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\(\int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx\) [1662]

   Optimal result
   Rubi [B] (verified)
   Mathematica [A] (verified)
   Maple [B] (verified)
   Fricas [B] (verification not implemented)
   Sympy [B] (verification not implemented)
   Maxima [B] (verification not implemented)
   Giac [B] (verification not implemented)
   Mupad [B] (verification not implemented)

Optimal result

Integrand size = 22, antiderivative size = 18 \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=-2+x+12 \left (x+(5 (4-2 x)+x)^{22}\right ) \]

[Out]

13*x-2+12*(-9*x+20)^22

Rubi [B] (verified)

Leaf count is larger than twice the leaf count of optimal. \(109\) vs. \(2(18)=36\).

Time = 0.03 (sec) , antiderivative size = 109, normalized size of antiderivative = 6.06, number of steps used = 2, number of rules used = 1, \(\frac {\text {number of rules}}{\text {integrand size}}\) = 0.045, Rules used = {1600} \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=11817250826203334794572 x^{22}-577732262614385256623520 x^{21}+13480419461002322654548800 x^{20}-199709917940775150437760000 x^{19}+2108049133819293254620800000 x^{18}-16864393070554346036966400000 x^{17}+106183215629416252825344000000 x^{16}-539343317482749220700160000000 x^{15}+2247263822844788419584000000000 x^{14}-7768319387611614289920000000000 x^{13}+22441811564211330170880000000000 x^{12}-54404391670815345868800000000000 x^{11}+110823760810920148992000000000000 x^{10}-189442326172513075200000000000000 x^9+270631894532161536000000000000000 x^8-320748912038117376000000000000000 x^7+311839220037058560000000000000000 x^6-244579780421222400000000000000000 x^5+150975173099520000000000000000000 x^4-70631659929600000000000000000000 x^3+23543886643200000000000000000000 x^2-4982833151999999999999999999987 x \]

[In]

Int[(-260 + 2376*(20 - 9*x)^22 + 117*x)/(-20 + 9*x),x]

[Out]

-4982833151999999999999999999987*x + 23543886643200000000000000000000*x^2 - 70631659929600000000000000000000*x
^3 + 150975173099520000000000000000000*x^4 - 244579780421222400000000000000000*x^5 + 3118392200370585600000000
00000000*x^6 - 320748912038117376000000000000000*x^7 + 270631894532161536000000000000000*x^8 - 189442326172513
075200000000000000*x^9 + 110823760810920148992000000000000*x^10 - 54404391670815345868800000000000*x^11 + 2244
1811564211330170880000000000*x^12 - 7768319387611614289920000000000*x^13 + 2247263822844788419584000000000*x^1
4 - 539343317482749220700160000000*x^15 + 106183215629416252825344000000*x^16 - 16864393070554346036966400000*
x^17 + 2108049133819293254620800000*x^18 - 199709917940775150437760000*x^19 + 13480419461002322654548800*x^20
- 577732262614385256623520*x^21 + 11817250826203334794572*x^22

Rule 1600

Int[(u_.)*(Px_)^(p_.)*(Qx_)^(q_.), x_Symbol] :> Int[u*PolynomialQuotient[Px, Qx, x]^p*Qx^(p + q), x] /; FreeQ[
q, x] && PolyQ[Px, x] && PolyQ[Qx, x] && EqQ[PolynomialRemainder[Px, Qx, x], 0] && IntegerQ[p] && LtQ[p*q, 0]

