*37. Let f be a bounded function on [a, b] and let P be a partition of [a, b]. Let M; and m; have their usual meanings, and let M, and m' have the corresponding meanings for the function |f|. (a) Prove that M,' – m²' < M¡ - mị. (b) Prove that if f is integrable on [a, b], then so is |f]. (c) Prove that if f and g are integrable on [a, b], then so are max(f, g) and min(f, g). (d) Prove that f is integrable on [a, b] if and only if its "positive part" max(f, 0) and its “negative part" min(f, 0) are integrable on [a, b].

Please solve only d part of question 37

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8:01 AM O VOLTE ile 4 17% *32. Recall, from Problem 14, that f 2 0 if f(x) > 0 for all x in [a, b]. (a) Give an example where f(x) > 0 for all x, and f(x) > 0 for some x in If = 0. [а, b), and (b) Suppose f(x) 2 0 for all x in [a, b] and f is continuous at xo in [a, b] and f(xo) > 0. Prove that °f > 0. Hint: It suffices to find one lower sum L(f, P) which is positive. (c) Suppose f is integrable on [a, b] and f(x) > 0 for all x in [a, b]. Prove that "ƒ > 0. Hint: You will need Problem 31 ; indeed that was one reason for including Problem 31. (a) Suppose that f is continuous on [a, b] and fg = 0 for all con- tinuous functions g on [a, b]. Prove that f = 0. (This is easy; there is an obvious g to choose.) (b) Suppose f is continuous on [a, b] and that /° fg tinuous functions g on [a, b] which satisfy the extra conditions g(a) = g(b) = 0. Prove that ƒ = 0. (This innocent looking fact is an important lemma in the calculus of variations; see the Suggested Reading for references.) Hint: Derive a contradiction from the assumption f(xo) > 0 or f(xo) < 0; the g you pick will depend on the behavior of f near xo. *33. = 0 for those con- 34. Let f(x) = x for x rational and f(x) = 0 for x irrational. (a) Compute L(f, P) for all partitions P of [0, 1]. (b) Find inf {U(f, P): P a partition of [0, 1]}. *35. Let f(x) = 0 for irrational x, and 1/q if x = p/q in lowest terms. Show that f is integrable on [0, 1] and that f = 0. (Every lower sum is clearly 0; you must figure out how to make upper sums small.) *36. Find two functions f and g which are integrable, but whose composition gof is not. Hint: Problem 35 is relevant. *37. Let f be a bounded function on [a, b] and let P be a partition of [a, b]. Let M; and m; have their usual meanings, and let M,' and m' have the corresponding meanings for the function fl. (а) Prove that M; — m, < M; — т;. (b) Prove that if f is integrable on [a, b], then so is |f]. (c) Prove that if f and g are integrable on [a, b], then so are max(f, g) and min(f, g). (d) Prove that f is integrable on [a, b] if and only if its "positive part" max(f, 0) and its “negative part" min(f, 0) are integrable on [a, b]. 38. Prove that if f is integrable on [a, b], then Hint: Thie fellewa