Phi_32101(10) = 9000000000...<31372> = 2056967879<10> * 26385673759<11> * 22668199412239<14> * [7315260339...<31339>] (0.11%) Phi_32102(10) = 1099999890...<13753> = [1099999890...<13753>] (0.00%) Phi_32103(10) = 1000000001...<20161> = 2187305803<10> * [4571834444...<20151>] (0.05%) Phi_32104(10) = 9999000099...<16048> = 1926241 * 66776321 * 21516277344524432219589041<26> * [3612903221...<16009>] (0.25%) Phi_32105(10) = 9000090000...<25680> = 255042121 * 33352607416295159761<20> * [1058047461...<25653>] (0.11%) Phi_32106(10) = 1098901098...<10701> = 181463914651<12> * [6055755498...<10689>] (0.11%) Phi_32107(10) = 9000000000...<31680> = 1796968236199<13> * [5008435774...<31668>] (0.04%) Phi_32108(10) = 1009999999...<15313> = 1629817591083768753421<22> * [6197012509...<15291>] (0.14%) Phi_32109(10) = 9009009910...<16560> = 12458293 * 523826227 * 160350546847576933<18> * [8609161200...<16527>] (0.20%) Phi_32110(10) = 9999999999...<11232> = 385321 * [2595238774...<11227>] (0.05%) Phi_32111(10) = 9000000000...<31752> = 43542517 * 167822939519<12> * [1231622617...<31734>] (0.06%) Phi_32112(10) = 1000000000...<10657> = 96337 * 876151546993<12> * 2058348413426818527793<22> * [5755840635...<10618>] (0.36%) Phi_32113(10) = 9000000000...<30208> = 38510420455095713077<20> * 2249362270305169989239477<25> * [1038974390...<30165>] (0.15%) Phi_32114(10) = 9090909090...<16056> = 1894727 * 60995147849<11> * [7866207215...<16039>] (0.11%) Phi_32115(10) = 1109988900...<17121> = 30573481 * 618704938905121<15> * [5868000795...<17098>] (0.13%) Phi_32116(10) = 9900990099...<12960> = 36226849 * [2733053073...<12953>] (0.06%) Phi_32117(10) = 1111111111...<32117> = 2964591803<10> * 26280448118933<14> * 13960947927987631<17> * [1021515388...<32078>] (0.12%) Phi_32118(10) = 9100000000...<10400> = 209248771 * 4279113259<10> * 638501054419<12> * [1591706816...<10371>] (0.29%) Phi_32119(10) = 1111111111...<32119> = 931515239 * 91229844031<11> * [1307466572...<32099>] (0.06%) Phi_32120(10) = 9999000099...<11520> = [9999000099...<11520>] (0.00%) Phi_32121(10) = 1001000999...<20665> = 74977673347<11> * 200649831580354448917<21> * [6653708220...<20633>] (0.15%) Phi_32122(10) = 9090909090...<16060> = 289099 * [3144566079...<16055>] (0.03%) Phi_32123(10) = 1111110999...<25345> = 8094997 * 496364597 * 2438906653<10> * 6206549077<10> * [1826815066...<25310>] (0.14%) Phi_32124(10) = 1009998990...<10705> = 160621 * 4336741 * 1002814909<10> * [1445886977...<10684>] (0.19%) Phi_32125(10) = 9999999999...<25600> = 72217001 * 2153332689940001<16> * 52856871779259001<17> * [1216600415...<25561>] (0.16%) Phi_32126(10) = 9090909090...<16062> = 12630208397<11> * 2608826433913934326091<22> * 79284354849984720934613<23> * [3479878777...<16008>] (0.34%) Phi_32127(10) = 9009009009...<21416> = 63440191862557<14> * 179334395568733<15> * 410376279057910729<18> * [1929597335...<21371>] (0.21%) Phi_32128(10) = 9999999999...<16000> = 1451436313547009<16> * [6889727028...<15985>] (0.09%) Phi_32129(10) = 9999999999...<30096> = [9999999999...<30096>] (0.00%) Phi_32130(10) = 1000000000...<6913> = 1264518079651<13> * 1101128720508897764041<22> * [7181858875...<6879>] (0.48%) Phi_32131(10) = 1111111111...<27721> = 3134893147<10> * 1297470761864311<16> * [2731726201...<27696>] (0.09%) Phi_32132(10) = 1009999999...<15457> = [1009999999...<15457>] (0.00%) Phi_32133(10) = 9009009009...<21420> = 192799 * 2956237 * [1580640101...<21409>] (0.05%) Phi_32134(10) = 9090909090...