/* Data is in the following format
   Note, if the class group has not been computed, it, the class number, the fundamental units, regulator and whether grh was assumed are all 0.
[polynomial,
degree,
t-number of Galois group,
signature [r,s],
discriminant,
list of ramifying primes,
integral basis as polynomials in a,
1 if it is a cm field otherwise 0,
class number,
class group structure,
1 if grh was assumed and 0 if not,
fundamental units,
regulator,
list of subfields each as a pair [polynomial, number of subfields isomorphic to one defined by this polynomial]
]
*/

[x^24 - x^23 - 2*x^22 + 5*x^21 - 4*x^20 + 8*x^19 + 15*x^18 - 59*x^17 + 26*x^16 + 114*x^15 + 34*x^14 - 119*x^13 - 10*x^12 - 196*x^11 - 198*x^10 + 289*x^9 + 559*x^8 - 307*x^7 + 22*x^6 + 46*x^5 - 22*x^4 + 12*x^3 - x^2 - 2*x + 1, 24, 2, [0, 12], 67372672480923938907623291015625, [3, 5, 7], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, a^12, a^13, a^14, a^15, a^16, a^17, 1/181*a^18 + 43/181*a^17 - 48/181*a^15 - 73/181*a^14 - 23/181*a^13 + 48/181*a^12 + 65/181*a^11 + 18/181*a^10 + 49/181*a^9 + 8/181*a^8 + 62/181*a^7 + 1/181*a^6 - 22/181*a^5 - 80/181*a^4 - 1/181*a^3 + 39/181*a + 48/181, 1/181*a^19 - 39/181*a^17 - 48/181*a^16 + 39/181*a^14 - 49/181*a^13 - 8/181*a^12 - 62/181*a^11 - 1/181*a^10 + 73/181*a^9 + 80/181*a^8 + 50/181*a^7 - 65/181*a^6 - 39/181*a^5 + 43/181*a^3 + 39/181*a^2 - 73/181, 1/2353*a^20 - 3/2353*a^19 + 841/2353*a^17 + 506/2353*a^16 - 1109/2353*a^15 + 969/2353*a^14 + 509/2353*a^13 - 881/2353*a^12 + 186/2353*a^11 - 127/2353*a^10 + 505/2353*a^9 - 59/2353*a^8 - 1055/2353*a^7 + 738/2353*a^6 - 922/2353*a^5 + 5/13*a^4 - 310/2353*a^3 - 9/181*a^2 + 3/13*a + 100/2353, 1/184806973*a^21 + 26051/184806973*a^20 + 32884/184806973*a^19 - 111037/184806973*a^18 - 28576544/184806973*a^17 + 82830352/184806973*a^16 - 79766532/184806973*a^15 - 18675511/184806973*a^14 + 31433071/184806973*a^13 - 44362867/184806973*a^12 - 45523675/184806973*a^11 + 35106634/184806973*a^10 + 28795990/184806973*a^9 + 43507812/184806973*a^8 - 9371057/184806973*a^7 + 31125778/184806973*a^6 - 54307542/184806973*a^5 + 71515657/184806973*a^4 + 22450640/184806973*a^3 + 86998103/184806973*a^2 + 86706103/184806973*a + 1004489/184806973, 1/184806973*a^22 - 27477/184806973*a^20 + 31648/184806973*a^19 + 3906/14215921*a^18 - 7356750/184806973*a^17 + 40972094/184806973*a^16 - 41877687/184806973*a^15 - 86032801/184806973*a^14 + 63509435/184806973*a^13 + 47239093/184806973*a^12 - 75434023/184806973*a^11 + 87678347/184806973*a^10 - 74305633/184806973*a^9 + 88509977/184806973*a^8 + 8927168/184806973*a^7 + 20183353/184806973*a^6 - 42222595/184806973*a^5 - 19460453/184806973*a^4 - 1221923/184806973*a^3 - 3667721/14215921*a^2 + 15021030/184806973*a + 25166397/184806973, 1/184806973*a^23 + 12301/184806973*a^20 + 225864/184806973*a^19 - 326564/184806973*a^18 + 60847156/184806973*a^17 + 78740134/184806973*a^16 + 34096128/184806973*a^15 - 65004216/184806973*a^14 + 91789795/184806973*a^13 + 90467158/184806973*a^12 - 62490772/184806973*a^11 - 91927281/184806973*a^10 - 91699176/184806973*a^9 + 1223361/184806973*a^8 - 53521058/184806973*a^7 - 76466613/184806973*a^6 - 92286394/184806973*a^5 - 44212596/184806973*a^4 + 5004964/184806973*a^3 + 3851427/14215921*a^2 - 64123171/184806973*a + 68503572/184806973], 1, 1, [], 1, [ (6266110)/(14215921)*a^(23) - (3762082)/(14215921)*a^(22) - (13785442)/(14215921)*a^(21) + (25064440)/(14215921)*a^(20) - (15038664)/(14215921)*a^(19) + (46369214)/(14215921)*a^(18) + (108983051)/(14215921)*a^(17) - (322078054)/(14215921)*a^(16) + (33836994)/(14215921)*a^(15) + (705563986)/(14215921)*a^(14) + (531366128)/(14215921)*a^(13) - (518490542)/(14215921)*a^(12) - (318318388)/(14215921)*a^(11) - (1402355418)/(14215921)*a^(10) - (1744485024)/(14215921)*a^(9) + (1068998366)/(14215921)*a^(8) + (3978486835)/(14215921)*a^(7) - (160412416)/(14215921)*a^(6) + (68927210)/(14215921)*a^(5) - (41356326)/(14215921)*a^(4) + (5012888)/(14215921)*a^(3) + (77691157)/(14215921)*a^(2) - (3759666)/(14215921)*a - 1 , (72534337)/(184806973)*a^(23) - (72374193)/(184806973)*a^(22) - (161108546)/(184806973)*a^(21) + (371905348)/(184806973)*a^(20) - (254069505)/(184806973)*a^(19) + (515723556)/(184806973)*a^(18) + (1127374555)/(184806973)*a^(17) - (4392950009)/(184806973)*a^(16) + (8824587)/(1021033)*a^(15) + (9094169086)/(184806973)*a^(14) + (2403692715)/(184806973)*a^(13) - (10432742742)/(184806973)*a^(12) - (2066405585)/(184806973)*a^(11) - (12887907150)/(184806973)*a^(10) - (13598151732)/(184806973)*a^(9) + (24531675932)/(184806973)*a^(8) + (45089279343)/(184806973)*a^(7) - (25034239411)/(184806973)*a^(6) - (8651898109)/(184806973)*a^(5) + (3753093834)/(184806973)*a^(4) - (1775207193)/(184806973)*a^(3) + (977458641)/(184806973)*a^(2) + (329969306)/(184806973)*a - (160478427)/(184806973) , (45222210)/(184806973)*a^(23) - (27202670)/(184806973)*a^(22) - (99488862)/(184806973)*a^(21) + (180888840)/(184806973)*a^(20) - (108533304)/(184806973)*a^(19) + (334644354)/(184806973)*a^(18) + (785509912)/(184806973)*a^(17) - (2324421594)/(184806973)*a^(16) + (244199934)/(184806973)*a^(15) + (5092020846)/(184806973)*a^(14) + (3834843408)/(184806973)*a^(13) - (3760998495)/(184806973)*a^(12) - (2297288268)/(184806973)*a^(11) - (10120730598)/(184806973)*a^(10) - (12589863264)/(184806973)*a^(9) + (7714909026)/(184806973)*a^(8) + (28701952840)/(184806973)*a^(7) - (1157688576)/(184806973)*a^(6) + (497444310)/(184806973)*a^(5) - (298466586)/(184806973)*a^(4) + (36177768)/(184806973)*a^(3) + (560508366)/(184806973)*a^(2) - (27133326)/(184806973)*a , (7693632)/(184806973)*a^(23) - (7693632)/(184806973)*a^(22) - (2564544)/(184806973)*a^(21) + (30721419)/(184806973)*a^(20) - (58984512)/(184806973)*a^(19) + (112839936)/(184806973)*a^(18) + (84629952)/(184806973)*a^(17) - (359036160)/(184806973)*a^(16) + (422429888)/(184806973)*a^(15) + (217986240)/(184806973)*a^(14) + (330826176)/(184806973)*a^(13) + (528296064)/(184806973)*a^(12) + (1010430336)/(184806973)*a^(11) - (2581191040)/(184806973)*a^(10) - (2174733312)/(184806973)*a^(9) - (646265088)/(184806973)*a^(8) + (730895040)/(184806973)*a^(7) - (174388992)/(184806973)*a^(6) + (8386424877)/(184806973)*a^(5) + (25645440)/(184806973)*a^(4) - (28209984)/(184806973)*a^(3) + (7693632)/(184806973)*a^(2) + (2564544)/(184806973)*a - (3284416)/(184806973) , (1800399)/(184806973)*a^(23) + (2416974)/(184806973)*a^(22) - (7818171)/(184806973)*a^(21) + (7596204)/(184806973)*a^(20) + (9634676)/(184806973)*a^(19) - (17930001)/(184806973)*a^(18) + (88860789)/(184806973)*a^(17) - (59832438)/(184806973)*a^(16) - (150000366)/(184806973)*a^(15) + (436806393)/(184806973)*a^(14) + (180705801)/(184806973)*a^(13) - (32900442)/(184806973)*a^(12) + (271588956)/(184806973)*a^(11) + (201003450)/(184806973)*a^(10) - (1771395312)/(184806973)*a^(9) - (671795457)/(184806973)*a^(8) + (652163709)/(184806973)*a^(7) - (152072058)/(184806973)*a^(6) - (55985010)/(184806973)*a^(5) + (4737629686)/(184806973)*a^(4) - (25550868)/(184806973)*a^(3) + (6141087)/(184806973)*a^(2) + (2416974)/(184806973)*a - (187001980)/(184806973) , (174158095)/(184806973)*a^(23) - (92175535)/(184806973)*a^(22) - (31884486)/(14215921)*a^(21) + (697218540)/(184806973)*a^(20) - (321975139)/(184806973)*a^(19) + (1129124488)/(184806973)*a^(18) + (3230232853)/(184806973)*a^(17) - (8930608743)/(184806973)*a^(16) - (31516791)/(184806973)*a^(15) + (21164292537)/(184806973)*a^(14) + (15348963148)/(184806973)*a^(13) - (16133765114)/(184806973)*a^(12) - (10193791455)/(184806973)*a^(11) - (36301888722)/(184806973)*a^(10) - (51375864480)/(184806973)*a^(9) + (30501906784)/(184806973)*a^(8) + (116603023345)/(184806973)*a^(7) - (4739111469)/(184806973)*a^(6) - (11168758131)/(184806973)*a^(5) + (9405979618)/(184806973)*a^(4) + (130461573)/(184806973)*a^(3) + (13384075)/(14215921)*a^(2) + (410213718)/(184806973)*a - (230427192)/(184806973) , (81963963)/(184806973)*a^(23) - (3658758)/(14215921)*a^(22) - (182117562)/(184806973)*a^(21) + (327515660)/(184806973)*a^(20) - (189134859)/(184806973)*a^(19) + (45475527)/(14215921)*a^(18) + (1450593897)/(184806973)*a^(17) - (4190553573)/(184806973)*a^(16) + (354779216)/(184806973)*a^(15) + (9341112093)/(184806973)*a^(14) + (6990758899)/(184806973)*a^(13) - (6784242786)/(184806973)*a^(12) - (3958542255)/(184806973)*a^(11) - (18070150900)/(184806973)*a^(10) - (23472904800)/(184806973)*a^(9) + (13453534251)/(184806973)*a^(8) + (52075523064)/(184806973)*a^(7) - (2152526421)/(184806973)*a^(6) + (859639676)/(184806973)*a^(5) + (1576472536)/(184806973)*a^(4) + (51229068)/(184806973)*a^(3) + (79654155)/(184806973)*a^(2) + (367974975)/(184806973)*a - (1181493)/(184806973) , (95446170)/(184806973)*a^(23) - (85343162)/(184806973)*a^(22) - (202147068)/(184806973)*a^(21) + (448343170)/(184806973)*a^(20) - (324131111)/(184806973)*a^(19) + (738385538)/(184806973)*a^(18) + (1480866195)/(184806973)*a^(17) - (5467058268)/(184806973)*a^(16) + (1793436030)/(184806973)*a^(15) + (11035755253)/(184806973)*a^(14) + (4842743088)/(184806973)*a^(13) - (11164117600)/(184806973)*a^(12) - (3248184006)/(184806973)*a^(11) - (19631082216)/(184806973)*a^(10) - (20269387013)/(184806973)*a^(9) + (26255203275)/(184806973)*a^(8) + (58856435792)/(184806973)*a^(7) - (20934882532)/(184806973)*a^(6) - (2746910050)/(184806973)*a^(5) - (1023274454)/(184806973)*a^(4) - (2315032966)/(184806973)*a^(3) + (67344048)/(184806973)*a^(2) - (91455135)/(184806973)*a - (210183668)/(184806973) , (163290223)/(184806973)*a^(23) - (163240218)/(184806973)*a^(22) - (362212886)/(184806973)*a^(21) + (837035941)/(184806973)*a^(20) - (572777992)/(184806973)*a^(19) + (1163730805)/(184806973)*a^(18) + (194578228)/(14215921)*a^(17) - (9887504943)/(184806973)*a^(16) + (3612580636)/(184806973)*a^(15) + (20444861334)/(184806973)*a^(14) + (5421496180)/(184806973)*a^(13) - (1809790532)/(14215921)*a^(12) - (4690623722)/(184806973)*a^(11) - (28952592233)/(184806973)*a^(10) - (2341750310)/(14215921)*a^(9) + (54988251355)/(184806973)*a^(8) + (101350815814)/(184806973)*a^(7) - (56242396151)/(184806973)*a^(6) - (19452365429)/(184806973)*a^(5) + (8438396158)/(184806973)*a^(4) - (3057248439)/(184806973)*a^(3) + (1780659505)/(184806973)*a^(2) - (191190881)/(184806973)*a - (693730677)/(184806973) , (162435569)/(184806973)*a^(23) - (98240416)/(184806973)*a^(22) - (400074463)/(184806973)*a^(21) + (691661219)/(184806973)*a^(20) - (311499492)/(184806973)*a^(19) + (5521884)/(1021033)*a^(18) + (2994455458)/(184806973)*a^(17) - (8729558592)/(184806973)*a^(16) + (270099308)/(184806973)*a^(15) + (20726524265)/(184806973)*a^(14) + (12607720641)/(184806973)*a^(13) - (18068644167)/(184806973)*a^(12) - (10097473112)/(184806973)*a^(11) - (32123976878)/(184806973)*a^(10) - (44810615333)/(184806973)*a^(9) + (37025160477)/(184806973)*a^(8) + (112342981984)/(184806973)*a^(7) - (14743619921)/(184806973)*a^(6) - (21102165348)/(184806973)*a^(5) + (9148070237)/(184806973)*a^(4) - (4415601883)/(184806973)*a^(3) + (565933915)/(184806973)*a^(2) - (130297540)/(184806973)*a - (481595425)/(184806973) , (19988895)/(14215921)*a^(23) - (161399061)/(184806973)*a^(22) - (602523590)/(184806973)*a^(21) + (1091054836)/(184806973)*a^(20) - (588224756)/(184806973)*a^(19) + (1757459702)/(184806973)*a^(18) + (4655681943)/(184806973)*a^(17) - (13766877455)/(184806973)*a^(16) + (94606286)/(14215921)*a^(15) + (31281577434)/(184806973)*a^(14) + (20117626803)/(184806973)*a^(13) - (25419400915)/(184806973)*a^(12) - (13311730993)/(184806973)*a^(11) - (54188140752)/(184806973)*a^(10) - (71966894719)/(184806973)*a^(9) + (52842581672)/(184806973)*a^(8) + (13074530741)/(14215921)*a^(7) - (19824113496)/(184806973)*a^(6) - (12779249216)/(184806973)*a^(5) + (11150354301)/(184806973)*a^(4) - (5515413129)/(184806973)*a^(3) + (1693859380)/(184806973)*a^(2) + (44959197)/(184806973)*a - (605784256)/(184806973) ], 8057321.833968681, [[x^2 - x + 1, 1], [x^2 - x - 1, 1], [x^2 - x + 4, 1], [x^3 - x^2 - 2*x + 1, 1], [x^4 - x^3 + 2*x^2 + x + 1, 1], [x^4 - x^3 - 4*x^2 + 4*x + 1, 1], [x^4 - x^3 + x^2 - x + 1, 1], [x^6 - x^5 + 3*x^4 + 5*x^2 - 2*x + 1, 1], [x^6 - x^5 - 7*x^4 + 2*x^3 + 7*x^2 - 2*x - 1, 1], [x^6 - x^5 + 7*x^4 - 5*x^3 + 49*x^2 - 9*x + 139, 1], [x^8 - x^7 + x^5 - x^4 + x^3 - x + 1, 1], [x^12 - x^11 + 8*x^10 + 3*x^9 + 44*x^8 - 2*x^7 + 49*x^6 - 13*x^5 + 46*x^4 - 10*x^3 + 11*x^2 + 2*x + 1, 1], [x^12 - x^11 - 22*x^10 + 14*x^9 + 153*x^8 - 62*x^7 - 396*x^6 + 84*x^5 + 361*x^4 - 87*x^3 - 112*x^2 + 37*x + 1, 1], [x^12 - x^11 + 3*x^10 - 4*x^9 + 9*x^8 + 2*x^7 + 12*x^6 + x^5 + 25*x^4 - 11*x^3 + 5*x^2 - 2*x + 1, 1]]]