Délky period převrácených hodnot prvočísel/Statistika/Statistika soustavy o základu 14: Porovnání verzí
MEZIULOŽENÍ |
MEZIULOŽENÍ |
||
Řádek 899: | Řádek 899: | ||
| 101 |
| 101 |
||
! 547 |
! 547 |
||
| 2x3x7x13 || || 2B1 || 4* |
| 2x3x7x13 || [[Délky period převrácených hodnot prvočísel/Délka l = 21 nebo 42|26]] || 2B1 || 4* |
||
|- |
|- |
||
| 102 |
| 102 |
||
! 557 |
! 557 |
||
| 2^2x139 || || 2BB || 2 |
| 2^2x139 || 1 || 2BB || 2 |
||
|- |
|- |
||
| 103 |
| 103 |
||
! 563 |
! 563 |
||
| 2x281 || || 2C3 || 3* |
| 2x281 || 1 || 2C3 || 3* |
||
|- |
|- |
||
| 104 |
| 104 |
||
! 569 |
! 569 |
||
| 2^3x71 || || 2C9 || 3 |
| 2^3x71 || [[Délky period převrácených hodnot prvočísel/Délka l = 71 nebo 142|4]] || 2C9 || 3 |
||
|- |
|- |
||
| 105 |
| 105 |
||
! 571 |
! 571 |
||
| 2x3x5x19 || || 2CB || 5* |
| 2x3x5x19 || 2 || 2CB || 5* |
||
|- |
|- |
||
| 106 |
| 106 |
||
! 577 |
! 577 |
||
| 2^6x3^2 || || 2D3 || 5 |
| 2^6x3^2 || 3 || 2D3 || 5 |
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|- |
|- |
||
| 107 |
| 107 |
||
! 587 |
! 587 |
||
| 2x293 || || 2DD || 3* |
| 2x293 || 1 || 2DD || 3* |
||
|- |
|- |
||
| 108 |
| 108 |
||
! 593 |
! 593 |
||
| 2^4x37 || || 305 || 3 |
| 2^4x37 || 1 || 305 || 3 |
||
|- |
|- |
||
| 109 |
| 109 |
||
! 599 |
! 599 |
||
| 2x13x23 || || 30B || 2* |
| 2x13x23 || 1 || 30B || 2* |
||
|- |
|- |
||
| 110 |
| 110 |
||
! 601 |
! 601 |
||
| 2^3x3x5^2 || || 30D || 7 |
| 2^3x3x5^2 || 1 || 30D || 7 |
||
|- |
|- |
||
| 111 |
| 111 |
||
! 607 |
! 607 |
||
| 2x3x101 || || 315 || 2* |
| 2x3x101 || 2 || 315 || 2* |
||
|- |
|- |
||
| 112 |
| 112 |
||
! 613 |
! 613 |
||
| 2^2x3^2x17 || || 31B || 2 |
| 2^2x3^2x17 || 1 || 31B || 2 |
||
|- |
|- |
||
| 113 |
| 113 |
||
! 617 |
! 617 |
||
| 2^3x7x11 || || 321 || 3 |
| 2^3x7x11 || 2 || 321 || 3 |
||
|- |
|- |
||
| 114 |
| 114 |
||
! 619 |
! 619 |
||
| 2x3x103 || || 323 || 4* |
| 2x3x103 || [[Délky period převrácených hodnot prvočísel/Délka l = 103 nebo 206|3]] || 323 || 4* |
||
|- |
|- |
||
| 115 |
| 115 |
||
! 631 |
! 631 |
||
| 2x3^2x5x7 || || 331 || 9* |
| 2x3^2x5x7 || 1 || 331 || 9* |
||
|- |
|- |
||
| 116 |
| 116 |
||
! 641 |
! 641 |
||
| 2^7x5 || || 33B || 3 |
| 2^7x5 || 4 || 33B || 3 |
||
|- |
|- |
||
| 117 |
| 117 |
||
! 643 |
! 643 |
||
| 2x3x107 || || 33D || 7* |
| 2x3x107 || 1 || 33D || 7* |
||
|- |
|- |
||
| 118 |
| 118 |
||
! 647 |
! 647 |
||
| 2x17x19 || || 343 || 2* |
| 2x17x19 || 2 || 343 || 2* |
||
|- |
|- |
||
| 119 |
| 119 |
||
! 653 |
! 653 |
||
| 2^2x163 || || 349 || 2 |
| 2^2x163 || 1 || 349 || 2 |
||
|- |
|- |
||
| 120 |
| 120 |
||
! 659 |
! 659 |
||
| 2x7x47 || || 351 || 3* |
| 2x7x47 || [[Délky period převrácených hodnot prvočísel/Délka l = 47 nebo 94|14]] || 351 || 3* |
||
|- |
|- |
||
| 121 |
| 121 |
||
! 661 |
! 661 |
||
| 2^2x3x5x11 || || 353 || 2 |
| 2^2x3x5x11 || 2 || 353 || 2 |
||
|- |
|- |
||
| 122 |
| 122 |
||
! 673 |
! 673 |
||
| 2^5x3x7 || || 361 || 5 |
| 2^5x3x7 || 4 || 361 || 5 |
||
|- |
|- |
||
| 123 |
| 123 |
||
! 677 |
! 677 |
||
| 2^2x13^2 || || 365 || 2 |
| 2^2x13^2 || 4 || 365 || 2 |
||
|- |
|- |
||
| 124 |
| 124 |
||
! 683 |
! 683 |
||
| 2x11x31 || || 36B || [[Číselné soustavy/Desítková soustava|10]]* |
| 2x11x31 || 2 || 36B || [[Číselné soustavy/Desítková soustava|10]]* |
||
|- |
|- |
||
| 125 |
| 125 |
||
! 691 |
! 691 |
||
| 2x3x5x23 || || 375 || 6* |
| 2x3x5x23 || [[Délky period převrácených hodnot prvočísel/Délka l = 69 nebo 138|5]] || 375 || 6* |
||
|- |
|- |
||
| 126 |
| 126 |
||
! 701 |
! 701 |
||
| 2^2x5^2x7 || || 381 || 2 |
| 2^2x5^2x7 || 1 || 381 || 2 |
||
|- |
|- |
||
| 127 |
| 127 |
||
! 709 |
! 709 |
||
| 2^2x3x59 || || 389 || 2 |
| 2^2x3x59 || 1 || 389 || 2 |
||
|- |
|- |
||
| 128 |
| 128 |
||
! 719 |
! 719 |
||
| 2x359 || || 395 || 2* |
| 2x359 || 2 || 395 || 2* |
||
|- |
|- |
||
| 129 |
| 129 |
||
! 727 |
! 727 |
||
| 2x3x11^2 || || 39D || 7* |
| 2x3x11^2 || 2 || 39D || 7* |
||
|- |
|- |
||
| 130 |
| 130 |
||
! 733 |
! 733 |
||
| 2^2x3x61 || || 3A5 || 6 |
| 2^2x3x61 || 2 || 3A5 || 6 |
||
|- |
|- |
||
| 131 |
| 131 |
||
! 739 |
! 739 |
||
| 2x3^2x41 || || 3AB || 6* |
| 2x3^2x41 || 2 || 3AB || 6* |
||
|- |
|- |
||
| 132 |
| 132 |
||
! 743 |
! 743 |
||
| 2x7x53 || || 3B1 || 2* |
| 2x7x53 || 1 || 3B1 || 2* |
||
|- |
|- |
||
| 133 |
| 133 |
||
! 751 |
! 751 |
||
| 2x3x5^3 || || 3B9 || 2* |
| 2x3x5^3 || 1 || 3B9 || 2* |
||
|- |
|- |
||
| 134 |
| 134 |
||
! 757 |
! 757 |
||
| 2^2x3^3x7 || || 3C1 || 2 |
| 2^2x3^3x7 || 1 || 3C1 || 2 |
||
|- |
|- |
||
| 135 |
| 135 |
||
! 761 |
! 761 |
||
| 2^3x5x19 || || 3C5 || 6 |
| 2^3x5x19 || 1 || 3C5 || 6 |
||
|- |
|- |
||
| 136 |
| 136 |
||
! 769 |
! 769 |
||
| 2^8x3 || || 3CD || [[Číselné soustavy/Jedenáctková soustava|11]] |
| 2^8x3 || 1 || 3CD || [[Číselné soustavy/Jedenáctková soustava|11]] |
||
|- |
|- |
||
| 137 |
| 137 |
||
! 773 |
! 773 |
||
| 2^2x193 || || 3D3 || 2 |
| 2^2x193 || 2 || 3D3 || 2 |
||
|- |
|- |
||
| 138 |
| 138 |
||
! 787 |
! 787 |
||
| 2x3x131 || || 403 || 4* |
| 2x3x131 || 1 || 403 || 4* |
||
|- |
|- |
||
| 139 |
| 139 |
||
! 797 |
! 797 |
||
| 2^2x199 || || 40D || 2 |
| 2^2x199 || 4 || 40D || 2 |
||
|- |
|- |
||
| 140 |
| 140 |
||
! 809 |
! 809 |
||
| 2^3x101 || || 41B || 3 |
| 2^3x101 || 2 || 41B || 3 |
||
|- |
|- |
||
| 141 |
| 141 |
||
! 811 |
! 811 |
||
| 2x3^4x5 || || 41D || 5* |
| 2x3^4x5 || [[Délky period převrácených hodnot prvočísel/Délka l = 15 nebo 30|27]] || 41D || 5* |
||
|- |
|- |
||
| 142 |
| 142 |
||
! 821 |
! 821 |
||
| 2^2x5x41 || || 429 || 2 |
| 2^2x5x41 || 1 || 429 || 2 |
||
|- |
|- |
||
| 143 |
| 143 |
||
! 823 |
! 823 |
||
| 2x3x137 || || 42B || 2* |
| 2x3x137 || 1 || 42B || 2* |
||
|- |
|- |
||
| 144 |
| 144 |
||
! 827 |
! 827 |
||
| 2x7x59 || || 431 || 3* |
| 2x7x59 || 2 || 431 || 3* |
||
|- |
|- |
||
| 145 |
| 145 |
||
! 829 |
! 829 |
||
| 2^2x3^2x23 || |
| 2^2x3^2x23 || 2 || 433 || 2 |
||
|- |
|- |
||
| 146 |
| 146 |
||
! 839 |
! 839 |
||
| 2x419 || || 43D || 2* |
| 2x419 || 2 || 43D || 2* |
||
|- |
|- |
||
| 147 |
| 147 |
||
! 853 |
! 853 |
||
| 2^2x3x71 || || 44D || 2 |
| 2^2x3x71 || 4 || 44D || 2 |
||
|- |
|- |
||
| 148 |
| 148 |
||
! 857 |
! 857 |
||
| 2^3x107 || || 453 || 3 |
| 2^3x107 || 1 || 453 || 3 |
||
|- |
|- |
||
| 149 |
| 149 |
||
! 859 |
! 859 |
||
| 2x3x11x13 || || 455 || 4* |
| 2x3x11x13 || 1 || 455 || 4* |
||
|- |
|- |
||
| 150 |
| 150 |
||
! 863 |
! 863 |
||
| 2x431 || || 459 || 2* |
| 2x431 || 1 || 459 || 2* |
||
|- |
|- |
||
| 151 |
| 151 |
||
! 877 |
! 877 |
||
| 2^2x3x73 || || 469 || 2 |
| 2^2x3x73 || 1 || 469 || 2 |
||
|- |
|- |
||
| 152 |
| 152 |
Verze z 28. 12. 2020, 20:20
Tato stránka je zatím ve stavu zrodu. Proto na text zde uvedený zatím neberte zřetel, neboť je zatím z principu nepravdivý. Aby to byla statistika, muselo by být zpracováno exaktně větší množství informace, což zatím teprve připravuji. Vzhledem, k tomu, že je stránka ve stavu zrodu, nebyly by relevantní ani nějaké připomínky či dokonce editace od někoho jiného, než autora stránky.