<16066> = [9090909090...<16066>] (0.00%) Phi_32135(10) = 9000090000...<25704> = 1135527565871<13> * [7925910626...<25692>] (0.05%) Phi_32136(10) = 9999000100...<9792> = [9999000100...<9792>] (0.00%) Phi_32137(10) = 9000000900...<27540> = 6929637037<10> * 218450068201863191<18> * [5945383597...<27513>] (0.10%) Phi_32138(10) = 9090909090...<16068> = [9090909090...<16068>] (0.00%) Phi_32139(10) = 9990000009...<21420> = 2506843 * [3985092010...<21414>] (0.03%) Phi_32140L(10) = 3576409999...<6424> = 242410896607451458921<21> * [1475350345...<6404>] (0.32%) Phi_32140M(10) = 2824060999...<6425> = 1136604318770511866581<22> * [2484647430...<6404>] (0.33%) Phi_32141(10) = 1111111111...<32141> = 64283 * [1728468041...<32136>] (0.01%) Phi_32142(10) = 9100000000...<9720> = 32143 * 9835453 * [2878462769...<9709>] (0.12%) Phi_32143(10) = 1111111111...<32143> = 514289 * 55660731951361<14> * 644123217652947157<18> * 6885920356311969209<19> * [8751256093...<32086>] (0.17%) Phi_32144(10) = 1000000000...<13441> = 14561233 * 5596881137<10> * 6225071329<10> * 22226708113<11> * [8868216492...<13403>] (0.28%) Phi_32145(10) = 1109988900...<17137> = 257161 * [4316318959...<17131>] (0.03%) Phi_32146(10) = 9090909090...<16072> = 1446184249<10> * [6286134769...<16063>] (0.06%) Phi_32147(10) = 1111111111...<28801> = [1111111111...<28801>] (0.00%) Phi_32148(10) = 9999990000...<9936> = 353629 * 3703327116121<13> * [7635889194...<9918>] (0.18%) Phi_32149(10) = 9000000000...<29664> = 1042318051341997<16> * 1945219622487934196431<22> * [4438882083...<29628>] (0.12%) Phi_32150(10) = 1000009999...<12841> = 79185451 * [1262870877...<12833>] (0.06%) Phi_32151(10) = 1109999889...<18361> = 1087323542677<13> * 12879892379677<14> * [7925960610...<18335>] (0.14%) Phi_32152(10) = 9999000099...<16072> = 2025577 * 25078561 * [1968363043...<16059>] (0.09%) Phi_32153(10) = 1111111111...<28081> = 54469386473987<14> * 203395630608943207271<21> * 1225051215798348725117<22> * [8186705018...<28025>] (0.20%) Phi_32154(10) = 9100000000...<10208> = 83560666085878489<17> * [1089029136...<10192>] (0.17%) Phi_32155(10) = 1111099999...<25057> = 2057921 * 617183071 * 277863509591<12> * 13695517086751<14> * 100480436462671<15> * [2287804868...<25003>] (0.21%) Phi_32156(10) = 9900990099...<16076> = [9900990099...<16076>] (0.00%) Phi_32157(10) = 9999999999...<21384> = 3022759 * 14149081 * 65150083 * [3588833175...<21363>] (0.10%) Phi_32158(10) = 1099999890...<13777> = 482371 * 39799181009957098866767<23> * 742648927850040192357041<24> * [7715316700...<13724>] (0.38%) Phi_32159(10) = 1111111111...<32159> = 64319 * 8849899529<10> * 708990545434643<15> * [2753210536...<32129>] (0.09%) Phi_32160(10) = 9999999999...<8448> = 345496765090417974947223710401<30> * [2894383105...<8419>] (0.35%) Phi_32161(10) = 9000000000...<31024> = 283498492612353757<18> * [3174620054...<31007>] (0.06%) Phi_32162(10) = 1099999999...<14833> = 96487 * [1140049954...<14828>] (0.03%) Phi_32163(10) = 1109999999...<21001> = 28656262963921<14> * 1853442182963548357<19> * [2089894591...<20969>] (0.15%) Phi_32164(10) = 9900990099...<13440> = 6295942181<10> * 10979566789049<14> * 312682138065749<15> * [4580676453...<13403>] (0.28%) Phi_32165(10) = 1111099888...<22033> = 167773604951<12> * 15149309399351<14> * [4371561901...<22008>] (0.11%) Phi_32166(10) = 1000999998...<10717> = 1667696092022564871373<22> * [6002292646...<10695>] (0.20%) Phi_32167(10) = 9000000000...