Re: * says: Definition: sum{i in N} i = 0
- From: Franziska Neugebauer <Franziska-Neugebauer@xxxxxxxxxxxxxxxxxxx>
- Date: Thu, 07 Jun 2007 17:48:02 +0200
WM wrote:
AFIK Nicole d'Oresme was the first one to prove the divergence of the
harmonic series. I think I read it in Moritz Cantor's great historical
books. But I am not sure and too lazy to look it up.
If you doubt, however, then attend one of my lectures. I myself prove
it at least twice every year.
How many times do you want to repost? It is irrelevant to the question
whether he has "disproved" ***'s definition.
F. N.
--
xyz
.
- Follow-Ups:
- References:
- *** T. Winter says: Definition: sum{i in N} i = 0
- From: WM
- Re: *** T. Winter says: Definition: sum{i in N} i = 0
- From: Franziska Neugebauer
- Re: *** T. Winter says: Definition: sum{i in N} i = 0
- From: WM
- Re: *** T. Winter says: Definition: sum{i in N} i = 0
- From: Franziska Neugebauer
- Re: *** T. Winter says: Definition: sum{i in N} i = 0
- From: WM
- Re: *** T. Winter says: Definition: sum{i in N} i = 0
- From: G . Frege
- Re: * says: Definition: sum{i in N} i = 0
- From: Franziska Neugebauer
- Re: * says: Definition: sum{i in N} i = 0
- From: WM
- *** T. Winter says: Definition: sum{i in N} i = 0
- Prev by Date: Re: *** T. Winter says: Definition: sum{i in N} i = 0
- Next by Date: Re: bearings question
- Previous by thread: Re: * says: Definition: sum{i in N} i = 0
- Next by thread: Re: * says: Definition: sum{i in N} i = 0
- Index(es):
Loading
