Discussion:
[Maxima-discuss] how do i use file wxmx
Fernando Fiore
2017-05-11 07:52:04 UTC
Permalink
you sent me file fft_animation.wxmx, i dont know this file extension
Soegtrop, Michael
2017-05-11 08:44:00 UTC
Permalink
Dear Fiore,

this is one of the two storage formats of wxMaxima. wxmx files contains results and plot images. wxm files just contain the input / script.

So to read wxmx files, you need to install wxMaxima. You can also use wxMaxima to convert the file to a wxm file, which is essentially a plain maxima file with some comments.

Best regards,

Michael

From: Fernando Fiore [mailto:***@gmail.com]
Sent: Thursday, May 11, 2017 9:52 AM
To: maxima-***@lists.sourceforge.net
Subject: [Maxima-discuss] how do i use file wxmx

you sent me file fft_animation.wxmx, i dont know this file extension
Intel Deutschland GmbH
Registered Address: Am Campeon 10-12, 85579 Neubiberg, Germany
Tel: +49 89 99 8853-0, www.intel.de
Managing Directors: Christin Eisenschmid, Christian Lamprechter
Chairperson of the Supervisory Board: Nicole Lau
Registered Office: Munich
Commercial Register: Amtsgericht Muenchen HRB 186928
Joseph Cusumano
2017-05-11 15:05:15 UTC
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For what it's worth, .wxmx files are compressed archives. If you open
them in an archive manager, you can find the actual maxima commands
embedded in an .xml file.

I doubt this has much practical value, but given sufficient
masochism/boredom, in principle one could, say, write a perl script to
strip out the maxima. I've opened them to repair corrupted .xml that had
trashed my wxMaxima worksheet.

But for most purposes it's likely much easier to just install wxMaxima,
as suggested by Michael!

Joe
Message: 1
Date: Thu, 11 May 2017 04:52:04 -0300
Subject: [Maxima-discuss] how do i use file wxmx
Content-Type: text/plain; charset="utf-8"
you sent me file fft_animation.wxmx, i dont know this file extension
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Message: 2
Date: Thu, 11 May 2017 08:44:00 +0000
Subject: Re: [Maxima-discuss] how do i use file wxmx
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Dear Fiore,
this is one of the two storage formats of wxMaxima. wxmx files contains results and plot images. wxm files just contain the input / script.
So to read wxmx files, you need to install wxMaxima. You can also use wxMaxima to convert the file to a wxm file, which is essentially a plain maxima file with some comments.
Best regards,
Michael
Sent: Thursday, May 11, 2017 9:52 AM
Subject: [Maxima-discuss] how do i use file wxmx
you sent me file fft_animation.wxmx, i dont know this file extension
Intel Deutschland GmbH
Registered Address: Am Campeon 10-12, 85579 Neubiberg, Germany
Tel: +49 89 99 8853-0, www.intel.de
Managing Directors: Christin Eisenschmid, Christian Lamprechter
Chairperson of the Supervisory Board: Nicole Lau
Registered Office: Munich
Commercial Register: Amtsgericht Muenchen HRB 186928
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Message: 3
Date: Thu, 11 May 2017 08:46:34 -0600
Subject: [Maxima-discuss] expand(bfloat()) inside a block seemingly
causes zero to be returned from ratcoef() instead of answer...
Content-Type: text/plain; charset="utf-8"
I read in two files, N23v3.txt and D23v3.txt, and then arrange a
Numerator and a Denominator, NNQs2 and DDQs2, resp. Then I just take the
Taylor/Laurent series of each, and as a check, look at the z1^9*z2^1
coefficient, first for the Numerator, NNQs2 (after some substitutions).
The answer is: 3.7055384b3*%i-5.5576267b3
n: openr("N23v3.txt")$
NNQs: eval_string(readline(n))$
d: openr("D23v3.txt")$
DDQs: eval_string(readline(d))$
NNQs2: NNQs*((A1-A2)^2)-DDQs$
DDQs2: DDQs*((A1-A2)^2)$
One way, I get the same answer as Mathematica, but the other way I get a
zero. Here are the two ways (in this first example one can ignore bot1pre);
top1pre: sublis([Q=2, A1 = %e^((z1)^2 + rhs(ptsuvb[4][1])) , A2 =
%e^((z2)^2 + rhs(ptsuvb[4][1])) , B1 = %e^(exfn2[4,2](z1)) , B2 =
%e^(exfn2[4,2](z2)) ],NNQs2) * 4* z1*z2* %e^((z1)^2 +
rhs(ptsuvb[4][1])) * %e^((z2)^2 + rhs(ptsuvb[4][1])) $
Evaluation took 0.6320 seconds (0.6320 elapsed) using 177.685 MB.
(%i79) bot1pre: sublis([Q=2, A1 = %e^((z1)^2 + rhs(ptsuvb[4][1])) ,
A2 = %e^((z2)^2 + rhs(ptsuvb[4][1])) , B1 = %e^(exfn2[4,2](z1)) , B2 =
%e^(exfn2[4,2](z2)) ],DDQs2) $
Evaluation took 0.3720 seconds (0.3750 elapsed) using 55.820 MB.
(%i80) taylor(top1pre,[z1,z2],[0,0],12)$
Evaluation took 3881.3240 seconds (3880.8980 elapsed) using 855740.234 MB.
(%i81) expand(bfloat(%))$
Evaluation took 260.1320 seconds (260.1130 elapsed) using 157348.855 MB.
(%i82) ratcoef(%,z1,9)$
Evaluation took 1.2000 seconds (1.2010 elapsed) using 366.486 MB.
(%i83) ratcoef(%,z2,1)$
Evaluation took 0.0000 seconds (0.0000 elapsed) using 31.984 KB.
(%i84) expand(bfloat(%));
Evaluation took 0.0000 seconds (0.0000 elapsed) using 32.000 KB.
(%o84) 3.7055384b3*%i-5.5576267b3
Then another way with a memoized function;
top1fnB[iT,iT1,jT,jT1](z1,z2):=
block([],
print("Faster than 'A' version"),
sublis(
[
Q=2,
A1 = bfloat(%e)^((z1)^2 + rhs(ptsuvb[iT][1])) ,
A2 = bfloat(%e)^((z2)^2 + rhs(ptsuvb[jT][1])) ,
B1 = bfloat(%e)^(exfn2[iT,iT1](z1)) ,
B2 = bfloat(%e)^(exfn2[jT,jT1](z2))
],
NNQs2)
*
4 * z1 * z2 * ((bfloat(%e))^((z1)^2 + rhs(ptsuvb[iT][1]))) *
((bfloat(%e))^((z2)^2 + rhs(ptsuvb[jT][1])))
);
Evaluation took 0.0000 seconds (0.0000 elapsed) using 0 bytes.
(%o85) top1fnB[iT,iT1,jT,jT1](z1,z2):=block([],print("Faster than 'A'
version"),
sublis([Q = 2,A1 =
bfloat(%e)^(z1^2+rhs(ptsuvb[iT][1])),
A2 =
bfloat(%e)^(z2^2+rhs(ptsuvb[jT][1])),
B1 = bfloat(%e)^exfn2[iT,iT1](z1),
B2 =
bfloat(%e)^exfn2[jT,jT1](z2)],NNQs2)
*4*z1*z2*bfloat(%e)^(z1^2+rhs(ptsuvb[iT][1]))
*bfloat(%e)^(z2^2+rhs(ptsuvb[jT][1])))
block([i,i1,j,j1],
for i:4 step 1 thru 4 do(
for i1:2 step 1 thru 2 do(
for j:4 step 1 thru 4 do(
for j1:2 step 1 thru 2 do(
top1fnB[i,i1,j,j1](z1,z2)
)
)
)
)
)$
Faster than 'A' version
Evaluation took 2.1440 seconds (2.1410 elapsed) using 414.795 MB.
