Integrand size = 255, antiderivative size = 22 \[ \int \frac {-2 x-e^5 x-x^2+e^x \left (-6 e^5 x^3-6 x^4\right )+e^{2 x} \left (-6 e^5 x^3-6 x^4\right )+\left (e^5+x+e^x \left (-18 e^5 x^2-18 x^3\right )+e^{2 x} \left (-18 e^5 x^2-18 x^3\right )\right ) \log \left (e^5+x\right )+\left (e^x \left (-18 e^5 x-18 x^2\right )+e^{2 x} \left (-18 e^5 x-18 x^2\right )\right ) \log ^2\left (e^5+x\right )+\left (e^x \left (-6 e^5-6 x\right )+e^{2 x} \left (-6 e^5-6 x\right )\right ) \log ^3\left (e^5+x\right )}{e^5 x^3+x^4+\left (3 e^5 x^2+3 x^3\right ) \log \left (e^5+x\right )+\left (3 e^5 x+3 x^2\right ) \log ^2\left (e^5+x\right )+\left (e^5+x\right ) \log ^3\left (e^5+x\right )} \, dx=-3 \left (1+e^x\right )^2+\frac {x}{\left (x+\log \left (e^5+x\right )\right )^2} \]
Time = 0.13 (sec) , antiderivative size = 25, normalized size of antiderivative = 1.14 \[ \int \frac {-2 x-e^5 x-x^2+e^x \left (-6 e^5 x^3-6 x^4\right )+e^{2 x} \left (-6 e^5 x^3-6 x^4\right )+\left (e^5+x+e^x \left (-18 e^5 x^2-18 x^3\right )+e^{2 x} \left (-18 e^5 x^2-18 x^3\right )\right ) \log \left (e^5+x\right )+\left (e^x \left (-18 e^5 x-18 x^2\right )+e^{2 x} \left (-18 e^5 x-18 x^2\right )\right ) \log ^2\left (e^5+x\right )+\left (e^x \left (-6 e^5-6 x\right )+e^{2 x} \left (-6 e^5-6 x\right )\right ) \log ^3\left (e^5+x\right )}{e^5 x^3+x^4+\left (3 e^5 x^2+3 x^3\right ) \log \left (e^5+x\right )+\left (3 e^5 x+3 x^2\right ) \log ^2\left (e^5+x\right )+\left (e^5+x\right ) \log ^3\left (e^5+x\right )} \, dx=-6 e^x-3 e^{2 x}+\frac {x}{\left (x+\log \left (e^5+x\right )\right )^2} \]
Integrate[(-2*x - E^5*x - x^2 + E^x*(-6*E^5*x^3 - 6*x^4) + E^(2*x)*(-6*E^5 *x^3 - 6*x^4) + (E^5 + x + E^x*(-18*E^5*x^2 - 18*x^3) + E^(2*x)*(-18*E^5*x ^2 - 18*x^3))*Log[E^5 + x] + (E^x*(-18*E^5*x - 18*x^2) + E^(2*x)*(-18*E^5* x - 18*x^2))*Log[E^5 + x]^2 + (E^x*(-6*E^5 - 6*x) + E^(2*x)*(-6*E^5 - 6*x) )*Log[E^5 + x]^3)/(E^5*x^3 + x^4 + (3*E^5*x^2 + 3*x^3)*Log[E^5 + x] + (3*E ^5*x + 3*x^2)*Log[E^5 + x]^2 + (E^5 + x)*Log[E^5 + x]^3),x]
Below are the steps used by Rubi to obtain the solution. The rule number used for the transformation is given above next to the arrow. The rules definitions used are listed below.
