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-   -   new candidat for M45 (https://www.mersenneforum.org/showthread.php?t=7248)

 cochet 2007-03-02 12:07

new candidat for M45

Hello,

I am a french psychologist and, of course, mathemacian "amateur".
I think that the exposant of M45 is :

[B][SIZE=3] 32 58 34 27[/SIZE][/B]
[B][SIZE=3][/SIZE][/B]
I obtained this result by a logic method, without calculus on computer.
Please, can you test for me this exposant, because I do not have a suffisant power of calculus on my computer.
My proposition can seems strange, I know, but I think indeed it's the good number.
I have informed G. Woltman of this result a few weeks ago, but I had no answer.
Thanks
Regards
Cochet
[B][SIZE=3][/SIZE][/B]
[B][SIZE=3][/SIZE][/B]

 akruppa 2007-03-02 12:42

Moved to Miscellaneous Math.

Edit: The number has had an LL test, not prime. Feel free to double-check it.

Alex

 Mini-Geek 2007-03-02 13:15

If all of these people saying they found Mersenne Primes were correct, we'd probably be at at least M60 by now...:grin:

 ewmayer 2007-03-02 18:36

Mon Dieu - l'assaut des manivelles ne cesse jamais!

 Xyzzy 2007-03-02 21:46

One of our favorite retorts. We know it doesn't make sense, but it kills us.

Mon Dieu![sup][1][/sup]

[I][SIZE=1][1] That's French for Mon Dieu![/SIZE][/I]

 Spherical Cow 2007-03-02 22:09

[QUOTE=Mini-Geek;99748]If all of these people saying they found Mersenne Primes were correct, we'd probably be at at least M60 by now...:grin:[/QUOTE]

If we assume an infinite number of Mersenne Primes, are we faced with an infinite number of "manivelles" (as Dr. Mayer calls them)?

Mon Dieu, Indeed!

Norm

 Mini-Geek 2007-03-02 22:17

[quote=cochet;99741][B][SIZE=3]32 58 34 27[/SIZE][/B][/quote]
How did you arrive at this number and does the reason explain why the numbers are in groups of two?
The chances that you're correct and the one LL test already done is minute (the LL test being correct is currently on the order of ~1-5%, and the current people saying they found one and being correct is 0%), but still...I'm curious as to how you arrived at that exponent.

 Uncwilly 2007-03-02 23:31

[QUOTE=Mini-Geek;99772]How did you arrive at this number and does the reason explain why the numbers are in groups of two?[/QUOTE]It's his phone number. :lol: :lol:

I wonder why George didn't respond, maybe due to the crank status?

 Mini-Geek 2007-03-03 00:03

[quote=Uncwilly;99780]It's his phone number. :lol: :lol: [/quote]
Where are phone numbers 8 digits?
Speaking of phone numbers, my 10 digit (US phone number with area code) is prime, and my 5 digit ZIP (postal) code is prime.

 Uncwilly 2007-03-03 02:42

[QUOTE=Mini-Geek;99783]Where are phone numbers 8 digits?[/QUOTE]Many places. For example in Berlin, places in Mexico, Norway, ......

 Master Alex 2007-03-03 09:07

Hi, cochet !

I check your exponent 32583427 with help of my exact theorem.