(%i87) taylor( top1fnB[4,2,4,2](z1,z2) ,[z1,z2],[0,0],12)$
Evaluation took 3876.9960 seconds (3876.5680 elapsed) using 856283.796 MB.
(%i88) expand(bfloat(%))$
Evaluation took 254.8480 seconds (254.8190 elapsed) using 157348.706 MB.
(%i89) ratcoef(%,z1,9)$
Evaluation took 1.2040 seconds (1.2030 elapsed) using 366.508 MB.
(%i90) ratcoef(%,z2,1)$
Evaluation took 0.0000 seconds (0.0000 elapsed) using 31.984 KB.
(%i91) expand(bfloat(%));
Evaluation took 0.0000 seconds (0.0000 elapsed) using 32.000 KB.
(%o91) 3.7055384b3*%i-5.5576267b3
*But this way, where I put the expand(bfloat()) inside the block, I only
get a zero. I don't understand this - it works as the "next call" in the
above but putting it inside the block it seemingly doesn't work.*
top2fnB[iT,iT1,jT,jT1](z1,z2):=
block([],
print("Faster than 'A' version"),
expand(bfloat(
sublis(
[
Q=2,
A1 = bfloat(%e)^((z1)^2 + rhs(ptsuvb[iT][1])) ,
A2 = bfloat(%e)^((z2)^2 + rhs(ptsuvb[jT][1])) ,
B1 = bfloat(%e)^(exfn2[iT,iT1](z1)) ,
B2 = bfloat(%e)^(exfn2[jT,jT1](z2))
],
NNQs2)
*
4 * z1 * z2 * ((bfloat(%e))^((z1)^2 + rhs(ptsuvb[iT][1]))) *
((bfloat(%e))^((z2)^2 + rhs(ptsuvb[jT][1])))
))
);
Evaluation took 0.0000 seconds (0.0000 elapsed) using 0 bytes.
(%o92) top2fnB[iT,iT1,jT,jT1](z1,z2):=block([],print("Faster than 'A'
version"),
expand(bfloat(sublis(
[Q = 2,A1 =
bfloat(%e)^(z1^2+rhs(ptsuvb[iT][1])),
A2 =
bfloat(%e)^(z2^2+rhs(ptsuvb[jT][1])),
B1 =
bfloat(%e)^exfn2[iT,iT1](z1),
B2 =
bfloat(%e)^exfn2[jT,jT1](z2)],NNQs2)
*4*z1*z2*bfloat(%e)^(z1^2+rhs(ptsuvb[iT][1]))
*bfloat(%e)^(z2^2+rhs(ptsuvb[jT][1])))))
block([i,i1,j,j1],
for i:4 step 1 thru 4 do(
for i1:2 step 1 thru 2 do(
for j:4 step 1 thru 4 do(
for j1:2 step 1 thru 2 do(
top2fnB[i,i1,j,j1](z1,z2)
)
)
)
)
)$
Faster than 'A' version
Evaluation took 21.6280 seconds (21.6570 elapsed) using 7947.459 MB.
(%i94) taylor( top2fnB[4,2,4,2](z1,z2) ,[z1,z2],[0,0],12)$
Evaluation took 38816.2720 seconds (38813.4920 elapsed) using
10108576.760 MB.
(%i95) ratcoef(%,z1,9)$
Evaluation took 0.0000 seconds (0.0000 elapsed) using 0 bytes.
(%i96) ratcoef(%,z2,1)$
Evaluation took 0.0000 seconds (0.0000 elapsed) using 0 bytes.
(%i97) expand(bfloat(%));
Evaluation took 0.0000 seconds (0.0010 elapsed) using 0 bytes.
(%o97) 0.0b0
*I just renamed it after adding the expand(bfloat()) at the top... yet
%o97 doesn't agree with %o84 and %o91...*
=======================================================
I think this is quite a minimal MWE given the expressions involved, but
here are the ptsuvb,
(%i99) block(fpprintprec:20, ptsuvb);
Evaluation took 0.0000 seconds (0.0010 elapsed) using 0 bytes.
(%o99) [[u = 2.4575665902970741191b0*%i+1.7328679513998632735b0,
v = 1.0659728892122526172b-1*%i-6.2462192585820903824b-1],
[u = 2.4575665902970741191b0*%i+1.7328679513998632735b0,
v = 1.99994907982258735b0*%i-3.4657359027997265471b-1],
[u = 2.4575665902970741191b0*%i+1.7328679513998632735b0,
v = 1.0659728892122526172b-1*%i-6.8525254701736271174b-2],
[u = 3.8256187168825123578b0*%i+1.7328679513998632735b0,
v = 4.283236227356999127b0*%i-3.4657359027997265471b-1],
[u = 3.8256187168825123578b0*%i+1.7328679513998632735b0,
v = (-1.0659728892122526172b-1*%i)-6.2462192585820903824b-1],
[u = 3.8256187168825123578b0*%i+1.7328679513998632735b0,
v = (-1.0659728892122526172b-1*%i)-6.8525254701736271174b-2]]
and here are the exfn2[4,2](z),
(%i100) exfn2[4,2];
Evaluation took 0.0000 seconds (0.0000 elapsed) using 0 bytes.
(%o100) lambda([z],
(2.4999684170294571596b-10*%i-1.5926675716423077427b-101)*z^20
+(5.4422914890781373089b-10*%i-5.4422914890781373089b-10)*z^19
+(7.4241242679465273643b-101*%i-2.1949862172470072458b-9)*z^18
+((-2.7992768580505408022b-9)*%i-2.7992768580505408022b-9)*z^17
+(1.4103141949123651483b-101-7.1392995876137563033b-9*%i)*z^16
+(1.9699729746253592549b-8-1.9699729746253592549b-8*%i)*z^15
+(8.4984738269409529652b-8-8.8363073202616006704b-101*%i)*z^14
+(8.7244343353343759624b-8*%i+8.7244343353343759624b-8)*z^13
+(1.9184319783579921697b-7*%i-8.639553201771663587b-101)*z^12
+(8.5983832108788477827b-7*%i-8.5983832108788477827b-7)*z^11
+((-5.6057307303393292715b-101)*%i-3.7822162375954109441b-6)*z^10
+((-2.1254377383626516676b-6)*%i-2.1254377383626516676b-6)*z^9
+((-4.1261569538346143584b-6)*%i-6.6008214046417929809b-101)*z^8
+(5.5294619424072340975b-5-5.5294619424072340975b-5*%i)*z^7
+(2.0308491043521559466b-4-2.4501360860327145097b-101*%i)*z^6
+((-1.6650561926470379026b-4)*%i-1.6650561926470379026b-4)*z^5
+(1.6878155229425973096b-5*%i+1.0865710252595124002b-102)*z^4
+(1.3066623626319121467b-2*%i-1.3066623626319121467b-2)*z^3
+(6.916608748068922997b-102*%i-2.6588364455577754348b-1)*z^2
+((-1.8641996229708285664b-1)*%i-1.8641996229708285664b-1)*z
+(-1.99994907982258735b0)*%i-3.4657359027997265471b-1)
and the N23v3 & D23v3 text files are attached.