\(\displaystyle \int \frac {-x^2+\left (e^x \left (-18 x^2-18 e^5 x\right )+e^{2 x} \left (-18 x^2-18 e^5 x\right )\right ) \log ^2\left (x+e^5\right )+e^x \left (-6 x^4-6 e^5 x^3\right )+e^{2 x} \left (-6 x^4-6 e^5 x^3\right )+\left (e^x \left (-18 x^3-18 e^5 x^2\right )+e^{2 x} \left (-18 x^3-18 e^5 x^2\right )+x+e^5\right ) \log \left (x+e^5\right )-e^5 x-2 x+\left (e^x \left (-6 x-6 e^5\right )+e^{2 x} \left (-6 x-6 e^5\right )\right ) \log ^3\left (x+e^5\right )}{x^4+e^5 x^3+\left (3 x^2+3 e^5 x\right ) \log ^2\left (x+e^5\right )+\left (3 x^3+3 e^5 x^2\right ) \log \left (x+e^5\right )+\left (x+e^5\right ) \log ^3\left (x+e^5\right )} \, dx\) |
\(\Big \downarrow \) 6 |
\(\displaystyle \int \frac {-x^2+\left (e^x \left (-18 x^2-18 e^5 x\right )+e^{2 x} \left (-18 x^2-18 e^5 x\right )\right ) \log ^2\left (x+e^5\right )+e^x \left (-6 x^4-6 e^5 x^3\right )+e^{2 x} \left (-6 x^4-6 e^5 x^3\right )+\left (e^x \left (-18 x^3-18 e^5 x^2\right )+e^{2 x} \left (-18 x^3-18 e^5 x^2\right )+x+e^5\right ) \log \left (x+e^5\right )+\left (-2-e^5\right ) x+\left (e^x \left (-6 x-6 e^5\right )+e^{2 x} \left (-6 x-6 e^5\right )\right ) \log ^3\left (x+e^5\right )}{x^4+e^5 x^3+\left (3 x^2+3 e^5 x\right ) \log ^2\left (x+e^5\right )+\left (3 x^3+3 e^5 x^2\right ) \log \left (x+e^5\right )+\left (x+e^5\right ) \log ^3\left (x+e^5\right )}dx\) |
\(\Big \downarrow \) 7239 |
\(\displaystyle \int \frac {-\left (x+e^5\right ) \left (18 e^x x^2+18 e^{2 x} x^2-1\right ) \log \left (x+e^5\right )-x \left (6 e^x x^3+6 e^{2 x} x^3+6 e^{x+5} x^2+6 e^{2 x+5} x^2+x+e^5+2\right )-6 e^x \left (e^x+1\right ) \left (x+e^5\right ) \log ^3\left (x+e^5\right )-18 e^x \left (e^x+1\right ) x \left (x+e^5\right ) \log ^2\left (x+e^5\right )}{\left (x+e^5\right ) \left (x+\log \left (x+e^5\right )\right )^3}dx\) |
\(\Big \downarrow \) 7293 |
\(\displaystyle \int \left (-\frac {x^2}{\left (x+e^5\right ) \left (x+\log \left (x+e^5\right )\right )^3}-6 e^x-6 e^{2 x}-\frac {2 \left (1+\frac {e^5}{2}\right ) x}{\left (x+e^5\right ) \left (x+\log \left (x+e^5\right )\right )^3}+\frac {\log \left (x+e^5\right )}{\left (x+\log \left (x+e^5\right )\right )^3}\right )dx\) |
\(\Big \downarrow \) 2009 |
\(\displaystyle -\left (\left (2+e^5\right ) \int \frac {1}{\left (x+\log \left (x+e^5\right )\right )^3}dx\right )+e^5 \int \frac {1}{\left (x+\log \left (x+e^5\right )\right )^3}dx-2 \int \frac {x}{\left (x+\log \left (x+e^5\right )\right )^3}dx+e^5 \left (2+e^5\right ) \int \frac {1}{\left (x+e^5\right ) \left (x+\log \left (x+e^5\right )\right )^3}dx-e^{10} \int \frac {1}{\left (x+e^5\right ) \left (x+\log \left (x+e^5\right )\right )^3}dx+\int \frac {1}{\left (x+\log \left (x+e^5\right )\right )^2}dx-6 e^x-3 e^{2 x}\) |
