Délky period převrácených hodnot prvočísel/Statistika/Statistika soustavy o základu 14: Porovnání verzí

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Smazaný obsah Přidaný obsah
MEZIULOŽENÍ
MEZIULOŽENÍ
Řádek 3 947: Řádek 3 947:
| 863
| 863
! 6691
! 6691
| 2x3x5x223 || || || 4*
| 2x3x5x223 || || 261D || 4*
|-
|-
| 864
| 864
! 6701
! 6701
| 2^2x5^2x67 || || || 2
| 2^2x5^2x67 || || 2629 || 2
|-
|-
| 865
| 865
! 6703
! 6703
| 2x3x1117 || || || 2*
| 2x3x1117 || || 262B || 2*
|-
|-
| 866
| 866
! 6709
! 6709
| 2^2x3x13x43 || || || 2
| 2^2x3x13x43 || || 2633 || 2
|-
|-
| 867
| 867
! 6719
! 6719
| 2x3359 || || || 2*
| 2x3359 || || 263D || 2*
|-
|-
| 868
| 868
! 6733
! 6733
| 2^2x3^2x11x17 || || || 2
| 2^2x3^2x11x17 || || 264D || 2
|-
|-
| 868
| 868
! 6737
! 6737
| 2^4x421 || || || 3
| 2^4x421 || || 2653 || 3
|-
|-
| 870
| 870
! 6761
! 6761
| 2^3x5x13^2 || || || 2
| 2^3x5x13^2 || || 266D || 2
|-
|-
| 871
| 871
! 6763
! 6763
| 2x3x7^2x23 || || || 4*
| 2x3x7^2x23 || || 2671 || 4*
|-
|-
| 872
| 872
! 6779
! 6779
| 2x3389 || || || 3*
| 2x3389 || || 2683 || 3*
|-
|-
| 873
| 873
! 6781
! 6781
| 2^2x3x5x113 || || || 2
| 2^2x3x5x113 || || 2685 || 2
|-
|-
| 874
| 874
! 6791
! 6791
| 2x5x7x97 || || || 3*
| 2x5x7x97 || || 2691 || 3*
|-
|-
| 875
| 875
! 6793
! 6793
| 2^3x3x283 || || || 10
| 2^3x3x283 || || 2693 || 10
|-
|-
| 876
| 876
! 6803
! 6803
| 2x19x179 || || || 3*
| 2x19x179 || || 269D || 3*
|-
|-
| 877
| 877
! 6823
! 6823
| 2x3^2x379 || || || 2*
| 2x3^2x379 || || 26B5 || 2*
|-
|-
| 878
| 878
! 6827
! 6827
| 2x3413 || || || 3*
| 2x3413 || || 26B9 || 3*
|-
|-
| 879
| 879
! 6829
! 6829
| 2^2x3x569 || || || 2
| 2^2x3x569 || || 26BB || 2
|-
|-
| 880
| 880
! 6833
! 6833
| 2^4x7x61 || || || 3
| 2^4x7x61 || || 26C1 || 3
|-
|-
| 881
| 881
! 6841
! 6841
| 2^3x3^2x5x19 || || || [[Číselné soustavy/Soustava o základu 22|22]]
| 2^3x3^2x5x19 || || 26C9 || [[Číselné soustavy/Soustava o základu 22|22]]
|-
|-
| 882
| 882
! 6857
! 6857
| 2^3x857 || || || 3
| 2^3x857 || || 26DB || 3
|-
|-
| 883
| 883
! 6863
! 6863
| 2x47x73 || || || 2*
| 2x47x73 || || 2703 || 2*
|-
|-
| 884
| 884
! 6869
! 6869
| 2^2x17x101 || || || 2
| 2^2x17x101 || || 2709 || 2
|-
|-
| 885
| 885
! 6871
! 6871
| 2x3x5x229 || || || 9*
| 2x3x5x229 || || 270B || 9*
|-
|-
| 886
| 886
! 6883
! 6883
| 2x3x31x37 || || || 4*
| 2x3x31x37 || || 2719 || 4*
|-
|-
| 887
| 887
! 6899
! 6899
| 2x3449 || || || 3*
| 2x3449 || || 272B || 3*
|-
|-
| 888
| 888
! 6907
! 6907
| 2x3x1151 || || || 4*
| 2x3x1151 || || 2735 || 4*
|-
|-
| 889
| 889
! 6911
! 6911
| 2x5x691 || || || 2*
| 2x5x691 || || 2739 || 2*
|-
|-
| 890
| 890
! 6917
! 6917
| 2^2x7x13x19 || || || 2
| 2^2x7x13x19 || || 2741 || 2
|-
|-
| 891
| 891
! 6947
! 6947
| 2x23x151 || || || 3*
| 2x23x151 || || 2763 || 3*
|-
|-
| 892
| 892
! 6949
! 6949
| 2^2x3^2x193 || || || 2
| 2^2x3^2x193 || || 2765 || 2
|-
|-
| 893
| 893
! 6959
! 6959
| 2x7^2x71 || || || 3*
| 2x7^2x71 || || 2771 || 3*
|-
|-
| 894
| 894
! 6961
! 6961
| 2^4x3x5x29 || || || [[Číselné soustavy/Třináctková soustava|13]]
| 2^4x3x5x29 || || 2773 || [[Číselné soustavy/Třináctková soustava|13]]
|-
|-
| 895
| 895
! 6967
! 6967
| 2x3^4x43 || || || [[Číselné soustavy/Třináctková soustava|13]]*
| 2x3^4x43 || || 2779 || [[Číselné soustavy/Třináctková soustava|13]]*
|-
|-
| 896
| 896
! 6971
! 6971
| 2x5x17x41 || || || 4*
| 2x5x17x41 || || 277D || 4*
|-
|-
| 897
| 897
! 6977
! 6977
| 2^6x109 || || || 3
| 2^6x109 || || 2785 || 3
|-
|-
| 898
| 898
! 6983
! 6983
| 2x3491 || || || 2*
| 2x3491 || || 278B || 2*
|-
|-
| 899
| 899
! 6991
! 6991
| 2x3x5x233 || || || 2*
| 2x3x5x233 || || 2795 || 2*
|-
|-
| 900
| 900
! 6997
! 6997
| 2^2x3x11x53 || || || 5
| 2^2x3x11x53 || || 279B || 5
|-
|-
| 901
| 901
! 7001
! 7001
| 2^3x5^3x7 || || || 3
