(b) A = [1,2) CR+. (1) (ii) By using limit criterion. Converges uniformly on By using Cauchy criterion for uniform convergence.

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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B i & ii

 

n
For each n EN, consider x = - with x ER+. Define the sequence {gn} by
X
8n(x) = f(xn) =
(a) Find the limit function of {gn}, if exists.
(b)
A = [1,2) CR+.
(1)
(ii)
1
x²
By using limit criterion.
XER+.
Converges uniformly on
By using Cauchy criterion for uniform convergence.
Transcribed Image Text:n For each n EN, consider x = - with x ER+. Define the sequence {gn} by X 8n(x) = f(xn) = (a) Find the limit function of {gn}, if exists. (b) A = [1,2) CR+. (1) (ii) 1 x² By using limit criterion. XER+. Converges uniformly on By using Cauchy criterion for uniform convergence.
Let the function f: R→ R be defined by
1
x2,
f(x) =
=
0,
x=0,
x = 0.
Transcribed Image Text:Let the function f: R→ R be defined by 1 x2, f(x) = = 0, x=0, x = 0.
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