Phi_180101(10) = 9000000000...<170604> = 23052929 * 27015151 * 5680969427443<13> * [2543820982...<170577>] (0.02%) Phi_180102(10) = 9100000000...<55392> = 10626019 * [8563884555...<55385>] (0.01%) Phi_180103(10) = 1111110999...<140281> = 720413 * 2881649 * [5352230710...<140268>] (0.01%) Phi_180104(10) = 1000099999...<87953> = 4142393 * 1503688297<10> * 34611125993<11> * [4638938127...<87926>] (0.03%) Phi_180105(10) = 1109988900...<96049> = [1109988900...<96049>] (0.00%) Phi_180106(10) = 9090909090...<90052> = 2341379 * 5042969 * 20511732023<11> * [3753591124...<90029>] (0.03%) Phi_180107(10) = 9000000000...<179256> = 19451557 * 6584711921<10> * [7026699155...<179239>] (0.01%) Phi_180108(10) = 1000000999...<60025> = 1080649 * [9253707725...<60018>] (0.01%) Phi_180109(10) = 9000000000...<179104> = 419333907661769<15> * [2146260971...<179090>] (0.01%) Phi_180110(10) = 1099988890...<59041> = 4259781611<10> * [2582265924...<59031>] (0.02%) Phi_180111(10) = 9009009009...<120072> = 86453281 * [1042066756...<120065>] (0.01%) Phi_180112(10) = 9999999900...<90048> = 283316177 * [3529625454...<90040>] (0.01%) Phi_180113(10) = 1111111111...<167201> = 1080679 * 1035649751<10> * [9927682358...<167185>] (0.01%) Phi_180114(10) = 9100000000...<54560> = [9100000000...<54560>] (0.00%) Phi_180115(10) = 9000090000...<124416> = 538904081 * [1670072712...<124408>] (0.01%) Phi_180116(10) = 1009999999...<87553> = [1009999999...<87553>] (0.00%) Phi_180117(10) = 1000000001...<102817> = [1000000001...<102817>] (0.00%) Phi_180118(10) = 9090909090...<90058> = 98235290180969<14> * 218433662854061891<18> * [4236626848...<90027>] (0.03%) Phi_180119(10) = 9000000000...<173880> = [9000000000...<173880>] (0.00%) Phi_180120(10) = 1000099999...<44929> = 47551681 * 137611681 * 4740398161<10> * 2345595775204321<16> * [1374530120...<44888>] (0.09%) Phi_180121(10) = 9000000000...<179200> = [9000000000...<179200>] (0.00%) Phi_180122(10) = 1099999999...<89153> = [1099999999...<89153>] (0.00%) Phi_180123(10) = 9009009009...<120080> = [9009009009...<120080>] (0.00%) Phi_180124(10) = 1000000000...<77113> = 1291489081<10> * [7743000035...<77103>] (0.01%) Phi_180125(10) = 1000000000...<130001> = 8599888001<10> * [1162805841...<129991>] (0.01%) Phi_180126(10) = 1000999998...<60037> = [1000999998...<60037>] (0.00%) Phi_180127(10) = 1111111111...<170521> = 1080763 * 86460961 * 1887730961<10> * 3388035401797<13> * 9484032393841<13> * [1960315152...<170472>] (0.03%) Phi_180128(10) = 1000000000...<82945> = [1000000000...<82945>] (0.00%) Phi_180129(10) = 1109999999...<118657> = [1109999999...<118657>] (0.00%) Phi_180130(10) = 1099989000...<72049> = 74213561 * [1482194069...<72041>] (0.01%) Phi_180131(10) = 9000000900...<154392> = 1080787 * 600091960539653<15> * [1387664992...<154372>] (0.01%) Phi_180132(10) = 9901000000...<56448> = [9901000000...<56448>] (0.00%) Phi_180133(10) = 9000000000...<177120> = [9000000000...<177120>] (0.00%) Phi_180134(10) = 9090909090...