Answer to Question #123125 in Real Analysis for Wachira Ann Wangari

A function f is said to he uniformly continuous is for arbitrary points x and y,

|f(x)-f(y)|< "\\in" when |x-y|<"\\delta" such that "\\delta" is independent of x and y.

Here, f(x)= x² on [0,1]

Let y"\\in" [0,1] such that

for |x-y|<"\\delta"

|f(x)-f(y)|= |x²-y²|

<|(x-y)(x+y)|

<2|x-y|

<2"\\delta"

Choose "\\delta=\\in \/2"

|f(x)-f(y)|<"\\in" for |x-y|<"\\delta" where "\\delta" is independent of x and y.

Hence, f is uniformly continuous on [0,1]