Hi guys,

suppose we have metric in curve geometry such as ds2=A(r)*dt^2-B(r)*dr^2+r^2*dtheta^2+r^2*sin^2(theta)*dphi^2.

how we can calculate and find exact not symbolic different components of contravariant derivative of contravariant derivative of Weyl tensor and Riemann tensor.

with best regards,

Hello Everyone;

Hope you are fine. I am solving system of odes using rk-4 method. For this purpose I formulate the "residual" (on maple file) which is further function of "x" and "y". With the help of discritization point further I convert "residual" into system of ode's. Then i used "sys111 := solve(odes_Combine, `~`[diff](var, t))" to simplify the system. Finnally i applied RK-1. Code is pasted and attached. This all process is for "N=4". When i increase the value of "N", number of Odes increase accordingly. With increasing value of "N" the comand "sys111 := solve(odes_Combine, `~`[diff](var, t))" taking a lot of time due to heavy computation. Is that any way to proceed without this comand for rk-1?

Question1.mw

Download Question1.mw

Suppose one has the following equation,

.

Based on that equation, I have two questions:

1. How may one solve it for \kappa using Maple?

2. How may we simplify it?

Thanks in advance.

Ps: I have tried to use the "solve" and "simplify" commands. However, Maplesoft does not return a result but rather the same equation.

Hello!

I'd like to sort variables which are non-commutative and obey certain commuting rules in a preferred order. Here is a minimal example

with(Physics)

Setup(mathematicalnotation = true):Setup(noncommutativeprefix = {q, w}, algebrarule = {%Commutator(q, w) = A})

If I want to rewrite q*w as A+w*q since I prefer the order w>q, what should I do? I tried sort(Simplify(q*w, algebrarules), [w, q]) but it doesn't work.

Thank you in advance.

I'm running Maple Flow 2022 on a Win10 Pro PC...

When looking at a Maple Flow worksheet I press Ctl-F to search for something on the worksheet ...

The search seems to work but the "found text" turns white ... so it is hard to see ... any fix for this?

Also, Is Dark Mode available for Maple Flow?

Thanks for any help.

I read it somewhere along the way but can't find it now ...

When entering Text into a Text Container you can inter-mix math in the Text Container ...

I think it was some key-stroke that told Maple Flow that you were switchng to entering Math ...

Can someone please remind me how to do this.

Thanks for any Help.

Hello Guys

I got the Mapple 2022 Student version and I try a couple of time to firgure out why that doesn't work at my Student Version. Please, could anybody help me. Thx a lot. 

Newton Method:

f(x) = x^2 assigned to function why I doesn't have right click for this function?

g(x) = x - f(x)/f'(x);

g(1.3) doesn't work because faild he want 2 arguments. That I figure out if I assigned like this

g(x) := x->x f(x)/f'(x) but he do not calc that right. It make me really creapy. Maybe tha Student version doesn't have this fearure is it possible?

This is another think.

a := x^2;

D(a);
                            2 D(x) x ???? why no 2x?

Next example:

f := x -> 5*x^3 + x - 7

D2f := x -> diff(f(x), x)

                         D2f:=x->d/dx f(x) ??? why not 15x^2+1?
  

Hello.

Is there a way to reduce the time of the process of calculations in maple?

I have 26 coupled simple algebraic equations. But still, I could not get any solution for them.

My codes are as follows:

restart;
eq[1] := d[0] = 1:
eq[2] := d[0] + d[1] + d[2] + d[3] + d[4] + d[5] + d[6] + d[7] = 0:
eq[3] := b[0] = 1:
eq[4] := b[0] + b[1] + b[2] + b[3] + b[4] + b[5] + b[6] + b[7] = 0:
eq[5] := a[0] = -0.5:
eq[6] := d[1] = 1 + 1.0*a[2]:
eq[7] := a[0] + a[1] + a[2] + a[3] + a[4] + a[5] + a[6] + a[7] + a[8] + a[9] = 0.5:
eq[8] := d[1] + 2*d[2] + 3*d[3] + 4*d[4] + 5*d[5] + 6*d[6] + 7*d[7] = 1.0*a[2] + 3.0*a[3] + 6.0*a[4] + 10.0*a[5] + 15.0*a[6] + 21.0*a[7] + 28.0*a[8] + 36.0*a[9]:
eq[9] := 24*a[4] - 2.104513094*a[1]*a[2] + 6.313539282*a[0]*a[3] + 5.165076420*b[1] + 5.261282735*d[1] = 0:
eq[10] := -88.3895499*a[7]^2 - 191.5106915*a[7]*a[8] - 176.7790999*a[7]*a[9] - 117.8527333*a[8]^2 - 252.5415715*a[8]*a[9] - 151.5249428*a[9]^2 + 25.25415713*a[0]*a[4] + 63.13539282*a[0]*a[5] + 126.2707856*a[0]*a[6] + 220.9738749*a[0]*a[7] + 353.5581998*a[0]*a[8] + 530.3372997*a[0]*a[9] + 12.62707857*a[1]*a[4] + 42.09026188*a[1]*a[5] + 94.70308919*a[1]*a[6] + 176.7790999*a[1]*a[7] + 294.6318332*a[1]*a[8] + 454.5748283*a[1]*a[9] - 4.209026188*a[2]^2 - 12.62707857*a[2]*a[3] - 8.41805237*a[2]*a[4] + 10.52256547*a[2]*a[5] + 50.50831422*a[2]*a[6] + 117.8527333*a[2]*a[7] + 218.8693618*a[2]*a[8] + 359.8717391*a[2]*a[9] - 12.62707857*a[3]^2 - 31.56769641*a[3]*a[4] - 25.25415713*a[3]*a[5] + 50.5083143*a[3]*a[7] + 132.5843249*a[3]*a[8] + 252.5415713*a[3]*a[9] - 25.25415713*a[4]^2 - 58.92636665*a[4]*a[5] - 50.5083142*a[4]*a[6] - 18.9406178*a[4]*a[7] + 42.0902619*a[4]*a[8] + 138.8978642*a[4]*a[9] - 42.09026188*a[5]^2 - 94.7030892*a[5]*a[6] - 84.1805237*a[5]*a[7] - 46.2992881*a[5]*a[8] + 25.2541571*a[5]*a[9] - 63.1353929*a[6]^2 - 138.8978642*a[6]*a[7] - 126.2707857*a[6]*a[8] - 82.0760107*a[6]*a[9] - 2.104513094*a[1]*a[2] + 6.313539282*a[0]*a[3] + 26.30641368*d[5] + 31.56769641*d[6] + 36.82897914*d[7] + 15.78384820*d[3] + 21.04513094*d[4] + 5.261282735*d[1] + 10.52256547*d[2] + 36.15553494*b[7] + 25.82538210*b[5] + 30.99045852*b[6] + 10.33015284*b[2] + 15.49522926*b[3] + 20.66030568*b[4] + 5.165076420*b[1] + 3024.*a[9] + 360.*a[6] + 840.*a[7] + 1680.*a[8] + 24.*a[4] + 120.*a[5] = 0:
eq[11] := 120.*a[5] - 4.209026188*a[2]^2 + 25.25415713*a[0]*a[4] + 10.33015284*b[2] + 10.52256547*d[2] = 0:
eq[12] := -972.2850495*a[7]^2 - 2298.128299*a[7]*a[8] - 2298.128298*a[7]*a[9] - 1532.085532*a[8]^2 - 3535.581998*a[8]*a[9] - 2272.874142*a[9]^2 + 25.25415713*a[0]*a[4] + 126.2707856*a[0]*a[5] + 378.8123569*a[0]*a[6] + 883.8954995*a[0]*a[7] + 1767.790999*a[0]*a[8] + 3182.023798*a[0]*a[9] + 25.25415713*a[1]*a[4] + 126.2707856*a[1]*a[5] + 378.8123569*a[1]*a[6] + 883.8954995*a[1]*a[7] + 1767.790999*a[1]*a[8] + 3182.023798*a[1]*a[9] - 4.209026188*a[2]^2 - 25.25415713*a[2]*a[3] - 25.25415713*a[2]*a[4] + 42.09026184*a[2]*a[5] + 252.5415713*a[2]*a[6] + 707.1163996*a[2]*a[7] + 1532.085532*a[2]*a[8] + 2878.973912*a[2]*a[9] - 37.88123569*a[3]^2 - 126.2707857*a[3]*a[4] - 126.2707857*a[3]*a[5] + 353.5581998*a[3]*a[7] + 1060.674599*a[3]*a[8] + 2272.874141*a[3]*a[9] - 126.2707857*a[4]^2 - 353.5581998*a[4]*a[5] - 353.5581998*a[4]*a[6] - 151.5249424*a[4]*a[7] + 378.812357*a[4]*a[8] + 1388.978642*a[4]*a[9] - 294.6318332*a[5]^2 - 757.6247134*a[5]*a[6] - 757.624714*a[5]*a[7] - 462.992880*a[5]*a[8] + 277.795729*a[5]*a[9] - 568.2185354*a[6]^2 - 1388.978642*a[6]*a[7] - 1388.978642*a[6]*a[8] - 984.912128*a[6]*a[9] + 105.2256547*d[5] + 157.8384820*d[6] + 220.9738748*d[7] + 31.56769640*d[3] + 63.13539282*d[4] + 10.52256547*d[2] + 216.9332096*b[7] + 103.3015284*b[5] + 154.9522926*b[6] + 10.33015284*b[2] + 30.99045852*b[3] + 61.98091704*b[4] + 15120.*a[9] + 720.*a[6] + 2520.*a[7] + 6720.*a[8] + 120.*a[5] = 0:
eq[13] := 720.*a[6] - 25.25415713*a[2]*a[3] + 25.25415713*a[1]*a[4] + 126.2707856*a[0]*a[5] + 30.99045852*b[3] + 31.56769640*d[3] = 0:
eq[14] := -9722.850492*a[7]^2 - 25279.41129*a[7]*a[8] - 27577.53959*a[7]*a[9] - 18385.02639*a[8]^2 - 45962.56593*a[8]*a[9] - 31820.23799*a[9]^2 + 126.2707856*a[0]*a[5] + 757.6247138*a[0]*a[6] + 2651.686498*a[0]*a[7] + 7071.163996*a[0]*a[8] + 15910.11899*a[0]*a[9] + 25.25415713*a[1]*a[4] + 252.5415712*a[1]*a[5] + 1136.437071*a[1]*a[6] + 3535.581998*a[1]*a[7] + 8838.954995*a[1]*a[8] + 19092.14279*a[1]*a[9] - 25.25415713*a[2]*a[3] - 50.50831424*a[2]*a[4] + 126.2707856*a[2]*a[5] + 1010.166285*a[2]*a[6] + 3535.581998*a[2]*a[7] + 9192.513195*a[2]*a[8] + 20152.81739*a[2]*a[9] - 75.76247138*a[3]^2 - 378.8123569*a[3]*a[4] - 505.0831425*a[3]*a[5] + 2121.349198*a[3]*a[7] + 7424.722196*a[3]*a[8] + 18182.99313*a[3]*a[9] - 505.0831426*a[4]^2 - 1767.790999*a[4]*a[5] - 2121.349199*a[4]*a[6] - 1060.674600*a[4]*a[7] + 3030.498859*a[4]*a[8] + 12500.80778*a[4]*a[9] - 1767.790999*a[5]^2 - 5303.372998*a[5]*a[6] - 6060.997709*a[5]*a[7] - 4166.935929*a[5]*a[8] + 2777.95729*a[5]*a[9] - 4545.748282*a[6]^2 - 12500.80779*a[6]*a[7] - 13889.78642*a[6]*a[8] - 10834.03341*a[6]*a[9] + 315.6769641*d[5] + 631.3539280*d[6] + 1104.869374*d[7] + 31.56769640*d[3] + 126.2707856*d[4] + 1084.666048*b[7] + 309.9045852*b[5] + 619.8091704*b[6] + 30.99045852*b[3] + 123.9618341*b[4] + 60480.*a[9] + 720.*a[6] + 5040.*a[7] + 20160.*a[8] - 2.*10^(-7)*a[3]*a[6] = 0:
eq[15] := 2.*d[2] + 5.261282735*a[0]*d[1] - 2.630641368*d[0] = 0:
eq[16] := 17.36935863*d[5] + 27.36935863*d[6] + 39.36935863*d[7] + 3.369358632*d[3] + 9.369358632*d[4] - 2.630641368*d[0] - 2.630641368*d[1] - 0.630641368*d[2] + 36.82897914*a[6]*d[7] + 5.261282735*a[7]*d[1] + 10.52256547*a[7]*d[2] + 15.78384820*a[7]*d[3] + 21.04513094*a[7]*d[4] + 26.30641368*a[7]*d[5] + 31.56769641*a[7]*d[6] + 36.82897914*a[7]*d[7] + 5.261282735*a[8]*d[1] + 10.52256547*a[8]*d[2] + 15.78384820*a[8]*d[3] + 21.04513094*a[8]*d[4] + 26.30641368*a[8]*d[5] + 31.56769641*a[8]*d[6] + 36.82897914*a[8]*d[7] + 