素阶乘猜想：p = P# - q-hrefspace-专业计算机论坛

cfan2021 发表于 2024-4-1 11:08:46

素阶乘猜想：p = P# - q

素阶乘猜想：对于大于5的素数p，存在素数P，q使得p = P# - q
其中P#为素数阶乘，P≥5，q>5

asukrimukozor 发表于 2024-4-1 11:09:42

2024-03-23 13:49:22
7= 5# - {...}
11= 5# - {...} = 7# - {...}
13= 5# - {...} = 7# - {...} = 11# - {...}
17= 5# - {...} = 7# - {...} = 11# - {...} = 13# - {...}
19= 5# - {...} = 7# - {...} = 13# - {...}
23= 5# - {...} = 11# - {...} = 19# - {...}
29= 7# - {...} = 11# - {...} = 17# - {...}
31= 7# - {...}
37= 7# - {...} = 11# - {...} = 19# - {...}
41= 11# - {...} = 13# - {...} = 19# - {...} = 29# - {...}
43= 7# - {...} = 11# - {...} = 19# - {...} = 23# - {...}
47= 7# - {...} = 13# - {...} = 17# - {...} = 19# - {...} = 41# - {...}
53= 7# - {...} = 17# - {...} = 19# - {...} = 41# - {...}
59= 7# - {...} = 11# - {...} = 17# - {...} = 19# - {...} = 37# - {...}
61= 7# - {...} = 17# - {...} = 23# - {...}
67= 11# - {...} = 19# - {...} = 29# - {...} = 47# - {...}
71= 7# - {...} = 11# - {...} = 13# - {...} = 41# - {...}
73= 7# - {...} = 11# - {...} = 29# - {...} = 31# - {...} = 53# - {...}
79= 7# - {...} = 19# - {...} = 23# - {...} = 31# - {...}
83= 7# - {...} = 13# - {...} = 31# - {...} = 79# - {...}
89= 11# - {...} = 31# - {...} = 41# - {...} = 43# - {...} = 53# - {...} = 61# - {...} = 83# - {...}
97= 7# - {...} = 11# - {...} = 19# - {...} = 23# - {...} = 31# - {...} = 47# - {...} = 73# - {...} = 89# - {...}
101= 7# - {...} = 23# - {...} = 29# - {...} = 67# - {...} = 79# - {...} = 89# - {...}
103= 7# - {...} = 11# - {...} = 13# - {...} = 41# - {...} = 89# - {...}
107= 7# - {...} = 11# - {...} = 17# - {...} = 31# - {...} = 37# - {...} = 59# - {...} = 67# - {...}
109= 7# - {...} = 13# - {...} = 17# - {...} = 59# - {...}
113= 7# - {...} = 13# - {...} = 23# - {...} = 67# - {...} = 103# - {...}
127= 7# - {...} = 17# - {...} = 19# - {...} = 23# - {...} = 31# - {...} = 53# - {...} = 67# - {...} = 71# - {...} = 79# - {...}
131= 7# - {...} = 11# - {...} = 17# - {...} = 41# - {...} = 101# - {...}
137= 7# - {...} = 23# - {...} = 41# - {...} = 53# - {...} = 79# - {...} = 103# - {...}
139= 7# - {...} = 19# - {...} = 37# - {...} = 53# - {...} = 101# - {...}
149= 7# - {...} = 11# - {...} = 13# - {...} = 17# - {...} = 29# - {...} = 31# - {...} = 43# - {...} = 89# - {...} = 101# - {...}
151= 7# - {...} = 13# - {...} = 29# - {...} = 37# - {...} = 47# - {...} = 107# - {...} = 149# - {...}
157= 7# - {...} = 11# - {...} = 13# - {...} = 19# - {...}
163= 7# - {...} = 13# - {...} = 37# - {...} = 59# - {...} = 67# - {...}
167= 7# - {...} = 11# - {...} = 13# - {...} = 43# - {...} = 47# - {...} = 59# - {...} = 79# - {...} = 101# - {...}
173= 7# - {...} = 11# - {...} = 29# - {...} = 31# - {...} = 157# - {...}
179= 7# - {...} = 11# - {...} = 13# - {...} = 17# - {...} = 19# - {...} = 29# - {...} = 71# - {...} = 131# - {...}
181= 7# - {...} = 11# - {...} = 19# - {...} = 23# - {...} = 41# - {...} = 73# - {...}
191= 7# - {...} = 17# - {...} = 53# - {...} = 59# - {...} = 73# - {...} = 79# - {...} = 173# - {...}
193= 7# - {...} = 13# - {...} = 29# - {...} = 41# - {...} = 53# - {...}
197= 7# - {...} = 11# - {...} = 13# - {...} = 23# - {...} = 31# - {...} = 41# - {...} = 83# - {...} = 107# - {...} = 151# - {...}
199= 7# - {...} = 11# - {...} = 17# - {...} = 23# - {...} = 67# - {...} = 71# - {...}
211= 11# - {...} = 13# - {...} = 17# - {...} = 31# - {...} = 107# - {...}
223= 11# - {...} = 17# - {...} = 61# - {...} = 127# - {...} = 131# - {...} = 179# - {...} = 181# - {...}
227= 11# - {...} = 13# - {...} = 29# - {...} = 31# - {...} = 41# - {...} = 211# - {...}
229= 11# - {...} = 19# - {...} = 43# - {...} = 53# - {...}
233= 67# - {...} = 149# - {...} = 167# - {...}
239= 17# - {...} = 19# - {...} = 23# - {...} = 37# - {...} = 41# - {...} = 71# - {...} = 79# - {...} = 101# - {...} = 163# - {...}
241= 11# - {...} = 13# - {...} = 19# - {...} = 29# - {...} = 61# - {...} = 71# - {...}
251= 31# - {...} = 41# - {...} = 79# - {...} = 97# - {...} = 113# - {...}
257= 11# - {...} = 17# - {...} = 19# - {...} = 29# - {...} = 31# - {...} = 37# - {...} = 73# - {...} = 97# - {...} = 113# - {...} = 127# - {...} = 167# - {...} = 229# - {...}
263= 17# - {...} = 37# - {...} = 43# - {...} = 61# - {...} = 71# - {...} = 83# - {...} = 107# - {...} = 109# - {...}
269= 13# - {...} = 17# - {...} = 23# - {...} = 31# - {...} = 61# - {...}