Délky period převrácených hodnot prvočísel patří mezi důležité vlastnosti prvočísel.
Délka periody převrácené hodnoty
Na základních školách se v této otázce můžeme někdy setkat s nezcela přesnou a nepřesně vymezující oblast "účinnosti" základní/"kardinální" poučkou: "Délka periody převrácené hodnoty prvočísla je rovna toto prvočíslo mínus jedna." Tyto statistiky mají ukázat míru, do které se tato poučka v reálu naplňuje/nenaplňuje.
Tabulka pro první desítku prvočísel
Poř. č. |
p10 | f k | k∙l -1 | p14 | χ |
---|---|---|---|---|---|
1 | 2 | 1 | 0 | 2 | 3** |
2 | 3 | 2 | 1 | 3 | 2* |
3 | 5 | 2^2 | 2 | 5 | 2 |
4 | 7 | 2x3 | 0 | 7 | 2* |
5 | 11 | 2x5 | 2 | B | 3* |
6 | 13 | 2^2x3 | 12 | D | 2 |
7 | 17 | 2^4 | 1 | 13 | 3 |
8 | 19 | 2x3^2 | 1 | 15 | 4* |
9 | 23 | 2x11 | 1 | 19 | 2* |
10 | 29 | 2^2x7 | 1 | 21 | 2 |
Statistické vyhodnocení (n = 10)
- Délka periody = 0 (neperiodický zlomek pouze s jednocifernou předperiodou) - 20 %
- Délka periody maximální: - 50 %
- Délka periody poloviční (k/l = 2) - 20 %
- Délka periody dvanáctinová (k/l = 12) - 10 %
Tabulka pro první stovku prvočísel
Poř. č. |
p10 | f k | k∙l -1 | p14 | χ |
---|---|---|---|---|---|
1 | 2 | 1 | 0 | 2 | 3** |
2 | 3 | 2 | 1 | 3 | 2* |
3 | 5 | 2^2 | 2 | 5 | 2 |
4 | 7 | 2x3 | 0 | 7 | 2* |
5 | 11 | 2x5 | 2 | B | 3* |
6 | 13 | 2^2x3 | 12 | D | 2 |
7 | 17 | 2^4 | 1 | 13 | 3 |
8 | 19 | 2x3^2 | 1 | 15 | 4* |
9 | 23 | 2x11 | 1 | 19 | 2* |
10 | 29 | 2^2x7 | 1 | 21 | 2 |
11 | 31 | 2x3x5 | 2 | 23 | 7* |
12 | 37 | 2^2x3^2 | 3 | 29 | 2 |
13 | 41 | 2^3x5 | 5 | 2B | 6 |
14 | 43 | 2x3x7 | 2 | 31 | 9* |
15 | 47 | 2x23 | 2 | 35 | 2* |
16 | 53 | 2^2x13 | 1 | 3B | 2 |
17 | 59 | 2x29 | 1 | 43 | 3* |
18 | 61 | 2^2x3x5 | 10 | 45 | 2 |
19 | 67 | 2x3x11 | 6 | 4B | 4* |
20 | 71 | 2x5x7 | 7 | 51 | 2* |
21 | 73 | 2^3x3^2 | 1 | 53 | 5 |
22 | 79 | 2x3x13 | 3 | 59 | 2* |
23 | 83 | 2x41 | 1 | 5D | 3* |
24 | 89 | 2^3x11 | 1 | 65 | 3 |
25 | 97 | 2^5x3 | 1 | 6D | 5 |
26 | 101 | 2^2x5^2 | 10 | 73 | 2 |
27 | 103 | 2x3x17 | 6 | 75 | 2* |
28 | 107 | 2x53 | 2 | 79 | 3* |
29 | 109 | 2^2x3^3 | 1 | 7B | 6 |
30 | 113 | 2^4x7 | 4 | 81 | 3 |
31 | 127 | 2x3^2x7 | 1 | 91 | 9* |
32 | 131 | 2x5x13 | 1 | 95 | 3* |
33 | 137 | 2^3x17 | 4 | 9B | 3 |
34 | 139 | 2x3x23 | 3 | 9D | 4* |
35 | 149 | 2^2x37 | 1 | A9 | 2 |
36 | 151 | 2x3x5^2 | 1 | AB | 5 |
37 | 157 | 2^2x3x13 | 12 | B3 | 5 |
38 | 163 | 2x3^4 | 2 | B9 | 4* |
39 | 167 | 2x83 | 2 | BD | 2* |
40 | 173 | 2^2x43 | 1 | C5 | 2 |
41 | 179 | 2x89 | 2 | CB | 3* |
42 | 181 | 2^2x3^2x5 | 4 | CD | 2 |
43 | 191 | 2x5x19 | 5 | D9 | 2* |
44 | 193 | 2^6x3 | 6 | DB | 5 |
45 | 197 | 2^2x7^2 | 49 | 101 | 2 |
46 | 199 | 2x3^2x11 | 1 | 103 | 2* |
47 | 211 | 2x3x5x7 | 70 | 111 | 4* |
48 | 223 | 2x3x37 | 3 | 11D | 9* |
49 | 227 | 2x113 | 1 | 123 | 3* |
50 | 229 | 2^2x3x19 | 4 | 125 | 6 |
51 | 233 | 2^3x29 | 2 | 129 | 3 |
52 | 239 | 2x7x17 | 1 | 131 | 2* |
53 | 241 | 2^4x3x5 | 1 | 133 | 7 |
54 | 251 | 2x5^3 | 1 | 13D | 3* |
55 | 257 | 2^8 | 1 | 145 | 3 |
56 | 263 | 2x131 | 1 | 14B | 2* |
57 | 269 | 2^2x67 | 4 | 153 | 2 |
58 | 271 | 2x3^3x5 | 2 | 155 | 2* |
59 | 277 | 2^2x3x23 | 1 | 15B | 5 |
60 | 281 | 2^3x5x7 | 2 | 161 | 3 |
61 | 283 | 2x3x47 | 1 | 163 | 6* |
62 | 293 | 2^2x73 | 2 | 16D | 2 |
63 | 307 | 2x3^2x17 | 1 | 17D | 7* |
64 | 311 | 2x5x31 | 2 | 183 | 2* |
65 | 313 | 2^3x3x13 | 1 | 185 | 10 |
66 | 317 | 2^2x79 | 1 | 189 | 2 |
67 | 331 | 2x3x5x11 | 2 | 199 | 5* |
68 | 337 | 2^4x3x7 | 2 | 1A1 | 10 |
69 | 347 | 2x173 | 2 | 1AB | 3* |
70 | 349 | 2^2x3x29 | 4 | 1AD | 2 |
71 | 353 | 2^5x11 | 1 | 1B3 | 3 |
72 | 359 | 2x179 | 1 | 1B9 | 2* |
73 | 367 | 2x3x61 | 2 | 1C3 | 2* |
74 | 373 | 2^2x3x31 | 1 | 1C9 | 2 |
75 | 379 | 2x3^3x7 | 6 | 1D1 | 4* |
76 | 383 | 2x191 | 2 | 1D5 | 2* |
77 | 389 | 2^2x97 | 1 | 1DB | 2 |
78 | 397 | 2^2x3^2x11 | 44 | 205 | 5 |
79 | 401 | 2^4x5^2 | 8 | 209 | 3 |
80 | 409 | 2^3x3x17 | 3 | 213 | 21 |
81 | 419 | 2x11x19 | 1 | 21D | 3* |
82 | 421 | 2^2x3x5x7 | 1 | 221 | 2 |
83 | 431 | 2x5x43 | 1 | 22B | 5* |
84 | 433 | 2^4x3^3 | 1 | 22D | 5 |
85 | 439 | 2x3x73 | 6 | 235 | 5* |
86 | 443 | 2x13x17 | 2 | 239 | 3* |
87 | 449 | 2^6x7 | 2 | 241 | 3 |
88 | 457 | 2^3x3x19 | 2 | 249 | 13 |
89 | 461 | 2^2x5x23 | 20 | 24D | 2 |
90 | 463 | 2x3x7x11 | 11 | 251 | 2* |
91 | 467 | 2x233 | 1 | 255 | 3* |
92 | 479 | 2x239 | 2 | 263 | 2* |
93 | 487 | 2x3^5 | 1 | 26B | 2* |
94 | 491 | 2x5x7^2 | 10 | 271 | 4* |
95 | 499 | 2x3x83 | 2 | 279 | 5* |
96 | 503 | 2x251 | 2 | 27D | 2* |
97 | 509 | 2^2x127 | 4 | 285 | 2 |
98 | 521 | 2^3x5x13 | 1 | 293 | 3 |
99 | 523 | 2x3^2x29 | 3 | 295 | 4* |
100 | 541 | 2^2x3^3x5 | 1 | 2A9 | 2 |
Statistické vyhodnocení (n = 100)
- Délka periody = 0 (neperiodický zlomek pouze s jednocifernou předperiodou) - 2 %
- Délka periody maximální: - 39 %
- Délka periody poloviční (k/l = 2) - 26 %
- Délka periody třetinová (k/l = 3) - 5 %
- Délka periody čtvrtinová (k/l = 4) - 8 %
- Délka periody pětinová (k/l = 5) - 2 %
- Délka periody šestinová (k/l = 6) - 6 %
- Délka periody sedminová (k/l = 7) - 1 %
- Délka periody osminová (k/l = 8) - 1 %
- Délka periody desetinová (k/l = 10) - 3 %
- Délka periody jedenáctinová (k/l = 11) - 1 %
- Délka periody dvanáctinová (k/l = 12) - 2 %
- Délka periody dvacetinová (k/l = 20) - 1 %
- Délka periody k/l = 44) - 1 %
- Délka periody k/l = 49 - 1 %
- Délka periody k/l = 70 - 1 %
Tabulka pro první tisícovku prvočísel
Poř. č. |
p10 | f k | k∙l -1 | p14 | χ |
---|---|---|---|---|---|
1 | 2 | 1 | 0 | 2 | 3** |
2 | 3 | 2 | 1 | 3 | 2* |
