tomleslie

Yes...

Answered: tomleslie 13749

August 12 2023

0 0

Any problem saving to an Excel sheet is probably caused by he typeset headers in row 1 - so just don't output this row.

The following works just fine for me, although you will have to change the file paths to somethig appropriate for your machine.

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diff(diff(diff(f(x), x), x), x)+f(x)*(diff(diff(f(x), x), x))-(diff(f(x), x))*(diff(f(x), x)-lambda) = 0

(1)

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(2)

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(3)

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$proc (x_bvp) local res, data, solnproc, _ndsol, outpoint, i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; _EnvDSNumericSaveDigits := Digits; Digits := 15; if _EnvInFsolve = true then outpoint := evalf[_EnvDSNumericSaveDigits](x_bvp) else outpoint := evalf(x_bvp) end if; data := Array(1..4, {(1) = proc (outpoint) local X, Y, YP, yout, errproc, L, V, i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; X := Vector(15, {(1) = .0, (2) = .45884128660916607, (3) = .9251421721231284, (4) = 1.401244238977895, (5) = 1.891536505380774, (6) = 2.3948746631301048, (7) = 2.906535879536887, (8) = 3.4244168392907524, (9) = 3.944232981227012, (10) = 4.465274846431488, (11) = 4.9866275238674245, (12) = 5.508155422287264, (13) = 6.0296538384388905, (14) = 6.530766339216415, (15) = 7.0}, datatype = float[8], order = C_order); Y := Matrix(15, 3, {(1, 1) = .0, (1, 2) = 1.0, (1, 3) = -1.000172555152507, (2, 1) = .3679661670444895, (2, 2) = .6319340558265536, (2, 3) = -.6322009415220234, (3, 1) = .6034477479501392, (3, 2) = .39630180329423215, (3, 3) = -.3966825839137023, (4, 1) = .753525816927324, (4, 2) = .24601437619234381, (4, 3) = -.24651188973274546, (5, 1) = .8488142381644157, (5, 2) = .15045494206630705, (5, 3) = -.15106012272466318, (6, 1) = .9082488893736861, (6, 2) = 0.9069190108816673e-1, (6, 3) = -0.9138807321047741e-1, (7, 1) = .9444907528720965, (7, 2) = 0.5407468844222717e-1, (7, 3) = -0.5484229949404112e-1, (8, 1) = .9662592046414542, (8, 2) = 0.3189417483562893e-1, (8, 3) = -0.3271500187083119e-1, (9, 1) = .9790925647282462, (9, 2) = 0.18623696527793335e-1, (9, 3) = -0.19482428019138014e-1, (10, 1) = .986555766088315, (10, 2) = 0.10705793334502571e-1, (10, 3) = -0.1159074703199189e-1, (11, 1) = .9908027381592555, (11, 2) = 0.5992523847149354e-2, (11, 3) = -0.6895179787550211e-2, (12, 1) = .9931335723717829, (12, 2) = 0.31876605099718258e-2, (12, 3) = -0.41020283287439415e-2, (13, 1) = .9943233338103351, (13, 2) = 0.1518931255261683e-2, (13, 3) = -0.2440894633976018e-2, (14, 1) = .9948231976119695, (14, 2) = 0.555802515946153e-3, (14, 3) = -0.148243657690736e-2, (15, 1) = .9949434885398212, (15, 2) = .0, (15, 3) = -0.9294255132965231e-3}, datatype = float[8], order = C_order); YP := Matrix(15, 3, {(1, 1) = 1.0, (1, 2) = -1.000172555152507, (1, 3) = 1.0, (2, 1) = .6319340558265536, (2, 2) = -.6322009415220234, (2, 3) = .6319692081671742, (3, 1) = .39630180329423215, (3, 2) = -.3966825839137023, (3, 3) = .39643233120802607, (4, 1) = .24601437619234381, (4, 2) = -.24651188973274546, (4, 3) = .2462761463864735, (5, 1) = .15045494206630705, (5, 2) = -.15106012272466318, (5, 3) = .15085867257973395, (6, 1) = 