∖int∖left(a + bx + cx2∖right)∖left(1 + ∖left(d + ax + bx2 _____2 + cx3 ____

3.215 \(\int \left (a+b x+c x^2\right ) \left (1+\left (d+a x+\frac{b x^2}{2}+\frac{c x^3}{3}\right )^5\right ) \, dx\)

Optimal. Leaf size=47 \[ \frac{1}{6} \left (a x+\frac{b x^2}{2}+\frac{c x^3}{3}+d\right )^6+a x+\frac{b x^2}{2}+\frac{c x^3}{3} \]

[Out]

a*x + (b*x^2)/2 + (c*x^3)/3 + (d + a*x + (b*x^2)/2 + (c*x^3)/3)^6/6

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Rubi [A] time = 0.101271, antiderivative size = 47, normalized size of antiderivative = 1., number of steps used = 2, number of rules used = 1, integrand size = 36, \(\frac{\text{number of rules}}{\text{integrand size}}\) = 0.028 \[ \frac{\left (6 a x+3 b x^2+2 c x^3+6 d\right )^6}{279936}+a x+\frac{b x^2}{2}+\frac{c x^3}{3} \]

Antiderivative was successfully veriﬁed.

[In] Int[(a + b*x + c*x^2)*(1 + (d + a*x + (b*x^2)/2 + (c*x^3)/3)^5),x]

[Out]

a*x + (b*x^2)/2 + (c*x^3)/3 + (6*d + 6*a*x + 3*b*x^2 + 2*c*x^3)^6/279936

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Rubi in Sympy [A] time = 21.7639, size = 39, normalized size = 0.83 \[ a x + \frac{b x^{2}}{2} + \frac{c x^{3}}{3} + d + \frac{\left (a x + \frac{b x^{2}}{2} + \frac{c x^{3}}{3} + d\right )^{6}}{6} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] rubi_integrate((c*x**2+b*x+a)*(1+(d+a*x+1/2*b*x**2+1/3*c*x**3)**5),x)

[Out]

a*x + b*x**2/2 + c*x**3/3 + d + (a*x + b*x**2/2 + c*x**3/3 + d)**6/6

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Mathematica [B] time = 0.22098, size = 248, normalized size = 5.28 \[ \frac{x (6 a+x (3 b+2 c x)) \left (7776 a^5 x^5+6480 a^4 x^6 (3 b+2 c x)+2160 a^3 x^7 (3 b+2 c x)^2+360 a^2 x^8 (3 b+2 c x)^3+19440 d^4 x (6 a+x (3 b+2 c x))+4320 d^3 x^2 (6 a+x (3 b+2 c x))^2+540 d^2 x^3 (6 a+x (3 b+2 c x))^3+36 d x^4 (6 a+x (3 b+2 c x))^4+30 a x^9 (3 b+2 c x)^4+243 b^5 x^{10}+810 b^4 c x^{11}+1080 b^3 c^2 x^{12}+720 b^2 c^3 x^{13}+240 b c^4 x^{14}+32 c^5 x^{15}+46656 d^5+46656\right )}{279936} \]

Antiderivative was successfully veriﬁed.

[In] Integrate[(a + b*x + c*x^2)*(1 + (d + a*x + (b*x^2)/2 + (c*x^3)/3)^5),x]

[Out]

(x*(6*a + x*(3*b + 2*c*x))*(46656 + 46656*d^5 + 7776*a^5*x^5 + 243*b^5*x^10 + 81

0*b^4*c*x^11 + 1080*b^3*c^2*x^12 + 720*b^2*c^3*x^13 + 240*b*c^4*x^14 + 32*c^5*x^

15 + 6480*a^4*x^6*(3*b + 2*c*x) + 2160*a^3*x^7*(3*b + 2*c*x)^2 + 360*a^2*x^8*(3*

b + 2*c*x)^3 + 30*a*x^9*(3*b + 2*c*x)^4 + 19440*d^4*x*(6*a + x*(3*b + 2*c*x)) +

4320*d^3*x^2*(6*a + x*(3*b + 2*c*x))^2 + 540*d^2*x^3*(6*a + x*(3*b + 2*c*x))^3 +

36*d*x^4*(6*a + x*(3*b + 2*c*x))^4))/279936

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Maple [B] time = 0.004, size = 4284, normalized size = 91.2 \[ \text{output too large to display} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] int((c*x^2+b*x+a)*(1+(d+a*x+1/2*b*x^2+1/3*c*x^3)^5),x)

[Out]