Int[(-2*x - E^5*x - x^2 + E^x*(-6*E^5*x^3 - 6*x^4) + E^(2*x)*(-6*E^5*x^3 - 6*x^4) + (E^5 + x + E^x*(-18*E^5*x^2 - 18*x^3) + E^(2*x)*(-18*E^5*x^2 - 1 8*x^3))*Log[E^5 + x] + (E^x*(-18*E^5*x - 18*x^2) + E^(2*x)*(-18*E^5*x - 18 *x^2))*Log[E^5 + x]^2 + (E^x*(-6*E^5 - 6*x) + E^(2*x)*(-6*E^5 - 6*x))*Log[ E^5 + x]^3)/(E^5*x^3 + x^4 + (3*E^5*x^2 + 3*x^3)*Log[E^5 + x] + (3*E^5*x + 3*x^2)*Log[E^5 + x]^2 + (E^5 + x)*Log[E^5 + x]^3),x]
3.3.28.3.1 Defintions of rubi rules used
Int[(u_.)*((v_.) + (a_.)*(Fx_) + (b_.)*(Fx_))^(p_.), x_Symbol] :> Int[u*(v + (a + b)*Fx)^p, x] /; FreeQ[{a, b}, x] && !FreeQ[Fx, x]
Int[u_, x_Symbol] :> With[{v = SimplifyIntegrand[u, x]}, Int[v, x] /; Simpl erIntegrandQ[v, u, x]]
Time = 21.04 (sec) , antiderivative size = 23, normalized size of antiderivative = 1.05
method | result | size |
risch | \(-3 \,{\mathrm e}^{2 x}-6 \,{\mathrm e}^{x}+\frac {x}{{\left (\ln \left ({\mathrm e}^{5}+x \right )+x \right )}^{2}}\) | \(23\) |
parallelrisch | \(\frac {-3 \,{\mathrm e}^{2 x} x^{2}-6 \ln \left ({\mathrm e}^{5}+x \right ) {\mathrm e}^{2 x} x -3 \ln \left ({\mathrm e}^{5}+x \right )^{2} {\mathrm e}^{2 x}-6 \,{\mathrm e}^{x} x^{2}-12 x \,{\mathrm e}^{x} \ln \left ({\mathrm e}^{5}+x \right )-6 \,{\mathrm e}^{x} \ln \left ({\mathrm e}^{5}+x \right )^{2}+x}{x^{2}+2 x \ln \left ({\mathrm e}^{5}+x \right )+\ln \left ({\mathrm e}^{5}+x \right )^{2}}\) | \(87\) |
int((((-6*exp(5)-6*x)*exp(x)^2+(-6*exp(5)-6*x)*exp(x))*ln(exp(5)+x)^3+((-1 8*x*exp(5)-18*x^2)*exp(x)^2+(-18*x*exp(5)-18*x^2)*exp(x))*ln(exp(5)+x)^2+( (-18*x^2*exp(5)-18*x^3)*exp(x)^2+(-18*x^2*exp(5)-18*x^3)*exp(x)+exp(5)+x)* ln(exp(5)+x)+(-6*x^3*exp(5)-6*x^4)*exp(x)^2+(-6*x^3*exp(5)-6*x^4)*exp(x)-x *exp(5)-x^2-2*x)/((exp(5)+x)*ln(exp(5)+x)^3+(3*x*exp(5)+3*x^2)*ln(exp(5)+x )^2+(3*x^2*exp(5)+3*x^3)*ln(exp(5)+x)+x^3*exp(5)+x^4),x,method=_RETURNVERB OSE)
Leaf count of result is larger than twice the leaf count of optimal. 80 vs. \(2 (20) = 40\).
Time = 0.27 (sec) , antiderivative size = 80, normalized size of antiderivative = 3.64 \[ \int \frac {-2 x-e^5 x-x^2+e^x \left (-6 e^5 x^3-6 x^4\right )+e^{2 x} \left (-6 e^5 x^3-6 x^4\right )+\left (e^5+x+e^x \left (-18 e^5 x^2-18 x^3\right )+e^{2 x} \left (-18 e^5 x^2-18 x^3\right )\right ) \log \left (e^5+x\right )+\left (e^x \left (-18 e^5 x-18 x^2\right )+e^{2 x} \left (-18 e^5 x-18 x^2\right )\right ) \log ^2\left (e^5+x\right )+\left (e^x \left (-6 e^5-6 x\right )+e^{2 x} \left (-6 e^5-6 x\right )\right ) \log ^3\left (e^5+x\right )}{e^5 x^3+x^4+\left (3 e^5 x^2+3 x^3\right ) \log \left (e^5+x\right )+\left (3 e^5 x+3 x^2\right ) \log ^2\left (e^5+x\right )+\left (e^5+x\right ) \log ^3\left (e^5+x\right )} \, dx=-\frac {3 \, x^{2} e^{\left (2 \, x\right )} + 6 \, x^{2} e^{x} + 3 \, {\left (e^{\left (2 \, x\right )} + 2 \, e^{x}\right )} \log \left (x + e^{5}\right )^{2} + 6 \, {\left (x e^{\left (2 \, x\right )} + 2 \, x e^{x}\right )} \log \left (x + e^{5}\right ) - x}{x^{2} + 2 \, x \log \left (x + e^{5}\right ) + \log \left (x + e^{5}\right )^{2}} \]
integrate((((-6*exp(5)-6*x)*exp(x)^2+(-6*exp(5)-6*x)*exp(x))*log(exp(5)+x) ^3+((-18*x*exp(5)-18*x^2)*exp(x)^2+(-18*x*exp(5)-18*x^2)*exp(x))*log(exp(5 )+x)^2+((-18*x^2*exp(5)-18*x^3)*exp(x)^2+(-18*x^2*exp(5)-18*x^3)*exp(x)+ex p(5)+x)*log(exp(5)+x)+(-6*x^3*exp(5)-6*x^4)*exp(x)^2+(-6*x^3*exp(5)-6*x^4) *exp(x)-x*exp(5)-x^2-2*x)/((exp(5)+x)*log(exp(5)+x)^3+(3*x*exp(5)+3*x^2)*l og(exp(5)+x)^2+(3*x^2*exp(5)+3*x^3)*log(exp(5)+x)+x^3*exp(5)+x^4),x, algor ithm=\
-(3*x^2*e^(2*x) + 6*x^2*e^x + 3*(e^(2*x) + 2*e^x)*log(x + e^5)^2 + 6*(x*e^ (2*x) + 2*x*e^x)*log(x + e^5) - x)/(x^2 + 2*x*log(x + e^5) + log(x + e^5)^ 2)
Time = 0.19 (sec) , antiderivative size = 34, normalized size of antiderivative = 1.55 \[ \int \frac {-2 x-e^5 x-x^2+e^x \left (-6 e^5 x^3-6 x^4\right )+e^{2 x} \left (-6 e^5 x^3-6 x^4\right )+\left (e^5+x+e^x \left (-18 e^5 x^2-18 x^3\right )+e^{2 x} \left (-18 e^5 x^2-18 x^3\right )\right ) \log \left (e^5+x\right )+\left (e^x \left (-18 e^5 x-18 x^2\right )+e^{2 x} \left (-18 e^5 x-18 x^2\right )\right ) \log ^2\left (e^5+x\right )+\left (e^x \left (-6 e^5-6 x\right )+e^{2 x} \left (-6 e^5-6 x\right )\right ) \log ^3\left (e^5+x\right )}{e^5 x^3+x^4+\left (3 e^5 x^2+3 x^3\right ) \log \left (e^5+x\right )+\left (3 e^5 x+3 x^2\right ) \log ^2\left (e^5+x\right )+\left (e^5+x\right ) \log ^3\left (e^5+x\right )} \, dx=\frac {x}{x^{2} + 2 x \log {\left (x + e^{5} \right )} + \log {\left (x + e^{5} \right )}^{2}} - 3 e^{2 x} - 6 e^{x} \]
integrate((((-6*exp(5)-6*x)*exp(x)**2+(-6*exp(5)-6*x)*exp(x))*ln(exp(5)+x) **3+((-18*x*exp(5)-18*x**2)*exp(x)**2+(-18*x*exp(5)-18*x**2)*exp(x))*ln(ex p(5)+x)**2+((-18*x**2*exp(5)-18*x**3)*exp(x)**2+(-18*x**2*exp(5)-18*x**3)* exp(x)+exp(5)+x)*ln(exp(5)+x)+(-6*x**3*exp(5)-6*x**4)*exp(x)**2+(-6*x**3*e xp(5)-6*x**4)*exp(x)-x*exp(5)-x**2-2*x)/((exp(5)+x)*ln(exp(5)+x)**3+(3*x*e xp(5)+3*x**2)*ln(exp(5)+x)**2+(3*x**2*exp(5)+3*x**3)*ln(exp(5)+x)+x**3*exp (5)+x**4),x)
Leaf count of result is larger than twice the leaf count of optimal. 80 vs. \(2 (20) = 40\).