3 | 5 | 2^2 | 2 | 5 | 2 |
4 | 7 | 2x3 | 0 | 7 | 2* |
5 | 11 | 2x5 | 2 | B | 3* |
6 | 13 | 2^2x3 | 12 | D | 2 |
7 | 17 | 2^4 | 1 | 13 | 3 |
8 | 19 | 2x3^2 | 1 | 15 | 4* |
9 | 23 | 2x11 | 1 | 19 | 2* |
10 | 29 | 2^2x7 | 1 | 21 | 2 |
11 | 31 | 2x3x5 | 2 | 23 | 7* |
12 | 37 | 2^2x3^2 | 3 | 29 | 2 |
13 | 41 | 2^3x5 | 5 | 2B | 6 |
14 | 43 | 2x3x7 | 2 | 31 | 9* |
15 | 47 | 2x23 | 2 | 35 | 2* |
16 | 53 | 2^2x13 | 1 | 3B | 2 |
17 | 59 | 2x29 | 1 | 43 | 3* |
18 | 61 | 2^2x3x5 | 10 | 45 | 2 |
19 | 67 | 2x3x11 | 6 | 4B | 4* |
20 | 71 | 2x5x7 | 7 | 51 | 2* |
21 | 73 | 2^3x3^2 | 1 | 53 | 5 |
22 | 79 | 2x3x13 | 3 | 59 | 2* |
23 | 83 | 2x41 | 1 | 5D | 3* |
24 | 89 | 2^3x11 | 1 | 65 | 3 |
25 | 97 | 2^5x3 | 1 | 6D | 5 |
26 | 101 | 2^2x5^2 | 10 | 73 | 2 |
27 | 103 | 2x3x17 | 6 | 75 | 2* |
28 | 107 | 2x53 | 2 | 79 | 3* |
29 | 109 | 2^2x3^3 | 1 | 7B | 6 |
30 | 113 | 2^4x7 | 4 | 81 | 3 |
31 | 127 | 2x3^2x7 | 1 | 91 | 9* |
32 | 131 | 2x5x13 | 1 | 95 | 3* |
33 | 137 | 2^3x17 | 4 | 9B | 3 |
34 | 139 | 2x3x23 | 3 | 9D | 4* |
35 | 149 | 2^2x37 | 1 | A9 | 2 |
36 | 151 | 2x3x5^2 | 1 | AB | 5 |
37 | 157 | 2^2x3x13 | 12 | B3 | 5 |
38 | 163 | 2x3^4 | 2 | B9 | 4* |
39 | 167 | 2x83 | 2 | BD | 2* |
40 | 173 | 2^2x43 | 1 | C5 | 2 |
41 | 179 | 2x89 | 2 | CB | 3* |
42 | 181 | 2^2x3^2x5 | 4 | CD | 2 |
43 | 191 | 2x5x19 | 5 | D9 | 2* |
44 | 193 | 2^6x3 | 6 | DB | 5 |
45 | 197 | 2^2x7^2 | 49 | 101 | 2 |
46 | 199 | 2x3^2x11 | 1 | 103 | 2* |
47 | 211 | 2x3x5x7 | 70 | 111 | 4* |
48 | 223 | 2x3x37 | 3 | 11D | 9* |
49 | 227 | 2x113 | 1 | 123 | 3* |
50 | 229 | 2^2x3x19 | 4 | 125 | 6 |
51 | 233 | 2^3x29 | 2 | 129 | 3 |
52 | 239 | 2x7x17 | 1 | 131 | 2* |
53 | 241 | 2^4x3x5 | 1 | 133 | 7 |
54 | 251 | 2x5^3 | 1 | 13D | 3* |
55 | 257 | 2^8 | 1 | 145 | 3 |
56 | 263 | 2x131 | 1 | 14B | 2* |
57 | 269 | 2^2x67 | 4 | 153 | 2 |
58 | 271 | 2x3^3x5 | 2 | 155 | 2* |
59 | 277 | 2^2x3x23 | 1 | 15B | 5 |
60 | 281 | 2^3x5x7 | 2 | 161 | 3 |
61 | 283 | 2x3x47 | 1 | 163 | 6* |
62 | 293 | 2^2x73 | 2 | 16D | 2 |
63 | 307 | 2x3^2x17 | 1 | 17D | 7* |
64 | 311 | 2x5x31 | 2 | 183 | 2* |
65 | 313 | 2^3x3x13 | 1 | 185 | 10 |
66 | 317 | 2^2x79 | 1 | 189 | 2 |
67 | 331 | 2x3x5x11 | 2 | 199 | 5* |
68 | 337 | 2^4x3x7 | 2 | 1A1 | 10 |
69 | 347 | 2x173 | 2 | 1AB | 3* |
70 | 349 | 2^2x3x29 | 4 | 1AD | 2 |
71 | 353 | 2^5x11 | 1 | 1B3 | 3 |
72 | 359 | 2x179 | 1 | 1B9 | 2* |
73 | 367 | 2x3x61 | 2 | 1C3 | 2* |
74 | 373 | 2^2x3x31 | 1 | 1C9 | 2 |
75 | 379 | 2x3^3x7 | 6 | 1D1 | 4* |
76 | 383 | 2x191 | 2 | 1D5 | 2* |
77 | 389 | 2^2x97 | 1 | 1DB | 2 |
78 | 397 | 2^2x3^2x11 | 44 | 205 | 5 |
79 | 401 | 2^4x5^2 | 8 | 209 | 3 |
80 | 409 | 2^3x3x17 | 3 | 213 | 21 |
81 | 419 | 2x11x19 | 1 | 21D | 3* |
82 | 421 | 2^2x3x5x7 | 1 | 221 | 2 |
83 | 431 | 2x5x43 | 1 | 22B | 5* |
84 | 433 | 2^4x3^3 | 1 | 22D | 5 |
85 | 439 | 2x3x73 | 6 | 235 | 5* |
86 | 443 | 2x13x17 | 2 | 239 | 3* |
87 | 449 | 2^6x7 | 2 | 241 | 3 |
88 | 457 | 2^3x3x19 | 2 | 249 | 13 |
89 | 461 | 2^2x5x23 | 20 | 24D | 2 |
90 | 463 | 2x3x7x11 | 11 | 251 | 2* |
91 | 467 | 2x233 | 1 | 255 | 3* |
92 | 479 | 2x239 | 2 | 263 | 2* |
93 | 487 | 2x3^5 | 1 | 26B | 2* |
94 | 491 | 2x5x7^2 | 10 | 271 | 4* |
95 | 499 | 2x3x83 | 2 | 279 | 5* |
96 | 503 | 2x251 | 2 | 27D | 2* |
97 | 509 | 2^2x127 | 4 | 285 | 2 |
98 | 521 | 2^3x5x13 | 1 | 293 | 3 |
99 | 523 | 2x3^2x29 | 3 | 295 | 4* |
100 | 541 | 2^2x3^3x5 | 1 | 2A9 | 2 |
101 | 547 | 2x3x7x13 | 26 | 2B1 | 4* |
102 | 557 | 2^2x139 | 1 | 2BB | 2 |
103 | 563 | 2x281 | 1 | 2C3 | 3* |
104 | 569 | 2^3x71 | 4 | 2C9 | 3 |
105 | 571 | 2x3x5x19 | 2 | 2CB | 5* |
106 | 577 | 2^6x3^2 | 3 | 2D3 | 5 |
107 | 587 | 2x293 | 1 | 2DD | 3* |
108 | 593 | 2^4x37 | 1 | 305 | 3 |
109 | 599 | 2x13x23 | 1 | 30B | 2* |
110 | 601 | 2^3x3x5^2 | 1 | 30D | 7 |
111 | 607 | 2x3x101 | 2 | 315 | 2* |
112 | 613 | 2^2x3^2x17 | 1 | 31B | 2 |
113 | 617 | 2^3x7x11 | 2 | 321 | 3 |
114 | 619 | 2x3x103 | 3 | 323 | 4* |
115 | 631 | 2x3^2x5x7 | 1 | 331 | 9* |
116 | 641 | 2^7x5 | 4 | 33B | 3 |
117 | 643 | 2x3x107 | 1 | 33D | 7* |
118 | 647 | 2x17x19 | 2 | 343 | 2* |
119 | 653 | 2^2x163 | 1 | 349 | 2 |
120 | 659 | 2x7x47 | 14 | 351 | 3* |
121 | 661 | 2^2x3x5x11 | 2 | 353 | 2 |
122 | 673 | 2^5x3x7 | 4 | 361 | 5 |
123 | 677 | 2^2x13^2 | 4 | 365 | 2 |
124 | 683 | 2x11x31 | 2 | 36B | 10* |
125 | 691 | 2x3x5x23 | 5 | 375 | 6* |
126 | 701 | 2^2x5^2x7 | 1 | 381 | 2 |
127 | 709 | 2^2x3x59 | 1 | 389 | 2 |
128 | 719 | 2x359 | 2 | 395 | 2* |
129 | 727 | 2x3x11^2 | 2 | 39D | 7* |
130 | 733 | 2^2x3x61 | 2 | 3A5 | 6 |
131 | 739 | 2x3^2x41 | 2 | 3AB | 6* |
132 | 743 | 2x7x53 | 1 | 3B1 | 2* |
133 | 751 | 2x3x5^3 | 1 | 3B9 | 2* |
134 | 757 | 2^2x3^3x7 | 1 | 3C1 | 2 |
135 | 761 | 2^3x5x19 | 1 | 3C5 | 6 |
136 | 769 | 2^8x3 | 1 | 3CD | 11 |
137 | 773 | 2^2x193 | 2 | 3D3 | 2 |
138 | 787 | 2x3x131 | 1 | 403 | 4* |
139 | 797 | 2^2x199 | 4 | 40D | 2 |
140 | 809 | 2^3x101 | 2 | 41B | 3 |
141 | 811 | 2x3^4x5 | 27 | 41D | 5* |
142 | 821 | 2^2x5x41 | 1 | 429 | 2 |
143 | 823 | 2x3x137 | 1 | 42B | 2* |
144 | 827 | 2x7x59 | 2 | 431 | 3* |
145 | 829 | 2^2x3^2x23 | 2 | 433 | 2 |
146 | 839 | 2x419 | 2 | 43D | 2* |
147 | 853 | 2^2x3x71 | 4 | 44D | 2 |
148 | 857 | 2^3x107 | 1 | 453 | 3 |
149 | 859 | 2x3x11x13 | 1 | 455 | 4* |
150 | 863 | 2x431 | 1 | 459 | 2* |
151 | 877 | 2^2x3x73 | 1 | 469 | 2 |
152 | 881 | 2^4x5x11 | 46D | 3 | |
153 | 883 | 2x3^2x7^2 | 471 | 4* | |
154 | 887 | 2x443 | 475 | 2* | |
155 | 907 | 2x3x151 | 48B | 4* | |
156 | 911 | 2x5x7x13 | 491 | 3* | |
157 | 919 | 2x3^3x17 | 499 | 5* | |