| 2^3x5^3x7 || || 27A1 || 3
|-
|-
| 902
| 902
! 7013
! 7013
| 2^2x1753 || || || 2
| 2^2x1753 || || 27AD || 2
|-
|-
| 903
| 903
! 7019
! 7019
| 2x11^2x29 || || || 3*
| 2x11^2x29 || || 27B5 || 3*
|-
|-
| 904
| 904
! 7027
! 7027
| 2x3x1171 || || || 4*
| 2x3x1171 || || 27BD || 4*
|-
|-
| 905
| 905
! 7039
! 7039
| 2x3^2x17x23 || || || 2*
| 2x3^2x17x23 || || 27CB || 2*
|-
|-
| 906
| 906
! 7043
! 7043
| 2x7x503 || || || 4*
| 2x7x503 || || 27D1 || 4*
|-
|-
| 907
| 907
! 7057
! 7057
| 2^4x3^2x7^2 || || || 5
| 2^4x3^2x7^2 || || 2801 || 5
|-
|-
| 908
| 908
! 7069
! 7069
| 2^2x3x19x31 || || || 2
| 2^2x3x19x31 || || 280D || 2
|-
|-
| 909
| 909
! 7079
! 7079
| 2x3539 || || || 2*
| 2x3539 || || 2819 || 2*
|-
|-
| 910
| 910
! 7103
! 7103
| 2x53x67 || || || 2*
| 2x53x67 || || 2835 || 2*
|-
|-
| 911
| 911
! 7109
! 7109
| 2^2x1777 || || || 2
| 2^2x1777 || || 283B || 2
|-
|-
| 912
| 912
! 7121
! 7121
| 2^4x5x89 || || || 3
| 2^4x5x89 || || 2849 || 3
|-
|-
| 913
| 913
! 7127
! 7127
| 2x7x509 || || || 2*
| 2x7x509 || || 2851 || 2*
|-
|-
| 914
| 914
! 7129
! 7129
| 2^3x3^4x11 || || || 3
| 2^3x3^4x11 || || 2853 || 3
|-
|-
| 915
| 915
! 7151
! 7151
| 2x5^2x11x13 || || || 2*
| 2x5^2x11x13 || || 286B || 2*
|-
|-
| 916
| 916
! 7159
! 7159
| 2x5^2x11x13 || || || 2*
| 2x5^2x11x13 || || 2875 || 2*
|-
|-
| 917
| 917
! 7177
! 7177
| 2^3x3x13x23 || || || 10
| 2^3x3x13x23 || || 2889 || 10
|-
|-
| 918
| 918
! 7187
! 7187
| 2x3593 || || || 3*
| 2x3593 || || 2895 || 3*
|-
|-
| 919
| 919
! 7193
! 7193
| 2^3x29x31 || || || 3
| 2^3x29x31 || || 289B || 3
|-
|-
| 920
| 920
! 7207
! 7207
| 2x3x1201 || || || 3*
| 2x3x1201 || || 28AB || 3*
|-
|-
| 921
| 921
! 7211
! 7211
| 2x5x7x103 || || || 3*
| 2x5x7x103 || || 28B1 || 3*
|-
|-
| 922
| 922
! 7213
! 7213
| 2^2x3x601 || || || 5
| 2^2x3x601 || || 28B3 || 5
|-
|-
| 923
| 923
! 7219
! 7219
| 2x3^2x401 || || || 4*
| 2x3^2x401 || || 28B9 || 4*
|-
|-
| 924
| 924
! 7229
! 7229
| 2^2x13x139 || || || 2
| 2^2x13x139 || || 28C5 || 2
|-
|-
| 925
| 925
! 7237
! 7237
| 2^2x3^3x67 || || || 2
| 2^2x3^3x67 || || 28CD || 2
|-
|-
| 926
| 926
! 7243
! 7243
| 2x3x17x71 || || || 4*
| 2x3x17x71 || || 28D5 || 4*
|-
|-
| 927
| 927
! 7247
! 7247
| 2x3623 || || || 2*
| 2x3623 || || 28D9 || 2*
|-
|-
| 928
| 928
! 7253
! 7253
| 2^2x7^2x37 || || || 2
| 2^2x7^2x37 || || 2901 || 2
|-
|-
| 929
| 929
! 7283
! 7283
| 2x11x331 || || || 3*
| 2x11x331 || || 2923 || 3*
|-
|-
| 930
| 930
! 7297
! 7297
| 2^7x3x19 || || || 5
| 2^7x3x19 || || 2933 || 5
|-
|-
| 931
| 931
! 7307
! 7307
| 2x13x281 || || || 3*
| 2x13x281 || || 293D || 3*
|-
|-
| 932
| 932
! 7309
! 7309
| 2^2x3^2x7x29 || || || 6
| 2^2x3^2x7x29 || || 2941 || 6
|-
|-
| 933
| 933
! 7321
! 7321
| 2^3x3x5x61 || || || 7
| 2^3x3x5x61 || || 294D || 7
|-
|-
| 934
| 934
! 7331
! 7331
| 2x5x733 || || || 4*
| 2x5x733 || || 2959 || 4*
|-
|-
| 935
| 935
! 7333
! 7333
| 2^2x3x13x47 || || || 6
| 2^2x3x13x47 || || 295B || 6
|-
|-
| 936
| 936
! 7349
! 7349
| 2^2x11x67 || || || 2
| 2^2x11x67 || || 296D || 2
|-
|-
| 937
| 937
! 7351
! 7351
| 2x3x5^2x7^2 || || || 4*
| 2x3x5^2x7^2 || || 2971 || 4*
|-
|-
| 938
| 938
! 7369
! 7369
| 2^3x3x307 || || || 7
| 2^3x3x307 || || 2985 || 7
|-
|-
| 939
| 939
! 7393
! 7393
| 2^5x3x7x11 || || || 5
| 2^5x3x7x11 || || 29A1 || 5
|-
|-
| 940
| 940
! 7411
! 7411
| 2x3x5x13x19 || || || 4*
| 2x3x5x13x19 || || 29B5 || 4*
|-
|-
| 941
| 941
! 7417
! 7417
| 2^3x3^2x103 || || || 5
| 2^3x3^2x103 || || 29BB || 5
|-
|-
| 942
| 942
! 7433
! 7433
| 2^3x929 || || || 3
| 2^3x929 || || 29CD || 3
|-
|-
| 943
| 943
! 7451
! 7451
| 2x5^2x149 || || || 4*
| 2x5^2x149 || || 2A03 || 4*
|-
|-
| 944
| 944
! 7457
! 7457
| 2^5x233 || || || 3
| 2^5x233 || || 2A09 || 3
|-
|-
| 945
| 945
! 7459
! 7459
| 2x3x11x113 || || || 4*
| 2x3x11x113 || || 2A0B || 4*
|-
|-
