Phi_272101(10) = 9000000000...<269452> = 32107919 * 6720873476123<13> * 34941765019489<14> * (1193602699...<269419>) (0.01%)
Phi_272102(10) = 9090909090...<124800> = [9090909090...<124800>] (0.00%)
Phi_272103(10) = 1109999999...<167425> = [1109999999...<167425>] (0.00%)
Phi_272104(10) = 9999000099...<112896> = 2448937 * 427250732760769<15> * [9556440136...<112875>] (0.02%)
Phi_272105(10) = 9000090000...<217680> = (9000090000...<217680>) (0.00%)
Phi_272106(10) = 1000000000...<90685> = 55157246731<11> * 6718401900811<13> * [2698556036...<90661>] (0.03%)
Phi_272107(10) = 1111111111...<238561> = (1111111111...<238561>) (0.00%)
Phi_272108(10) = 1009999999...<133633> = 13125401489<11> * [7695002707...<133622>] (0.01%)
Phi_272109(10) = 9009009009...<181404> = 38639479 * [2331555508...<181397>] (0.00%)
Phi_272110(10) = 1099989000...<108841> = 461498561 * [2383515557...<108832>] (0.01%)
Phi_272111(10) = 9000000900...<233232> = 190597428841<12> * (4721994916...<233221>) (0.00%)
Phi_272112(10) = 1000000009...<90689> = 5714353 * [1749979411...<90682>] (0.01%)
Phi_272113(10) = 9000000000...<260260> = (9000000000...<260260>) (0.00%)
Phi_272114(10) = 9090909090...<136056> = [9090909090...<136056>] (0.00%)
Phi_272115(10) = 1001000999...<145105> = 2176921 * [4598242196...<145098>] (0.00%)
Phi_272116(10) = 1009999999...<125569> = 521918489 * [1935168079...<125560>] (0.01%)
Phi_272117(10) = 9000000000...<265440> = 3809639 * 10709436653<11> * 56531040317483<14> * (3902160077...<265410>) (0.01%)
Phi_272118(10) = 9100000910...<64800> = 4081771 * 166475533687<12> * [1339190574...<64783>] (0.03%)
Phi_272119(10) = 9000000000...<256096> = (9000000000...<256096>) (0.00%)
Phi_272120(10) = 1000099999...<108833> = 1966929620401<13> * [5084574402...<108820>] (0.01%)
Phi_272121(10) = 1109999999...<178321> = [1109999999...<178321>] (0.00%)
Phi_272122(10) = 1099999999...<135325> = 143952539 * 421786106659<12> * [1811678313...<135305>] (0.01%)
Phi_272123(10) = 9000000000...<271080> = (9000000000...<271080>) (0.00%)
Phi_272124(10) = 1000000999...<90697> = [1000000999...<90697>] (0.00%)
Phi_272125(10) = 1000000000...<186001> = 32110751 * 880537176751<12> * [3536729462...<185981>] (0.01%)
Phi_272126(10) = 1099999999...<134641> = 49799059 * [2208877079...<134633>] (0.01%)
Phi_272127(10) = 9009009009...<181416> = 45173083 * 506466607511947<15> * [3937734883...<181394>] (0.01%)
Phi_272128(10) = 9999999999...<135936> = 6767006977<10> * [1477758192...<135927>] (0.01%)
Phi_272129(10) = 1000000000...<227041> = 4560882041<10> * 9035771317<10> * 1439613570253<13> * (1685543623...<227009>) (0.01%)
Phi_272130(10) = 1098890109...<70657> = 25335303001<11> * 952105419897091<15> * [4555574199...<70631>] (0.04%)
Phi_272131(10) = 1111111111...<272131> = (1111111111...<272131>) (0.00%)
Phi_272132(10) = 1009999999...<116617> = 13811787529<11> * 47812231741<11> * [1529440087...<116596>] (0.02%)
