Question 1

Identify u and dv for finding the integral using integration by parts. $\int x ^ { 4 } e ^ { 7 x } d x$&#10;A) $u = x ^ { 4 } ; d v = e ^ { 7 x } d x$&#10;B) $u = \int x ^ { 4 } ; d v = \int e ^ { 7 x } d x$&#10;C) $u = \int x ^ { 4 } d x , d v = e ^ { 7 x } d x$&#10;D) $u = \int x ^ { 4 } d x ; d v = \int e ^ { 7 x } d x$&#10;E) $u = x ^ { 4 } d x , d v = \int e ^ { 7 x } d x$

Accepted Answer

In integration by parts, $u$ is a function of $x$ and $dv$ is a differential. Here, $u = x^4$ and $dv = e^{7x}dx$ directly match this format, making option A correct.

Question 2

Use integration by parts to evaluate $\int 4 x e ^ { - 5 x } d x$&#10;A) $- \frac { ( 5 x + 1 ) \left( 4 e ^ { - 5 x } \right) } { 25 } + C$&#10;B) $- \frac { e ^ { - 5 x } } { 5 } + C$&#10;C) $- \frac { \left( 4 e ^ { - 5 x } \right) } { 25 } + C$&#10;D) $- \frac { x \left( 4 e ^ { - 5 x } \right) } { 5 } + C$&#10;E) $\frac { e ^ { - 5 x } } { 5 } + C$

Accepted Answer

Integration by parts formula is $\int u dv = uv - \int v du$. Let $u = x$ and $dv = 4e^{-5x}dx$, then $du = dx$ and $v = -\frac{4}{5}e^{-5x}$. Substituting these into the formula gives $- \frac { ( 5 x + 1 ) \left( 4 e ^ { - 5 x } \right) } { 25 } + C$.

Question 3

Find the indefinite integral. $\int \frac { t } { \sqrt { 1 + 7 t } } d t$&#10;A) $\frac { ( 7 t - 2 ) \sqrt { 7 t + 1 } } { 49 } + C$&#10;B) $\frac { 2 ( 7 t - 2 ) \sqrt { 7 t + 1 } } { 147 } + C$&#10;C) $\frac { 2 ( 2 - 7 t ) \sqrt { 7 t + 1 } } { 147 } + C$&#10;D) $\frac { 2 ( 7 t - 2 ) \sqrt { 7 t + 1 } } { 21 } + C$&#10;E)none of the above

Accepted Answer

To solve the integral $\int \frac { t } { \sqrt { 1 + 7 t } } d t$, let $u = 1 + 7t$, which implies $du = 7dt$ and $t = \frac{u - 1}{7}$. Substituting these into the integral gives $\int \frac{\frac{u - 1}{7}}{\sqrt{u}} \cdot \frac{du}{7}$, which simplifies to $\frac{1}{49}\int \frac{u - 1}{\sqrt{u}} du$. This can be further broken down into $\frac{1}{49}\int u^{1/2} du - \frac{1}{49}\int u^{-1/2} du$, leading to the solution $\frac{2(u^{3/2} - 2\sqrt{u})}{147} + C$, which, when substituted back for $u = 1 + 7t$, matches choice B.

Question 4

Use integration by parts to find the integral below. $\int 5 x ^ { n } \ln a x d x ( a \neq 0 , n \neq - 1 )$&#10;A) $\frac { 5 x ^ { n } } { n } \ln a x - \frac { 5 } { n ^ { 2 } } x ^ { n } + C$&#10;B) $\frac { 6 x ^ { n + 1 } } { n + 1 } \ln a x - \frac { 6 } { ( n + 1 ) ^ { 2 } } x ^ { n + 1 } + C$&#10;C) $\frac { 5 x ^ { n } } { n } - \frac { 5 } { ( n + 1 ) ^ { 2 } } \ln a x + C$&#10;D) $\frac { 5 x ^ { n + 1 } } { n + 1 } \ln a x - \frac { 5 } { ( n + 1 ) ^ { 2 } } x ^ { n + 1 } + C$&#10;E) $\frac { 6 x ^ { n + 1 } } { n + 1 } - \frac { 6 } { n ^ { 2 } } \ln a x + C$

Accepted Answer

Integration by parts formula, $\int u dv = uv - \int v du$, is applied here with $u = \ln(ax)$ and $dv = 5x^n dx$. The correct integration leads to the formula in option D.

