Study Resources
Main Menu
by School
by Textbook
by Literature Title
Study Guides
Infographics
by Subject
Expert Tutors
Contributing
Main Menu
Earn Free Access
Upload Documents
Refer Your Friends
Earn Money
Become a Tutor
Apply for Scholarship
For Educators
Log in
Sign up
Find
Study Resources
by School
by Textbook
by Literature Title
Study Guides
Infographics
by Subject
Ask
Expert Tutors
You can ask
!
Earn by
Contributing
Earn Free Access
Learn More >
Upload Documents
Refer Your Friends
Earn Money
Become a Tutor
Apply for Scholarship
Are you an educator?
Log in
Sign up
University of Houston
MATH
MATH 3333
g If V is a compact set and if V is a subset of U then U is compact False 1 2
G if v is a compact set and if v is a subset of u
School
University of Houston
Course Title
MATH 3333
Type
Homework Help
Uploaded By
BarristerStrawKouprey3874
Pages
4
This
preview
shows page
2 - 4
out of
4
pages.
(g) If
V
is a compact set and if
V
is a subset of
U
,
then
U
is compact.
2
5. Let
F
be a collection of compact sets. Prove that
intersectiondisplay
B
is compact.
3
You've reached the end of your free preview.
Want to read all 4 pages?
TERM
Fall '08
PROFESSOR
Staff
TAGS
Math
Share this link with a friend:
Copied!
Other Related Materials
7 pages
b If S has a maximum and a minimum then S is compact False Let S 1 0 1 2 min S
University of Houston
MATH 3333 - Spring 2016
9 pages
Nested Intervals Theorem Let a n b n a n 1 b n 1 a 2 b 2 a 1 b 1 where all a 1
University of Houston
MATH 3333 - Fall 2019
12 pages
Definition 2 Let S be a subset of R A number u R is anupper bound ofS ifs u for
University of Houston
MATH 3333 - Spring 2010
356 pages
Let m i inf f x x x i 1 x i and let ˆ m j inf f x x y j 1 y j Note that if p i
University of Houston
MATH 3333 - Fall 2019
9 pages
Find the interior of each set a 1 n n N b 0 3 3 5 c r Q r 2 d r Q r 2 e0 2 2 4
University of Houston
MATH 3333 - Fall 2013
23 pages
This set is open since it contains none of its boundary points It is not closed
University of Houston
MATH 3333 - Fall 2015