158 | 929 | 2^5x29 | 4A5 | 3 | |
159 | 937 | 2^3x3^2x13 | 4AD | 5 | |
160 | 941 | 2^2x5x47 | 4B3 | 2 | |
161 | 947 | 2x11x43 | 4B9 | 3* | |
162 | 953 | 2^3x7x17 | 3 | ||
163 | 967 | 2x3x7x23 | 2* | ||
164 | 971 | 2x5x97 | 3* | ||
165 | 977 | 2^4x61 | 3 | ||
166 | 983 | 2x491 | 2* | ||
167 | 991 | 2x3^2x5x11 | 2* | ||
168 | 997 | 2^2x3x83 | 7 | ||
169 | 1009 | 2^4x3^2x7 | 11 | ||
170 | 1013 | 2^2x11x23 | 3 | ||
171 | 1019 | 2x509 | 3* | ||
172 | 1021 | 2^2x3x5x17 | 10 | ||
173 | 1031 | 2x5x103 | 2* | ||
174 | 1033 | 2^3x3x43 | 5 | ||
175 | 1039 | 2x3x173 | 2* | ||
176 | 1049 | 2^3x131 | 3 | ||
177 | 1051 | 2x3x5^2x7 | 5* | ||
178 | 1061 | 2^2x5x53 | 2 | ||
179 | 1063 | 2x3^2x59 | 2* | ||
180 | 1069 | 2^2x3x89 | 6 | ||
181 | 1087 | 2x3x181 | 2* | ||
182 | 1091 | 2x5x109 | 4* | ||
183 | 1093 | 2^2x3x7x13 | 5 | ||
184 | 1097 | 2^3x137 | 3 | ||
185 | 1103 | 2x19x29 | 3* | ||
186 | 1109 | 2^2x277 | 2 | ||
187 | 1117 | 2^2x3^2x31 | 2 | ||
188 | 1123 | 2x3x11x17 | 4* | ||
189 | 1129 | 2^3x3x47 | 11 | ||
190 | 1151 | 2x5^2x23 | 2* | ||
191 | 1153 | 2^7x3^2 | 5 | ||
192 | 1163 | 2x7x83 | 3* | ||
193 | 1171 | 2x3^x5x13 | 4* | ||
194 | 1181 | 2^2x5x59 | 7 | ||
195 | 1187 | 2x593 | 3* | ||
196 | 1193 | 2^3x149 | 3 | ||
197 | 1201 | 2^4x3x5^2 | 11 | ||
198 | 1213 | 2^2x3x101 | 2 | ||
199 | 1217 | 2^6x19 | 3 | ||
200 | 1223 | 2x13x47 | 2* | ||
201 | 1229 | 2^2x307 | 2 | ||
202 | 1231 | 2x3x5x41 | 2* | ||
203 | 1237 | 2^2x3x103 | 2 | ||
204 | 1249 | 2^5x3x13 | 11 | ||
205 | 1259 | 2x17x37 | 3* | ||
206 | 1277 | 2^2x11x29 | 2 | ||
207 | 1279 | 2x3^2x71 | 2* | ||
208 | 1283 | 2x641 | 3* | ||
209 | 1289 | 2^3x7x23 | 6 | ||
210 | 1291 | 2x3x5x43 | 4* | ||
211 | 1297 | 2^4x3^4 | 10 | ||
212 | 1301 | 2^2x5^2x13 | 2 | ||
213 | 1303 | 2x3x7x31 | 2* | ||
214 | 1307 | 2x653 | 3* | ||
215 | 1319 | 2x659 | 3* | ||
216 | 1321 | 2^3x3x5x11 | 13 | ||
217 | 1327 | 2x3x13x17 | 9* | ||
218 | 1361 | 2^4x5x17 | 3 | ||
219 | 1367 | 2x683 | 2* | ||
220 | 1373 | 2^2x7^3 | 2 | ||
221 | 1381 | 2^2x3x5x23 | 2 | ||
222 | 1399 | 2x3x233 | 5* | ||
223 | 1409 | 2^7x11 | 3 | ||
224 | 1423 | 2x3^2x79 | 9* | ||
225 | 1427 | 2x23x31 | 3* | ||
226 | 1429 | 2^2x3x7x17 | 6 | ||
227 | 1433 | 2^3x179 | 3 | ||
228 | 1439 | 2x719 | 2* | ||
229 | 1447 | 2x3x241 | 2* | ||
230 | 1451 | 2x5^2x29 | 3* | ||
231 | 1453 | 2^2x3x11^2 | 2 | ||
232 | 1459 | 2x3^6 | 6* | ||
233 | 1471 | 2x3x5x7^2 | 5* | ||
234 | 1481 | 2^3x5x37 | 3 | ||
235 | 1483 | 2x3x13x19 | 4* | ||
236 | 1487 | 2x743 | 2* | ||
237 | 1489 | 2^4x3x31 | 14 | ||
238 | 1493 | 2^2x373 | 2 | ||
239 | 1499 | 2x7x107 | 2* | ||
240 | 1511 | 2x5x151 | 2* | ||
241 | 1523 | 2x761 | 3* | ||
242 | 1531 | 2x3^2x5x17 | 4* | ||
243 | 1543 | 2x3x257 | 2* | ||
244 | 1549 | 2^2x3^2x43 | 2 | ||
245 | 1553 | 2^4x97 | 3 | ||
246 | 1559 | 2x19x41 | 2* | ||
247 | 1567 | 2x3^3x29 | 2* | ||
248 | 1571 | 2x5x157 | 3* | ||
249 | 1579 | 2x3x263 | 5* | ||
250 | 1583 | 2x7x113 | 2* | ||
251 | 1597 | 2^2x3x7x19 | 11 | ||
252 | 1601 | 2^6x5^2 | 3 | ||
253 | 1607 | 2x11x73 | 2* | ||
254 | 1609 | 2^3x3x67 | 7 | ||
255 | 1613 | 2^2x13x31 | 3 | ||
256 | 1619 | 2x809 | 3* | ||
257 | 1621 | 2^2x3^4x5 | 2 | ||
258 | 1627 | 2x3x271 | 6* | ||
259 | 1637 | 2^2x409 | 2 | ||
260 | 1657 | 2^3x3^2x23 | 11 | ||
261 | 1663 | 2x3x277 | 2* | ||
262 | 1667 | 2x7^2x17 | 3* | ||
263 | 1669 | 2^2x3x139 | 2 | ||
264 | 1693 | 2^2x3^2x47 | 2 | ||
265 | 1697 | 2^5x53 | 3 | ||
266 | 1699 | 2x3x283 | 6* | ||
267 | 1709 | 2^2x7x61 | 3 | ||
268 | 1721 | 2^3x5x43 | 3 | ||
269 | 1723 | 2x3x7x41 | 6* | ||
270 | 1733 | 2^2x433 | 2 | ||
271 | 1741 | 2^2x3x5x29 | 2 | ||
272 | 1747 | 2x3^2x97 | 4* | ||
273 | 1753 | 2^3x3x73 | 7 | ||
274 | 1759 | 2x3x293 | 2* | ||
275 | 1777 | 2^4x3x37 | 5 | ||
276 | 1783 | 2x3^4x11 | 2* | ||
277 | 1787 | 2x19x47 | 3* | ||
278 | 1789 | 2^2x3x149 | 6 | ||
279 | 1801 | 2^3x3^2x5^2 | 11 | ||
280 | 1811 | 2x5x181 | 3* | ||
281 | 1823 | 2x911 | 2* | ||
282 | 1831 | 2x3x5x61 | 9* | ||
283 | 1847 | 2x13x71 | 2* | ||
284 | 1861 | 2^2x3x5x31 | 2 | ||
285 | 1867 | 2x3x311 | 4* | ||
286 | 1871 | 2x5x11x17 | 2* | ||
287 | 1873 | 2^4x3^2x13 | 10 | ||
288 | 1877 | 2^2x7x67 | 2 | ||
289 | 1879 | 2x3x313 | 2* | ||
290 | 1889 | 2^5x59 | 3 | ||
291 | 1901 | 2^2x5^2x19 | 2 | ||
292 | 1907 | 2x953 | 3* | ||
293 | 1913 | 2^3x239 | 3 | ||
294 | 1931 | 2x5x193 | 3* | ||
295 | 1933 | 2^2x3x7x23 | 5 | ||
296 | 1949 | 2^2x487 | 2 | ||
297 | 1951 | 2x3x5^2x13 | 2* | ||
298 | 1973 | 2^2x17x29 | 2 | ||
299 | 1979 | 2x23x43 | 3* | ||
300 | 1987 | 2x3x331 | 4* | ||
301 | 1993 | 2^3x3x83 | 5 | ||
302 | 1997 | 2^2x499 | 2 | ||
303 | 1999 | 2x3^3x37 | 5* | ||
304 | 2003 | 2x7x11x13 | 3* | ||
305 | 2011 | 2x3x5x67 | 5* | ||
306 | 2017 | 2^5x3^2x7 | 5 | ||
307 | 2027 | 2x1013 | 3* | ||
308 | 2029 | 2^2x3x13^2 | 2 | ||
309 | 2039 | 2x1019 | 2* | ||
310 | 2053 | 2^2x3^3x19 | 2 | ||
311 | 2063 | 2x1031 | 2* | ||
312 | 2069 | 2^3x11x47 | 4* | ||
313 | 2081 | 2^5x5x13 | 3 | ||
314 | 2083 | 2x3x347 | 4* | ||
315 | 2087 | 2x7x149 | 2* | ||
316 | 2089 | 2^3x3^2x29 | 7 | ||
317 | 2099 | 2x1049 | 3* | ||
318 | 2111 | 2x5x211 | 2* | ||
319 | 2113 | 2^6x3x11 | 5 | ||
320 | 2129 | 2^4x7x19 | 3 | ||
321 | 2131 | 2x3x5x71 | 4* | ||
322 | 2137 | 2^3x3x89 | 10 | ||
323 | 2141 | 2^2x5x107 | 2 | ||
324 | 2143 | 2x3^2x7x17 | 9* | ||
325 | 2153 | 2^3x269 | 3 | ||
326 | 2161 | 2^4x3^3x5 | 23 | ||
327 | 2179 | 2x3^2x11^2 | 5* | ||
328 | 2203 | 2x3x367 | 2* | ||
329 | 2207 | 2x1103 | 2* | ||
330 | 2213 | 2^2x7x79 | 2 | ||
