Phi_173001(10) = 9009009009...<115332> = 4498027 * 25258147 * 18246415471<11> * [4345861857...<115308>] (0.02%)
Phi_173002(10) = 9090909090...<86500> = 366892261481<12> * [2477814346...<86489>] (0.01%)
Phi_173003(10) = 9000000000...<171360> = [9000000000...<171360>] (0.00%)
Phi_173004(10) = 9901000000...<53184> = [9901000000...<53184>] (0.00%)
Phi_173005(10) = 1111099888...<118609> = 633317327441<12> * [1754412583...<118597>] (0.01%)
Phi_173006(10) = 1099999999...<82721> = 35639237 * [3086485830...<82713>] (0.01%)
Phi_173007(10) = 1001000999...<112609> = 1038043 * 2018645677<10> * [4777042126...<112593>] (0.01%)
Phi_173008(10) = 1000000009...<78561> = 53459473 * 84600913 * [2211058744...<78545>] (0.02%)
Phi_173009(10) = 9000000000...<162816> = [9000000000...<162816>] (0.00%)
Phi_173010(10) = 1098890109...<44929> = [1098890109...<44929>] (0.00%)
Phi_173011(10) = 9000000000...<167400> = [9000000000...<167400>] (0.00%)
Phi_173012(10) = 9900990099...<71712> = 317545822547101<15> * [3117972083...<71698>] (0.02%)
Phi_173013(10) = 1109999999...<114001> = 2768209 * [4009812842...<113994>] (0.01%)
Phi_173014(10) = 9090909090...<78624> = [9090909090...<78624>] (0.00%)
Phi_173015(10) = 9000090000...<138408> = 14796645578921<14> * [6082520496...<138395>] (0.01%)
Phi_173016(10) = 1000000000...<57025> = [1000000000...<57025>] (0.00%)
Phi_173017(10) = 9000000000...<159696> = 6920681 * 4609952494603<13> * [2820961947...<159677>] (0.01%)
Phi_173018(10) = 9090909090...<86508> = 865091 * [1050861596...<86503>] (0.01%)
Phi_173019(10) = 9999999000...<89040> = 346039 * 413861449 * [6982644539...<89026>] (0.02%)
Phi_173020L(10) = 2796099999...<33601> = 173021 * 188072741 * 114541143221<12> * [7501817837...<33576>] (0.07%)
Phi_173020M(10) = 3541000000...<33600> = 5363621 * 6747781 * 460215378941<12> * [2125914224...<33575>] (0.08%)
Phi_173021(10) = 1111111111...<173021> = 346043 * 8305009 * [3866226690...<173008>] (0.01%)
Phi_173022(10) = 1098901098...<57673> = 173023 * 58827481 * [1079628940...<57660>] (0.02%)
Phi_173023(10) = 1111111111...<173023> = 3772651627729<13> * [2945172840...<173010>] (0.01%)
Phi_173024(10) = 9999999999...<86496> = [9999999999...<86496>] (0.00%)
Phi_173025(10) = 1000000000...<92161> = 6798951971551<13> * [1470814919...<92148>] (0.01%)
Phi_173026(10) = 9090910000...<69696> = [9090910000...<69696>] (0.00%)
Phi_173027(10) = 9000000000...<170520> = 81171909081391<14> * [1108757956...<170507>] (0.01%)
Phi_173028(10) = 1009998990...<57673> = [1009998990...<57673>] (0.00%)
Phi_173029(10) = 9000000000...<165484> = 3806639 * 12112031 * 1764895801<10> * [1106024565...<165462>] (0.01%)
Phi_173030(10) = 9999999999...<58080> = 2595451 * 457803985211<12> * [8416036240...<58062>] (0.03%)
Phi_173031(10) = 1109999999...<114241> = 1038187 * 33914077 * [3152589251...<114227>] (0.01%)
Phi_173032(10) = 1000099999...<84337> = 17799801841<11> * 6444125918609<13> * 11127785337017<14> * [7835297710...<84300>] (0.04%)
