(************** Content-type: application/mathematica ************** CreatedBy='Mathematica 5.0' Mathematica-Compatible Notebook This notebook can be used with any Mathematica-compatible application, such as Mathematica, MathReader or Publicon. The data for the notebook starts with the line containing stars above. To get the notebook into a Mathematica-compatible application, do one of the following: * Save the data starting with the line of stars above into a file with a name ending in .nb, then open the file inside the application; * Copy the data starting with the line of stars above to the clipboard, then use the Paste menu command inside the application. Data for notebooks contains only printable 7-bit ASCII and can be sent directly in email or through ftp in text mode. Newlines can be CR, LF or CRLF (Unix, Macintosh or MS-DOS style). 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For more information on notebooks and Mathematica-compatible applications, contact Wolfram Research: web: http://www.wolfram.com email: info@wolfram.com phone: +1-217-398-0700 (U.S.) Notebook reader applications are available free of charge from Wolfram Research. *******************************************************************) (*CacheID: 232*) (*NotebookFileLineBreakTest NotebookFileLineBreakTest*) (*NotebookOptionsPosition[ 265812, 5127]*) (*NotebookOutlinePosition[ 266481, 5150]*) (* CellTagsIndexPosition[ 266437, 5146]*) (*WindowFrame->Normal*) Notebook[{ Cell[CellGroupData[{ Cell["\<\ Code for block diagonalizing matrices (distinct eigenvalues)\ \>", \ "Title", FontSize->24], Cell[CellGroupData[{ Cell["Definitions", "Section"], Cell[BoxData[ \(\(id\ = \ IdentityMatrix[3];\)\)], "Input", CellLabel->"In[1]:="], Cell[BoxData[ \(\[Chi][a_, \[Lambda]_] := Factor[Det[a - \[Lambda]\ id]]\)], "Input", CellLabel->"In[2]:="], Cell[BoxData[ \(p[a_, \[Lambda]_] := a . a - 2 Re[\[Lambda]]\ a\ + \ \[Lambda]\ Conjugate[\[Lambda]]\ id\)], \ "Input", CellLabel->"In[3]:="], Cell[BoxData[ \(y[a_, \[Lambda]_, x_] := \(\(-1\)\/Im[\[Lambda]]\) \((a . x\ - 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\[ExponentialE]\^t\ \ Cos[2\ t] - 7\ \[ExponentialE]\^t\ Sin[2\ t]\)}, {\(\[ExponentialE]\^\(3\ t\) - \[ExponentialE]\^t\ Cos[2\ t] + 2\ \[ExponentialE]\^t\ Sin[ 2\ t]\), \(\(-\[ExponentialE]\^\(3\ t\)\) + \ \[ExponentialE]\^t\ Cos[2\ t] + 3\ \[ExponentialE]\^t\ Sin[ 2\ t]\), \(\[ExponentialE]\^\(3\ t\) - 5\ \[ExponentialE]\^t\ Sin[2\ t]\)} }], "\[NoBreak]", ")"}], Function[ BoxForm`e$, MatrixForm[ BoxForm`e$]]]], "Output", CellLabel->"Out[32]//MatrixForm=", FontSize->10] }, Open ]], Cell[CellGroupData[{ Cell[BoxData[ \(Array[Random[Integer, {\(-10\), 10}] &, {2, 2}]\)], "Input", CellLabel->"In[43]:=", FontSize->10], Cell[BoxData[ \({{\(-1\), 0}, {\(-5\), 1}}\)], "Output", CellLabel->"Out[43]=", FontSize->10] }, Open ]], Cell[CellGroupData[{ Cell[BoxData[ \(Eigenvalues[%]\)], "Input", CellLabel->"In[44]:=", FontSize->10], Cell[BoxData[ \({\(-1\), 1}\)], "Output", CellLabel->"Out[44]=", FontSize->10] }, Open ]], Cell[CellGroupData[{ Cell[BoxData[ \(Array[Random[Real, {\(-10\), 10}] &, {8, 8}]\)], "Input", CellLabel->"In[33]:=", FontSize->10], Cell[BoxData[ \({{7.933041784644878`, \(-6.777660155928377`\), \ \(-0.6817465448494691`\), \(-6.2976211865788905`\), \(-6.806841139041776`\), 0.6048635153122905`, \(-2.1272363470024223`\), 9.020445774159448`}, {\(-7.808909308749919`\), \ \(-6.247941131484881`\), 8.798080967869318`, \(-2.6758628727876026`\), \ \(-7.297087369960542`\), 6.1629371340426715`, 7.185105991145477`, \(-7.813363907298903`\)}, {5.405471475105447`, \ \(-0.4987323565977082`\), 4.804365428857304`, 7.186290177482714`, \(-9.351895978443626`\), 8.9888351272784`, \(-2.333611300366277`\), 1.7673389781510114`}, {\(-7.284937763088502`\), 5.766495283206774`, 8.348135244483192`, \(-1.9350398352700964`\), 9.521903375953272`, \(-4.838368232105516`\), 0.47537159148561337`, \(-0.9554856094295445`\)}, {7.33081268470319`, \ \(-8.590427100620637`\), 1.6772906236162939`, \(-8.279622736641942`\), 4.627900054663733`, \(-4.753364234663309`\), 4.492184632470819`, 9.533741170656963`}, {9.222428579558287`, 5.7453681219343995`, 9.687819203613515`, \(-7.652549006825753`\), 8.574324558001912`, 6.756532994656002`, 2.02143050397979`, 0.5801120150232357`}, {5.859262321090412`, \(-9.009962288550772`\), 3.6732952594966015`, \(-7.484848149706669`\), 6.33735894513714`, 5.828405943554744`, \(-6.8020763319890145`\), 3.4706374597228766`}, {9.006546260433947`, 4.418833044175381`, 1.5206330443946907`, 1.7502601963648168`, \(-5.621353794229787`\), \ \(-0.8278027211613104`\), 7.028448411923872`, 2.216519025707857`}}\)], "Output", CellLabel->"Out[33]=", FontSize->10] }, Open ]], Cell[CellGroupData[{ Cell[BoxData[ \(MatrixExp[t\ %]\)], "Input", CellLabel->"In[34]:=", FontSize->10], Cell[BoxData[ \({{\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.3249980731779214`\)\(\[InvisibleSpace]\)\) + 3.665182463230208`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.0534698931466607`\)\(\ \[InvisibleSpace]\)\) - 7.246659962188649`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.02595054524675051`\)\(\ \[InvisibleSpace]\)\) + 5.439847361849798`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.02994773271024807`\)\(\ \[InvisibleSpace]\)\) + 7.780782423135376`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.6064458045866226`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.040812048868203436`\)\(\ \[InvisibleSpace]\)\) + 1.5265566588595902`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.5110174881069576`\)\(\ \[InvisibleSpace]\)\) + 1.6653345369377348`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.14888589285526888`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.00034156106286230005`\)\(\[InvisibleSpace]\)\) - 1.4240027808040967`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.02832740312479886`\)\(\ \[InvisibleSpace]\)\) - 8.364770742237723`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.002008720553490502`\)\(\ \[InvisibleSpace]\)\) - 4.492183002479031`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.006924742397414945`\)\(\ \[InvisibleSpace]\)\) + 2.309742856086418`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.23297703179522514`\)\(\ \[InvisibleSpace]\)\) + 1.0408340855860843`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.2520294109062564`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.06338068714629078`\)\(\ \[InvisibleSpace]\)\) - 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.22877231520232572`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.34268033489619193`\) - 1.6275523067348065`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.3227687509866068`\)\(\ \[InvisibleSpace]\)\) + 7.98950748473974`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(20.49683685636667`\ t\) - \ \((\(\(0.02108797832598047`\)\(\[InvisibleSpace]\)\) - 3.4331991536451748`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.02190763876388462`\)\(\ \[InvisibleSpace]\)\) + 1.040498224564724`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.04134525099595902`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.060437174467640006`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.3281863329337648`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.1485906681774951`\)\(\ \[InvisibleSpace]\)\) - 1.0408340855860843`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.501168039279754`\)\(\[InvisibleSpace]\)\) - 1.8983371001707693`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.25171856519365554`\)\(\ \[InvisibleSpace]\)\) - 2.813199065354559`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.0240201203807975`\)\(\ \[InvisibleSpace]\)\) + 3.61215739939259`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(32.40076750205705`\ t\) - \((\(\(0.0055359452967952685`\)\(\ \[InvisibleSpace]\)\) + 1.0411239536269232`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.13380722872639728`\)\(\ \[InvisibleSpace]\)\) + 3.469446951953614`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.08608617968210824`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.03886631860383598`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.15010418187741764`\)\(\ \[InvisibleSpace]\)\) - 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.6191613451850448`\) - 5.12481869923787`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(14.921565452807418`\ t\) + \((\(\(0.559096567148231`\)\(\[InvisibleSpace]\ \)\) + 8.410031271496315`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.02190875824023639`\)\(\ \[InvisibleSpace]\)\) - 1.9231615450926204`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.0205636168166042`\)\(\ \[InvisibleSpace]\)\) - 1.4555722833400316`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.02363068380713236`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.1261678369007868`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.6608340989897916`\)\(\ \[InvisibleSpace]\)\) + 1.5612511283791264`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.15779405749516467`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.09925722118468575`\) - 1.9990874947222335`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.31707527470256164`\)\(\ \[InvisibleSpace]\)\) + 1.4218481708646142`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.018811853856159303`\)\(\ \[InvisibleSpace]\)\) - 8.521535923192717`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.03338406764154903`\)\(\ \[InvisibleSpace]\)\) + 2.662076450272723`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.08762963036581858`\)\(\ \[InvisibleSpace]\)\) + 3.469446951953614`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.1823843446497657`\)\(\ \[InvisibleSpace]\)\) + 3.8163916471489756`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.05489055939153838`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.05509841090263898`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.6962869706491439`\)\(\[InvisibleSpace]\)\) + 3.1664232361216`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.882420146862918`\)\(\ \[InvisibleSpace]\)\) + 5.616435723588615`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.005001604818454416`\)\(\ \[InvisibleSpace]\)\) - 3.316690662411287`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.002388629052531629`\)\(\ \[InvisibleSpace]\)\) + 8.611100410678538`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.043296562676994596`\)\(\ \[InvisibleSpace]\)\) + 2.42861286636753`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.1502268474077657`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.026598881581494916`\)\(\ \[InvisibleSpace]\)\) - 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.2647947131787398`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.1506742650360491`\)\(\[InvisibleSpace]\)\) + 5.696011123216386`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.6953642278311678`\)\(\ \[InvisibleSpace]\)\) + 8.364770742237723`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \ \((\(\(0.0018139046889622896`\)\(\[InvisibleSpace]\)\) - 5.989577336638708`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \ \((\(\(0.0048582674331549705`\)\(\[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.5251141037946192`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.01653149625630662`\)\(\ \[InvisibleSpace]\)\) - 5.898059818321144`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.29519473434769755`\)\(\ \[InvisibleSpace]\)\) + 1.6653345369377348`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.02954801230106938`\)\(\ \[InvisibleSpace]\)\) - 5.204170427930421`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}, \ {\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.08131406178097929`\) - 9.170235082917089`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.01729285744826736`\)\(\ \[InvisibleSpace]\)\) - 2.3436638887321402`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.021901987300473387`\)\(\ \[InvisibleSpace]\)\) + 4.5911739696747565`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.2522316068980029`\)\(\ \[InvisibleSpace]\)\) + 6.553281587288869`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.28088608083442945`\)\(\ \[InvisibleSpace]\)\) - 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.10535940586519973`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.5832301176280503`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.3209767362683426`\)\(\ \[InvisibleSpace]\)\) + 1.5265566588595902`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.00008545809855419419`\) + 3.5628349719845935`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \ \((\(\(0.009161449841934888`\)\(\[InvisibleSpace]\)\) - 2.705275427354921`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.001695339024071482`\)\(\ \[InvisibleSpace]\)\) - 3.791355215706618`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.05832290942202124`\)\(\ \[InvisibleSpace]\)\) + 1.9453564573604546`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.19468842340207845`\)\(\ \[InvisibleSpace]\)\) + 3.9898639947466563`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.7362173364084482`\)\(\ \[InvisibleSpace]\)\) - 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.03064953144112246`\)\(\ \[InvisibleSpace]\)\) + 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.11304216843294984`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.08573813884619856`\)\(\[InvisibleSpace]\)\) + 4.072113029087339`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.10438760339874135`\)\(\ \[InvisibleSpace]\)\) + 2.583910419205651`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.01779803195257012`\)\(\ \[InvisibleSpace]\)\) - 2.897583983232424`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.1845147671851858`\)\(\ \[InvisibleSpace]\)\) + 8.76348609411325`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(41.65320395842717`\ t\) - \ \((\(\(0.07887571177512098`\)\(\[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.06919155890495193`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.2582318739159896`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.3441422302658227`\)\(\ \[InvisibleSpace]\)\) - 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.12539154004872002`\) + 4.749612781855025`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.0814090511278332`\)\(\ \[InvisibleSpace]\)\) - 9.098250912404065`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.020272729013350685`\)\(\ \[InvisibleSpace]\)\) + 3.0486228607745317`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.04662591293371223`\)\(\ \[InvisibleSpace]\)\) + 8.768756230866782`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.08666490414667799`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.024216226721271782`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.07365890191137058`\)\(\ \[InvisibleSpace]\)\) + 6.245004513516506`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.37788419195695405`\)\(\ \[InvisibleSpace]\)\) - 5.204170427930421`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.1549132995850366`\)\(\[InvisibleSpace]\)\) + 1.282222445971276`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.18081908652764545`\)\(\ \[InvisibleSpace]\)\) + 2.7199132699695524`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.018490761569138304`\)\(\ \[InvisibleSpace]\)\) - 1.6231281206953322`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.1731948846836061`\)\(\ \[InvisibleSpace]\)\) - 1.2259403392411612`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.20322690028342816`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.4208183334787814`\)\(\ \[InvisibleSpace]\)\) + 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.5000508280352758`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.13554537951569742`\)\(\ \[InvisibleSpace]\)\) - 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.024834017434932177`\)\(\[InvisibleSpace]\)\) + 5.001688855011644`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.10254625927084061`\)\(\ \[InvisibleSpace]\)\) + 4.598441531274506`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.015877006835051163`\)\(\ \[InvisibleSpace]\)\) - 7.192086709379074`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.28117377390436127`\)\(\ \[InvisibleSpace]\)\) + 2.242105695393254`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.04691957117157615`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.26625811007508016`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.07016210187834773`\)\(\ \[InvisibleSpace]\)\) + 1.0408340855860843`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.32083464981392606`\)\(\ \[InvisibleSpace]\)\) + 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.1742100228319191`\) - 7.922346496674909`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.28538612873836605`\)\(\ \[InvisibleSpace]\)\) + 1.8164282107124403`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.004221301871470011`\)\(\ \[InvisibleSpace]\)\) - 2.799252041797727`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.020117975208091013`\)\(\ \[InvisibleSpace]\)\) + 7.25260811815062`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(41.65320395842717`\ t\) - \((\(\(0.041133335095260216`\)\(\ \[InvisibleSpace]\)\) + 2.6020852139652106`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.0457034937316257`\)\(\ \[InvisibleSpace]\)\) - 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.005341367377520289`\)\(\ \[InvisibleSpace]\)\) - 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.6646398734477774`\)\(\ \[InvisibleSpace]\)\) - 1.734723475976807`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.037698489643775764`\) - 1.4251339887938373`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.22488981665862678`\)\(\ \[InvisibleSpace]\)\) + 2.705275427354921`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \ \((\(\(0.0015309164830321202`\)\(\[InvisibleSpace]\)\) - 5.0551402876088244`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.04091824290209393`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.2924343335478524`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.06585568011393958`\)\(\ \[InvisibleSpace]\)\) - 1.1449174941446927`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.3953187443282412`\)\(\ \[InvisibleSpace]\)\) + 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.033950635590718384`\)\(\ \[InvisibleSpace]\)\) + 6.245004513516506`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}, \ {\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.054066443435281435`\) - 6.097370928711206`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.02167915231771618`\)\(\ \[InvisibleSpace]\)\) - 2.93812902681655`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(20.49683685636667`\ t\) - \((\(\(0.5796212639745224`\)\(\[InvisibleSpace]\ \)\) + 1.2150231040323407`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.4583862936413038`\)\(\ \[InvisibleSpace]\)\) + 1.1909429174749983`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.3537425607375898`\)\(\ \[InvisibleSpace]\)\) + 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.20012029928680553`\)\(\ \[InvisibleSpace]\)\) + 9.367506770274758`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.3533212033902381`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.062468810307888534`\)\(\ \[InvisibleSpace]\)\) - 1.8041124150158794`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.00005682185037087691`\) + 2.3689606848185613`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \ \((\(\(0.011485231238884876`\)\(\[InvisibleSpace]\)\) - 3.39146252876087`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(20.49683685636667`\ t\) - \((\(\(0.0448659993504976`\)\(\[InvisibleSpace]\ \)\) - 1.0033564864028438`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.10599156312376276`\)\(\ \[InvisibleSpace]\)\) + 3.5353409799321076`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.027226312026696616`\)\(\ \[InvisibleSpace]\)\) - 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.07680982271070604`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.14976284696737494`\)\(\ \[InvisibleSpace]\)\) + 5.898059818321144`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.4557994074408622`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.05700805165360259`\)\(\[InvisibleSpace]\)\) + 2.7075841979489373`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.13086528706621608`\)\(\ \[InvisibleSpace]\)\) + 3.239313555950567`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.47101286449858626`\)\(\ \[InvisibleSpace]\)\) - 7.668259814931079`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.33532292519671153`\)\(\ \[InvisibleSpace]\)\) + 1.5926084599231423`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.2083760917853075`\)\(\ \[InvisibleSpace]\)\) - 5.204170427930421`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.21416696337019123`\)\(\ \[InvisibleSpace]\)\) - 1.0408340855860843`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.008242297981390735`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.03981686432959143`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.0833739510586443`\) + 3.158059813828202`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.10205827606691284`\)\(\ \[InvisibleSpace]\)\) - 1.1406002041297717`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.5365040465838149`\)\(\ \[InvisibleSpace]\)\) + 8.067973977437042`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.0847343426946851`\)\(\ \[InvisibleSpace]\)\) + 1.5935662139822564`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.03164090731796318`\)\(\ \[InvisibleSpace]\)\) + 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.23469656944560963`\)\(\ \[InvisibleSpace]\)\) - 3.2959746043559335`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.08194848840530082`\)\(\ \[InvisibleSpace]\)\) + 1.734723475976807`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.0116040912269195`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.10300323174049561`\)\(\[InvisibleSpace]\)\) + 8.525611170830788`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.22668344607072954`\)\(\ \[InvisibleSpace]\)\) + 3.4098132276314693`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.489345484750775`\)\(\ \[InvisibleSpace]\)\) - 4.2954986686969964`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.31475104267902043`\)\(\ \[InvisibleSpace]\)\) - 2.2279295415873904`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.416364272409053`\)\(\ \[InvisibleSpace]\)\) + 1.0408340855860843`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.08791684747392679`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.020853471225448825`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.25989043192554406`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.01651235923416422`\)\(\[InvisibleSpace]\)\) + 3.3256674385391624`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.12855689009148177`\)\(\ \[InvisibleSpace]\)\) + 5.764826008590063`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.4201742354980537`\)\(\ \[InvisibleSpace]\)\) - 1.903337049699851`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.5109835586199034`\)\(\ \[InvisibleSpace]\)\) + 4.0746301873221316`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.039211773070532224`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.19666679937696327`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.052077499677423464`\)\(\ \[InvisibleSpace]\)\) + 3.469446951953614`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.16811869782049915`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.11583379478288812`\) - 5.267638700559517`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.3577736862048956`\)\(\ \[InvisibleSpace]\)\) + 2.2771611905108926`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.11171389576627964`\)\(\ \[InvisibleSpace]\)\) - 7.408030990023415`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.036560858508638765`\)\(\ \[InvisibleSpace]\)\) + 1.3180331344660741`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.014368710250777947`\)\(\ \[InvisibleSpace]\)\) - 2.949029909160572`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.41282315398092073`\)\(\ \[InvisibleSpace]\)\) - 1.214306433183765`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.02863254681634303`\)\(\ \[InvisibleSpace]\)\) + 1.1275702593849246`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.022340113722981295`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.025066061309429254`\) - 9.475842739274245`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.2819326189804522`\)\(\ \[InvisibleSpace]\)\) + 3.39146252876087`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(20.49683685636667`\ t\) + \ \((\(\(0.04051466813312091`\)\(\[InvisibleSpace]\)\) - 1.337808648537125`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.07436166282598396`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.21378511343491718`\)\(\ \[InvisibleSpace]\)\) + 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.0216627641041405`\)\(\ \[InvisibleSpace]\)\) + 3.8163916471489756`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.3138927436680393`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.040556017936432084`\)\(\ \[InvisibleSpace]\)\) - 7.28583859910259`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}, \ {\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.2338659293910256`\)\(\[InvisibleSpace]\)\) + 2.6374350308279058`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.0076366805815051555`\)\ \(\[InvisibleSpace]\)\) - 1.034982943807754`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.45010116688133195`\)\(\ \[InvisibleSpace]\)\) + 9.435183815767895`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.07999953542607527`\)\(\ \[InvisibleSpace]\)\) + 2.0784844887078806`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.07834029435722778`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.2069393158399538`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.07295567074517828`\)\(\ \[InvisibleSpace]\)\) + 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.11093964658691224`\)\(\ \[InvisibleSpace]\)\) - 1.6653345369377348`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.0002457845199788246`\)\(\[InvisibleSpace]\)\) - 1.0247006406276102`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.00404577822465931`\)\(\ \[InvisibleSpace]\)\) - 1.1946738348770883`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.034840403408394796`\)\(\ \[InvisibleSpace]\)\) - 7.791500301957937`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.018498100677547202`\)\(\ \[InvisibleSpace]\)\) + 6.1700282030825924`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.0318344240717863`\)\(\ \[InvisibleSpace]\)\) + 1.3444106938820255`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.011692127636258022`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.006985312549314905`\)\(\ \[InvisibleSpace]\)\) - 1.734723475976807`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.5175610160214839`\)\(\ \[InvisibleSpace]\)\) - 3.642919299551295`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.24658993889065983`\) - 1.1711731984289837`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.04609849969617958`\)\(\ \[InvisibleSpace]\)\) + 1.1410779613333204`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.36576201237546574`\)\(\ \[InvisibleSpace]\)\) - 5.954737869660726`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.05852199030724319`\)\(\ \[InvisibleSpace]\)\) + 2.7794883633494456`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.00337708351105158`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.22716964699928033`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.04452308105263927`\)\(\ \[InvisibleSpace]\)\) - 1.0842021724855044`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.08898779567838278`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.3606363820596338`\)\(\[InvisibleSpace]\)\) - 1.3660276994499469`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.03595096540675956`\)\(\ \[InvisibleSpace]\)\) - 4.0178690118895996`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.4166187688630864`\)\(\ \[InvisibleSpace]\)\) + 6.265133333293745`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.014788199700214279`\)\(\ \[InvisibleSpace]\)\) + 2.7811598766744393`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.017779776043826963`\)\(\ \[InvisibleSpace]\)\) + 3.903127820947816`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.2557042381404264`\)\(\ \[InvisibleSpace]\)\) - 3.469446951953614`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.006135780709720281`\)\(\ \[InvisibleSpace]\)\) + 1.0408340855860843`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.062287322505539346`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.44554339051550756`\) - 3.6877772115333034`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.07985132653652471`\)\(\ \[InvisibleSpace]\)\) + 1.2011380371516225`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.37999809079488206`\)\(\ \[InvisibleSpace]\)\) - 3.335641880803583`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.0549316974318133`\)\(\ \[InvisibleSpace]\)\) - 3.88827787308342`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(41.65320395842717`\ t\) - \((\(\(0.0012381826195672725`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.041863853235481155`\)\(\ \[InvisibleSpace]\)\) - 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.08925226753350876`\)\(\ \[InvisibleSpace]\)\) + 2.2768245622195593`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.3044160301298687`\)\(\ \[InvisibleSpace]\)\) + 7.28583859910259`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.07142467662698772`\) - 1.438526851299969`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.04528534565339199`\)\(\ \[InvisibleSpace]\)\) + 2.030712925965243`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.32628360180288085`\)\(\ \[InvisibleSpace]\)\) - 1.4780241517778948`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.08917903494719927`\)\(\ \[InvisibleSpace]\)\) + 7.111218780767239`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.011446805817129103`\)\(\ \[InvisibleSpace]\)\) + 8.673617379884035`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.2517970920121486`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.007987033711018221`\)\(\ \[InvisibleSpace]\)\) + 1.734723475976807`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.14342217140335745`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.5010423536405942`\)\(\[InvisibleSpace]\)\) + 2.2785320101129254`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.1260290680176499`\)\(\ \[InvisibleSpace]\)\) + 8.021509508155742`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.08675070768879203`\)\(\ \[InvisibleSpace]\)\) - 5.752658848363389`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.006380757313302927`\)\(\ \[InvisibleSpace]\)\) + 2.3002877681148593`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \ \((\(\(0.0060153412415405155`\)\(\[InvisibleSpace]\)\) + 2.8189256484623115`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.449367894756893`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.0032962203676672637`\)\(\ \[InvisibleSpace]\)\) - 5.637851296924623`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.1116829475010102`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.10842395674350475`\)\(\[InvisibleSpace]\)\) + 4.0988025625104406`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.09931335529671323`\)\(\ \[InvisibleSpace]\)\) + 1.1946738348770883`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.03146140512079142`\)\(\ \[InvisibleSpace]\)\) - 1.0388667069277249`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.012977915269526574`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.06881997215364141`\)\(\ \[InvisibleSpace]\)\) + 3.469446951953614`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.015270050316531794`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.04331382052836896`\)\(\ \[InvisibleSpace]\)\) + 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.049180378788293753`\)\(\ \[InvisibleSpace]\)\) - 7.112366251504909`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}, \ {\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.07947714644481685`\)\(\[InvisibleSpace]\)\) + 8.96307601238145`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(14.921565452807418`\ t\) + \((\(\(0.00031178421450969403`\)\(\ \[InvisibleSpace]\)\) - 4.2255446030771445`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.23156490941833002`\)\(\ \[InvisibleSpace]\)\) + 4.854147570383035`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.13553541676657785`\)\(\ \[InvisibleSpace]\)\) + 3.5213737169787275`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.3097843795746217`\)\(\ \[InvisibleSpace]\)\) + 2.220446049250313`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.13396595626354296`\)\(\ \[InvisibleSpace]\)\) - 6.245004513516506`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(1.4181602547659093`\)\(\ \[InvisibleSpace]\)\) + 2.498001805406602`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.09223143138765216`\)\(\ \[InvisibleSpace]\)\) + 1.5265566588595902`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.00008352756786374232`\)\(\[InvisibleSpace]\)\) - 3.482349185677639`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.0001651777591576587`\)\ \(\[InvisibleSpace]\)\) - 4.877517649546928`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.01792444777529332`\)\(\ \[InvisibleSpace]\)\) - 4.0085167389300804`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.03133952930312005`\)\(\ \[InvisibleSpace]\)\) + 1.0453277503581184`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.3014936600868853`\)\(\ \[InvisibleSpace]\)\) - 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.3149903918060061`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.32313618013361134`\)\(\ \[InvisibleSpace]\)\) + 