(6) F $$ M=\left|\begin{array}{cc}-1 & -5 \ 3 & 2\end{array} ight| $$ and $$ m=\left(\left.\begin{array}{ll}0 & 4 \ 6 & 3\end{array} ight vert\, ight. $$ find $$ \left|\begin{array}{ll}3 m-A\end{array} ight| $$

Question

(6) F $$ M=\left|\begin{array}{cc}-1 & -5 \ 3 & 2\end{array}ight| $$ and $$ m=\left(\left.\begin{array}{ll}0 & 4 \ 6 & 3\end{array} ightvert\,ight. $$ find $$ \left|\begin{array}{ll}3 m-A\end{array}ight| $$

UpStudy AI · Accepted Answer

Let 
$$
A=\begin{pmatrix}-1 & -5\3 & 2\end{pmatrix}\quad\text{and}\quad m=\begin{pmatrix}0 & 4\6 & 3\end{pmatrix}.
$$
We want to compute
$$
\left|\,3m-A\,\right|.
$$

**Step 1. Compute $$3m$$.**

Multiply each entry of $$m$$ by 3:
$$
3m = 3\begin{pmatrix}0 & 4\6 & 3\end{pmatrix} = \begin{pmatrix}3\cdot 0 & 3\cdot 4\3\cdot 6 & 3\cdot 3\end{pmatrix} = \begin{pmatrix}0 & 12\18 & 9\end{pmatrix}.
$$

**Step 2. Compute $$3m-A$$.**

Subtract the corresponding entries of $$A$$ from $$3m$$:
$$
3m-A = \begin{pmatrix}0 & 12\18 & 9\end{pmatrix} - \begin{pmatrix}-1 & -5\3 & 2\end{pmatrix} = \begin{pmatrix}0-(-1) & 12-(-5)\18-3 & 9-2\end{pmatrix}.
$$
Thus,
$$
3m-A = \begin{pmatrix}1 & 17\15 & 7\end{pmatrix}.
$$

**Step 3. Compute the determinant of $$3m-A$$.**

For a $$2\times 2$$ matrix 
$$
\begin{pmatrix}a & b\c & d\end{pmatrix},
$$
the determinant is given by $$ad-bc$$. Here, we have:
$$
\left|3m-A\right| = 1\cdot 7 - 17\cdot 15.
$$
Calculate:
$$
1\cdot 7 = 7,\quad 17\cdot 15 = 255.
$$
Thus,
$$
\left|3m-A\right| = 7 - 255 = -248.
$$

The final answer is 
$$
\boxed{-248}.
$$
The determinant of $$3m - A$$ is $$-248$$.

(6) F \( M=\left|\begin{array}{cc}-1 & -5 \\ 3 & 2\end{array}\right| \) and \( m=\left(\left.\begin{array}{ll}0 & 4 \\ 6 & 3\end{array} \right\rvert\,\right. \) find \( \left|\begin{array}{ll}3 m-A\end{array}\right| \)

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