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Reserving R872 to n=400k (100-400k) for BOINC
reserved before 100-200k |
S625 tested to n=100k (25-100k)
25 primes found, 28 remain 3216*625^25106+1 7384*625^28124+1 16530*625^29198+1 12850*625^31657+1 16540*625^32285+1 3268*625^32332+1 6222*625^32566+1 12562*625^33022+1 14604*625^33207+1 3874*625^33971+1 6214*625^41407+1 10942*625^45709+1 4314*625^51152+1 8244*625^51942+1 5946*625^52103+1 9418*625^53936+1 3022*625^60876+1 5130*625^63115+1 10216*625^69509+1 9798*625^69739+1 7752*625^73983+1 426*625^78769+1 10384*625^86321+1 7348*625^95080+1 11682*625^98866+1 Results emailed - Base released |
Reserving R565 to n=100k (25-100k) for BOINC
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R967 status update:
We are currently testing the last 5 n's who survived deep sieving, below 334960 (which is the 1M digits limit of R972). These are 334740, 334786, 334876, 334888, 334912. The next (i.e. the first over the limit) is 334962 (we sieved to 500k, but we don't know if we will be able and patient enough to go so high, this task is already older than a year). Each test takes about 3-4 hours, so if these turn out composite (we will know by tomorrow morning, here is midnight now) and [U][B]IF[/B][/U] we find a prime after that, that prime will have over 1 million digits. |
Who is "we". Do you have an entourage of people searching for you? :smile:
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[QUOTE=gd_barnes;443863]Who is "we". Do you have an entourage of people searching for you? :smile:[/QUOTE]
We is us. Well... errrmm.. and our computers, but they don't count... (pun not intended). We learned the use of the royal we from this very forum... From the Xyzzies, their posts taught us.... :razz: |
R940 is complete to n=25K. 140 primes were found for n=10K-25K shown below. 375 k's remain. Base released.
Primes: [code] 360*940^10093-1 15038*940^10188-1 4583*940^10198-1 18957*940^10213-1 36738*940^10315-1 33119*940^10342-1 17060*940^10382-1 33734*940^10388-1 19952*940^10395-1 20855*940^10443-1 27857*940^10578-1 34311*940^10592-1 28478*940^10602-1 17574*940^10731-1 34539*940^10733-1 16142*940^10841-1 6135*940^10894-1 21137*940^10950-1 5513*940^11036-1 20381*940^11060-1 25575*940^11072-1 14382*940^11102-1 27675*940^11115-1 1164*940^11224-1 8472*940^11275-1 29114*940^11671-1 13259*940^11770-1 17054*940^11863-1 30240*940^12041-1 8699*940^12112-1 3644*940^12116-1 8021*940^12126-1 13560*940^12187-1 15086*940^12205-1 21900*940^12245-1 24257*940^12259-1 24392*940^12276-1 29286*940^12315-1 17588*940^12410-1 32408*940^12494-1 4673*940^12650-1 29457*940^12730-1 29429*940^12820-1 14361*940^12833-1 6014*940^12866-1 8366*940^12877-1 8537*940^12912-1 291*940^12951-1 11111*940^13014-1 7100*940^13113-1 19310*940^13115-1 25316*940^13131-1 9863*940^13248-1 6575*940^13278-1 13337*940^13300-1 19968*940^13332-1 24672*940^13380-1 13677*940^13551-1 21050*940^13607-1 35120*940^13738-1 22388*940^13747-1 6420*940^13774-1 26855*940^13845-1 27647*940^13905-1 35816*940^13925-1 12863*940^14103-1 22872*940^14224-1 32474*940^14515-1 1236*940^14673-1 30804*940^14759-1 22898*940^15082-1 27143*940^15089-1 11273*940^15105-1 15524*940^15175-1 14310*940^15190-1 13934*940^15240-1 26354*940^15277-1 9468*940^15338-1 23543*940^15421-1 6671*940^15582-1 8178*940^15691-1 13260*940^15762-1 33692*940^16021-1 15201*940^16202-1 9657*940^16572-1 20388*940^16593-1 1316*940^16668-1 20819*940^16715-1 28508*940^16866-1 18726*940^16921-1 2405*940^16973-1 5132*940^16991-1 22961*940^17138-1 31329*940^17309-1 7016*940^17538-1 3215*940^17782-1 13703*940^17787-1 2417*940^17922-1 19497*940^17997-1 20469*940^18118-1 36222*940^18158-1 9381*940^18212-1 25869*940^18473-1 30570*940^18907-1 16065*940^18957-1 23831*940^19057-1 24627*940^19343-1 1628*940^19520-1 7596*940^19772-1 16256*940^19840-1 18269*940^20012-1 30111*940^20246-1 19034*940^20258-1 11907*940^20531-1 10875*940^20757-1 32838*940^20776-1 30878*940^20972-1 1797*940^21096-1 29360*940^21169-1 28040*940^21384-1 27801*940^21510-1 26231*940^21597-1 15959*940^21657-1 7131*940^21746-1 24053*940^21902-1 30711*940^22186-1 24474*940^22546-1 6876*940^22684-1 30248*940^22862-1 5273*940^23271-1 510*940^23396-1 36416*940^23544-1 11841*940^23858-1 36549*940^24054-1 27821*940^24347-1 6561*940^24471-1 4337*940^24780-1 25697*940^24797-1 10236*940^24805-1 18677*940^24929-1 [/code] |
R565 tested to n=100k (25-100k)
30 primes found, 42 remain 17084*565^25069-1 5354*565^25452-1 6966*565^26359-1 4412*565^27647-1 13362*565^27814-1 19364*565^28475-1 17838*565^29496-1 16892*565^31485-1 1982*565^31941-1 18956*565^33027-1 3702*565^33126-1 3948*565^34230-1 18644*565^37348-1 12224*565^39483-1 15566*565^40161-1 19056*565^42016-1 13886*565^43060-1 20160*565^48935-1 11508*565^58643-1 14582*565^60079-1 3722*565^67328-1 16472*565^73297-1 5288*565^77273-1 642*565^77550-1 11048*565^78100-1 12326*565^81786-1 17252*565^84246-1 7640*565^88432-1 16512*565^92938-1 11114*565^97207-1 Results emailed - Base released |
R598 has been started and completed up to n=25k. 366 k remain. Base released and results emailed.
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S616 tested to n=100k (25-100k)
42 primes found, 50 remain 46641*616^25292+1 25771*616^25859+1 26745*616^26951+1 46717*616^27373+1 33562*616^28198+1 27448*616^28530+1 43323*616^30742+1 25620*616^31133+1 19605*616^31484+1 24426*616^31537+1 8646*616^32016+1 24513*616^32450+1 31468*616^33336+1 3345*616^33920+1 51220*616^33973+1 15777*616^34313+1 36036*616^39265+1 17523*616^39410+1 15267*616^39684+1 45118*616^39894+1 12076*616^39926+1 46536*616^47877+1 34098*616^48225+1 36177*616^51431+1 50058*616^54297+1 33622*616^55126+1 39711*616^57761+1 12780*616^58665+1 43876*616^59153+1 4798*616^61208+1 48565*616^61234+1 36777*616^61741+1 51633*616^62524+1 4948*616^64121+1 4212*616^70740+1 26196*616^71883+1 36262*616^72284+1 23778*616^78240+1 29695*616^80413+1 25765*616^85583+1 18747*616^93948+1 10323*616^98019+1 Results emailed - Base released |
Reserving R903 to n=100k (25-100k) for BOINC
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