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(5) Let f: [0, 1 R. We say that f is Hölder continuous of order a e (0,1) if \f(x) -- f(y)| . , y sup [0, 1] with 2 # 1£l\c°

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Date d Cf,a) -= gup 31 f(«)-a r)1: xe fo, 117 l)- -fa)+ (4) t : 39E Do17 dg TR-y/ gup lx)- (x) (: C Co,} Sup 3 )- (30)-a)Nze0n cr Lo, 1ゴ (b) let fn3 bea Canehy SeqKenee Cfmtn)= sup § jSm(x)-fx)1 xeto,1}+ ep m )-3 Fm{g) - 3 Sn (R)+ fn(a)1 natotal MUm

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