A standard matrix is given: \(A=\begin{bmatrix} 0 & -1 & 3

Haialarmz6

Haialarmz6

Answered question

2022-01-31

A standard matrix is given:
A=[013113225]
representing the linear transformation L:R3R3.
How to find L(2, 3, 1)?

Answer & Explanation

basgrwthej

basgrwthej

Beginner2022-02-01Added 13 answers

Step 1
Assuming that this matrix is given with respect to the standard basis (e1,e2,e3), then the columns of the matrix are just (L(e1),L(e2),L(e3)), respectively. Thus,
L(e1)=(0,1,2),L(e2)=(1,1,2),L(e3)=(3,3,5).
Hence,
L(2,3,1)=L(2e13e2+e3)=2L(e1)3L(e2)+L(e3)=(6,4,7)
Alternatively, for any vector vR3, the following is true:
Lv=Av, where
v=(xyz).
Emilie Booker

Emilie Booker

Beginner2022-02-02Added 14 answers

Step 1
The way I think of putting a vector through a matrix is you push it down from the top then add across the sides. I will show you this approach in a general way.
[abcdefghi][xyz][axbyczdxeyfzgxhyiz][ax+by+czdx+ey+fzgx+hy+iz]
This gives you the anwser:
[abcdefghi][xyz]=[ax+by+czdx+ey+fzgx+hy+iz]
Now for your problem plug in your values and multiply then add.

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