\(\int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} (e^x (-1+x+(-2 x-2 x^2) \log (5)+(-x^2-x^3) \log ^2(5))+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} (-6+2 x+(-12 x+4 x^2) \log (5)+(-6 x^2+2 x^3) \log ^2(5)))}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx\) [2821]

Optimal result

Integrand size = 128, antiderivative size = 25 \[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx=(-3+x)^2-e^{-50+x-\frac {2 x}{1+x \log (5)}} x \]

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Rubi [F]

\[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx=\int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx \]

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Rubi steps \begin{align*} \text {integral}& = \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{(1+x \log (5))^2} \, dx \\ & = \int \frac {-6+2 x+4 (-3+x) x \log (5)+2 (-3+x) x^2 \log ^2(5)-e^{x-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (1+x^3 \log ^2(5)+x^2 \log (5) (2+\log (5))+x (-1+\log (25))\right )}{(1+x \log (5))^2} \, dx \\ & = \int \left (-\frac {6}{(1+x \log (5))^2}+\frac {2 x}{(1+x \log (5))^2}+\frac {4 (-3+x) x \log (5)}{(1+x \log (5))^2}+\frac {2 (-3+x) x^2 \log ^2(5)}{(1+x \log (5))^2}+\frac {5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}} \left (-1-x^3 \log ^2(5)-x^2 \log (5) (2+\log (5))+x (1-\log (25))\right )}{(1+x \log (5))^2}\right ) \, dx \\ & = \frac {6}{\log (5) (1+x \log (5))}+2 \int \frac {x}{(1+x \log (5))^2} \, dx+(4 \log (5)) \int \frac {(-3+x) x}{(1+x \log (5))^2} \, dx+\left (2 \log ^2(5)\right ) \int \frac {(-3+x) x^2}{(1+x \log (5))^2} \, dx+\int \frac {5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}} \left (-1-x^3 \log ^2(5)-x^2 \log (5) (2+\log (5))+x (1-\log (25))\right )}{(1+x \log (5))^2} \, dx \\ & = \frac {6}{\log (5) (1+x \log (5))}+2 \int \left (-\frac {1}{\log (5) (1+x \log (5))^2}+\frac {1}{\log (5) (1+x \log (5))}\right ) \, dx+(4 \log (5)) \int \left (\frac {1}{\log ^2(5)}+\frac {-2-\log (125)}{\log ^2(5) (1+x \log (5))}+\frac {1+\log (125)}{\log ^2(5) (1+x \log (5))^2}\right ) \, dx+\left (2 \log ^2(5)\right ) \int \left (\frac {x}{\log ^2(5)}+\frac {-1-3 \log (5)}{\log ^3(5) (1+x \log (5))^2}+\frac {3 (1+\log (25))}{\log ^3(5) (1+x \log (5))}+\frac {-2-\log (125)}{\log ^3(5)}\right ) \, dx+\int \left (-5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}}-5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}} x-\frac {2\ 5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}}}{\log (5) (1+x \log (5))^2}+\frac {2\ 5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}}}{\log (5) (1+x \log (5))}\right ) \, dx \\ & = x^2+\frac {4 x}{\log (5)}+\frac {2}{\log ^2(5) (1+x \log (5))}+\frac {6}{\log (5) (1+x \log (5))}-\frac {2 (1+\log (125))}{\log ^2(5) (1+x \log (5))}-\frac {2 x (2+\log (125))}{\log (5)}+\frac {2 \log (1+x \log (5))}{\log ^2(5)}+\frac {6 (1+\log (25)) \log (1+x \log (5))}{\log ^2(5)}-\frac {4 (2+\log (125)) \log (1+x \log (5))}{\log ^2(5)}-\frac {2 \int \frac {5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}}}{(1+x \log (5))^2} \, dx}{\log (5)}+\frac {2 \int \frac {5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}}}{1+x \log (5)} \, dx}{\log (5)}-\int 5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}} \, dx-\int 5^{\frac {(-50+x) x}{1+x \log (5)}} e^{\frac {-50-x}{1+x \log (5)}} x \, dx \\ \end{align*}

Mathematica [A] (verified)

Time = 0.36 (sec) , antiderivative size = 29, normalized size of antiderivative = 1.16 \[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx=x \left (-6-e^{x-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}}+x\right ) \]

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Maple [A] (verified)

Time = 1.51 (sec) , antiderivative size = 37, normalized size of antiderivative = 1.48

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Fricas [B] (verification not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 54 vs. \(2 (24) = 48\).