Rubi steps \begin{align*} \text {integral}& = \int \left (-4982833151999999999999999999987+47087773286400000000000000000000 x-211894979788800000000000000000000 x^2+603900692398080000000000000000000 x^3-1222898902106112000000000000000000 x^4+1871035320222351360000000000000000 x^5-2245242384266821632000000000000000 x^6+2165055156257292288000000000000000 x^7-1704980935552617676800000000000000 x^8+1108237608109201489920000000000000 x^9-598448308378968804556800000000000 x^{10}+269301738770535962050560000000000 x^{11}-100988152038950985768960000000000 x^{12}+31461693519827037874176000000000 x^{13}-8090149762241238310502400000000 x^{14}+1698931450070660045205504000000 x^{15}-286694682199423882628428800000 x^{16}+37944884408747278583174400000 x^{17}-3794488440874727858317440000 x^{18}+269608389220046453090976000 x^{19}-12132377514902090389093920 x^{20}+259979518176473365480584 x^{21}\right ) \, dx \\ & = -4982833151999999999999999999987 x+23543886643200000000000000000000 x^2-70631659929600000000000000000000 x^3+150975173099520000000000000000000 x^4-244579780421222400000000000000000 x^5+311839220037058560000000000000000 x^6-320748912038117376000000000000000 x^7+270631894532161536000000000000000 x^8-189442326172513075200000000000000 x^9+110823760810920148992000000000000 x^{10}-54404391670815345868800000000000 x^{11}+22441811564211330170880000000000 x^{12}-7768319387611614289920000000000 x^{13}+2247263822844788419584000000000 x^{14}-539343317482749220700160000000 x^{15}+106183215629416252825344000000 x^{16}-16864393070554346036966400000 x^{17}+2108049133819293254620800000 x^{18}-199709917940775150437760000 x^{19}+13480419461002322654548800 x^{20}-577732262614385256623520 x^{21}+11817250826203334794572 x^{22} \\ \end{align*}

Mathematica [A] (verified)

Time = 0.01 (sec) , antiderivative size = 16, normalized size of antiderivative = 0.89 \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=-\frac {260}{9}+12 (20-9 x)^{22}+13 x \]

[In]

Integrate[(-260 + 2376*(20 - 9*x)^22 + 117*x)/(-20 + 9*x),x]

[Out]

-260/9 + 12*(20 - 9*x)^22 + 13*x

Maple [B] (verified)

Leaf count of result is larger than twice the leaf count of optimal. \(107\) vs. \(2(14)=28\).

Time = 0.33 (sec) , antiderivative size = 108, normalized size of antiderivative = 6.00