2.498001805406602`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.17139814739751277`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.08380128193988857`\) - 3.980122459315222`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.0018820722386448051`\)\ \(\[InvisibleSpace]\)\) + 4.6587007544907904`*^-20\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.18817468937315854`\)\(\ \[InvisibleSpace]\)\) - 3.0635520119889653`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.09914810509907689`\)\(\ \[InvisibleSpace]\)\) + 4.70901626763237`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(41.65320395842717`\ t\) + \ \((\(\(0.49610877691136135`\)\(\[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.12686677273788202`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.34708369909751235`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.11165302931495312`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.12255889784765855`\)\(\[InvisibleSpace]\)\) - 4.6423172370411084`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.0014677769209514952`\)\ \(\[InvisibleSpace]\)\) - 1.640383044052808`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.21433911878569287`\)\(\ \[InvisibleSpace]\)\) + 3.2232421054807484`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.025054205614081962`\)\(\ \[InvisibleSpace]\)\) + 4.7118481497667754`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.0512842888123754`\)\(\ \[InvisibleSpace]\)\) - 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.11947808105727928`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.24983724116969405`\)\(\ \[InvisibleSpace]\)\) + 1.1449174941446927`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.13769468186724293`\)\(\ \[InvisibleSpace]\)\) - 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.15141374969722318`\) - 1.2532565571226722`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \ \((\(\(0.003260105337133334`\)\(\[InvisibleSpace]\)\) + 4.903909171453428`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.19549876771871302`\)\(\ \[InvisibleSpace]\)\) - 1.7160977727123193`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.09306542176105767`\)\(\ \[InvisibleSpace]\)\) - 6.587530280342761`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(1.049854524760911`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.20073246555683408`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.6023457241673054`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.07079869102749282`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.024273007610977927`\) - 4.88869881659454`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(14.921565452807418`\ t\) + \((\(\(0.0018488734434614741`\)\(\ \[InvisibleSpace]\)\) + 8.290830391022665`*^-20\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.16786411201660062`\)\(\ \[InvisibleSpace]\)\) - 7.604035581511564`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.15108734824565268`\)\(\ \[InvisibleSpace]\)\) + 1.204784497855287`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.014079069310873008`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.008431698914304318`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.1887444365307612`\)\(\ \[InvisibleSpace]\)\) + 1.6479873021779667`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.20055099095519685`\)\(\ \[InvisibleSpace]\)\) + 4.7704895589362195`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.1702745526851306`\)\(\[InvisibleSpace]\)\) + 7.743377700142118`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \ \((\(\(0.005145412795244492`\)\(\[InvisibleSpace]\)\) + 3.2749569848965043`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.04463089910901612`\)\(\ \[InvisibleSpace]\)\) - 2.959587806372053`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.010810295299077705`\)\(\ \[InvisibleSpace]\)\) + 3.897153398129476`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.08002663367959872`\)\(\ \[InvisibleSpace]\)\) - 4.85722573273506`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.21133516975954633`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.04740138828990255`\)\(\ \[InvisibleSpace]\)\) + 7.632783294297951`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.24127643475880012`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.03684686653874215`\)\(\[InvisibleSpace]\)\) + 1.3929396742710556`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \ \((\(\(0.004054685296972963`\)\(\[InvisibleSpace]\)\) + 4.877517649546928`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.016186044300769867`\)\(\ \[InvisibleSpace]\)\) - 5.344688985240107`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.02198721711880462`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.029747326997228735`\)\(\ \[InvisibleSpace]\)\) + 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.0351284071750341`\)\(\ \[InvisibleSpace]\)\) - 2.6020852139652106`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(1.1022429916233243`\)\(\ \[InvisibleSpace]\)\) + 1.8214596497756474`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.006199811733960985`\)\(\ \[InvisibleSpace]\)\) - 5.898059818321144`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}, \ {\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.07627898392971585`\) - 8.602401592059849`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.04730555142141996`\)\(\ \[InvisibleSpace]\)\) - 6.41121994642081`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(20.49683685636667`\ t\) + \ \((\(\(0.46119060036034704`\)\(\[InvisibleSpace]\)\) + 9.667644540125057`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.422328983764606`\)\(\ \[InvisibleSpace]\)\) + 1.097261674347651`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.9876451518151237`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.22771010304130657`\)\(\ \[InvisibleSpace]\)\) + 2.0816681711721685`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.7971918379214733`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.18150429202374102`\)\(\ \[InvisibleSpace]\)\) - 1.8041124150158794`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.00008016641628157203`\) + 3.342219360585598`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \ \((\(\(0.025061643969998347`\)\(\[InvisibleSpace]\)\) - 7.400427964012643`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.03569878895459647`\)\(\ \[InvisibleSpace]\)\) - 7.983464532797331`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.09765411785350844`\)\(\ \[InvisibleSpace]\)\) + 3.2572460914035424`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.02861704199868873`\)\(\ \[InvisibleSpace]\)\) - 1.942890293094024`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.12971734236313295`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.38536206510514004`\)\(\ \[InvisibleSpace]\)\) + 1.3010426069826053`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.6287954346874374`\)\(\ \[InvisibleSpace]\)\) - 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.0804291160959167`\)\(\[InvisibleSpace]\)\) + 3.819962224275434`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.28555796259297345`\)\(\ \[InvisibleSpace]\)\) + 7.068427387997858`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.3747735275721322`\)\(\ \[InvisibleSpace]\)\) - 6.101448596824837`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.3089459527821744`\)\(\ \[InvisibleSpace]\)\) + 1.46733164089889`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(41.65320395842717`\ t\) + \((\(\(0.5282435598665508`\)\(\[InvisibleSpace]\ \)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.2572871385795362`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.035006997741558625`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.1592367390996131`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.11762712449491715`\) + 4.455510266297378`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.22269888396510074`\)\(\ \[InvisibleSpace]\)\) - 2.4888759863387118`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.42688327485276856`\)\(\ \[InvisibleSpace]\)\) + 6.419491474193741`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.07806902024913355`\)\(\ \[InvisibleSpace]\)\) + 1.4682140566780992`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.1018262132655658`\)\(\ \[InvisibleSpace]\)\) + 1.249000902703301`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.2980543223661528`\)\(\ \[InvisibleSpace]\)\) - 