2. Let fn R→ R where fn(x) where f(x) = x. = r²+nr for all ne N and let f: R → R n (a) Graph fi, f2, f3, and f on the same axes. (b) Prove that fn converges pointwise to f on R. (c) Does fn converge uniformly to f on R? Prove your answer. (d) Does fn converge uniformly to f on [-1, 1]? Prove your answer.

Real Analysis II Kindly find example for guide in photo 2

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2. Let fn: R→ R where fn(x) = ²+n for all n E N and let f: R → R where f(x) = x. n (a) Graph f1, f2, f3, and f on the same axes. (b) Prove that fn converges pointwise to f on R. (c) Does fn converge uniformly to f on R? Prove your answer. (d) Does fn converge uniformly to f on [-1, 1]? Prove your answer.

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ex fn(x) = x+n for all x ₂₂0 (S = [0, 0)) a. Show for ⇒ f phoise S where of 20 b. Show fri f Unif c. Show for * f Chrif. * = x+n Sula - @ Fix xes = [0,00). Show fr (x) - Nokice fn (x) = x+n, So Cem for (x) = Cam 130 7-10 gord | fr. (x) = f(x) | <. goal - √x+n-0 २६ +2>0: 6 Show for f urif. on [0₁2]. fix E₂0 b. By 2 AP. I NE α s-t¼/μ< ¾//2 So R+N <³ <E· Fix x € [0₁2]. N Then X+1 = 2+ (So fn(x) ≤ fn (2)) Assume no N. Then (fr (x) = f(x)) = √x+n x+7-0 2 2 < LE 2+0 2+M Me _X on x+n on [0₁2] X+0 S on S. хоо x+n' fo is micr (^>if) if n is large enough. <E 2 = 2AN = ¾/N CE 스 2+0 Ĉ