\(\int \frac {5+x+3 x^2+2 x^3}{x^2 (2+x+5 x^2+x^3+2 x^4)} \, dx\) [255]

Optimal result

Integrand size = 35, antiderivative size = 281 \[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=-\frac {35-9 i \sqrt {7}}{28 x}-\frac {35+9 i \sqrt {7}}{28 x}+\frac {11 \left (9+5 i \sqrt {7}\right ) \text {arctanh}\left (\frac {i-\sqrt {7}+8 i x}{\sqrt {2 \left (35-i \sqrt {7}\right )}}\right )}{4 \sqrt {14 \left (35-i \sqrt {7}\right )}}-\frac {11 \left (9-5 i \sqrt {7}\right ) \text {arctanh}\left (\frac {i+\sqrt {7}+8 i x}{\sqrt {2 \left (35+i \sqrt {7}\right )}}\right )}{4 \sqrt {14 \left (35+i \sqrt {7}\right )}}-\frac {3}{56} \left (7-11 i \sqrt {7}\right ) \log (x)-\frac {3}{56} \left (7+11 i \sqrt {7}\right ) \log (x)+\frac {3}{112} \left (7+11 i \sqrt {7}\right ) \log \left (4 i+\left (i-\sqrt {7}\right ) x+4 i x^2\right )+\frac {3}{112} \left (7-11 i \sqrt {7}\right ) \log \left (4 i+\left (i+\sqrt {7}\right ) x+4 i x^2\right ) \]

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Rubi [A] (verified)

Time = 0.35 (sec) , antiderivative size = 281, normalized size of antiderivative = 1.00, number of steps used = 13, number of rules used = 6, \(\frac {\text {number of rules}}{\text {integrand size}}\) = 0.171, Rules used = {2112, 814, 648, 632, 212, 642} \[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=\frac {11 \left (9+5 i \sqrt {7}\right ) \text {arctanh}\left (\frac {8 i x-\sqrt {7}+i}{\sqrt {2 \left (35-i \sqrt {7}\right )}}\right )}{4 \sqrt {14 \left (35-i \sqrt {7}\right )}}-\frac {11 \left (9-5 i \sqrt {7}\right ) \text {arctanh}\left (\frac {8 i x+\sqrt {7}+i}{\sqrt {2 \left (35+i \sqrt {7}\right )}}\right )}{4 \sqrt {14 \left (35+i \sqrt {7}\right )}}+\frac {3}{112} \left (7+11 i \sqrt {7}\right ) \log \left (4 i x^2+\left (-\sqrt {7}+i\right ) x+4 i\right )+\frac {3}{112} \left (7-11 i \sqrt {7}\right ) \log \left (4 i x^2+\left (\sqrt {7}+i\right ) x+4 i\right )-\frac {35+9 i \sqrt {7}}{28 x}-\frac {35-9 i \sqrt {7}}{28 x}-\frac {3}{56} \left (7+11 i \sqrt {7}\right ) \log (x)-\frac {3}{56} \left (7-11 i \sqrt {7}\right ) \log (x) \]