Hope this is a clear question...
Best wishes,
Brett
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(6*Q^5-6*Q^4)*A1*A2*B1^13*B2^9+(6*Q^5-6*Q^4)*A1*A2*B1^9*B2^13+(2*Q^5-10*Q^4+8*Q^3)*A1*A2*B1^13*B2^8+(-6*Q^5+12*Q^4-6*Q^3)*A1*A2*B1^12*B2^9+(-24*Q^4+24*Q^3)*A1*A2*B1^11*B2^10+(-24*Q^4+24*Q^3)*A1*A2*B1^10*B2^11+(-6*Q^5+12*Q^4-6*Q^3)*A1*A2*B1^9*B2^12+(2*Q^5-10*Q^4+8*Q^3)*A1*A2*B1^8*B2^13+(-24*Q^4+44*Q^3-20*Q^2)*A1*A2*B1^13*B2^7+(-2*Q^5+12*Q^4-27*Q^3+17*Q^2)*A1*A2*B1^12*B2^8+(-8*Q^4+46*Q^3-38*Q^2)*A1*A2*B1^11*B2^9+(48*Q^4-70*Q^3+22*Q^2)*A1*A2*B1^10*B2^10+(-8*Q^4+46*Q^3-38*Q^2)*A1*A2*B1^9*B2^11+(-2*Q^5+12*Q^4-27*Q^3+17*Q^2)*A1*A2*B1^8*B2^12+(-24*Q^4+44*Q^3-20*Q^2)*A1*A2*B1^7*B2^13+(-8*Q^4+26*Q^3-28*Q^2+10*Q)*A1*A2*B1^13*B2^6+(24*Q^4-68*Q^3+64*Q^2-20*Q)*A1*A2*B1^12*B2^7+(75*Q^3-150*Q^2+75*Q)*A1*A2*B1^11*B2^8+(2*Q^4-63*Q^3+126*Q^2-65*Q)*A1*A2*B1^10*B2^9+(2*Q^4-63*Q^3+126*Q^2-65*Q)*A1*A2*B1^9*B2^10+(75*Q^3-150*Q^2+75*Q)*A1*A2*B1^8*B2^11+(24*Q^4-68*Q^3+64*Q^2-20*Q)*A1*A2*B1^7*B2^12+(-8*Q^4+26*Q^3-28*Q^2+10*Q)*A1*A2*B1^6*B2^13+(12*Q^3-16*Q^2+4*Q)*A1*A2*B1^13*B2^5+(8*Q^4-55*Q^3+129*Q^2!
-107*Q+25)*A1*A2*B1^12*B2^6+(24*Q^3-40*Q^2+16*Q)*A1*A2*B1^11*B2^7+(-2*Q^4-55*Q^3+297*Q^2-515*Q+275)*A1*A2*B1^10*B2^8+(64*Q^3-228*Q^2+264*Q-100)*A1*A2*B1^9*B2^9+(6*Q^7-6*Q^6)*A2*B1^10*B2^9+(-2*Q^4-55*Q^3+297*Q^2-515*Q+275)*A1*A2*B1^8*B2^10+(6*Q^7-6*Q^6)*A1*B1^9*B2^10+(24*Q^3-40*Q^2+16*Q)*A1*A2*B1^7*B2^11+(8*Q^4-55*Q^3+129*Q^2-107*Q+25)*A1*A2*B1^6*B2^12+(12*Q^3-16*Q^2+4*Q)*A1*A2*B1^5*B2^13+(6*Q^3-12*Q^2+6*Q)*A1*A2*B1^13*B2^4+(-18*Q^3+46*Q^2-38*Q+10)*A1*A2*B1^12*B2^5+(21*Q^3-150*Q^2+249*Q-120)*A1*A2*B1^11*B2^6+(3*Q^3-98*Q^2+235*Q-140)*A1*A2*B1^9*B2^8+(-24*Q^6+24*Q^5)*A1*B1^10*B2^8+(2*Q^7-10*Q^6+8*Q^5)*A2*B1^10*B2^8+(3*Q^3-98*Q^2+235*Q-140)*A1*A2*B1^8*B2^9+(2*Q^7-10*Q^6+8*Q^5)*A1*B1^8*B2^10+(-24*Q^6+24*Q^5)*A2*B1^8*B2^10+(21*Q^3-150*Q^2+249*Q-120)*A1*A2*B1^6*B2^11+(-18*Q^3+46*Q^2-38*Q+10)*A1*A2*B1^5*B2^12+(6*Q^3-12*Q^2+6*Q)*A1*A2*B1^4*B2^13+(-4*Q^2+4*Q)*A1*A2*B1^13*B2^3+(-6*Q^3+18*Q^2-27*Q+15)*A1*A2*B1^12*B2^4+(-4*Q^5+4*Q^4)*A1*B1^13*B2^4+(6*Q^3-48*Q^2+62*Q-20)*A1*A2*B1^11*B2^5!
+(-9*Q^5+9*Q^4)*A1*B1^12*B2^5+(8*Q^3+59*Q^2-164*Q+97)*A1*A2*B1^10*B2^6+(6*Q^5-6*Q^4)*A1*B1^11*B2^6+(-46*Q^2+94*Q-48)*A1*A2*B1^9*B2^7+(26*Q^5-26*Q^4)*A1*B1^10*B2^7+(-24*Q^6+44*Q^5-20*Q^4)*A2*B1^10*B2^7+(-4*Q^3-54*Q^2+206*Q-148)*A1*A2*B1^8*B2^8+(-14*Q^6+52*Q^5-38*Q^4)*A1*B1^9*B2^8+(-9*Q^5+9*Q^4)*A2*B1^9*B2^8+(-46*Q^2+94*Q-48)*A1*A2*B1^7*B2^9+(-9*Q^5+9*Q^4)*A1*B1^8*B2^9+(-14*Q^6+52*Q^5-38*Q^4)*A2*B1^8*B2^9+(8*Q^3+59*Q^2-164*Q+97)*A1*A2*B1^6*B2^10+(-24*Q^6+44*Q^5-20*Q^4)*A1*B1^7*B2^10+(26*Q^5-26*Q^4)*A2*B1^7*B2^10+(6*Q^3-48*Q^2+62*Q-20)*A1*A2*B1^5*B2^11+(6*Q^5-6*Q^4)*A2*B1^6*B2^11+(-6*Q^3+18*Q^2-27*Q+15)*A1*A2*B1^4*B2^12+(-9*Q^5+9*Q^4)*A2*B1^5*B2^12+(-4*Q^2+4*Q)*A1*A2*B1^3*B2^13+(-4*Q^5+4*Q^4)*A2*B1^4*B2^13+(10*Q^2-20*Q+10)*A1*A2*B1^12*B2^3+(-6*Q^4+6*Q^3)*A1*B1^13*B2^3+(4*Q^5-8*Q^4+4*Q^3)*A1*B1^12*B2^4+(14*Q^2-52*Q+38)*A1*A2*B1^10*B2^5+(9*Q^5-18*Q^4+9*Q^3)*A1*B1^11*B2^5+(-16*Q^2+32*Q-16)*A1*A2*B1^9*B2^6+(38*Q^5-82*Q^4+44*Q^3)*A1*B1^10*B2^6+(-8*Q^6+26*Q^5-28*Q^4+10*Q^3)*A2*B1^10*B2^6+(18*Q^2-42*Q+24)*A1*A2*B1^8*B2^7+(-59*Q^5+130*Q^4-71*Q^3)*A1*B1^9!
