Optimal. Leaf size=109 \[ \frac {b x^3}{6}+\frac {1}{2} x^2 \coth ^{-1}(1-d-d \coth (a+b x))-\frac {1}{4} x^2 \log \left (1-(1-d) e^{2 a+2 b x}\right )-\frac {x \text {PolyLog}\left (2,(1-d) e^{2 a+2 b x}\right )}{4 b}+\frac {\text {PolyLog}\left (3,(1-d) e^{2 a+2 b x}\right )}{8 b^2} \]
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Rubi [A]
time = 0.16, antiderivative size = 109, normalized size of antiderivative = 1.00, number of steps
used = 6, number of rules used = 6, integrand size = 17, \(\frac {\text {number of rules}}{\text {integrand size}}\) = 0.353, Rules used = {6377, 2215,
2221, 2611, 2320, 6724} \begin {gather*} \frac {\text {Li}_3\left ((1-d) e^{2 a+2 b x}\right )}{8 b^2}-\frac {x \text {Li}_2\left ((1-d) e^{2 a+2 b x}\right )}{4 b}-\frac {1}{4} x^2 \log \left (1-(1-d) e^{2 a+2 b x}\right )+\frac {1}{2} x^2 \coth ^{-1}(d (-\coth (a+b x))-d+1)+\frac {b x^3}{6} \end {gather*}
Antiderivative was successfully verified.
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Rule 2215
Rule 2221
Rule 2320
Rule 2611
Rule 6377
Rule 6724
Rubi steps
\begin {align*} \int x \coth ^{-1}(1-d-d \coth (a+b x)) \, dx &=\frac {1}{2} x^2 \coth ^{-1}(1-d-d \coth (a+b x))+\frac {1}{2} b \int \frac {x^2}{1+(-1+d) e^{2 a+2 b x}} \, dx\\ &=\frac {b x^3}{6}+\frac {1}{2} x^2 \coth ^{-1}(1-d-d \coth (a+b x))+\frac {1}{2} (b (1-d)) \int \frac {e^{2 a+2 b x} x^2}{1+(-1+d) e^{2 a+2 b x}} \, dx\\ &=\frac {b x^3}{6}+\frac {1}{2} x^2 \coth ^{-1}(1-d-d \coth (a+b x))-\frac {1}{4} x^2 \log \left (1-(1-d) e^{2 a+2 b x}\right )+\frac {1}{2} \int x \log \left (1+(-1+d) e^{2 a+2 b x}\right ) \, dx\\ &=\frac {b x^3}{6}+\frac {1}{2} x^2 \coth ^{-1}(1-d-d \coth (a+b x))-\frac {1}{4} x^2 \log \left (1-(1-d) e^{2 a+2 b x}\right )-\frac {x \text {Li}_2\left ((1-d) e^{2 a+2 b x}\right )}{4 b}+\frac {\int \text {Li}_2\left (-(-1+d) e^{2 a+2 b x}\right ) \, dx}{4 b}\\ &=\frac {b x^3}{6}+\frac {1}{2} x^2 \coth ^{-1}(1-d-d \coth (a+b x))-\frac {1}{4} x^2 \log \left (1-(1-d) e^{2 a+2 b x}\right )-\frac {x \text {Li}_2\left ((1-d) e^{2 a+2 b x}\right )}{4 b}+\frac {\text {Subst}\left (\int \frac {\text {Li}_2((1-d) x)}{x} \, dx,x,e^{2 a+2 b x}\right )}{8 b^2}\\ &=\frac {b x^3}{6}+\frac {1}{2} x^2 \coth ^{-1}(1-d-d \coth (a+b x))-\frac {1}{4} x^2 \log \left (1-(1-d) e^{2 a+2 b x}\right )-\frac {x \text {Li}_2\left ((1-d) e^{2 a+2 b x}\right )}{4 b}+\frac {\text {Li}_3\left ((1-d) e^{2 a+2 b x}\right )}{8 b^2}\\ \end {align*}
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Mathematica [A]
time = 0.07, size = 94, normalized size = 0.86 \begin {gather*} \frac {2 b^2 x^2 \left (2 \coth ^{-1}(1-d-d \coth (a+b x))-\log \left (1+\frac {e^{-2 (a+b x)}}{-1+d}\right )\right )+2 b x \text {PolyLog}\left (2,-\frac {e^{-2 (a+b x)}}{-1+d}\right )+\text {PolyLog}\left (3,-\frac {e^{-2 (a+b x)}}{-1+d}\right )}{8 b^2} \end {gather*}
Antiderivative was successfully verified.
