Phi_220101(10) = 9009009909...<122544> = [9009009909...<122544>] (0.00%)
Phi_220102(10) = 9090909090...<110050> = 880409 * 13426223 * 40938973 * 241011691 * 286132601 * [2724122221...<110013>] (0.03%)
Phi_220103(10) = 9000000000...<203160> = [9000000000...<203160>] (0.00%)
Phi_220104(10) = 1000000000...<73297> = 301982689 * [3311448094...<73288>] (0.01%)
Phi_220105(10) = 9000090000...<176080> = [9000090000...<176080>] (0.00%)
Phi_220106(10) = 1099999999...<109229> = 106857060881<12> * 592437309601<12> * [1737589003...<109206>] (0.02%)
Phi_220107(10) = 9009009009...<146736> = 34273741399<11> * [2628545539...<146726>] (0.01%)
Phi_220108(10) = 1000000000...<94249> = [1000000000...<94249>] (0.00%)
Phi_220109(10) = 9000000000...<215904> = 3508977679<10> * 541460229722759<15> * [4736912261...<215880>] (0.01%)
Phi_220110(10) = 9100091000...<49280> = 141546357811<12> * [6429053449...<49269>] (0.02%)
Phi_220111(10) = 9000000000...<217872> = 3676293923<10> * 20630245724054443667<20> * [1186664314...<217844>] (0.01%)
Phi_220112(10) = 9999999900...<110048> = 660337 * [1514378249...<110043>] (0.01%)
Phi_220113(10) = 1001000999...<142561> = 440227 * 7766907319<10> * [2927586348...<142545>] (0.01%)
Phi_220114(10) = 1099999999...<109201> = 2793150910411<13> * [3938204684...<109188>] (0.01%)
Phi_220115(10) = 9000090900...<142560> = 348662161 * [2581321378...<142552>] (0.01%)
Phi_220116(10) = 1009998990...<62977> = 660349 * 9905221 * [1544127811...<62964>] (0.02%)
Phi_220117(10) = 9000000000...<214956> = 12120732919853<14> * [7425293552...<214943>] (0.01%)
Phi_220118(10) = 9090909090...<110058> = 48541705342632409<17> * [1872803814...<110042>] (0.02%)
Phi_220119(10) = 1109999999...<145657> = 440239 * 2283514507<10> * 9517505323<10> * [1160132416...<145632>] (0.02%)
Phi_220120(10) = 1000099999...<88033> = 48543618302401<14> * [2060209014...<88019>] (0.02%)
Phi_220121(10) = 9000000000...<200100> = 5346298849<10> * [1683407578...<200091>] (0.00%)
Phi_220122(10) = 9990010000...<62856> = 5723173 * 4671869329<10> * 101305647451<12> * 421018104277<12> * [8759996525...<62817>] (0.06%)
Phi_220123(10) = 1111111111...<220123> = [1111111111...<220123>] (0.00%)
Phi_220124(10) = 1009999999...<108865> = [1009999999...<108865>] (0.00%)
Phi_220125(10) = 1000000000...<117201> = [1000000000...<117201>] (0.00%)
Phi_220126(10) = 9090909090...<110062> = [9090909090...<110062>] (0.00%)
Phi_220127(10) = 9000000000...<219000> = [9000000000...<219000>] (0.00%)
Phi_220128(10) = 1000000000...<73345> = 157831777 * [6335859729...<73336>] (0.01%)
Phi_220129(10) = 9000000900...<167040> = [9000000900...<167040>] (0.00%)
Phi_220130(10) = 1099989000...<88049> = [1099989000...<88049>] (0.00%)
Phi_220131(10) = 1000000001...<141481> = 557371693 * [1794134889...<141472>] (0.01%)
Phi_220132(10) = 1009999999...<100041> = 3301981 * [3058769871...<100034>] (0.01%)
Phi_220133(10) = 1111111111...<197825> = 151011239 * [7357804084...<197816>] (0.00%)
Phi_220134(10) = 9100000000...<69480> = 189315241 * [4806797356...<69472>] (0.01%)
