[seqfan] Re: Primorial Polynomial ?

[rgwv at rgwv.com]

A057450  4,  7,  17,   59,   277,   1787,   15299,   167449,    2269733,    37139213,    718064159,    16123689073,    414507281407,    12055296811267,    392654585611999,   14199419938376521,  565855918431234443

-----Original Message-----
From: SeqFan <seqfan-bounces at list.seqfan.eu> On Behalf Of Hugo Pfoertner
Sent: Monday, 20 August, 2018 1:13 PM
To: Sequence Fanatics Discussion list <seqfan at list.seqfan.eu>
Subject: [seqfan] Re: Primorial Polynomial ?

Try Kim Walisch's "primecount" program to compute Prime[large number]

https://github.com/kimwalisch/primecount

primecount -t4 -n 12055296811267

produces 392654585611999 in less than 2 seconds on 4 cores of a Core
i5-2400 @ 3.1 GHz.


On Mon, Aug 20, 2018 at 6:26 PM, Chai Wah Wu <cwwuieee at gmail.com> wrote:

> Some more terms:
> a(0) = 2
> a(12) = 31
> a(13) = 7
> a(14) = 17
>
> On Sunday, August 19, 2018, Hans Havermann <gladhobo at bell.net> wrote:
>
> > Mathematica does a little better than WEC's Maple, calculating 
> > eleven terms (5, 3, 13, 5, 3, 29, 3, 13, 13, 3, 5) before 
> > encountering the inevitable limitation of Prime[n] for the twelfth term (at prime 17):
> >
> > NestList[Prime,17,12]
> > {17,59,277,1787,15299,167449,2269733,37139213,718064159,
> > 16123689073,414507281407,12055296811267,Prime[12055296811267]}
> >
> >
> > --
> > Seqfan Mailing list - http://list.seqfan.eu/
> >
>
> --
> Seqfan Mailing list - http://list.seqfan.eu/
>

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