Problems for Chapter 3.

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1 Problems for Chapter 3. Let A denote a nonempty set of reals. The complement of A, denoted by A, or A C is the set of all points not in A. We say that belongs to the interior of A, Int A, if there eists a positive such that N A. We say that belongs to the boundary of A, A, if for every positive the neighborhood N contains points of A and points of A c. We say that is an isolated point of A if there eists a positive such that N contains no points of A other than. A set A is said to be open if all the points of A are interior points. A set A is said to be closed if A C is open. 1. Find all the interior points, isolated points, accumulation points and boundary points for a.,, and b. a, b and a, b c. with removed d. with removed 2. Give an eample of: a. A set with no accumulation points. b. A set with infinitely many accumulation points, none of which belong to the set. c. A set that contains some, but not all, of its accumulation points 3. Give an eample of a set with the following properties or eplain why no such set can eist: a. a set with no accumulation points and no isolated points b. a set with no interior points and no isolated points c. a set with no boundary points and no isolated points 4. Is every interior point of A an accumulation point? Is every accumulation point of A an interior point? 5. Let be an interior point of A and suppose n is a sequence of points, not necessarily in A, but converging to. Show that there eists an integer N such that n A n N 6. Prove the following statements a. if G n is open for every n, then G n is open n b. F is closed if and only if F contains all its boundary points 1

2 7. Find the interior and boundary for each of the following sets. a. A 1 n : n N b. A Q : Use both the definition of limit and a sequence approach to establish lim Use both the definition of limit and a sequence approach to establish lim Use both the definition of limit and a sequence approach to establish lim 1/ Show that the limit: lim 12. Show that the limit: lim sin 1 2 does not eist does not eist 13. Show that the limit: lim cos 1 does not eist 14. Show that the limit: lim 1 does not eist 15. Prove that if a n 0 n and a n A, then a n A Find lim 17. Find lim Find lim or show the limit does not eist or show the limit does not eist or show the limit does not eist 19. Find lim sin 1 or show the limit does not eist 20. Find lim sin 1 or show the limit does not eist 21. Find lim 2 cos 1 or show the limit does not eist 22. Find lim cos 1 2 or show the limit does not eist 23. Given that sin for 0, find lim 24. Given that sin for 0, find lim sin sin 25. Given that cos 1 for 0, find lim cos 1 2

3 26. Given that cos 1 for 0, find lim cos Prove that f is continuous at all values of. Does 0 require special attention? 28. Let f sin. Can f 0 be defined in such a way that f is continuous for all? 29. For each of the following functions, find the points where they are discontinuous or give a reason they are continuous for all : a b. sin 2 cos c. cos 1 d The functions f and g are each undefined at two points. Are these singularities removable? 31. If F f g h, G g 2h and H 2g h are all continuous on, then is it the case that f, g, and h are also all continuous on. 32. Give an eample of functions f and g that are both discontinuous at c but i f g is continuous at c ii fg is continuous at c. 33. Suppose f is continuous for all and that f 0 for every rational. Show that f 0 for all. 34. If f and g are continuous on and f p q g p q for all non-zero integers, p, q, then is it true that f g for all?. 35. Suppose f 2 if rational 3 if irrational. Then find all the points where f is continuous. 36. Suppose f is defined on 0, 1 and that f 1 for all 0, 1. If lim f does not eist then show there must be sequences a n, b n converging to 0 for which the sequences f a n and f b n converge but to different limits. 37. Suppose f is continuous at all and let P : f 0. If c P then show that there is an 0 such that N c P. 38. Suppose f and g are continuous for all and let S : f g. If c is an accumulation point for S, show that c S. 39. If f and g are continuous on 0, 1 and f g for 0 1 then does there eist a p 0 such that f g p for If f and g are continuous on 0, 1 and f g for 0 1 then there does eist a p 0 such that f g p for

4 41. Let f 1 if 0 1, if 1 2 g 1 if if 0 Eplain how you would prove the continuity or lack of continuity for these two functions.i.e., in each case, cite a theorem which supports your answer. 42. Let f and let 2 1 A f 1 8 rng f M f 1. 2 y. 4 dom f. In answering the following questions, give reasons i.e., cite theorems or give eamples for your answers a. Is A closed? Is it bounded? b. Find the sup and the inf for A. Do these belong to the set? c. Find the set of all y that belong to A d. Find the set of all that belong to M e. Either prove that M is closed or show that it is not closed Suppose A is an infinite subset of the reals and that p is the LUB for A but p does not belong to A. Tell whether the following statements are true or false and give coherent reasons for your answer. a. p is an accumulation point for A b. there is a largest value in A such that p. 44. State the compact range (etreme value, intermediate value) theorem. Give an eample where one of the hypotheses is not satisfied and the conclusion then fails to hold. 45. State the persistance of sign theorem Eplain the use of this theorem to prove the following result:: If f and g are continuous on and f g for each rational, then f g for all real 46. a. State a condition on f, and D that implies that f is uniformly continuous on D b. State a condition on f, that implies that f is uniformly continuous on a, b c. Is f 1 uniformly continuous on 0,? Use the intermediate value theorem to tell how many real zeroes eist for the function f sin cos as well as to determine the approimate location of these zeroes. 4

5 48. Suppose f and g are continuous on, and that f g at every rational value for. Use the persistence of sign result to show that f and g must be equal at every real value. 49. Given that the function f sin 1 is continuous on 0, 1, is f uniformly continuous on 0, 1? Given that the function g is continuous on 0, 1, is g uniformly continuous on 0, 1? 50. Let A denote the set of all the rational numbers between 0 and 1. a. Is this a closed set? b. Is it an open set? c. What are the accumulation points (boundary points, interior points) for A? 51. For each of the following statements, first, tell whether the following are true or false, then state a theorem which shows a statement is true or give a counter eample that shows it is false. a. If f is continuous and injective on a, b and f a f b, then for all, y a, b, y if and only if f f y. b. There eist sequences a n which are bounded but which contain no convergent subsequences. c. For every real value,, there is a sequence of rational numbers that converges to d. If a n in D converges to c D, and f a n converges to f c, then f must be continuous at c. e. If F is continuous on D where F f g, then f and g are continuous on D. 52. Use the intermediate value theorem to tell how many real zeroes eist for the function f sin cos as well as to determine the approimate location of these zeroes. 53. Use the intermediate value theorem to tell how many positive zeroes eist for the function f sin 1 as well as to determine the approimate location of these zeroes. 54. Tell whether the following statements are true or false and cite a theorem to justify your answer: a. If f is continuous and monotone on a, b then, y a, b, y implies f f y. b. If a n is a monotone sequence that does not converge then 1 an must tend to zero as n tends to infinity.. 5

6 c. If f is continuous on, and f 0 if is rational, then f 0 at every real. d. If A is an infinite subset of the reals and p sup A but p is not in A then there is no largest in A such that p. e. If F is continuous on D where F 5f 4g, then f and g are continuous on D. 55. Let f sin. Can f 0 be defined in such a way that f is uniformly continuous on 0, 1? Is f uniformly continuous on 0,? 6

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