method result size
gosper \(x \left (11817250826203334794572 x^{21}-577732262614385256623520 x^{20}+13480419461002322654548800 x^{19}-199709917940775150437760000 x^{18}+2108049133819293254620800000 x^{17}-16864393070554346036966400000 x^{16}+106183215629416252825344000000 x^{15}-539343317482749220700160000000 x^{14}+2247263822844788419584000000000 x^{13}-7768319387611614289920000000000 x^{12}+22441811564211330170880000000000 x^{11}-54404391670815345868800000000000 x^{10}+110823760810920148992000000000000 x^{9}-189442326172513075200000000000000 x^{8}+270631894532161536000000000000000 x^{7}-320748912038117376000000000000000 x^{6}+311839220037058560000000000000000 x^{5}-244579780421222400000000000000000 x^{4}+150975173099520000000000000000000 x^{3}-70631659929600000000000000000000 x^{2}+23543886643200000000000000000000 x -4982833151999999999999999999987\right )\) \(108\)
default \(11817250826203334794572 x^{22}-577732262614385256623520 x^{21}+13480419461002322654548800 x^{20}-199709917940775150437760000 x^{19}+2108049133819293254620800000 x^{18}-16864393070554346036966400000 x^{17}+106183215629416252825344000000 x^{16}-539343317482749220700160000000 x^{15}+2247263822844788419584000000000 x^{14}-7768319387611614289920000000000 x^{13}+22441811564211330170880000000000 x^{12}-54404391670815345868800000000000 x^{11}+110823760810920148992000000000000 x^{10}-189442326172513075200000000000000 x^{9}+270631894532161536000000000000000 x^{8}-320748912038117376000000000000000 x^{7}+311839220037058560000000000000000 x^{6}-244579780421222400000000000000000 x^{5}+150975173099520000000000000000000 x^{4}-70631659929600000000000000000000 x^{3}+23543886643200000000000000000000 x^{2}-4982833151999999999999999999987 x\) \(110\)
norman \(11817250826203334794572 x^{22}-577732262614385256623520 x^{21}+13480419461002322654548800 x^{20}-199709917940775150437760000 x^{19}+2108049133819293254620800000 x^{18}-16864393070554346036966400000 x^{17}+106183215629416252825344000000 x^{16}-539343317482749220700160000000 x^{15}+2247263822844788419584000000000 x^{14}-7768319387611614289920000000000 x^{13}+22441811564211330170880000000000 x^{12}-54404391670815345868800000000000 x^{11}+110823760810920148992000000000000 x^{10}-189442326172513075200000000000000 x^{9}+270631894532161536000000000000000 x^{8}-320748912038117376000000000000000 x^{7}+311839220037058560000000000000000 x^{6}-244579780421222400000000000000000 x^{5}+150975173099520000000000000000000 x^{4}-70631659929600000000000000000000 x^{3}+23543886643200000000000000000000 x^{2}-4982833151999999999999999999987 x\) \(110\)
risch \(11817250826203334794572 x^{22}-577732262614385256623520 x^{21}+13480419461002322654548800 x^{20}-199709917940775150437760000 x^{19}+2108049133819293254620800000 x^{18}-16864393070554346036966400000 x^{17}+106183215629416252825344000000 x^{16}-539343317482749220700160000000 x^{15}+2247263822844788419584000000000 x^{14}-7768319387611614289920000000000 x^{13}+22441811564211330170880000000000 x^{12}-54404391670815345868800000000000 x^{11}+110823760810920148992000000000000 x^{10}-189442326172513075200000000000000 x^{9}+270631894532161536000000000000000 x^{8}-320748912038117376000000000000000 x^{7}+311839220037058560000000000000000 x^{6}-244579780421222400000000000000000 x^{5}+150975173099520000000000000000000 x^{4}-70631659929600000000000000000000 x^{3}+23543886643200000000000000000000 x^{2}-4982833151999999999999999999987 x\) \(110\)
parallelrisch \(11817250826203334794572 x^{22}-577732262614385256623520 x^{21}+13480419461002322654548800 x^{20}-199709917940775150437760000 x^{19}+2108049133819293254620800000 x^{18}-16864393070554346036966400000 x^{17}+106183215629416252825344000000 x^{16}-539343317482749220700160000000 x^{15}+2247263822844788419584000000000 x^{14}-7768319387611614289920000000000 x^{13}+22441811564211330170880000000000 x^{12}-54404391670815345868800000000000 x^{11}+110823760810920148992000000000000 x^{10}-189442326172513075200000000000000 x^{9}+270631894532161536000000000000000 x^{8}-320748912038117376000000000000000 x^{7}+311839220037058560000000000000000 x^{6}-244579780421222400000000000000000 x^{5}+150975173099520000000000000000000 x^{4}-70631659929600000000000000000000 x^{3}+23543886643200000000000000000000 x^{2}-4982833151999999999999999999987 x\) \(110\)
parts \(11817250826203334794572 x^{22}-577732262614385256623520 x^{21}+13480419461002322654548800 x^{20}-199709917940775150437760000 x^{19}+2108049133819293254620800000 x^{18}-16864393070554346036966400000 x^{17}+106183215629416252825344000000 x^{16}-539343317482749220700160000000 x^{15}+2247263822844788419584000000000 x^{14}-7768319387611614289920000000000 x^{13}+22441811564211330170880000000000 x^{12}-54404391670815345868800000000000 x^{11}+110823760810920148992000000000000 x^{10}-189442326172513075200000000000000 x^{9}+270631894532161536000000000000000 x^{8}-320748912038117376000000000000000 x^{7}+311839220037058560000000000000000 x^{6}-244579780421222400000000000000000 x^{5}+150975173099520000000000000000000 x^{4}-70631659929600000000000000000000 x^{3}+23543886643200000000000000000000 x^{2}-4982833151999999999999999999987 x\) \(110\)
meijerg \(\text {Expression too large to display}\) \(1223\)

[In]

int((2376*(-9*x+20)^22+117*x-260)/(9*x-20),x,method=_RETURNVERBOSE)

