2. 416. Prove flx)= x is not uniformly continuous on IK . So f(c1) = a. Similarly, there exists a c2 E (a, b] with f(c2) = B. %3D Definition. Let ECR and f a function with domain E. f is uniformly continuous on E if for all E> 0, there exists a 8(e) > 0 such that for all x, y E E with |x -y| < 8, |f(x) – f(y)| < e. Example. Let ECR be bounded. Then f(x) = x² is uniformly continuous on E.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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46

2.
416. Prove flx)= x is not uniformly continuous on IK
.
Transcribed Image Text:2. 416. Prove flx)= x is not uniformly continuous on IK .
So f(c1) = a. Similarly, there exists a c2 E (a, b] with f(c2) = B.
%3D
Definition. Let ECR and f a function with domain E. f is uniformly continuous on E if for all
E> 0, there exists a 8(e) > 0 such that for all x, y E E with |x -y| < 8, |f(x) – f(y)| < e.
Example. Let ECR be bounded. Then f(x) = x² is uniformly continuous on E.
Transcribed Image Text:So f(c1) = a. Similarly, there exists a c2 E (a, b] with f(c2) = B. %3D Definition. Let ECR and f a function with domain E. f is uniformly continuous on E if for all E> 0, there exists a 8(e) > 0 such that for all x, y E E with |x -y| < 8, |f(x) – f(y)| < e. Example. Let ECR be bounded. Then f(x) = x² is uniformly continuous on E.
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