Phi_52001(10) = 9000000000...<51504> = 104003 * 12272237 * [7051360343...<51492>] (0.02%)
Phi_52002(10) = 1000000000...<17173> = 15410662226983<14> * 24197507793502921<17> * 41098884309856783<17> * [6524962611...<17126>] (0.27%)
Phi_52003(10) = 9000000900...<38016> = 6086710376111<13> * 94710172567105957<17> * [1561217057...<37987>] (0.08%)
Phi_52004(10) = 9900990099...<26000> = 780061 * 510263249 * 26307118492849<14> * [9455456257...<25972>] (0.11%)
Phi_52005(10) = 1109988900...<27729> = 103272361081<12> * 3982006135072951<16> * [2699184707...<27702>] (0.10%)
Phi_52006(10) = 9090909090...<26002> = [9090909090...<26002>] (0.00%)
Phi_52007(10) = 9000000000...<51480> = 312043 * 67459111813<11> * [4275505269...<51464>] (0.03%)
Phi_52008(10) = 9999000100...<15680> = [9999000100...<15680>] (0.00%)
Phi_52009(10) = 1111111111...<52009> = 208037 * 102873803 * [5191730175...<51995>] (0.03%)
Phi_52010(10) = 9091000909...<17808> = [9091000909...<17808>] (0.00%)
Phi_52011(10) = 9990000009...<34668> = 624133 * [1600620382...<34663>] (0.02%)
Phi_52012(10) = 9900990099...<26004> = 275700160743149<15> * 5628851915875835681<19> * [6380016230...<25971>] (0.13%)
Phi_52013(10) = 9000000000...<48000> = 62162421521201<14> * [1447820046...<47987>] (0.03%)
Phi_52014(10) = 1098901098...<17337> = [1098901098...<17337>] (0.00%)
Phi_52015(10) = 1111099999...<40801> = [1111099999...<40801>] (0.00%)
Phi_52016(10) = 9999999900...<26000> = 31053553 * 303669409 * 9449537459633<13> * [1122217671...<25972>] (0.11%)
Phi_52017(10) = 1109999889...<29713> = [1109999889...<29713>] (0.00%)
Phi_52018(10) = 1099999999...<25141> = 19714823 * 267476557 * 632226773 * [3299447296...<25116>] (0.10%)
Phi_52019(10) = 9000000000...<47280> = [9000000000...<47280>] (0.00%)
Phi_52020L(10) = 1000000000...<6529> = 405339841 * 15177495081781<14> * 71971118377056948241<20> * 1083769055742944341161361<25> * 24745511621594497593167101<26> * [8421494530...<6437>] (1.40%)
Phi_52020M(10) = 9999999999...<6528> = 33890228735941<14> * 5951313140774517541<19> * [4958070499...<6496>] (0.49%)
Phi_52021(10) = 1111111111...<52021> = 1647204700747<13> * 159045397015357<15> * 101402333105411201<18> * [4182547342...<51977>] (0.08%)
Phi_52022(10) = 1000000000...<23977> = 1092463 * 364830287 * 180719225801<12> * [1388346982...<23951>] (0.11%)
Phi_52023(10) = 9009009009...<34680> = 3204465100933<13> * [2811392455...<34668>] (0.04%)
Phi_52024(10) = 1000099999...<22273> = 4265969 * [2344367715...<22266>] (0.03%)
Phi_52025(10) = 9999900000...<41600> = [9999900000...<41600>] (0.00%)
Phi_52026(10) = 1098901098...<14785> = 364183 * 3121561 * 13213875637<11> * [7315380112...<14762>] (0.15%)
Phi_52027(10) = 1111111111...<52027> = [1111111111...<52027>] (0.00%)
Phi_52028(10) = 9900990099...<26012> = 27314701 * 10882956901<11> * 3330698075...<25995> (100.00%)
Phi_52029(10) = 1000000001...<33121> = 19666963 * 210070751902471<15> * 728900549796889<15> * [3320693805...<33084>] (0.11%)
Phi_52030(10) = 9999999999...<18480> = 9079182971<10> * [1101420693...<18471>] (0.05%)
Phi_52031(10) = 9000000900...<44592> = 19043347 * 2895707285556121<16> * [1632091913...<44570>] (0.05%)
Phi_52032(10) = 1000000000...<17281> = 429992449 * 5519086273<10> * [4213781266...<17262>] (0.11%)
Phi_52033(10) = 9000000000...<51120> = 312199 * [2882776690...<51115>] (0.01%)
Phi_52034(10) = 9090909090...<26016> = 897066161 * 7679907692635105693<19> * 170433078395824498201<21> * 156640152067345692605659<24> * 11038100527717746657390331<26> * [4477911547...<25920>] (0.37%)
