Phi_23401(10) = 9000000900...<20052> = 2724157213<10> * [3303774413...<20043>] (0.05%)
Phi_23402(10) = 9090909090...<11700> = 2096292400558625666835746437<28> * [4336660805...<11673>] (0.23%)
Phi_23403(10) = 1109999999...<15009> = [1109999999...<15009>] (0.00%)
Phi_23404(10) = 9900990099...<11700> = 514889 * 2972309 * 216767849 * 31189223581<11> * 328565830501<12> * 5951040790980659701<19> * [4893913630...<11639>] (0.52%)
Phi_23405(10) = 1111099999...<18001> = 28647721 * [3878493510...<17993>] (0.04%)
Phi_23406(10) = 9100000000...<7544> = 18756528120331<14> * [4851644153...<7531>] (0.18%)
Phi_23407(10) = 9000000000...<23056> = 140443 * 22586537837<11> * 13234652941427<14> * 1191798892049587<16> * 367432385988846799<18> * 536999593430107147027<21> * [9116451416...<22974>] (0.36%)
Phi_23408(10) = 9999999900...<8640> = 54976431975178561<17> * [1818961242...<8624>] (0.19%)
Phi_23409(10) = 9999999999...<14688> = 2599850359<10> * [3846375221...<14679>] (0.06%)
Phi_23410(10) = 1099989000...<9361> = 19471442812186979521<20> * [5649242383...<9341>] (0.21%)
Phi_23411(10) = 9000000000...<22800> = 280933 * 186542257858973<15> * [1717364666...<22781>] (0.09%)
Phi_23412(10) = 1009998990...<7801> = 82293181 * 2692028821<10> * 2336514260771221179765610129<28> * [1951232172...<7756>] (0.57%)
Phi_23413(10) = 9000000000...<21600> = 1217477 * 5532819683<10> * 77300407627<11> * 176153652403<12> * 687367825454354279<18> * [1427488411...<21545>] (0.26%)
Phi_23414(10) = 1099999999...<11177> = 6860303 * 883952114943148720867019<24> * [1813930520...<11146>] (0.28%)
Phi_23415(10) = 9009100000...<10656> = 46831 * 983431 * [1956158684...<10646>] (0.10%)
Phi_23416(10) = 9999000099...<11704> = 23417 * 58973027826289<14> * 116740530754903417<18> * [6202263701...<11669>] (0.30%)
Phi_23417(10) = 1111111111...<23417> = 11240161 * 216661084381951481<18> * 26238183022849803283<20> * 512008936051477742478481<24> * [3396196016...<23349>] (0.29%)
Phi_23418(10) = 1000999998...<7801> = 3944645011<10> * [2537617443...<7791>] (0.12%)
Phi_23419(10) = 9000000000...<21280> = 234191 * [3843017024...<21275>] (0.03%)
Phi_23420L(10) = 3576409999...<4680> = 69955541 * 6944824648375441<16> * 2527681379929774704638115821<28> * [2912336593...<4629>] (1.09%)
Phi_23420M(10) = 2824060999...<4681> = [2824060999...<4681>] (0.00%)
Phi_23421(10) = 1109999999...<15121> = 10124617249<11> * 3072632608351<13> * [3568072986...<15098>] (0.15%)
Phi_23422(10) = 1000000099...<9997> = [1000000099...<9997>] (0.00%)
Phi_23423(10) = 9000000000...<22968> = [9000000000...<22968>] (0.00%)
Phi_23424(10) = 1000000000...<7681> = 2342401 * 5966631553<10> * [7154998297...<7664>] (0.21%)
Phi_23425(10) = 9999900000...<18720> = 5316616145801<13> * [1880876806...<18708>] (0.07%)
Phi_23426(10) = 9090909090...<9984> = [9090909090...<9984>] (0.00%)
Phi_23427(10) = 1001000999...<14689> = 2198959049809<13> * [4552158440...<14676>] (0.08%)
Phi_23428(10) = 9900990099...<11712> = [9900990099...<11712>] (0.00%)
Phi_23429(10) = 9000000900...<20076> = 991515281 * [9077016837...<20067>] (0.04%)
Phi_23430(10) = 1098890109...<5601> = 39807571 * [2760505306...<5593>] (0.14%)
Phi_23431(10) = 1111111111...<23431> = 12194710813<11> * [9111418287...<23420>] (0.04%)
Phi_23432(10) = 1000099999...<11201> = 336312445062261712481<21> * [2973722842...<11180>] (0.18%)
Phi_23433(10) = 1109999999...<15265> = 46867 * [2368404207...<15260>] (0.03%)