Question 5

A model for the ability M of a child to memorize, measured on a scale from 0 to 10, is $M = 1 + 1.6 t \ln t , 0 < t \leq 3$ where t is the child's age in years. Find the average value predicted by the model for a child's ability to memorize between second and third birthdays. Round your answer to three decimal places.

A)5.992
B)4.892
C)6.792
D)3.992
E)4.692

Accepted Answer

The answer of A model for the ability M of...

Question 6

Find the integral below using an integral table. $\int \frac { 6 } { 64 - x ^ { 2 } } d x$&#10;A) $\frac { 3 } { 8 } \ln \left| \frac { 8 + x } { 8 - x } \right| + C$&#10;B) $\frac { 3 } { 8 } \ln \left| \frac { 64 + x } { 64 - x } \right| + C$  &#10;C) $\frac { 3 } { 8 } \ln \left| \frac { 64 - x } { 64 + x } \right| + C$&#10;D) $\frac { 1 } { 8 } \ln \left| \frac { 8 - x } { 8 + x } \right| + C$&#10;E) $\frac { 3 } { 8 } \ln \left| \frac { 8 - x } { 8 + x } \right| + C$

Accepted Answer

The answer of Find the integral below using an integral...

Question 7

Find the indefinite integral. $\int \frac { \ln v } { 9 v ^ { 3 } } d v$&#10;A) $- \frac { 1 } { 18 v ^ { 2 } } ( 2 \ln v + 1 ) + C$&#10;B) $\left. \frac { 1 } { 18 v ^ { 2 } } ( 2 \ln v + 1 ) + C \right)$&#10;C) $\frac { 1 } { 36 v ^ { 2 } } ( 2 \ln v - 1 ) + C$&#10;D) $- \frac { 1 } { 36 v ^ { 2 } } ( 2 \ln v - 1 ) + C$&#10;E) $- \frac { 1 } { 36 v ^ { 2 } } ( 2 \ln v + 1 ) + C$

Accepted Answer

The answer of Find the indefinite integral. \(\int \frac {...

Question 8

Present Value of a Continuous Stream of Income. An electronics company generates a continuous stream of income of $4 t$ million dollars per year, where t is the number of years that the company has been in operation. Find the present value of this stream of income over the first 9 years at a continuous interest rate of 12%. Round answer to one decimal place.

A)$143.7 million
B)$81.6 million
C)$182.7 million
D)$343.2 million
E)$85.8 million

Accepted Answer

The answer of Present Value of a Continuous Stream of...

Question 9

Find the indefinite integral. $\int v \ln ( v + 2 ) d v$&#10;A) $\left( \frac { v ^ { 2 } - 4 } { 2 } \right) \ln ( v + 2 ) - \frac { v ^ { 2 } - 4 v } { 4 } + C$&#10;B) $\left( \frac { v ^ { 2 } - 4 } { 2 } \right) \ln ( v + 2 ) + \frac { v ^ { 2 } - 4 v } { 4 } + C$&#10;C) $\left( \frac { v ^ { 2 } + 4 } { 2 } \right) \ln ( v + 2 ) - \frac { v ^ { 2 } + 2 v } { 4 } + C$&#10;D) $\left( \frac { v ^ { 2 } - 4 } { 2 } \right) \ln ( v + 2 ) - \frac { v ^ { 2 } - 4 v } { 2 } + C$&#10;E) $\left( \frac { v ^ { 2 } - 4 } { 2 } \right) \ln ( v + 2 ) + \frac { v ^ { 2 } - 2 v } { 4 } + C$

Accepted Answer

This integral can be solved using integration by parts, where $u = \ln(v + 2)$ and $dv = v dv$. The derivative of $u$ is $du = \frac{1}{v + 2} dv$, and the integral of $dv$ is $v^2/2$. Applying the integration by parts formula, $\int u dv = uv - \int v du$, and simplifying leads to the expression given in option A.

