3. Let E be a bounded subset of R such that E=UEj. Provethat if the E, are of Lebesgue measure zero, then E is Lebesguemeasurable and m(E) = 0.4. Let f [a, b] → R be integrable. Define F la hl→ R by

Given: E is a bounded subset of ℝ such that E=∪j=1∞Ej. Every Ej are of Lebesgue measure zero. To…

Answered: 3. Let E be a bounded subset of R such…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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11 Prove that if A C R and |A| > 0, then there exists a subset of A that is not Lebesgue measurable. 12 Suppose b < c and A C (b,c). Prove that A is Lebesgue measurable if and only if |A| + |(b,c) \ A| = c – b. 13 Suppose AC R. Prove that A is Lebesgue measurable if and only if |(-n,n) N A| + |(-n,n) \ A| = 2n
2
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I need help with #4.
Q5. Let (X, B(R), µ) be a Borel measure space. Suppose that {An = ["+1, 4n-1]} be a family of elements of B(R). Show that A1 C A2 C A3.... C An C ...,then evaluate µ(U1[+1, 4n-1]). 1 n=1
A set of real numbers D is called dense if and only if every open interval contains at least one point of D. Assume a set E and its complement E = {x € R : x ¢ E} are both dense. Let f : [0, 1] → R be given by f(x) = 1 if x E E and f(x) = 0 if x ¢ E. (Thus f(x) = XE (x) for x E [0, 1].) Prove that f is not integrable on [0, 1].
Show the following result: Theorem. Assume that f: X → [0, 0] is µ-measurable. Then there exist u-measurable sets {Ak}=1 in X such that 1 f = k=1
Let E and F be measurable sets such that m(EAF) = 0 (where m(EAF) = (E – F) U (F – E)). If ƒ is a measurable function on EUF such that it is integrable on E, then show that f, f = Sr f. E
(c) Show that any countable subset of R is measurable and of Lebesgue measure zero. (d) Use the previous items to justify that if a < b then the interval (a, b) is not countable. (e) Suppose that E is measurable, ECB CR and m* (B) Prove that B is measurable. = m* (E) < ∞.
Let E be a measurable subset of (0, 1) and E+y for y E [0, 1) be a translation modulo 1 of E. Taking into account that under above-mentioned assumption the set E+y is measurable and m ( E +y) = mE, construct nonmeasurable set by a suitable choice of E.

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3. Let E be a bounded subset of R such that E = U₁1 Ej. Prove that if the E, are of Lebesgue measure zero, then E is Lebesgue measurable and m(E) = 0.