Solve the matrix equation for $a,\ b,\ c,$a, b, c, and $d$d .$\frac{1}{2}$12 $\begin{bmatrix}-6a&-2\\3&14\\-10&-8\end{bmatrix}+\begin{bmatrix}5&3\\-\frac{5}{2}&b-3\\6&-1\end{bmatrix}=\begin{bmatrix}9&4d\\-1&11\\c+4&-5\end{bmatrix}$[−6a −23 14−10 −8]+[5 3−52 b−36 −1]=[9 4d−1 11c+4 −5]$a=$a= , $b=$b= , $c=$c= , $d=$d= Skip to navigationPrevious25, Fully Attempted.26, Fully Attempted.27, Fully Attempted.28, Fully Attempted.29, Fully Attempted.30, Unattempted. Flagged31, Unattempted.32, Unattempted.33, Unattempted.34, Unattempted.Next
Question
Solve the matrix equation for a, b, c, and d .12 [−6a −23 14−10 −8]+[5 3−52 b−36 −1]=[9 4d−1 11c+4 −5]a= , b= , c= , d= Skip to navigationPrevious25, Fully Attempted.26, Fully Attempted.27, Fully Attempted.28, Fully Attempted.29, Fully Attempted.30, Unattempted. Flagged31, Unattempted.32, Unattempted.33, Unattempted.34, Unattempted.Next
Solution
The given matrix equation is:
First, we can distribute the to the first matrix:
Next, we can add the two matrices on the left side of the equation:
Simplify the left side:
Now, we can equate the corresponding elements in the two matrices to solve for , , , and :
For :
For :
For :
For :
So, the solution is , , , and .
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Solve the matrix equation for $a,\ b,\ c,$a, b, c, and $d$d .$\frac{1}{2}$12 $\begin{bmatrix}-6a&-2\\3&14\\-10&-8\end{bmatrix}+\begin{bmatrix}5&3\\-\frac{5}{2}&b-3\\6&-1\end{bmatrix}=\begin{bmatrix}9&4d\\-1&11\\c+4&-5\end{bmatrix}$[−6a −23 14−10 −8]+[5 3−52 b−36 −1]=[9 4d−1 11c+4 −5]$a=$a= , $b=$b= , $c=$c= , $d=$d= Skip to navigationPrevious25, Fully Attempted.26, Fully Attempted.27, Fully Attempted.28, Fully Attempted.29, Fully Attempted.30, Unattempted. Flagged31, Unattempted.32, Unattempted.33, Unattempted.34, Unattempted.Next
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