Question 10

Use integration by parts to evaluate $\int 3 x ^ { 3 } \ln x d x$ .&#10;A) $\frac { - 3 x ^ { 4 } ( 4 \ln ( x ) + 1 ) } { 4 } + C$&#10;B) $\frac { 3 x ^ { 3 } ( 3 \ln ( x ) + 1 ) } { 3 } + C$&#10;C) $\frac { 3 x ^ { 4 } ( 4 \ln ( x ) + 1 ) } { 16 } + C$&#10;D) $\frac { 3 x ^ { 3 } ( 3 \ln ( x ) - 1 ) } { 9 } + C$&#10;E) $\frac { 3 x ^ { 4 } ( 4 \ln ( x ) - 1 ) } { 16 } + C$

Accepted Answer

Using integration by parts, let $ u = \ln x $ and $ dv = 3x^3 dx $. Then $ du = \frac{1}{x} dx $ and $ v = \frac{3}{4}x^4 $. Applying the integration by parts formula $\int u \, dv = uv - \int v \, du$, we get $\frac{3}{4}x^4 \ln x - \int \frac{3}{4}x^4 \cdot \frac{1}{x} dx = \frac{3}{4}x^4 \ln x - \frac{3}{16}x^4 + C$, which simplifies to $\frac{3x^4(4\ln x - 1)}{16} + C$.

Question 11

Use a table of integrals with forms involving $e ^ { u }$ to find the integral. $\int \frac { - 7 } { 1 + e ^ { - 6 x } } d x$&#10;A) $7 x - \frac { 7 } { 6 } \ln \left( 1 - e ^ { - 6 x } \right) + C$&#10;B) $7 x - \frac { 7 } { 6 } \ln \left( 1 + e ^ { - 6 x } \right) + C$&#10;C) $- 7 x + \frac { 7 } { 6 } \ln \left( 1 + e ^ { - 6 x } \right) + C$&#10;D) $- 7 x + \frac { 7 } { 6 } \ln \left( 1 - e ^ { - 6 x } \right) + C$&#10;E) $- 7 x - \frac { 7 } { 6 } \ln \left( 1 + e ^ { - 6 x } \right) + C$

Accepted Answer

The answer of Use a table of integrals with forms...

Question 12

Evaluate the definite integral $\int _ { 0 } ^ { 1 } x ^ { 2 } e ^ { 2 x } d x$ . Round your answer to three decimal places.&#10;A)4.195&#10;B)9.486&#10;C)1.597&#10;D)8.986&#10;E)0.473&#10;

Accepted Answer

The answer of Evaluate the definite integral \(\int _ {...

Question 13

Use integration by parts to evaluate $\int x ^ { 2 } e ^ { - 3 x } d x$ . Note that evaluation may require integration by parts more than once.&#10;A) $- \frac { \left( 2 + 6 x + 9 x ^ { 2 } \right) e ^ { - 3 x } } { 27 } + C$&#10;B) $\frac { \left( 1 + 6 x - 3 x ^ { 2 } \right) e ^ { - 3 x } } { 9 } + C$&#10;C) $- \frac { \left( 2 + 9 x + 9 x ^ { 2 } \right) e ^ { - 3 x } } { 27 } + C$&#10;D) $\frac { \left( 2 - 3 x + 9 x ^ { 2 } \right) e ^ { - 3 x } } { 9 } + C$&#10;E) $- \frac { \left( 1 - 3 x + 9 x ^ { 2 } \right) e ^ { - 3 x } } { - 27 } + C$

Accepted Answer

The answer of Use integration by parts to evaluate \(\int...

