ext_83566 (
pozorvlak.livejournal.com
) wrote
in
pozorvlak
2007-04-10 11:48 am (UTC)
no subject
*ahem*
The set R of real numbers has a supremum of every subset
that is bounded above
. There is no supremum for the integers, for instance.
That is all.
(
8 comments
)
Post a comment in response:
From:
Anonymous
This account has disabled anonymous posting.
OpenID
Identity URL:
Log in?
Dreamwidth account
Account name
Password
Log in?
If you don't have an account you can
create one now
.
Subject
HTML doesn't work in the subject.
Formatting type
Casual HTML
Markdown
Raw HTML
Rich Text Editor
Message
[
Home
|
Post Entry
|
Log in
|
Search
|
Browse Options
|
Site Map
]
no subject
The set R of real numbers has a supremum of every subset that is bounded above. There is no supremum for the integers, for instance.
That is all.