Determinants MA265F11Walther - Rhea

Determinants

If A is a square matrix then the determinant function is denoted by det and det(A)

For an instance we have a 2 x 2 matrix denominated A, therefore:

det(A) = [a₁₁ , a₁₂ ; a₂₁ , a₂₂]

As we already defined the determinant function we can write some formulas. The formulas for any 2 x 2 and 3 x 3 matrix will be:

The determinant function for a 2 x 2 matrix is:

$det(A)=\left(\begin{array}{cccc}a11&a12\\a21&a22\end{array}\right)$

= (a₁₁ * a₂₂₎ - (a₁₂ * a₂₁)

The determinant function for a 3 x 3 matrix is:

$det(A)=\left(\begin{array}{cccc}a11&a12&a13\\a21&a22&a23\\a31&a32&a33\end{array}\right)$

= (a₁₁ * a₂₂ * a₃₃) + (a₁₂ * a₂₃ * a₃₁) + (a₁₃ * a₂₁ * a₃₂) - (a₁₂ * a₂₁ * a₃₃) - (a₁₁ * a₂₃ * a₃₂) - (a₁₃ * a₂₂ * a₃₁)