0.9069190108816673e-1, (6, 2) = -0.9138807321047741e-1, (6, 3) = 0.9122813691840304e-1, (7, 1) = 0.5407468844222717e-1, (7, 2) = -0.5484229949404112e-1, (7, 3) = 0.5472211666848783e-1, (8, 1) = 0.3189417483562893e-1, (8, 2) = -0.3271500187083119e-1, (8, 3) = 0.32628410075998704e-1, (9, 1) = 0.18623696527793335e-1, (9, 2) = -0.19482428019138014e-1, (9, 3) = 0.19421942488750624e-1, (10, 1) = 0.10705793334502571e-1, (10, 2) = -0.1159074703199189e-1, (10, 3) = 0.11549532328603701e-1, (11, 1) = 0.5992523847149354e-2, (11, 2) = -0.6895179787550211e-2, (11, 3) = 0.6867673355663757e-2, (12, 1) = 0.31876605099718258e-2, (12, 2) = -0.41020283287439415e-2, (12, 3) = 0.4084023227622559e-2, (13, 1) = 0.1518931255261683e-2, (13, 2) = -0.2440894633976018e-2, (13, 3) = 0.24293456420930028e-2, (14, 1) = 0.555802515946153e-3, (14, 2) = -0.148243657690736e-2, (14, 3) = 0.14750712121326542e-2, (15, 1) = .0, (15, 2) = -0.9294255132965231e-3, (15, 3) = 0.9247258625371567e-3}, datatype = float[8], order = C_order); errproc := proc (x_bvp) local outpoint, X, Y, yout, L, V, i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; Digits := 15; outpoint := evalf(x_bvp); X := Vector(15, {(1) = .0, (2) = .45884128660916607, (3) = .9251421721231284, (4) = 1.401244238977895, (5) = 1.891536505380774, (6) = 2.3948746631301048, (7) = 2.906535879536887, (8) = 3.4244168392907524, (9) = 3.944232981227012, (10) = 4.465274846431488, (11) = 4.9866275238674245, (12) = 5.508155422287264, (13) = 6.0296538384388905, (14) = 6.530766339216415, (15) = 7.0}, datatype = float[8], order = C_order); Y := Matrix(15, 3, {(1, 1) = .0, (1, 2) = .0, (1, 3) = 0.9846501960989505e-10, (2, 1) = -0.14082608794708346e-6, (2, 2) = 0.1411835385771021e-6, (2, 3) = -0.14048601936730212e-6, (3, 1) = -0.14176889024724998e-6, (3, 2) = 0.14281355817553083e-6, (3, 3) = -0.14151890228908607e-6, (4, 1) = -0.10012730732250013e-6, (4, 2) = 0.10205544289443828e-6, (4, 3) = -0.10034339447818287e-6, (5, 1) = -0.55853751163662226e-7, (5, 2) = 0.5875209754413099e-7, (5, 3) = -0.5683132046670593e-7, (6, 1) = -0.21235331674583595e-7, (6, 2) = 0.25101208483958363e-7, (6, 3) = -0.23147969488423017e-7, (7, 1) = 0.9925593820904865e-9, (7, 2) = 0.3779595840388026e-8, (7, 3) = -0.19127586900557814e-8, (8, 1) = 0.12392595524747908e-7, (8, 2) = -0.6799322977513806e-8, (8, 3) = 0.8511315622508796e-8, (9, 1) = 0.1640238741867568e-7, (9, 2) = -0.100822144674156e-7, (9, 3) = 0.1161080201767941e-7, (10, 1) = 0.16349770708917644e-7, (10, 2) = -0.939164853989075e-8, (10, 3) = 0.10733390184191948e-7, (11, 1) = 0.14624569857460525e-7, (11, 2) = -0.7108454519144011e-8, (11, 3) = 0.8276116737352355e-8, (12, 1) = 0.12605317572479922e-7, (12, 2) = -0.45996593262353215e-8, (12, 3) = 0.5614895108421162e-8, (13, 1) = 0.10923893492661616e-7, (13, 2) = -0.24852987200001826e-8, (13, 3) = 0.3373601787064303e-8, (14, 1) = 0.9770889428210786e-8, (14, 2) = -0.9563326962688922e-9, (14, 3) = 0.17467581538982356e-8, (15, 1) = 0.9139737170738694e-8, (15, 2) = .0, (15, 3) = 0.7189132222848026e-9}, datatype = float[8], order = C_order); if not type(outpoint, 'numeric') then if outpoint = "start" or outpoint = "left" then return X[1] elif outpoint = "right" then return X[15] elif outpoint = "order" then return 6 elif outpoint = "error" then return HFloat(1.4281355817553083e-7) elif outpoint = "errorproc" then error "this is already the error procedure" elif outpoint = "rawdata" then return [3, 15, [f(x), diff(f(x), x), diff(diff(f(x), x), x)], X, Y] else return ('procname')(x_bvp) end if end if; if outpoint < X[1] or X[15] < outpoint then error "solution is only defined in the range %1..