331 | 2221 | 2^2x3x5x37 | 2 | ||
332 | 2237 | 2^2x557 | 2 | ||
333 | 2239 | 2x3x373 | 2* | ||
334 | 2243 | 2x19x59 | 3* | ||
335 | 2251 | 2x3^2x5^3 | 5* | ||
336 | 2267 | 2x11x103 | 3* | ||
337 | 2269 | 2^2x3^4x7 | 2 | ||
338 | 2273 | 2^5x71 | 3 | ||
339 | 2281 | 2^3x3x5x19 | 7 | ||
340 | 2287 | 2x3^2x127 | 7* | ||
341 | 2293 | 2^2x3x191 | 2 | ||
342 | 2297 | 2^3x7x41 | 5 | ||
343 | 2309 | 2^2x577 | 2 | ||
344 | 2311 | 2x3x5x7x11 | 2* | ||
345 | 2333 | 2^2x11x53 | 2 | ||
346 | 2339 | 2x7x167 | 3* | ||
347 | 2341 | 2^2x3^2x5x13 | 7 | ||
348 | 2347 | 2x3x17x23 | 6* | ||
349 | 2351 | 2x5^2x47 | 3* | ||
350 | 2357 | 2^2x19x31 | 2 | ||
351 | 2371 | 2x3x5x79 | 4* | ||
352 | 2377 | 2^3x3^3x11 | 5 | ||
353 | 2381 | 2^2x5x7x17 | 3 | ||
354 | 2383 | 2x3x397 | 13* | ||
355 | 2389 | 2^2x3x199 | 2 | ||
356 | 2393 | 2^3x13x23 | 3 | ||
357 | 2399 | 2x11x109 | 2* | ||
358 | 2411 | 2x5x241 | 3* | ||
359 | 2417 | 2^4x151 | 3 | ||
360 | 2423 | 2x7x173 | 2* | ||
361 | 2437 | 2^2x3x7x29 | 2 | ||
362 | 2441 | 2^3x5x61 | 6 | ||
363 | 2447 | 2x1223 | 2* | ||
364 | 2459 | 2x1229 | 3* | ||
365 | 2467 | 2x3^2x137 | 4* | ||
366 | 2473 | 2^3x3x103 | 5 | ||
367 | 2477 | 2^2x619 | 2 | ||
368 | 2503 | 2x3^2x139 | 2* | ||
369 | 2521 | 2^3x3^2x5x7 | 17 | ||
370 | 2531 | 2x5x11x23 | 3* | ||
371 | 2539 | 2x3^3x47 | 4* | ||
372 | 2543 | 2x31x41 | 2* | ||
373 | 2549 | 2^2x7^2x13 | 2 | ||
374 | 2551 | 2x3x5^2x17 | 2* | ||
375 | 2557 | 2^2x3^2x71 | 2 | ||
376 | 2579 | 2x1289 | 3* | ||
377 | 2591 | 2x5x7x37 | 2* | ||
378 | 2593 | 2^5x3^4 | 7 | ||
379 | 2609 | 2^4x163 | 3 | ||
380 | 2617 | 2^3x3x109 | 5 | ||
381 | 2621 | 2^2x5x131 | 2 | ||
382 | 2633 | 2^3x7x47 | 3 | ||
383 | 2647 | 2x3^3x7^2 | 2* | ||
384 | 2657 | 2^5x83 | 3 | ||
385 | 2659 | 2x3x443 | 4* | ||
386 | 2663 | 2x11^3 | 2* | ||
387 | 2671 | 2x3x5x89 | 5* | ||
388 | 2677 | 2^2x3x223 | 2 | ||
389 | 2683 | 2x3^2x149 | 4* | ||
390 | 2687 | 2x17x79 | 3* | ||
391 | 2689 | 2^7x3x7 | 19 | ||
392 | 2693 | 2^2x673 | 2 | ||
393 | 2699 | 2x19x71 | 3* | ||
394 | 2707 | 2x3x11x41 | 4* | ||
395 | 2711 | 2x5x271 | 2* | ||
396 | 2713 | 2^3x3x113 | 5 | ||
397 | 2719 | 2x3^2x151 | 2* | ||
398 | 2729 | 2^3x11x31 | 3 | ||
399 | 2731 | 2x3x5x7x13 | 5* | ||
400 | 2741 | 2^2x5x137 | 2 | ||
401 | 2749 | 2^2x3x229 | 6 | ||
402 | 2753 | 2^6x43 | 3 | ||
403 | 2767 | 2x3x461 | 9* | ||
404 | 2777 | 2^3x347 | 3 | ||
405 | 2789 | 2^2x17x41 | 2 | ||
406 | 2791 | 2x3^2x5x31 | 7* | ||
407 | 2797 | 2^2x3x233 | 2 | ||
408 | 2801 | 2^4x5^2x7 | 3 | ||
409 | 2803 | 2x3x467 | 4* | ||
410 | 2819 | 2x1409 | 3* | ||
411 | 2833 | 2^4x3x59 | 5 | ||
412 | 2837 | 2^2x709 | 2 | ||
413 | 2843 | 2x7^2x29 | 4* | ||
414 | 2851 | 2x3x5^2x19 | 4* | ||
415 | 2857 | 2^3x3x7x17 | 11 | ||
416 | 2861 | 2^2x5x11x13 | 2 | ||
417 | 2879 | 2x1439 | 2* | ||
418 | 2887 | 2x3x13x37 | 2* | ||
419 | 2897 | 2^4x181 | 3 | ||
420 | 2903 | 2x1451 | 2* | ||
421 | 2909 | 2^2x727 | 2 | ||
422 | 2917 | 2^2x3^6 | 5 | ||
423 | 2927 | 2x7x11x19 | 2* | ||
424 | 2939 | 2x13x113 | 3* | ||
425 | 2953 | 2^3x3^2x41 | 13 | ||
426 | 2957 | 2^2x739 | 2 | ||
427 | 2963 | 2x1481 | 3* | ||
428 | 2969 | 2^3x7x53 | 3 | ||
429 | 2971 | 2x3^3x5x11 | 5* | ||
430 | 2999 | 2x1499 | 2* | ||
431 | 3001 | 2^3x3x5^3 | 2* | ||
432 | 3011 | 2x5x7x43 | 3* | ||
433 | 3019 | 2x3x503 | 4* | ||
434 | 3023 | 2x1511 | 2* | ||
435 | 3037 | 2^2x3x11x23 | 2 | ||
436 | 3041 | 2^5x5x19 | 3 | ||
437 | 3049 | 2^3x3x127 | 11 | ||
438 | 3061 | 2^2x3^2x5x17 | 6 | ||
439 | 3067 | 2x3x7x73 | 4* | ||
440 | 3079 | 2x3^4x19 | 2* | ||
441 | 3083 | 2x23x67 | 3* | ||
442 | 3089 | 2^4x193 | 3 | ||
443 | 3109 | 2^2x3x7x37 | 6 | ||
444 | 3119 | 2x1559 | 2* | ||
445 | 3121 | 2^4x3x5x13 | 7 | ||
446 | 3137 | 2^6x7^2 | 3 | ||
447 | 3163 | 2x3x17x31 | 6* | ||
448 | 3167 | 2x1583 | 2* | ||
449 | 3169 | 2^5x3^2x11 | 7 | ||
450 | 3181 | 2^2x3x5x53 | 7 | ||
451 | 3187 | 2x3^3x59 | 2* | ||
452 | 3191 | 2x5x11x29 | 5* | ||
453 | 3203 | 2x1601 | 3* | ||
454 | 3209 | 2^3x401 | 3 | ||
455 | 3217 | 2^4x3x67 | 5 | ||
456 | 3221 | 2^2x5x7x23 | 10 | ||
457 | 3229 | 2^2x3x269 | 6 | ||
458 | 3251 | 2x5^3x13 | 3* | ||
459 | 3253 | 2^2x3x271 | 2 | ||
460 | 3257 | 2^3x11x37 | 3 | ||
461 | 3259 | 2x3^2x181 | 5* | ||
462 | 3271 | 2x3x5x109 | 5* | ||
463 | 3299 | 2x17x97 | 3* | ||
464 | 3301 | 2^2x3x5^2x11 | 6 | ||
465 | 3307 | 2x3x19x29 | 4* | ||
466 | 3313 | 2^4x3^2x23 | 10 | ||
467 | 3319 | 2x3x7x79 | 2* | ||
468 | 3323 | 2x11x151 | 3* | ||
469 | 3329 | 2^8x13 | 3 | ||
470 | 3331 | 2x3^2x5x37 | 3 | ||
471 | 3343 | 2x3x557 | 11* | ||
472 | 3347 | 2x7x239 | 3* | ||
473 | 3359 | 2x23x73 | 2* | ||
474 | 3361 | 2^5x3x5x7 | 22 | ||
475 | 3371 | 2x5x337 | 3* | ||
476 | 3373 | 2^2x3x281 | 10 | ||
477 | 3389 | 2^2x7x11^2 | 3 | ||
478 | 3391 | 2x3x5x113 | 5* | ||
479 | 3407 | 2x13x131 | 2* | ||
480 | 3413 | 2^2x853 | 2 | ||
481 | 3433 | 2^3x3x11x13 | 5 | ||
482 | 3449 | 2^3x431 | 3 | ||
483 | 3457 | 2^7x3^3 | 7 | ||
484 | 3461 | 2^2x5x173 | 2 | ||
485 | 3463 | 2x3x577 | 9* | ||
486 | 3467 | 2x1733 | 3* | ||
487 | 3469 | 2^2x3x17^2 | 2 | ||
488 | 3491 | 2x5x349 | 3* | ||
489 | 3499 | 2x3x11x53 | 4* | ||
490 | 3511 | 2x3^3x5x13 | 2* | ||
491 | 3517 | 2^2x3x293 | 2 | ||
492 | 3527 | 2x41x43 | 2* | ||
493 | 3529 | 2^3x3^2x7^2 | 17 | ||
494 | 3533 | 2^2x883 | 2 | ||
495 | 3539 | 2x29x61 | 3* | ||
496 | 3541 | 2^2x3x5x59 | 7 | ||
497 | 3547 | 2x3^2x197 | 4* | ||
498 | 3557 | 2^2x7x127 | 2 | ||
499 | 3559 | 2x3x593 | 2* | ||
500 | 3571 | 2x3x5x7x17 | 4* | ||