<90066> = 1190631867957610877<19> * [7635365166...<90048>] (0.02%) Phi_180135(10) = 1001000999...<96049> = [1001000999...<96049>] (0.00%) Phi_180136(10) = 9999000099...<77440> = 180137 * [5550775298...<77435>] (0.01%) Phi_180137(10) = 1111111111...<180137> = [1111111111...<180137>] (0.00%) Phi_180138(10) = 9100000909...<51456> = [9100000909...<51456>] (0.00%) Phi_180139(10) = 9999999999...<170316> = [9999999999...<170316>] (0.00%) Phi_180140L(10) = 3576409999...<36024> = [3576409999...<36024>] (0.00%) Phi_180140M(10) = 2824060999...<36025> = [2824060999...<36025>] (0.00%) Phi_180141(10) = 9009009009...<106560> = 49802056836013<14> * [1808963239...<106547>] (0.01%) Phi_180142(10) = 9090909090...<90070> = 8102447504330925010183<22> * [1121995432...<90049>] (0.02%) Phi_180143(10) = 9000000000...<178800> = 5471427494671<13> * [1644908939...<178788>] (0.01%) Phi_180144(10) = 1000000000...<59617> = 62432456180113<14> * [1601730992...<59603>] (0.02%) Phi_180145(10) = 1111099888...<123505> = 22377972191<11> * [4965150011...<123494>] (0.01%) Phi_180146(10) = 9090909090...<90072> = 1981607 * [4587644821...<90066>] (0.01%) Phi_180147(10) = 9009009009...<106080> = [9009009009...<106080>] (0.00%) Phi_180148(10) = 1009999999...<86913> = 237042521509<12> * [4260838914...<86901>] (0.01%) Phi_180149(10) = 9000000000...<169536> = [9000000000...<169536>] (0.00%) Phi_180150(10) = 9999900001...<48000> = 96021328507801<14> * [1041424874...<47987>] (0.03%) Phi_180151(10) = 9000000000...<176272> = [9000000000...<176272>] (0.00%) Phi_180152(10) = 1000099999...<77185> = [1000099999...<77185>] (0.00%) Phi_180153(10) = 1001000999...<116641> = [1001000999...<116641>] (0.00%) Phi_180154(10) = 1000000000...<81121> = [1000000000...<81121>] (0.00%) Phi_180155(10) = 1111099999...<142529> = 64855801 * 818624321 * 3066958721<10> * [6823571493...<142502>] (0.02%) Phi_180156(10) = 1009998990...<60049> = 2424938133229<13> * [4165050547...<60036>] (0.02%) Phi_180157(10) = 9000000000...<179200> = 11530049 * 7699091186279<13> * [1013845769...<179181>] (0.01%) Phi_180158(10) = 9090909091...<77400> = 360317 * 503541611 * 27530664613<11> * [1819996283...<77376>] (0.03%) Phi_180159(10) = 9009009909...<98208> = 86476321 * [1041789221...<98201>] (0.01%) Phi_180160(10) = 1000000000...<71937> = 900079361 * [1111013143...<71928>] (0.01%) Phi_180161(10) = 1111111111...<180161> = 360323 * 144621634018721<15> * [2132221124...<180141>] (0.01%) Phi_180162(10) = 1000999998...<60049> = [1000999998...<60049>] (0.00%) Phi_180163(10) = 9000000000...<177408> = 86478241 * [1040724221...<177401>] (0.00%) Phi_180164(10) = 1009999999...<88705> = 900821 * [1121199439...<88699>] (0.01%) Phi_180165(10) = 1109988900...<96081> = 4839952561<10> * 50731640093791<14> * [4520626516...<96057>] (0.02%) Phi_180166(10) = 9090910000...<72576> = [9090910000...<72576>] (0.00%) Phi_180167(10) = 9000000000...<166296> = 13290391340357<14> * [6771809625...<166283>] (0.01%) Phi_180168(10) = 1000099999...