteSquare(x^2 + 2 x + 1))</nowiki></code> yield the inverse functions.</div>}}}} | ::{{example|1=<div>Both <code><nowiki>Invert(PartialFractions((x + 1) / (x + 2)))</nowiki></code> and <code><nowiki>Invert(CompleteSquare(x^2 + 2 x + 1))</nowiki></code> yield the inverse functions.</div>}}}} | ||
:{{note|1=In the [[File:Menu view cas.svg|link=|16px]] [[CAS_View|CAS View]], the command also works if the function contains more than one ''x''.}} | :{{note|1=In the [[File:Menu view cas.svg|link=|16px]] [[CAS_View|CAS View]], the command also works if the function contains more than one ''x''.}} | ||
+ | {{note| 1=<div> | ||
+ | * See also [[Eigenvalues Command]], [[Eigenvectors Command]], [[SVD Command]], [[Transpose Command]], [[JordanDiagonalization Command]] | ||
+ | </div>}} |
Revision as of 15:07, 26 June 2018
- Invert( <Matrix> )
- Inverts the given matrix.
- Example:
Invert({{1, 2}, {3, 4}})
yields \begin{pmatrix}-2 & 1\\1.5 & -0.5\end{pmatrix}, the inverse matrix of \begin{pmatrix}1 & 2\\3 & 4\end{pmatrix}.
- Note: In the CAS View undefined variables are allowed too.
- Example:
Invert({{a, b}, {c, d}})
yields \begin{pmatrix}\frac{d}{ad- bc} & \frac{-b}{ad- bc}\\\frac{-c}{ad- bc}& \frac{a}{ ad- bc}\end{pmatrix}, the inverse matrix of \begin{pmatrix}a & b\\c & d\end{pmatrix}.
- Invert( <Function> )
- Gives the inverse of the function.
- Example:
Invert(sin(x))
yields asin(x).
- Note:The function must contain just one x and no account is taken of domain or range, for example for f(x) = x^2 or f(x) = sin(x).
If there is more than one x in the function another command might help you:- Example:Both
Invert(PartialFractions((x + 1) / (x + 2)))
andInvert(CompleteSquare(x^2 + 2 x + 1))
yield the inverse functions.
Note: In the CAS View, the command also works if the function contains more than one x.