009B Sample Final 3, Problem 6

Find the following integrals

(a) $\int {\frac {3x-1}{2x^{2}-x}}~dx$

(b) $\int {\frac {\sqrt {x+1}}{x}}~dx$

Foundations:
Through partial fraction decomposition, we can write the fraction
${\frac {1}{(x+1)(x+2)}}={\frac {A}{x+1}}+{\frac {B}{x+2}}$
for some constants $A,B.$

Solution:

(a)

Step 1:
First, we factor the denominator to get
$\int {\frac {3x-1}{2x^{2}-x}}~dx=\int {\frac {3x-1}{x(2x-1)}}.$
We use the method of partial fraction decomposition.
We let
${\frac {3x-1}{x(2x-1)}}={\frac {A}{x}}+{\frac {B}{2x-1}}.$
If we multiply both sides of this equation by $x(2x-1),$ we get
$3x-1=A(2x-1)+Bx.$

Step 3:
Now, we have
${\begin{array}{rcl}\displaystyle {\int {\frac {3x-1}{2x^{2}-x}}~dx}&=&\displaystyle {\int {\frac {1}{x}}+{\frac {1}{2x-1}}~dx}\\&&\\&=&\displaystyle {\int {\frac {1}{x}}~dx+\int {\frac {1}{2x-1}}~dx}\\&&\\&=&\displaystyle {\ln \|x\|+\int {\frac {1}{2x-1}}~dx.}\end{array}}$
Now, we use $u$ -substitution.
Let $u=2x-1.$
Then, $du=2dx$ and ${\frac {du}{2}}=dx.$
Hence, we have
${\begin{array}{rcl}\displaystyle {\int {\frac {3x-1}{2x^{2}-x}}~dx}&=&\displaystyle {\ln \|x\|+{\frac {1}{2}}\int {\frac {1}{u}}~du}\\&&\\&=&\displaystyle {\ln \|x\|+{\frac {1}{2}}\ln \|u\|+C}\\&&\\&=&\displaystyle {\ln \|x\|+{\frac {1}{2}}\ln \|2x-1\|+C.}\end{array}}$

(b)

Step 1:
We begin by using $u$ -substitution.
Let $u={\sqrt {x+1}}.$
Then, $u^{2}=x+1$ and $x=u^{2}-1.$
Also, we have
${\begin{array}{rcl}\displaystyle {du}&=&\displaystyle {{\frac {1}{2}}(x+1)^{\frac {-1}{2}}dx}\\&&\\&=&\displaystyle {{\frac {1}{2{\sqrt {x+1}}}}dx}\\&&\\&=&\displaystyle {{\frac {1}{2u}}dx.}\end{array}}$
Hence,
$dx=2udu.$
Using all this information, we get
$\int {\frac {\sqrt {x+1}}{x}}~dx=\int {\frac {2u^{2}}{u^{2}-1}}~du.$

Step 2:

Now, we have

{\begin{array}{rcl}\displaystyle {\int {\frac {\sqrt {x+1}}{x}}~dx}&=&\displaystyle {\int {\frac {2u^{2}-2+2}{u^{2}-1}}~du}\\&&\\&=&\displaystyle {\int {\frac {2(u^{2}-1)}{u^{2}-1}}~du+\int {\frac {2}{u^{2}-1}}~du}\\&&\\&=&\displaystyle {\int 2~du+\int {\frac {2}{u^{2}-1}}~du}\\&&\\&=&\displaystyle {2u+\int {\frac {2}{u^{2}-1}}~du}\\&&\\&=&\displaystyle {2{\sqrt {x+1}}+\int {\frac {2}{(u-1)(u+1)}}~du.}\end{array}}

Step 3:
Now, for the remaining integral, we use partial fraction decomposition.
Let
${\frac {2}{(x-1)(x+1)}}={\frac {A}{x+1}}+{\frac {B}{x-1}}.$
Then, we multiply this equation by $(x-1)(x+1)$ to get
$2=A(x-1)+B(x+1).$
If we let $x=1,$ we get $B=1.$
If we let $x=-1,$ we get $A=-1.$
Thus, we have
${\frac {2}{(x-1)(x+1)}}={\frac {-1}{x+1}}+{\frac {1}{x-1}}.$
Using this equation, we have
${\begin{array}{rcl}\displaystyle {\int {\frac {\sqrt {x+1}}{x}}~dx}&=&\displaystyle {2{\sqrt {x+1}}+\int {\frac {-1}{(u+1)}}+{\frac {1}{u-1}}~du}\\&&\\&=&\displaystyle {2{\sqrt {x+1}}+\int {\frac {-1}{(u+1)}}~du+\int {\frac {1}{u-1}}~du.}\\\end{array}}$

Step 4:
To complete this integral, we need to use $u$ -substitution.
For the first integral, let $t=u+1.$ Then, $dt=du.$
For the second integral, let $v=u-1.$ Then, $dv=du.$
Finally, we integrate to get
${\begin{array}{rcl}\displaystyle {\int {\frac {\sqrt {x+1}}{x}}~dx}&=&\displaystyle {2{\sqrt {x+1}}+\int {\frac {-1}{t}}~dt+\int {\frac {1}{v}}~dv}\\&&\\&=&\displaystyle {2{\sqrt {x+1}}+\ln \|t\|+\ln \|v\|+C}\\&&\\&=&\displaystyle {2{\sqrt {x+1}}+\ln \|u+1\|+\ln \|u-1\|+C}\\&&\\&=&\displaystyle {2{\sqrt {x+1}}+\ln \|{\sqrt {x+1}}+1\|+\ln \|{\sqrt {x+1}}-1\|+C.}\end{array}}$

Final Answer:
(a) $\ln \|x\|+{\frac {1}{2}}\ln \|2x-1\|+C$
(b) $2{\sqrt {x+1}}+\ln \|{\sqrt {x+1}}+1\|+\ln \|{\sqrt {x+1}}-1\|+C$

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