009B Sample Final 1, Problem 4

Compute the following integrals.

a) ${\displaystyle \int e^{x}(x+\sin(e^{x}))~dx}$

b) ${\displaystyle \int {\frac {2x^{2}+1}{2x^{2}+x}}~dx}$

c) ${\displaystyle \int \sin ^{3}x~dx}$

Foundations:
Review ${\displaystyle u}$-substitution
Integration by parts
Partial fraction decomposition
Trig identities

Solution:

(a)

Step 1:
We first distribute to get ${\displaystyle \int e^{x}(x+\sin(e^{x}))~dx=\int e^{x}x~dx+\int e^{x}\sin(e^{x})~dx}$.
Now, for the first integral on the right hand side of the last equation, we use integration by parts.
Let ${\displaystyle u=x}$ and ${\displaystyle dv=e^{x}dx}$. Then, ${\displaystyle du=dx}$ and ${\displaystyle v=e^{x}}$. So, we have
${\displaystyle \int e^{x}(x+\sin(e^{x}))~dx={\bigg (}xe^{x}-\int e^{x}~dx{\bigg )}+\int e^{x}\sin(e^{x})~dx=xe^{x}-e^{x}+\int e^{x}\sin(e^{x})~dx}$

Step 2:
Now, for the one remaining integral, we use ${\displaystyle u}$-substitution.
Let ${\displaystyle u=e^{x}}$. Then, ${\displaystyle du=e^{x}dx}$. So, we have
${\displaystyle \int e^{x}(x+\sin(e^{x}))~dx=xe^{x}-e^{x}+\int \sin(u)~du=xe^{x}-e^{x}-\cos(u)+C=xe^{x}-e^{x}-\cos(e^{x})+C}$.

(b)

(c)

Step 1:
First, we write ${\displaystyle \int \sin ^{3}x~dx=\int \sin ^{2}x\sin x~dx}$.
Using the identity ${\displaystyle \sin ^{2}x+\cos ^{2}x=1}$, we get ${\displaystyle \sin ^{2}x=1-\cos ^{2}x}$. If we use this identity, we have
${\displaystyle \int \sin ^{3}x~dx=\int (1-\cos ^{2}x)\sin x~dx}$.

Step 2:
Now, we proceed by ${\displaystyle u}$-substitution. Let ${\displaystyle u=\cos x}$. Then, ${\displaystyle du=-\sin xdx}$. So we have
${\displaystyle \int \sin ^{3}x~dx=\int -(1-u^{2})~du=-u+{\frac {u^{3}}{3}}+C=-\cos x+{\frac {\cos ^{3}x}{3}}+C}$.

Final Answer:
(a) ${\displaystyle xe^{x}-e^{x}-\cos(e^{x})+C}$
(b)
(c) ${\displaystyle -\cos x+{\frac {\cos ^{3}x}{3}}+C}$

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