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Maple [C] Result contains higher order function than in optimal. Order 9 vs. order
4.
time = 1.30, size = 1688, normalized size = 15.49
method | result | size |
risch | \(\text {Expression too large to display}\) | \(1688\) |
Verification of antiderivative is not currently implemented for this CAS.
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Maxima [A]
time = 0.73, size = 101, normalized size = 0.93 \begin {gather*} \frac {1}{24} \, {\left (\frac {4 \, x^{3}}{d} - \frac {3 \, {\left (2 \, b^{2} x^{2} \log \left ({\left (d - 1\right )} e^{\left (2 \, b x + 2 \, a\right )} + 1\right ) + 2 \, b x {\rm Li}_2\left (-{\left (d - 1\right )} e^{\left (2 \, b x + 2 \, a\right )}\right ) - {\rm Li}_{3}(-{\left (d - 1\right )} e^{\left (2 \, b x + 2 \, a\right )})\right )}}{b^{3} d}\right )} b d - \frac {1}{2} \, x^{2} \operatorname {arcoth}\left (d \coth \left (b x + a\right ) + d - 1\right ) \end {gather*}
Verification of antiderivative is not currently implemented for this CAS.
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Fricas [B] Leaf count of result is larger than twice the leaf count of optimal. 322 vs.
\(2 (90) = 180\).
time = 0.35, size = 322, normalized size = 2.95 \begin {gather*} \frac {2 \, b^{3} x^{3} - 3 \, b^{2} x^{2} \log \left (\frac {d \cosh \left (b x + a\right ) + d \sinh \left (b x + a\right )}{d \cosh \left (b x + a\right ) + {\left (d - 2\right )} \sinh \left (b x + a\right )}\right ) - 6 \, b x {\rm Li}_2\left (\frac {1}{2} \, \sqrt {-4 \, d + 4} {\left (\cosh \left (b x + a\right ) + \sinh \left (b x + a\right )\right )}\right ) - 6 \, b x {\rm Li}_2\left (-\frac {1}{2} \, \sqrt {-4 \, d + 4} {\left (\cosh \left (b x + a\right ) + \sinh \left (b x + a\right )\right )}\right ) - 3 \, a^{2} \log \left (2 \, {\left (d - 1\right )} \cosh \left (b x + a\right ) + 2 \, {\left (d - 1\right )} \sinh \left (b x + a\right ) + \sqrt {-4 \, d + 4}\right ) - 3 \, a^{2} \log \left (2 \, {\left (d - 1\right )} \cosh \left (b x + a\right ) + 2 \, {\left (d - 1\right )} \sinh \left (b x + a\right ) - \sqrt {-4 \, d + 4}\right ) - 3 \, {\left (b^{2} x^{2} - a^{2}\right )} \log \left (\frac {1}{2} \, \sqrt {-4 \, d + 4} {\left (\cosh \left (b x + a\right ) + \sinh \left (b x + a\right )\right )} + 1\right ) - 3 \, {\left (b^{2} x^{2} - a^{2}\right )} \log \left (-\frac {1}{2} \, \sqrt {-4 \, d + 4} {\left (\cosh \left (b x + a\right ) + \sinh \left (b x + a\right )\right )} + 1\right ) + 6 \, {\rm polylog}\left (3, \frac {1}{2} \, \sqrt {-4 \, d + 4} {\left (\cosh \left (b x + a\right ) + \sinh \left (b x + a\right )\right )}\right ) + 6 \, {\rm polylog}\left (3, -\frac {1}{2} \, \sqrt {-4 \, d + 4} {\left (\cosh \left (b x + a\right ) + \sinh \left (b x + a\right )\right )}\right )}{12 \, b^{2}} \end {gather*}
Verification of antiderivative is not currently implemented for this CAS.
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Sympy [F]
time = 0.00, size = 0, normalized size = 0.00 \begin {gather*} - \int x \operatorname {acoth}{\left (d \coth {\left (a + b x \right )} + d - 1 \right )}\, dx \end {gather*}
Verification of antiderivative is not currently implemented for this CAS.
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Giac [F]
time = 0.00, size = 0, normalized size = 0.00 \begin {gather*} \text {could not integrate} \end {gather*}
Verification of antiderivative is not currently implemented for this CAS.
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Mupad [F]
time = 0.00, size = -1, normalized size = -0.01 \begin {gather*} \int -x\,\mathrm {acoth}\left (d+d\,\mathrm {coth}\left (a+b\,x\right )-1\right ) \,d x \end {gather*}
Verification of antiderivative is not currently implemented for this CAS.
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