∖int c+dx2+ex4+fx6 _________________________________

3.122 \(\int \frac{c+d x^2+e x^4+f x^6}{x^{10} \left (a+b x^2\right )} \, dx\)

Optimal. Leaf size=175 \[ \frac{b c-a d}{7 a^2 x^7}-\frac{a^2 e-a b d+b^2 c}{5 a^3 x^5}-\frac{b^{3/2} \tan ^{-1}\left (\frac{\sqrt{b} x}{\sqrt{a}}\right ) \left (a^3 (-f)+a^2 b e-a b^2 d+b^3 c\right )}{a^{11/2}}-\frac{b \left (a^3 (-f)+a^2 b e-a b^2 d+b^3 c\right )}{a^5 x}+\frac{a^3 (-f)+a^2 b e-a b^2 d+b^3 c}{3 a^4 x^3}-\frac{c}{9 a x^9} \]

[Out]

-c/(9*a*x^9) + (b*c - a*d)/(7*a^2*x^7) - (b^2*c - a*b*d + a^2*e)/(5*a^3*x^5) + (

b^3*c - a*b^2*d + a^2*b*e - a^3*f)/(3*a^4*x^3) - (b*(b^3*c - a*b^2*d + a^2*b*e -

a^3*f))/(a^5*x) - (b^(3/2)*(b^3*c - a*b^2*d + a^2*b*e - a^3*f)*ArcTan[(Sqrt[b]*

x)/Sqrt[a]])/a^(11/2)

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Rubi [A] time = 0.329932, antiderivative size = 175, normalized size of antiderivative = 1., number of steps used = 3, number of rules used = 2, integrand size = 30, \(\frac{\text{number of rules}}{\text{integrand size}}\) = 0.067 \[ \frac{b c-a d}{7 a^2 x^7}-\frac{a^2 e-a b d+b^2 c}{5 a^3 x^5}-\frac{b^{3/2} \tan ^{-1}\left (\frac{\sqrt{b} x}{\sqrt{a}}\right ) \left (a^3 (-f)+a^2 b e-a b^2 d+b^3 c\right )}{a^{11/2}}-\frac{b \left (a^3 (-f)+a^2 b e-a b^2 d+b^3 c\right )}{a^5 x}+\frac{a^3 (-f)+a^2 b e-a b^2 d+b^3 c}{3 a^4 x^3}-\frac{c}{9 a x^9} \]

Antiderivative was successfully veriﬁed.

[In] Int[(c + d*x^2 + e*x^4 + f*x^6)/(x^10*(a + b*x^2)),x]

[Out]

-c/(9*a*x^9) + (b*c - a*d)/(7*a^2*x^7) - (b^2*c - a*b*d + a^2*e)/(5*a^3*x^5) + (

b^3*c - a*b^2*d + a^2*b*e - a^3*f)/(3*a^4*x^3) - (b*(b^3*c - a*b^2*d + a^2*b*e -

a^3*f))/(a^5*x) - (b^(3/2)*(b^3*c - a*b^2*d + a^2*b*e - a^3*f)*ArcTan[(Sqrt[b]*

x)/Sqrt[a]])/a^(11/2)

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Rubi in Sympy [A] time = 60.8512, size = 156, normalized size = 0.89 \[ - \frac{c}{9 a x^{9}} - \frac{a d - b c}{7 a^{2} x^{7}} - \frac{a^{2} e - a b d + b^{2} c}{5 a^{3} x^{5}} - \frac{a^{3} f - a^{2} b e + a b^{2} d - b^{3} c}{3 a^{4} x^{3}} + \frac{b \left (a^{3} f - a^{2} b e + a b^{2} d - b^{3} c\right )}{a^{5} x} + \frac{b^{\frac{3}{2}} \left (a^{3} f - a^{2} b e + a b^{2} d - b^{3} c\right ) \operatorname{atan}{\left (\frac{\sqrt{b} x}{\sqrt{a}} \right )}}{a^{\frac{11}{2}}} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] rubi_integrate((f*x**6+e*x**4+d*x**2+c)/x**10/(b*x**2+a),x)

[Out]