*B2^7+(18*Q^2-42*Q+24)*A1*A2*B1^7*B2^8+(-2*Q^6+84*Q^5-162*Q^4+80*Q^3)*A1*B1^8*B2^8+(-2*Q^6+84*Q^5-162*Q^4+80*Q^3)*A2*B1^8*B2^8+(-16*Q^2+32*Q-16)*A1*A2*B1^6*B2^9+(-59*Q^5+130*Q^4-71*Q^3)*A2*B1^7*B2^9+(14*Q^2-52*Q+38)*A1*A2*B1^5*B2^10+(-8*Q^6+26*Q^5-28*Q^4+10*Q^3)*A1*B1^6*B2^10+(38*Q^5-82*Q^4+44*Q^3)*A2*B1^6*B2^10+(9*Q^5-18*Q^4+9*Q^3)*A2*B1^5*B2^11+(10*Q^2-20*Q+10)*A1*A2*B1^3*B2^12+(4*Q^5-8*Q^4+4*Q^3)*A2*B1^4*B2^12+(-6*Q^4+6*Q^3)*A2*B1^3*B2^13+(-6*Q^4+26*Q^3-20*Q^2)*A1*B1^13*B2^2+(-6*Q^2+26*Q-20)*A1*A2*B1^11*B2^3+(18*Q^3-18*Q^2)*A1*B1^12*B2^3+(-6*Q^2+30*Q-24)*A1*A2*B1^10*B2^4+(-6*Q^4+44*Q^3-38*Q^2)*A1*B1^11*B2^4+(4*Q^2+24*Q-28)*A1*A2*B1^9*B2^5+(105*Q^4-292*Q^3+187*Q^2)*A1*B1^10*B2^5+(12*Q^5-16*Q^4+4*Q^3)*A2*B1^10*B2^5+(6*Q^2-46*Q+40)*A1*A2*B1^8*B2^6+(12*Q^5-72*Q^4+108*Q^3-48*Q^2)*A1*B1^9*B2^6+(-21*Q^5+75*Q^4-69*Q^3+15*Q^2)*A2*B1^9*B2^6+(-11*Q^5+108*Q^4-229*Q^3+132*Q^2)*A1*B1^8*B2^7+(48*Q^5-108*Q^4+80*Q^3-20*Q^2)*A2*B1^8*B2^7+(6*Q^2-46*Q+40)*A1*A2*B1^6*B2^8+(48*Q^5-108*Q^4+80*!
Q^3-20*Q^2)*A1*B1^7*B2^8+(-11*Q^5+108*Q^4-229*Q^3+132*Q^2)*A2*B1^7*B2^8+(4*Q^2+24*Q-28)*A1*A2*B1^5*B2^9+(-21*Q^5+75*Q^4-69*Q^3+15*Q^2)*A1*B1^6*B2^9+(12*Q^5-72*Q^4+108*Q^3-48*Q^2)*A2*B1^6*B2^9+(-6*Q^2+30*Q-24)*A1*A2*B1^4*B2^10+(12*Q^5-16*Q^4+4*Q^3)*A1*B1^5*B2^10+(105*Q^4-292*Q^3+187*Q^2)*A2*B1^5*B2^10+(-6*Q^2+26*Q-20)*A1*A2*B1^3*B2^11+(-6*Q^4+44*Q^3-38*Q^2)*A2*B1^4*B2^11+(18*Q^3-18*Q^2)*A2*B1^3*B2^12+(-6*Q^4+26*Q^3-20*Q^2)*A2*B1^2*B2^13+(10*Q^3-20*Q^2+10*Q)*A1*B1^13*B2+(6*Q^4-32*Q^3+46*Q^2-20*Q)*A1*B1^12*B2^2+(-6*Q+6)*A1*A2*B1^10*B2^3+(6*Q^4-49*Q^3+68*Q^2-25*Q)*A1*B1^11*B2^3+(-10*Q^4-20*Q^3+70*Q^2-40*Q)*A1*B1^10*B2^4+(6*Q^5-12*Q^4+6*Q^3)*A2*B1^10*B2^4+(48*Q^4-219*Q^3+336*Q^2-165*Q)*A1*B1^9*B2^5+(-6*Q^5+18*Q^4-18*Q^3+6*Q^2)*A2*B1^9*B2^5+(-108*Q^4+316*Q^3-308*Q^2+100*Q)*A1*B1^8*B2^6+(8*Q^5-82*Q^4+150*Q^3-86*Q^2+10*Q)*A2*B1^8*B2^6+(112*Q^4-344*Q^3+352*Q^2-120*Q)*A1*B1^7*B2^7+(112*Q^4-344*Q^3+352*Q^2-120*Q)*A2*B1^7*B2^7+(8*Q^5-82*Q^4+150*Q^3-86*Q^2+10*Q)*A1*B1^6*B2^8+(-108*Q^4+316*Q^3-308*Q^2+100*Q)*A2*B1^6*B2^8+(-6*Q^5+18*Q^4-18*Q^3+6*Q^2)*A1*B1^5!
*B2^9+(48*Q^4-219*Q^3+336*Q^2-165*Q)*A2*B1^5*B2^9+(-6*Q+6)*A1*A2*B1^3*B2^10+(6*Q^5-12*Q^4+6*Q^3)*A1*B1^4*B2^10+(-10*Q^4-20*Q^3+70*Q^2-40*Q)*A2*B1^4*B2^10+(6*Q^4-49*Q^3+68*Q^2-25*Q)*A2*B1^3*B2^11+(6*Q^4-32*Q^3+46*Q^2-20*Q)*A2*B1^2*B2^12+(10*Q^3-20*Q^2+10*Q)*A2*B1*B2^13+(-4*Q^2+4*Q)*A1*B1^13+(-16*Q^3+48*Q^2-57*Q+25)*A1*B1^12*B2+(-16*Q^2+16*Q)*A1*B1^11*B2^2+(-4*Q+4)*A1*A2*B1^9*B2^3+(-49*Q^3+339*Q^2-565*Q+275)*A1*B1^10*B2^3+(-4*Q^4+4*Q^3)*A2*B1^10*B2^3+(-9*Q+9)*A1*A2*B1^8*B2^4+(-4*Q^4+80*Q^3-240*Q^2+264*Q-100)*A1*B1^9*B2^4+(-9*Q^3+9*Q^2)*A2*B1^9*B2^4+(-4*Q^7+4*Q^6)*B1^10*B2^4+(-329*Q^3+1019*Q^2-965*Q+275)*A1*B1^8*B2^5+(-36*Q^4+60*Q^3-28*Q^2+4*Q)*A2*B1^8*B2^5+(-9*Q^7+9*Q^6)*B1^9*B2^5+(26*Q-26)*A1*A2*B1^6*B2^6+(-36*Q^4+84*Q^3-64*Q^2+16*Q)*A1*B1^7*B2^6+(80*Q^4-277*Q^3+329*Q^2-157*Q+25)*A2*B1^7*B2^6+(80*Q^4-277*Q^3+329*Q^2-157*Q+25)*A1*B1^6*B2^7+(-36*Q^4+84*Q^3-64*Q^2+16*Q)*A2*B1^6*B2^7+(26*Q^7-26*Q^6)*B1^7*B2^7+(-9*Q+9)*A1*A2*B1^4*B2^8+(-36*Q^4+60*Q^3-28*Q^2+4*Q)*A1*B1^5*B2^8+(-32!
