Difference between revisions of "009B Sample Final 1, Problem 4"

Revision as of 11:49, 27 February 2017

Compute the following integrals.

(a) $\int {\frac {t^{2}}{\sqrt {1-t^{6}}}}~dt$

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

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

ExpandFoundations:
1. 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 $A,B.$
2. We have the Pythagorean identity
$\sin ^{2}(x)=1-\cos ^{2}(x).$

Solution:

(a)

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

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

(b)

ExpandStep 1:
First, we add and subtract $x$ from the numerator.
So, we have
${\begin{array}{rcl}\displaystyle {\int {\frac {2x^{2}+1}{2x^{2}+x}}~dx}&=&\displaystyle {\int {\frac {2x^{2}+x-x+1}{2x^{2}+x}}~dx}\\&&\\&=&\displaystyle {\int {\frac {2x^{2}+x}{2x^{2}+x}}~dx+\int {\frac {1-x}{2x^{2}+x}}~dx}\\&&\\&=&\displaystyle {\int ~dx+\int {\frac {1-x}{2x^{2}+x}}~dx}.\\\end{array}}$

ExpandStep 2:
Now, we need to use partial fraction decomposition for the second integral.
Since $2x^{2}+x=x(2x+1),$ we let
${\frac {1-x}{2x^{2}+x}}={\frac {A}{x}}+{\frac {B}{2x+1}}.$
Multiplying both sides of the last equation by $x(2x+1),$
we get
$1-x=A(2x+1)+Bx.$
If we let $x=0,$ the last equation becomes $1=A.$
If we let $x=-{\frac {1}{2}},$ then we get ${\frac {3}{2}}=-{\frac {1}{2}}\,B.$ Thus, $B=-3.$
So, in summation, we have
${\frac {1-x}{2x^{2}+x}}={\frac {1}{x}}+{\frac {-3}{2x+1}}.$

ExpandStep 3:
If we plug in the last equation from Step 2 into our final integral in Step 1, we have
${\begin{array}{rcl}\displaystyle {\int {\frac {2x^{2}+1}{2x^{2}+x}}~dx}&=&\displaystyle {\int ~dx+\int {\frac {1}{x}}~dx+\int {\frac {-3}{2x+1}}~dx}\\&&\\&=&\displaystyle {x+\ln x+\int {\frac {-3}{2x+1}}~dx.}\\\end{array}}$

ExpandStep 4:
For the final remaining integral, we use $u$ -substitution.
Let $u=2x+1.$ Then, $du=2\,dx$ and ${\frac {du}{2}}=dx.$
Thus, our final integral becomes
${\begin{array}{rcl}\displaystyle {\int {\frac {2x^{2}+1}{2x^{2}+x}}~dx}&=&\displaystyle {x+\ln x+\int {\frac {-3}{2x+1}}~dx}\\&&\\&=&\displaystyle {x+\ln x+\int {\frac {-3}{2u}}~du}\\&&\\&=&\displaystyle {x+\ln x-{\frac {3}{2}}\ln u+C.}\\\end{array}}$
Therefore, the final answer is
$\int {\frac {2x^{2}+1}{2x^{2}+x}}~dx\,=\,x+\ln x-{\frac {3}{2}}\ln(2x+1)+C.$

(c)

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

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

ExpandFinal Answer:
(a) $xe^{x}-e^{x}-\cos(e^{x})+C$
(b) $x+\ln x-{\frac {3}{2}}\ln(2x+1)+C$
(c) $-\cos x+{\frac {\cos ^{3}x}{3}}+C$

Return to Sample Exam

@@ Line 14: / Line 14: @@
 |&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -18px">\frac{1}{(x+1)(x+2)}=\frac{A}{x+1}+\frac{B}{x+2}</math>
 |-
-|&nbsp; &nbsp; &nbsp; &nbsp;for some constants <math style="vertical-align: -4px">A,B</math>.
+|&nbsp; &nbsp; &nbsp; &nbsp;for some constants <math style="vertical-align: -4px">A,B.</math>
 |-
 |'''2.''' We have the Pythagorean identity
 |-
-|&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -5px">\sin^2(x)=1-\cos^2(x)</math>.
+|&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -5px">\sin^2(x)=1-\cos^2(x).</math>
 |}
@@ Line 91: / Line 91: @@
 |Now, we need to use partial fraction decomposition for the second integral.
 |-
-|Since &nbsp;<math style="vertical-align: -5px">2x^2+x=x(2x+1),</math>&nbsp; we let &nbsp;<math>\frac{1-x}{2x^2+x}=\frac{A}{x}+\frac{B}{2x+1}.</math>
+|Since &nbsp;<math style="vertical-align: -5px">2x^2+x=x(2x+1),</math>&nbsp; we let
+|-
+|&nbsp; &nbsp; &nbsp; &nbsp;<math>\frac{1-x}{2x^2+x}=\frac{A}{x}+\frac{B}{2x+1}.</math>
 |-
 |Multiplying both sides of the last equation by &nbsp;<math style="vertical-align: -5px">x(2x+1),</math>
 |-
-|we get &nbsp;<math style="vertical-align: -5px">1-x=A(2x+1)+Bx.</math>
+|we get
 |-
-|If we let &nbsp;<math style="vertical-align: 0px">x=0,</math> the last equation becomes &nbsp;<math style="vertical-align: -1px">1=A.</math>
+|&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -5px">1-x=A(2x+1)+Bx.</math>
+|-
+|If we let &nbsp;<math style="vertical-align: -5px">x=0,</math> the last equation becomes &nbsp;<math style="vertical-align: -1px">1=A.</math>
 |-
 |If we let &nbsp;<math style="vertical-align: -14px">x=-\frac{1}{2},</math>&nbsp; then we get &nbsp;<math style="vertical-align: -13px">\frac{3}{2}=-\frac{1}{2}\,B.</math>&nbsp; Thus, &nbsp;<math style="vertical-align: 0px">B=-3.</math>
 |-
-|So, in summation, we have &nbsp;<math>\frac{1-x}{2x^2+x}=\frac{1}{x}+\frac{-3}{2x+1}.</math>
+|So, in summation, we have
+|-
+|&nbsp; &nbsp; &nbsp; &nbsp;<math>\frac{1-x}{2x^2+x}=\frac{1}{x}+\frac{-3}{2x+1}.</math>
 |}
@@ Line 146: / Line 152: @@
 !Step 1: &nbsp;
 |-
-|First, we write &nbsp;<math style="vertical-align: -13px">\int\sin^3x~dx=\int \sin^2 x \sin x~dx</math>.
+|First, we write
+|-
+|&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -13px">\int\sin^3x~dx=\int \sin^2 x \sin x~dx.</math>
+|-
+|Using the identity &nbsp;<math style="vertical-align: -5px">\sin^2x+\cos^2x=1,</math>&nbsp; we get
 |-
-|Using the identity &nbsp;<math style="vertical-align: -2px">\sin^2x+\cos^2x=1,</math>&nbsp; we get &nbsp;<math style="vertical-align: -1px">\sin^2x=1-\cos^2x.</math>
+|&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -1px">\sin^2x=1-\cos^2x.</math>
 |-
 |If we use this identity, we have
 |-
-|&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -13px">\int\sin^3x~dx=\int (1-\cos^2x)\sin x~dx</math>.
+|&nbsp; &nbsp; &nbsp; &nbsp;<math style="vertical-align: -13px">\int\sin^3x~dx=\int (1-\cos^2x)\sin x~dx.</math>
 |-
 |

Difference between revisions of "009B Sample Final 1, Problem 4"

Revision as of 11:49, 27 February 2017

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