Perrin number: Difference between revisions

Latest revision as of 04:32, 19 May 2008

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The Perrin numbers are defined by the recurrence relation

P_{n}:={\begin{cases}3&{\mbox{if }}n=0;\\0&{\mbox{if }}n=1;\\2&{\mbox{if }}n=2;\\P_{n-2}+P_{n-3}&{\mbox{if }}n>2.\\\end{cases}}

The first few numbers of the sequence are: 3, 0, 2, 3, 2, 5, 5, 7, 10, 12, 17, 22, ...

Properties

A special property of the sequence of Perrin numbers is, that if $p\$ is a prime number, then $p\$ divides $P_{p}\$ . The converse is false, because there exist composite numbers $q\$ which divide $P_{q}\$ . Those numbers $q\$ are called Perrin pseudoprimes. The first few Perrin pseudoprimes are: 271441, 904631, 16532714, 24658561, 27422714, ...

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-The Perrin numbers are a defined bythe recurrence relation
+{{subpages}}
+The '''Perrin numbers''' are defined by the recurrence relation
 :<math>
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 == Properties ==
-A special property of the sequence of Perrin numbers is, that if <math>p\ </math> is a Prime number,than <math>p\ </math> divides <math>P_p\ </math>. The converse is false, because there exist composite numbers <math>q\ </math> which divides <math>P_q\ </math>. Those numbers <math>q\ </math> are called Perrin pseudoprimes.
+A special property of the sequence of Perrin numbers is, that if <math>p\ </math> is a [[prime number]], then <math>p\ </math> divides <math>P_p\ </math>. The converse is false, because there exist composite numbers <math>q\ </math> which divide <math>P_q\ </math>. Those numbers <math>q\ </math> are called Perrin pseudoprimes.
 The first few Perrin pseudoprimes are: 271441, 904631, 16532714, 24658561, 27422714, ...

Perrin number: Difference between revisions

Latest revision as of 04:32, 19 May 2008

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