Question: Let E be a nonempty Jordan region in R2 and f: E [0, ) be integrable on E. Prove that the volume of Ω =

Let E be a nonempty Jordan region in R2 and f: E †’ [0, ˆž) be integrable on E. Prove that the volume of Ω = {(x, y, z): (x, y) ˆˆ E, 0
Vol(2) f dA.

Vol(2) f dA.

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By Exercise 1215b and Theorem 1224ii we may suppose that E is closed The easiest way to prove this r... View full answer

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