6. Below are several statements about compact sets; some are true and some are not. Prove the true ones, and give a counterexample for the false ones. (a) Let Kn be a compact set for each n E N. Then K = U Kn must be compact. n=0 (b) Let F be a compact set for each 2 E A. Then F = O Fa must be compact. λΕΛ (c) Let A be an arbitrary subset of R, and let K be compact. Then ANK is compact. (d) Let K be compact and F be closed. Then K F = {x€K|x ¢ F } is open.
6. Below are several statements about compact sets; some are true and some are not. Prove the true ones, and give a counterexample for the false ones. (a) Let Kn be a compact set for each n E N. Then K = U Kn must be compact. n=0 (b) Let F be a compact set for each 2 E A. Then F = O Fa must be compact. λΕΛ (c) Let A be an arbitrary subset of R, and let K be compact. Then ANK is compact. (d) Let K be compact and F be closed. Then K F = {x€K|x ¢ F } is open.
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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pls solve all parts (i)-(iv) with the proper explanation I'll give you multiple likes
![6. Below are several statements about compact sets; some are true and some are not. Prove the
true ones, and give a counterexample for the false ones.
(a) Let Kn be a compact set for each n E N. Then K = |U Kn must be compact.
n=0
(b) Let F, be a compact set for each 2 E A. Then F = O F, must be compact.
(c) Let A be an arbitrary subset of R, and let K be compact. Then ANK is compact.
(d) Let K be compact and F be closed. Then K F = {x€K|x ¢F} is open.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F87953db1-1bba-4ab8-9009-7490122f49be%2Fa723d9b1-41ce-4102-8a26-41e832ec8a78%2Ftjszvpv_processed.png&w=3840&q=75)
Transcribed Image Text:6. Below are several statements about compact sets; some are true and some are not. Prove the
true ones, and give a counterexample for the false ones.
(a) Let Kn be a compact set for each n E N. Then K = |U Kn must be compact.
n=0
(b) Let F, be a compact set for each 2 E A. Then F = O F, must be compact.
(c) Let A be an arbitrary subset of R, and let K be compact. Then ANK is compact.
(d) Let K be compact and F be closed. Then K F = {x€K|x ¢F} is open.
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