%2", X[1], X[15] end if; V := array([1 = 4, 2 = 0]); if Digits <= trunc(evalhf(Digits)) then L := Vector(4, 'datatype' = 'float'[8]); yout := Vector(3, 'datatype' = 'float'[8]); evalhf(`dsolve/numeric/lagrange`(15, 3, X, Y, outpoint, var(yout), var(L), var(V))) else L := Vector(4, 'datatype' = 'sfloat'); yout := Vector(3, 'datatype' = 'sfloat'); `dsolve/numeric/lagrange`(15, 3, X, Y, outpoint, yout, L, V) end if; [x = outpoint, seq('[f(x), diff(f(x), x), diff(diff(f(x), x), x)]'[i] = yout[i], i = 1 .. 3)] end proc; if not type(outpoint, 'numeric') then if outpoint = "start" or outpoint = "left" then return X[1] elif outpoint = "method" then return "bvp" elif outpoint = "right" then return X[15] elif outpoint = "order" then return 6 elif outpoint = "error" then return HFloat(1.4281355817553083e-7) elif outpoint = "errorproc" then return eval(errproc) elif outpoint = "rawdata" then return [3, 15, "depnames", X, Y, YP] else error "non-numeric value" end if end if; if outpoint < X[1] or X[15] < outpoint then error "solution is only defined in the range %1..%2", X[1], X[15] end if; if Digits <= trunc(evalhf(Digits)) and (_EnvInFsolve <> true or _EnvDSNumericSaveDigits <= trunc(evalhf(Digits))) then V := array( 1 .. 6, [( 1 ) = (7), ( 2 ) = (0), ( 3 ) = (false), ( 4 ) = (false), ( 5 ) = (false), ( 6 ) = (false) ] ); L := Matrix(7, 2, {(1, 1) = .0, (1, 2) = .0, (2, 1) = .0, (2, 2) = .0, (3, 1) = .0, (3, 2) = .0, (4, 1) = .0, (4, 2) = .0, (5, 1) = .0, (5, 2) = .0, (6, 1) = .0, (6, 2) = .0, (7, 1) = .0, (7, 2) = .0}, datatype = float[8], order = C_order); yout := Vector(3, {(1) = .0, (2) = .0, (3) = .0}, datatype = float[8]); evalhf(`dsolve/numeric/hermite`(15, 3, X, Y, YP, outpoint, var(yout), var(L), var(V))) else if _EnvInFsolve = true then Digits := _EnvDSNumericSaveDigits end if; V := array( 1 .. 6, [( 1 ) = (7), ( 2 ) = (0), ( 3 ) = (false), ( 4 ) = (false), ( 5 ) = (false), ( 6 ) = (false) ] ); L := Matrix(7, 2, {(1, 1) = 0., (1, 2) = 0., (2, 1) = 0., (2, 2) = 0., (3, 1) = 0., (3, 2) = 0., (4, 1) = 0., (4, 2) = 0., (5, 1) = 0., (5, 2) = 0., (6, 1) = 0., (6, 2) = 0., (7, 1) = 0., (7, 2) = 0.}, order = C_order); yout := Vector(3, {(1) = 0., (2) = 0., (3) = 0.}); `dsolve/numeric/hermite`(15, 3, X, Y, YP, outpoint, yout, L, V) end if; [outpoint, seq(yout[i], i = 1 .. 3)] end proc, (2) = Array(0..0, {}), (3) = [x, f(x), diff(f(x), x), diff(diff(f(x), x), x)], (4) = 0}); solnproc := data[1]; if not type(outpoint, 'numeric') then if outpoint = "solnprocedure" then return eval(solnproc) elif member(outpoint, ["start", "left", "right", "errorproc", "rawdata", "order", "error"]) then return solnproc(x_bvp) elif outpoint = "sysvars" then return data[3] elif procname <> unknown then return ('procname')(x_bvp) else _ndsol := pointto(data[2][0]); return ('_ndsol')(x_bvp) end if end if; try res := solnproc(outpoint); [x = res[1], seq('[f(x), diff(f(x), x), diff(diff(f(x), x), x)]'[i] = res[i+1], i = 1 .. 3)] catch: error end try end proc$