271= 11# - {...} = 13# - {...} = 31# - {...} = 59# - {...} = 79# - {...} = 89# - {...}
277= 13# - {...} = 17# - {...} = 29# - {...} = 47# - {...} = 59# - {...} = 89# - {...} = 113# - {...}
281= 11# - {...} = 19# - {...} = 37# - {...} = 43# - {...} = 67# - {...} = 113# - {...} = 139# - {...}
283= 11# - {...} = 17# - {...} = 23# - {...} = 31# - {...} = 37# - {...} = 107# - {...}
293= 11# - {...} = 17# - {...} = 23# - {...} = 31# - {...} = 43# - {...} = 53# - {...} = 103# - {...} = 191# - {...} = 197# - {...}
307= 11# - {...} = 13# - {...} = 17# - {...} = 29# - {...} = 37# - {...} = 61# - {...} = 233# - {...} = 263# - {...}
311= 11# - {...} = 17# - {...} = 23# - {...} = 37# - {...} = 67# - {...} = 97# - {...} = 223# - {...}
313= 11# - {...} = 13# - {...} = 19# - {...} = 29# - {...} = 41# - {...} = 47# - {...} = 61# - {...} = 67# - {...} = 73# - {...} = 109# - {...} = 223# - {...} = 229# - {...} = 23
9# - {...}
317= 11# - {...} = 181# - {...} = 257# - {...} = 277# - {...}
331= 11# - {...} = 17# - {...} = 19# - {...} = 47# - {...} = 53# - {...} = 67# - {...} = 79# - {...} = 311# - {...}
337= 11# - {...} = 29# - {...} = 53# - {...} = 97# - {...}
347= 13# - {...} = 29# - {...} = 43# - {...} = 71# - {...} = 211# - {...} = 251# - {...}
349= 19# - {...} = 37# - {...} = 41# - {...} = 43# - {...} = 223# - {...} = 239# - {...}
353= 17# - {...} = 23# - {...} = 29# - {...} = 31# - {...} = 41# - {...} = 73# - {...} = 83# - {...}
359= 11# - {...} = 13# - {...} = 19# - {...} = 113# - {...}
367= 13# - {...} = 19# - {...} = 29# - {...} = 47# - {...} = 181# - {...} = 263# - {...} = 337# - {...}
373= 17# - {...} = 23# - {...} = 37# - {...} = 61# - {...} = 67# - {...} = 109# - {...} = 127# - {...} = 139# - {...} = 149# - {...} = 227# - {...} = 367# - {...}
379= 11# - {...} = 43# - {...} = 61# - {...} = 109# - {...} = 313# - {...}
383= 17# - {...} = 41# - {...} = 73# - {...} = 79# - {...} = 109# - {...} = 179# - {...} = 239# - {...} = 263# - {...}
389= 13# - {...} = 17# - {...} = 23# - {...} = 47# - {...} = 67# - {...} = 79# - {...} = 103# - {...} = 137# - {...}
397= 11# - {...} = 13# - {...} = 31# - {...} = 53# - {...} = 61# - {...} = 73# - {...} = 109# - {...} = 131# - {...} = 367# - {...}
401= 13# - {...} = 19# - {...} = 23# - {...} = 41# - {...} = 197# - {...} = 337# - {...}
409= 11# - {...} = 17# - {...} = 47# - {...} = 59# - {...} = 163# - {...} = 173# - {...} = 337# - {...}
419= 13# - {...} = 29# - {...} = 41# - {...} = 61# - {...} = 67# - {...} = 131# - {...} = 139# - {...}
421= 11# - {...} = 17# - {...} = 29# - {...} = 73# - {...} = 89# - {...} = 139# - {...}
431= 11# - {...} = 13# - {...} = 17# - {...} = 29# - {...} = 37# - {...} = 43# - {...} = 59# - {...} = 79# - {...} = 109# - {...} = 163# - {...} = 281# - {...} = 337# - {...}
433= 11# - {...} = 17# - {...} = 173# - {...} = 431# - {...}
439= 11# - {...} = 19# - {...} = 23# - {...} = 31# - {...} = 37# - {...} = 113# - {...} = 163# - {...} = 167# - {...} = 229# - {...} = 419# - {...}
443= 11# - {...} = 13# - {...} = 17# - {...} = 29# - {...} = 83# - {...} = 131# - {...} = 163# - {...} = 233# - {...} = 353# - {...} = 367# - {...} = 397# - {...}
449= 11# - {...} = 13# - {...} = 17# - {...} = 31# - {...} = 37# - {...} = 103# - {...} = 137# - {...} = 197# - {...} = 331# - {...} = 349# - {...} = 401# - {...}
457= 13# - {...} = 19# - {...} = 41# - {...} = 47# - {...} = 109# - {...} = 199# - {...} = 349# - {...}
461= 13# - {...} = 17# - {...} = 31# - {...} = 47# - {...} = 59# - {...} = 101# - {...} = 311# - {...} = 313# - {...}
463= 11# - {...} = 13# - {...} = 17# - {...} = 47# - {...} = 61# - {...} = 101# - {...} = 151# - {...} = 199# - {...} = 281# - {...} = 367# - {...} = 419# - {...}
467= 29# - {...} = 37# - {...} = 43# - {...} = 109# - {...} = 271# - {...} = 373# - {...}
479= 11# - {...} = 17# - {...} = 19# - {...} = 37# - {...} = 53# - {...} = 59# - {...} = 157# - {...} = 233# - {...} = 283# - {...}
487= 11# - {...} = 19# - {...} = 71# - {...} = 163# - {...}
491= 19# - {...} = 41# - {...} = 101# - {...} = 113# - {...} = 149# - {...} = 157# - {...} = 239# - {...}
499= 11# - {...} = 13# - {...} = 19# - {...} = 103# - {...} = 139# - {...} = 157# - {...} = 163# - {...} = 359# - {...}
用时 0.25401 秒
其中7、11、13、17为满解，即可行解全部是有效解；且只有7、11、31少于3个解。

