hw8 - A then m x ∈ A f x ≥ c ≤ 1 c Z A fdm(b Show...

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Math 318 HW #8 Due 5:00 PM Thursday, April 7 Reading: § 21–27. Problems: 1. (a) Prove Chebyshev’s inequality, which says that if f is nonnegative and measurable on the bounded, measurable set
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Unformatted text preview: A , then m { x ∈ A : f ( x ) ≥ c } ≤ 1 c Z A fdm. (b) Show that if R A | f | dm = 0, then f = 0 a.e. on A . 2. Exercise 26.24. 3. Exercise 26.36. 1...
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This note was uploaded on 08/20/2011 for the course MATH 318 taught by Professor Staff during the Spring '08 term at Haverford.

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