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fname1:="C:/Users/TomLeslie/Desktop/EX1.xlsx";
M:=Matrix([
            seq(rhs~(sol(j)), j=0..7, 0.01)
          ]
        );
ExcelTools:-Export(M, fname1, "sheet1", "B2"):

fname2:="C:/Users/TomLeslie/Desktop/EX2.xlsx";
ExcelTools:-Export(M[..,1], fname2, "sheet1", "B2"):
ExcelTools:-Export(M[..,3], fname2, "sheet1", "C2"):

_rtable[36893488148083816436]

(5)

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Download matres3.mw

So thta would be...

Answered: tomleslie 13749

August 11 2023

0 0

@Madhukesh J K

as shown in the attached

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diff(diff(diff(f(x), x), x), x)+f(x)*(diff(diff(f(x), x), x))-(diff(f(x), x))*(diff(f(x), x)-lambda) = 0

(1)

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(2)

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(3)

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$proc (x_bvp) local res, data, solnproc, _ndsol, outpoint, i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; _EnvDSNumericSaveDigits := Digits; Digits := 15; if _EnvInFsolve = true then outpoint := evalf[_EnvDSNumericSaveDigits](x_bvp) else outpoint := evalf(x_bvp) end if; data := Array(1..4, {(1) = proc (outpoint) local X, Y, YP, yout, errproc, L, V, i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; X := Vector(15, {(1) = .0, (2) = .45884128660916607, (3) = .9251421721231284, (4) = 1.401244238977895, (5) = 1.891536505380774, (6) = 2.3948746631301048, (7) = 2.906535879536887, (8) = 3.4244168392907524, (9) = 3.944232981227012, (10) = 4.465274846431488, (11) = 4.9866275238674245, (12) = 5.508155422287264, (13) = 6.0296538384388905, (14) = 6.530766339216415, (15) = 7.0}, datatype = float[8], order = C_order); Y := Matrix(15, 3, {(1, 1) = .0, (1, 2) = 1.0, (1, 3) = -1.000172555152507, (2, 1) = .3679661670444895, (2, 2) = .6319340558265536, (2, 3) = -.6322009415220234, (3, 1) = .6034477479501392, (3, 2) = .39630180329423215, (3, 3) = -.3966825839137023, (4, 1) = .753525816927324, (4, 2) = .24601437619234381, (4, 3) = -.24651188973274546, (5, 1) = .8488142381644157, (5, 2) = .15045494206630705, (5, 3) = -.15106012272466318, (6, 1) = .9082488893736861, (6, 2) = 0.9069190108816673e-1, (6, 3) = -0.9138807321047741e-1, (7, 1) = .9444907528720965, (7, 2) = 0.5407468844222717e-1, (7, 3) = -0.5484229949404112e-1, (8, 1) = .9662592046414542, (8, 2) = 0.3189417483562893e-1, (8, 3) = -0.3271500187083119e-1, (9, 1) = .9790925647282462, (9, 2) = 0.18623696527793335e-1, (9, 3) = -0.19482428019138014e-1, (10, 1) = .986555766088315, (10, 2) = 0.10705793334502571e-1, (10, 3) = -0.1159074703199189e-1, (11, 1) = .9908027381592555, (11, 2) = 0.5992523847149354e-2, (11, 3) = -0.6895179787550211e-2, (12, 1) = .9931335723717829, (12, 2) = 0.31876605099718258e-2, (12, 3) = -0.41020283287439415e-2, (13, 1) = .9943233338103351, (13, 2) = 0.1518931255261683e-2, (13, 3) = -0.2440894633976018e-2, (14, 1) = .9948231976119695, (14, 2) = 0.555802515946153e-3, (14, 3) = -0.148243657690736e-2, (15, 1) = .9949434885398212, (15, 2) = .0, (15, 3) = -0.9294255132965231e-3}, datatype = float[8], order = C_order); YP := Matrix(15, 3, {(1, 1) = 1.0, (1, 2) = -1.000172555152507, (1, 3) = 1.0, (2, 1) = .6319340558265536, (2, 2) = -.6322009415220234, (2, 3) = .6319692081671742, (3, 1) = .39630180329423215, (3, 2) = -.3966825839137023, (3, 3) = .39643233120802607, (4, 