-c/(9*a*x**9) - (a*d - b*c)/(7*a**2*x**7) - (a**2*e - a*b*d + b**2*c)/(5*a**3*x*

*5) - (a**3*f - a**2*b*e + a*b**2*d - b**3*c)/(3*a**4*x**3) + b*(a**3*f - a**2*b

*e + a*b**2*d - b**3*c)/(a**5*x) + b**(3/2)*(a**3*f - a**2*b*e + a*b**2*d - b**3

*c)*atan(sqrt(b)*x/sqrt(a))/a**(11/2)

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Mathematica [A] time = 0.348364, size = 174, normalized size = 0.99 \[ \frac{b c-a d}{7 a^2 x^7}+\frac{a^2 (-e)+a b d-b^2 c}{5 a^3 x^5}+\frac{b^{3/2} \tan ^{-1}\left (\frac{\sqrt{b} x}{\sqrt{a}}\right ) \left (a^3 f-a^2 b e+a b^2 d-b^3 c\right )}{a^{11/2}}+\frac{b \left (a^3 f-a^2 b e+a b^2 d-b^3 c\right )}{a^5 x}+\frac{a^3 (-f)+a^2 b e-a b^2 d+b^3 c}{3 a^4 x^3}-\frac{c}{9 a x^9} \]

Antiderivative was successfully veriﬁed.

[In] Integrate[(c + d*x^2 + e*x^4 + f*x^6)/(x^10*(a + b*x^2)),x]

[Out]

-c/(9*a*x^9) + (b*c - a*d)/(7*a^2*x^7) + (-(b^2*c) + a*b*d - a^2*e)/(5*a^3*x^5)

+ (b^3*c - a*b^2*d + a^2*b*e - a^3*f)/(3*a^4*x^3) + (b*(-(b^3*c) + a*b^2*d - a^2

*b*e + a^3*f))/(a^5*x) + (b^(3/2)*(-(b^3*c) + a*b^2*d - a^2*b*e + a^3*f)*ArcTan[

(Sqrt[b]*x)/Sqrt[a]])/a^(11/2)

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Maple [A] time = 0.014, size = 238, normalized size = 1.4 \[ -{\frac{c}{9\,a{x}^{9}}}-{\frac{d}{7\,a{x}^{7}}}+{\frac{bc}{7\,{a}^{2}{x}^{7}}}-{\frac{e}{5\,a{x}^{5}}}+{\frac{bd}{5\,{x}^{5}{a}^{2}}}-{\frac{{b}^{2}c}{5\,{a}^{3}{x}^{5}}}-{\frac{f}{3\,a{x}^{3}}}+{\frac{be}{3\,{x}^{3}{a}^{2}}}-{\frac{{b}^{2}d}{3\,{a}^{3}{x}^{3}}}+{\frac{{b}^{3}c}{3\,{a}^{4}{x}^{3}}}+{\frac{bf}{x{a}^{2}}}-{\frac{{b}^{2}e}{{a}^{3}x}}+{\frac{{b}^{3}d}{{a}^{4}x}}-{\frac{{b}^{4}c}{{a}^{5}x}}+{\frac{{b}^{2}f}{{a}^{2}}\arctan \left ({bx{\frac{1}{\sqrt{ab}}}} \right ){\frac{1}{\sqrt{ab}}}}-{\frac{{b}^{3}e}{{a}^{3}}\arctan \left ({bx{\frac{1}{\sqrt{ab}}}} \right ){\frac{1}{\sqrt{ab}}}}+{\frac{{b}^{4}d}{{a}^{4}}\arctan \left ({bx{\frac{1}{\sqrt{ab}}}} \right ){\frac{1}{\sqrt{ab}}}}-{\frac{{b}^{5}c}{{a}^{5}}\arctan \left ({bx{\frac{1}{\sqrt{ab}}}} \right ){\frac{1}{\sqrt{ab}}}} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] int((f*x^6+e*x^4+d*x^2+c)/x^10/(b*x^2+a),x)

[Out]

-1/9*c/a/x^9-1/7/a/x^7*d+1/7/a^2/x^7*b*c-1/5/a/x^5*e+1/5/a^2/x^5*b*d-1/5/a^3/x^5

*b^2*c-1/3/a/x^3*f+1/3/a^2/x^3*b*e-1/3/a^3/x^3*b^2*d+1/3/a^4/x^3*b^3*c+1/a^2*b/x

*f-1/a^3*b^2/x*e+1/a^4*b^3/x*d-1/a^5*b^4/x*c+b^2/a^2/(a*b)^(1/2)*arctan(x*b/(a*b

)^(1/2))*f-b^3/a^3/(a*b)^(1/2)*arctan(x*b/(a*b)^(1/2))*e+b^4/a^4/(a*b)^(1/2)*arc

tan(x*b/(a*b)^(1/2))*d-b^5/a^5/(a*b)^(1/2)*arctan(x*b/(a*b)^(1/2))*c

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Maxima [F] time = 0., size = 0, normalized size = 0. \[ \text{Exception raised: ValueError} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] integrate((f*x^6 + e*x^4 + d*x^2 + c)/((b*x^2 + a)*x^10),x, algorithm="maxima")

