det(\left(\begin{matrix}1&2&3\\1&2&3\\4&5&6\end{matrix}\right))

Find the determinant of the matrix using the method of diagonals.

\left(\begin{matrix}1&2&3&1&2\\1&2&3&1&2\\4&5&6&4&5\end{matrix}\right)

Extend the original matrix by repeating the first two columns as the fourth and fifth columns.

2\times 6+2\times 3\times 4+3\times 5=51

Starting at the upper left entry, multiply down along the diagonals, and add the resulting products.

4\times 2\times 3+5\times 3+6\times 2=51

Starting at the lower left entry, multiply up along the diagonals, and add the resulting products.

51-51

Subtract the sum of the upward diagonal products from the sum of the downward diagonal products.

0

Subtract 51 from 51.

det(\left(\begin{matrix}1&2&3\\1&2&3\\4&5&6\end{matrix}\right))

Find the determinant of the matrix using the method of expansion by minors (also known as expansion by cofactors).

det(\left(\begin{matrix}2&3\\5&6\end{matrix}\right))-2det(\left(\begin{matrix}1&3\\4&6\end{matrix}\right))+3det(\left(\begin{matrix}1&2\\4&5\end{matrix}\right))

To expand by minors, multiply each element of the first row by its minor, which is the determinant of the 2\times 2 matrix created by deleting the row and column containing that element, then multiply by the element's position sign.

2\times 6-5\times 3-2\left(6-4\times 3\right)+3\left(5-4\times 2\right)

For the 2\times 2 matrix \left(\begin{matrix}a&b\\c&d\end{matrix}\right), the determinant is ad-bc.

-3-2\left(-6\right)+3\left(-3\right)

Simplify.

0

Add the terms to obtain the final result.