
The First Megabit Drive
The First Megabit Drive
I am pleased to announce our first multik drive featuring only megabit exponents.
Initially we have the following 6 Ks sieved up to p=54T.
k = 51, 57, 61, 65, 69, 87
We have more Ks being sieved right now. They will be added later, either as a part of this drive, or in a new drive.
Happy hunting!
Note (Jan. 26 2011): k = 47, 53 added as Batch2
Note2 (Aug. 12, 2014): k=51 and 69 removed from the drive,
The following Ks added:
k=35, n > 2520k
k=37, n > 2500k, only n !=1 mod 10
k=103, n >= 2550223
k=111, n >= 2601487
As the results, the following 10 Ks are now being tested: 35, 37, 47, 53, 57, 61, 65, 87, 103, and 111.
Found Primes
Code:
47 [1]: 1025950
51 [3]: 1026910, 1027635, 1231665
53 [1]: 1632590
57 [6]: 1098272, 1110980, 1486214, 2103370, 2639528, ... 3339932
61 [8]: 1124049, 1416365, 1487125, 1734983, 2134577, 2381887, 2580689, 2936967
65 [6]: 1374574, 1421088, 1505640, 2450614, 2583720, 2876718
69 [6]: 1473217, 1566375, 2174213, 2410035, 2428251, 2649939
87 [7]: 1089098, 1120006, 1332741, 1358189, 1616138, 1852590, 2518122
Total: 38 primes
Primes found by others:
June 22, 2016: 61*2^32865351 Ruediger K. Eckhard
January 30, 2017: 61*2^33660331 Ruediger K. Eckhard
Status
Code:
Range of n Tested by Status
1,000,0002,380,000  RPS  Complete (26 primes)
2,380,0002,384,000  AES  Complete (61*2^23818871 is prime)
2,384,0002,386,000  Kosmaj  Complete
2,386,0002,388,000  AES  Complete
2,388,0002,420,000  Kosmaj  Complete (69*2^24100351 is prime)
2,420,0002,424,000  Carlos  Complete
2,424,0002,444,000  Carlos  Complete (69*2^24282511 is prime)
2,444,0002,456,000  Kosmaj  Complete (65*2^24506141 is prime)
2,456,0002,468,000  Carlos  Complete
2,468,0002,480,000  pepi37  Complete
2,480,0002,484,000  Carlos  Complete
2,484,0002,494,000  Kosmaj  Complete
2,494,0002,500,000  kracker  Complete
2,500,0002,506,000  Thomas  Complete
2,506,0002,508,000  Kosmaj  Complete
2,508,0002,550,000  Thomas  Complete (87*2^25181221 is prime)
2,550,0002,582,000  Thomas  Complete (61*2^25806891 is prime)
2,582,0002,600,000  Thomas  Complete (65*2^25837201 is prime)
2,600,0002,700,000  Thomas  Complete (57*2^26395281 is prime)
2,700,0002,800,000  Thomas  Complete
2,800,0002,900,000  Thomas  Complete (65*2^28767181 is prime)
2,900,0003,000,000  Thomas  Complete (61*2^29369671 is prime)
Available Files
Extensively sieved by Psieve (the latest sieve file of July 31, 2011)
(*) In parentheses: Percentage of tests requiring the indicated FFT lengths on AVX CPUs.
Last fiddled with by Thomas11 on 20180411 at 07:42