Phi_220135(10) = 9000090000...<176104> = [9000090000...<176104>] (0.00%)
Phi_220136(10) = 1000099999...<94321> = 154638194281817<15> * [6467354359...<94306>] (0.02%)
Phi_220137(10) = 9009009009...<146756> = 3962467 * [2273585876...<146750>] (0.00%)
Phi_220138(10) = 9090909090...<110068> = 21721897013<11> * [4185135895...<110058>] (0.01%)
Phi_220139(10) = 9000000000...<212520> = 8365283 * 11887507 * [9050469015...<212506>] (0.01%)
Phi_220140L(10) = 1105096689...<29329> = 220141 * 500158081 * [1003672565...<29315>] (0.05%)
Phi_220140M(10) = 9048972901...<29328> = 440281 * [2055272178...<29323>] (0.02%)
Phi_220141(10) = 1111111111...<220141> = 20938931357<11> * 465305480620402759<18> * [1140419958...<220113>] (0.01%)
Phi_220142(10) = 1099999999...<101593> = [1099999999...<101593>] (0.00%)
Phi_220143(10) = 9009009910...<114240> = 7558830049<10> * 208972882539961<15> * [5703383178...<114216>] (0.02%)
Phi_220144(10) = 9999999900...<110064> = [9999999900...<110064>] (0.00%)
Phi_220145(10) = 9000090000...<176112> = 49312481 * 345187361 * 684650951 * 419140229561<12> * [1842495987...<176076>] (0.02%)
Phi_220146(10) = 1098901098...<73381> = 108173360167<12> * [1015870355...<73370>] (0.02%)
Phi_220147(10) = 1111111111...<220147> = 57636944011836961<17> * [1927775891...<220130>] (0.01%)
Phi_220148(10) = 1009999999...<107641> = 1320889 * 27738649 * 7903227342281<13> * [3487910000...<107614>] (0.02%)
Phi_220149(10) = 1001000999...<144001> = [1001000999...<144001>] (0.00%)
Phi_220150(10) = 1000009999...<69121> = 56162026201<11> * [1780580345...<69110>] (0.02%)
Phi_220151(10) = 1111111111...<220151> = 34343557 * 54597449 * [5925702797...<220135>] (0.01%)
Phi_220152(10) = 1000099999...<73377> = [1000099999...<73377>] (0.00%)
Phi_220153(10) = 9000000000...<208548> = [9000000000...<208548>] (0.00%)
Phi_220154(10) = 1099999999...<100061> = [1099999999...<100061>] (0.00%)
Phi_220155(10) = 9009099100...<108288> = 440311 * 18491699071<11> * 44133151921<11> * 52823550391<11> * [4746270420...<108251>] (0.03%)
Phi_220156(10) = 1009999999...<105249> = 27338467482449<14> * [3694428009...<105235>] (0.01%)
Phi_220157(10) = 9999999000...<188664> = [9999999000...<188664>] (0.00%)
Phi_220158(10) = 1000000000...<72901> = 124245947143<12> * [8048552270...<72889>] (0.02%)
Phi_220159(10) = 9000000000...<218416> = [9000000000...<218416>] (0.00%)
Phi_220160(10) = 1000000000...<86017> = 1320961 * [7570246207...<86010>] (0.01%)
Phi_220161(10) = 9009009009...<146772> = 679170265681<12> * [1326472824...<146761>] (0.01%)
Phi_220162(10) = 9090909090...<102960> = [9090909090...<102960>] (0.00%)
Phi_220163(10) = 1111111111...<220163> = [1111111111...<220163>] (0.00%)
Phi_220164(10) = 9901000000...<62880> = [9901000000...<62880>] (0.00%)
Phi_220165(10) = 1111099999...<160081> = 55983556201<11> * [1984689925...<160070>] (0.01%)
Phi_220166(10) = 9090909090...<110082> = 5724317 * [1588121183...<110076>] (0.01%)
Phi_220167(10) = 1001000999...<138049> = [1001000999...<138049>] (0.00%)