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Rule 212

Rule 632

Rule 642

Rule 648

Rule 814

Rule 2112

Rubi steps \begin{align*} \text {integral}& = \frac {i \int \frac {9-5 i \sqrt {7}+\left (10-2 i \sqrt {7}\right ) x}{x^2 \left (4+\left (1-i \sqrt {7}\right ) x+4 x^2\right )} \, dx}{\sqrt {7}}-\frac {i \int \frac {9+5 i \sqrt {7}+\left (10+2 i \sqrt {7}\right ) x}{x^2 \left (4+\left (1+i \sqrt {7}\right ) x+4 x^2\right )} \, dx}{\sqrt {7}} \\ & = -\frac {i \int \left (\frac {9+5 i \sqrt {7}}{4 x^2}+\frac {3 \left (11-i \sqrt {7}\right )}{8 x}+\frac {-7 \left (9 i-5 \sqrt {7}\right )-6 \left (11 i+\sqrt {7}\right ) x}{4 \left (4 i+\left (i-\sqrt {7}\right ) x+4 i x^2\right )}\right ) \, dx}{\sqrt {7}}+\frac {i \int \left (\frac {9-5 i \sqrt {7}}{4 x^2}+\frac {3 \left (11+i \sqrt {7}\right )}{8 x}+\frac {-7 \left (9 i+5 \sqrt {7}\right )-6 \left (11 i-\sqrt {7}\right ) x}{4 \left (4 i+\left (i+\sqrt {7}\right ) x+4 i x^2\right )}\right ) \, dx}{\sqrt {7}} \\ & = -\frac {35-9 i \sqrt {7}}{28 x}-\frac {35+9 i \sqrt {7}}{28 x}-\frac {3}{56} \left (7-11 i \sqrt {7}\right ) \log (x)-\frac {3}{56} \left (7+11 i \sqrt {7}\right ) \log (x)-\frac {i \int \frac {-7 \left (9 i-5 \sqrt {7}\right )-6 \left (11 i+\sqrt {7}\right ) x}{4 i+\left (i-\sqrt {7}\right ) x+4 i x^2} \, dx}{4 \sqrt {7}}+\frac {i \int \frac {-7 \left (9 i+5 \sqrt {7}\right )-6 \left (11 i-\sqrt {7}\right ) x}{4 i+\left (i+\sqrt {7}\right ) x+4 i x^2} \, dx}{4 \sqrt {7}} \\ & = -\frac {35-9 i \sqrt {7}}{28 x}-\frac {35+9 i \sqrt {7}}{28 x}-\frac {3}{56} \left (7-11 i \sqrt {7}\right ) \log (x)-\frac {3}{56} \left (7+11 i \sqrt {7}\right ) \log (x)-\frac {1}{56} \left (11 \left (35 i-9 \sqrt {7}\right )\right ) \int \frac {1}{4 i+\left (i+\sqrt {7}\right ) x+4 i x^2} \, dx+\frac {1}{112} \left (3 \left (7-11 i \sqrt {7}\right )\right ) \int \frac {i+\sqrt {7}+8 i x}{4 i+\left (i+\sqrt {7}\right ) x+4 i x^2} \, dx+\frac {1}{112} \left (3 \left (7+11 i \sqrt {7}\right )\right ) \int \frac {i-\sqrt {7}+8 i x}{4 i+\left (i-\sqrt {7}\right ) x+4 i x^2} \, dx-\frac {1}{56} \left (11 \left (35 i+9 \sqrt {7}\right )\right ) \int \frac {1}{4 i+\left (i-\sqrt {7}\right ) x+4 i x^2} \, dx \\ & = -\frac {35-9 i \sqrt {7}}{28 x}-\frac {35+9 i \sqrt {7}}{28 x}-\frac {3}{56} \left (7-11 i \sqrt {7}\right ) \log (x)-\frac {3}{56} \left (7+11 i \sqrt {7}\right ) \log (x)+\frac {3}{112} \left (7+11 i \sqrt {7}\right ) \log \left (4 i+\left (i-\sqrt {7}\right ) x+4 i x^2\right )+\frac {3}{112} \left (7-11 i \sqrt {7}\right ) \log \left (4 i+\left (i+\sqrt {7}\right ) x+4 i x^2\right )+\frac {1}{28} \left (11 \left (35 i-9 \sqrt {7}\right )\right ) \text {Subst}\left (\int \frac {1}{2 \left (35+i \sqrt {7}\right )-x^2} \, dx,x,i+\sqrt {7}+8 i x\right )+\frac {1}{28} \left (11 \left (35 i+9 \sqrt {7}\right )\right ) \text {Subst}\left (\int \frac {1}{2 \left (35-i \sqrt {7}\right )-x^2} \, dx,x,i-\sqrt {7}+8 i x\right ) \\ & = -\frac {35-9 i \sqrt {7}}{28 x}-\frac {35+9 i \sqrt {7}}{28 x}+\frac {11 \left (9+5 i \sqrt {7}\right ) \tanh ^{-1}\left (\frac {i-\sqrt {7}+8 i x}{\sqrt {2 \left (35-i \sqrt {7}\right )}}\right )}{4 \sqrt {14 \left (35-i \sqrt {7}\right )}}-\frac {11 \left (9-5 i \sqrt {7}\right ) \tanh ^{-1}\left (\frac {i+\sqrt {7}+8 i x}{\sqrt {2 \left (35+i \sqrt {7}\right )}}\right )}{4 \sqrt {14 \left (35+i \sqrt {7}\right )}}-\frac {3}{56} \left (7-11 i \sqrt {7}\right ) \log (x)-\frac {3}{56} \left (7+11 i \sqrt {7}\right ) \log (x)+\frac {3}{112} \left (7+11 i \sqrt {7}\right ) \log \left (4 i+\left (i-\sqrt {7}\right ) x+4 i x^2\right )+\frac {3}{112} \left (7-11 i \sqrt {7}\right ) \log \left (4 i+\left (i+\sqrt {7}\right ) x+4 i x^2\right ) \\ \end{align*}