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.19840004543525863`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.13302850663399185`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.14532085632832537`\)\(\[InvisibleSpace]\)\) + 1.2028254794848104`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.4946404387647776`\)\(\ \[InvisibleSpace]\)\) + 7.440470578055847`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.3893603494604624`\)\(\ \[InvisibleSpace]\)\) - 3.417824246611003`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.2899922834461973`\)\(\ \[InvisibleSpace]\)\) - 2.0526774736725323`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(1.0455067179677842`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.016834502624672214`\)\(\ \[InvisibleSpace]\)\) + 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.16416832006753065`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.3807139696149816`\)\(\ \[InvisibleSpace]\)\) + 7.28583859910259`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.02329626113047751`\)\(\[InvisibleSpace]\)\) + 4.691977444448813`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.28052086565352774`\)\(\ \[InvisibleSpace]\)\) + 1.2579286735396916`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.334322461871956`\)\(\ \[InvisibleSpace]\)\) - 1.514439188479721`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.47078887398242314`\)\(\ \[InvisibleSpace]\)\) + 3.754114052055248`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.11293746092956632`\)\(\ \[InvisibleSpace]\)\) + 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.33917580773910483`\)\(\ \[InvisibleSpace]\)\) + 9.020562075079397`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.12096422840560636`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.11880037706215757`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.16342270009564083`\) - 7.431783972779773`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.7806892659804704`\)\(\ \[InvisibleSpace]\)\) + 4.968938093789965`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.0888880409661927`\)\(\ \[InvisibleSpace]\)\) - 5.89439082401768`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(32.40076750205705`\ t\) - \ \((\(\(0.03368493001144928`\)\(\[InvisibleSpace]\)\) + 1.2143547963122994`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.028603813676255564`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.5232974085834432`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.07613025508548882`\)\(\ \[InvisibleSpace]\)\) + 2.2551405187698492`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.23649013872847546`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.03536414763608306`\) - 1.3368877442342391`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.6151983162947021`\)\(\ \[InvisibleSpace]\)\) + 7.400427964012643`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.03223654010135757`\)\(\ \[InvisibleSpace]\)\) - 1.0644619377063107`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.0685122699522058`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.6237679758733159`\)\(\ \[InvisibleSpace]\)\) + 2.220446049250313`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.007658077363848504`\)\(\ \[InvisibleSpace]\)\) + 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.7351446248340335`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.06340440599131444`\)\(\ \[InvisibleSpace]\)\) - 7.37257477290143`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}, \ {\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.26370308261188663`\)\(\[InvisibleSpace]\)\) + 2.9739250588101453`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \ \((\(\(0.010491838327412031`\)\(\[InvisibleSpace]\)\) - 1.4219363507697857`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.32419540262236635`\)\(\ \[InvisibleSpace]\)\) + 6.795901546230305`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.05163103406617963`\)\(\ \[InvisibleSpace]\)\) + 1.3414365829870081`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.5122564286825139`\)\(\ \[InvisibleSpace]\)\) + 2.220446049250313`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.11678125229050695`\)\(\ \[InvisibleSpace]\)\) + 1.3183898417423734`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.9730267485302592`\)\(\ \[InvisibleSpace]\)\) + 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.11626134195594784`\)\(\ \[InvisibleSpace]\)\) - 9.020562075079397`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.00027714227440256667`\)\(\[InvisibleSpace]\)\) - 1.1554343054223666`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \ \((\(\(0.005558390270308165`\)\(\[InvisibleSpace]\)\) - 1.6413315439532616`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.02509457748970498`\)\(\ \[InvisibleSpace]\)\) - 5.612001841558229`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.01193852015709031`\)\(\ \[InvisibleSpace]\)\) + 3.9820848289428`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.1549649503502068`\)\(\ \[InvisibleSpace]\)\) - 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.11209632015870091`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.2967622945714566`\)\(\ \[InvisibleSpace]\)\) + 1.6653345369377348`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.3455989355634861`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.27805045051183536`\) - 1.3205941690709454`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.06333353880479338`\)\(\ \[InvisibleSpace]\)\) + 1.5676975567468985`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.26344824584134874`\)\(\ \[InvisibleSpace]\)\) - 4.2890327402201174`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.037769605274345815`\)\(\ \[InvisibleSpace]\)\) + 1.7938586469324637`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.4322595670111616`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.13480306287247013`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.15336353839622419`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.10557756986439801`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.4066472012351746`\)\(\[InvisibleSpace]\)\) - 1.5403086555454372`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \ \((\(\(0.049392103380047514`\)\(\[InvisibleSpace]\)\) - 5.520046523296629`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.30007895879819546`\)\(\ \[InvisibleSpace]\)\) + 4.5126019946655144`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.009544180955960447`\)\(\ \[InvisibleSpace]\)\) + 1.7949374277149417`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.012947984528793987`\)\(\ \[InvisibleSpace]\)\) + 8.326672684688674`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.15936414938986004`\)\(\ \[InvisibleSpace]\)\) - 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.19277095624907903`\)\(\ \[InvisibleSpace]\)\) + 6.505213034913027`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.0933737840181996`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.5023868411368501`\) - 4.1582723109752716`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.10970567634838531`\)\(\ \[InvisibleSpace]\)\) + 1.6502125445995837`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.27370209878495383`\)\(\ \[InvisibleSpace]\)\) - 2.402570448870339`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.0354524601462947`\)\(\ \[InvisibleSpace]\)\) - 2.5094621644328654`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.8880831536803022`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.03316392273618157`\)\(\ \[InvisibleSpace]\)\) + 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.22805466425536414`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.21308868573996026`\)\(\ \[InvisibleSpace]\)\) + 3.8163916471489756`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.08053720116538106`\) - 1.6220574159543647`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.0622163674551273`\)\(\ \[InvisibleSpace]\)\) + 2.7899440707540853`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.23501304026489972`\)\(\ \[InvisibleSpace]\)\) - 1.0645798549941278`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.05755540662611268`\)\(\ \[InvisibleSpace]\)\) + 4.589521391172687`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.048351999639900625`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.19816687791040466`\)\(\ \[InvisibleSpace]\)\) + 5.204170427930421`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.13497768336313798`\)\(\ \[InvisibleSpace]\)\) + 1.0408340855860843`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.04571058103187137`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.5649664896386997`\)\(\[InvisibleSpace]\)\) + 