| 946
| 946
! 7477
! 7477
| 2^2x3x7x89 || || || 2
| 2^2x3x7x89 || || 2A21 || 2
|-
|-
| 947
| 947
! 7481
! 7481
| 2^3x5x11x17 || || || 6
| 2^3x5x11x17 || || 2A25 || 6
|-
|-
| 948
| 948

Verze z 6. 1. 2021, 21:20

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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

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)

  1. Délka periody = 0 (neperiodický zlomek pouze s jednocifernou předperiodou) - 20 %
  2. Délka periody maximální: - 50 %
  3. Délka periody poloviční (k/l = 2) - 20 %
  4. Délka periody dvanáctinová (k/l = 12) - 10 %
    • Délka periody = 1 - 10 %
    • Délka periody = 2 - 20 %

Tabulka pro první stovku prvočísel

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)

  1. Délka periody = 0 (neperiodický zlomek pouze s jednocifernou předperiodou) - 2 %
  2. Délka periody maximální: - 39 %
  3. Délka periody poloviční (k/l = 2) - 26 %
  4. Délka periody třetinová (k/l = 3) - 5 %
  5. Délka periody čtvrtinová (k/l = 4) - 8 %
  6. Délka periody pětinová (k/l = 5) - 2 %
  7. Délka periody šestinová (k/l = 6) - 6 %
  8. Délka periody sedminová (k/l = 7) - 1 %
  9. Délka periody osminová (k/l = 8) - 1 %
  10. Délka periody desetinová (k/l = 10) - 3 %
  11. Délka periody jedenáctinová (k/l = 11) - 1 %
  12. Délka periody dvanáctinová (k/l = 12) - 2 %
  13. Délka periody dvacetinová (k/l = 20) - 1 %
  14. Délka periody k/l = 44) - 1 %
  15. Délka periody k/l = 49 - 1 %
  16. Délka periody k/l = 70 - 1 %
    • Délka periody = 1 - 1 %
    • Délka periody = 2 - 2 %
    • Délka periody je kratší, než jedna desetina maximální možné - 7 %

Tabulka pro první tisícovku prvočísel

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 1 46D 3
153 883 2x3^2x7^2 2 471 4*
154 887 2x443 2 475 2*
155 907 2x3x151 6 48B 4*
156 911 2x5x7x13 35 491 3*
157 919 2x3^3x17 1 499 5*
158 929 2^5x29 1 4A5 3
159 937 2^3x3^2x13 117 4AD 5
160 941 2^2x5x47 2 4B3 2
161 947 2x11x43 2 4B9 3*
162 953 2^3x7x17 2 4C1 3
163 967 2x3x7x23 21 4D1 2*
164 971 2x5x97 5 4D5 3*
165 977 2^4x61 16 4DB 3
166 983 2x491 2 503 2*
167 991 2x3^2x5x11 3 50B 2*
168 997 2^2x3x83 2 513 7
169 1009 2^4x3^2x7 18 521 11
170 1013 2^2x11x23 4 525 3
171 1019 2x509 2 52B 3*
172 1021 2^2x3x5x17 12 52D 10
173 1031 2x5x103 1 539 2*
174 1033 2^3x3x43 86 53B 5
175 1039 2x3x173 6 543 2*
176 1049 2^3x131 1 54D 3
177 1051 2x3x5^2x7 14 551 5*
178 1061 2^2x5x53 53 55B 2
179 1063 2x3^2x59 2 55D 2*
180 1069 2^2x3x89 2 565 6
181 1087 2x3x181 1 579 2*
182 1091 2x5x109 1 57D 4*
183 1093 2^2x3x7x13 1 581 5
184 1097 2^3x137 1 585 3
185 1103 2x19x29 1 58B 3*
186 1109 2^2x277 4 593 2
187 1117 2^2x3^2x31 1 59B 2
188 1123 2x3x11x17 1 5A3 4*
189 1129 2^3x3x47 12 5A9 11
190 1151 2x5^2x23 2 5C3 2*
191 1153 2^7x3^2 1 5C5 5
192 1163 2x7x83 2 5D1 3*
193 1171 2x3^x5x13 26 5D9 4*
194 1181 2^2x5x59 4 605 7
195 1187 2x593 2 60B 3*
196 1193 2^3x149 1 613 3
197 1201 2^4x3x5^2 2 61B 11
198 1213 2^2x3x101 1 629 2
199 1217 2^6x19 1 62D 3
200 1223 2x13x47 2 635 2*
201 1229 2^2x307 1 63B 2
202 1231 2x3x5x41 6 63D 2*
203 1237 2^2x3x103 2 645 2
204 1249 2^5x3x13 1 653 11
205 1259 2x17x37 1 65D 3*
206 1277 2^2x11x29 2 673 2
207 1279 2x3^2x71 2 675 2*
208 1283 2x641 2 679 3*
209 1289 2^3x7x23 4 681 6
210 1291 2x3x5x43 1 683 4*
211 1297 2^4x3^4 12 689 10
212 1301 2^2x5^2x13 2 68D 2
213 1303 2x3x7x31 1 691 2*
214 1307 2x653 1 695 3*
215 1319 2x659 2 6A3 3*
216 1321 2^3x3x5x11 3 6A5 13
217 1327 2x3x13x17 3 6AB 9*
218 1361 2^4x5x17 1 6D3 3
219 1367 2x683 1 6D9 2*
220 1373 2^2x7^3 1 701 2
221 1381 2^2x3x5x23 15 709 2
222 1399 2x3x233 2 71D 5*
223 1409 2^7x11 2 729 3
224 1423 2x3^2x79 3 739 9*
225 1427 2x23x31 1 73D 3*
226 1429 2^2x3x7x17 7 741 6
227 1433 2^3x179 1 745 3
228 1439 2x719 1 74B 2*
229 1447 2x3x241 2 755 2*