1) = .24601437619234381, (4, 2) = -.24651188973274546, (4, 3) = .2462761463864735, (5, 1) = .15045494206630705, (5, 2) = -.15106012272466318, (5, 3) = .15085867257973395, (6, 1) = 0.9069190108816673e-1, (6, 2) = -0.9138807321047741e-1, (6, 3) = 0.9122813691840304e-1, (7, 1) = 0.5407468844222717e-1, (7, 2) = -0.5484229949404112e-1, (7, 3) = 0.5472211666848783e-1, (8, 1) = 0.3189417483562893e-1, (8, 2) = -0.3271500187083119e-1, (8, 3) = 0.32628410075998704e-1, (9, 1) = 0.18623696527793335e-1, (9, 2) = -0.19482428019138014e-1, (9, 3) = 0.19421942488750624e-1, (10, 1) = 0.10705793334502571e-1, (10, 2) = -0.1159074703199189e-1, (10, 3) = 0.11549532328603701e-1, (11, 1) = 0.5992523847149354e-2, (11, 2) = -0.6895179787550211e-2, (11, 3) = 0.6867673355663757e-2, (12, 1) = 0.31876605099718258e-2, (12, 2) = -0.41020283287439415e-2, (12, 3) = 0.4084023227622559e-2, (13, 1) = 0.1518931255261683e-2, (13, 2) = -0.2440894633976018e-2, (13, 3) = 0.24293456420930028e-2, (14, 1) = 0.555802515946153e-3, (14, 2) = -0.148243657690736e-2, (14, 3) = 0.14750712121326542e-2, (15, 1) = .0, (15, 2) = -0.9294255132965231e-3, (15, 3) = 0.9247258625371567e-3}, datatype = float[8], order = C_order); errproc := proc (x_bvp) local outpoint, X, Y, yout, L, V, i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; Digits := 15; outpoint := evalf(x_bvp); X := Vector(15, {(1) = .0, (2) = .45884128660916607, (3) = .9251421721231284, (4) = 1.401244238977895, (5) = 1.891536505380774, (6) = 2.3948746631301048, (7) = 2.906535879536887, (8) = 3.4244168392907524, (9) = 3.944232981227012, (10) = 4.465274846431488, (11) = 4.9866275238674245, (12) = 5.508155422287264, (13) = 6.0296538384388905, (14) = 6.530766339216415, (15) = 7.0}, datatype = float[8], order = C_order); Y := Matrix(15, 3, {(1, 1) = .0, (1, 2) = .0, (1, 3) = 0.9846501960989505e-10, (2, 1) = -0.14082608794708346e-6, (2, 2) = 0.1411835385771021e-6, (2, 3) = -0.14048601936730212e-6, (3, 1) = -0.14176889024724998e-6, (3, 2) = 0.14281355817553083e-6, (3, 3) = -0.14151890228908607e-6, (4, 1) = -0.10012730732250013e-6, (4, 2) = 0.10205544289443828e-6, (4, 3) = -0.10034339447818287e-6, (5, 1) = -0.55853751163662226e-7, (5, 2) = 0.5875209754413099e-7, (5, 3) = -0.5683132046670593e-7, (6, 1) = -0.21235331674583595e-7, (6, 2) = 0.25101208483958363e-7, (6, 3) = -0.23147969488423017e-7, (7, 1) = 0.9925593820904865e-9, (7, 2) = 0.3779595840388026e-8, (7, 3) = -0.19127586900557814e-8, (8, 1) = 0.12392595524747908e-7, (8, 2) = -0.6799322977513806e-8, (8, 3) = 0.8511315622508796e-8, (9, 1) = 0.1640238741867568e-7, (9, 2) = -0.100822144674156e-7, (9, 3) = 0.1161080201767941e-7, (10, 1) = 0.16349770708917644e-7, (10, 2) = -0.939164853989075e-8, (10, 3) = 0.10733390184191948e-7, (11, 1) = 0.14624569857460525e-7, (11, 2) = -0.7108454519144011e-8, (11, 3) = 0.8276116737352355e-8, (12, 1) = 0.12605317572479922e-7, (12, 2) = -0.45996593262353215e-8, (12, 3) = 0.5614895108421162e-8, (13, 1) = 0.10923893492661616e-7, (13, 2) = -0.24852987200001826e-8, (13, 3) = 0.3373601787064303e-8, (14, 1) = 0.9770889428210786e-8, (14, 2) = -0.9563326962688922e-9, (14, 3) = 0.17467581538982356e-8, (15, 1) = 0.9139737170738694e-8, (15, 2) = .0, (15, 3) = 0.7189132222848026e-9}, datatype = float[8], order = C_order); if not type(outpoint, 'numeric') then if outpoint = "start" or outpoint = "left" then return X[1] elif outpoint = "right" then return X[15] elif outpoint = "order" then return 6 elif outpoint = "error" then return HFloat(1.4281355817553083e-7) elif outpoint = "errorproc" then error "this is already the error procedure" elif outpoint = "rawdata" then return [3, 15, [f(x), diff(f(x), x), diff(diff(f(x), x), x)], X, Y] else return ('procname')(x_bvp) end if end if; if outpoint < X[1] or X[15] < outpoint then error "solution is only defined in the range %1..