5.261282735*a[9]*d[1] + 10.52256547*a[9]*d[2] + 15.78384820*a[9]*d[3] + 21.04513094*a[9]*d[4] + 26.30641368*a[9]*d[5] + 31.56769641*a[9]*d[6] + 36.82897914*a[9]*d[7] + 10.52256547*a[0]*d[2] + 15.78384820*a[0]*d[3] + 21.04513094*a[0]*d[4] + 26.30641368*a[0]*d[5] + 31.56769641*a[0]*d[6] + 36.82897914*a[0]*d[7] + 5.261282735*a[1]*d[1] + 10.52256547*a[1]*d[2] + 15.78384820*a[1]*d[3] + 21.04513094*a[1]*d[4] + 26.30641368*a[1]*d[5] + 31.56769641*a[1]*d[6] + 36.82897914*a[1]*d[7] + 5.261282735*a[2]*d[1] + 10.52256547*a[2]*d[2] + 15.78384820*a[2]*d[3] + 21.04513094*a[2]*d[4] + 26.30641368*a[2]*d[5] + 31.56769641*a[2]*d[6] + 36.82897914*a[2]*d[7] + 5.261282735*a[3]*d[1] + 10.52256547*a[3]*d[2] + 15.78384820*a[3]*d[3] + 21.04513094*a[3]*d[4] + 26.30641368*a[3]*d[5] + 31.56769641*a[3]*d[6] + 36.82897914*a[3]*d[7] + 5.261282735*a[4]*d[1] + 10.52256547*a[4]*d[2] + 15.78384820*a[4]*d[3] + 21.04513094*a[4]*d[4] + 26.30641368*a[4]*d[5] + 31.56769641*a[4]*d[6] + 36.82897914*a[4]*d[7] + 5.261282735*a[5]*d[1] + 10.52256547*a[5]*d[2] + 15.78384820*a[5]*d[3] + 21.04513094*a[5]*d[4] + 26.30641368*a[5]*d[5] + 31.56769641*a[5]*d[6] + 36.82897914*a[5]*d[7] + 5.261282735*a[6]*d[1] + 10.52256547*a[6]*d[2] + 15.78384820*a[6]*d[3] + 21.04513094*a[6]*d[4] + 26.30641368*a[6]*d[5] + 31.56769641*a[6]*d[6] + 5.261282735*a[0]*d[1] = 0:
eq[17] := 6.*d[3] + 5.261282735*a[1]*d[1] + 10.52256547*a[0]*d[2] - 2.630641368*d[1] = 0:
eq[18] := 46.84679316*d[5] + 104.2161518*d[6] + 191.5855104*d[7] - 1.891924104*d[3] + 13.47743453*d[4] - 2.630641368*d[1] - 5.261282736*d[2] + 441.9477498*a[6]*d[7] + 36.82897914*a[7]*d[1] + 84.18052376*a[7]*d[2] + 142.0546338*a[7]*d[3] + 210.4513094*a[7]*d[4] + 289.3705504*a[7]*d[5] + 378.8123569*a[7]*d[6] + 478.7767289*a[7]*d[7] + 42.09026188*a[8]*d[1] + 94.70308923*a[8]*d[2] + 157.8384820*a[8]*d[3] + 231.4964403*a[8]*d[4] + 315.6769641*a[8]*d[5] + 410.3800533*a[8]*d[6] + 515.6057081*a[8]*d[7] + 47.35154462*a[9]*d[1] + 105.2256547*a[9]*d[2] + 173.6223302*a[9]*d[3] + 252.5415713*a[9]*d[4] + 341.9833778*a[9]*d[5] + 441.9477497*a[9]*d[6] + 552.4346872*a[9]*d[7] + 10.52256547*a[0]*d[2] + 31.56769641*a[0]*d[3] + 63.13539282*a[0]*d[4] + 105.2256547*a[0]*d[5] + 157.8384820*a[0]*d[6] + 220.9738749*a[0]*d[7] + 5.261282735*a[1]*d[1] + 21.04513094*a[1]*d[2] + 47.35154461*a[1]*d[3] + 84.18052376*a[1]*d[4] + 131.5320684*a[1]*d[5] + 189.4061784*a[1]*d[6] + 257.8028540*a[1]*d[7] + 10.52256547*a[2]*d[1] + 31.56769641*a[2]*d[2] + 63.13539282*a[2]*d[3] + 105.2256547*a[2]*d[4] + 157.8384820*a[2]*d[5] + 220.9738748*a[2]*d[6] + 294.6318332*a[2]*d[7] + 15.78384820*a[3]*d[1] + 42.09026188*a[3]*d[2] + 78.91924103*a[3]*d[3] + 126.2707856*a[3]*d[4] + 184.1448957*a[3]*d[5] + 252.5415712*a[3]*d[6] + 331.4608123*a[3]*d[7] + 21.04513094*a[4]*d[1] + 52.61282735*a[4]*d[2] + 94.70308923*a[4]*d[3] + 147.3159166*a[4]*d[4] + 210.4513094*a[4]*d[5] + 284.1092676*a[4]*d[6] + 368.2897915*a[4]*d[7] + 26.30641368*a[5]*d[1] + 63.13539282*a[5]*d[2] + 110.4869374*a[5]*d[3] + 168.3610475*a[5]*d[4] + 236.7577231*a[5]*d[5] + 315.6769640*a[5]*d[6] + 405.1187706*a[5]*d[7] + 31.56769641*a[6]*d[1] + 73.65795829*a[6]*d[2] + 126.2707856*a[6]*d[3] + 189.4061784*a[6]*d[4] + 263.0641367*a[6]*d[5] + 347.2446605*a[6]*d[6] = 0:
eq[19] := 24.*d[4] + 10.52256547*a[2]*d[1] + 21.04513094*a[1]*d[2] + 31.56769641*a[0]*d[3] - 5.261282736*d[2] = 0:
eq[20] := 67.38717264*d[5] + 281.0807590*d[6] + 729.5130625*d[7] - 15.78384821*d[3] - 7.56769641*d[4] - 5.261282736*d[2] + 4861.425246*a[6]*d[7] + 220.9738749*a[7]*d[1] + 589.2636663*a[7]*d[2] + 1136.437070*a[7]*d[3] + 1894.061785*a[7]*d[4] + 2893.705504*a[7]*d[5] + 4166.935926*a[7]*d[6] + 5745.320746*a[7]*d[7] + 294.6318332*a[8]*d[1] + 757.6247138*a[8]*d[2] + 1420.546338*a[8]*d[3] + 2314.964404*a[8]*d[4] + 3472.446605*a[8]*d[5] + 4924.560640*a[8]*d[6] + 6702.874204*a[8]*d[7] + 378.8123569*a[9]*d[1] + 947.0308923*a[9]*d[2] + 1736.223302*a[9]*d[3] + 2777.957285*a[9]*d[4] + 4103.800534*a[9]*d[5] + 5745.320747*a[9]*d[6] + 7734.085620*a[9]*d[7] + 31.56769641*a[0]*d[3] + 126.2707856*a[0]*d[4] + 315.6769641*a[0]*d[5] + 631.3539282*a[0]*d[6] + 1104.869374*a[0]*d[7] + 21.04513094*a[1]*d[2] + 94.70308923*a[1]*d[3] + 252.5415712*a[1]*d[4] + 526.1282735*a[1]*d[5] + 947.0308923*a[1]*d[6] + 1546.817124*a[1]*d[7] + 10.52256547*a[2]*d[1] + 63.13539282*a[2]*d[2] + 189.4061784*a[2]*d[3] + 420.9026188*a[2]*d[4] + 789.1924103*a[2]*d[5] + 1325.843249*a[2]*d[6] + 2062.422832*a[2]*d[7] + 31.56769641*a[3]*d[1] + 126.2707856*a[3]*d[2] + 315.6769641*a[3]*d[3] + 631.3539281*a[3]*d[4] + 1104.869374*a[3]*d[5] + 1767.790999*a[3]*d[6] + 2651.686498*a[3]*d[7] + 63.13539282*a[4]*d[1] + 210.4513094*a[4]*d[2] + 473.5154462*a[4]*d[3] + 883.8954995*a[4]*d[4] + 1473.159166*a[4]*d[5] + 2272.874141*a[4]*d[6] + 3314.608123*a[4]*d[7] + 105.2256547*a[5]*d[1] + 315.6769641*a[5]*d[2] + 662.9216246*a[5]*d[3] + 1178.527333*a[5]*d[4] + 1894.061784*a[5]*d[5] + 2841.092676*a[5]*d[6] + 4051.187706*a[5]*d[7] + 157.8384820*a[6]*d[1] + 441.9477497*a[6]*d[2] + 883.8954995*a[6]*d[3] + 1515.249428*a[6]*d[4] + 2367.577230*a[6]*d[5] + 3472.446605*a[6]*d[6] = 0:
eq[21] := 2.119408818*b[2] + 6.176017503*a[0]*b[1] + 42.07215928*a[2] + 0.5*d[0] = 0:
eq[22] := 0.5*d[5] + 0.5*d[6] + 0.5*d[7] + 0.5*d[3] + 0.5*d[4] + 0.5*d[0] + 0.5*d[1] + 0.5*d[2] + 44.50758518*b[7] + 21.19408818*b[5] + 31.79113227*b[6] + 2.119408818*b[2] + 6.358226454*b[3] + 12.71645291*b[4] + 1514.597734*a[9] + 631.0823892*a[6] + 883.5153448*a[7] + 1178.020460*a[8] + 126.2164778*a[3] + 252.4329557*a[4] + 420.7215928*a[5] + 42.07215928*a[2] + 12.35203501*a[0]*b[2] + 18.52805251*a[0]*b[3] + 24.70407001*a[0]*b[4] + 30.88008752*a[0]*b[5] + 37.05610502*a[0]*b[6] + 