8.C.11: Suppose TEL(V) is invertible. Prove that there exists a polynomial pe P(F) such that T1=p(T). HINT: It is easier to start from the characteristic polynomial for T, rather than the minimal...

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8.C.11: Suppose TEL(V) is invertible. Prove that there exists a polynomial pe P(F) such that<br>T1=p(T).<br>HINT: It is easier to start from the characteristic polynomial for T, rather than the minimal<br>polynomial.<br>

Extracted text: 8.C.11: Suppose TEL(V) is invertible. Prove that there exists a polynomial pe P(F) such that T1=p(T). HINT: It is easier to start from the characteristic polynomial for T, rather than the minimal polynomial.

Jun 05, 2022

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8.C.11: Suppose TEL(V) is invertible. Prove that there exists a polynomial pe P(F) such that T1=p(T). HINT: It is easier to start from the characteristic polynomial for T, rather than the minimal...

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