Phi_52035(10) = 1109988900...<27745> = 5411641 * [2051113331...<27738>] (0.02%)
Phi_52036(10) = 9900990099...<26016> = 7032532636603566546089<22> * [1407883988...<25995>] (0.08%)
Phi_52037(10) = 9000000000...<48960> = 23312055631<11> * 24410235319489<14> * [1581575659...<48937>] (0.05%)
Phi_52038(10) = 9999999999...<14616> = [9999999999...<14616>] (0.00%)
Phi_52039(10) = 9000000000...<48024> = 4371277 * 744594411289<12> * [2765122712...<48006>] (0.04%)
Phi_52040(10) = 1000099999...<20801> = [1000099999...<20801>] (0.00%)
Phi_52041(10) = 9009009009...<29520> = 31640929 * 67236973 * 1147399969<10> * [3690666543...<29496>] (0.08%)
Phi_52042(10) = 9090909090...<26020> = 762656202419<12> * 137632236231168756242677<24> * [8660806625...<25985>] (0.13%)
Phi_52043(10) = 9000000000...<51240> = [9000000000...<51240>] (0.00%)
Phi_52044(10) = 1009998990...<17345> = 2307735049<10> * 39940497577369<14> * 24418560200881261<17> * [4487469083...<17305>] (0.23%)
Phi_52045(10) = 1111099888...<35665> = 832721 * [1334300310...<35659>] (0.02%)
Phi_52046(10) = 1099999999...<25481> = 813270797 * 8090148020099<13> * 4328729906321641<16> * [3862251504...<25443>] (0.15%)
Phi_52047(10) = 9990000009...<34692> = 50015894867227<14> * [1997365044...<34679>] (0.04%)
Phi_52048(10) = 9999999900...<26016> = [9999999900...<26016>] (0.00%)
Phi_52049(10) = 1111111111...<47521> = [1111111111...<47521>] (0.00%)
Phi_52050(10) = 9999900001...<13840> = 416401 * 6894451235851<13> * [3483246336...<13822>] (0.13%)
Phi_52051(10) = 1111111111...<52051> = 936919 * 51669986681<11> * 517603472161<12> * 5867051097157<13> * 253931246766317<15> * [2976349301...<51995>] (0.11%)
Phi_52052(10) = 9999999999...<18720> = 1509509 * [6624670671...<18714>] (0.03%)
Phi_52053(10) = 9009009009...<34700> = 104107 * 208213 * 1639163971674601<16> * 598010471372034665437<21> * [4239923875...<34654>] (0.13%)
Phi_52054(10) = 1099999999...<24481> = 615642659 * [1786750778...<24472>] (0.04%)
Phi_52055(10) = 1111099999...<40097> = 194998031 * 10875434711<11> * [5239336545...<40078>] (0.05%)
Phi_52056(10) = 1000000000...<17281> = 52057 * 1041121 * 577301041 * [3196077607...<17261>] (0.11%)
Phi_52057(10) = 1111111111...<52057> = 415660569041<12> * 205026802904053484806181369<27> * [1303791133...<52019>] (0.07%)
Phi_52058(10) = 9090909090...<26028> = 13921969285079629145761<23> * [6529901700...<26006>] (0.09%)
Phi_52059(10) = 9009009909...<28512> = 8329441 * 347650003 * 733198957 * 1105316689<10> * 3821859427<10> * 922662807426403<15> * [1088661040...<28455>] (0.20%)
Phi_52060L(10) = 3540999996...<9792> = 88606121 * [3996337901...<9784>] (0.08%)
Phi_52060M(10) = 2796100002...<9793> = 2489740502617170841<19> * [1123048767...<9775>] (0.19%)
Phi_52061(10) = 9000000000...<51324> = 104123 * 65909227 * 391018766829707<15> * [3353914730...<51297>] (0.05%)
Phi_52062(10) = 1098901098...<17353> = 1098901098...<17353> (100.00%)
Phi_52063(10) = 9000000000...<47320> = 520631 * 995820541436812213<18> * [1735926788...<47297>] (0.05%)
Phi_52064(10) = 9999999999...<26016> = 1509857 * 697813793 * 362857444801<12> * 1980827233111393<16> * 31381059394543489<17> * 496132973593156901064353<24> * [8481571058...<25934>] (0.32%)
Phi_52065(10) = 9990000009...<25344> = 26650488641401<14> * 17471560608024121<17> * [2145500466...<25315>] (0.12%)
Phi_52066(10) = 1099999890...<22309> = 312397 * 2499169 * 1057304263<10> * 1332570450...<22288> (100.00%)
