Difference between revisions of "Comparison test for real series/Statement"

Latest revision as of 06:16, 23 November 2016

Grade: D

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Routine, but a reference would be good

Statement

Suppose $(a_n)_{n\in\mathbb{N} }$ and $(b_n)_{n\in\mathbb{N} }$ are real sequences and that we have:

$\forall n\in\mathbb{N}[a_n\ge 0\wedge b_n\ge 0]$ - neither sequence is non-negative, and
$\exists K\in\mathbb{N}\forall n\in\mathbb{N}[n>K\implies b_n\ge a_n]$ - i.e. that eventually $b_n\ge a_n$ .

Then:

if $\sum^\infty_{n\eq 1}b_n$ converges, so does $\sum^\infty_{n\eq 1}a_n$
if $\sum^\infty_{n\eq 1}a_n$ diverges so does $\sum^\infty_{n\eq 1}b_n$

References

@@ Line 5: / Line 5: @@
 </noinclude>Suppose {{M|(a_n)_{n\in\mathbb{N} } }} and {{M|(b_n)_{n\in\mathbb{N} } }} are [[real sequences]] and that we have:
 # {{M|\forall n\in\mathbb{N}[a_n\ge 0\wedge b_n\ge 0]}} - neither sequence is non-negative, and
-# {{M|\exists K\in\mathbb{N}\forall n\in\mathbb{N}[n>K\implies a_n\le b_n}} - i.e. that {{link|eventually|sequence}} {{M|a_n\le b_n}}.
+# {{M|\exists K\in\mathbb{N}\forall n\in\mathbb{N}[n>K\implies b_n\ge a_n]}} - i.e. that {{link|eventually|sequence}} {{M|b_n\ge a_n}}.
 Then:
 * if {{M|\sum^\infty_{n\eq 1}b_n}} {{link|converges|sequence}}, so does {{M|\sum^\infty_{n\eq 1}a_n}}

Difference between revisions of "Comparison test for real series/Statement"

Latest revision as of 06:16, 23 November 2016

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