Question 14

Use a table of integrals to find the indefinite integral $\int ( \ln 3 x ) ^ { 2 } d x$ .&#10;A) $x \left[ 2 - 2 \ln ( 3 x ) + ( \ln 3 x ) ^ { 2 } \right] + C$&#10;B) $x \left[ 2 \ln ( 3 x ) + ( \ln 3 x ) ^ { 2 } \right] + C$&#10;C) $3 x \left[ 2 + 2 \ln ( 3 x ) + ( \ln 3 x ) ^ { 2 } \right] + C$&#10;D) $x [ 2 - 2 \ln ( 3 x ) - ( \ln 3 x ) ] ^ { 2 } + C$&#10;E) $3 x [ 2 \ln ( 3 x ) + ( \ln 3 x ) ] ^ { 2 } + C$

Accepted Answer

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Question 15

Find the indefinite integral. $\int t \sqrt { 4 t + 9 } d t$&#10;A) $\frac { ( 4 t + 9 ) ^ { 3 / 2 } ( 2 t + 3 ) } { 20 } + C$&#10;B) $\frac { ( 4 t + 9 ) ^ { 3 / 2 } ( 2 t - 6 ) } { 20 } + C$&#10;C) $\frac { ( 4 t + 9 ) ^ { 3 / 2 } ( 2 t - 3 ) } { 20 } + C$&#10;D) $\frac { ( 4 t - 9 ) ^ { 3 / 2 } ( 2 t + 3 ) } { 20 } + C$&#10;E) $\frac { ( 4 t + 9 ) ^ { 3 / 2 } ( 2 t + 6 ) } { 20 } + C$

Accepted Answer

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Question 16

Find the definite integral. $\int _ { 1 } ^ { 4 } x ^ { 3 } \ln x d x$&#10;A) $\frac { 2048 \ln 4 - 255 } { 16 }$&#10;B) $\frac { 1024 \ln 4 - 255 } { 16 }$&#10;C) $\frac { - 1024 \ln 4 - 255 } { 16 }$&#10;D) $\frac { 1024 \ln 4 + 255 } { 16 }$&#10;E)none of the above

Accepted Answer

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Question 17

Find the indefinite integral. $\int \frac { 6 ( \ln x ) ^ { 2 } } { x ^ { 2 } } d x$&#10;A) $\frac { 6 \left( ( \ln x ) ^ { 2 } - 2 \ln x + 2 \right) } { x } + C$&#10;B) $- \frac { 6 \left( ( \ln x ) ^ { 2 } + 2 \ln x + 2 \right) } { x } + C$&#10;C) $- 6 \left( ( \ln x ) ^ { 2 } + 2 \ln x + 2 \right) + C$&#10;D) $- \frac { 6 \left( 2 ( \ln x ) ^ { 2 } + 2 \right) } { x } + C$&#10;E) $\frac { 6 \left( 2 ( \ln x ) ^ { 2 } + 2 \right) } { x } + C$

Accepted Answer

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Question 18

Find the indefinite integral. $\int \frac { 3 x ^ { 2 } } { e ^ { x } } d x$&#10;A) $3 \left( x ^ { 2 } - 2 x + 2 \right) e ^ { - x } + C$&#10;B) $- \left( x ^ { 2 } + 2 x + 2 \right) e ^ { - x } + C$&#10;C) $\left( x ^ { 2 } + 2 x + 2 \right) e ^ { - x } + C$&#10;D) $- 3 x \left( x ^ { 2 } + 2 x + 2 \right) e ^ { - x } + C$&#10;E) $- 3 \left( x ^ { 2 } + 2 x + 2 \right) e ^ { - x } + C$

Accepted Answer

The answer of Find the indefinite integral. \(\int \frac {...

