Exercise 1. Consider R with its Euclidean inner product. Let T,, T2, T3 € L(R²) whose matrices in the standard basis are M(T,) = (6 1). V3 1 -1 V3) M(T;) = (1 i). Find all the T,'s which self-adjoint. Find all the T;'s which normal.

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Exercise 1. Consider R? with its Euclidean inner product. Let T1, T2, T3 € L(R?) whose
matrices in the standard basis are
M(T) = (6 1).
V3 1
-1 V3,
M(T;) = (
M(T¡) =
Find all the T;'s which self-adjoint. Find all the T;'s which normal.
Exercise 2. Prove that
Transcribed Image Text:Exercise 1. Consider R? with its Euclidean inner product. Let T1, T2, T3 € L(R?) whose matrices in the standard basis are M(T) = (6 1). V3 1 -1 V3, M(T;) = ( M(T¡) = Find all the T;'s which self-adjoint. Find all the T;'s which normal. Exercise 2. Prove that
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