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Search: id:A096464
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| A096464 |
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Let p(k)/q(k) = A096456(k)/A096463(k) be the k-th convergent to Pi/2; sequence gives numbers n such that |tan(p(n))|/p(n) sets a new maximal record. |
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+0
3
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| 1, 4, 118, 136, 315, 3727, 3763, 15503, 153396, 156559, 984404, 1119377
(list; graph; listen)
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OFFSET
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1,2
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REFERENCES
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I. Rosenholtz, Tangent sequences, world records, ..., Math. Mag., 72 (No. 5, 1999), 367-376.
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EXAMPLE
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The fifth term is 315. This means that at p(315), which is a number near 2.37*10^154, |tan(p(315))|/p(315) sets a new record, a number near 556.31.
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CROSSREFS
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Cf. A096464, A053300.
Sequence in context: A103499 A080482 A030255 this_sequence A064204 A054644 A006434
Adjacent sequences: A096461 A096462 A096463 this_sequence A096465 A096466 A096467
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KEYWORD
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nonn
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AUTHOR
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njas, Aug 16 2004
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