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A025046 a(n) = the least odd prime p such that there are exactly n consecutive quadratic remainders modulo p. +0
2
3, 5, 19, 17, 67, 71, 131, 73, 277, 311, 827, 241, 1607, 2543, 3691, 1559, 6803, 5711, 14969, 1009, 43103, 10559, 52057, 2689, 90313, 162263, 127403, 18191, 209327, 31391, 607153, 8089, 1305511, 298483, 1694353, 33049, 3205777, 1523707 (list; graph; listen)
OFFSET

2,1
COMMENT

The values -1,0,+1 are considered consecutive.

EXAMPLE

a(5)=17 because -2,-1,0,+1,+2 are quadratic remainders, squares of 7,4,0,1,11.

CROSSREFS

Cf. A097159.

Adjacent sequences: A025043 A025044 A025045 this_sequence A025047 A025048 A025049

Sequence in context: A022489 A128362 A053484 this_sequence A095826 A058778 A088785

KEYWORD

nonn

AUTHOR

David W. Wilson (davidwwilson(AT)comcast.net)

EXTENSIONS

Edited by Don Reble (djr(AT)nk.ca), May 31 2007

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Last modified May 16 23:01 EDT 2008. Contains 139884 sequences.

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