Really, really quick

Daniel123 · 2009-01-16 09:37:04

Is it okay to (unrigorously) state that

converges because does?

Thanks.

Daniel123 · 2009-01-16 09:46:24

Called a comparison test? http://en.wikipedia.org/wiki/Comparison_test

Daniel123 · 2009-01-16 09:52:54

I don't even know why I asked this, it obviously converges.

Muggleton · 2009-01-16 12:26:03

There's a rather cute name for this test. It's called the Plain Vanilla Comparison Test.

Ricky · 2009-01-16 12:49:44

Just wanted to note that stating the sum converges because 1/n^2 does is rigorous.

Daniel123 · 2009-01-17 00:41:11

Ricky wrote:

Just wanted to note that stating the sum converges because 1/n^2 does is rigorous.

Ahh right, okay. I thought I might have to write out some |a_n| < |b_n| things mentioned on that wiki page.

Thanks

Kurre · 2009-01-17 01:23:46

Daniel123 wrote:

Ricky wrote:
Just wanted to note that stating the sum converges because 1/n^2 does is rigorous.
Ahh right, okay. I thought I might have to write out some |a_n| < |b_n| things mentioned on that wiki page.
Thanks

yea but obv 0<1/(1+n^2)<1/n^2 so |a_n|<|b_n| for all n. Imo you should do this calculation to show that the sum converges, not just state it without motivation.

Math Is Fun Forum

#1 2009-01-16 09:37:04

Really, really quick

#2 2009-01-16 09:46:24

Re: Really, really quick

#3 2009-01-16 09:52:54

Re: Really, really quick

#4 2009-01-16 12:26:03

Re: Really, really quick

#5 2009-01-16 12:49:44

Re: Really, really quick

#6 2009-01-17 00:41:11

Re: Really, really quick

#7 2009-01-17 01:23:46

Re: Really, really quick

Board footer