Drexel dragonThe Math ForumDonate to the Math Forum



Search All of the Math Forum:

Views expressed in these public forums are not endorsed by Drexel University or The Math Forum.


Math Forum » Discussions » sci.math.* » sci.math.independent

Topic: Matheology § 275
Replies: 7   Last Post: Jun 4, 2013 1:45 PM

Advanced Search

Back to Topic List Back to Topic List Jump to Tree View Jump to Tree View   Messages: [ Previous | Next ]
Scott Berg

Posts: 1,439
Registered: 12/12/04
Re: Matheology � 275
Posted: Jun 4, 2013 11:01 AM
  Click to see the message monospaced in plain text Plain Text   Click to reply to this topic Reply


"Roland Franzius" <roland.franzius@uos.de> wrote in message
news:kok1sq$q6m$1@newsserver.rrzn.uni-hannover.de...
> Am 04.06.2013 07:06, schrieb AMiews:
>> "Virgil" <virgil@ligriv.com> wrote in message
>> news:virgil-7EF741.13432231052013@BIGNEWS.USENETMONSTER.COM...

>>> In article
>>> <c6dcf9d4-0bc6-48fd-8b83-e2c3d240ce92@h5g2000vbg.googlegroups.com>,
>>> WM <mueckenh@rz.fh-augsburg.de> wrote:
>>>

>>>> WMytheology § 275
>>>>
>>>> The term actual infinite is not a term of set theory

>>>
>>> But the terms "actual infinity" and "actually infinite" are.

>>
>> which leaves the term "actually infinity" which is what you get with n /
>> 0,
>> where n is any number not equal to 0

>
> To make an actual senseless deinitont, it is enough to equate 0/0 with the
> term "actually infinity" where 0 is the actual nothing.
>


so therefore it is a closed field, once you finally get to nothing you also
have infinity after all.

1) 0/0 = n where n = any number except actually infinity,

multiply both sides by 0

2) you get 0 = n * 0


3) take eqn 1) above multiply both sides by 1/0 (is this actual
infinity?)
1 / 0^2 = n/0 but 0^2 = 0,
mulltiply through by (actually nothing) or 0

therefore 1 = n for any n except actually infinity

therefore we have proved all numbers are 1 except actually infinity.






> --
>
> Roland Franzius
>






Point your RSS reader here for a feed of the latest messages in this topic.

[Privacy Policy] [Terms of Use]

© Drexel University 1994-2014. All Rights Reserved.
The Math Forum is a research and educational enterprise of the Drexel University School of Education.