<30456> = 50502191 * 111748159 * [1594747435...<30441>] (0.05%) Phi_32168(10) = 9999000099...<16080> = 4825201 * 28550367111218710633<20> * [7258208951...<16054>] (0.16%) Phi_32169(10) = 9009009009...<21444> = 1029409 * 367882110481<12> * [2378923031...<21427>] (0.08%) Phi_32170(10) = 1099989000...<12865> = 248223721 * 55516739408051<14> * [7982172505...<12842>] (0.17%) Phi_32171(10) = 9000000000...<31512> = [9000000000...<31512>] (0.00%) Phi_32172(10) = 9901000000...<9168> = 12005772097337238529<20> * [8246866523...<9149>] (0.21%) Phi_32173(10) = 1111111111...<32173> = 1351267 * 9926260276489<13> * 45602226917329<14> * [1816538512...<32140>] (0.10%) Phi_32174(10) = 9090909090...<16086> = 3056531 * 37889771940887066135927<23> * 10631695671986198145932641<26> * [7383358941...<16032>] (0.34%) Phi_32175(10) = 9999999999...<14400> = [9999999999...<14400>] (0.00%) Phi_32176(10) = 9999999900...<16080> = 559476289 * [1787385827...<16072>] (0.05%) Phi_32177(10) = 9000000000...<30756> = 3877548590681<13> * [2321054085...<30744>] (0.04%) Phi_32178(10) = 9100000000...<10320> = 3921918997<10> * 10311006147493<14> * 70785566496289<14> * [3179047484...<10284>] (0.35%) Phi_32179(10) = 9000000900...<27576> = 128717 * [6992084106...<27571>] (0.02%) Phi_32180L(10) = 2824060999...<6433> = 11545812847712682541<20> * [2445961178...<6414>] (0.30%) Phi_32180M(10) = 3576409999...<6432> = 4440841 * 7337041 * [1097643046...<6419>] (0.21%) Phi_32181(10) = 1109999999...<20161> = [1109999999...<20161>] (0.00%) Phi_32182(10) = 9090909090...<16090> = 32183 * 20366155196011<14> * [1386984924...<16073>] (0.11%) Phi_32183(10) = 1111111111...<32183> = [1111111111...<32183>] (0.00%) Phi_32184(10) = 1000000000...<10657> = 1673569 * 45025417 * 592153417 * 39813154441201<14> * 84380889754390609<17> * 6671042459...<10603> (100.00%) Phi_32185(10) = 1111099999...<24961> = 32499844015899855671<20> * [3418785639...<24941>] (0.08%) Phi_32186(10) = 9999999999...<11880> = 64373 * 15741016671997<14> * [9868780098...<11862>] (0.15%) Phi_32187(10) = 9009009009...<21456> = 19778589631<11> * [4554929940...<21446>] (0.05%) Phi_32188(10) = 1009999999...<14833> = 32189 * 2414101 * 214693961 * [6053947136...<14813>] (0.13%) Phi_32189(10) = 1111111111...<32189> = 877407763 * [1266356599...<32180>] (0.03%) Phi_32190(10) = 1098890109...<8065> = 63832771 * 5534075161864672587211<22> * [3110752893...<8035>] (0.37%) Phi_32191(10) = 1111111111...<32191> = 321911 * 1139771478467<13> * [3028334807...<32173>] (0.05%) Phi_32192(10) = 9999999999...<16064> = 6148673 * [1626367185...<16058>] (0.04%) Phi_32193(10) = 1000000000...<18145> = 278211907 * 2225668592197<13> * 17958957289061671<17> * [8992546082...<18107>] (0.20%) Phi_32194(10) = 9090909090...<16096> = 26399081 * 6369471057206156462011<22> * [5406486685...<16067>] (0.18%) Phi_32195(10) = 1111099999...<25025> = [1111099999...<25025>] (0.00%) Phi_32196(10) = 1009998990...<10729> = [1009998990...<10729>] (0.00%) Phi_32197(10) = 9000000000...<29260> = 30633191711<11> * 309891939391<12> * [9480690751...<29238>] (0.08%) Phi_32198(10) = 1099999999...<15137> = 2855866007<10> * 223964683687<12> * 38038218581773<14> * [4521214868...<15102>] (0.23%) Phi_32199(10) = 9009009009...<21464> = 8758129 * [1028645388...<21458>] (0.03%) Phi_32200(10) = 9999999999...<10560> = 8809147201<10> * 96743169056801<14> * 651512753497201<15> * 842543372456801<15> * 3599656465267035601<19> * [5938401801...<10488>] (0.68%)