Time = 0.24 (sec) , antiderivative size = 80, normalized size of antiderivative = 3.64 \[ \int \frac {-2 x-e^5 x-x^2+e^x \left (-6 e^5 x^3-6 x^4\right )+e^{2 x} \left (-6 e^5 x^3-6 x^4\right )+\left (e^5+x+e^x \left (-18 e^5 x^2-18 x^3\right )+e^{2 x} \left (-18 e^5 x^2-18 x^3\right )\right ) \log \left (e^5+x\right )+\left (e^x \left (-18 e^5 x-18 x^2\right )+e^{2 x} \left (-18 e^5 x-18 x^2\right )\right ) \log ^2\left (e^5+x\right )+\left (e^x \left (-6 e^5-6 x\right )+e^{2 x} \left (-6 e^5-6 x\right )\right ) \log ^3\left (e^5+x\right )}{e^5 x^3+x^4+\left (3 e^5 x^2+3 x^3\right ) \log \left (e^5+x\right )+\left (3 e^5 x+3 x^2\right ) \log ^2\left (e^5+x\right )+\left (e^5+x\right ) \log ^3\left (e^5+x\right )} \, dx=-\frac {3 \, x^{2} e^{\left (2 \, x\right )} + 6 \, x^{2} e^{x} + 3 \, {\left (e^{\left (2 \, x\right )} + 2 \, e^{x}\right )} \log \left (x + e^{5}\right )^{2} + 6 \, {\left (x e^{\left (2 \, x\right )} + 2 \, x e^{x}\right )} \log \left (x + e^{5}\right ) - x}{x^{2} + 2 \, x \log \left (x + e^{5}\right ) + \log \left (x + e^{5}\right )^{2}} \]
integrate((((-6*exp(5)-6*x)*exp(x)^2+(-6*exp(5)-6*x)*exp(x))*log(exp(5)+x) ^3+((-18*x*exp(5)-18*x^2)*exp(x)^2+(-18*x*exp(5)-18*x^2)*exp(x))*log(exp(5 )+x)^2+((-18*x^2*exp(5)-18*x^3)*exp(x)^2+(-18*x^2*exp(5)-18*x^3)*exp(x)+ex p(5)+x)*log(exp(5)+x)+(-6*x^3*exp(5)-6*x^4)*exp(x)^2+(-6*x^3*exp(5)-6*x^4) *exp(x)-x*exp(5)-x^2-2*x)/((exp(5)+x)*log(exp(5)+x)^3+(3*x*exp(5)+3*x^2)*l og(exp(5)+x)^2+(3*x^2*exp(5)+3*x^3)*log(exp(5)+x)+x^3*exp(5)+x^4),x, algor ithm=\
-(3*x^2*e^(2*x) + 6*x^2*e^x + 3*(e^(2*x) + 2*e^x)*log(x + e^5)^2 + 6*(x*e^ (2*x) + 2*x*e^x)*log(x + e^5) - x)/(x^2 + 2*x*log(x + e^5) + log(x + e^5)^ 2)
Leaf count of result is larger than twice the leaf count of optimal. 301 vs. \(2 (20) = 40\).
Time = 0.36 (sec) , antiderivative size = 301, normalized size of antiderivative = 13.68 \[ \int \frac {-2 x-e^5 x-x^2+e^x \left (-6 e^5 x^3-6 x^4\right )+e^{2 x} \left (-6 e^5 x^3-6 x^4\right )+\left (e^5+x+e^x \left (-18 e^5 x^2-18 x^3\right )+e^{2 x} \left (-18 e^5 x^2-18 x^3\right )\right ) \log \left (e^5+x\right )+\left (e^x \left (-18 e^5 x-18 x^2\right )+e^{2 x} \left (-18 e^5 x-18 x^2\right )\right ) \log ^2\left (e^5+x\right )+\left (e^x \left (-6 e^5-6 x\right )+e^{2 x} \left (-6 e^5-6 x\right )\right ) \log ^3\left (e^5+x\right )}{e^5 x^3+x^4+\left (3 e^5 x^2+3 x^3\right ) \log \left (e^5+x\right )+\left (3 e^5 x+3 x^2\right ) \log ^2\left (e^5+x\right )+\left (e^5+x\right ) \log ^3\left (e^5+x\right )} \, dx=-\frac {3 \, {\left (x + e^{5}\right )}^{2} e^{\left (2 \, x + 3 \, e^{5} + 5\right )} + 6 \, {\left (x + e^{5}\right )}^{2} e^{\left (x + 3 \, e^{5} + 5\right )} + 6 \, {\left (x + e^{5}\right )} e^{\left (2 \, x + 3 \, e^{5} + 5\right )} \log \left (x + e^{5}\right ) + 12 \, {\left (x + e^{5}\right )} e^{\left (x + 3 \, e^{5} + 5\right )} \log \left (x + e^{5}\right ) + 3 \, e^{\left (2 \, x + 3 \, e^{5} + 5\right )} \log \left (x + e^{5}\right )^{2} + 6 \, e^{\left (x + 3 \, e^{5} + 5\right )} \log \left (x + e^{5}\right )^{2} - 6 \, {\left (x + e^{5}\right )} e^{\left (2 \, x + 3 \, e^{5} + 10\right )} - 12 \, {\left (x + e^{5}\right )} e^{\left (x + 3 \, e^{5} + 10\right )} - {\left (x + e^{5}\right )} e^{\left (3 \, e^{5} + 5\right )} - 6 \, e^{\left (2 \, x + 3 \, e^{5} + 10\right )} \log \left (x + e^{5}\right ) - 12 \, e^{\left (x + 3 \, e^{5} + 10\right )} \log \left (x + e^{5}\right ) + 3 \, e^{\left (2 \, x + 3 \, e^{5} + 15\right )} + 6 \, e^{\left (x + 3 \, e^{5} + 15\right )} + e^{\left (3 \, e^{5} + 10\right )}}{{\left (x + e^{5}\right )}^{2} e^{\left (3 \, e^{5} + 5\right )} + 2 \, {\left (x + e^{5}\right )} e^{\left (3 \, e^{5} + 5\right )} \log \left (x + e^{5}\right ) + e^{\left (3 \, e^{5} + 5\right )} \log \left (x + e^{5}\right )^{2} - 2 \, {\left (x + e^{5}\right )} e^{\left (3 \, e^{5} + 10\right )} - 2 \, e^{\left (3 \, e^{5} + 10\right )} \log \left (x + e^{5}\right ) + e^{\left (3 \, e^{5} + 15\right )}} \]
integrate((((-6*exp(5)-6*x)*exp(x)^2+(-6*exp(5)-6*x)*exp(x))*log(exp(5)+x) ^3+((-18*x*exp(5)-18*x^2)*exp(x)^2+(-18*x*exp(5)-18*x^2)*exp(x))*log(exp(5 )+x)^2+((-18*x^2*exp(5)-18*x^3)*exp(x)^2+(-18*x^2*exp(5)-18*x^3)*exp(x)+ex p(5)+x)*log(exp(5)+x)+(-6*x^3*exp(5)-6*x^4)*exp(x)^2+(-6*x^3*exp(5)-6*x^4) *exp(x)-x*exp(5)-x^2-2*x)/((exp(5)+x)*log(exp(5)+x)^3+(3*x*exp(5)+3*x^2)*l og(exp(5)+x)^2+(3*x^2*exp(5)+3*x^3)*log(exp(5)+x)+x^3*exp(5)+x^4),x, algor ithm=\
-(3*(x + e^5)^2*e^(2*x + 3*e^5 + 5) + 6*(x + e^5)^2*e^(x + 3*e^5 + 5) + 6* (x + e^5)*e^(2*x + 3*e^5 + 5)*log(x + e^5) + 12*(x + e^5)*e^(x + 3*e^5 + 5 )*log(x + e^5) + 3*e^(2*x + 3*e^5 + 5)*log(x + e^5)^2 + 6*e^(x + 3*e^5 + 5 )*log(x + e^5)^2 - 6*(x + e^5)*e^(2*x + 3*e^5 + 10) - 12*(x + e^5)*e^(x + 3*e^5 + 10) - (x + e^5)*e^(3*e^5 + 5) - 6*e^(2*x + 3*e^5 + 10)*log(x + e^5 ) - 12*e^(x + 3*e^5 + 10)*log(x + e^5) + 3*e^(2*x + 3*e^5 + 15) + 6*e^(x + 3*e^5 + 15) + e^(3*e^5 + 10))/((x + e^5)^2*e^(3*e^5 + 5) + 2*(x + e^5)*e^ (3*e^5 + 5)*log(x + e^5) + e^(3*e^5 + 5)*log(x + e^5)^2 - 2*(x + e^5)*e^(3 *e^5 + 10) - 2*e^(3*e^5 + 10)*log(x + e^5) + e^(3*e^5 + 15))