Phi_23434(10) = 9090909090...<11716> = 29972087 * 415578557 * 4101418681<10> * 125695265767<12> * 37565857001517451<17> * [3768693969...<11663>] (0.46%)
Phi_23435(10) = 1111099999...<18145> = 312985482242311<15> * [3550004914...<18130>] (0.08%)
Phi_23436(10) = 9999999999...<6480> = 70309 * [1422293020...<6476>] (0.07%)
Phi_23437(10) = 9000000000...<22396> = 656237 * 937481 * [1462915770...<22385>] (0.05%)
Phi_23438(10) = 9090909090...<11718> = 24764527941195306845457449<26> * [3670939786...<11693>] (0.22%)
Phi_23439(10) = 1109999999...<14401> = [1109999999...<14401>] (0.00%)
Phi_23440(10) = 1000000009...<9345> = 308845441 * 101194089761<12> * [3199658740...<9325>] (0.21%)
Phi_23441(10) = 9000000000...<21300> = 101546413 * 1648371121<10> * 2179500779763178169<19> * [2466981521...<21265>] (0.17%)
Phi_23442(10) = 1098901098...<7813> = 70327 * 637833379 * 980297557 * [2499029326...<7790>] (0.29%)
Phi_23443(10) = 1111110999...<18817> = [1111110999...<18817>] (0.00%)
Phi_23444(10) = 9900990099...<11720> = 4852909 * 263663414881<12> * 586272711949<12> * [1319857138...<11691>] (0.25%)
Phi_23445(10) = 1001000999...<12481> = 429653071 * [2329789003...<12472>] (0.07%)
Phi_23446(10) = 1099999999...<11089> = 15357131 * [7162796228...<11081>] (0.06%)
Phi_23447(10) = 1111111111...<23447> = 17021960507400565282497842551<29> * [6527515503...<23418>] (0.12%)
Phi_23448(10) = 1000099999...<7809> = 3275193193<10> * 57197475189577<14> * [5338627828...<7785>] (0.30%)
Phi_23449(10) = 9000000000...<23140> = 422083 * 98204413 * 104645817759435409<18> * [2074874190...<23110>] (0.13%)
Phi_23450(10) = 9999900000...<7920> = [9999900000...<7920>] (0.00%)
Phi_23451(10) = 9009009009...<15632> = 1427180959<10> * 7318396917250519<16> * [8625455091...<15607>] (0.16%)
Phi_23452(10) = 9900990099...<9600> = 93809 * 27141585901<11> * 26977552963953890427500801<26> * [1441439257...<9560>] (0.43%)
Phi_23453(10) = 9000000000...<22908> = 2251489 * [3997354639...<22902>] (0.03%)
Phi_23454(10) = 1000999998...<7813> = 792233967744127<15> * [1263515627...<7798>] (0.19%)
Phi_23455(10) = 9000090000...<18760> = 2909405111<10> * [3093446824...<18751>] (0.05%)
Phi_23456(10) = 9999999999...<11712> = 54816673 * 751462944737<12> * [2427614689...<11693>] (0.17%)
Phi_23457(10) = 1109999889...<13393> = [1109999889...<13393>] (0.00%)
Phi_23458(10) = 1099999999...<11377> = 23459 * [4689031928...<11372>] (0.04%)
Phi_23459(10) = 1111111111...<23459> = 46919 * 3254232481<10> * 22187509842308047973<20> * [3279832044...<23425>] (0.14%)
Phi_23460L(10) = 2555229635...<2817> = 64069261 * 122874657363079201<18> * 173065131791219861817967501<27> * [1875462236...<2766>] (1.82%)
Phi_23460M(10) = 3952674060...<2816> = 45427414104100321<17> * 216546524055164461<18> * 586977145539519541<18> * [6845427558...<2764>] (1.84%)
Phi_23461(10) = 9000000000...<22624> = 1242916966883345597<19> * [7241030768...<22606>] (0.08%)
Phi_23462(10) = 9090909090...<11730> = 339352514503<12> * [2678898402...<11719>] (0.10%)
Phi_23463(10) = 1000000001...<14041> = 18864253 * [5301031538...<14033>] (0.05%)
Phi_23464(10) = 1000099999...<10033> = 211177 * 56702867761<11> * [8352025032...<10016>] (0.16%)
Phi_23465(10) = 1000000000...<16417> = 187721 * 3398465187391<13> * 383522570146335881<18> * [4087082349...<16381>] (0.22%)
Phi_23466(10) = 1098901098...<7821> = 885184453 * 248915991479965232893<21> * [4987375087...<7791>] (0.38%)
Phi_23467(10) = 9000000000...<22680> = 2534437 * 56684469037681<14> * [6264651643...<22660>] (0.09%)
