How Do You Determine the Orthogonal Complement in a Linear Algebra Problem?

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Felafel
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Homework Statement


Write a selfadjoint endomorphism ## f : E^3 → E^3## such that ##ker(f ) =
L((1, 2, 1)) ## and ## λ_1 = 1, λ_2 = 2## are eigenvalues of f


The Attempt at a Solution



I know ##λ_3=0## because ́##ker(f ) ≠ {(0, 0, 0)}## and ## (ker(f ))^⊥ = (V0 )^⊥ = V1 ⊕ V2 ## due to the definition of selfadjoint.
Then, my book gives the solution:
##(ker(f ))^⊥ = (L((1, 2, 1))^⊥ = {(α, β, −α − 2β) | α, β ∈ R} = L((1, 0, −1), (a, b, c))##
but i don't understand where did it get that (α, β, −α − 2β) from.
Could you please help me? thanks in advance :)
 
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Felafel said:

Homework Statement


Write a selfadjoint endomorphism ## f : E^3 → E^3## such that ##ker(f ) =
L((1, 2, 1)) ## and ## λ_1 = 1, λ_2 = 2## are eigenvalues of f

The Attempt at a Solution



I know ##λ_3=0## because ́##ker(f ) ≠ {(0, 0, 0)}## and ## (ker(f ))^⊥ = (V0 )^⊥ = V1 ⊕ V2 ## due to the definition of selfadjoint.
Then, my book gives the solution:
##(ker(f ))^⊥ = (L((1, 2, 1))^⊥ = {(α, β, −α − 2β) | α, β ∈ R} = L((1, 0, −1), (a, b, c))##
but i don't understand where did it get that (α, β, −α − 2β) from.
Could you please help me? thanks in advance :)

(α, β, −α − 2β) is the subspace orthogonal to (1,2,1). You know that the eigenvectors of a self adjoint operator corresponding to different eigenvectors are orthogonal, yes? So you'll have to pick the other two eigenvectors from that space.
 
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