[Out]

x*(11817250826203334794572*x^21-577732262614385256623520*x^20+13480419461002322654548800*x^19-1997099179407751
50437760000*x^18+2108049133819293254620800000*x^17-16864393070554346036966400000*x^16+106183215629416252825344
000000*x^15-539343317482749220700160000000*x^14+2247263822844788419584000000000*x^13-7768319387611614289920000
000000*x^12+22441811564211330170880000000000*x^11-54404391670815345868800000000000*x^10+1108237608109201489920
00000000000*x^9-189442326172513075200000000000000*x^8+270631894532161536000000000000000*x^7-320748912038117376
000000000000000*x^6+311839220037058560000000000000000*x^5-244579780421222400000000000000000*x^4+15097517309952
0000000000000000000*x^3-70631659929600000000000000000000*x^2+23543886643200000000000000000000*x-49828331519999
99999999999999987)

Fricas [B] (verification not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 109 vs. \(2 (14) = 28\).

Time = 0.24 (sec) , antiderivative size = 109, normalized size of antiderivative = 6.06 \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=11817250826203334794572 \, x^{22} - 577732262614385256623520 \, x^{21} + 13480419461002322654548800 \, x^{20} - 199709917940775150437760000 \, x^{19} + 2108049133819293254620800000 \, x^{18} - 16864393070554346036966400000 \, x^{17} + 106183215629416252825344000000 \, x^{16} - 539343317482749220700160000000 \, x^{15} + 2247263822844788419584000000000 \, x^{14} - 7768319387611614289920000000000 \, x^{13} + 22441811564211330170880000000000 \, x^{12} - 54404391670815345868800000000000 \, x^{11} + 110823760810920148992000000000000 \, x^{10} - 189442326172513075200000000000000 \, x^{9} + 270631894532161536000000000000000 \, x^{8} - 320748912038117376000000000000000 \, x^{7} + 311839220037058560000000000000000 \, x^{6} - 244579780421222400000000000000000 \, x^{5} + 150975173099520000000000000000000 \, x^{4} - 70631659929600000000000000000000 \, x^{3} + 23543886643200000000000000000000 \, x^{2} - 4982833151999999999999999999987 \, x \]

[In]

integrate((2376*(-9*x+20)^22+117*x-260)/(9*x-20),x, algorithm="fricas")

[Out]

11817250826203334794572*x^22 - 577732262614385256623520*x^21 + 13480419461002322654548800*x^20 - 1997099179407
75150437760000*x^19 + 2108049133819293254620800000*x^18 - 16864393070554346036966400000*x^17 + 106183215629416
252825344000000*x^16 - 539343317482749220700160000000*x^15 + 2247263822844788419584000000000*x^14 - 7768319387
611614289920000000000*x^13 + 22441811564211330170880000000000*x^12 - 54404391670815345868800000000000*x^11 + 1
10823760810920148992000000000000*x^10 - 189442326172513075200000000000000*x^9 + 270631894532161536000000000000
000*x^8 - 320748912038117376000000000000000*x^7 + 311839220037058560000000000000000*x^6 - 24457978042122240000
0000000000000*x^5 + 150975173099520000000000000000000*x^4 - 70631659929600000000000000000000*x^3 + 23543886643
200000000000000000000*x^2 - 4982833151999999999999999999987*x

Sympy [B] (verification not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 109 vs. \(2 (12) = 24\).

Time = 0.05 (sec) , antiderivative size = 109, normalized size of antiderivative = 6.06 \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=11817250826203334794572 x^{22} - 577732262614385256623520 x^{21} + 13480419461002322654548800 x^{20} - 199709917940775150437760000 x^{19} + 2108049133819293254620800000 x^{18} - 16864393070554346036966400000 x^{17} + 106183215629416252825344000000 x^{16} - 539343317482749220700160000000 x^{15} + 2247263822844788419584000000000 x^{14} - 7768319387611614289920000000000 x^{13} + 22441811564211330170880000000000 x^{12} - 54404391670815345868800000000000 x^{11} + 110823760810920148992000000000000 x^{10} - 189442326172513075200000000000000 x^{9} + 270631894532161536000000000000000 x^{8} - 320748912038117376000000000000000 x^{7} + 311839220037058560000000000000000 x^{6} - 244579780421222400000000000000000 x^{5} + 150975173099520000000000000000000 x^{4} - 70631659929600000000000000000000 x^{3} + 23543886643200000000000000000000 x^{2} - 4982833151999999999999999999987 x \]