%2", X[1], X[15] end if; V := array([1 = 4, 2 = 0]); if Digits <= trunc(evalhf(Digits)) then L := Vector(4, 'datatype' = 'float'[8]); yout := Vector(3, 'datatype' = 'float'[8]); evalhf(`dsolve/numeric/lagrange`(15, 3, X, Y, outpoint, var(yout), var(L), var(V))) else L := Vector(4, 'datatype' = 'sfloat'); yout := Vector(3, 'datatype' = 'sfloat'); `dsolve/numeric/lagrange`(15, 3, X, Y, outpoint, yout, L, V) end if; [x = outpoint, seq('[f(x), diff(f(x), x), diff(diff(f(x), x), x)]'[i] = yout[i], i = 1 .. 3)] end proc; if not type(outpoint, 'numeric') then if outpoint = "start" or outpoint = "left" then return X[1] elif outpoint = "method" then return "bvp" elif outpoint = "right" then return X[15] elif outpoint = "order" then return 6 elif outpoint = "error" then return HFloat(1.4281355817553083e-7) elif outpoint = "errorproc" then return eval(errproc) elif outpoint = "rawdata" then return [3, 15, "depnames", X, Y, YP] else error "non-numeric value" end if end if; if outpoint < X[1] or X[15] < outpoint then error "solution is only defined in the range %1..%2", X[1], X[15] end if; if Digits <= trunc(evalhf(Digits)) and (_EnvInFsolve <> true or _EnvDSNumericSaveDigits <= trunc(evalhf(Digits))) then V := array( 1 .. 6, [( 1 ) = (7), ( 2 ) = (0), ( 3 ) = (false), ( 4 ) = (false), ( 5 ) = (false), ( 6 ) = (false) ] ); L := Matrix(7, 2, {(1, 1) = .0, (1, 2) = .0, (2, 1) = .0, (2, 2) = .0, (3, 1) = .0, (3, 2) = .0, (4, 1) = .0, (4, 2) = .0, (5, 1) = .0, (5, 2) = .0, (6, 1) = .0, (6, 2) = .0, (7, 1) = .0, (7, 2) = .0}, datatype = float[8], order = C_order); yout := Vector(3, {(1) = .0, (2) = .0, (3) = .0}, datatype = float[8]); evalhf(`dsolve/numeric/hermite`(15, 3, X, Y, YP, outpoint, var(yout), var(L), var(V))) else if _EnvInFsolve = true then Digits := _EnvDSNumericSaveDigits end if; V := array( 1 .. 6, [( 1 ) = (7), ( 2 ) = (0), ( 3 ) = (false), ( 4 ) = (false), ( 5 ) = (false), ( 6 ) = (false) ] ); L := Matrix(7, 2, {(1, 1) = 0., (1, 2) = 0., (2, 1) = 0., (2, 2) = 0., (3, 1) = 0., (3, 2) = 0., (4, 1) = 0., (4, 2) = 0., (5, 1) = 0., (5, 2) = 0., (6, 1) = 0., (6, 2) = 0., (7, 1) = 0., (7, 2) = 0.}, order = C_order); yout := Vector(3, {(1) = 0., (2) = 0., (3) = 0.}); `dsolve/numeric/hermite`(15, 3, X, Y, YP, outpoint, yout, L, V) end if; [outpoint, seq(yout[i], i = 1 .. 3)] end proc, (2) = Array(0..0, {}), (3) = [x, f(x), diff(f(x), x), diff(diff(f(x), x), x)], (4) = 0}); solnproc := data[1]; if not type(outpoint, 'numeric') then if outpoint = "solnprocedure" then return eval(solnproc) elif member(outpoint, ["start", "left", "right", "errorproc", "rawdata", "order", "error"]) then return solnproc(x_bvp) elif outpoint = "sysvars" then return data[3] elif procname <> unknown then return ('procname')(x_bvp) else _ndsol := pointto(data[2][0]); return ('_ndsol')(x_bvp) end if end if; try res := solnproc(outpoint); [x = res[1], seq('[f(x), diff(f(x), x), diff(diff(f(x), x), x)]'[i] = res[i+1], i = 1 .. 3)] catch: error end try end proc$