1/4374*c^6*x^18+1/486*b*c^5*x^17+1/16*(1/243*a*c^5+5/162*b^2*c^4+c*(1/81*a*c^4+1

/27*b^2*c^3+1/3*c*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2)))*x^16+1/15*(5/162*a*b

*c^4+b*(1/81*a*c^4+1/27*b^2*c^3+1/3*c*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2))+c

*(1/81*c^4*d+2/27*a*b*c^3+1/2*b*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2)+1/3*c*(2

/9*(2/3*c*d+a*b)*c^2+2/3*(2/3*a*c+1/4*b^2)*b*c)))*x^15+1/14*(a*(1/81*a*c^4+1/27*

b^2*c^3+1/3*c*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2))+b*(1/81*c^4*d+2/27*a*b*c^

3+1/2*b*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2)+1/3*c*(2/9*(2/3*c*d+a*b)*c^2+2/3

*(2/3*a*c+1/4*b^2)*b*c))+c*(2/27*d*b*c^3+a*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^

2)+1/2*b*(2/9*(2/3*c*d+a*b)*c^2+2/3*(2/3*a*c+1/4*b^2)*b*c)+1/3*c*(2/9*(a^2+b*d)*

c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2)))*x^14+1/13*(a*(1/81*c^4*d+2/27*a

*b*c^3+1/2*b*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2)+1/3*c*(2/9*(2/3*c*d+a*b)*c^

2+2/3*(2/3*a*c+1/4*b^2)*b*c))+b*(2/27*d*b*c^3+a*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b

^2*c^2)+1/2*b*(2/9*(2/3*c*d+a*b)*c^2+2/3*(2/3*a*c+1/4*b^2)*b*c)+1/3*c*(2/9*(a^2+

b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2))+c*(d*(2/9*(2/3*a*c+1/4*b^2)

*c^2+1/9*b^2*c^2)+a*(2/9*(2/3*c*d+a*b)*c^2+2/3*(2/3*a*c+1/4*b^2)*b*c)+1/2*b*(2/9

*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2)+1/3*c*(4/9*a*c^2*d+2/3

*(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))))*x^13+1/12*(a*(2/27*d*b*c^3+a

*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2)+1/2*b*(2/9*(2/3*c*d+a*b)*c^2+2/3*(2/3*a

*c+1/4*b^2)*b*c)+1/3*c*(2/9*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2

)^2))+b*(d*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/9*b^2*c^2)+a*(2/9*(2/3*c*d+a*b)*c^2+2/3*

(2/3*a*c+1/4*b^2)*b*c)+1/2*b*(2/9*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1

/4*b^2)^2)+1/3*c*(4/9*a*c^2*d+2/3*(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2

)))+c*(d*(2/9*(2/3*c*d+a*b)*c^2+2/3*(2/3*a*c+1/4*b^2)*b*c)+a*(2/9*(a^2+b*d)*c^2+

2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2)+1/2*b*(4/9*a*c^2*d+2/3*(a^2+b*d)*b*c+

2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+1/3*c*(2/9*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2

/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2)))*x^12+1/11*(a*(d*(2/9*(2/3*a*c+1/4*b^2)*c^2+1/

9*b^2*c^2)+a*(2/9*(2/3*c*d+a*b)*c^2+2/3*(2/3*a*c+1/4*b^2)*b*c)+1/2*b*(2/9*(a^2+b

*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2)+1/3*c*(4/9*a*c^2*d+2/3*(a^2+b

*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2)))+b*(d*(2/9*(2/3*c*d+a*b)*c^2+2/3*(2/3

*a*c+1/4*b^2)*b*c)+a*(2/9*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^

2)+1/2*b*(4/9*a*c^2*d+2/3*(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+1/3*c

*(2/9*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2))+c*(d*(

2/9*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2)+a*(4/9*a*c^2*d+2/3*

(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+1/2*b*(2/9*c^2*d^2+4/3*a*b*c*d+

2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2)+1/3*c*(2/3*b*c*d^2+4*a*d*(2/3*a*c

+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b))))*x^11+1/10*(a*(d*(2/9*(2/3*c*d+a*b)*c^2+2/

3*(2/3*a*c+1/4*b^2)*b*c)+a*(2/9*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4

*b^2)^2)+1/2*b*(4/9*a*c^2*d+2/3*(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))

+1/3*c*(2/9*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2))+

b*(d*(2/9*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2)+a*(4/9*a*c^2*

d+2/3*(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+1/2*b*(2/9*c^2*d^2+4/3*a*

b*c*d+2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2)+1/3*c*(2/3*b*c*d^2+4*a*d*(2