9*Q^3+1019*Q^2-965*Q+275)*A2*B1^5*B2^8+(-4*Q+4)*A1*A2*B1^3*B2^9+(-9*Q^3+9*Q^2)*A1*B1^4*B2^9+(-4*Q^4+80*Q^3-240*Q^2+264*Q-100)*A2*B1^4*B2^9+(-9*Q^7+9*Q^6)*B1^5*B2^9+(-4*Q^4+4*Q^3)*A1*B1^3*B2^10+(-49*Q^3+339*Q^2-565*Q+275)*A2*B1^3*B2^10+(-4*Q^7+4*Q^6)*B1^4*B2^10+(-16*Q^2+16*Q)*A2*B1^2*B2^11+(-16*Q^3+48*Q^2-57*Q+25)*A2*B1*B2^12+(-4*Q^2+4*Q)*A2*B2^13+(10*Q^2-20*Q+10)*A1*B1^12+(6*Q^3-32*Q^2+46*Q-20)*A1*B1^11*B2+(6*Q^3-49*Q^2+68*Q-25)*A1*B1^10*B2^2+(-10*Q^3-20*Q^2+70*Q-40)*A1*B1^9*B2^3+(6*Q^4-12*Q^3+6*Q^2)*A2*B1^9*B2^3+(-6*Q^6+6*Q^5)*B1^10*B2^3+(48*Q^3-219*Q^2+336*Q-165)*A1*B1^8*B2^4+(-6*Q^4+18*Q^3-18*Q^2+6*Q)*A2*B1^8*B2^4+(-108*Q^3+316*Q^2-308*Q+100)*A1*B1^7*B2^5+(8*Q^4-82*Q^3+150*Q^2-86*Q+10)*A2*B1^7*B2^5+(112*Q^3-344*Q^2+352*Q-120)*A1*B1^6*B2^6+(112*Q^3-344*Q^2+352*Q-120)*A2*B1^6*B2^6+(8*Q^4-82*Q^3+150*Q^2-86*Q+10)*A1*B1^5*B2^7+(-108*Q^3+316*Q^2-308*Q+100)*A2*B1^5*B2^7+(-6*Q^4+18*Q^3-18*Q^2+6*Q)*A1*B1^4*B2^8+(48*Q^3-219*Q^2+336*Q-165)*A2*B1^4*B2^8+(6*Q^4-12*Q^3+6*Q^2)*A1*B1^3*B2^9+(-10*Q^3-20*Q^2+70*Q-40)*A2*B1^3*B2^9+(6*Q^3-49*Q^2+68*Q-25)*A2*B1!
^2*B2^10+(-6*Q^6+6*Q^5)*B1^3*B2^10+(6*Q^3-32*Q^2+46*Q-20)*A2*B1*B2^11+(10*Q^2-20*Q+10)*A2*B2^12+(-6*Q^2+26*Q-20)*A1*B1^11+(18*Q-18)*A1*B1^10*B2+(-6*Q^2+44*Q-38)*A1*B1^9*B2^2+(-6*Q^6+26*Q^5-20*Q^4)*B1^10*B2^2+(105*Q^2-292*Q+187)*A1*B1^8*B2^3+(12*Q^3-16*Q^2+4*Q)*A2*B1^8*B2^3+(-6*Q^6+30*Q^5-24*Q^4)*B1^9*B2^3+(12*Q^3-72*Q^2+108*Q-48)*A1*B1^7*B2^4+(-21*Q^3+75*Q^2-69*Q+15)*A2*B1^7*B2^4+(4*Q^6+24*Q^5-28*Q^4)*B1^8*B2^4+(-11*Q^3+108*Q^2-229*Q+132)*A1*B1^6*B2^5+(48*Q^3-108*Q^2+80*Q-20)*A2*B1^6*B2^5+(6*Q^6-46*Q^5+40*Q^4)*B1^7*B2^5+(48*Q^3-108*Q^2+80*Q-20)*A1*B1^5*B2^6+(-11*Q^3+108*Q^2-229*Q+132)*A2*B1^5*B2^6+(-21*Q^3+75*Q^2-69*Q+15)*A1*B1^4*B2^7+(12*Q^3-72*Q^2+108*Q-48)*A2*B1^4*B2^7+(6*Q^6-46*Q^5+40*Q^4)*B1^5*B2^7+(12*Q^3-16*Q^2+4*Q)*A1*B1^3*B2^8+(105*Q^2-292*Q+187)*A2*B1^3*B2^8+(4*Q^6+24*Q^5-28*Q^4)*B1^4*B2^8+(-6*Q^2+44*Q-38)*A2*B1^2*B2^9+(-6*Q^6+30*Q^5-24*Q^4)*B1^3*B2^9+(18*Q-18)*A2*B1*B2^10+(-6*Q^6+26*Q^5-20*Q^4)*B1^2*B2^10+(-6*Q^2+26*Q-20)*A2*B2^11+(-6*Q+6)*A1*B1^10+(4*Q^2-8*Q+4)*!
A1*B1^9*B2+(10*Q^5-20*Q^4+10*Q^3)*B1^10*B2+(9*Q^2-18*Q+9)*A1*B1^8*B2^2+(38*Q^2-82*Q+44)*A1*B1^7*B2^3+(-8*Q^3+26*Q^2-28*Q+10)*A2*B1^7*B2^3+(14*Q^5-52*Q^4+38*Q^3)*B1^8*B2^3+(-59*Q^2+130*Q-71)*A1*B1^6*B2^4+(-16*Q^5+32*Q^4-16*Q^3)*B1^7*B2^4+(-2*Q^3+84*Q^2-162*Q+80)*A1*B1^5*B2^5+(-2*Q^3+84*Q^2-162*Q+80)*A2*B1^5*B2^5+(18*Q^5-42*Q^4+24*Q^3)*B1^6*B2^5+(-59*Q^2+130*Q-71)*A2*B1^4*B2^6+(18*Q^5-42*Q^4+24*Q^3)*B1^5*B2^6+(-8*Q^3+26*Q^2-28*Q+10)*A1*B1^3*B2^7+(38*Q^2-82*Q+44)*A2*B1^3*B2^7+(-16*Q^5+32*Q^4-16*Q^3)*B1^4*B2^7+(9*Q^2-18*Q+9)*A2*B1^2*B2^8+(14*Q^5-52*Q^4+38*Q^3)*B1^3*B2^8+(4*Q^2-8*Q+4)*A2*B1*B2^9+(-6*Q+6)*A2*B2^10+(10*Q^5-20*Q^4+10*Q^3)*B1*B2^10+(-4*Q+4)*A1*B1^9+(-4*Q^4+4*Q^3)*B1^10+(-9*Q+9)*A1*B1^8*B2+(-6*Q^5+18*Q^4-27*Q^3+15*Q^2)*B1^9*B2+(6*Q-6)*A1*B1^7*B2^2+(6*Q^5-48*Q^4+62*Q^3-20*Q^2)*B1^8*B2^2+(26*Q-26)*A1*B1^6*B2^3+(-24*Q^2+44*Q-20)*A2*B1^6*B2^3+(8*Q^5+59*Q^4-164*Q^3+97*Q^2)*B1^7*B2^3+(-14*Q^2+52*Q-38)*A1*B1^5*B2^4+(-9*Q+9)*A2*B1^5*B2^4+(-46*Q^4+94*Q^3-48*Q^2)*B1^6*B2^4+(-9*Q+9)*A1*B1^4*B2^5+(-14*Q^2+52*Q-38)*A2*B1^4*B2^5+(-4*Q^5-54*Q^4+206*Q^!
