- Let f (x) = √x sin( X/12), × 0. D x = ○ Show that f is continuous at x=0. 3 Let f(x) = ( + sin(x2) x +0 ' Lo. X = 6 Show that f is discontinuous at x=0. 9 Let a, b & R, acb. Let f be a real-valued function on [a,b]. 10 (a) Define what we mean by "f is bounded." (b) Assume is bounded and let m = M = inf {f(x): xe [a,b]} sup {f(x): x = [a,b]}. Prove that there exist Xo, & [a,b] such that Хо f(xo) Im and f(x) = M. = น Prove the Intermediate Value theorem for f as in ⑦ that for each yε [m,M] there exists. xe [a, b] such that f(x) = y. Conclude that f([a,b]) = [m, M]. 1 Let f g be continuous real-valued functions with д Common domain D. Prove that f+g are continuous on D. and f.g You may use the sequential definition of continuity from the textbook and assume the analogous results for sequences. (12 Show that if f is continuous on D then If is continuous on D. (-usual definitions!) Give an example where IfI is continuous on [1,1] Xxx but f is not continuous \Vaak on [1,1].

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- Let f (x) = √x sin( X/12), × 0. D x = ○ Show that f is continuous at x=0. 3 Let f(x) = ( + sin(x2) x +0 ' Lo. X = 6 Show that f is discontinuous at x=0. 9 Let a, b & R, acb. Let f be a real-valued function on [a,b]. 10 (a) Define what we mean by "f is bounded." (b) Assume is bounded and let m = M = inf {f(x): xe [a,b]} sup {f(x): x = [a,b]}. Prove that there exist Xo, & [a,b] such that Хо f(xo) Im and f(x) = M. = น Prove the Intermediate Value theorem for f as in ⑦ that for each yε [m,M] there exists. xe [a, b] such that f(x) = y. Conclude that f([a,b]) = [m, M].

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1 Let f g be continuous real-valued functions with д Common domain D. Prove that f+g are continuous on D. and f.g You may use the sequential definition of continuity from the textbook and assume the analogous results for sequences. (12 Show that if f is continuous on D then If is continuous on D. (-usual definitions!) Give an example where IfI is continuous on [1,1] Xxx but f is not continuous \Vaak on [1,1].