230 1451 2x5^2x29 2 759 3*
231 1453 2^2x3x11^2 1 75B 2
232 1459 2x3^6 9 763 6*
233 1471 2x3x5x7^2 1 771 5*
234 1481 2^3x5x37 4 77B 3
235 1483 2x3x13x19 3 77D 4*
236 1487 2x743 2 783 2*
237 1489 2^4x3x31 1 785 14
238 1493 2^2x373 789 2
239 1499 2x7x107 791 2*
240 1511 2x5x151 79D 2*
241 1523 2x761 7AB 3*
242 1531 2x3^2x5x17 7B5 4*
243 1543 2x3x257 7C3 2*
244 1549 2^2x3^2x43 7C9 2
245 1553 2^4x97 7CD 3
246 1559 2x19x41 7D5 2*
247 1567 2x3^3x29 7DD 2*
248 1571 2x5x157 803 3*
249 1579 2x3x263 80B 5*
250 1583 2x7x113 811 2*
251 1597 2^2x3x7x19 821 11
252 1601 2^6x5^2 825 3
253 1607 2x11x73 82B 2*
254 1609 2^3x3x67 82D 7
255 1613 2^2x13x31 833 3
256 1619 2x809 839 3*
257 1621 2^2x3^4x5 83B 2
258 1627 2x3x271 843 6*
259 1637 2^2x409 84D 2
260 1657 2^3x3^2x23 865 11
261 1663 2x3x277 86B 2*
262 1667 2x7^2x17 871 3*
263 1669 2^2x3x139 873 2
264 1693 2^2x3^2x47 88D 2
265 1697 2^5x53 893 3
266 1699 2x3x283 895 6*
267 1709 2^2x7x61 8A1 3
268 1721 2^3x5x43 8AD 3
269 1723 2x3x7x41 8B1 6*
270 1733 2^2x433 8BB 2
271 1741 2^2x3x5x29 8C5 2
272 1747 2x3^2x97 8CB 4*
273 1753 2^3x3x73 8D3 7
274 1759 2x3x293 8D9 2*
275 1777 2^4x3x37 90D 5
276 1783 2x3^4x11 915 2*
277 1787 2x19x47 919 3*
278 1789 2^2x3x149 91B 6
279 1801 2^3x3^2x5^2 929 11
280 1811 2x5x181 935 3*
281 1823 2x911 943 2*
282 1831 2x3x5x61 94B 9*
283 1847 2x13x71 95D 2*
284 1861 2^2x3x5x31 96D 2
285 1867 2x3x311 975 4*
286 1871 2x5x11x17 979 2*
287 1873 2^4x3^2x13 97B 10
288 1877 2^2x7x67 981 2
289 1879 2x3x313 983 2*
290 1889 2^5x59 98D 3
291 1901 2^2x5^2x19 99B 2
292 1907 2x953 9A3 3*
293 1913 2^3x239 9A9 3
294 1931 2x5x193 9BD 3*
295 1933 2^2x3x7x23 9C1 5
296 1949 2^2x487 9D3 2
297 1951 2x3x5^2x13 9D5 2*
298 1973 2^2x17x29 A0D 2
299 1979 2x23x43 A15 3*
300 1987 2x3x331 A1D 4*
301 1993 2^3x3x83 A25 5
302 1997 2^2x499 A29 2
303 1999 2x3^3x37 A2B 5*
304 2003 2x7x11x13 A31 3*
305 2011 2x3x5x67 A39 5*
306 2017 2^5x3^2x7 A41 5
307 2027 2x1013 A4B 3*
308 2029 2^2x3x13^2 A4D 2
309 2039 2x1019 A59 2*
310 2053 2^2x3^3x19 A69 2
311 2063 2x1031 A75 2*
312 2069 2^3x11x47 A7B 4*
313 2081 2^5x5x13 A89 3
314 2083 2x3x347 A8B 4*
315 2087 2x7x149 A91 2*
316 2089 2^3x3^2x29 A93 7
317 2099 2x1049 A9D 3*
318 2111 2x5x211 AAB 2*
319 2113 2^6x3x11 AAD 5
320 2129 2^4x7x19 AC1 3
321 2131 2x3x5x71 AC3 4*
322 2137 2^3x3x89 AC9 10
323 2141 2^2x5x107 ACD 2
324 2143 2x3^2x7x17 AD1 9*
325 2153 2^3x269 ADB 3
326 2161 2^4x3^3x5 B05 23
327 2179 2x3^2x11^2 B19 5*
328 2203 2x3x367 B35 2*
329 2207 2x1103 B39 2*
330 2213 2^2x7x79 B41 2
331 2221 2^2x3x5x37 B49 2
332 2237 2^2x557 B5B 2
333 2239 2x3x373 B5D 2*
334 2243 2x19x59 B63 3*
335 2251 2x3^2x5^3 B6B 5*
336 2267 2x11x103 B7D 3*
337 2269 2^2x3^4x7 B81 2
338 2273 2^5x71 B85 3
339 2281 2^3x3x5x19 B8D 7
340 2287 2x3^2x127 B95 7*
341 2293 2^2x3x191 B9B 2
342 2297 2^3x7x41 BA1 5
343 2309 2^2x577 BAD 2
344 2311 2x3x5x7x11 BB1 2*
345 2333 2^2x11x53 BC9 2
346 2339 2x7x167 BD1 3*
347 2341 2^2x3^2x5x13 BD3 7
348 2347 2x3x17x23 BD9 6*
349 2351 2x5^2x47 BDD 3*
350 2357 2^2x19x31 C05 2
351 2371 2x3x5x79 C15 4*
352 2377 2^3x3^3x11 C1B 5
353 2381 2^2x5x7x17 C21 3
354 2383 2x3x397 C23 13*
355 2389 2^2x3x199 C29 2
356 2393 2^3x13x23 C2D 3
357 2399 2x11x109 C35 2*
358 2411 2x5x241 C43 3*
359 2417 2^4x151 C49 3
360 2423 2x7x173 C51 2*
361 2437 2^2x3x7x29 C61 2
362 2441 2^3x5x61 C65 6
363 2447 2x1223 C6B 2*
364 2459 2x1229 C79 3*
365 2467 2x3^2x137 C83 4*
366 2473 2^3x3x103 C89 5
367 2477 2^2x619 C8D 2
368 2503 2x3^2x139 CAB 2*
369 2521 2^3x3^2x5x7 CC1 17
370 2531 2x5x11x23 CCB 3*
371 2539 2x3^3x47 CD5 4*
372 2543 2x31x41 CD9 2*
373 2549 2^2x7^2x13 D01 2
374 2551 2x3x5^2x17 D03 2*
375 2557 2^2x3^2x71 D09 2
376 2579 2x1289 D23 3*
377 2591 2x5x7x37 D31 2*
378 2593 2^5x3^4 D33 7
379 2609 2^4x163 D45 3
380 2617 2^3x3x109 D4D 5