2.569232365147132`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.1731480833960692`\)\(\ \[InvisibleSpace]\)\) + 1.1020544856254919`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.06248413173822768`\)\(\ \[InvisibleSpace]\)\) - 4.143480818804422`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.004118087642091331`\)\(\ \[InvisibleSpace]\)\) + 1.4845865727220662`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.04887256087438513`\)\(\ \[InvisibleSpace]\)\) - 5.204170427930421`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.2796150854711651`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.050753798875096706`\)\(\ \[InvisibleSpace]\)\) + 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.1655856937740118`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.12225693454660712`\)\(\[InvisibleSpace]\)\) + 4.621737221689466`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.13644405529405748`\)\(\ \[InvisibleSpace]\)\) + 1.6413315439532616`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.02266077862199692`\)\(\ \[InvisibleSpace]\)\) - 7.482669122077638`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.008375838457313304`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.24405490111141576`\)\(\ \[InvisibleSpace]\)\) + 1.6653345369377348`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \ \((\(\(0.00036114856456518024`\)\(\[InvisibleSpace]\)\) + 5.204170427930421`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.798836412919359`\)\(\ \[InvisibleSpace]\)\) + 9.71445146547012`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.03613908280347729`\)\(\ \[InvisibleSpace]\)\) - 3.640208794120081`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}, \ {\[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.3869713285708968`\) - 4.364089034073998`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.07278608098695717`\)\(\ \[InvisibleSpace]\)\) - 9.86454148030673`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(20.49683685636667`\ t\) - \ \((\(\(0.11992986448004768`\)\(\[InvisibleSpace]\)\) + 2.5140132921888557`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.19391861285558373`\)\(\ \[InvisibleSpace]\)\) + 5.038239619085411`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.20125894177242937`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.18450971940988842`\)\(\ \[InvisibleSpace]\)\) + 1.1796119636642288`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.19444290882845566`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.08861337790677942`\)\(\ \[InvisibleSpace]\)\) - 1.6653345369377348`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.00040669268279493`\) + 1.6955431230348846`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \ \((\(\(0.038560777601265125`\)\(\[InvisibleSpace]\)\) - 1.1386573730601663`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.009283257113396032`\)\(\ \[InvisibleSpace]\)\) - 2.0760523279345932`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.04483933568798812`\)\(\ \[InvisibleSpace]\)\) + 1.4956128233109977`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.08354099553329218`\)\(\ \[InvisibleSpace]\)\) + 3.469446951953614`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.009830832040229876`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.01673044464324764`\)\(\ \[InvisibleSpace]\)\) - 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.45118700382128973`\)\(\ \[InvisibleSpace]\)\) - 3.0357660829594124`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.4080253866529934`\)\(\[InvisibleSpace]\)\) + 1.9379071152554207`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.4393701028152768`\)\(\ \[InvisibleSpace]\)\) + 1.0875745295303337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.09745762020586861`\)\(\ \[InvisibleSpace]\)\) - 1.58664531058837`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(32.40076750205705`\ t\) + \ \((\(\(0.14185711356305644`\)\(\[InvisibleSpace]\)\) + 6.7374707240272275`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.006690899569608942`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.20127911803703263`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.11653235575972848`\)\(\ \[InvisibleSpace]\)\) - 3.0357660829594124`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.06871361641430841`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \((\((\(-0.596734805535865`\ \) + 2.260327338391159`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.3426527863418835`\)\(\ \[InvisibleSpace]\)\) - 3.8294771684262646`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.11100844913554161`\)\(\ \[InvisibleSpace]\)\) + 1.6693504636246518`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.03584654782335403`\)\(\ \[InvisibleSpace]\)\) + 6.741522466873308`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.04617681231499117`\)\(\ \[InvisibleSpace]\)\) + 8.673617379884035`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.22509693019678506`\)\(\ \[InvisibleSpace]\)\) - 3.122502256758253`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.016890053840214206`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.04435724919600122`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.7372280272407393`\)\(\[InvisibleSpace]\)\) + 6.102060487119769`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.7610721776525997`\)\(\ \[InvisibleSpace]\)\) + 1.1448184785987403`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.1012508362230536`\)\(\ \[InvisibleSpace]\)\) - 8.887848069592218`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.13315425534718583`\)\(\ \[InvisibleSpace]\)\) - 9.425172877936893`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.007517759871874152`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.04822980966411877`\)\(\ \[InvisibleSpace]\)\) - 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.23322001082885044`\)\(\ \[InvisibleSpace]\)\) + 6.071532165918825`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.2634918139654203`\)\(\ \[InvisibleSpace]\)\) + 6.245004513516506`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(\(0.11818438914579556`\)\(\[InvisibleSpace]\)\) + 2.3802896312515177`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) - \((\(\(0.43161983810516835`\)\(\ \[InvisibleSpace]\)\) + 1.9354958468281874`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) - \((\(\(0.08693856187357579`\)\(\ \[InvisibleSpace]\)\) - 3.9382087686898685`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.21616968974452097`\)\(\ \[InvisibleSpace]\)\) + 1.7237571122562843`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) - \((\(\(0.029535468127339294`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.21373978921576703`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.021424891216273417`\)\(\ \[InvisibleSpace]\)\) + 5.204170427930421`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.13464048770315246`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.8290605893875457`\) - 3.770222372453669`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(1.201197543034517`\)\(\ \[InvisibleSpace]\)\) + 7.645392974956612`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.023114804808777686`\)\(\ \[InvisibleSpace]\)\) - 1.5328011719331155`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) - \((\(\(0.015466934908730986`\)\(\ \[InvisibleSpace]\)\) + 5.5758900446827765`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.015880471001993766`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.395665294549012`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.008326797767312117`\)\(\ \[InvisibleSpace]\)\) - 1.5612511283791264`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.07988635882201672`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\), \ \[ExponentialE]\^\(\(-23.984192726019554`\)\ t\)\ \ \((\((\(-0.17940604986455772`\) - 6.782172492139538`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(14.921565452807418`\ t\) + \((\(\(0.9465670122722731`\)\(\ \[InvisibleSpace]\)\) + 1.1386573730601663`*^-16\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(20.49683685636667`\ t\) + \((\(\(0.008382919952489656`\)\(\ \[InvisibleSpace]\)\) - 2.7680697705794574`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(32.40076750205705`\ t\) + \((\(\(0.031458424269844014`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(41.65320395842717`\ t\) + \((\(\(0.17779754118791702`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.015200152182033633`\)\(\ \[InvisibleSpace]\)\) + 4.85722573273506`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\ \^\(12.54998314286502`\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.11651105545862372`\)\(\ \[InvisibleSpace]\)\) + 4.163336342344337`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(34.327251871276935`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.042239866713740915`\)\(\ \[InvisibleSpace]\)\) - 6.331740687315346`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(12.54998314286502`\ t\)\ Sin[ 10.294271202590972`\ t])\)}}\)], "Output", CellLabel->"Out[34]=", FontSize->10] }, Open ]], Cell[CellGroupData[{ Cell[BoxData[ \(Expand[%]\)], "Input", CellLabel->"In[35]:=", FontSize->10], Cell[BoxData[ \({{\((\(\(0.3249980731779214`\)\(\[InvisibleSpace]\)\) + 3.665182463230208`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-9.062627273212136`\)\ t\) + \ \((\(\(0.0534698931466607`\)\(\[InvisibleSpace]\)\) - 7.246659962188649`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-3.487355869652884`\)\ t\) + \((\(\(0.02595054524675051`\ \)\(\[InvisibleSpace]\)\) + 5.439847361849798`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(8.416574776037496`\ t\) + \((\(\(0.02994773271024807`\)\(\ \[InvisibleSpace]\)\) + 7.780782423135376`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(17.669011232407616`\ t\) + \((\(\(0.6064458045866226`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(10.343059145257381`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.040812048868203436`\)\(\ \[InvisibleSpace]\)\) + 1.5265566588595902`*^-16\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.5110174881069576`\)\(\ \[InvisibleSpace]\)\) + 1.6653345369377348`*^-16\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(10.343059145257381`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.14888589285526888`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Sin[ 10.294271202590972`\ t], \((\(\(0.00034156106286230005`\)\(\ \[InvisibleSpace]\)\) - 1.4240027808040967`*^-16\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-9.062627273212136`\)\ t\) - \((\(\(0.02832740312479886`\)\(\ \[InvisibleSpace]\)\) - 8.364770742237723`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-3.487355869652884`\)\ t\) + \ \((\(\(0.002008720553490502`\)\(\[InvisibleSpace]\)\) - 4.492183002479031`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(8.416574776037496`\ t\) + \((\(\(0.006924742397414945`\)\(\ \[InvisibleSpace]\)\) + 2.309742856086418`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(17.669011232407616`\ t\) - \((\(\(0.23297703179522514`\)\(\ \[InvisibleSpace]\)\) + 1.0408340855860843`*^-16\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(10.343059145257381`\ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.2520294109062564`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-11.434209583154534`\)\ t\)\ Cos[ 10.294271202590972`\ t] + \((\(\(0.06338068714629078`\)\(\ \[InvisibleSpace]\)\) - 1.1102230246251565`*^-16\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(10.343059145257381`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.22877231520232572`\)\(\ \[InvisibleSpace]\)\) - 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Sin[ 10.294271202590972`\ t], \((\(-0.34268033489619193`\) - 1.6275523067348065`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-9.062627273212136`\)\ t\) + \((\(\(0.3227687509866068`\)\(\ \[InvisibleSpace]\)\) + 7.98950748473974`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\^\(\ \(-3.487355869652884`\)\ t\) - \((\(\(0.02108797832598047`\)\(\ \[InvisibleSpace]\)\) - 3.4331991536451748`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(8.416574776037496`\ t\) + \ \((\(\(0.02190763876388462`\)\(\[InvisibleSpace]\)\) + 1.040498224564724`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(17.669011232407616`\ t\) - \((\(\(0.04134525099595902`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \[ExponentialE]\^\(10.343059145257381`\ \ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.060437174467640006`\)\(\ \[InvisibleSpace]\)\) + 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.3281863329337648`\)\(\ \[InvisibleSpace]\)\) - 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(10.343059145257381`\ t\)\ Sin[ 10.001220573893935`\ t] + \((\(\(0.1485906681774951`\)\(\ \[InvisibleSpace]\)\) - 1.0408340855860843`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Sin[ 10.294271202590972`\ t], \((\(\(0.501168039279754`\)\(\ \[InvisibleSpace]\)\) - 1.8983371001707693`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-9.062627273212136`\)\ t\) - \((\(\(0.25171856519365554`\)\(\ \[InvisibleSpace]\)\) - 2.813199065354559`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-3.487355869652884`\)\ t\) - \ \((\(\(0.0240201203807975`\)\(\[InvisibleSpace]\)\) + 3.61215739939259`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(8.416574776037496`\ t\) - \ \((\(\(0.0055359452967952685`\)\(\[InvisibleSpace]\)\) + 1.0411239536269232`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(17.669011232407616`\ t\) - \((\(\(0.13380722872639728`\)\(\[InvisibleSpace]\ \)\) + 3.469446951953614`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(10.343059145257381`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.08608617968210824`\)\(\ \[InvisibleSpace]\)\) - 1.3877787807814457`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.03886631860383598`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(10.343059145257381`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.15010418187741764`\)\(\ \[InvisibleSpace]\)\) - 2.0816681711721685`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Sin[ 10.294271202590972`\ t], \((\(-0.6191613451850448`\) - 5.12481869923787`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\(\ \(-9.062627273212136`\)\ t\) + \((\(\(0.559096567148231`\)\(\[InvisibleSpace]\ \)\) + 8.410031271496315`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-3.487355869652884`\)\ t\) - \((\(\(0.02190875824023639`\ \)\(\[InvisibleSpace]\)\) - 1.9231615450926204`*^-18\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(8.416574776037496`\ t\) - \((\(\(0.0205636168166042`\)\(\[InvisibleSpace]\)\ \) - 1.4555722833400316`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(17.669011232407616`\ t\) - \((\(\(0.02363068380713236`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \[ExponentialE]\^\(10.343059145257381`\ \ t\)\ Cos[ 10.001220573893935`\ t] + \((\(\(0.1261678369007868`\)\(\ \[InvisibleSpace]\)\) + 5.551115123125783`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-11.434209583154534`\)\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.6608340989897916`\)\(\ \[InvisibleSpace]\)\) + 1.5612511283791264`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(10.343059145257381`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.15779405749516467`\)\(\ \[InvisibleSpace]\)\) + 0.`\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-11.434209583154534`\)\ t\)\ Sin[ 10.294271202590972`\ t], \((\(-0.09925722118468575`\) - 1.9990874947222335`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-9.062627273212136`\)\ t\) + \((\(\(0.31707527470256164`\)\(\ \[InvisibleSpace]\)\) + 1.4218481708646142`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-3.487355869652884`\)\ t\) + \((\(\(0.018811853856159303`\)\(\ \[InvisibleSpace]\)\) - 8.521535923192717`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(8.416574776037496`\ t\) + \((\(\(0.03338406764154903`\)\(\ \[InvisibleSpace]\)\) + 2.662076450272723`*^-19\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(17.669011232407616`\ t\) - \((\(\(0.08762963036581858`\)\(\ \[InvisibleSpace]\)\) + 3.469446951953614`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(10.343059145257381`\ t\)\ Cos[ 10.001220573893935`\ t] - \((\(\(0.1823843446497657`\)\(\ \[InvisibleSpace]\)\) + 3.8163916471489756`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Cos[ 10.294271202590972`\ t] - \((\(\(0.05489055939153838`\)\(\ \[InvisibleSpace]\)\) + 6.938893903907228`*^-18\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(10.343059145257381`\ t\)\ Sin[ 10.001220573893935`\ t] - \((\(\(0.05509841090263898`\)\(\ \[InvisibleSpace]\)\) + 2.7755575615628914`*^-17\ \[ImaginaryI])\)\ \[ExponentialE]\^\ \(\(-11.434209583154534`\)\ t\)\ Sin[ 10.294271202590972`\ t], \((\(\(0.6962869706491439`\)\(\ \[InvisibleSpace]\)\) + 3.1664232361216`*^-17\ \[ImaginaryI])\)\ \ \[ExponentialE]\^\(\(-9.062627273212136`\)\ t\) - \((\(\(0.882420146862918`\)\ \(\[InvisibleSpace]\)\) +