For each linear operator t on v find the eigenvalues of t and an ordered basis such that [t]_b is a diagonal matrix
(e) v = p2 (r) and t (f (x))

Answers

the answer is d

step-by-step explanation:

Ineed show the photo because i need more information

It seems like this question is not clear enough but it probably is like the one in the pictures.  :)

Step-by-step explanation:

Look at the pictures.


For each linear operator t on v find the eigenvalues of t and an ordered basis such that [t]_b is a
For each linear operator t on v find the eigenvalues of t and an ordered basis such that [t]_b is a
For each linear operator t on v find the eigenvalues of t and an ordered basis such that [t]_b is a
For each linear operator t on v find the eigenvalues of t and an ordered basis such that [t]_b is a
For each linear operator t on v find the eigenvalues of t and an ordered basis such that [t]_b is a


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