381 2621 2^2x5x131 D53 2
382 2633 2^3x7x47 D61 3
383 2647 2x3^3x7^2 D71 2*
384 2657 2^5x83 D7B 3
385 2659 2x3x443 D7D 4*
386 2663 2x11^3 D83 2*
387 2671 2x3x5x89 D8B 5*
388 2677 2^2x3x223 D93 2
389 2683 2x3^2x149 D99 4*
390 2687 2x17x79 D9D 3*
391 2689 2^7x3x7 DA1 19
392 2693 2^2x673 DA5 2
393 2699 2x19x71 DAB 3*
394 2707 2x3x11x41 DB5 4*
395 2711 2x5x271 DB9 2*
396 2713 2^3x3x113 DBB 5
397 2719 2x3^2x151 DC3 2*
398 2729 2^3x11x31 DCD 3
399 2731 2x3x5x7x13 DD1 5*
400 2741 2^2x5x137 DDB 2
401 2749 2^2x3x229 1005 6
402 2753 2^6x43 1009 3
403 2767 2x3x461 1019 9*
404 2777 2^3x347 1025 3
405 2789 2^2x17x41 1033 2
406 2791 2x3^2x5x31 1035 7*
407 2797 2^2x3x233 103B 2
408 2801 2^4x5^2x7 1041 3
409 2803 2x3x467 1043 4*
410 2819 2x1409 1055 3*
411 2833 2^4x3x59 1065 5
412 2837 2^2x709 1069 2
413 2843 2x7^2x29 1071 4*
414 2851 2x3x5^2x19 1079 4*
415 2857 2^3x3x7x17 1081 11
416 2861 2^2x5x11x13 1085 2
417 2879 2x1439 1099 2*
418 2887 2x3x13x37 10A3 2*
419 2897 2^4x181 10AD 3
420 2903 2x1451 10B5 2*
421 2909 2^2x727 10BB 2
422 2917 2^2x3^6 10C5 5
423 2927 2x7x11x19 10D1 2*
424 2939 2x13x113 10DD 3*
425 2953 2^3x3^2x41 110D 13
426 2957 2^2x739 1113 2
427 2963 2x1481 1119 3*
428 2969 2^3x7x53 1121 3
429 2971 2x3^3x5x11 1123 5*
430 2999 2x1499 1143 2*
431 3001 2^3x3x5^3 1145 2*
432 3011 2x5x7x43 1151 3*
433 3019 2x3x503 1159 4*
434 3023 2x1511 115D 2*
435 3037 2^2x3x11x23 116D 2
436 3041 2^5x5x19 1173 3
437 3049 2^3x3x127 117B 11
438 3061 2^2x3^2x5x17 1189 6
439 3067 2x3x7x73 1191 4*
440 3079 2x3^4x19 119D 2*
441 3083 2x23x67 11A3 3*
442 3089 2^4x193 11A9 3
443 3109 2^2x3x7x37 11C1 6
444 3119 2x1559 11CB 2*
445 3121 2^4x3x5x13 11CD 7
446 3137 2^6x7^2 1201 3
447 3163 2x3x17x31 121D 6*
448 3167 2x1583 1223 2*
449 3169 2^5x3^2x11 1225 7
450 3181 2^2x3x5x53 1233 7
451 3187 2x3^3x59 1239 2*
452 3191 2x5x11x29 123D 5*
453 3203 2x1601 124B 3*
454 3209 2^3x401 1253 3
455 3217 2^4x3x67 125B 5
456 3221 2^2x5x7x23 1261 10
457 3229 2^2x3x269 1269 6
458 3251 2x5^3x13 1283 3*
459 3253 2^2x3x271 1285 2
460 3257 2^3x11x37 1289 3
461 3259 2x3^2x181 128B 5*
462 3271 2x3x5x109 1299 5*
463 3299 2x17x97 12B9 3*
464 3301 2^2x3x5^2x11 12BB 6
465 3307 2x3x19x29 12C3 4*
466 3313 2^4x3^2x23 12C9 10
467 3319 2x3x7x79 12D1 2*
468 3323 2x11x151 12D5 3*
469 3329 2^8x13 12DB 3
470 3331 2x3^2x5x37 12DD 3
471 3343 2x3x557 130B 11*
472 3347 2x7x239 1311 3*
473 3359 2x23x73 131D 2*
474 3361 2^5x3x5x7 1321 22
475 3371 2x5x337 132B 3*
476 3373 2^2x3x281 132D 10
477 3389 2^2x7x11^2 1341 3
478 3391 2x3x5x113 1343 5*
479 3407 2x13x131 1355 2*
480 3413 2^2x853 135B 2
481 3433 2^3x3x11x13 1373 5
482 3449 2^3x431 1385 3
483 3457 2^7x3^3 138D 7
484 3461 2^2x5x173 1393 2
485 3463 2x3x577 1395 9*
486 3467 2x1733 1399 3*
487 3469 2^2x3x17^2 139B 2
488 3491 2x5x349 13B5 3*
489 3499 2x3x11x53 13BD 4*
490 3511 2x3^3x5x13 13CB 2*
491 3517 2^2x3x293 13D3 2
492 3527 2x41x43 13DD 2*
493 3529 2^3x3^2x7^2 1401 17
494 3533 2^2x883 1405 2
495 3539 2x29x61 140B 3*
496 3541 2^2x3x5x59 140D 7
497 3547 2x3^2x197 1415 4*
498 3557 2^2x7x127 1421 2
499 3559 2x3x593 1423 2*
500 3571 2x3x5x7x17 1431 4*
501 3581 2^2x5x179 143B 2
502 3583 2x3^2x199 143D 2*
503 3593 2^3x449 1449 3
504 3607 2x3x601 1459 11*
505 3613 2^2x3x7x43 1461 2
506 3617 2^5x113 1465 3
507 3623 2x1811 146B 2*
508 3631 2x3x5x11^2 1475 10*
509 3637 2^2x3^2x101 147B 2
510 3643 2x3x607 1483 4*
511 3659 2x31x59 1495 3*
512 3671 2x5x367 14A3 2*
513 3673 2^3x3^3x17 14A5 5
514 3677 2^2x919 14A9 2
515 3691 2x3^2x5x41 14B9 4*
516 3697 2^4x3x7x11 14C1 5
517 3701 2^2x5^2x37 14C5 2
518 3709 2^2x3^2x103 14CD 2
519 3719 2x11x13^2 14D9 2*
520 3727 2x3^4x23 1503 2*
521 3733 2^2x3x311 1509 2
522 3739 2x3x7x89 1511 5*
523 3761 2^4x5x47 1529 3
524 3767 2x7x269 1531 2*