43.23212252*a[0]*b[7] + 6.176017503*a[1]*b[1] + 12.35203501*a[1]*b[2] + 18.52805251*a[1]*b[3] + 24.70407001*a[1]*b[4] + 30.88008752*a[1]*b[5] + 37.05610502*a[1]*b[6] + 43.23212252*a[1]*b[7] + 6.176017503*a[2]*b[1] + 12.35203501*a[2]*b[2] + 18.52805251*a[2]*b[3] + 24.70407001*a[2]*b[4] + 30.88008752*a[2]*b[5] + 37.05610502*a[2]*b[6] + 43.23212252*a[2]*b[7] + 6.176017503*a[3]*b[1] + 12.35203501*a[3]*b[2] + 18.52805251*a[3]*b[3] + 24.70407001*a[3]*b[4] + 30.88008752*a[3]*b[5] + 37.05610502*a[3]*b[6] + 43.23212252*a[3]*b[7] + 6.176017503*a[4]*b[1] + 12.35203501*a[4]*b[2] + 18.52805251*a[4]*b[3] + 24.70407001*a[4]*b[4] + 30.88008752*a[4]*b[5] + 37.05610502*a[4]*b[6] + 43.23212252*a[4]*b[7] + 6.176017503*a[5]*b[1] + 12.35203501*a[5]*b[2] + 18.52805251*a[5]*b[3] + 24.70407001*a[5]*b[4] + 30.88008752*a[5]*b[5] + 37.05610502*a[5]*b[6] + 43.23212252*a[5]*b[7] + 6.176017503*a[6]*b[1] + 12.35203501*a[6]*b[2] + 18.52805251*a[6]*b[3] + 24.70407001*a[6]*b[4] + 30.88008752*a[6]*b[5] + 37.05610502*a[6]*b[6] + 43.23212252*a[6]*b[7] + 6.176017503*a[7]*b[1] + 12.35203501*a[7]*b[2] + 18.52805251*a[7]*b[3] + 24.70407001*a[7]*b[4] + 30.88008752*a[7]*b[5] + 37.05610502*a[7]*b[6] + 43.23212252*a[7]*b[7] + 6.176017503*a[8]*b[1] + 12.35203501*a[8]*b[2] + 18.52805251*a[8]*b[3] + 24.70407001*a[8]*b[4] + 30.88008752*a[8]*b[5] + 37.05610502*a[8]*b[6] + 43.23212252*a[8]*b[7] + 6.176017503*a[9]*b[1] + 12.35203501*a[9]*b[2] + 18.52805251*a[9]*b[3] + 24.70407001*a[9]*b[4] + 30.88008752*a[9]*b[5] + 37.05610502*a[9]*b[6] + 43.23212252*a[9]*b[7] + 6.176017503*a[0]*b[1] = 0:
eq[23] := 6.358226454*b[3] + 6.176017503*a[1]*b[1] + 12.35203501*a[0]*b[2] + 126.2164778*a[3] + 0.5*d[1] = 0:
eq[24] := 2.5*d[5] + 3.0*d[6] + 3.5*d[7] + 1.5*d[3] + 2.0*d[4] + 0.5*d[1] + d[2] + 222.5379259*b[7] + 63.58226454*b[5] + 127.1645291*b[6] + 6.358226454*b[3] + 25.43290582*b[4] + 10602.18414*a[9] + 2524.329557*a[6] + 4417.576724*a[7] + 7068.122760*a[8] + 126.2164778*a[3] + 504.8659114*a[4] + 1262.164778*a[5] + 12.35203501*a[0]*b[2] + 37.05610502*a[0]*b[3] + 74.11221004*a[0]*b[4] + 123.5203501*a[0]*b[5] + 185.2805251*a[0]*b[6] + 259.3927351*a[0]*b[7] + 6.176017503*a[1]*b[1] + 24.70407002*a[1]*b[2] + 55.58415753*a[1]*b[3] + 98.81628005*a[1]*b[4] + 154.4004376*a[1]*b[5] + 222.3366301*a[1]*b[6] + 302.6248576*a[1]*b[7] + 12.35203501*a[2]*b[1] + 37.05610502*a[2]*b[2] + 74.11221004*a[2]*b[3] + 123.5203501*a[2]*b[4] + 185.2805251*a[2]*b[5] + 259.3927351*a[2]*b[6] + 345.8569801*a[2]*b[7] + 18.52805251*a[3]*b[1] + 49.40814003*a[3]*b[2] + 92.64026255*a[3]*b[3] + 148.2244201*a[3]*b[4] + 216.1606126*a[3]*b[5] + 296.4488402*a[3]*b[6] + 389.0891027*a[3]*b[7] + 24.70407001*a[4]*b[1] + 61.76017503*a[4]*b[2] + 111.1683151*a[4]*b[3] + 172.9284901*a[4]*b[4] + 247.0407002*a[4]*b[5] + 333.5049452*a[4]*b[6] + 432.3212252*a[4]*b[7] + 30.88008752*a[5]*b[1] + 