Answer to Question #160019 in Real Analysis for Luna

Which of the following functions is uniformly continuous on the given set?

a) f(x)= x³ on [1,infinity)

b) f(x)= x³ on [1,5]

c) f(x)=1/x on (0,1)

d) f(x)=1/x on [0,1]

e) All of the above

A function is said to uniformly continuous a set say, S, for every "\\epsilon>0" , "\\exists" "\\delta>0" such that "x,a\\isin S" and "\\mid x-a\\mid<\\delta" then "\\mid f(x)-f(a)\\mid <\\epsilon"

Also a function is said to be uniformly continuous A function is said to uniformly continuous a set say, S, for every "\\epsilon>0" , "\\exists" "\\delta>0" such that "x,a\\isin S" and "\\mid x-a\\mid<\\delta" then "\\mid f(x)-f(a)\\mid \\ \\ge \\epsilon"

(c) d) f(x)=1/x on (0,1)

suppose f is uniformly continuous

then pick "\\epsilon=1" then "\\exists" "\\delta>0: \\forall" "x,a \\isin (0,1)" with "\\mid x-a\\mid<\\delta"

the "\\mid {1 \\over x} - {1 \\over a}\\mid<\\epsilon"

Pick x(0,1) with "x<\\delta" then set "a = {x \\over 2}"

"\\mid x-a\\mid< \\mid x- {x \\over 2}\\mid=\\mid {x \\over2}\\mid< {\\delta \\over 2}"

"\\mid {1 \\over x} - {1 \\over a}\\mid=\\mid {1 \\over x} - {1 \\over{x \\over 2}}\\mid=\\mid {1 \\over x} - {2 \\over x}\\mid=\\mid -{1 \\over x} \\mid={1 \\over x}"

Since x is in the interval (0,1) it implies that "{1 \\over x}>1"

therefore the function is not uniformly continuous

d) f(x)=1/x on [0,1]

this has the same prove as (c) it is also not not uniformly continuous

b) f(x)= x³ on [1,5]

"\\epsilon >0" then Let "\\delta={\\epsilon \\over 108}"

Supppose "\\mid x-a\\mid< \\delta" then "\\mid f(x) -f(a)\\mid =\\mid x^3 - a^3\\mid = \\mid x-a\\mid\\mid x^2+xa+a^2\\mid<\\epsilon"

"<{ \\epsilon \\over 108}.108 = \\epsilon"

"\\therefore" the function uniformly continuous

a) f(x)= x³ on [1,infinity)