525 3769 2^3x3x157 1533 7
526 3779 2x1889 153D 2*
527 3793 2^4x3x79 154D 5
528 3797 2^2x13x73 1553 2
529 3803 2x1901 1559 3*
530 3821 2^2x5x191 156D 3
531 3823 2x3x7^2x13 1571 9*
532 3833 2^3x479 157B 3
533 3847 2x3x641 158B 2*
534 3851 2x5^2x7x11 1591 4*
535 3853 2^2x3^2x107 1593 2
536 3863 2x1931 159D 2*
537 3877 2^2x3x17x19 15AD 2
538 3881 2^3x5x97 15B3 13
539 3889 2^4x3^5 15BB 2
540 3907 2x3^2x7x31 15D1 4*
541 3911 2x5x17x23 15D5 2*
542 3917 2^2x11x89 15DB 2
543 3919 2x3x653 15DD 2*
544 3923 2x37x53 1603 3*
545 3929 2^3x491 1609 3
546 3931 2x3x5x131 160B 4*
547 3943 2x3^3x73 1619 9*
548 3947 2x1973 161D 3*
549 3967 2x3x661 1635 2*
550 3989 2^2x997 164D 2
551 4001 2^5x5^3 165B 3
552 4003 2x3x23x29 165D 4*
553 4007 2x2003 1663 2*
554 4013 2^2x17x59 1669 2
555 4019 2x7^2x41 1671 4*
556 4021 2^2x3x5x67 1673 2
557 4027 2x3x11x61 1679 6*
558 4049 2^4x11x23 1693 3
559 4051 2x3^4x5^2 1695 5*
560 4057 2^3x3x13^2 169B 5
561 4073 2^3x509 16AD 2
562 4079 2x2039 16B5 2*
563 4091 2x5x409 16C3 3*
564 4093 2^2x3x11x31 16C5 2
565 4099 2x3x683 16CB 4*
566 4111 2x3x5x137 16D9 2*
567 4127 2x2063 170B 2*
568 4129 2^5x3x43 170D 13
569 4133 2^2x1033 1713 2
570 4139 2x2069 1719 3*
571 4153 2^3x3x173 1729 5
572 4157 2^2x1039 172D 2
573 4159 2x3^3x7x11 1731 2*
574 4177 2^4x3^2x29 1745 5
575 4201 2^3x3x5^2x7 1761 11
576 4211 2x5x421 176B 3*
577 4217 2^3x17x31 1773 5
578 4219 2x3x19x37 1775 4*
579 4229 2^2x7x151 1781 2
580 4231 2x3^2x5x47 1783 2*
581 4241 2^4x5x53 178D 3
582 4243 2x3x7x101 1791 4*
583 4253 2^2x1063 179B 2
584 4259 2x2129 17A3 3*
585 4261 2^2x3x5x71 17A5 2
586 4271 2x5x7x61 17B1 3*
587 4273 2^4x3x89 17B3 5
588 4283 2x2141 17BD 3*
589 4289 2^6x67 17C5 3
590 4297 2^3x3x179 17CD 3
591 4327 2x3x7x103 1811 2*
592 4337 2^4x271 181B 3
593 4339 2x3^2x241 181D 5*
594 4349 2^2x1087 1829 2
595 4357 2^2x3^2x11^2 1833 2
596 4363 2x3x727 1839 4*
597 4373 2^2x1093 1845 2
598 4391 2x5x439 1859 2*
599 4397 2^2x7x157 1861 2
600 4409 2^3x7x19x29 186D 3
601 4421 2^2x5x13x17 187B 3
602 4423 2x3x11x67 187D 7*
603 4441 2^3x3x5x37 1893 21
604 4447 2x3^2x13x19 1899 2*
605 4451 2x5^2x89 189D 3*
606 4457 2^3x557 18A5 3
607 4463 2x23x97 18AB 2*
608 4481 2^7x5x7 18C1 3
609 4483 2x3^3x83 18C3 4*
610 4493 2^2x1123 18CD 2
611 4507 2x3x751 18DD 4*
612 4513 2^5x3x47 1905 7
613 4517 2^2x1129 1909 2
614 4519 2x3^2x251 190B 9*
615 4523 2x7x17x19 1911 3*
616 4547 2x2273 192B 3*
617 4549 2^2x3x379 192D 6
618 4561 2^4x3x5x19 193B 11
619 4567 2x3x761 1943 7*
620 4583 2x29x79 1955 2*
621 4591 2x3^3x5x17 195D 2*
622 4597 2^2x3x383 1965 5
623 4603 2x3x13x59 196B 4*
624 4621 2^2x3x5x7x11 1981 2
625 4637 2^2x19x61 1993 2
626 4639 2x3x773 1995 2*
627 4643 2x11x211 1999 3*
628 4649 2^3x7x83 19A1 3
629 4651 2x3x5^2x31 19A3 5*
630 4657 2^4x3x97 19A9 15
631 4663 2x3^2x7x37 19B1 9*
632 4673 2^6x73 19BB 3
633 4679 2x2339 19C3 2*
634 4691 2x5x7x67 19D1 3*
635 4703 2x2351 19DD 2*
636 4721 2^4x5x59 1A13 3
637 4723 2x3x787 1A15 4*
638 4729 2^3x3x197 1A1B 17
639 4733 2^2x7x13^2 1A21 5
640 4751 2x5^3x19 1A35 3*
641 4759 2x3x13x61 1A3D 5*
642 4783 2x3x797 1A59 2*
643 4787 2x2393 1A5D 3*
644 4789 2^2x3^2x7x19 1A61 2
645 4793 2^3x599 1A65 3
646 4799 2x2399 1A6B 2*
647 4801 2^6x3x5^2 1A6D 7
648 4813 2^2x3x401 1A7B 2
649 4817 2^4x7x43 1A81 3
650 4831 2x3x5x7x23 1A91 2*
651 4861 2^2x3^5x5 1AB3 11
652 4871 2x5x487 1ABD 3*
653 4877 2^2x23x53 1AC5 2
654 4889 2^3x13x47 1AD3 3
655 4903 2x3x19x43 1B03 2*
656 4909 2^2x3x409 1B09 6
657 4919 2x2459 1B15 2*
658 4931 2x5x17x29 1B23 3*
659 4933 2^2x3^2x137 1B25 2
660 4937 2^3x617 1B29 3
661 4943 2x7x353 1B31 2*
662 4951 2x3^2x5^2x11 1B39 2*
663 4957 2^2x3x7x59 1B41 2
664 4967 2x13x191 1B4B 2*
665 4969 2^3x3^3x23 1B4D 11
666 4973 2^2x11x113 1B53 2
667 4987 2x3^2x277 1B63 4*
668 4993 2^7x3x13 1B69 5