[Out]

Exception raised: ValueError

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Fricas [A] time = 0.236087, size = 1, normalized size = 0.01 \[ \left [-\frac{315 \,{\left (b^{4} c - a b^{3} d + a^{2} b^{2} e - a^{3} b f\right )} x^{9} \sqrt{-\frac{b}{a}} \log \left (\frac{b x^{2} + 2 \, a x \sqrt{-\frac{b}{a}} - a}{b x^{2} + a}\right ) + 630 \,{\left (b^{4} c - a b^{3} d + a^{2} b^{2} e - a^{3} b f\right )} x^{8} - 210 \,{\left (a b^{3} c - a^{2} b^{2} d + a^{3} b e - a^{4} f\right )} x^{6} + 70 \, a^{4} c + 126 \,{\left (a^{2} b^{2} c - a^{3} b d + a^{4} e\right )} x^{4} - 90 \,{\left (a^{3} b c - a^{4} d\right )} x^{2}}{630 \, a^{5} x^{9}}, -\frac{315 \,{\left (b^{4} c - a b^{3} d + a^{2} b^{2} e - a^{3} b f\right )} x^{9} \sqrt{\frac{b}{a}} \arctan \left (\frac{b x}{a \sqrt{\frac{b}{a}}}\right ) + 315 \,{\left (b^{4} c - a b^{3} d + a^{2} b^{2} e - a^{3} b f\right )} x^{8} - 105 \,{\left (a b^{3} c - a^{2} b^{2} d + a^{3} b e - a^{4} f\right )} x^{6} + 35 \, a^{4} c + 63 \,{\left (a^{2} b^{2} c - a^{3} b d + a^{4} e\right )} x^{4} - 45 \,{\left (a^{3} b c - a^{4} d\right )} x^{2}}{315 \, a^{5} x^{9}}\right ] \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] integrate((f*x^6 + e*x^4 + d*x^2 + c)/((b*x^2 + a)*x^10),x, algorithm="fricas")

[Out]

[-1/630*(315*(b^4*c - a*b^3*d + a^2*b^2*e - a^3*b*f)*x^9*sqrt(-b/a)*log((b*x^2 +

2*a*x*sqrt(-b/a) - a)/(b*x^2 + a)) + 630*(b^4*c - a*b^3*d + a^2*b^2*e - a^3*b*f

)*x^8 - 210*(a*b^3*c - a^2*b^2*d + a^3*b*e - a^4*f)*x^6 + 70*a^4*c + 126*(a^2*b^

2*c - a^3*b*d + a^4*e)*x^4 - 90*(a^3*b*c - a^4*d)*x^2)/(a^5*x^9), -1/315*(315*(b

^4*c - a*b^3*d + a^2*b^2*e - a^3*b*f)*x^9*sqrt(b/a)*arctan(b*x/(a*sqrt(b/a))) +

315*(b^4*c - a*b^3*d + a^2*b^2*e - a^3*b*f)*x^8 - 105*(a*b^3*c - a^2*b^2*d + a^3

*b*e - a^4*f)*x^6 + 35*a^4*c + 63*(a^2*b^2*c - a^3*b*d + a^4*e)*x^4 - 45*(a^3*b*

c - a^4*d)*x^2)/(a^5*x^9)]