Mathematica [C] (verified)

Result contains higher order function than in optimal. Order 9 vs. order 3 in optimal.

Time = 0.01 (sec) , antiderivative size = 109, normalized size of antiderivative = 0.39 \[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=-\frac {5}{2 x}-\frac {3 \log (x)}{4}+\frac {1}{4} \text {RootSum}\left [2+\text {$\#$1}+5 \text {$\#$1}^2+\text {$\#$1}^3+2 \text {$\#$1}^4\&,\frac {-35 \log (x-\text {$\#$1})+13 \log (x-\text {$\#$1}) \text {$\#$1}-17 \log (x-\text {$\#$1}) \text {$\#$1}^2+6 \log (x-\text {$\#$1}) \text {$\#$1}^3}{1+10 \text {$\#$1}+3 \text {$\#$1}^2+8 \text {$\#$1}^3}\&\right ] \]

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Maple [C] (verified)

Result contains higher order function than in optimal. Order 9 vs. order 3.

Time = 0.07 (sec) , antiderivative size = 58, normalized size of antiderivative = 0.21

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Fricas [B] (verification not implemented)

Both result and optimal contain complex but leaf count of result is larger than twice the leaf count of optimal. 1245 vs. \(2 (172) = 344\).

Time = 1.01 (sec) , antiderivative size = 1245, normalized size of antiderivative = 4.43 \[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=\text {Too large to display} \]

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Sympy [B] (verification not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 25507 vs. \(2 (241) = 482\).

Time = 18.69 (sec) , antiderivative size = 25507, normalized size of antiderivative = 90.77 \[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=\text {Too large to display} \]

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Maxima [F]

\[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=\int { \frac {2 \, x^{3} + 3 \, x^{2} + x + 5}{{\left (2 \, x^{4} + x^{3} + 5 \, x^{2} + x + 2\right )} x^{2}} \,d x } \]

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Giac [F]

\[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=\int { \frac {2 \, x^{3} + 3 \, x^{2} + x + 5}{{\left (2 \, x^{4} + x^{3} + 5 \, x^{2} + x + 2\right )} x^{2}} \,d x } \]

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Mupad [B] (verification not implemented)

Time = 9.67 (sec) , antiderivative size = 242, normalized size of antiderivative = 0.86 \[ \int \frac {5+x+3 x^2+2 x^3}{x^2 \left (2+x+5 x^2+x^3+2 x^4\right )} \, dx=\left (\sum _{k=1}^4\ln \left (\frac {1199\,\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )}{32}+25\,x+\frac {\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )\,x\,4169}{32}+\frac {{\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )}^2\,x\,43993}{256}+{\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )}^3\,x\,28+\frac {{\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )}^4\,x\,3675}{32}+\frac {11647\,{\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )}^2}{128}+\frac {7273\,{\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )}^3}{128}-\frac {441\,{\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )}^4}{32}+\frac {21}{4}\right )\,\mathrm {root}\left (z^4-\frac {3\,z^3}{4}+\frac {16\,z^2}{7}+\frac {96\,z}{49}+\frac {128}{343},z,k\right )\right )-\frac {3\,\ln \left (x\right )}{4}-\frac {5}{2\,x} \]

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