669 4999 2x3x7^2x17 1B71 9*
670 5003 2x41x61 1B75 3*
671 5009 2^4x313 1B7B 3
672 5011 2x3x5x167 1B7D 4*
673 5021 2^2x5x251 1B89 3
674 5023 2x3^4x31 1B8B 2*
675 5039 2x11x229 1B9D 2*
676 5051 2x5^2x101 1BAB 3*
677 5059 2x3^2x281 1BB5 4*
678 5077 2^2x3^3x47 1BC9 2
679 5081 2^3x5x127 1BCD 3
680 5087 2x2543 1BD5 2*
681 5099 2x2549 1C03 3*
682 5101 2^2x3x5^2x17 1C05 6
683 5107 2x3x23x37 1C0B 4*
684 5113 2^3x3^2x71 1C13 19
685 5119 2x3x853 1C19 2*
686 5147 2x31x83 1C39 3*
687 5153 2^5x7x23 1C41 5
688 5167 2x3^2x7x41 1C51 11*
689 5171 2x5x11x47 1C55 4*
690 5179 2x3x863 1C5D 4*
691 5189 2^2x1297 1C69 2
692 5197 2^2x3x433 1C73 2
693 5209 2^3x3x7x31 1C81 2
694 5227 2x3x13x67 1C95 4*
695 5231 2x5x523 1C99 2*
696 5233 2^4x3x109 1C9B 10
697 5237 2^2x7x11x17 1CA1 3
698 5261 2^2x5x263 1CBB 2
699 5273 2^3x659 1CC9 3
700 5279 2x7x13x29 1CD1 3*
701 5281 2^5x3x5x11 1CD3 7
702 5297 2^4x331 1D05 3
703 5303 2x11x241 1D0B 2*
704 5309 2^2x1327 1D13 2
705 5323 2x3x887 1D23 10*
706 5333 2^2x31x43 1D2D 2
707 5347 2x3^5x11 1D3D 6*
708 5351 2x5^2x107 1D43 2*
709 5381 2^2x5x269 1D65 3
710 5387 2x2693 1D6B 3*
711 5393 2^4x337 1D73 3
712 5399 2x2699 1D79 2*
713 5407 2x3x17x53 1D83 2*
714 5413 2^2x3x11x41 1D89 5
715 5417 2^3x677 1D8D 3
716 5419 2x3^2x7x43 1D91 5*
717 5431 2x3x5x181 1D9D 2*
718 5437 2^2x3^2x151 1DA5 5
719 5441 2^6x5x17 1DA9 3
720 5443 2x3x907 1DAB 4*
721 5449 2^3x3x227 1DB3 7
722 5471 2x5x547 1DCB 3*
723 5477 2^2x37^2 1DD3 2
724 5479 2x3x11x83 1DD5 2*
725 5483 2x2741 1DD9 3*
726 5501 2^2x5^3x11 200D 2
727 5503 2x3x7x131 2011 9*
728 5507 2x2753 2015 3*
729 5519 2x31x89 2023 2*
730 5521 2^4x3x5x23 2025 11
731 5527 2x3^2x307 202B 2*
732 5531 2x5x7x79 2031 5*
733 5557 2^2x3x463 204D 2
734 5563 2x3^3x103 2055 4*
735 5569 2^6x3x29 205B 13
736 5573 2^2x7x199 2061 2
737 5581 2^2x3^2x5x31 2069 6
738 5591 2x5x13x43 2075 2*
739 5623 2x3x937 2099 2*
740 5639 2x2819 20AB 2*
741 5641 2^3x3x5x47 20AD 14
742 5647 2x3x941 20B5 2*
743 5651 2x5^2x113 20B9 3*
744 5653 2^2x3^2x157 20BB 5
745 5657 2^3x7x101 20C1 3
746 5659 2x3x23x41 20C3 4*
747 5669 2^2x13x109 20CD 3
748 5683 2x3x947 20DD 4*
749 5689 2^3x3^2x79 2105 11
750 5693 2^2x1423 2109 2
751 5701 2^2x3x5^2x19 2113 2
752 5711 2x5x571 211D 3*
753 5717 2^2x1429 2125 2
754 5737 2^3x3x239 213B 10
755 5741 2^2x5x7x41 2141 2
756 5743 2x3^2x11x29 2143 2*
757 5749 2^2x3x479 2149 2
758 5779 2x3^3x107 216B 4*
759 5783 2x7^2x59 2171 2*
760 5791 2x3x5x193 2179 2*
761 5801 2^3x5^2x29 2185 3
762 5807 2x2903 218B 2*
763 5813 2^2x1453 2193 2
764 5821 2^2x3x5x97 219B 6
765 5827 2x3x971 21A3 4*
766 5839 2x3x7x139 21B1 2*
767 5843 2x23x127 21B5 4*
768 5849 2^3x17x43 21BB 3
769 5851 2x3^2x5^2x13 21BD 4*
770 5857 2^5x3x61 21C5 7
771 5861 2^2x5x293 21C9 3
772 5867 2x7x419 21D1 3*
773 5869 2^2x3^2x163 21D3 2
774 5879 2x2939 21DD 2*
775 5881 2^3x3x5x7^2 2201 31
776 5897 2^3x11x67 2213 3
777 5903 2x13x227 2219 2*
778 5923 2x3^2x7x47 2231 4*
779 5927 2x2963 2235 2*
780 5939 2x2969 2243 3*
781 5953 2^6x3x31 2253 7
782 5981 2^2x5x13x23 2273 3
783 5987 2x41x73 2279 3*
784 6007 2x3x7x11x13 2291 9*
785 6011 2x5x601 2295 4*
786 6029 2^2x11x137 22A9 2
787 6037 2^2x3x503 22B3 5
788 6043 2x3x19x53 22B9 6*
789 6047 2x3023 22BD 2*
790 6053 2^2x17x89 22C5 2
791 6067 2x3^2x337 22D5 4*
792 6073 2^3x3x11x23 22DB 10
793 6079 2x3x1013 2303 7*
794 6089 2^3x761 230D 10
795 6091 2x3x5x7x29 2311 11*
796 6101 2^2x5^2x61 231B 2
797 6113 2^5x191 2329 2
798 6121 2^3x3^2x5x17 2333 2
799 6131 2x5x613 233D 3*
800 6133 2^2x3x7x73 2341 5
801 6143 2x37x83 234B 2*
802 6151 2x3x5^2x41 2355 2*
803 6163 2x3x13x79 2363 6*
804 6173 2^2x1543 236D 2
805 6197 2^2x1549 2389 2
806 6199 2x3x1033 238B 2*
807 6203 2x7x443 2391 3*
808 6211 2x3^3x5x23 2399 4*
809 6217 2^3x3x7x37 23A1 5
810 6221 2^2x5x311 23A5 3