Question 19

Use integration by parts to find the integral below. $\int \ln x ^ { 3 } d x$&#10;A) $\ln x ^ { 4 } - 3 x ^ { 4 } + C$&#10;B) $x \ln x ^ { 4 } - 4 x ^ { 4 } + C$&#10;C) $\ln x ^ { 4 } - x ^ { 4 } + C$&#10;D) $x \ln x ^ { 3 } - 3 x + C$&#10;E) $4 x \ln x ^ { 4 } - 4 x + C$

Accepted Answer

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Question 20

Identify u and dv for finding the integral using integration by parts. $\int x ^ { 3 } \ln 9 x$ dx&#10;A) $u = \int \ln 9 x$ dx; $d v = \int x ^ { 3 }$ dx&#10;B) $u = \ln 9 x , d v = x ^ { 3 } d x$&#10;C) $u = \int \ln 9 x , d v = x ^ { 3 } d x$&#10;D) $u = \ln 9 x , d v = \int x ^ { 3 } d x$&#10;E) $u = \int \ln 9 x , d v = \int x ^ { 3 } d x$

Accepted Answer

The answer of Identify u and dv for finding the...

Question 21

Approximate the value of the definite integral using (a) the Trapezoidal Rule and (b) Simpson's Rule for the indicated value of n. Round your answers to three significant digits. $\int _ { 0 } ^ { 2 } e ^ { - x ^ { 2 } } d x , n = 4$

A)a. Trapezoidal Rule:

\approx 1.881

b. Simpson's Rule:

\approx 0.882

B)a. Trapezoidal Rule:

\approx 0.881

b. Simpson's Rule:

\approx 0.882

C)a. Trapezoidal Rule:

\approx 0.881

b. Simpson's Rule:

\approx 1.882

D)a. Trapezoidal Rule:

\approx 0.081

b. Simpson's Rule:

\approx 0.882

E)a. Trapezoidal Rule:

\approx 0.881

b. Simpson's Rule:

\approx 0.082

Accepted Answer

The answer of Approximate the value of the definite integral...

Question 22

The probability of recall in an experiment is modeled by $P ( a \leq x \leq b ) = \int _ { a } ^ { b } \frac { 75 } { 14 } \left( \frac { x } { \sqrt { 4 + 5 x } } \right) d x , 0 \leq x \leq 1$ where x is the percent of recall. What is the probability of recalling between 50% and 70%? Round your answer to three decimal places.

A)0.243
B)0.206
C)0.650
D)0.163
E)0.832

Accepted Answer

The answer of The probability of recall in an experiment...

Question 23

Evaluate the definite integral $\int _ { 1 } ^ { 3 } x ^ { 2 } \ln x$ dx. Round your answer to three decimal places.&#10;A)7.499&#10;B)8.562&#10;C)5.896&#10;D)6.999&#10;E)6.236&#10;

Accepted Answer

The answer of Evaluate the definite integral \(\int _ {...

Question 24

Approximate the definite integral &#34;by hand,&#34; using the Trapezoidal Rule with $n = 4$ trapezoids. Round answer to three decimal places. $\int _1^ { 2 } \frac { 7 } { x } d x$&#10;A)19.517&#10;B)6.192&#10;C)3.096&#10;D)4.879&#10;E)24.767&#10;

Accepted Answer

The answer of Approximate the definite integral &#34;by hand,&#34; using...

Question 25

The rate of change in the number of subscribers $S$ to a newly introduced magazine is modeled by $\frac { d S } { d t } = 1000 t ^ { 2 } e ^ { - 1 } , 0 \leq t \leq 6$ where $t$ is the time in years. Use Simpson's Rule $n = 12$ with to estimate the total increase in the number of subscribers during the first 6 years.

A)

\approx

1870 subscribers
B)

\approx

1780 subscribers
C)

\approx

1800 subscribers
D)

\approx

1878 subscribers
E)

\approx

1987 subscribers

Accepted Answer

The answer of The rate of change in the number...

Question 26

Use Simpson's Rule to approximate the revenue for the marginal revenue function $\frac { d R } { d x } = 5 \sqrt { 8000 - x ^ { 3 } }$ with n = 4. Assume that the number of units sold, x, increases from 14 to 18. Round your answer to one decimal place.

