Solve Eigenvalue Problem A: Proving (λI-A)=0 with Simetric Matrices

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nhrock3
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A is a simetric metrices nxn. so [tex]v\in R^n[/tex] and [tex]v\neq 0[/tex]

so [tex](\lambda I -A)^2=0[/tex] for some [tex]\lambda[/tex]



prove that for the same [tex]v[/tex] [tex](\lambda I -A)=0[/tex]



how i tried to solve it:

i just collected data from the given.

simetric matrices is diagonizable.

[tex]B=(\lambda I -A)[/tex]

we were given that [tex]B^2v=0[/tex]

so [tex]B^2v \bullet v=0[/tex] (dot product is also v)

so v is orthogonal to [tex]B^2v[/tex]



what to do now?
 
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have u tried reading your own post? O.o
 
ardie said:
have u tried reading your own post? O.o

in latex not working here don't know why

yes i have tried to read this

even without the [tex]its very simple latex[/tex]
 
ok i can read it now, so you are given that
nhrock3 said:
A is a simetric metrices nxn. so [tex]v\in R^n[/tex] and [tex]v\neq 0[/tex]
what is v?
so you are given this:
nhrock3 said:
so [tex](\lambda I -A)^2=0[/tex] for some [tex]\lambda[/tex]
and you need to prove this?
nhrock3 said:
prove that for the same [tex]v[/tex] [tex](\lambda I -A)=0[/tex]