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Sympy [A] time = 52.5361, size = 354, normalized size = 2.02 \[ - \frac{\sqrt{- \frac{b^{3}}{a^{11}}} \left (a^{3} f - a^{2} b e + a b^{2} d - b^{3} c\right ) \log{\left (- \frac{a^{6} \sqrt{- \frac{b^{3}}{a^{11}}} \left (a^{3} f - a^{2} b e + a b^{2} d - b^{3} c\right )}{a^{3} b^{2} f - a^{2} b^{3} e + a b^{4} d - b^{5} c} + x \right )}}{2} + \frac{\sqrt{- \frac{b^{3}}{a^{11}}} \left (a^{3} f - a^{2} b e + a b^{2} d - b^{3} c\right ) \log{\left (\frac{a^{6} \sqrt{- \frac{b^{3}}{a^{11}}} \left (a^{3} f - a^{2} b e + a b^{2} d - b^{3} c\right )}{a^{3} b^{2} f - a^{2} b^{3} e + a b^{4} d - b^{5} c} + x \right )}}{2} + \frac{- 35 a^{4} c + x^{8} \left (315 a^{3} b f - 315 a^{2} b^{2} e + 315 a b^{3} d - 315 b^{4} c\right ) + x^{6} \left (- 105 a^{4} f + 105 a^{3} b e - 105 a^{2} b^{2} d + 105 a b^{3} c\right ) + x^{4} \left (- 63 a^{4} e + 63 a^{3} b d - 63 a^{2} b^{2} c\right ) + x^{2} \left (- 45 a^{4} d + 45 a^{3} b c\right )}{315 a^{5} x^{9}} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] integrate((f*x**6+e*x**4+d*x**2+c)/x**10/(b*x**2+a),x)

[Out]

-sqrt(-b**3/a**11)*(a**3*f - a**2*b*e + a*b**2*d - b**3*c)*log(-a**6*sqrt(-b**3/

a**11)*(a**3*f - a**2*b*e + a*b**2*d - b**3*c)/(a**3*b**2*f - a**2*b**3*e + a*b*

*4*d - b**5*c) + x)/2 + sqrt(-b**3/a**11)*(a**3*f - a**2*b*e + a*b**2*d - b**3*c

)*log(a**6*sqrt(-b**3/a**11)*(a**3*f - a**2*b*e + a*b**2*d - b**3*c)/(a**3*b**2*

f - a**2*b**3*e + a*b**4*d - b**5*c) + x)/2 + (-35*a**4*c + x**8*(315*a**3*b*f -

315*a**2*b**2*e + 315*a*b**3*d - 315*b**4*c) + x**6*(-105*a**4*f + 105*a**3*b*e

- 105*a**2*b**2*d + 105*a*b**3*c) + x**4*(-63*a**4*e + 63*a**3*b*d - 63*a**2*b*

*2*c) + x**2*(-45*a**4*d + 45*a**3*b*c))/(315*a**5*x**9)

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GIAC/XCAS [A] time = 0.220088, size = 271, normalized size = 1.55 \[ -\frac{{\left (b^{5} c - a b^{4} d - a^{3} b^{2} f + a^{2} b^{3} e\right )} \arctan \left (\frac{b x}{\sqrt{a b}}\right )}{\sqrt{a b} a^{5}} - \frac{315 \, b^{4} c x^{8} - 315 \, a b^{3} d x^{8} - 315 \, a^{3} b f x^{8} + 315 \, a^{2} b^{2} x^{8} e - 105 \, a b^{3} c x^{6} + 105 \, a^{2} b^{2} d x^{6} + 105 \, a^{4} f x^{6} - 105 \, a^{3} b x^{6} e + 63 \, a^{2} b^{2} c x^{4} - 63 \, a^{3} b d x^{4} + 63 \, a^{4} x^{4} e - 45 \, a^{3} b c x^{2} + 45 \, a^{4} d x^{2} + 35 \, a^{4} c}{315 \, a^{5} x^{9}} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] integrate((f*x^6 + e*x^4 + d*x^2 + c)/((b*x^2 + a)*x^10),x, algorithm="giac")

[Out]

-(b^5*c - a*b^4*d - a^3*b^2*f + a^2*b^3*e)*arctan(b*x/sqrt(a*b))/(sqrt(a*b)*a^5)

- 1/315*(315*b^4*c*x^8 - 315*a*b^3*d*x^8 - 315*a^3*b*f*x^8 + 315*a^2*b^2*x^8*e

- 105*a*b^3*c*x^6 + 105*a^2*b^2*d*x^6 + 105*a^4*f*x^6 - 105*a^3*b*x^6*e + 63*a^2

*b^2*c*x^4 - 63*a^3*b*d*x^4 + 63*a^4*x^4*e - 45*a^3*b*c*x^2 + 45*a^4*d*x^2 + 35*

a^4*c)/(a^5*x^9)

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