A)$1439.03
B)$1346.14
C)$1602.40
D)$1230.54
E)$678.36

Accepted Answer

The answer of Use Simpson's Rule to approximate the revenue...

Question 27

Use the error formulas to find n such that the error in the approximation of the definite integral $\int _ { 3 } ^ { 6 } \frac { 1 } { x } d x$ is less than 0.0001 using the Trapezoidal Rule.&#10;A)43&#10;B)44&#10;C)42&#10;D)40&#10;E)41

Accepted Answer

The answer of Use the error formulas to find n...

Question 28

Use the Trapezoidal Rule to approximate the value of the definite integral $\int _ { 0 } ^ { 3 } \sqrt { 1 + x } d x , n = 4$ . Round your answer to three decimal places.&#10;A)2.7931&#10;B)2.7955&#10;C)4.6552&#10;D)4.6615&#10;E)6.7643&#10;

Accepted Answer

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Question 29

Evaluate the definite integral $\int _ { 2 } ^ { 6 } \sqrt { 7 + x ^ { 2 } } d x$ . Round your answer to three decimal places.&#10;A)31.060&#10;B)25.997&#10;C)37.693&#10;D)34.376&#10;E)19.364&#10;

Accepted Answer

The answer of Evaluate the definite integral \(\int _ {...

Question 30

Use a table of integrals with forms involving a + bu to find $\int \frac { x ^ { 2 } } { 8 + 11 x } d x$&#10;A) $\frac { 1 } { 121 } ( 11 x - 8 \ln | 8 + 11 x | ) + C$&#10;B) $\frac { 1 } { 1331 } \left( 11 x - \frac { 64 } { 8 + 11 x } - 16 \ln | 8 + 11 x | \right) + C$&#10;C) $\frac { 1 } { 1331 } \left( \frac { 11 x } { 2 } ( 11 x - 16 ) + 64 \ln | 8 + 11 x | \right) + C$&#10;D) $\frac { 1 } { 121 } \left( \frac { 11 x } { 2 } ( 11 x - 16 ) + 64 \ln | 8 + 11 x | \right) + C$&#10;E) $\frac { 1 } { 121 } \left( 11 x - \frac { 64 } { 8 + 11 x } - 16 \ln | 8 + 11 x | \right) + C$

Accepted Answer

The answer of Use a table of integrals with forms...

Question 31

Use the Trapezoidal Rule and Simpson's Rule to approximate the value of the definite integral for the indicated value of n. Compare these results with the exact value of the definite integral. Round your answers to four decimal places. $\int _ { 0 } ^ { 1 } \left( \frac { x ^ { 2 } } { 2 } + 1 \right) d x , n = 4$

A)a. Exact:

\approx 1.9667

b. Trapezoidal Rule:

\approx 1.1719

c. Simpson's Rule:

\approx 1.1667

B)a. Exact:

\approx 1.1667

b. Trapezoidal Rule:

\approx 1.1719

c. Simpson's Rule:

\approx 1.9667

C)a. Exact:

\approx 1.1667

b. Trapezoidal Rule:

\approx 1.9719

c. Simpson's Rule:

\approx 1.1667

D)a. Exact:

\approx 2.1667

b. Trapezoidal Rule:

\approx 1.1719

c. Simpson's Rule:

\approx 1.1667

E)a. Exact:

\approx 1.1667

b. Trapezoidal Rule:

\approx 1.1719

c. Simpson's Rule:

\approx 1.1667

Accepted Answer

The answer of Use the Trapezoidal Rule and Simpson's Rule...

Question 32

Use a table of integrals to find the indefinite integral $\int x ^ { 9 } e ^ { x ^ { 10 } } d x$ .&#10;A) $\frac { 1 } { 9 } e ^ { x ^ { 10 } } + C$&#10;B) $\frac { 1 } { 10 } e ^ { x ^ { 9 } } + C$&#10;C) $\frac { 1 } { 10 } e ^ { x ^ { 10 } } + C$&#10;D) $\frac { 1 } { 9 } e ^ { x ^ { 9 } } + C$&#10;E) $\frac { 1 } { 10 } e ^ { x } + C$

Accepted Answer

The answer of Use a table of integrals to find...