[In]

integrate((2376*(-9*x+20)**22+117*x-260)/(9*x-20),x)

[Out]

11817250826203334794572*x**22 - 577732262614385256623520*x**21 + 13480419461002322654548800*x**20 - 1997099179
40775150437760000*x**19 + 2108049133819293254620800000*x**18 - 16864393070554346036966400000*x**17 + 106183215
629416252825344000000*x**16 - 539343317482749220700160000000*x**15 + 2247263822844788419584000000000*x**14 - 7
768319387611614289920000000000*x**13 + 22441811564211330170880000000000*x**12 - 544043916708153458688000000000
00*x**11 + 110823760810920148992000000000000*x**10 - 189442326172513075200000000000000*x**9 + 2706318945321615
36000000000000000*x**8 - 320748912038117376000000000000000*x**7 + 311839220037058560000000000000000*x**6 - 244
579780421222400000000000000000*x**5 + 150975173099520000000000000000000*x**4 - 7063165992960000000000000000000
0*x**3 + 23543886643200000000000000000000*x**2 - 4982833151999999999999999999987*x

Maxima [B] (verification not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 109 vs. \(2 (14) = 28\).

Time = 0.18 (sec) , antiderivative size = 109, normalized size of antiderivative = 6.06 \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=11817250826203334794572 \, x^{22} - 577732262614385256623520 \, x^{21} + 13480419461002322654548800 \, x^{20} - 199709917940775150437760000 \, x^{19} + 2108049133819293254620800000 \, x^{18} - 16864393070554346036966400000 \, x^{17} + 106183215629416252825344000000 \, x^{16} - 539343317482749220700160000000 \, x^{15} + 2247263822844788419584000000000 \, x^{14} - 7768319387611614289920000000000 \, x^{13} + 22441811564211330170880000000000 \, x^{12} - 54404391670815345868800000000000 \, x^{11} + 110823760810920148992000000000000 \, x^{10} - 189442326172513075200000000000000 \, x^{9} + 270631894532161536000000000000000 \, x^{8} - 320748912038117376000000000000000 \, x^{7} + 311839220037058560000000000000000 \, x^{6} - 244579780421222400000000000000000 \, x^{5} + 150975173099520000000000000000000 \, x^{4} - 70631659929600000000000000000000 \, x^{3} + 23543886643200000000000000000000 \, x^{2} - 4982833151999999999999999999987 \, x \]

[In]

integrate((2376*(-9*x+20)^22+117*x-260)/(9*x-20),x, algorithm="maxima")

[Out]

11817250826203334794572*x^22 - 577732262614385256623520*x^21 + 13480419461002322654548800*x^20 - 1997099179407
75150437760000*x^19 + 2108049133819293254620800000*x^18 - 16864393070554346036966400000*x^17 + 106183215629416
252825344000000*x^16 - 539343317482749220700160000000*x^15 + 2247263822844788419584000000000*x^14 - 7768319387
611614289920000000000*x^13 + 22441811564211330170880000000000*x^12 - 54404391670815345868800000000000*x^11 + 1
10823760810920148992000000000000*x^10 - 189442326172513075200000000000000*x^9 + 270631894532161536000000000000
000*x^8 - 320748912038117376000000000000000*x^7 + 311839220037058560000000000000000*x^6 - 24457978042122240000
0000000000000*x^5 + 150975173099520000000000000000000*x^4 - 70631659929600000000000000000000*x^3 + 23543886643
200000000000000000000*x^2 - 4982833151999999999999999999987*x

Giac [B] (verification not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 109 vs. \(2 (14) = 28\).