<60049> = 4498254457<10> * [2223306861...<60039>] (0.02%) Phi_180169(10) = 9999999999...<163680> = 157467707 * 129616821643<12> * 23470955068397<14> * 152437008804763<15> * 275734565284201<15> * [4966320429...<163619>] (0.04%) Phi_180170(10) = 9091000000...<70224> = [9091000000...<70224>] (0.00%) Phi_180171(10) = 9999999990...<120096> = 32070439 * [3118136296...<120089>] (0.01%) Phi_180172(10) = 1009999999...<87121> = 18108006689<11> * [5577643179...<87110>] (0.01%) Phi_180173(10) = 9999999000...<154392> = [9999999000...<154392>] (0.00%) Phi_180174(10) = 1098901098...<60057> = 27386449 * [4012572418...<60049>] (0.01%) Phi_180175(10) = 9999900000...<144120> = 10450151 * 17296801 * 25945201 * [2132309602...<144099>] (0.02%) Phi_180176(10) = 9999999900...<90080> = [9999999900...<90080>] (0.00%) Phi_180177(10) = 9009009009...<108864> = [9009009009...<108864>] (0.00%) Phi_180178(10) = 9090909090...<90088> = 180179 * [5045487593...<90083>] (0.01%) Phi_180179(10) = 1111111111...<180179> = [1111111111...<180179>] (0.00%) Phi_180180L(10) = 9048972900...<17280> = 180181 * 1261261 * [3981853961...<17269>] (0.07%) Phi_180180M(10) = 1105096690...<17281> = 62227685521<11> * 43733274156952381<17> * [4060734892...<17253>] (0.16%) Phi_180181(10) = 1111111111...<180181> = 23409475883<11> * 8085919365900853<16> * [5869976925...<180154>] (0.01%) Phi_180182(10) = 1099999999...<86153> = 35676037 * 741596657618161<15> * [4157653724...<86130>] (0.03%) Phi_180183(10) = 1109999999...<113025> = 2162197 * 6159586846477<13> * [8334434454...<113005>] (0.02%) Phi_180184(10) = 1000099999...<88801> = 1294081489<10> * 21468274757417<14> * [3599852094...<88778>] (0.03%) Phi_180185(10) = 9000090000...<144144> = 9729991 * [9249844116...<144137>] (0.00%) Phi_180186(10) = 9100000000...<58928> = [9100000000...<58928>] (0.00%) Phi_180187(10) = 9000000900...<154440> = 103864016509639<15> * [8665177029...<154426>] (0.01%) Phi_180188(10) = 1009999999...<89041> = [1009999999...<89041>] (0.00%) Phi_180189(10) = 9990000009...<120120> = 7928317 * 724720159 * 45451594117<11> * [3825295773...<120094>] (0.02%) Phi_180190(10) = 9091000000...<69984> = [9091000000...<69984>] (0.00%) Phi_180191(10) = 9000000000...<163800> = [9000000000...<163800>] (0.00%) Phi_180192(10) = 1000000000...<60033> = [1000000000...<60033>] (0.00%) Phi_180193(10) = 1111111111...<163345> = [1111111111...<163345>] (0.00%) Phi_180194(10) = 9090910000...<75600> = [9090910000...<75600>] (0.00%) Phi_180195(10) = 9009099100...<93440> = [9009099100...<93440>] (0.00%) Phi_180196(10) = 1009999999...<85321> = 45049001 * [2242003102...<85313>] (0.01%) Phi_180197(10) = 9000000000...<179340> = [9000000000...<179340>] (0.00%) Phi_180198(10) = 9999999990...<57960> = 3964357 * 83251477 * 187766317 * 45001029440971<14> * [3585875103...<57924>] (0.06%) Phi_180199(10) = 9000000000...<177840> = 12974329 * [6936774919...<177833>] (0.00%) Phi_180200(10) = 9999999999...<66560> = [9999999999...<66560>] (0.00%)