Phi_272133(10) = 9999999990...<181404> = 1088533 * 613932049 * 41025138283<11> * [3647439029...<181379>] (0.01%)
Phi_272134(10) = 9090909090...<136066> = [9090909090...<136066>] (0.00%)
Phi_272135(10) = 1111099999...<211681> = (1111099999...<211681>) (0.00%)
Phi_272136(10) = 1000099999...<78849> = 38099041 * [2625000456...<78841>] (0.01%)
Phi_272137(10) = 9000000000...<257796> = 8164111 * (1102385795...<257790>) (0.00%)
Phi_272138(10) = 9090909090...<136068> = [9090909090...<136068>] (0.00%)
Phi_272139(10) = 1109999889...<155497> = [1109999889...<155497>] (0.00%)
Phi_272140L(10) = 2796127961...<49441> = 10301252283521<14> * [2714357326...<49428>] (0.03%)
Phi_272140M(10) = 3540964590...<49440> = 272141 * [1301150723...<49435>] (0.01%)
Phi_272141(10) = 1111111111...<272141> = 426183958859602157<18> * (2607116218...<272123>) (0.01%)
Phi_272142(10) = 9990010000...<83664> = [9990010000...<83664>] (0.00%)
Phi_272143(10) = 9000000000...<268240> = (9000000000...<268240>) (0.00%)
Phi_272144(10) = 1000000009...<133633> = 10320949348817<14> * 245314434203953<15> * [3949637657...<133605>] (0.02%)
Phi_272145(10) = 1109988900...<145137> = [1109988900...<145137>] (0.00%)
Phi_272146(10) = 1000000099...<116593> = 7347943 * [1360925227...<116586>] (0.01%)
Phi_272147(10) = 9000000000...<265776> = (9000000000...<265776>) (0.00%)
Phi_272148(10) = 1009998990...<90713> = 1006927461049<13> * [1003050397...<90701>] (0.01%)
Phi_272149(10) = 9000000000...<263340> = (9000000000...<263340>) (0.00%)
Phi_272150(10) = 1000009999...<108841> = 816451 * [1224825494...<108835>] (0.01%)
Phi_272151(10) = 1001000999...<164881> = [1001000999...<164881>] (0.00%)
Phi_272152(10) = 9999000099...<136072> = 5154366740689<13> * [1939908548...<136060>] (0.01%)
Phi_272153(10) = 1111110999...<219457> = (1111110999...<219457>) (0.00%)
Phi_272154(10) = 9100000000...<89232> = [9100000000...<89232>] (0.00%)
Phi_272155(10) = 9000090000...<194688> = [9000090000...<194688>] (0.00%)
Phi_272156(10) = 1009999999...<128881> = 816469 * [1237034106...<128875>] (0.00%)
Phi_272157(10) = 1109999999...<179089> = 763639883161<12> * [1453564729...<179077>] (0.01%)
Phi_272158(10) = 1099999999...<132721> = 238410409 * 104636858419<12> * [4409433327...<132701>] (0.01%)
Phi_272159(10) = 9000000000...<260304> = 862744031 * 17696182063957<14> * (5894961436...<260282>) (0.01%)
Phi_272160(10) = 9999999999...<62208> = [9999999999...<62208>] (0.00%)
Phi_272161(10) = 9000000000...<269892> = 76749403 * 30854348249<11> * (3800590919...<269874>) (0.01%)
Phi_272162(10) = 9090909091...<121440> = 234328128419837<15> * [3879563734...<121426>] (0.01%)
Phi_272163(10) = 1109999999...<180225> = [1109999999...<180225>] (0.00%)
Phi_272164(10) = 9900990099...<136080> = [9900990099...<136080>] (0.00%)
Phi_272165(10) = 1111099999...<210113> = 4038384271<10> * 4208759561<10> * (6537194248...<210093>) (0.01%)
Phi_272166(10) = 1098901098...<90721> = 224800406689<12> * [4888341240...<90709>] (0.01%)
