Chapter 11 - Systems of Equations and Inequalities - 11.3 Systems of Linear Equations: Determinants - 11.3 Assess Your Understanding - Page 742: 43

$-4$.

We know that for determinants: (i) if two rows/columns were interchanged, the value of the original determinant gets multiplied by $-1$ (ii) if any row/column was multiplied by a constant $k$, the value of the original determinant gets multiplied by $k$ (iii) if any row/column was multiplied by a constant $k$ ($k\ne0$), and then this is added to another row/column, the value of the original determinant remains unchanged Hence here because row $1$ and $3$ were interchanged, according to Rule (i) the value of the determinant becomes $-4$.