(4)

>

>	M:=Matrix([ lhs~(sol(0)), seq(rhs~(sol(j)), j=0..7, 0.01) ] ): M[..,3];

_rtable[36893488148528158708]

(5)

>

Download matres2.mw

You...

Answered: tomleslie 13749

August 04 2023

0 0

@MarcinM

can use any plotting command to produce the individual plots. The display command() is then used to combine them

what do you want to plot?...

Answered: tomleslie 13749

July 26 2023

0 0

@KIRAN SAJJAN

Consider just one simple graph,and answer two questions

What are the x-values?
What are the corresponding y-values?

Original worksheet...

Answered: tomleslie 13749

July 25 2023

0 0

executes without error in Maple 2020, but produces error in Maple 2021. See the two attached worksheets

GTprob20.mw - Maple2020

GTprob21.mw - Maple2021

Datatype problem...

Answered: tomleslie 13749

July 25 2023

0 0

Not exactly sure why, but the problem seenm to stem from the fact that you have used two different datatypes `integer[8]` and `integer`

As shown in the attached...

Answered: tomleslie 13749

July 12 2023

0 0

@nftieha

maybe?

>

  restart:

  with(plots):
  with(plottools):
  with(DEtools):

  eqn1 := diff(V(t), t) = pi*p - (alpha + mu)*V(t),
          V(0) = ic1:

  eqn2 := diff(S(t), t) = alpha*V(t) + (1 - p)*pi - beta*S(t)*In(t)/N - mu*S(t),
          S(0) = ic2:

  eqn3 := diff(In(t), t) = beta*S(t)*In(t)/N - (mu + delta + localgamma)*In(t),
          In(0) = ic3:

  eqn4 := diff(R(t), t) = localgamma*In(t) - mu*R(t),
          R(0) = ic4:

  pi := 487845:
  pVals := [0.2, 0.5, 0.7, 0.8]:
  alpha := 0.054:
  beta := 0.955:
  mu := 0.005:
  delta := 0.03:
  localgamma := 0.935:
  ic1 := 484465:
  ic2 := 31999760:
  ic3 := 26305:
  ic4 := 12470:
  N:=10000:
  cols:=[red, blue, green, black]:
  for k from 1 by 1 to numelems(pVals) do
      p:=pVals[k]:
      dsol := dsolve([eqn1, eqn2, eqn3, eqn4], numeric):
      plt[k]:=odeplot( dsol,
                       [t, rhs(eqn1[1])],
                       t=0..200,
                       color=cols[k]
                     ):
  od:
  display( [seq( plt[j], j=1.. numelems(pVals))],
           legend=[seq( 'p'=pVals[j], j=1..numelems(pVals))],
           labels=[ typeset(t), typeset(lhs(eqn1[1])) ],
           labelfont=[times, bold, 16]
         );

>

Download plotODE.mw

Not that I know of...

Answered: tomleslie 13749

July 10 2023

0 0

@jganding

The "double brackets" only seem to appear when a worksheet is rendered on this site

Your code works...

Answered: tomleslie 13749

July 04 2023

0 0

@C_R

in Matlab2023a. Can't test in (OP's) Matlab2014 - because I don't have any Matlab versions antwhere that okd

Which is exactly what my iiriginal respo...

Answered: tomleslie 13749

June 22 2023

0 0

@MD0216

You want

for n=1: (3,2,3)

n=2: (9, 12,22,12,9)

Now read the attachment

Download coeffs2.mw

A couple of observations...

Answered: tomleslie 13749

June 21 2023

0 0

Your system is second-order in f(), and first-order in g(), so can only have a total of three boundary/initial conditions. You appear to want four.
Your system is not really "coupled" since the second equation dpes not contain f(). In fact, the solution of the second equation is trivially g(eta) = -eta*sigma, which can be obtained using isolate(g(eta)*diff(g(eta), eta) + sigma*eta*diff(g(eta), eta)=0, g(eta));

An observation...

Answered: tomleslie 13749

June 16 2023

0 0

@yusong

The piecewise definition of p__0 := (x, t) ->.... is identical for the two conditions (0 <= t and t <= l/D__0), and (l/D__0 < t), which seems a bit weird?? It this is correct, why have a piecewise definition at all?

Something more like...

Answered: tomleslie 13749

June 14 2023

0 0

@Aung

the attached, maybe? Although what this has to do with the matrix relaxG(xy) in the first worksheet you posted is a complete mystery to me

Download simpPlot.mw

This code...

Answered: tomleslie 13749

June 14 2023

0 0

@KIRAN SAJJAN

is so bad, that it is almost impossible (at least for me) to work out what you are trying to achieve!!! So, in the attached, I have made a lot of more-or-less random guesses. Some of these guesses are almost certainly wrong!!

You will have to check this very carefully!!

The display of the final matrices is a lot cleaner in the Maple worksheet - honest

>

restart:

>

a2 := (1-p2)*(1-p1+p1*rs1/rf)+p2*rs2/rf

>

a3 := 1+3*((p1*sigma1+p2*sigma2)/`σf`-p1-p2)/(2+(p1*sigma1+p2*sigma2)/((p1+p2)*`σf`)-((p1*sigma1+p2*sigma2)/`σf`-p1-p2))

>

a4 := (1-p2)*(1-p1+p1*rs1*cps1/(rf*cpf))+p2*rs2*cps2/(rf*cpf)