Time = 10.14 (sec) , antiderivative size = 181, normalized size of antiderivative = 8.23 \[ \int \frac {-2 x-e^5 x-x^2+e^x \left (-6 e^5 x^3-6 x^4\right )+e^{2 x} \left (-6 e^5 x^3-6 x^4\right )+\left (e^5+x+e^x \left (-18 e^5 x^2-18 x^3\right )+e^{2 x} \left (-18 e^5 x^2-18 x^3\right )\right ) \log \left (e^5+x\right )+\left (e^x \left (-18 e^5 x-18 x^2\right )+e^{2 x} \left (-18 e^5 x-18 x^2\right )\right ) \log ^2\left (e^5+x\right )+\left (e^x \left (-6 e^5-6 x\right )+e^{2 x} \left (-6 e^5-6 x\right )\right ) \log ^3\left (e^5+x\right )}{e^5 x^3+x^4+\left (3 e^5 x^2+3 x^3\right ) \log \left (e^5+x\right )+\left (3 e^5 x+3 x^2\right ) \log ^2\left (e^5+x\right )+\left (e^5+x\right ) \log ^3\left (e^5+x\right )} \, dx=\frac {\frac {x\,\left (x+{\mathrm {e}}^5+2\right )}{2\,\left (x+{\mathrm {e}}^5+1\right )}-\frac {\ln \left (x+{\mathrm {e}}^5\right )\,\left (x+{\mathrm {e}}^5\right )}{2\,\left (x+{\mathrm {e}}^5+1\right )}}{x^2+2\,x\,\ln \left (x+{\mathrm {e}}^5\right )+{\ln \left (x+{\mathrm {e}}^5\right )}^2}-6\,{\mathrm {e}}^x-3\,{\mathrm {e}}^{2\,x}+\frac {\frac {\left (x+{\mathrm {e}}^5\right )\,\left (x+2\,{\mathrm {e}}^5+{\mathrm {e}}^{10}+2\,x\,{\mathrm {e}}^5+x^2+1\right )}{2\,{\left (x+{\mathrm {e}}^5+1\right )}^3}-\frac {\ln \left (x+{\mathrm {e}}^5\right )\,\left (x+{\mathrm {e}}^5\right )}{2\,{\left (x+{\mathrm {e}}^5+1\right )}^3}}{x+\ln \left (x+{\mathrm {e}}^5\right )}+\frac {x+{\mathrm {e}}^5}{2\,x^3+\left (6\,{\mathrm {e}}^5+6\right )\,x^2+\left (12\,{\mathrm {e}}^5+6\,{\mathrm {e}}^{10}+6\right )\,x+6\,{\mathrm {e}}^5+6\,{\mathrm {e}}^{10}+2\,{\mathrm {e}}^{15}+2} \]
int(-(2*x + x*exp(5) + log(x + exp(5))^2*(exp(x)*(18*x*exp(5) + 18*x^2) + exp(2*x)*(18*x*exp(5) + 18*x^2)) + exp(x)*(6*x^3*exp(5) + 6*x^4) - log(x + exp(5))*(x + exp(5) - exp(x)*(18*x^2*exp(5) + 18*x^3) - exp(2*x)*(18*x^2* exp(5) + 18*x^3)) + log(x + exp(5))^3*(exp(x)*(6*x + 6*exp(5)) + exp(2*x)* (6*x + 6*exp(5))) + exp(2*x)*(6*x^3*exp(5) + 6*x^4) + x^2)/(log(x + exp(5) )^2*(3*x*exp(5) + 3*x^2) + log(x + exp(5))*(3*x^2*exp(5) + 3*x^3) + x^3*ex p(5) + log(x + exp(5))^3*(x + exp(5)) + x^4),x)
((x*(x + exp(5) + 2))/(2*(x + exp(5) + 1)) - (log(x + exp(5))*(x + exp(5)) )/(2*(x + exp(5) + 1)))/(log(x + exp(5))^2 + 2*x*log(x + exp(5)) + x^2) - 6*exp(x) - 3*exp(2*x) + (((x + exp(5))*(x + 2*exp(5) + exp(10) + 2*x*exp(5 ) + x^2 + 1))/(2*(x + exp(5) + 1)^3) - (log(x + exp(5))*(x + exp(5)))/(2*( x + exp(5) + 1)^3))/(x + log(x + exp(5))) + (x + exp(5))/(6*exp(5) + 6*exp (10) + 2*exp(15) + x^2*(6*exp(5) + 6) + x*(12*exp(5) + 6*exp(10) + 6) + 2* x^3 + 2)