The following results come from iLaplace of exponential functions applied to a system. Is there any way to convert them into meaningful numbers. I tried vpa() and it does not work.
..(56.240759341013409534260599373548 - 0.00000000000013606823531578978773053936699721i) - D(floor)(-37502291582195/2186280779104)*(0.25082825162799291866461491211747 + 0.00000000000000000000000023766846775708450148602766237522i) - D(floor)(-35316010803091/2186280779104)*(0.25082825162443326255224555529554 - 0.000000000000068034117655724846401157493545727i)(56.241158633506651601044645552568 - 0.00000000000012480305931315181342276447193347i) - D(floor)(-6015952021081463/349804924656640)*(0.23006202066613085729738175242261 + 0.00000000000000000000000051090138401796784937183960969758i) - D(floor)(-5666147096424823/349804924656640)*(0.23006202066286590738534886574889 - 0.000000000000062401529654058621559197843631116i)(56.235256023736908836092916667669 - 0.00000000000011109671301070566491753803076047i) - D(floor)(-1206307477802345/69960984931328)*(0.20479573517792250823562148871178 + 0.00000000000000000000000077414097726528085084719623267315i) - D(floor)(-1136346492871017/69960984931328)*(0.20479573517501612753176702882629 - 0.000000000000055548356502537548169101522076862i)(56.226657491952465683852675204128 - 0.000000000000095217295008728883961911240208161i) - D(floor)(-1511780689235497/87451231164160)*(0.17552360825445199980707395856514 + 0.0000000000000000000000010222382336823627947827620821529i) - D(floor)(-1424329458071337/87451231164160)*(0.17552360825196103764099959817473 - 0.000000000000047608647501306226021151386961044i)(56.218844284171322499646516889589 - 0.000000000000077475409581011859909343564103763i) - D(floor)(-5712903200215611/349804924656640)*(0.14281820796414905017691056378738 - 0.000000000000038737704787264601579263214667079i) - D(floor)(-6062708124872251/349804924656640)*(0.14281820796617587013696115581293 + 0.0000000000000000000000012503403262859262868331960199891i)(56.21504136752541423771457256615 - 0.000000000000058218091199362568758262993763544i) - D(floor)(-3039146746401257/174902462328320)*(0.10731925782841899560807434869757 + 0.0000000000000000000000014539855370952371911208375667805i) - D(floor)(-2864244284072937/174902462328320)*(0.10731925782689596281721402028546 - 0.000000000000029109045596320244554453257178957i)(56.218096779073345090116231613327 - 0.000000000000037822016476886252083678308922337i) - D(floor)(-6093878860732777/349804924656640)*(0.069721123694291236726418014699771 + 0.0000000000000000000000016291905291387338965491446291249i) - D(floor)(-5744073936076137/349804924656640)*(0.069721123693301781900223200206276 - 0.000000000000018911008235028117311716973318841i)(56.230374334052602713594123491152 - 0.000000000000016686136305646097698424155421805i) - D(floor)(-4499733831255/273285097388)*(0.030759231833205532666108352928874 - 0.0000000000000083430681494208693989744505663963i) - D(floor)(-4773018928643/273285097388)*(0.030759231833642055613174315958524 + 0.0000000000000000000000017725282612420355090215988744932i)D(floor)(-6125049596593303/349804924656640)*(0.0088043161371255537787915912234192 - 0.0000000000000000000000018811950215700452685748474368362i) + D(floor)(-5775244671936663/349804924656640)*(0.0088043161370006063793271245646387 - 0.000000000000002388063850613298719715223417708i) + (56.253661844963763806899211836779 + 0.0000000000000047761276945809915833346772271689i)D(floor)(-1158166007973385/69960984931328)*(0.04819565009913375699584192944367 - 0.00000000000001307248489197118797744314127138i) + D(floor)(-1228126992904713/69960984931328)*(0.048195650099817730748217645838292 - 0.000000000000000000000001953065268734999334324914463984i) + (56.28909664892960680018903114424 + 0.000000000000026144969777585512389662980689961i)D(floor)(-1539055083113457/87451231164160)*(0.086644268473237872723343390874044 - 0.000000000000000000000001986733207768541662161029706948i) + D(floor)(-1451603851949297/87451231164160)*(0.086644268472008251267741241775284 - 0.000000000000023501205776309491779375566665773i) + (56.337109854612977762576036033202 + 0.000000000000047002411546675203679721594915671i)D(floor)(-5822000775727451/349804924656640)*(0.12339810936100847461075855405675 - 0.000000000000033470238846370123558451659136718i) + D(floor)(-6171805700384091/349804924656640)*(0.12339810936275969215263204002882 - 0.0000000000000000000000019815402877242649503433046421559i) + (56.397390309363130599230687188233 + 0.000000000000066940477687325812328148051520334i)D(floor)(-3093695534157177/174902462328320)*(0.15773826102633780860027994285598 - 0.0000000000000000000000019375880830527567935475936278415i) + D(floor)(-2918793071828857/174902462328320)*(0.15773826102409924910240447147099 - 0.000000000000042784588021268690629354433788216i) + (56.468868860387575668327443988242 + 0.0000000000000855691760377581988790813116331i)D(floor)(-5853171511587977/349804924656640)*(0.18899302391487334887969517010608 - 0.000000000000051262062954927531647702522255081i) + D(floor)(-6202976436244617/349804924656640)*(0.18899302391755546370694148503009 - 0.0000000000000000000000018557363067870605515283354551885i) + (56.549723049093535484210182727775 + 0.00000000000010252412590580461499231564315555i)D(floor)(-36679730496989/2186280779104)*(0.21655104924655873506329328816894 - 0.000000000000058736842712032094902525336246277i) + D(floor)(-38866011276093/2186280779104)*(0.21655104924963194257121429074338 - 0.0000000000000000000000017375859944010349778699111720551i) + (56.637401943906359521193088948741 + 0.0000000000001174736854208217030762293004231i)D(floor)(-5884342247448503/349804924656640)*(0.23987329708430656246083679803668 - 0.000000000000065062719255366939832250976822508i) + D(floor)(-6234147172105143/349804924656640)*(0.23987329708771075015752102929346 - 0.0000000000000000000000015854481872673616813784682915594i) + (56.728670392398371093037153843115 + 0.00000000000013012543850836277813388448432932i)D(floor)(-1179985523075753/69960984931328)*(0.25850358006332178163895175281582 - 0.000000000000070115957301335088228329270004716i) + D(floor)(-1249946508007081/69960984931328)*(0.25850358006699036300043210927562 - 0.0000000000000000000000014022987282724117852338572915893i) + (56.819671566782533271791189816496 + 0.00000000000014023191460121683929688884399305i)D(floor)(-1478878245827257/87451231164160)*(0.2720774864958187800437633090733 - 0.000000000000073797714604373877053865540654735i) + D(floor)(-1566329476991417/87451231164160)*(0.27207748649967999695840884424851 - 0.0000000000000000000000011917200537938049351289133566953i) + (56.906006295696587522278544114938 + 0.0000000000001475954292082406088551978604913i)D(floor)(-5931098351239291/349804924656640)*(0.28032950832920708454352323098246 - 0.000000000000076035975329063940018119375384224i) + D(floor)(-6280903275895931/349804924656640)*(0.28032950833318541091361624248182 - 0.00000000000000000000000095783112060023555602648187211957i) + (56.98282732715009354923957842228 + 0.00000000000015207195065857684654334776128373i)(57.044946358636559657165276622897 - 0.0000000000000000000000025253101365232451924993310276108i) - D(floor)(-2973341859584777/174902462328320)*(0.28309823453138612917956898455014 - 0.000000000000076786958692831409262551553225254i) - D(floor)(-3148244321913097/174902462328320)*(0.28309823453540374822536811968001 - 0.00000000000000000000000070520683830624586266808892596842i)
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