>

a5 := (ks1+2*kf-2*p1*(kf-ks1))*(ks2+2*kf*(ks1+2*kf-2*p1*(kf-ks1))/(ks1+2*kf+p1*(kf-ks1))-2*p2*(kf*(ks1+2*kf-2*p1*(kf-ks1))/(ks1+2*kf+p1*(kf-ks1))-ks2))/((ks1+2*kf+p1*(kf-ks1))*(ks2+2*kf*(ks1+2*kf-2*p1*(kf-ks1))/(ks1+2*kf+p1*(kf-ks1))+2*p2*(kf*(ks1+2*kf-2*p1*(kf-ks1))/(ks1+2*kf+p1*(kf-ks1))-ks2)))

>

a7 := (1-p4)*(1-p3+p3*rs3/rf)+p4*rs4/rf

>

a8 := 1+3*((p3*sigma3+p4*sigma4)/`σf`-p3-p4)/(2+(p3*sigma3+p4*sigma4)/((p3+p4)*`σf`)-((p3*sigma3+p4*sigma4)/`σf`-p3-p4))

>

a9 := (1-p4)*(1-p3+p3*rs3*cps3/(rf*cpf))+p4*rs4*cps4/(rf*cpf)

>

a10 := (ks3+2*kf-2*p3*(kf-ks3))*(ks4+2*kf*(ks3+2*kf-2*p3*(kf-ks3))/(ks3+2*kf+p3*(kf-ks3))-2*p4*(kf*(ks3+2*kf-2*p3*(kf-ks3))/(ks3+2*kf+p3*(kf-ks3))-ks4))/((ks3+2*kf+p3*(kf-ks3))*(ks4+2*kf*(ks3+2*kf-2*p3*(kf-ks3))/(ks3+2*kf+p3*(kf-ks3))+2*p4*(kf*(ks3+2*kf-2*p3*(kf-ks3))/(ks3+2*kf+p3*(kf-ks3))-ks4)))

>

OdeSys := (diff(U(Y), Y, Y))/(a1*a2)+Theta(Y)+N*(Theta(Y)*Theta(Y))-a3*(M*M)*U(Y)/a2-(kp*kp)*U(Y)/(a1*a2), a5*(diff(Theta(Y), Y, Y))/a4+Pr*Ec*((diff(U(Y), Y))*(diff(U(Y), Y))+(U(Y)*U(Y))*(kp*kp))/(a1*a2)

>	Cond:= U(0) = lambda(D(U))(0), Theta(0) = A+g(D(Theta))(0), U(1) = 0, Theta(1) = B:

>	OdeSys1:= ((diff(V(Y),Y,Y))/(a6a7)+Phi(Y)+N(Phi(Y)Phi(Y))-a8(MM)V(Y)/a7-(kpkp)V(Y)/(a6a7)), (a10(diff(Phi(Y),Y,Y))/a9+PrEc((diff(V(Y),Y))(diff(V(Y),Y))+(V(Y)V(Y))(kpkp))/(a6*a7)) :

>

Cond1 := V(0) = lambda*(D(V))(0), Phi(0) = A+g*(D(Phi))(0), V(1) = 0, Phi(1) = B

>

  for j to numelems(MVals) do
      Ans[j] := dsolve( eval([OdeSys, Cond], M = MVals[j]),
                        numeric,
                        output = listprocedure
                      );
      Theta_b[j] := evalf
                    ( Int
                      ( eval
                        ( U(Y)*Theta(Y),
                          Ans[j]
                        )(Y),
                        Y = 0 .. 1
                      )
                      /
                      Int
                      ( eval
                        ( U(Y),
                          Ans[j]
                        )(Y),
                        Y = 0 .. 1
                      )
                    );
      Q_b[j] := evalf
                ( Int
                  ( eval
                    ( U(Y),
                      Ans[j]
                    )(Y),
                    Y = 0 .. 1
                  )
                );
  end do;

(1)

>

  for j to numelems(MVals) do
      Ans1[j] := dsolve
                 ( eval([OdeSys1, Cond1], M = MVals[j]),
                   numeric,
                   output = listprocedure
                 );
      Theta_B[j] := evalf
                    ( Int
                      ( eval
                        ( V(Y)*Phi(Y),
                          Ans1[j]
                        )(Y),
                        Y = 0 .. 1
                      )
                      /
                      Int
                      ( eval
                        ( V(Y),
                          Ans1[j]
                        )(Y),
                        Y = 0 .. 1
                      )
                    );
      Q_B[j] := evalf
                ( Int
                  ( eval
                    ( V(Y),
                      Ans1[j]
                    )(Y),
                    Y = 0 .. 1
                  )
                );
  end do;

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These are replies submitted by tomleslie

Yes...

So thta would be...

You...

what do you want to plot?...

Original worksheet...

Datatype problem...

As shown in the attached...

Not that I know of...

Your code works...

Which is exactly what my iiriginal respo...

A couple of observations...

An observation...

Something more like...

This code...