Question 33

A body assimilates a 12-hour cold tablet at a rate modeled by $d C / d t = 8 - \ln \left( t ^ { 2 } - 2 t + 4 \right) , 0 \leq t \leq 12$ where $d C / d t$ is measured in milligrams per hour and $t$ is the time in hours. Use Simpson's Rule with $n = 8$ to estimate the total amount of the drug absorbed into the body during the 12 hours.

A)

\approx

58.915 mg
B)

\approx

68.915 mg
C)

\approx

38.915 mg
D)

\approx

48.915 mg
E)

\approx

78.915 mg

Accepted Answer

The answer of A body assimilates a 12-hour cold tablet...

Question 34

The revenue (in dollars per year) for a new product is modeled by $R = 10,000 \left[ 1 - \frac { 1 } { \left( 1 + 0.1 ^ { 2 } \right) ^ { 1 / 2 } } \right]$ where t the time in years. Estimate the total revenue from sales of the product over its first 4 years on the market. Round your answer to nearest dollar

A)$10,821
B)$6579
C)$15,830
D)$1138
E)$3291

Accepted Answer

The answer of The revenue (in dollars per year) for...

Question 35

Use a table of integrals to find the indefinite integral $\int \frac { \ln x } { x ( 8 + 5 \ln x ) } d x$ .&#10;A) $\frac { 1 } { 25 } [ 5 \ln x - 8 \ln | 8 + 5 \ln x | ] + C$&#10;B) $[ 8 \ln x - 5 \ln | 8 + 5 \ln x | ] + C$&#10;C) $\frac { 1 } { 25 } [ 5 \ln x + 8 \ln | 8 + 5 \ln x | ] + C$&#10;D) $\ln 13 x + C$&#10;E) $\frac { 1 } { 13 } \ln x + C$

Accepted Answer

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Question 36

Use the table of integrals to find the average value of the growth function $N = \frac { 330 } { 1 + e ^ { 5.7 - 0.25 t } }$ over the interval $[ 22,27 ]$ , where N the size of a population and t is the time in days. Round your answer to three decimal places.

A)200.507
B)758.790
C)198.507
D)391.543
E)321.407

Accepted Answer

The answer of Use the table of integrals to find...

Question 37

Use a table of integrals with forms involving $\sqrt { a ^ { 2 } - u ^ { 2 } }$ to find $\int \frac { - 3 } { x ^ { 2 } \sqrt { 49 - x ^ { 2 } } } d x$&#10;A) $\frac { 3 \sqrt { 49 - x ^ { 2 } } } { 49 x } + C$&#10;B) $- \frac { \sqrt { 49 - x ^ { 2 } } } { 49 x } + C$&#10;C) $\frac { 3 } { 7 } \ln \left| \frac { 7 + \sqrt { 49 - x ^ { 2 } } } { x } \right| + C$&#10;D) $- \frac { 3 \sqrt { 49 - x ^ { 2 } } } { 49 x } + C$&#10;E) $- \frac { 3 } { 7 } \ln \left| \frac { 7 + \sqrt { 49 - x ^ { 2 } } } { x } \right| + C$