74.11221004*a[5]*b[2] + 129.6963676*a[5]*b[3] + 197.6325601*a[5]*b[4] + 277.9207877*a[5]*b[5] + 370.5610502*a[5]*b[6] + 475.5533477*a[5]*b[7] + 37.05610502*a[6]*b[1] + 86.46424505*a[6]*b[2] + 148.2244201*a[6]*b[3] + 222.3366301*a[6]*b[4] + 308.8008752*a[6]*b[5] + 407.6171552*a[6]*b[6] + 518.7854702*a[6]*b[7] + 43.23212252*a[7]*b[1] + 98.81628005*a[7]*b[2] + 166.7524726*a[7]*b[3] + 247.0407001*a[7]*b[4] + 339.6809627*a[7]*b[5] + 444.6732602*a[7]*b[6] + 562.0175927*a[7]*b[7] + 49.40814002*a[8]*b[1] + 111.1683151*a[8]*b[2] + 185.2805251*a[8]*b[3] + 271.7447701*a[8]*b[4] + 370.5610502*a[8]*b[5] + 481.7293652*a[8]*b[6] + 605.2497153*a[8]*b[7] + 55.58415753*a[9]*b[1] + 123.5203501*a[9]*b[2] + 203.8085776*a[9]*b[3] + 296.4488401*a[9]*b[4] + 401.4411377*a[9]*b[5] + 518.7854703*a[9]*b[6] + 648.4818378*a[9]*b[7] = 0:
eq[25] := 25.43290582*b[4] + 12.35203501*a[2]*b[1] + 24.70407002*a[1]*b[2] + 37.05610502*a[0]*b[3] + 504.8659114*a[4] + d[2] = 0:
eq[26] := 10.0*d[5] + 15.0*d[6] + 21.0*d[7] + 3.0*d[3] + 6.0*d[4] + d[2] + 890.1517036*b[7] + 127.1645291*b[5] + 381.4935873*b[6] + 25.43290582*b[4] + 63613.10484*a[9] + 7572.988671*a[6] + 17670.30690*a[7] + 35340.61380*a[8] + 504.8659114*a[4] + 2524.329556*a[5] + 37.05610502*a[0]*b[3] + 148.2244201*a[0]*b[4] + 370.5610502*a[0]*b[5] + 741.1221004*a[0]*b[6] + 1296.963676*a[0]*b[7] + 24.70407002*a[1]*b[2] + 111.1683151*a[1]*b[3] + 296.4488402*a[1]*b[4] + 617.6017504*a[1]*b[5] + 1111.683151*a[1]*b[6] + 1815.749146*a[1]*b[7] + 12.35203501*a[2]*b[1] + 74.11221005*a[2]*b[2] + 222.3366301*a[2]*b[3] + 494.0814003*a[2]*b[4] + 926.4026256*a[2]*b[5] + 1556.356411*a[2]*b[6] + 2420.998862*a[2]*b[7] + 37.05610502*a[3]*b[1] + 148.2244201*a[3]*b[2] + 370.5610503*a[3]*b[3] + 741.1221006*a[3]*b[4] + 1296.963676*a[3]*b[5] + 2075.141881*a[3]*b[6] + 3112.712822*a[3]*b[7] + 74.11221004*a[4]*b[1] + 247.0407002*a[4]*b[2] + 555.8415753*a[4]*b[3] + 1037.570941*a[4]*b[4] + 1729.284901*a[4]*b[5] + 2668.039561*a[4]*b[6] + 3890.891028*a[4]*b[7] + 123.5203501*a[5]*b[1] + 370.5610502*a[5]*b[2] + 778.1782055*a[5]*b[3] + 1383.427921*a[5]*b[4] + 2223.366301*a[5]*b[5] + 3335.049452*a[5]*b[6] + 4755.533478*a[5]*b[7] + 185.2805251*a[6]*b[1] + 518.7854703*a[6]*b[2] + 1037.570941*a[6]*b[3] + 1778.693041*a[6]*b[4] + 2779.207876*a[6]*b[5] + 4076.171553*a[6]*b[6] + 5706.640175*a[6]*b[7] + 259.3927351*a[7]*b[1] + 691.7139604*a[7]*b[2] + 1334.019781*a[7]*b[3] + 2223.366302*a[7]*b[4] + 3396.809627*a[7]*b[5] + 4891.405863*a[7]*b[6] + 6744.211115*a[7]*b[7] + 345.8569802*a[8]*b[1] + 889.3465205*a[8]*b[2] + 1667.524727*a[8]*b[3] + 2717.447702*a[8]*b[4] + 4076.171553*a[8]*b[5] + 5780.752383*a[8]*b[6] + 7868.246300*a[8]*b[7] + 444.6732602*a[9]*b[1] + 1111.683151*a[9]*b[2] + 2038.085777*a[9]*b[3] + 3260.937242*a[9]*b[4] + 4817.293653*a[9]*b[5] + 6744.211114*a[9]*b[6] + 9078.745732*a[9]*b[7] = 0:
 