3-148*Q^2)*B1^5*B2^5+(-24*Q^2+44*Q-20)*A1*B1^3*B2^6+(26*Q-26)*A2*B1^3*B2^6+(-46*Q^4+94*Q^3-48*Q^2)*B1^4*B2^6+(6*Q-6)*A2*B1^2*B2^7+(8*Q^5+59*Q^4-164*Q^3+97*Q^2)*B1^3*B2^7+(-9*Q+9)*A2*B1*B2^8+(6*Q^5-48*Q^4+62*Q^3-20*Q^2)*B1^2*B2^8+(-4*Q+4)*A2*B2^9+(-6*Q^5+18*Q^4-27*Q^3+15*Q^2)*B1*B2^9+(-4*Q^4+4*Q^3)*B2^10+(6*Q^4-12*Q^3+6*Q^2)*B1^9+(-18*Q^4+46*Q^3-38*Q^2+10*Q)*B1^8*B2+(21*Q^4-150*Q^3+249*Q^2-120*Q)*B1^7*B2^2+(-24*Q+24)*A1*B1^5*B2^3+(2*Q^2-10*Q+8)*A2*B1^5*B2^3+(3*Q^4-98*Q^3+235*Q^2-140*Q)*B1^5*B2^4+(2*Q^2-10*Q+8)*A1*B1^3*B2^5+(-24*Q+24)*A2*B1^3*B2^5+(3*Q^4-98*Q^3+235*Q^2-140*Q)*B1^4*B2^5+(21*Q^4-150*Q^3+249*Q^2-120*Q)*B1^2*B2^7+(-18*Q^4+46*Q^3-38*Q^2+10*Q)*B1*B2^8+(6*Q^4-12*Q^3+6*Q^2)*B2^9+(12*Q^3-16*Q^2+4*Q)*B1^8+(8*Q^4-55*Q^3+129*Q^2-107*Q+25)*B1^7*B2+(24*Q^3-40*Q^2+16*Q)*B1^6*B2^2+(6*Q-6)*A2*B1^4*B2^3+(-2*Q^4-55*Q^3+297*Q^2-515*Q+275)*B1^5*B2^3+(6*Q-6)*A1*B1^3*B2^4+(64*Q^3-228*Q^2+264*Q-100)*B1^4*B2^4+(-2*Q^4-55*Q^3+297*Q^2-515*Q+275)*B1^3*B2^5+(24*Q^3-40*Q^2+16*Q)*B1^2*B2^6!
+(8*Q^4-55*Q^3+129*Q^2-107*Q+25)*B1*B2^7+(12*Q^3-16*Q^2+4*Q)*B2^8+(-8*Q^3+26*Q^2-28*Q+10)*B1^7+(24*Q^3-68*Q^2+64*Q-20)*B1^6*B2+(75*Q^2-150*Q+75)*B1^5*B2^2+(2*Q^3-63*Q^2+126*Q-65)*B1^4*B2^3+(2*Q^3-63*Q^2+126*Q-65)*B1^3*B2^4+(75*Q^2-150*Q+75)*B1^2*B2^5+(24*Q^3-68*Q^2+64*Q-20)*B1*B2^6+(-8*Q^3+26*Q^2-28*Q+10)*B2^7+(-24*Q^2+44*Q-20)*B1^6+(-2*Q^3+12*Q^2-27*Q+17)*B1^5*B2+(-8*Q^2+46*Q-38)*B1^4*B2^2+(48*Q^2-70*Q+22)*B1^3*B2^3+(-8*Q^2+46*Q-38)*B1^2*B2^4+(-2*Q^3+12*Q^2-27*Q+17)*B1*B2^5+(-24*Q^2+44*Q-20)*B2^6+(2*Q^2-10*Q+8)*B1^5+(-6*Q^2+12*Q-6)*B1^4*B2+(-24*Q+24)*B1^3*B2^2+(-24*Q+24)*B1^2*B2^3+(-6*Q^2+12*Q-6)*B1*B2^4+(2*Q^2-10*Q+8)*B2^5+(6*Q-6)*B1^4+(6*Q-6)*B2^4
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(24*Q-96)*A1^3*A2^2*B1^9*B2^9+(24*Q-96)*A1^2*A2^3*B1^9*B2^9+(-24*Q+132)*A1^3*A2^2*B1^9*B2^8+(-24*Q+132)*A1^2*A2^3*B1^8*B2^9+(-24*Q^3+138*Q^2-150*Q)*A1^3*A2*B1^9*B2^9+(-244*Q^3+1788*Q^2-3900*Q+2500)*A1^2*A2^2*B1^9*B2^9+(-24*Q^3+138*Q^2-150*Q)*A1*A2^3*B1^9*B2^9-36*A1^3*A2^2*B1^9*B2^7+(24*Q^3-126*Q^2+210*Q)*A1^3*A2*B1^9*B2^8+(82*Q^3-1185*Q^2+3120*Q-2125)*A1^2*A2^2*B1^9*B2^8-36*A1^2*A2^3*B1^7*B2^9+(82*Q^3-1185*Q^2+3120*Q-2125)*A1^2*A2^2*B1^8*B2^9+(24*Q^3-126*Q^2+210*Q)*A1*A2^3*B1^8*B2^9+(36*Q^5)*A1^2*A2*B1^9*B2^9+(36*Q^5)*A1*A2^2*B1^9*B2^9+(20*Q^2-100*Q-100)*A1^3*A2*B1^9*B2^7+(-24*Q^3+489*Q^2-1554*Q+1125)*A1^2*A2^2*B1^9*B2^7+(-90*Q^2+90*Q)*A1*A2^3*B1^9*B2^7+(80*Q^3+24*Q^2-504*Q+400)*A1^2*A2^2*B1^8*B2^8+(168*Q^5-276*Q^4)*A1^2*A2*B1^9*B2^8+(18*Q^5-18*Q^4)*A1*A2^2*B1^9*B2^8+(-90*Q^2+90*Q)*A1^3*A2*B1^7*B2^9+(-24*Q^3+489*Q^2-1554*Q+1125)*A1^2*A2^2*B1^7*B2^9+(20*Q^2-100*Q-100)*A1*A2^3*B1^7*B2^9+(18*Q^5-18*Q^4)*A1^2*A2*B1^8*B2^9+(168*Q^5-276*Q^4)*A1*A2^2*B1^8*B2^9+(24*Q^3-104*Q^2-32*Q+!