501 | 3581 | 2^2x5x179 | 2 | ||
502 | 3583 | 2x3^2x199 | 2* | ||
503 | 3593 | 2^3x449 | 3 | ||
504 | 3607 | 2x3x601 | 11* | ||
505 | 3613 | 2^2x3x7x43 | 2 | ||
506 | 3617 | 2^5x113 | 3 | ||
507 | 3623 | 2x1811 | 2* | ||
508 | 3631 | 2x3x5x11^2 | 10* | ||
509 | 3637 | 2^2x3^2x101 | 2 | ||
510 | 3643 | 2x3x607 | 4* | ||
511 | 3659 | 2x31x59 | 3* | ||
512 | 3671 | 2x5x367 | 2* | ||
513 | 3673 | 2^3x3^3x17 | 5 | ||
514 | 3677 | 2^2x919 | 2 | ||
515 | 3691 | 2x3^2x5x41 | 4* | ||
516 | 3697 | 2^4x3x7x11 | 5 | ||
517 | 3701 | 2^2x5^2x37 | 2 | ||
518 | 3709 | 2^2x3^2x103 | 2 | ||
519 | 3719 | 2x11x13^2 | 2* | ||
520 | 3727 | 2x3^4x23 | 2* | ||
521 | 3733 | 2^2x3x311 | 2 | ||
522 | 3739 | 2x3x7x89 | 5* | ||
523 | 3761 | 2^4x5x47 | 3 | ||
524 | 3767 | 2x7x269 | 2* | ||
525 | 3769 | 2^3x3x157 | 7 | ||
526 | 3779 | 2x1889 | 2* | ||
527 | 3793 | 2^4x3x79 | 5 | ||
528 | 3797 | 2^2x13x73 | 2 | ||
529 | 3803 | 2x1901 | 3* | ||
530 | 3821 | 2^2x5x191 | 3 | ||
531 | 3823 | 2x3x7^2x13 | 9* | ||
532 | 3833 | 2^3x479 | 3 | ||
533 | 3847 | 2x3x641 | 2* | ||
534 | 3851 | 2x5^2x7x11 | 4* | ||
535 | 3853 | 2^2x3^2x107 | 2 | ||
536 | 3863 | 2x1931 | 2* | ||
537 | 3877 | 2^2x3x17x19 | 2 | ||
538 | 3881 | 2^3x5x97 | 13 | ||
539 | 3889 | 2^4x3^5 | 2 | ||
540 | 3907 | 2x3^2x7x31 | 4* | ||
541 | 3911 | 2x5x17x23 | 2* | ||
542 | 3917 | 2^2x11x89 | 2 | ||
543 | 3919 | 2x3x653 | 2* | ||
544 | 3923 | 2x37x53 | 3* | ||
545 | 3929 | 2^3x491 | 3 | ||
546 | 3931 | 2x3x5x131 | 4* | ||
547 | 3943 | 2x3^3x73 | 9* | ||
548 | 3947 | 2x1973 | 3* | ||
549 | 3967 | 2x3x661 | 2* | ||
550 | 3989 | 2^2x997 | 2 | ||
551 | 4001 | 2^5x5^3 | 3 | ||
552 | 4003 | 2x3x23x29 | 4* | ||
553 | 4007 | 2x2003 | 2* | ||
554 | 4013 | 2^2x17x59 | 2 | ||
555 | 4019 | 2x7^2x41 | 4* | ||
556 | 4021 | 2^2x3x5x67 | 2 | ||
557 | 4027 | 2x3x11x61 | 6* | ||
558 | 4049 | 2^4x11x23 | 3 | ||
559 | 4051 | 2x3^4x5^2 | 5* | ||
560 | 4057 | 2^3x3x13^2 | 5 | ||
561 | 4073 | 2^3x509 | 2 | ||
562 | 4079 | 2x2039 | 2* | ||
563 | 4091 | 2x5x409 | 3* | ||
564 | 4093 | 2^2x3x11x31 | 2 | ||
565 | 4099 | 2x3x683 | 4* | ||
566 | 4111 | 2x3x5x137 | 2* | ||
567 | 4127 | 2x2063 | 2* | ||
568 | 4129 | 2^5x3x43 | 13 | ||
569 | 4133 | 2^2x1033 | 2 | ||
570 | 4139 | 2x2069 | 3* | ||
571 | 4153 | 2^3x3x173 | 5 | ||
572 | 4157 | 2^2x1039 | 2 | ||
573 | 4159 | 2x3^3x7x11 | 2* | ||
574 | 4177 | 2^4x3^2x29 | 5 | ||
575 | 4201 | 2^3x3x5^2x7 | 11 | ||
576 | 4211 | 2x5x421 | 3* | ||
577 | 4217 | 2^3x17x31 | 5 | ||
578 | 4219 | 2x3x19x37 | 4* | ||
579 | 4229 | 2^2x7x151 | 2 | ||
580 | 4231 | 2x3^2x5x47 | 2* | ||
581 | 4241 | 2^4x5x53 | 3 | ||
582 | 4243 | 2x3x7x101 | 4* | ||
583 | 4253 | 2^2x1063 | 2 | ||
584 | 4259 | 2x2129 | 3* | ||
585 | 4261 | 2^2x3x5x71 | 2 | ||
586 | 4271 | 2x5x7x61 | 3* | ||
587 | 4273 | 2^4x3x89 | 5 | ||
588 | 4283 | 2x2141 | 3* | ||
589 | 4289 | 2^6x67 | 3 | ||
590 | 4297 | 2^3x3x179 | 3 | ||
591 | 4327 | 2x3x7x103 | 2* | ||
592 | 4337 | 2^4x271 | 3 | ||
593 | 4339 | 2x3^2x241 | 5* | ||
594 | 4349 | 2^2x1087 | 2 | ||
595 | 4357 | 2^2x3^2x11^2 | 2 | ||
596 | 4363 | 2x3x727 | 4* | ||
597 | 4373 | 2^2x1093 | 2 | ||
598 | 4391 | 2x5x439 | 2* | ||
599 | 4397 | 2^2x7x157 | 2 | ||
600 | 4409 | 2^3x7x19x29 | 3 | ||
601 | 4421 | 2^2x5x13x17 | 3 | ||
602 | 4423 | 2x3x11x67 | 7* | ||
603 | 4441 | 2^3x3x5x37 | 21 | ||
604 | 4447 | 2x3^2x13x19 | 2* | ||
605 | 4451 | 2x5^2x89 | 3* | ||
606 | 4457 | 2^3x557 | 3 | ||
607 | 4463 | 2x23x97 | 2* | ||
608 | 4481 | 2^7x5x7 | 3 | ||
609 | 4483 | 2x3^3x83 | 4* | ||
610 | 4493 | 2^2x1123 | 2 | ||
611 | 4507 | 2x3x751 | 4* | ||
612 | 4513 | 2^5x3x47 | 7 | ||
613 | 4517 | 2^2x1129 | 2 | ||
614 | 4519 | 2x3^2x251 | 9* | ||
615 | 4523 | 2x7x17x19 | 3* | ||
616 | 4547 | 2x2273 | 3* | ||
617 | 4549 | 2^2x3x379 | 6 | ||
618 | 4561 | 2^4x3x5x19 | 11 | ||
619 | 4567 | 2x3x761 | 7* | ||
620 | 4583 | 2x29x79 | 2* | ||
621 | 4591 | 2x3^3x5x17 | 2* | ||
622 | 4597 | 2^2x3x383 | 5 | ||
623 | 4603 | 2x3x13x59 | 4* | ||
624 | 4621 | 2^2x3x5x7x11 | 2 | ||
625 | 4637 | 2^2x19x61 | 2 | ||
626 | 4639 | 2x3x773 | 2* | ||
627 | 4643 | 2x11x211 | 3* | ||
628 | 4649 | 2^3x7x83 | 3 | ||
629 | 4651 | 2x3x5^2x31 | 5* | ||
630 | 4657 | 2^4x3x97 | 15 | ||
631 | 4663 | 2x3^2x7x37 | 9* | ||
632 | 4673 | 2^6x73 | 3 | ||
633 | 4679 | 2x2339 | 2* | ||
634 | 4691 | 2x5x7x67 | 3* | ||
635 | 4703 | 2x2351 | 2* | ||
636 | 4721 | 2^4x5x59 | 3 | ||
637 | 4723 | 2x3x787 | 4* | ||
638 | 4729 | 2^3x3x197 | 17 | ||
639 | 4733 | 2^2x7x13^2 | 5 | ||
640 | 4751 | 2x5^3x19 | 3* | ||
641 | 4759 | 2x3x13x61 | 5* | ||
642 | 4783 | 2x3x797 | 2* | ||
643 | 4787 | 2x2393 | 3* | ||
644 | 4789 | 2^2x3^2x7x19 | 2 | ||
645 | 4793 | 2^3x599 | 3 | ||
646 | 4799 | 2x2399 | 2* | ||
647 | 4801 | 2^6x3x5^2 | 7 | ||
648 | 4813 | 2^2x3x401 | 2 | ||
649 | 4817 | 2^4x7x43 | 3 | ||
650 | 4831 | 2x3x5x7x23 | 2* | ||
651 | 4861 | 2^2x3^5x5 | 11 | ||
652 | 4871 | 2x5x487 | 3* | ||
653 | 4877 | 2^2x23x53 | 2 | ||
654 | 4889 | 2^3x13x47 | 3 | ||
655 | 4903 | 2x3x19x43 | 2* | ||
656 | 4909 | 2^2x3x409 | 6 | ||
657 | 4919 | 2x2459 | 2* | ||
658 | 4931 | 2x5x17x29 | 3* | ||
659 | 4933 | 2^2x3^2x137 | 2 | ||
660 | 4937 | 2^3x617 | 3 | ||
661 | 4943 | 2x7x353 | 2* | ||
662 | 4951 | 2x3^2x5^2x11 | 2* | ||
663 | 4957 | 2^2x3x7x59 | 2 | ||
664 | 4967 | 2x13x191 | 2* | ||
665 | 4969 | 2^3x3^3x23 | 11 | ||
666 | 4973 | 2^2x11x113 | 2 | ||
667 | 4987 | 2x3^2x277 | 4* | ||
668 | 4993 | 2^7x3x13 | 5 | ||
669 | 4999 | 2x3x7^2x17 | 9* | ||
670 | 5003 | 2x41x61 | 3* | ||
