How do you integrate $x^3((x^4)+3)^5 dx$ ?

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How do you integrate $x^3((x^4)+3)^5 dx$ ?

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Answer 1 · 2016-05-03T01:50:42

$(x^4+3)^6/24+C$

Explanation:

We have the integral

$intx^3(x^4+3)^5dx$

This can be solved fairly simply through substitution: we don't have to go through the hassle of expanding the binomial and then integrating term by term.

Let $u=x^4+3$ . This implies that $du=4x^3dx$ . Since we only have $x^3dx$ in the integral and not $4x^3dx$ , multiply the interior of the integral by $4$ and the exterior by $1//4$ to balance this.

$intx^3(x^4+3)^5dx=1/4int(x^4+3)^5*4x^3dx=1/4intu^5du$

Integrating this results in $(1/4)u^6/6+C$ , and since $u=x^4+3$ , this becomes $(x^4+3)^6/24+C$ .

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How do you integrate $x^3((x^4)+3)^5 dx$ ?

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How do you integrate $x^3((x^4)+3)^5 dx$ ?