811 6229 2^2x3^2x173 23AD 2
812 6247 2x3^2x347 23C3 2*
813 6257 2^4x17x23 23CD 3
814 6263 2x31x101 23D5 2*
815 6269 2^2x1567 23DB 2
816 6271 2x3x5x11x19 23DD 17*
817 6277 2^2x3x523 2405 2
818 6287 2x7x449 2411 2*
819 6299 2x47x67 241D 3*
820 6301 2^2x3^2x5^2x7 2421 10
821 6311 2x5x631 242B 2*
822 6317 2^2x1579 2433 2
823 6323 2x29x109 2439 3*
824 6329 2^3x7x113 2441 3
825 6337 2^6x3^2x11 2449 10
826 6343 2x3x7x151 2451 2*
827 6353 2^4x397 245B 3
828 6359 2x11x17^2 2463 2*
829 6361 2^3x3x5x53 2465 19
830 6367 2x3x1061 246B 2*
831 6373 2^2x3^3x59 2473 2
832 6379 2x3x1063 2479 4*
833 6389 2^2x1597 2485 2
834 6397 2^2x3x13x41 248D 2
835 6421 2^2x3x5x107 24A9 6
836 6427 2x3^3x7x17 24B1 6*
837 6449 2^4x13x31 24C9 3
838 6451 2x3x5^2x43 24CB 6*
839 6469 2^2x3x7^2x11 2501 2
840 6473 2^3x809 2505 3
841 6481 2^4x3^4x5 250D 7
842 6491 2x5x11x59 2519 3*
843 6521 2^3x5x163 253B 6
844 6529 2^7x3x17 2545 7
845 6547 2x3x1091 2559 4*
846 6551 2x5^2x131 255D 2*
847 6553 2^3x3^2x7x13 2561 10
848 6563 2x17x193 256B 10*
849 6569 2^3x821 2573 3
850 6571 2x3^2x5x73 2575 10*
851 6577 2^4x3x137 257B 5
852 6581 2^2x5x7x47 2581 14
853 6599 2x3299 2595 2*
854 6607 2x3^2x367 259D 2*
855 6619 2x3x1103 25AB 4*
856 6637 2^2x3x7x79 25C1 2
857 6653 2^2x1663 25D3 2
858 6659 2x3329 25D9 3*
859 6661 2^2x3^2x5x37 25DB 6
860 6673 2^4x3x139 2609 5
861 6679 2x3^2x7x53 2611 5*
862 6689 2^5x11x19 261B 3
863 6691 2x3x5x223 261D 4*
864 6701 2^2x5^2x67 2629 2
865 6703 2x3x1117 262B 2*
866 6709 2^2x3x13x43 2633 2
867 6719 2x3359 263D 2*
868 6733 2^2x3^2x11x17 264D 2
868 6737 2^4x421 2653 3
870 6761 2^3x5x13^2 266D 2
871 6763 2x3x7^2x23 2671 4*
872 6779 2x3389 2683 3*
873 6781 2^2x3x5x113 2685 2
874 6791 2x5x7x97 2691 3*
875 6793 2^3x3x283 2693 10
876 6803 2x19x179 269D 3*
877 6823 2x3^2x379 26B5 2*
878 6827 2x3413 26B9 3*
879 6829 2^2x3x569 26BB 2
880 6833 2^4x7x61 26C1 3
881 6841 2^3x3^2x5x19 26C9 22
882 6857 2^3x857 26DB 3
883 6863 2x47x73 2703 2*
884 6869 2^2x17x101 2709 2
885 6871 2x3x5x229 270B 9*
886 6883 2x3x31x37 2719 4*
887 6899 2x3449 272B 3*
888 6907 2x3x1151 2735 4*
889 6911 2x5x691 2739 2*
890 6917 2^2x7x13x19 2741 2
891 6947 2x23x151 2763 3*
892 6949 2^2x3^2x193 2765 2
893 6959 2x7^2x71 2771 3*
894 6961 2^4x3x5x29 2773 13
895 6967 2x3^4x43 2779 13*
896 6971 2x5x17x41 277D 4*
897 6977 2^6x109 2785 3
898 6983 2x3491 278B 2*
899 6991 2x3x5x233 2795 2*
900 6997 2^2x3x11x53 279B 5
901 7001 2^3x5^3x7 27A1 3
902 7013 2^2x1753 27AD 2
903 7019 2x11^2x29 27B5 3*
904 7027 2x3x1171 27BD 4*
905 7039 2x3^2x17x23 27CB 2*
906 7043 2x7x503 27D1 4*
907 7057 2^4x3^2x7^2 2801 5
908 7069 2^2x3x19x31 280D 2
909 7079 2x3539 2819 2*
910 7103 2x53x67 2835 2*
911 7109 2^2x1777 283B 2
912 7121 2^4x5x89 2849 3
913 7127 2x7x509 2851 2*
914 7129 2^3x3^4x11 2853 3
915 7151 2x5^2x11x13 286B 2*
916 7159 2x5^2x11x13 2875 2*
917 7177 2^3x3x13x23 2889 10
918 7187 2x3593 2895 3*
919 7193 2^3x29x31 289B 3
920 7207 2x3x1201 28AB 3*
921 7211 2x5x7x103 28B1 3*
922 7213 2^2x3x601 28B3 5
923 7219 2x3^2x401 28B9 4*
924 7229 2^2x13x139 28C5 2
925 7237 2^2x3^3x67 28CD 2
926 7243 2x3x17x71 28D5 4*
927 7247 2x3623 28D9 2*
928 7253 2^2x7^2x37 2901 2
929 7283 2x11x331 2923 3*
930 7297 2^7x3x19 2933 5
931 7307 2x13x281 293D 3*
932 7309 2^2x3^2x7x29 2941 6
933 7321 2^3x3x5x61 294D 7
934 7331 2x5x733 2959 4*
935 7333 2^2x3x13x47 295B 6
936 7349 2^2x11x67 296D 2
937 7351 2x3x5^2x7^2 2971 4*
938 7369 2^3x3x307 2985 7
939 7393 2^5x3x7x11 29A1 5
940 7411 2x3x5x13x19 29B5 4*
941 7417 2^3x3^2x103 29BB 5
942 7433 2^3x929 29CD 3
943 7451 2x5^2x149 2A03 4*
944 7457 2^5x233 2A09 3
945 7459 2x3x11x113 2A0B 4*
946 7477 2^2x3x7x89 2A21 2
947 7481 2^3x5x11x17 2A25 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)

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