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Title: Proving Primality like Euler Post by Barukh on Sep 26th, 2008, 3:54am In year 1772, Euler proved that the number N = 2147483647 is prime. He used trial division method. According to Prime Number Theorem (http://en.wikipedia.org/wiki/Prime_number_theorem#Statement_of_the_theorem), there are more than 4000 prime numbers less than http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/surd.gifN. However, Euler managed to do this by less than 400 divisions! Can you reproduce the line of thought that allowed Euler to reduce so drastically the amount of necessary work? |
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Title: Re: Proving Primality like Euler Post by SMQ on Sep 26th, 2008, 5:20am [hide]I suspect the fact that it's Mersenne (2147483647 = 2^31 - 1) is relevent.[/hide] ;) --SMQ |
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Title: Re: Proving Primality like Euler Post by Barukh on Sep 26th, 2008, 7:33am on 09/26/08 at 05:20:56, SMQ wrote:
Right. Actually, I thought to ,make this observation my first hint. ;) |
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Title: Re: Proving Primality like Euler Post by Eigenray on Sep 26th, 2008, 9:22am Wouldn't Euler have checked only |
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Title: Re: Proving Primality like Euler Post by Barukh on Sep 26th, 2008, 11:36pm on 09/26/08 at 09:22:53, Eigenray wrote:
I don't know... Quote:
That's what Euler did. I believe somebody will elaborate on this. |
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Title: Re: Proving Primality like Euler Post by Eigenray on Sep 27th, 2008, 1:35am Well, I won't spoil anybody's fun, but [link=http://www.ocf.berkeley.edu/~wwu/cgi-bin/yabb/YaBB.cgi?board=riddles_putnam;action=display;num=1205617005]this problem[/link] (unanswered) is related. |
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