220)*A1^3*A2*B1^9*B2^6+(120*Q^2-432*Q+240)*A1^2*A2^2*B1^9*B2^6+(24*Q^3-258*Q^2+624*Q-390)*A1^2*A2^2*B1^8*B2^7+(54*Q^2-54*Q)*A1*A2^3*B1^8*B2^7+(94*Q^5-974*Q^4+1060*Q^3)*A1^2*A2*B1^9*B2^7+(36*Q^5-216*Q^4+180*Q^3)*A1*A2^2*B1^9*B2^7+(54*Q^2-54*Q)*A1^3*A2*B1^7*B2^8+(24*Q^3-258*Q^2+624*Q-390)*A1^2*A2^2*B1^7*B2^8+(-222*Q^5+552*Q^4-330*Q^3)*A1^2*A2*B1^8*B2^8+(-222*Q^5+552*Q^4-330*Q^3)*A1*A2^2*B1^8*B2^8+(120*Q^2-432*Q+240)*A1^2*A2^2*B1^6*B2^9+(24*Q^3-104*Q^2-32*Q+220)*A1*A2^3*B1^6*B2^9+(36*Q^5-216*Q^4+180*Q^3)*A1^2*A2*B1^7*B2^9+(94*Q^5-974*Q^4+1060*Q^3)*A1*A2^2*B1^7*B2^9+(12*Q^2+120*Q-132)*A1^3*A2*B1^9*B2^5+(48*Q^2-204*Q+156)*A1^2*A2^2*B1^9*B2^5+(-120*Q^2+684*Q-456)*A1^2*A2^2*B1^8*B2^6+(-24*Q^5+84*Q^4-60*Q^3)*A1^3*B1^9*B2^6+(-122*Q^5+512*Q^4-676*Q^3+250*Q^2)*A1^2*A2*B1^9*B2^6+(-96*Q^4+210*Q^3-150*Q^2)*A1*A2^2*B1^9*B2^6+(12*Q^2+48*Q-60)*A1^3*A2*B1^7*B2^7+(96*Q^2-120*Q+24)*A1^2*A2^2*B1^7*B2^7+(12*Q^2+48*Q-60)*A1*A2^3*B1^7*B2^7+(-94*Q^5+1167*Q^4-2448*Q^3+1375*Q^2)*A1^2*A2*B1^8*B2^7+(-3!
6*Q^5+84*Q^4+102*Q^3-150*Q^2)*A1*A2^2*B1^8*B2^7+(-120*Q^2+684*Q-456)*A1^2*A2^2*B1^6*B2^8+(-36*Q^5+84*Q^4+102*Q^3-150*Q^2)*A1^2*A2*B1^7*B2^8+(-94*Q^5+1167*Q^4-2448*Q^3+1375*Q^2)*A1*A2^2*B1^7*B2^8+(48*Q^2-204*Q+156)*A1^2*A2^2*B1^5*B2^9+(12*Q^2+120*Q-132)*A1*A2^3*B1^5*B2^9+(-96*Q^4+210*Q^3-150*Q^2)*A1^2*A2*B1^6*B2^9+(-122*Q^5+512*Q^4-676*Q^3+250*Q^2)*A1*A2^2*B1^6*B2^9+(-24*Q^5+84*Q^4-60*Q^3)*A2^3*B1^6*B2^9+(-48*Q^2+204*Q-156)*A1^3*A2*B1^9*B2^4+(-72*Q+72)*A1^2*A2^2*B1^9*B2^4+(-48*Q^2+312*Q-264)*A1^2*A2^2*B1^8*B2^5+(-323*Q^4+1593*Q^3-2145*Q^2+875*Q)*A1^2*A2*B1^9*B2^5+(-18*Q^4-72*Q^3+90*Q^2)*A1*A2^2*B1^9*B2^5+(-108*Q+72)*A1^2*A2^2*B1^7*B2^6+(-40*Q^5+438*Q^4-2451*Q^3+5320*Q^2-3375*Q)*A1^2*A2*B1^8*B2^6+(96*Q^4-588*Q^3+1350*Q^2-750*Q)*A1*A2^2*B1^8*B2^6+(36*Q^7)*A1*A2*B1^9*B2^6+(-108*Q+72)*A1^2*A2^2*B1^6*B2^7+(-373*Q^4+2013*Q^3-3015*Q^2+1375*Q)*A1^2*A2*B1^7*B2^7+(-373*Q^4+2013*Q^3-3015*Q^2+1375*Q)*A1*A2^2*B1^7*B2^7+(-48*Q^2+312*Q-264)*A1^2*A2^2*B1^5*B2^8+(96*Q^4-588*Q^3+1350*Q^2-750*Q)*A1^2*A2*B1^6*B2^8+(-40*Q^5+438*Q^4-2451*Q^3+5320*Q^2-3375*Q)*A1*A2^2!
*B1^6*B2^8+(-72*Q+72)*A1^2*A2^2*B1^4*B2^9+(-48*Q^2+204*Q-156)*A1*A2^3*B1^4*B2^9+(-18*Q^4-72*Q^3+90*Q^2)*A1^2*A2*B1^5*B2^9+(-323*Q^4+1593*Q^3-2145*Q^2+875*Q)*A1*A2^2*B1^5*B2^9+(36*Q^7)*A1*A2*B1^6*B2^9+(-96*Q+168)*A1^3*A2*B1^9*B2^3+(-24*Q+96)*A1^2*A2^2*B1^9*B2^3+(72*Q-72)*A1^2*A2^2*B1^8*B2^4+(56*Q^4-84*Q^3-72*Q^2+100*Q)*A1^3*B1^9*B2^4+(260*Q^4-1498*Q^3+3888*Q^2-5150*Q+2500)*A1^2*A2*B1^9*B2^4+(27*Q^3-252*Q^2+225*Q)*A1*A2^2*B1^9*B2^4+(-36*Q+36)*A1^3*A2*B1^7*B2^5+(-108*Q+108)*A1^2*A2^2*B1^7*B2^5+(206*Q^4-2094*Q^3+6888*Q^2-8750*Q+3750)*A1^2*A2*B1^8*B2^5+(54*Q^4-192*Q^3+438*Q^2-300*Q)*A1*A2^2*B1^8*B2^5+(-144*Q+144)*A1^2*A2^2*B1^6*B2^6+(-36*Q^4+36*Q^3)*A1^3*B1^7*B2^6+(-24*Q^5+204*Q^4-329*Q^3-915*Q^2+1725*Q-625)*A1^2*A2*B1^7*B2^6+(144*Q^3+326*Q^2-1900*Q+1250)*A1*A2^2*B1^7*B2^6+(54*Q^7-54*Q^6)*A1^2*B1^8*B2^6+(168*Q^7-276*Q^6)*A1*A2*B1^8*B2^6+(-108*Q+108)*A1^2*A2^2*B1^5*B2^7+(-36*Q+36)*A1*A2^3*B1^5*B2^7+(144*Q^3+326*Q^2-1900*Q+1250)*A1^2*A2*B1^6*B2^7+(-24*Q^5+204*Q^4-329*Q^3-915*Q^2+1!