Phi_52067(10) = 1111111111...<52067> = 10100999 * 16036637 * 4385778355121<13> * [1563987161...<52040>] (0.05%)
Phi_52068(10) = 1009998990...<17353> = 47954629 * 1022928761089<13> * 5572798730652954769<19> * [3694635988...<17314>] (0.22%)
Phi_52069(10) = 1111111111...<52069> = 208277 * 1457933 * [3659136501...<52057>] (0.02%)
Phi_52070(10) = 9091000000...<20160> = [9091000000...<20160>] (0.00%)
Phi_52071(10) = 1109999999...<32641> = 58840231 * 108062425591<12> * 28545211195414091083<20> * [6115622046...<32602>] (0.12%)
Phi_52072(10) = 1000099999...<24817> = 156217 * 676937 * [9457293811...<24805>] (0.04%)
Phi_52073(10) = 1111110999...<43345> = 104147 * 129141041 * [8261262077...<43331>] (0.03%)
Phi_52074(10) = 9990010000...<15720> = 33952249 * [2942370621...<15713>] (0.05%)
Phi_52075(10) = 9999900000...<41640> = 19580201 * 26245801 * [1945891762...<41626>] (0.04%)
Phi_52076(10) = 1009999999...<25393> = 2085993386189<13> * [4841817844...<25380>] (0.05%)
Phi_52077(10) = 9009009009...<34716> = [9009009009...<34716>] (0.00%)
Phi_52078(10) = 1099999999...<24025> = [1099999999...<24025>] (0.00%)
Phi_52079(10) = 9000000000...<49320> = [9000000000...<49320>] (0.00%)
Phi_52080(10) = 1000000009...<11521> = 104161 * 48460544161<11> * 11142729215521<14> * [1777931401...<11492>] (0.25%)
Phi_52081(10) = 1111111111...<52081> = 114402687031<12> * 496101107009<12> * 2243301058111<13> * [8726970505...<52045>] (0.07%)
Phi_52082(10) = 9090909090...<26040> = 3385331 * 9531007 * [2817522469...<26027>] (0.05%)
Phi_52083(10) = 9999999999...<34668> = 208333 * 27290017530271<14> * [1758887723...<34650>] (0.05%)
Phi_52084(10) = 1009999999...<25089> = 11696764301<11> * 1371358625686822021<19> * 4985683473046905971609<22> * [1262931773...<25039>] (0.20%)
Phi_52085(10) = 1111099999...<37841> = [1111099999...<37841>] (0.00%)
Phi_52086(10) = 1098901098...<17361> = 104173 * 38116691059<11> * 47651079297853<14> * [5807851486...<17331>] (0.17%)
Phi_52087(10) = 9999999000...<44604> = 37944500167267<14> * [2635427784...<44591>] (0.03%)
Phi_52088(10) = 1000099999...<24449> = 1020026173656961<16> * [9804650369...<24433>] (0.06%)
Phi_52089(10) = 1109999999...<34177> = 3021163 * 184811773 * 8512777824430951387<19> * [2335328014...<34143>] (0.10%)
Phi_52090(10) = 1099989000...<20833> = [1099989000...<20833>] (0.00%)
Phi_52091(10) = 9000000000...<48072> = [9000000000...<48072>] (0.00%)
Phi_52092(10) = 1000000999...<17353> = 15342218101134357962941<23> * [6517968871...<17330>] (0.13%)
Phi_52093(10) = 9000000000...<51520> = 791841313477<12> * [1136591365...<51509>] (0.02%)
Phi_52094(10) = 1000000000...<21961> = 937693 * [1066447120...<21955>] (0.03%)
Phi_52095(10) = 9009099100...<26400> = 1354471 * 333171697081<12> * 1615221728641<13> * [1235979887...<26371>] (0.11%)
Phi_52096(10) = 1000000000...<23041> = 9708662657<10> * 301428328660097<15> * [3417090833...<23016>] (0.11%)
Phi_52097(10) = 9000000000...<51156> = 937747 * 1354523 * 255075484352963<15> * [2777804788...<51130>] (0.05%)
Phi_52098(10) = 9100000000...<16416> = 32945341977278883487<20> * [2762150718...<16397>] (0.12%)
Phi_52099(10) = 9000000000...<51064> = 218399009 * [4120897819...<51056>] (0.02%)
Phi_52100L(10) = 1010050200...<10401> = 8553918130504501<16> * [1180804147...<10385>] (0.15%)
Phi_52100M(10) = 9900498007...<10400> = 1354601 * 7363240901<10> * 172036060177451837101601<24> * [5769752065...<10361>] (0.38%)