(1)Following a packed list of all smallest prime nonuplets up to 80 digits

Following a packed list of all smallest prime nonuplets up to 80 digits.

Exponent n and offset a (n_a) ,10 n

+ a + d are nine primes. Pattern d : d=0,4,6,10,16,18,24,28,30

00_000000000000000012 05_000000000000013143 08_000000000526927443 09_000000001335215973 10_000000000998082213 11_000000003050287293 12_000000004467947163 13_000000023181063783 14_000000016493659893 15_000000000114226203 16_000000040048734273 17_000000041659160673 18_000000060979099413 19_000000150070562403 20_000001526836769973 21_000002045473229943 22_000002647607531193 23_000002332514056233 24_000002934648447963 25_000012148441813203 26_000000748921059663 27_000004198893472623 28_000014964743373543 29_000018457947875343 30_000022871060098773 31_000068514338392443 32_000180135230239983 33_000073617819999573 34_000093924026059953 35_000008331429424833 36_000136216406185473 37_000029871811331613 38_000128004431637663 39_000189164642750163 40_001153140766579083 41_000230848771310193 42_000393544278072573 43_001307640469250643 44_001571950813548003 45_000216227022154143 46_001337877127411683 47_004624615839542493 48_001305283977441123 49_003526198250883003 50_002120345200047603 51_005514778676362893 52_009608743709416413 53_002665769709239673 54_000910226725158483 55_011561894073545343 56_000434568746265633 57_011025371506821483 58_023275822121025483 59_024165976744068993 60_000986718673956093 61_012090590142360453 62_017963072955755673 63_091658296979455083 64_107092103945219433 65_005749278263414673 66_029312511139082403 67_013924825218694113 68_011657336181635673 69_133362849389750253 70_025627160158515813 71_113971287965745543 72_066999879577740723 73_039331270495843203 74_287619383224587393 75_447368163289830783 76_049487228466438453 77_005464208816494233 78_175879741734469323 79_252454825542165123

Following a packed list of all smallest prime nonuplets up to 80 digits.

Exponent n and offset a (n_a) ,10 n

+ a + d are nine primes. Pattern d : d=0,4,10,12,18,22,24,28,30

04_000000000000078789 05_000000000000755709 07_000000000064266249 08_000000000864669609 09_000000000422475909 10_000000006394542249 11_000000008039383509 12_000000002263588299 13_000000010106550879 14_000000196744345209 15_000000171603577119 16_000000367141480689 17_000000156299690319 18_000000844390957389 19_000002754707169639 20_000001228773049839 21_000007253672579589 22_000006456654340119 23_000006830720143509 24_000006976668980799 25_000000396387300279 26_000023632599655419 27_000060643598881539 28_000029010853608909 29_000004154056233099 30_000046889543073429 31_000004409740409499 32_000073327560528249 33_000227170963148649 34_000396160452668229 35_000064851868958649 36_000029065526487669 37_000158985289373139 38_000295151249787729 39_000882977245706229 40_000325778897122389 41_002030634537198039 42_000160451944571079 43_005503821201214299 44_000259596943656189 45_001965862311207699 46_001615949515388919 47_006228503806519179 48_000449425311918639 49_001731699431041809 50_006784062884875149 51_002857175082861339 52_000881572344252849 53_000565401086224929 54_020159113243329039 55_003598090607512749 56_006464870489107449 57_000187866753222129 58_004946332563856779 59_021345699900951429 60_000799378188615909 61_036724293397936569 62_000752511049190319 63_098927519686444689 64_022247863271360409 65_038005920735283959 66_108055106144204919 67_060820457173677549 68_160338184092086139 69_002125709156175579 70_201296679966749889 71_078514979436230109 72_070309985628097299 73_128208726576846879 74_183783659848776399 75_336264926305946619 76_367970047689436329 77_091105656478929249 78_164604387512813409 79_188652899427973209

Following a packed list of all smallest prime nonuplets up to 80 digits.

Exponent n and offset a (n_a) ,10 n

+ a + d are nine primes. Pattern d : d=0,2,6,8,12,18,20,26,30

00_000000000000000010 08_000000000082403491 09_000000000042090781 10_000000001076719651 11_000000001698684931 12_000000020262482971 13_000000026294974231 14_000000071483461681 15_000000079773889081 16_000000060088794661 17_000001018464878521 18_000000446527079911 19_000001132866238561 20_000002755871853751 21_000000261317164561 22_000001639198614361 23_000002069014296901 24_000004522792834171 25_000000758005606261 26_000029592156813571 27_000004489094504431 28_000000149283107281 29_000014914650424771 30_000053024005351201 31_000091633611384421 32_000037933522746751 33_000002245422938491 34_000296573570795971 35_000088856034345091 36_000652411163378971 37_000512786434894021 38_000011138179417801 39_001225030144620091 40_000137013904691671 41_000549936960847441 42_000466670611020421 43_000952923311625391 44_000052276144601851 45_000197224043233831 46_001086455834678221 47_001896422948143891 48_000575366833127971 49_000500925570224521 50_018055161739429831 51_007464510314865721 52_006774910628276791 53_018302819026776451 54_008563311308013451 55_015962004737388151 56_014545105428105961 57_017105347064482591 58_013429185228314401 59_034537645074778831 60_136318524607288831 61_002188243318924951 62_020436025485974611 63_155904264553005421 64_093494256831594241 65_266939231775341341 66_019416159466095661 67_080812848175859521 68_193212929530364641 69_238786075528107721 70_171571831513543741 71_106504446229950481 72_227604427263339661 73_146738921986518121 74_039149997678561121 75_124214719917482311 76_159399595823243671 77_177586351004256361 78_887924536199599741 79_006120840350368801

Following a packed list of all smallest prime nonuplets up to 80 digits.

Exponent n and offset a (n_a) ,10 n

+ a + d are nine primes. Pattern d : d=0,2,6,12,14,20,24,26,30

00_000000000000000016 03_000000000000000277 05_000000000000013147 08_000000000152277007 09_000000000116452627 10_000000001878692167 11_000000003798521707 12_000000002263588297 13_000000024569393257 14_000000004143260377 15_000000088707632227 16_000000504480905767 17_000000124773145477 18_000000433302885997 19_000000416089831087 20_000001611254165977 21_000001050734939377 22_000001903705736977 23_000002872605534727 24_000004100170677157 25_000001456406292607 26_000013160729766517 27_000002297700910477 28_000001226786877217 29_000031275549714337 30_000052070112642487 31_000036543794341477 32_000018329153421307 33_000021391703967757 34_000081757229262547 35_000043945399372057 36_000068855598638167 37_000146737664427427 38_000322783038069517 39_000085305656379157 40_000102474511920157 41_000171915810461617 42_000684047333697607 43_000193368620143387 44_000465632389077727 45_000906980563912507 46_004187412525274687 47_000140426301745567 48_001229255129248267 49_005212838536064887 50_004496514973381687 51_001441016672082817 52_010367064580892767 53_001363846694261707 54_003740441195603467 55_008427975203606647 56_002085931028056117 57_013078779551324197 58_042898746453431077 59_013982833813936027 60_006500742416228797 61_009122270044627747 62_004873092553043047 63_024092605839743707 64_055553876510732347 65_022259268044088517 66_033259942700980207 67_023439372504561037 68_055695658602176527 69_029218688948555617 70_011813750881177237 71_049900690078334047 72_064710909220445647 73_059189006050462477 74_079602896195026957 75_096412515488750017 76_238937303432545237 77_060313256082160537 78_189325478772622747 79_798375645923055427