cofactor

minor

Compute the \((i,j)\)-cofactor, respectively the \((i,j)\)-minor of 
the matrix \(A\). The \((i,j)\)-cofactor is obtained by multiplying 
the \((i,j)\)-minor by \((-1)^{i+j}\). The \((i,j)\)-minor of \(A\), 
is the determinant of the \((n - 1) \times (n - 1)\) matrix that results 
by deleting the \(i\)-th row and the \(j\)-th column of \(A\).

Solve some conic related problems (intersection of conics with lines and conics, arc length of an ellipse, polar lines, etc.).

Emanuel Huber

RConics

Computations on Conics

cofactor function

<dl><dt>A</dt>
<dd>a square matrix.</dd>
<dt>i</dt>
<dd>the \(i\)-th row.</dd>
<dt>j</dt>
<dd>the \(j\)-th column.</dd></dl>

Arguments

\((i,j)\)-cofactor and \((i,j)\)-minor of a matrix — cofactor

<dl>

<dt>A</dt>
<dd>a square matrix.</dd>


<dt>i</dt>
<dd>the \(i\)-th row.</dd>


<dt>j</dt>
<dd>the \(j\)-th column.</dd>

</dl>

cofactor: \((i,j)\)-cofactor and \((i,j)\)-minor of a matrix

Description

Usage

Value

Arguments

See Also

Examples