Euler 625 Details
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- Mikrocruncher
- Beiträge: 27
- Registriert: 29.04.2010 12:18
Re: Euler 625 Details
One new solution:
(6,2,5) 235352+198157=241276+165166+145299+123186+27462
by Serge Vannieuwenborgh and DoctorNow
235352^6+198157^6=241276^6+165166^6+145299^6+123186^6+27462^6
(6,2,5) 235352+198157=241276+165166+145299+123186+27462
by Serge Vannieuwenborgh and DoctorNow
235352^6+198157^6=241276^6+165166^6+145299^6+123186^6+27462^6
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
One more new primitive solution:
168125^6+145417^6=99907^6+13914^6+53508^6+124712^6+173481^6
(GLaDOS and Laurent Evrard)
ps. We can finish this new Boinc project in about one year. Currently we completed 3-4 percentage of the whole search space in about 10 days.
168125^6+145417^6=99907^6+13914^6+53508^6+124712^6+173481^6
(GLaDOS and Laurent Evrard)
ps. We can finish this new Boinc project in about one year. Currently we completed 3-4 percentage of the whole search space in about 10 days.
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- Mikrocruncher
- Beiträge: 27
- Registriert: 29.04.2010 12:18
Re: Euler 625 Details
I think that it will be finished in around 3 months.
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
One more primitive solution:
204649^6+42743^6=177384^6+162721^6+8428^6+148113^6+153720^6
(Jeff17 and Mr. Hankey)
204649^6+42743^6=177384^6+162721^6+8428^6+148113^6+153720^6
(Jeff17 and Mr. Hankey)
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
Two new primitive solutions:
197489^6+142444^6=199840^6+118236^6+52962^6+58506^6+102991^6
(Mr. Hankey and Mumps [SETI.USA])
209701^6+199073^6=143246^6+211617^6+11130^6+168805^6+171780^6
(Truth? and Mr. Hankey)
197489^6+142444^6=199840^6+118236^6+52962^6+58506^6+102991^6
(Mr. Hankey and Mumps [SETI.USA])
209701^6+199073^6=143246^6+211617^6+11130^6+168805^6+171780^6
(Truth? and Mr. Hankey)
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
Again two new primitive solutions:
202618^6+51257^6=178938^6+71024^6+52038^6+52122^6+181895^6
(Jeff17 and Mr. Hankey)
206231^6+117353^6=204054^6+89437^6+84539^6+108150^6+130242^6
(Mr. Hankey and Laurent Evrard)
202618^6+51257^6=178938^6+71024^6+52038^6+52122^6+181895^6
(Jeff17 and Mr. Hankey)
206231^6+117353^6=204054^6+89437^6+84539^6+108150^6+130242^6
(Mr. Hankey and Laurent Evrard)
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
One primitive solution (from yesterday):
144937^6+38756^6=129946^6+77832^6+8820^6+41783^6+127176^6
(JagDoc and refler)
144937^6+38756^6=129946^6+77832^6+8820^6+41783^6+127176^6
(JagDoc and refler)
Re: Euler 625 Details
is there any reason why both checks are done at the same time?
would it not make more sense to do each combination once, and come back for the double check later?
by doing single checks you can get through the search-space a lot quicker (nearly 2x). you can schedule the double check for 'positive hits' immediately, and the 'misses' can be re-checked towards the end.
yes/no?
would it not make more sense to do each combination once, and come back for the double check later?
by doing single checks you can get through the search-space a lot quicker (nearly 2x). you can schedule the double check for 'positive hits' immediately, and the 'misses' can be re-checked towards the end.
yes/no?
Re: Euler 625 Details
This is a BOINC feature. The server generates two WUs and validates the results of two different hosts against each other. Most BOINC projects assure the quality of their results that way. It would be extra work to generate the "check WUs" at a later time.
Furthermore, in your example checks would be done, too, so you will have to crunch each WU twice anyway. And one more thing: If you already crunched all WUs once, the motivation to crunch them all again would be pretty low.
Furthermore, in your example checks would be done, too, so you will have to crunch each WU twice anyway. And one more thing: If you already crunched all WUs once, the motivation to crunch them all again would be pretty low.
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
More primitive solutions (from previous days):
237836^6+144025^6=193860^6+201292^6+18228^6+175588^6+185703^6
(Mumps [SETI.USA] and [AF>HFR>RR] Jim PROFIT)
185362^6+29545^6=103892^6+1152^6+43113^6+94276^6+183834^6
(Mr. Hankey and trigggl [SETI.USA])
213931^6+210085^6=216186^6+91375^6+26054^6+52920^6+207207^6
(Fogle and Laurent Evrard)
237836^6+144025^6=193860^6+201292^6+18228^6+175588^6+185703^6
(Mumps [SETI.USA] and [AF>HFR>RR] Jim PROFIT)
185362^6+29545^6=103892^6+1152^6+43113^6+94276^6+183834^6
(Mr. Hankey and trigggl [SETI.USA])
213931^6+210085^6=216186^6+91375^6+26054^6+52920^6+207207^6
(Fogle and Laurent Evrard)
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
One new primitive solution:
163475^6+81565^6=130909^6+44370^6+5292^6+38381^6+155862^6
(Mumps [SETI.USA] and DoctorNow)
163475^6+81565^6=130909^6+44370^6+5292^6+38381^6+155862^6
(Mumps [SETI.USA] and DoctorNow)
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- PDA-Benutzer
- Beiträge: 56
- Registriert: 08.06.2010 19:06
Re: Euler 625 Details
One new primitive solution:
154871^6+135983^6=128988^6+87191^6+110054^6+110208^6+150255^6
(Jeff17 and Mumps [SETI.USA])
154871^6+135983^6=128988^6+87191^6+110054^6+110208^6+150255^6
(Jeff17 and Mumps [SETI.USA])