Let V be a finite-dimensional inner product space over F. (a) Prove that the trace of every positive operator in End(V) is non-negative. (b) Suppose T1 e End(V) and T2 e End(V) are positive operators. Prove that tr(TT) > 0.

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4. Let V be a finite-dimensional inner product space over F.
(a) Prove that the trace of every positive operator in End(V) is non-negative.
(b) Suppose T1 e End(V) and T, e End(V) are positive operators. Prove
that tr(T¡T2) > 0.
Transcribed Image Text:4. Let V be a finite-dimensional inner product space over F. (a) Prove that the trace of every positive operator in End(V) is non-negative. (b) Suppose T1 e End(V) and T, e End(V) are positive operators. Prove that tr(T¡T2) > 0.
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