/3*a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b)))+c*(d*(4/9*a*c^2*d+2/3*(a^2+b*d)*b*c+

2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+a*(2/9*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a

*c+1/4*b^2)+(2/3*c*d+a*b)^2)+1/2*b*(2/3*b*c*d^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b

*d)*(2/3*c*d+a*b))+1/3*c*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^

2)))*x^10+1/9*(a*(d*(2/9*(a^2+b*d)*c^2+2/3*(2/3*c*d+a*b)*b*c+(2/3*a*c+1/4*b^2)^2

)+a*(4/9*a*c^2*d+2/3*(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+1/2*b*(2/9

*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2)+1/3*c*(2/3*b

*c*d^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b)))+b*(d*(4/9*a*c^2*d+2/3

*(a^2+b*d)*b*c+2*(2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+a*(2/9*c^2*d^2+4/3*a*b*c*d+2*(

a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2)+1/2*b*(2/3*b*c*d^2+4*a*d*(2/3*a*c+1/

4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b))+1/3*c*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+

a*b)+(a^2+b*d)^2))+c*(d*(2/9*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(

2/3*c*d+a*b)^2)+a*(2/3*b*c*d^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b)

)+1/2*b*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2)+1/3*c*(2*d^2*(

2/3*c*d+a*b)+4*a*d*(a^2+b*d))))*x^9+1/8*(a*(d*(4/9*a*c^2*d+2/3*(a^2+b*d)*b*c+2*(

2/3*c*d+a*b)*(2/3*a*c+1/4*b^2))+a*(2/9*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a*c+

1/4*b^2)+(2/3*c*d+a*b)^2)+1/2*b*(2/3*b*c*d^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b*d)

*(2/3*c*d+a*b))+1/3*c*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2))

+b*(d*(2/9*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2)+a*

(2/3*b*c*d^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b))+1/2*b*(2*d^2*(2/

3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2)+1/3*c*(2*d^2*(2/3*c*d+a*b)+4*a*d

*(a^2+b*d)))+c*(d*(2/3*b*c*d^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b)

)+a*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2)+1/2*b*(2*d^2*(2/3*

c*d+a*b)+4*a*d*(a^2+b*d))+1/3*c*(2*d^2*(a^2+b*d)+4*a^2*d^2)))*x^8+1/7*(a*(d*(2/9

*c^2*d^2+4/3*a*b*c*d+2*(a^2+b*d)*(2/3*a*c+1/4*b^2)+(2/3*c*d+a*b)^2)+a*(2/3*b*c*d

^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b))+1/2*b*(2*d^2*(2/3*a*c+1/4*

b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2)+1/3*c*(2*d^2*(2/3*c*d+a*b)+4*a*d*(a^2+b*d)

))+b*(d*(2/3*b*c*d^2+4*a*d*(2/3*a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b))+a*(2*d^2

*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2)+1/2*b*(2*d^2*(2/3*c*d+a*b)+4

*a*d*(a^2+b*d))+1/3*c*(2*d^2*(a^2+b*d)+4*a^2*d^2))+c*(d*(2*d^2*(2/3*a*c+1/4*b^2)

+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2)+a*(2*d^2*(2/3*c*d+a*b)+4*a*d*(a^2+b*d))+1/2*b*

(2*d^2*(a^2+b*d)+4*a^2*d^2)+4/3*a*c*d^3))*x^7+1/6*(a*(d*(2/3*b*c*d^2+4*a*d*(2/3*

a*c+1/4*b^2)+2*(a^2+b*d)*(2/3*c*d+a*b))+a*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*

d+a*b)+(a^2+b*d)^2)+1/2*b*(2*d^2*(2/3*c*d+a*b)+4*a*d*(a^2+b*d))+1/3*c*(2*d^2*(a^

2+b*d)+4*a^2*d^2))+b*(d*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*b)+(a^2+b*d)^2