671 | 5009 | 2^4x313 | 3 | ||
672 | 5011 | 2x3x5x167 | 4* | ||
673 | 5021 | 2^2x5x251 | 3 | ||
674 | 5023 | 2x3^4x31 | 2* | ||
675 | 5039 | 2x11x229 | 2* | ||
676 | 5051 | 2x5^2x101 | 3* | ||
677 | 5059 | 2x3^2x281 | 4* | ||
678 | 5077 | 2^2x3^3x47 | 2 | ||
679 | 5081 | 2^3x5x127 | 3 | ||
680 | 5087 | 2x2543 | 2* | ||
681 | 5099 | 2x2549 | 3* | ||
682 | 5101 | 2^2x3x5^2x17 | 6 | ||
683 | 5107 | 2x3x23x37 | 4* | ||
684 | 5113 | 2^3x3^2x71 | 19 | ||
685 | 5119 | 2x3x853 | 2* | ||
686 | 5147 | 2x31x83 | 3* | ||
687 | 5153 | 2^5x7x23 | 5 | ||
688 | 5167 | 2x3^2x7x41 | 11* | ||
689 | 5171 | 2x5x11x47 | 4* | ||
690 | 5179 | 2x3x863 | 4* | ||
691 | 5189 | 2^2x1297 | 2 | ||
692 | 5197 | 2^2x3x433 | 2 | ||
693 | 5209 | 2^3x3x7x31 | 2 | ||
694 | 5227 | 2x3x13x67 | 4* | ||
695 | 5231 | 2x5x523 | 2* | ||
696 | 5233 | 2^4x3x109 | 10 | ||
697 | 5237 | 2^2x7x11x17 | 3 | ||
698 | 5261 | 2^2x5x263 | 2 | ||
699 | 5273 | 2^3x659 | 3 | ||
700 | 5279 | 2x7x13x29 | 3* | ||
701 | 5281 | 2^5x3x5x11 | 7 | ||
702 | 5297 | 2^4x331 | 3 | ||
703 | 5303 | 2x11x241 | 2* | ||
704 | 5309 | 2^2x1327 | 2 | ||
705 | 5323 | 2x3x887 | 10* | ||
706 | 5333 | 2^2x31x43 | 2 | ||
707 | 5347 | 2x3^5x11 | 6* | ||
708 | 5351 | 2x5^2x107 | 2* | ||
709 | 5381 | 2^2x5x269 | 3 | ||
710 | 5387 | 2x2693 | 3* | ||
711 | 5393 | 2^4x337 | 3 | ||
712 | 5399 | 2x2699 | 2* | ||
713 | 5407 | 2x3x17x53 | 2* | ||
714 | 5413 | 2^2x3x11x41 | 5 | ||
715 | 5417 | 2^3x677 | 3 | ||
716 | 5419 | 2x3^2x7x43 | 5* | ||
717 | 5431 | 2x3x5x181 | 2* | ||
718 | 5437 | 2^2x3^2x151 | 5 | ||
719 | 5441 | 2^6x5x17 | 3 | ||
720 | 5443 | 2x3x907 | 4* | ||
721 | 5449 | 2^3x3x227 | 7 | ||
722 | 5471 | 2x5x547 | 3* | ||
723 | 5477 | 2^2x37^2 | 2 | ||
724 | 5479 | 2x3x11x83 | 2* | ||
725 | 5483 | 2x2741 | 3* | ||
726 | 5501 | 2^2x5^3x11 | 2 | ||
727 | 5503 | 2x3x7x131 | 9* | ||
728 | 5507 | 2x2753 | 3* | ||
729 | 5519 | 2x31x89 | 2* | ||
730 | 5521 | 2^4x3x5x23 | 11 | ||
731 | 5527 | 2x3^2x307 | 2* | ||
732 | 5531 | 2x5x7x79 | 5* | ||
733 | 5557 | 2^2x3x463 | 2 | ||
734 | 5563 | 2x3^3x103 | 4* | ||
735 | 5569 | 2^6x3x29 | 13 | ||
736 | 5573 | 2^2x7x199 | 2 | ||
737 | 5581 | 2^2x3^2x5x31 | 6 | ||
738 | 5591 | 2x5x13x43 | 2* | ||
739 | 5623 | 2x3x937 | 2* | ||
740 | 5639 | 2x2819 | 2* | ||
741 | 5641 | 2^3x3x5x47 | 14 | ||
742 | 5647 | 2x3x941 | 2* | ||
743 | 5651 | 2x5^2x113 | 3* | ||
744 | 5653 | 2^2x3^2x157 | 5 | ||
745 | 5657 | 2^3x7x101 | 3 | ||
746 | 5659 | 2x3x23x41 | 4* | ||
747 | 5669 | 2^2x13x109 | 3 | ||
748 | 5683 | 2x3x947 | 4* | ||
749 | 5689 | 2^3x3^2x79 | 11 | ||
750 | 5693 | 2^2x1423 | 2 | ||
751 | 5701 | 2^2x3x5^2x19 | 2 | ||
752 | 5711 | 2x5x571 | 3* | ||
753 | 5717 | 2^2x1429 | 2 | ||
754 | 5737 | 2^3x3x239 | 10 | ||
755 | 5741 | 2^2x5x7x41 | 2 | ||
756 | 5743 | 2x3^2x11x29 | 2* | ||
757 | 5749 | 2^2x3x479 | 2 | ||
758 | 5779 | 2x3^3x107 | 4* | ||
759 | 5783 | 2x7^2x59 | 2* | ||
760 | 5791 | 2x3x5x193 | 2* | ||
761 | 5801 | 2^3x5^2x29 | 3 | ||
762 | 5807 | 2x2903 | 2* | ||
763 | 5813 | 2^2x1453 | 2 | ||
764 | 5821 | 2^2x3x5x97 | 6 | ||
765 | 5827 | 2x3x971 | 4* | ||
766 | 5839 | 2x3x7x139 | 2* | ||
767 | 5843 | 2x23x127 | 4* | ||
768 | 5849 | 2^3x17x43 | 3 | ||
769 | 5851 | 2x3^2x5^2x13 | 4* | ||
770 | 5857 | 2^5x3x61 | 7 | ||
771 | 5861 | 2^2x5x293 | 3 | ||
772 | 5867 | 2x7x419 | 3* | ||
773 | 5869 | 2^2x3^2x163 | 2 | ||
774 | 5879 | 2x2939 | 2* | ||
775 | 5881 | 2^3x3x5x7^2 | 31 | ||
776 | 5897 | 2^3x11x67 | 3 | ||
777 | 5903 | 2x13x227 | 2* | ||
778 | 5923 | 2x3^2x7x47 | 4* | ||
779 | 5927 | 2x2963 | 2* | ||
780 | 5939 | 2x2969 | 3* | ||
781 | 5953 | 2^6x3x31 | 7 | ||
782 | 5981 | 2^2x5x13x23 | 3 | ||
783 | 5987 | 2x41x73 | 3* | ||
784 | 6007 | 2x3x7x11x13 | 9* | ||
785 | 6011 | 2x5x601 | 4* | ||
786 | 6029 | 2^2x11x137 | 2 | ||
787 | 6037 | 2^2x3x503 | 5 | ||
788 | 6043 | 2x3x19x53 | 6* | ||
789 | 6047 | 2x3023 | 2* | ||
790 | 6053 | 2^2x17x89 | 2 | ||
791 | 6067 | 2x3^2x337 | 4* | ||
792 | 6073 | 2^3x3x11x23 | 10 | ||
793 | 6079 | 2x3x1013 | 7* | ||
794 | 6089 | 2^3x761 | 10 | ||
795 | 6091 | 2x3x5x7x29 | 11* | ||
796 | 6101 | 2^2x5^2x61 | 2 | ||
797 | 6113 | 2^5x191 | 2 | ||
798 | 6121 | 2^3x3^2x5x17 | 2 | ||
799 | 6131 | 2x5x613 | 3* | ||
800 | 6133 | 2^2x3x7x73 | 5 | ||
801 | 6143 | 2x37x83 | 2* | ||
802 | 6151 | 2x3x5^2x41 | 2* | ||
803 | 6163 | 2x3x13x79 | 6* | ||
804 | 6173 | 2^2x1543 | 2 | ||
805 | 6197 | 2^2x1549 | 2 | ||
806 | 6199 | 2x3x1033 | 2* | ||
807 | 6203 | 2x7x443 | 3* | ||
808 | 6211 | 2x3^3x5x23 | 4* | ||
809 | 6217 | 2^3x3x7x37 | 5 | ||
810 | 6221 | 2^2x5x311 | 3 | ||
811 | 6229 | 2^2x3^2x173 | 2 | ||
812 | 6247 | 2x3^2x347 | 2* | ||
813 | 6257 | 2^4x17x23 | 3 | ||
814 | 6263 | 2x31x101 | 2* | ||
815 | 6269 | 2^2x1567 | 2 | ||
816 | 6271 | 2x3x5x11x19 | 17* | ||
817 | 6277 | 2^2x3x523 | 2 | ||
818 | 6287 | 2x7x449 | 2* | ||
819 | 6299 | 2x47x67 | 3* | ||
820 | 6301 | 2^2x3^2x5^2x7 | 10 | ||
821 | 6311 | 2x5x631 | 2* | ||
822 | 6317 | 2^2x1579 | 2 | ||
823 | 6323 | 2x29x109 | 3* | ||
824 | 6329 | 2^3x7x113 | 3 | ||
825 | 6337 | 2^6x3^2x11 | 10 | ||
826 | 6343 | 2x3x7x151 | 2* | ||
827 | 6353 | 2^4x397 | 3 | ||
828 | 6359 | 2x11x17^2 | 2* | ||
829 | 6361 | 2^3x3x5x53 | 19 | ||
830 | 6367 | 2x3x1061 | 2* | ||
831 | 6373 | 2^2x3^3x59 | 2 | ||
832 | 6379 | 2x3x1063 | 4* | ||
833 | 6389 | 2^2x1597 | 2 | ||
834 | 6397 | 2^2x3x13x41 | 2 | ||
835 | 6421 | 2^2x3x5x107 | 6 | ||
836 | 6427 | 2x3^3x7x17 | 6* | ||
837 | 6449 | 2^4x13x31 | 3 | ||
838 | 6451 | 2x3x5^2x43 | 6* | ||