Phi_272167(10) = 1111110999...<228985> = (1111110999...<228985>) (0.00%)
Phi_272168(10) = 1000099999...<125569> = 24222953 * [4128728648...<125561>] (0.01%)
Phi_272169(10) = 9990000009...<181440> = [9990000009...<181440>] (0.00%)
Phi_272170(10) = 9091000000...<102400> = 3266041 * [2783492307...<102394>] (0.01%)
Phi_272171(10) = 1111111111...<272171> = (1111111111...<272171>) (0.00%)
Phi_272172(10) = 9901000000...<88128> = 2449549 * [4041968541...<88122>] (0.01%)
Phi_272173(10) = 1111111111...<244081> = 1088693 * 1633039 * (6249647226...<244068>) (0.01%)
Phi_272174(10) = 1099999890...<116641> = 17114301121<11> * 184168714493<12> * 18523097967487<14> * [1884100185...<116606>] (0.03%)
Phi_272175(10) = 9999900000...<136800> = [9999900000...<136800>] (0.00%)
Phi_272176(10) = 9999999900...<136080> = [9999999900...<136080>] (0.00%)
Phi_272177(10) = 9000000000...<266340> = (9000000000...<266340>) (0.00%)
Phi_272178(10) = 1000999998...<90721> = [1000999998...<90721>] (0.00%)
Phi_272179(10) = 1111111111...<272179> = (1111111111...<272179>) (0.00%)
Phi_272180L(10) = 3541000000...<52560> = 69443067107636516461<20> * [5099141134...<52540>] (0.04%)
Phi_272180M(10) = 2796099999...<52561> = 186715481 * [1497519105...<52553>] (0.02%)
Phi_272181(10) = 9009009909...<143424> = 2177449 * [4137414887...<143418>] (0.00%)
Phi_272182(10) = 9090909090...<126720> = 272183 * [3339998857...<126715>] (0.00%)
Phi_272183(10) = 1111111111...<272183> = 13609151 * 50626039 * (1612695998...<272168>) (0.01%)
Phi_272184(10) = 9999000100...<82400> = [9999000100...<82400>] (0.00%)
Phi_272185(10) = 9000090000...<217744> = (9000090000...<217744>) (0.00%)
Phi_272186(10) = 9090909090...<136092> = 544373 * 2695149026891<13> * 938957904770407451<18> * [6599056265...<136056>] (0.03%)
Phi_272187(10) = 1000000001...<170497> = [1000000001...<170497>] (0.00%)
Phi_272188(10) = 1009999999...<116641> = 272189 * 892982141941<12> * 3215558263121<13> * 100512610206961<15> * [1285674693...<116597>] (0.04%)
Phi_272189(10) = 1111111111...<272189> = 391952161 * 43536086173<11> * (6511410016...<272169>) (0.01%)
Phi_272190(10) = 1098890109...<70561> = [1098890109...<70561>] (0.00%)
Phi_272191(10) = 1111111111...<272191> = 43550561 * 336428077 * (7583531649...<272174>) (0.01%)
Phi_272192(10) = 9999999999...<136064> = [9999999999...<136064>] (0.00%)
Phi_272193(10) = 9009009009...<181460> = [9009009009...<181460>] (0.00%)
Phi_272194(10) = 9999999999...<114912> = 2159581207733<13> * [4630527420...<114900>] (0.01%)
Phi_272195(10) = 9999999000...<168000> = [9999999000...<168000>] (0.00%)
Phi_272196(10) = 1000000999...<90721> = [1000000999...<90721>] (0.00%)
Phi_272197(10) = 9000000000...<270976> = (9000000000...<270976>) (0.00%)
Phi_272198(10) = 9090909090...<136098> = [9090909090...<136098>] (0.00%)
Phi_272199(10) = 1109999999...<176961> = 544399 * 1027279027<10> * [1984802226...<176946>] (0.01%)
Phi_272200(10) = 1000000000...<108801> = [1000000000...<108801>] (0.00%)