Phi_173033(10) = 1111110999...<140401> = 1038199 * [1070229310...<140395>] (0.00%)
Phi_173034(10) = 1000999998...<57673> = 37894447 * [2641547979...<57665>] (0.01%)
Phi_173035(10) = 9000090000...<138424> = [9000090000...<138424>] (0.00%)
Phi_173036(10) = 1009999999...<85681> = 997552541 * [1012477998...<85672>] (0.01%)
Phi_173037(10) = 9009009009...<115356> = [9009009009...<115356>] (0.00%)
Phi_173038(10) = 1099999999...<85921> = 6229369 * [1765828930...<85914>] (0.01%)
Phi_173039(10) = 1111111111...<173039> = 346079 * [3210570739...<173033>] (0.00%)
Phi_173040(10) = 1000000009...<39169> = 73368961 * [1362974201...<39161>] (0.02%)
Phi_173041(10) = 9000000000...<157300> = [9000000000...<157300>] (0.00%)
Phi_173042(10) = 1099999999...<83701> = 19207663 * [5726880984...<83693>] (0.01%)
Phi_173043(10) = 9999999990...<96768> = [9999999990...<96768>] (0.00%)
Phi_173044(10) = 9900990099...<86520> = 1730441 * 286032263550932869<18> * [2000353759...<86497>] (0.03%)
Phi_173045(10) = 1111099999...<135617> = [1111099999...<135617>] (0.00%)
Phi_173046(10) = 9100000000...<57000> = 1144834265881<13> * [7948748802...<56988>] (0.02%)
Phi_173047(10) = 1111110999...<145465> = 2429579881<10> * 72640387035637<14> * [6295759290...<145441>] (0.02%)
Phi_173048(10) = 1000099999...<85249> = 15055177 * 255937993 * 115934718937<12> * [2238769017...<85222>] (0.03%)
Phi_173049(10) = 1109999999...<112177> = 33571507 * [3306375254...<112169>] (0.01%)
Phi_173050(10) = 1000009999...<69201> = [1000009999...<69201>] (0.00%)
Phi_173051(10) = 9000000000...<171600> = 1038307 * 107965134493<12> * [8028477552...<171583>] (0.01%)
Phi_173052(10) = 1000000999...<47521> = [1000000999...<47521>] (0.00%)
Phi_173053(10) = 1111111111...<173053> = 1038319 * [1070105729...<173047>] (0.00%)
Phi_173054(10) = 9090910000...<72312> = 2076649 * 650336933 * [6731406882...<72297>] (0.02%)
Phi_173055(10) = 9009099100...<90528> = 346111 * 5535337231<10> * [4702424997...<90513>] (0.02%)
Phi_173056(10) = 9999999999...<79872> = [9999999999...<79872>] (0.00%)
Phi_173057(10) = 9000000000...<170160> = 5501135917<10> * [1636025747...<170151>] (0.01%)
Phi_173058(10) = 1098901098...<57685> = 173059 * 228436561 * 9985792717<10> * [2783660440...<57661>] (0.04%)
Phi_173059(10) = 1111111111...<173059> = 34957919 * 62993477 * 800154207929<12> * 34852409147505559<17> * [1809296908...<173015>] (0.03%)
Phi_173060L(10) = 3540999964...<32512> = 252867484301<12> * [1400338194...<32501>] (0.04%)
Phi_173060M(10) = 2796100027...<32513> = 4032585257102201<16> * [6933765437...<32497>] (0.05%)
Phi_173061(10) = 9990000009...<95040> = 5350699999<10> * [1867045435...<95031>] (0.01%)
Phi_173062(10) = 9090909090...<86530> = 23957837971<11> * [3794544859...<86520>] (0.01%)
Phi_173063(10) = 9000000000...<157320> = 560567671049<12> * [1605515348...<157309>] (0.01%)
Phi_173064(10) = 1000099999...<57681> = 519193 * [1926258635...<57675>] (0.01%)
Phi_173065(10) = 9000090000...<138448> = 1038391 * [8667342071...<138442>] (0.00%)
