Question #aa131

Question

Question #aa131

2 Answers

Impact of this question

1170 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-05-14T13:36:15

$- \frac{{(1 - x)}^{4}}{4} + C$ $-(1-x)^4/4+C$

Explanation:

Substitute $u = 1 - x$ $u=1-x$ and $\frac{d u}{d x} [1 - x] = - 1$ $(du)/dx[1-x]=-1$

This simplifies to:
$- \int [u^{3}] d u$ $-int[u^3]du$
Power Rule:
$= - (\frac{u^{4}}{4})$ $=-(u^4/4)$
Undo subtitution:
$= - \frac{{(1 - x)}^{4}}{4} + C$ $=-(1-x)^4/4+C$

Answer 2 · 2017-05-14T13:36:25

$- \frac{1}{4} \cdot {(1 - x)}^{4} + C$ $-1/4*(1-x)^4 + C$

Explanation:

Two ways to solve this :
1) You can develop ${(1 - x)}^{3}$ $(1-x)^3$ and integrate term by term but that isn't really clean...

2) Remember the formula : $(f(g))' = g'*f'(g)$ ?
In your case :
$f : u -> u^4$ and $g : x -> 1-x$
$g'(x) = -1$

then $f(g(x)) = (1-x)^4$
$(f(g(x)))' = - 4*(1-x)^3$
And because you don't want the -4 factor, you divide each side by this and you get :

$int (1-x)^3 dx = [-1/4*(1-x)^4]$

Science

Math

Humanities

... and beyond

Question #aa131

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question