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)*A1^2*B1^7*B2^6+(94*Q^7-866*Q^6+952*Q^5)*A1*A2*B1^7*B2^6+(-12*Q^4-20*Q^3-18*Q^2-450*Q+500)*A1^2*A2*B1^5*B2^7+(-24*Q^4+696*Q^3-2892*Q^2+3720*Q-1500)*A1*A2^2*B1^5*B2^7+(94*Q^7-866*Q^6+952*Q^5)*A1*A2*B1^6*B2^7+(36*Q^7-126*Q^6+90*Q^5)*A2^2*B1^6*B2^7+(24*Q-132)*A1^2*A2^2*B1^3*B2^8+(-153*Q^3+468*Q^2-315*Q)*A1^2*A2*B1^4*B2^8+(64*Q^4-349*Q^3+315*Q^2+845*Q-875)*A1*A2^2*B1^4*B2^8+(24*Q-132)*A1*A2^3*B1^2*B2^9+(-54*Q^3+90*Q^2)*A1^2*A2*B1^3*B2^9+(700*Q^3-4164*Q^2+7320*Q-4000)*A1*A2^2*B1^3*B2^9+(84*Q^3-258*Q^2+210*Q)*A2^3*B1^3*B2^9+(-126*Q^6+126*Q^5)*A1*A2*B1^4*B2^9+(-108*Q^6+108*Q^5)*A2^2*B1^4*B2^9+36*A1^3*A2*B1^9*B2+(-40*Q^3-48*Q^2+330*Q-350)*A1^3*B1^9*B2^2+(-138*Q^3+1155*Q^2-2784*Q+1875)*A1^2*A2*B1^9*B2^2+36*A1^2*A2^2*B1^7*B2^3+(8*Q^3+819*Q^2-2244*Q+1525)*A1^2*A2*B1^8*B2^3+(-6*Q^3+198*Q^2-300*Q)*A1*A2^2*B1^8*B2^3+(-36*Q^4)*A1^2*B1^9*B2^3+(-108*Q^5+72*Q^4)*A1*A2*B1^9*B2^3+(12*Q^3+48*Q^2-60*Q)*A1^3*B1^7*B2^4+(48*Q^4-438*Q^3+1554*Q^2-1914*Q+750)*A1^2*A2*B1^7*B2^4+(42*Q^3+138*Q^2-330*Q+1!
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Q^2-54*Q)*A2^3*B1^3*B2^7+(-200*Q^6+1722*Q^5-3132*Q^4+1610*Q^3)*A1*A2*B1^4*B2^7+(-60*Q^6+522*Q^5-792*Q^4+330*Q^3)*A2^2*B1^4*B2^7+(-24*Q^3+108*Q^2-144*Q+60)*A1*A2^2*B1^2*B2^8+(-558*Q^5+1596*Q^4-930*Q^3)*A1*A2*B1^3*B2^8+(-189*Q^5+594*Q^4-405*Q^3)*A2^2*B1^3*B2^8+(-183*Q^2+582*Q-435)*A1*A2^2*B1*B2^9+(-80*Q^2+40*Q+220)*A2^3*B1*B2^9+(54*Q^5-234*Q^4+180*Q^3)*A1*A2*B1^2*B2^9+(198*Q^5-600*Q^4+510*Q^3)*A2^2*B1^2*B2^9+(-16*Q^2+200*Q-292)*A1^3*B1^9+(-24*Q+96)*A1^2*A2*B1^9+(-60*Q^2+336*Q-276)*A1^2*A2*B1^8*B2+(176*Q^4-106*Q^3-250*Q^2)*A1^2*B1^9*B2+(135*Q^4-360*Q^3+225*Q^2)*A1*A2*B1^9*B2+(-90*Q+90)*A1^3*B1^7*B2^2+(-24*Q^3+204*Q^2-624*Q+444)*A1^2*A2*B1^7*B2^2+(24*Q^5-156*Q^4+132*Q^3)*A1^2*B1^8*B2^2+(90*Q^5-222*Q^4+282*Q^3-150*Q^2)*A1*A2*B1^8*B2^2+(-372*Q^2+720*Q-276)*A1^2*A2*B1^6*B2^3+(-24*Q^3-76*Q^2+392*Q-400)*A1*A2^2*B1^6*B2^3+(-126*Q^5+459*Q^4-558*Q^3+225*Q^2)*A1^2*B1^7*B2^3+(-696*Q^5+4244*Q^4-6478*Q^3+2750*Q^2)*A1*A2*B1^7*B2^3+(-96*Q^3+522*Q^2-792*Q+366)*A1^2*A2*B1^5*B2^4+(-126*Q^2+288*Q-162)*A1*A2^2*B1^5*B2^4+(308*Q^5-588*Q^4+180*Q^3+100*Q^2)*A1^2*B1^6*B2!
^4+(870*Q^5-2634*Q^4+2514*Q^3-750*Q^2)*A1*A2*B1^6*B2^4+(54*Q^5-144*Q^4+90*Q^3)*A2^2*B1^6*B2^4+(-126*Q^2+288*Q-162)*A1^2*A2*B1^4*B2^5+(-96*Q^3+522*Q^2-792*Q+366)*A1*A2^2*B1^4*B2^5+(-1276*Q^5+7020*Q^4-10644*Q^3+4900*Q^2)*A1*A2*B1^5*B2^5+(-24*Q^3-76*Q^2+392*Q-400)*A1^2*A2*B1^3*B2^6+(-372*Q^2+720*Q-276)*A1*A2^2*B1^3*B2^6+(54*Q^5-144*Q^4+90*Q^3)*A1^2*B1^4*B2^6+(870*Q^5-2634*Q^4+2514*Q^3-750*Q^2)*A1*A2*B1^4*B2^6+(308*Q^5-588*Q^4+180*Q^3+100*Q^2)*A2^2*B1^4*B2^6+(-24*Q^3+204*Q^2-624*Q+444)*A1*A2^2*B1^2*B2^7+(-90*Q+90)*A2^3*B1^2*B2^7+(-696*Q^5+4244*Q^4-6478*Q^3+2750*Q^2)*A1*A2*B1^3*B2^7+(-126*Q^5+459*Q^4-558*Q^3+225*Q^2)*A2^2*B1^3*B2^7+(-60*Q^2+336*Q-276)*A1*A2^2*B1*B2^8+(90*Q^5-222*Q^4+282*Q^3-150*Q^2)*A1*A2*B1^2*B2^8+(24*Q^5-156*Q^4+132*Q^3)*A2^2*B1^2*B2^8+(-24*Q+96)*A1*A2^2*B2^9+(-16*Q^2+200*Q-292)*A2^3*B2^9+(135*Q^4-360*Q^3+225*Q^2)*A1*A2*B1*B2^9+(176*Q^4-106*Q^3-250*Q^2)*A2^2*B1*B2^9+(24*Q-132)*A1^2*A2*B1^8+(92*Q^4-986*Q^3+1930*Q^2-1000*Q)*A1^2*B1^9+(-54*Q^3+90*Q^2)*A1*A2*B1^9+!
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A1*B2+(-16*Q^3+315*Q^2-888*Q+625)*A2*B2+(-144*Q^5+144*Q^4)*B1*B2+(-102*Q^5-6*Q^4)*B2^2+(16*Q^2-128*Q+220)*A1+(16*Q^2-128*Q+220)*A2+(76*Q^5-506*Q^4+610*Q^3)*B1+(76*Q^5-506*Q^4+610*Q^3)*B2+(-152*Q^4+1036*Q^3-1100*Q^2)
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End of Maxima-discuss Digest, Vol 40, Issue 21
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Gunter Königsmann
2017-05-27 21:09:24 UTC
Permalink
wxmx is the extension wxMaxima uses: wxMaxima supports embedding
animations inside the worksheet.

Kind regards,

Gunter
Post by Fernando Fiore
you sent me file fft_animation.wxmx, i dont know this file extension
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