|
2019-04-25, 06:06
|
#12 | |
Jan 2019
Tallahassee, FL
111101102 Posts |
Quote:
I need to read that book on Fourier transform still lol been slacking. |
|
|
|
|
2019-04-25, 15:43
|
#13 | ||
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
36×13 Posts |
Quote:
It's a good thing that they cannot change the title. mersenneforum.org > Extra Stuff > Blogorrhea > enzocreti > Is (2^82589933-243)/19^2 prime? Quote:
|
||
|
|
|
|
2019-04-25, 15:44
|
#14 | |
Aug 2006
3×1,993 Posts |
Quote:
|
|
|
|
|
|
2019-04-25, 15:50
|
#15 | |
|
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
36×13 Posts |
Quote:
Well in this case one thing is not connected to the other. mod exponentiation for factoring has no Fourier in it. But if you are willing to read the book - absolutely! Regardless! |
|
|
|
|
|
2019-04-25, 16:37
|
#16 | ||
|
Aug 2006
3×1,993 Posts |
Quote:
Quote:
But if we realized that N is odd, we should take this into account: it makes it twice as likely to be prime, or about 0.000000035. Checking that it's not a multiple of 3, we now know that it's 3/2 as likely to be prime, since normally only 2 out of every 3 pass this test. But enzocreti knows more: it's not divisible by any prime up to 4e9. This means we can multiply its chances by 2/1 * 3/2 * 5/4 * ... * 3999999979/3999999978. But that's getting a bit tedious, so we use one of Mertens' theorems and approximate this as e^gamma * log(4e9) = 36.9.... (Note that Euler's constant gamma is implemented in PARI/GP as Euler.) So that bumps the chances all the way up to 0.00000064. Had enzocreti instead gone up to 10^20, the probability could have been improved to 0.0000014. But I'd still bet with Serge. |
||
|
|
|
|
2019-04-25, 17:20
|
#17 |
Jun 2003
22×3×421 Posts |
This number is sufficiently small that it can be PRP tested (using, say, P95) in a few core-week's time.
So the answer to "could you prove..." is "do it yourself". |
|
|
|
2019-04-26, 06:52
|
#18 | ||
|
Jan 2019
Tallahassee, FL
2×3×41 Posts |
Quote:
Quote:
I am going through a book currently that explains quite a lot on computational number theory (mostly factoring, it's probably very basic for you guys) - The Joy of Factoring by Wagstaff. I have the Fourier Analysis book by Stein on a corner somewhere, was planning to read it after finish his books on real and functional analysis, but progress has been slow lol. There're way too much math to learn, read and digest ... and everything is so dense |
||
|
|
|
|
2019-04-27, 07:01
|
#19 | |
|
Romulan Interpreter
Jun 2011
Thailand
7·1,373 Posts |
Quote:
 
|
|
|
|
|
|
2019-04-30, 08:37
|
#20 |
|
Mar 2018
10000100102 Posts |
8#*2#*5#*8#*9#*9#*3#*3# - 82589933 is prime!
8#*2#*5#*8#*9#*9#*3#*3# - 82589933 is prime!
What is 82589933? Obviously this my curio was published in Chris Caldwell page! And just now I realized it is a prime p such that 2p-1 is also prime! Last fiddled with by enzocreti on 2019-04-30 at 08:46 |
|
|
|
|
2019-04-30, 09:47
|
#21 |
|
Mar 2018
10000100102 Posts |
even more amazing
8401414020133=2*(8#*2#*5#...*3#-82589933)-1 is prime
and 8401414020133+/- 84(the two first digits of the prime) are primes! |
|
|
|
|
2019-05-02, 13:50
|
#22 |
|
Mar 2018
2×5×53 Posts |
8#*2#*5#...*3#-82589933
8#*2#*5#...*3#-82589933 is a prime such that 2p-1 is also prime!
Do you guess what is 82589933? The exponent of the last greatest Mersenne prime! |
|
|
|
 |
| Thread Tools | |
Similar Threads
|
||||
| Thread | Thread Starter | Forum | Replies | Last Post |
| (M48) NEW MERSENNE PRIME! LARGEST PRIME NUMBER DISCOVERED! | dabaichi | News | 571 | 2020-10-26 11:02 |
| How does one prove that a mersenne prime found with CUDALucas is really prime? | ICWiener | Software | 38 | 2018-06-09 13:59 |
| disk died, prime work lost forever? where to put prime? on SSD or HDD? | emily | PrimeNet | 3 | 2013-03-01 05:49 |
| How do I determine the xth-highest prime on prime pages? | jasong | Data | 7 | 2005-09-13 20:41 |
| The 40th known Mersenne prime, 220996011-1 is not PRIME! | illman-q | Miscellaneous Math | 33 | 2004-09-19 05:02 |
