Let S and T be linear operators on V and assume that ST =TS (function composition). (a) Show that im(S) and ker S are T -invariant. (b) If U is T -invariant, show that S(U)={S(x):x e U} is T -invariant.

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[Linear Algebra] How do you prove this?

Let S and T be linear operators on V and assume that ST
= TS (function composition).
(a)
Show that im(S) and ker S are T -invariant.
(b)
If U is T -invariant, show that S(U)= {S(x):x E U} is T -invariant.
Transcribed Image Text:Let S and T be linear operators on V and assume that ST = TS (function composition). (a) Show that im(S) and ker S are T -invariant. (b) If U is T -invariant, show that S(U)= {S(x):x E U} is T -invariant.
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