Phi_220168(10) = 9999000099...<96768> = 2201681 * [4541529903...<96762>] (0.01%)
Phi_220169(10) = 1111111111...<220169> = 2284214251409039<16> * 925561132383830053<18> * [5255518207...<220135>] (0.02%)
Phi_220170(10) = 1098890109...<56961> = 880681 * [1247773155...<56955>] (0.01%)
Phi_220171(10) = 1111110999...<185641> = [1111110999...<185641>] (0.00%)
Phi_220172(10) = 1009999999...<104257> = 5284129 * [1911384071...<104250>] (0.01%)
Phi_220173(10) = 1109999999...<144769> = 440347 * 2642077 * [9540748910...<144756>] (0.01%)
Phi_220174(10) = 1099999999...<109417> = [1099999999...<109417>] (0.00%)
Phi_220175(10) = 9999900000...<176120> = 8523854951<10> * [1173166373...<176111>] (0.01%)
Phi_220176(10) = 9999999999...<66240> = 220177 * 24555568753<11> * [1849601003...<66225>] (0.02%)
Phi_220177(10) = 1111111111...<220177> = 1908678885239281<16> * 1902193122450285307<19> * [3060342364...<220143>] (0.02%)
Phi_220178(10) = 1099999890...<94357> = [1099999890...<94357>] (0.00%)
Phi_220179(10) = 1109999999...<140361> = 12518928774841<14> * [8866573330...<140347>] (0.01%)
Phi_220180L(10) = 3540999999...<43200> = 77943721 * [4543021496...<43192>] (0.02%)
Phi_220180M(10) = 2796100000...<43201> = 17174041 * 23999621 * 10515070206001<14> * [6451543710...<43173>] (0.06%)
Phi_220181(10) = 9000000000...<203232> = 1761449 * [5109429793...<203226>] (0.00%)
Phi_220182(10) = 1098901098...<73393> = 2862367 * [3839134181...<73386>] (0.01%)
Phi_220183(10) = 9000000000...<219240> = 6915704947969<13> * [1301385768...<219228>] (0.01%)
Phi_220184(10) = 1000099999...<103553> = [1000099999...<103553>] (0.00%)
Phi_220185(10) = 9999999990...<100224> = 14091841 * [7096304868...<100217>] (0.01%)
Phi_220186(10) = 1099999999...<108769> = [1099999999...<108769>] (0.00%)
Phi_220187(10) = 1111111111...<194401> = 1680907559<10> * 62729628860867<14> * [1053758139...<194378>] (0.01%)
Phi_220188(10) = 9901000000...<71920> = 220189 * [4496591564...<71915>] (0.01%)
Phi_220189(10) = 1111111111...<220189> = 175400355511<12> * 1998193596479<13> * 4883025762281<13> * [6492327851...<220152>] (0.02%)
Phi_220190(10) = 9091000000...<86784> = [9091000000...<86784>] (0.00%)
Phi_220191(10) = 1109999999...<139033> = [1109999999...<139033>] (0.00%)
Phi_220192(10) = 1000000000...<94273> = 6825953 * 8807681 * 975670753 * [1704793743...<94250>] (0.02%)
Phi_220193(10) = 9000000000...<213060> = [9000000000...<213060>] (0.00%)
Phi_220194(10) = 9990010000...<67680> = [9990010000...<67680>] (0.00%)
Phi_220195(10) = 1111099999...<172225> = 2309783895401<13> * 22944784051841<14> * [2096514275...<172199>] (0.01%)
Phi_220196(10) = 9900990099...<110096> = 503808449 * [1965229070...<110088>] (0.01%)
Phi_220197(10) = 1109999999...<141681> = [1109999999...<141681>] (0.00%)
Phi_220198(10) = 1099999999...<100081> = [1099999999...<100081>] (0.00%)
Phi_220199(10) = 1111110999...<185977> = [1111110999...<185977>] (0.00%)
Phi_220200(10) = 9999999999...<58560> = 880801 * [1135330227...<58555>] (0.01%)