Find the eigenvectors in the given problem

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chwala
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Homework Statement
See attached.
Relevant Equations
Diagonalization of matrices.
Consider this attachment,

1744681565633.png


In my understanding we have these equations, using P={x,y,z,m], For A.P=0

##24x-12y+4z=0##

##4m=0##

I can see how they got the first one, by letting ##y=0, 24x+4z=0## ⇒##x=1,y=-6## that is clear,

My question is, we can as well have other possibilities other than what is given, correct?

I may as well make ##z=0## to give, ##v_1=\begin{vmatrix}
1 \\
2 \\
0\\
0
\end{vmatrix}##
 
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There are some typos in the original post.

chwala said:
using P={x,y,z,m]
using ## \textbf{P}=\begin{bmatrix}x&y&z&m\end{bmatrix}^T ##

chwala said:
For A.P=0
For ## \textbf{A}\cdot\textbf{P}=-2\cdot\textbf{P} ##

chwala said:
by letting ##y=0, 24x+4z=0## ⇒##x=1,y=-6## that is clear,
by letting ## y=0 ##, ## 24x+4z=0 ## ## \implies ## ## x=1 ##, ## z=-6 ## that is clear,
 
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