)+a*(2*d^2*(2/3*c*d+a*b)+4*a*d*(a^2+b*d))+1/2*b*(2*d^2*(a^2+b*d)+4*a^2*d^2)+4/3*

a*c*d^3)+c*(d*(2*d^2*(2/3*c*d+a*b)+4*a*d*(a^2+b*d))+a*(2*d^2*(a^2+b*d)+4*a^2*d^2

)+2*b*a*d^3+1/3*c*d^4))*x^6+1/5*(a*(d*(2*d^2*(2/3*a*c+1/4*b^2)+4*a*d*(2/3*c*d+a*

b)+(a^2+b*d)^2)+a*(2*d^2*(2/3*c*d+a*b)+4*a*d*(a^2+b*d))+1/2*b*(2*d^2*(a^2+b*d)+4

*a^2*d^2)+4/3*a*c*d^3)+b*(d*(2*d^2*(2/3*c*d+a*b)+4*a*d*(a^2+b*d))+a*(2*d^2*(a^2+

b*d)+4*a^2*d^2)+2*b*a*d^3+1/3*c*d^4)+c*(d*(2*d^2*(a^2+b*d)+4*a^2*d^2)+4*a^2*d^3+

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

d)+4*a^2*d^2)+2*b*a*d^3+1/3*c*d^4)+b*(d*(2*d^2*(a^2+b*d)+4*a^2*d^2)+4*a^2*d^3+1/

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

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

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Maxima [A] time = 0.81788, size = 1044, normalized size = 22.21 \[ \text{result too large to display} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] integrate(1/7776*((2*c*x^3 + 3*b*x^2 + 6*a*x + 6*d)^5 + 7776)*(c*x^2 + b*x + a),x, algorithm="maxima")

[Out]

1/4374*c^6*x^18 + 1/486*b*c^5*x^17 + 1/1944*(15*b^2*c^4 + 8*a*c^5)*x^16 + 1/972*

(15*b^3*c^3 + 30*a*b*c^4 + 4*c^5*d)*x^15 + 5/2592*(9*b^4*c^2 + 48*a*b^2*c^3 + 16

*a^2*c^4 + 16*b*c^4*d)*x^14 + 1/2592*(27*b^5*c + 360*a*b^3*c^2 + 480*a^2*b*c^3 +

80*(3*b^2*c^3 + 2*a*c^4)*d)*x^13 + 1/10368*(27*b^6 + 1080*a*b^4*c + 4320*a^2*b^

2*c^2 + 1280*a^3*c^3 + 320*c^4*d^2 + 480*(3*b^3*c^2 + 8*a*b*c^3)*d)*x^12 + 1/864

*(27*a*b^5 + 360*a^2*b^3*c + 480*a^3*b*c^2 + 160*b*c^3*d^2 + 10*(9*b^4*c + 72*a*

b^2*c^2 + 32*a^2*c^3)*d)*x^11 + 1/864*(135*a^2*b^4 + 720*a^3*b^2*c + 240*a^4*c^2

+ 40*(9*b^2*c^2 + 8*a*c^3)*d^2 + 9*(3*b^5 + 80*a*b^3*c + 160*a^2*b*c^2)*d)*x^10

+ 5/1296*(108*a^3*b^3 + 216*a^4*b*c + 32*c^3*d^3 + 108*(b^3*c + 4*a*b*c^2)*d^2

+ 9*(9*a*b^4 + 72*a^2*b^2*c + 32*a^3*c^2)*d)*x^9 + 1/288*(180*a^4*b^2 + 96*a^5*c

+ 160*b*c^2*d^3 + 15*(3*b^4 + 48*a*b^2*c + 32*a^2*c^2)*d^2 + 120*(3*a^2*b^3 + 8

*a^3*b*c)*d)*x^8 + 1/36*(18*a^5*b + 10*(3*b^2*c + 4*a*c^2)*d^3 + 45*(a*b^3 + 4*a

^2*b*c)*d^2 + 30*(3*a^3*b^2 + 2*a^4*c)*d)*x^7 + 1/36*(6*a^6 + 90*a^4*b*d + 10*c^

2*d^4 + 15*(b^3 + 8*a*b*c)*d^3 + 15*(9*a^2*b^2 + 8*a^3*c)*d^2)*x^6 + 1/6*(6*a^5*

d + 30*a^3*b*d^2 + 5*b*c*d^4 + 5*(3*a*b^2 + 4*a^2*c)*d^3)*x^5 + 5/24*(12*a^4*d^2

+ 24*a^2*b*d^3 + (3*b^2 + 8*a*c)*d^4)*x^4 + 1/6*(20*a^3*d^3 + 15*a*b*d^4 + 2*c*

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

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Fricas [A] time = 0.256481, size = 1044, normalized size = 22.21 \[ \text{result too large to display} \]

Veriﬁcation of antiderivative is not currently implemented for this CAS.

[In] integrate(1/7776*((2*c*x^3 + 3*b*x^2 + 6*a*x + 6*d)^5 + 7776)*(c*x^2 + b*x + a),x, algorithm="fricas")