Time = 0.25 (sec) , antiderivative size = 109, normalized size of antiderivative = 6.06 \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=11817250826203334794572 \, x^{22} - 577732262614385256623520 \, x^{21} + 13480419461002322654548800 \, x^{20} - 199709917940775150437760000 \, x^{19} + 2108049133819293254620800000 \, x^{18} - 16864393070554346036966400000 \, x^{17} + 106183215629416252825344000000 \, x^{16} - 539343317482749220700160000000 \, x^{15} + 2247263822844788419584000000000 \, x^{14} - 7768319387611614289920000000000 \, x^{13} + 22441811564211330170880000000000 \, x^{12} - 54404391670815345868800000000000 \, x^{11} + 110823760810920148992000000000000 \, x^{10} - 189442326172513075200000000000000 \, x^{9} + 270631894532161536000000000000000 \, x^{8} - 320748912038117376000000000000000 \, x^{7} + 311839220037058560000000000000000 \, x^{6} - 244579780421222400000000000000000 \, x^{5} + 150975173099520000000000000000000 \, x^{4} - 70631659929600000000000000000000 \, x^{3} + 23543886643200000000000000000000 \, x^{2} - 4982833151999999999999999999987 \, x \]

[In]

integrate((2376*(-9*x+20)^22+117*x-260)/(9*x-20),x, algorithm="giac")

[Out]

11817250826203334794572*x^22 - 577732262614385256623520*x^21 + 13480419461002322654548800*x^20 - 1997099179407
75150437760000*x^19 + 2108049133819293254620800000*x^18 - 16864393070554346036966400000*x^17 + 106183215629416
252825344000000*x^16 - 539343317482749220700160000000*x^15 + 2247263822844788419584000000000*x^14 - 7768319387
611614289920000000000*x^13 + 22441811564211330170880000000000*x^12 - 54404391670815345868800000000000*x^11 + 1
10823760810920148992000000000000*x^10 - 189442326172513075200000000000000*x^9 + 270631894532161536000000000000
000*x^8 - 320748912038117376000000000000000*x^7 + 311839220037058560000000000000000*x^6 - 24457978042122240000
0000000000000*x^5 + 150975173099520000000000000000000*x^4 - 70631659929600000000000000000000*x^3 + 23543886643
200000000000000000000*x^2 - 4982833151999999999999999999987*x

Mupad [B] (verification not implemented)

Time = 8.69 (sec) , antiderivative size = 109, normalized size of antiderivative = 6.06 \[ \int \frac {-260+2376 (20-9 x)^{22}+117 x}{-20+9 x} \, dx=11817250826203334794572\,x^{22}-577732262614385256623520\,x^{21}+13480419461002322654548800\,x^{20}-199709917940775150437760000\,x^{19}+2108049133819293254620800000\,x^{18}-16864393070554346036966400000\,x^{17}+106183215629416252825344000000\,x^{16}-539343317482749220700160000000\,x^{15}+2247263822844788419584000000000\,x^{14}-7768319387611614289920000000000\,x^{13}+22441811564211330170880000000000\,x^{12}-54404391670815345868800000000000\,x^{11}+110823760810920148992000000000000\,x^{10}-189442326172513075200000000000000\,x^9+270631894532161536000000000000000\,x^8-320748912038117376000000000000000\,x^7+311839220037058560000000000000000\,x^6-244579780421222400000000000000000\,x^5+150975173099520000000000000000000\,x^4-70631659929600000000000000000000\,x^3+23543886643200000000000000000000\,x^2-4982833151999999999999999999987\,x \]

[In]

int((117*x + 2376*(9*x - 20)^22 - 260)/(9*x - 20),x)

[Out]

23543886643200000000000000000000*x^2 - 4982833151999999999999999999987*x - 70631659929600000000000000000000*x^
3 + 150975173099520000000000000000000*x^4 - 244579780421222400000000000000000*x^5 + 31183922003705856000000000
0000000*x^6 - 320748912038117376000000000000000*x^7 + 270631894532161536000000000000000*x^8 - 1894423261725130
75200000000000000*x^9 + 110823760810920148992000000000000*x^10 - 54404391670815345868800000000000*x^11 + 22441
811564211330170880000000000*x^12 - 7768319387611614289920000000000*x^13 + 2247263822844788419584000000000*x^14
 - 539343317482749220700160000000*x^15 + 106183215629416252825344000000*x^16 - 16864393070554346036966400000*x
^17 + 2108049133819293254620800000*x^18 - 199709917940775150437760000*x^19 + 13480419461002322654548800*x^20 -
 577732262614385256623520*x^21 + 11817250826203334794572*x^22

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