solve([seq(eq[i], i = 1 .. 26)],{seq(a[i], i = 0 .. 9),seq(b[i], i = 0 .. 7),seq(d[i], i = 0 .. 7)});

Thanks a lot.
 

Suppose I have a list of 10 thousand expressions containing the symbol x. I would like to integrate all of them in the range x=0..1 and store the result in a new list or array of 10 thousand elements. I run Maple on a server with 32 CPUs and would like to parallelize the computation. Could you give some code samples showing how this can be done? Since the starting expressions vary greatly in complexity, some kind of dynamics load balancing (rather than dividing the calculation "equally") would be also very useful. Thanks for any help!

Please, what is the maple code for solving the following initial value problems?

The function n->ceil(sqrt(4*n))-floor(sqrt(2*n))-1 counts the number of squares strictly between 2n and 4n.

Maple 2016 gives the same output as what I get when I create a plot here:

Note, however, that Maple does not plot at least the point of interest (72.4), which is nevertheless an element of the graph:

[10, 2], [11, 2], [12, 2], [13, 2], [14, 2], [15, 2], [16, 2], [17, 3], [18, 2], [19, 2], [20, 2], [21, 3], [22, 3], [23, 3], [24, 3], [25, 2], [26, 3], [27, 3], [28, 3], [29, 3], [30, 3], [31, 4], [32, 3], [33, 3], [34, 3], [35, 3], [36, 3], [37, 4], [38, 4], [39, 4], [40, 4], [41, 3], [42, 3], [43, 4], [44, 4], [45, 4], [46, 4], [47, 4], [48, 4], [49, 4], [50, 4], [51, 4], [52, 4], [53, 4], [54, 4], [55, 4], [56, 4], [57, 5], [58, 5], [59, 5], [60, 5], [61, 4], [62, 4], [63, 4], [64, 4], [65, 5], [66, 5], [67, 5], [68, 5], [69, 5], [70, 5], [71, 5], [72, 4], [73, 5], [74, 5], [75, 5], [76, 5], [77, 5], [78, 5], [79, 5], [80, 5], [81, 5], [82, 6], [83, 6], [84, 6], [85, 5], [86, 5], [87, 5], [88, 5], [89, 5], [90, 5], [91, 6], [92, 6], [93, 6], [94, 6], [95, 6], [96, 6], [97, 6], [98, 5], [99, 5], [100, 5]

What's going wrong here?
Regards
Prof.G

example.msim

I want to get an adjustable parameter in maplesim. For example, here is a pulse voltage source, i  want to make its amplitude controlled by another voltage output (doesn't exist in this .msim).

hello 
i want to reflect a plot i have j:= plot(y(x),x=0..35) ,y(x) icludes heavside functions around  x=17.5 , for some reason maple using reflect function keeps returning the reflected function in the output and not just the plot. i would like to get rid of it .

reflect(j,[[17.5,0],[17.5,15]])
output : the reflected function of y(x)
the reflected graph. 

thanks for the help 

Hello,

I want to solve three coupled differential equations with initial and boundary conditions numerically and get the plots of solutions.

But I received errors.

Could you please help me to solve the error and get all three plots that I need?

My codes:

restart;

sys := {diff(phi(eta), eta$2) + 5.261282735*f(eta)*diff(phi(eta), eta) - 2.630641368*phi(eta) = 0, 1.059704409*diff(theta(eta), eta$2) + 6.176017503*f(eta)*diff(theta(eta), eta) + 21.03607964*diff(f(eta), eta$2) + 0.5*phi(eta) = 0, diff(f(eta), eta$4) - 1.052256547*diff(f(eta), eta)*diff(f(eta), eta$2) + 1.052256547*f(eta)*diff(f(eta), eta$3) + 5.165076420*diff(theta(eta), eta) + 5.261282735*diff(phi(eta), eta) = 0, eval(diff(phi(eta), eta), {eta = 0}) = 1 + 0.5*eval(diff(f(eta), eta$2), {eta = 0}), eval(diff(phi(eta), eta), {eta = 1}) = 0.5*eval(diff(f(eta), eta$2), {eta = 1}), f(0) = -0.5, f(1) = 0.5, phi(0) = 1, phi(1) = 0, theta(0) = 1, theta(1) = 0};

dsol:=dsolve(sys,numeric);
Error, (in dsolve/numeric/bvp/convertsys) unable to convert to an explicit first-order system
plots[odeplot]((dsol),eta=0..1);
Error, (in plots/odeplot) input is not a valid dsolve/numeric solution

Thank you.

To Maple support,

Why when removing symbol a from these equations makes Maple warning go away? This is from a textbook. Attached worksheet. 

restart;
ode:={diff(x__1(t),t)*sin(x__2(t))=x__4(t)*sin(x__3(t))+x__5(t)*cos(x__3(t)),diff(x__2(t),t)= x__4(t)*cos(x__3(t))-x__5(t)*sin(x__3(t)),diff(x__3(t),t)+diff(x__1(t),t)*cos(x__2(t))= 1,diff(x__4(t),t)-(1-B)*a*x__5(t)= sin(x__2(t))*cos(x__3(t)),diff(x__5(t),t)+(1-B)*a*x__4(t)=sin(x__2(t))*sin(x__3(t))};
dsolve(ode)

restart;
ode:={diff(x__1(t),t)*sin(x__2(t))=x__4(t)*sin(x__3(t))+x__5(t)*cos(x__3(t)),diff(x__2(t),t)= x__4(t)*cos(x__3(t))-x__5(t)*sin(x__3(t)),diff(x__3(t),t)+diff(x__1(t),t)*cos(x__2(t))= 1,diff(x__4(t),t)-(1-B)*x__5(t)= sin(x__2(t))*cos(x__3(t)),diff(x__5(t),t)+(1-B)*a*x__4(t)=sin(x__2(t))*sin(x__3(t))};
dsolve(ode)

worksheet attached also

Download warning_may_10_2022.mw