Answer in Real Analysis for Andy #350535

Question #350535

Let $\mu$ be a finite measure defined on the Borel $\sigma$ -field of R. Prove that

there exists a unique closed set F such that $\mu$ (F)= $\mu$ (R) and such that if

F₁is any closed set satisfying $\mu$ (F₁) = $\mu$ (R),then F $\subset$ F₁

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