Phi_23468(10) = 9900990099...<11732> = 7157741 * [1383256267...<11726>] (0.06%)
Phi_23469(10) = 9009009009...<15644> = 119316397 * 51407465273809<14> * 75907177099407397<17> * [1934941588...<15606>] (0.25%)
Phi_23470(10) = 1099989000...<9385> = 2713484051<10> * 8465886187102944571<19> * [4788380387...<9356>] (0.30%)
Phi_23471(10) = 9999999000...<20076> = 1816232923<10> * 470106771787241<15> * [1171202270...<20053>] (0.12%)
Phi_23472(10) = 1000000000...<7777> = 23473 * 3990241 * 83329197622096458699649<23> * [1281253528...<7743>] (0.44%)
Phi_23473(10) = 1111111111...<23473> = 93893 * 140839 * 27604249 * 52963632173<11> * 56321914283<11> * [1020399501...<23434>] (0.17%)
Phi_23474(10) = 1000000000...<10561> = 436945037 * 1700988339997<13> * 645927858571061886557<21> * [2082993125...<10519>] (0.39%)
Phi_23475(10) = 1000010000...<12481> = 985951 * 8656124551<10> * [1171724509...<12465>] (0.13%)
Phi_23476(10) = 9900990099...<11736> = 1831129 * [5407041283...<11730>] (0.05%)
Phi_23477(10) = 9000000000...<22080> = 755684870057111<15> * [1190972633...<22066>] (0.07%)
Phi_23478(10) = 1098900989...<6049> = 18406191327092983679539<23> * [5970279073...<6026>] (0.37%)
Phi_23479(10) = 9000000000...<22984> = 234791 * 66764059207067<14> * [5741406944...<22965>] (0.08%)
Phi_23480(10) = 1000099999...<9377> = 2301041 * [4346293699...<9370>] (0.07%)
Phi_23481(10) = 9990000009...<15648> = 3480991709307391<16> * [2869871819...<15633>] (0.10%)
Phi_23482(10) = 1099999999...<11485> = [1099999999...<11485>] (0.00%)
Phi_23483(10) = 9000000000...<22440> = 610559 * [1474059018...<22435>] (0.03%)
Phi_23484(10) = 9901000000...<7344> = 2853587809<10> * 2485820463567409<16> * [1395783501...<7320>] (0.34%)
Phi_23485(10) = 9000090900...<14400> = 1182792173449822325804690431<28> * [7609190441...<14373>] (0.19%)
Phi_23486(10) = 9090909090...<11742> = 10038708841127<14> * [9055854925...<11729>] (0.11%)
Phi_23487(10) = 9009009009...<15656> = 4603966741093<13> * [1956792808...<15644>] (0.08%)
Phi_23488(10) = 9999999999...<11712> = 109853377 * 7609197823553<13> * 10054140627033793<17> * [1189878884...<11676>] (0.32%)
Phi_23489(10) = 9000000000...<23124> = 312120913627079<15> * [2883497903...<23110>] (0.06%)
Phi_23490(10) = 9999999999...<6048> = 1057051 * 2536285771<10> * 42901877611<11> * 32949291362041<14> * 189417188287198801<18> * [1393041675...<5992>] (0.94%)
Phi_23491(10) = 9999999999...<21528> = [9999999999...<21528>] (0.00%)
Phi_23492(10) = 1009999999...<10057> = 2466661 * 69540849149395849<17> * 19506075843037091989661<23> * [3018575261...<10011>] (0.45%)
Phi_23493(10) = 1109999999...<15201> = [1109999999...<15201>] (0.00%)
Phi_23494(10) = 1099999999...<11041> = 422893 * 2819281 * 122944103 * [7504402534...<11020>] (0.18%)
Phi_23495(10) = 1111099999...<18145> = 2879782151<10> * 443594828836001<15> * [8697752336...<18120>] (0.13%)
Phi_23496(10) = 9999000100...<7040> = 23497 * 1602121753<10> * 286797464949601<15> * [9261329386...<7012>] (0.40%)
Phi_23497(10) = 1111111111...<23497> = [1111111111...<23497>] (0.00%)
Phi_23498(10) = 1099999999...<11341> = 1481912155583<13> * [7422842142...<11328>] (0.11%)
Phi_23499(10) = 1001000999...<13393> = 41687227 * [2401217524...<13385>] (0.06%)
Phi_23500L(10) = 9999999999...<4600> = 2491001 * 8215529501<10> * 148485502001<12> * [3290837874...<4573>] (0.60%)
Phi_23500M(10) = 1000000000...<4601> = [1000000000...<4601>] (0.00%)