Phi_173066(10) = 9090909090...<86532> = 346133 * 617153357 * [4255702031...<86518>] (0.02%)
Phi_173067(10) = 9009009009...<115376> = 1146587566237<13> * [7857235918...<115364>] (0.01%)
Phi_173068(10) = 1000000000...<74089> = [1000000000...<74089>] (0.00%)
Phi_173069(10) = 9000000000...<159744> = 400135529 * [2249237907...<159736>] (0.01%)
Phi_173070(10) = 9999999990...<46080> = [9999999990...<46080>] (0.00%)
Phi_173071(10) = 9000000000...<163944> = [9000000000...<163944>] (0.00%)
Phi_173072(10) = 1000000009...<83329> = 3705030705617<13> * 29016905376001<14> * [9301588002...<83302>] (0.03%)
Phi_173073(10) = 1109999999...<111601> = 526141921 * [2109696938...<111592>] (0.01%)
Phi_173074(10) = 1099999999...<78661> = [1099999999...<78661>] (0.00%)
Phi_173075(10) = 9999900000...<110880> = [9999900000...<110880>] (0.00%)
Phi_173076(10) = 1009998990...<57689> = [1009998990...<57689>] (0.00%)
Phi_173077(10) = 9000000000...<162880> = [9000000000...<162880>] (0.00%)
Phi_173078(10) = 9090909090...<86538> = 304617281 * [2984370768...<86530>] (0.01%)
Phi_173079(10) = 9990000009...<115380> = 32538853 * [3070175832...<115373>] (0.01%)
Phi_173080(10) = 1000099999...<69217> = [1000099999...<69217>] (0.00%)
Phi_173081(10) = 1111111111...<173081> = [1111111111...<173081>] (0.00%)
Phi_173082(10) = 1098900989...<45505> = 519247 * [2116335749...<45499>] (0.01%)
Phi_173083(10) = 9000000000...<170640> = 692333 * 265509323 * [4896070935...<170626>] (0.01%)
Phi_173084(10) = 9900990099...<86540> = 220986208589<12> * [4480365612...<86529>] (0.01%)
Phi_173085(10) = 9009099100...<83840> = 20937926288401<14> * [4302765697...<83827>] (0.02%)
Phi_173086(10) = 1099999999...<84169> = 173087 * 7961957 * [7981939041...<84156>] (0.01%)
Phi_173087(10) = 1111111111...<173087> = 270202320957680109071<21> * [4112144955...<173066>] (0.01%)
Phi_173088(10) = 1000000000...<57601> = [1000000000...<57601>] (0.00%)
Phi_173089(10) = 1111110999...<146017> = 21048430725631<14> * [5278830590...<146003>] (0.01%)
Phi_173090(10) = 9091000000...<65520> = 2077081 * [4376815348...<65514>] (0.01%)
Phi_173091(10) = 9009009009...<115392> = [9009009009...<115392>] (0.00%)
Phi_173092(10) = 1009999999...<85537> = 7789141 * 110843616409<12> * [1169825601...<85519>] (0.02%)
Phi_173093(10) = 9000000000...<171948> = 346187 * 914277227 * [2843504054...<171934>] (0.01%)
Phi_173094(10) = 9100000000...<54272> = [9100000000...<54272>] (0.00%)
Phi_173095(10) = 1111099999...<127777> = [1111099999...<127777>] (0.00%)
Phi_173096(10) = 9999000099...<67200> = [9999000099...<67200>] (0.00%)
Phi_173097(10) = 9999999999...<115344> = [9999999999...<115344>] (0.00%)
Phi_173098(10) = 9090909090...<80080> = 173099 * 242510299 * 2910815969<10> * [7439912364...<80057>] (0.03%)
Phi_173099(10) = 1111111111...<173099> = 7595440567268311<16> * [1462865914...<173083>] (0.01%)
Phi_173100L(10) = 1010050099...<23041> = [1010050099...<23041>] (0.00%)
Phi_173100M(10) = 9900498997...<23040> = [9900498997...<23040>] (0.00%)