Sherryufas 发表于 2024-4-1 11:10:21

一切皆有可能！

isebufusiza 发表于 2024-4-1 11:11:21

p<10000的唯2解：
11 2 {5,7}

Charlslots 发表于 2024-4-1 11:12:07

p<10000的3个解组合：

13 3 {5,7,11}19 3 {5,7,13}23 3 {5,11,19}29 3 {7,11,17}37 3 {7,11,19}61 3 {7,17,23}233 3 {67,149,167}3191 3 {13,211,2069}8161 3 {61,373,3607}

singqing 发表于 2024-4-1 11:12:21

p<10000的4个解组合：

17 4 {5,7,11,13}41 4 {11,13,19,29}43 4 {7,11,19,23}53 4 {7,17,19,41}67 4 {11,19,29,47}71 4 {7,11,13,41}79 4 {7,19,23,31}83 4 {7,13,31,79}109 4 {7,13,17,59}157 4 {7,11,13,19}229 4 {11,19,43,53}317 4 {11,181,257,277}337 4 {11,29,53,97}359 4 {11,13,19,113}433 4 {11,17,173,431}487 4 {11,19,71,163}1091 4 {37,83,137,619}2113 4 {11,13,89,1321}2129 4 {11,13,37,1439}2677 4 {23,53,137,617}3769 4 {13,19,97,383}4099 4 {13,67,439,661}7001 4 {13,769,1741,3271}8353 4 {19,43,59,101}

uajoegecp 发表于 2024-4-1 11:12:46

p=36263 ,5个解：{3853, 5197, 5209, 6247, 6397}

Lpasarbola 发表于 2024-4-1 11:13:44

p<10000 唯一解：
7 1 {5}
31 1 {7}

ocideeweguy 发表于 2024-4-1 11:14:16

2024-03-24 16:37:54
... ...
-3846-36241
-3847-36251
36263 {3853, 5197, 5209, 6247, 6397, 6827, 11681}
用时 23836.19552 秒
检验到36251#，用时很长。

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hrefspace's Archiver

素阶乘猜想：p = P# - q