839 | 6469 | 2^2x3x7^2x11 | 2 | ||
840 | 6473 | 2^3x809 | 3 | ||
841 | 6481 | 2^4x3^4x5 | 7 | ||
842 | 6491 | 2x5x11x59 | 3* | ||
843 | 6521 | 2^3x5x163 | 6 | ||
844 | 6529 | 2^7x3x17 | 7 | ||
845 | 6547 | 2x3x1091 | 4* | ||
846 | 6551 | 2x5^2x131 | 2* | ||
847 | 6553 | 2^3x3^2x7x13 | 10 | ||
848 | 6563 | 2x17x193 | 10* | ||
849 | 6569 | 2^3x821 | 3 | ||
850 | 6571 | 2x3^2x5x73 | 10* | ||
851 | 6577 | 2^4x3x137 | 5 | ||
852 | 6581 | 2^2x5x7x47 | 14 | ||
853 | 6599 | 2x3299 | 2* | ||
854 | 6607 | 2x3^2x367 | 2* | ||
855 | 6619 | 2x3x1103 | 4* | ||
856 | 6637 | 2^2x3x7x79 | 2 | ||
857 | 6653 | 2^2x1663 | 2 | ||
858 | 6659 | 2x3329 | 3* | ||
859 | 6661 | 2^2x3^2x5x37 | 6 | ||
860 | 6673 | 2^4x3x139 | 5 | ||
861 | 6679 | 2x3^2x7x53 | 5* | ||
862 | 6689 | 2^5x11x19 | 3 | ||
863 | 6691 | 2x3x5x223 | 4* | ||
864 | 6701 | 2^2x5^2x67 | 2 | ||
865 | 6703 | 2x3x1117 | 2* | ||
866 | 6709 | 2^2x3x13x43 | 2 | ||
867 | 6719 | 2x3359 | 2* | ||
868 | 6733 | 2^2x3^2x11x17 | 2 | ||
868 | 6737 | 2^4x421 | 3 | ||
870 | 6761 | 2^3x5x13^2 | 2 | ||
871 | 6763 | 2x3x7^2x23 | 4* | ||
872 | 6779 | 2x3389 | 3* | ||
873 | 6781 | 2^2x3x5x113 | 2 | ||
874 | 6791 | 2x5x7x97 | 3* | ||
875 | 6793 | 2^3x3x283 | 10 | ||
876 | 6803 | 2x19x179 | 3* | ||
877 | 6823 | 2x3^2x379 | 2* | ||
878 | 6827 | 2x3413 | 3* | ||
879 | 6829 | 2^2x3x569 | 2 | ||
880 | 6833 | 2^4x7x61 | 3 | ||
881 | 6841 | 2^3x3^2x5x19 | 22 | ||
882 | 6857 | 2^3x857 | 3 | ||
883 | 6863 | 2x47x73 | 2* | ||
884 | 6869 | 2^2x17x101 | 2 | ||
885 | 6871 | 2x3x5x229 | 9* | ||
886 | 6883 | 2x3x31x37 | 4* | ||
887 | 6899 | 2x3449 | 3* | ||
888 | 6907 | 2x3x1151 | 4* | ||
889 | 6911 | 2x5x691 | 2* | ||
890 | 6917 | 2^2x7x13x19 | 2 | ||
891 | 6947 | 2x23x151 | 3* | ||
892 | 6949 | 2^2x3^2x193 | 2 | ||
893 | 6959 | 2x7^2x71 | 3* | ||
894 | 6961 | 2^4x3x5x29 | 13 | ||
895 | 6967 | 2x3^4x43 | 13* | ||
896 | 6971 | 2x5x17x41 | 4* | ||
897 | 6977 | 2^6x109 | 3 | ||
898 | 6983 | 2x3491 | 2* | ||
899 | 6991 | 2x3x5x233 | 2* | ||
900 | 6997 | 2^2x3x11x53 | 5 | ||
901 | 7001 | 2^3x5^3x7 | 3 | ||
902 | 7013 | 2^2x1753 | 2 | ||
903 | 7019 | 2x11^2x29 | 3* | ||
904 | 7027 | 2x3x1171 | 4* | ||
905 | 7039 | 2x3^2x17x23 | 2* | ||
906 | 7043 | 2x7x503 | 4* | ||
907 | 7057 | 2^4x3^2x7^2 | 5 | ||
908 | 7069 | 2^2x3x19x31 | 2 | ||
909 | 7079 | 2x3539 | 2* | ||
910 | 7103 | 2x53x67 | 2* | ||
911 | 7109 | 2^2x1777 | 2 | ||
912 | 7121 | 2^4x5x89 | 3 | ||
913 | 7127 | 2x7x509 | 2* | ||
914 | 7129 | 2^3x3^4x11 | 3 | ||
915 | 7151 | 2x5^2x11x13 | 2* | ||
916 | 7159 | 2x5^2x11x13 | 2* | ||
917 | 7177 | 2^3x3x13x23 | 10 | ||
918 | 7187 | 2x3593 | 3* | ||
919 | 7193 | 2^3x29x31 | 3 | ||
920 | 7207 | 2x3x1201 | 3* | ||
921 | 7211 | 2x5x7x103 | 3* | ||
922 | 7213 | 2^2x3x601 | 5 | ||
923 | 7219 | 2x3^2x401 | 4* | ||
924 | 7229 | 2^2x13x139 | 2 | ||
925 | 7237 | 2^2x3^3x67 | 2 | ||
926 | 7243 | 2x3x17x71 | 4* | ||
927 | 7247 | 2x3623 | 2* | ||
928 | 7253 | 2^2x7^2x37 | 2 | ||
929 | 7283 | 2x11x331 | 3* | ||
930 | 7297 | 2^7x3x19 | 5 | ||
931 | 7307 | 2x13x281 | 3* | ||
932 | 7309 | 2^2x3^2x7x29 | 6 | ||
933 | 7321 | 2^3x3x5x61 | 7 | ||
934 | 7331 | 2x5x733 | 4* | ||
935 | 7333 | 2^2x3x13x47 | 6 | ||
936 | 7349 | 2^2x11x67 | 2 | ||
937 | 7351 | 2x3x5^2x7^2 | 4* | ||
938 | 7369 | 2^3x3x307 | 7 | ||
939 | 7393 | 2^5x3x7x11 | 5 | ||
940 | 7411 | 2x3x5x13x19 | 4* | ||
941 | 7417 | 2^3x3^2x103 | 5 | ||
942 | 7433 | 2^3x929 | 3 | ||
943 | 7451 | 2x5^2x149 | 4* | ||
944 | 7457 | 2^5x233 | 3 | ||
945 | 7459 | 2x3x11x113 | 4* | ||
946 | 7477 | 2^2x3x7x89 | 2 | ||
947 | 7481 | 2^3x5x11x17 | 6 | ||
948 | 7487 | 2x19x197 | 3* | ||
949 | 7489 | 2^6x3^2x13 | 7 | ||
950 | 7499 | 2x23x163 | 3* | ||
951 | 7507 | 2x3^3x139 | 4* | ||
952 | 7517 | 2^2x1879 | 7 | ||
953 | 7523 | 2x3761 | 3* | ||
954 | 7529 | 2^3x941 | 3 | ||
955 | 7537 | 2^4x3x157 | 7 | ||
956 | 7541 | 2^2x5x13x29 | 2 | ||
957 | 7547 | 2x11x7^3 | 3* | ||
958 | 7549 | 2^2x3x17x37 | 2 | ||
959 | 7559 | 2x3779 | 2* | ||
960 | 7561 | 2^3x3^3x5x7 | 13 | ||
961 | 7573 | 2^2x3x631 | 2 | ||
962 | 7577 | 2^3x947 | 3 | ||
963 | 7583 | 2x17x223 | 2* | ||
964 | 7589 | 2^2x7x271 | 2 | ||
965 | 7591 | 2x3x5x11x23 | 2* | ||
966 | 7603 | 2x3x7x181 | 4* | ||
967 | 7607 | 2x3803 | 2* | ||
968 | 7621 | 2^2x3x5x127 | 2 | ||
969 | 7639 | 2x3x19x67 | 5* | ||
970 | 7643 | 2x3821 | 3* | ||
971 | 7649 | 2^5x239 | 3 | ||
972 | 7669 | 2^2x3^3x71 | 2 | ||
973 | 7673 | 2^3x7x137 | 3 | ||
974 | 7681 | 2^9x3x5 | 17 | ||
975 | 7687 | 2x3^2x7x61 | 2* | ||
976 | 7691 | 2x5x769 | 3* | ||
977 | 7699 | 2x3x1283 | 5* | ||
978 | 7703 | 2x3851 | 2* | ||
979 | 7717 | 2^2x3x643 | 2 | ||
980 | 7723 | 2x3^3x11x13 | 6* | ||
981 | 7727 | 2x3863 | 2* | ||
982 | 7741 | 2^2x3^2x5x43 | 7 | ||
983 | 7753 | 2^3x3x17x19 | 10 | ||
984 | 7757 | 2^2x7x277 | 2 | ||
985 | 7759 | 2x3^2x431 | 2* | ||
986 | 7789 | 2^2x3x11x59 | 2 | ||
987 | 7793 | 2^4x487 | 3 | ||
988 | 7817 | 2^3x977 | 3 | ||
989 | 7823 | 2x3911 | 2* | ||
990 | 7829 | 2^2x19x103 | 2 | ||
991 | 7841 | 2^5x5x7^2 | 12 | ||
992 | 7853 | 2^2x13x151 | 2 | ||
993 | 7867 | 2x3^2x19x23 | 6* | ||
994 | 7873 | 2^6x3x41 | 5 | ||
995 | 7877 | 2^2x11x179 | 5 | ||
996 | 7879 | 2x3x13x101 | 2* | ||
997 | 7883 | 2x7x563 | 3* | ||
998 | 7901 | 2^2x5^2x79 | 2 | ||
999 | 7907 | 2x59x67 | 3* | ||
1000 | 7919 | 2x37x107 | 2* |
Statistické vyhodnocení (n = 1000)
Sledujte
- Předchozí: Statistika soustavy o základu 9, 10, 11, 12, 13
- Následující: Statistika soustavy o základu 15, 16, 17, 18, 196