Time = 0.27 (sec) , antiderivative size = 54, normalized size of antiderivative = 2.16 \[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx=-{\left (x e^{x} - {\left (x^{2} - 6 \, x\right )} e^{\left (\frac {2 \, {\left (25 \, x \log \left (5\right ) + x + 25\right )}}{x \log \left (5\right ) + 1}\right )}\right )} e^{\left (-\frac {2 \, {\left (25 \, x \log \left (5\right ) + x + 25\right )}}{x \log \left (5\right ) + 1}\right )} \]

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Sympy [A] (verification not implemented)

Time = 6.26 (sec) , antiderivative size = 31, normalized size of antiderivative = 1.24 \[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx=x^{2} - x e^{x} e^{- \frac {2 \left (x + 25 x \log {\left (5 \right )} + 25\right )}{x \log {\left (5 \right )} + 1}} - 6 x \]

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Maxima [B] (verification not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 225 vs. \(2 (24) = 48\).

Time = 0.37 (sec) , antiderivative size = 225, normalized size of antiderivative = 9.00 \[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx={\left (\frac {2}{x \log \left (5\right )^{5} + \log \left (5\right )^{4}} + \frac {x^{2} \log \left (5\right ) - 4 \, x}{\log \left (5\right )^{3}} + \frac {6 \, \log \left (x \log \left (5\right ) + 1\right )}{\log \left (5\right )^{4}}\right )} \log \left (5\right )^{2} + 6 \, {\left (\frac {1}{x \log \left (5\right )^{4} + \log \left (5\right )^{3}} - \frac {x}{\log \left (5\right )^{2}} + \frac {2 \, \log \left (x \log \left (5\right ) + 1\right )}{\log \left (5\right )^{3}}\right )} \log \left (5\right )^{2} - x e^{\left (x + \frac {2}{x \log \left (5\right )^{2} + \log \left (5\right )} - \frac {2}{\log \left (5\right )} - 50\right )} - 4 \, {\left (\frac {1}{x \log \left (5\right )^{4} + \log \left (5\right )^{3}} - \frac {x}{\log \left (5\right )^{2}} + \frac {2 \, \log \left (x \log \left (5\right ) + 1\right )}{\log \left (5\right )^{3}}\right )} \log \left (5\right ) - 12 \, {\left (\frac {1}{x \log \left (5\right )^{3} + \log \left (5\right )^{2}} + \frac {\log \left (x \log \left (5\right ) + 1\right )}{\log \left (5\right )^{2}}\right )} \log \left (5\right ) + \frac {2}{x \log \left (5\right )^{3} + \log \left (5\right )^{2}} + \frac {6}{x \log \left (5\right )^{2} + \log \left (5\right )} + \frac {2 \, \log \left (x \log \left (5\right ) + 1\right )}{\log \left (5\right )^{2}} \]

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Giac [A] (verification not implemented)

none

Time = 0.82 (sec) , antiderivative size = 38, normalized size of antiderivative = 1.52 \[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx={\left (x^{2} e^{50} - 6 \, x e^{50} - x e^{\left (\frac {x^{2} \log \left (5\right ) - x}{x \log \left (5\right ) + 1}\right )}\right )} e^{\left (-50\right )} \]

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Mupad [F(-1)]

Timed out. \[ \int \frac {e^{-\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (e^x \left (-1+x+\left (-2 x-2 x^2\right ) \log (5)+\left (-x^2-x^3\right ) \log ^2(5)\right )+e^{\frac {2 (25+x+25 x \log (5))}{1+x \log (5)}} \left (-6+2 x+\left (-12 x+4 x^2\right ) \log (5)+\left (-6 x^2+2 x^3\right ) \log ^2(5)\right )\right )}{1+2 x \log (5)+x^2 \log ^2(5)} \, dx=\int -\frac {{\mathrm {e}}^{-\frac {2\,\left (x+25\,x\,\ln \left (5\right )+25\right )}{x\,\ln \left (5\right )+1}}\,\left ({\mathrm {e}}^{\frac {2\,\left (x+25\,x\,\ln \left (5\right )+25\right )}{x\,\ln \left (5\right )+1}}\,\left (\ln \left (5\right )\,\left (12\,x-4\,x^2\right )-2\,x+{\ln \left (5\right )}^2\,\left (6\,x^2-2\,x^3\right )+6\right )+{\mathrm {e}}^x\,\left (\ln \left (5\right )\,\left (2\,x^2+2\,x\right )-x+{\ln \left (5\right )}^2\,\left (x^3+x^2\right )+1\right )\right )}{{\ln \left (5\right )}^2\,x^2+2\,\ln \left (5\right )\,x+1} \,d x \]

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