Accepted Answer

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Question 38

Use a table of integrals to find the indefinite integral $\int \frac { x ^ { 2 } } { ( 8 + 2 x ) ^ { 7 } } d x$ .&#10;A) $\left[ \frac { - 1 } { 4 ( 8 + 2 x ) ^ { 4 } } + \frac { 16 } { 5 ( 8 + 2 x ) ^ { 5 } } - \frac { 64 } { 6 ( 8 + 2 x ) ^ { 6 } } \right] + C$&#10;B) $\frac { 1 } { 8 } \left[ \frac { - 1 } { 4 ( 8 + 2 x ) ^ { 4 } } + \frac { 16 } { 5 ( 8 + 2 x ) ^ { 5 } } - \frac { 64 } { 6 ( 8 + 2 x ) ^ { 6 } } \right] + C$&#10;C) $\frac { 1 } { 8 } \left[ \frac { - 1 } { 4 ( 8 + 2 x ) ^ { 4 } } + \frac { 16 } { 5 ( 8 + 2 x ) ^ { 5 } } + \frac { 64 } { 6 ( 8 + 2 x ) ^ { 6 } } \right] + C$&#10;D) $\frac { 1 } { 8 } \left[ \frac { - 1 } { 4 ( 8 + 2 x ) ^ { 4 } } - \frac { 16 } { 5 ( 8 + 2 x ) ^ { 5 } } + \frac { 64 } { 6 ( 8 + 2 x ) ^ { 6 } } \right] + C$&#10;E) $\left[ \frac { - 1 } { 4 ( 8 + 2 x ) ^ { 4 } } - \frac { 16 } { 5 ( 8 + 2 x ) ^ { 5 } } + \frac { 64 } { 6 ( 8 + 2 x ) ^ { 6 } } \right] + C$

Accepted Answer

The answer of Use a table of integrals to find...

Question 39

A body assimilates a 12-hour cold tablet at a rate modeled by $\frac { d C } { d t } = 6 - \ln \left( t ^ { 2 } - 2 t + 4 \right)$ , $0 \leq t \leq 12$ where t is measured in milligrams per hour and t is the time in hours. Use Simpson's Rule with n = 12 to estimate the total amount of the drug absorbed into the body during the 12 hours.

A)46.88
B)64.90
C)34.88
D)36.90
E)50.90

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The answer of A body assimilates a 12-hour cold tablet...

Question 40

Approximate the integral using Simpson's Rule: $\int _ { 0 } ^ { 5 } \frac { x } { 2 + x + x ^ { 2 } } d x$ , n = 6. Round your answer to three decimal places.&#10;A)0.652&#10;B)0.850&#10;C)1.161&#10;D)1.017&#10;E)1.284&#10;

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Question 41

Determine whether the improper integral diverges or converges. Evaluate the integral if it converges. $\int _ { - \infty } ^ { 0 } e ^ { 6 x } d x$&#10;A)converges to 0&#10;B)converges to 6&#10;C)converges to $\frac { 1 } { 6 }$&#10;D)diverges to $- \infty$&#10;E)diverges to $\infty$

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Question 42

Suppose the mean height of American women between the ages of 30 and 39 is 64.5 inches, and the standard deviation is 2.7 inches. Use a symbolic integration utility to approximate the probability that a 30-to 39-year-old woman chosen at random is between 5 feet 4 inches and 6 feet tall.

A)0.8547
B)0.5707
C)0.4257
D)0.5734
E)0.9522

Accepted Answer

The answer of Suppose the mean height of American women...

Question 43

A business is expected to yield a continuous flow of profit at the rate of $600,000 per year. If money will earn interest at the nominal rate of 8% per year compounded continuously, what is the present value of the business forever?

A)$7,600,000
B)$7,510,000
C)$7,500,000
D)$750,000
E)$850,000

Accepted Answer

The answer of A business is expected to yield a...

Question 44

Evaluate the improper integral if it converges, or state that it diverges. $\int _ { 1 } ^ { \infty } \frac { 1 } { x ^ { 8 } } d x$&#10;A) $\frac { 1 } { 9 }$&#10;B) $9$&#10;C) $8$&#10;D) $\frac { 1 } { 7 }$&#10;E)diverges

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Question 45

Evaluate the improper integral if it converges, or state that it diverges. $\int _ { 1 } ^ { \infty } \frac { 1 } { \sqrt [ 8 ] { x } } d x$&#10;A) $\sqrt [ 8 ] { 9 }$&#10;B) $1$&#10;C) $8$&#10;D) $9$&#10;E)diverges

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Question 46

The capitalized cost $C$ of an asset is given by $C = C _ { 0 } + \int _ { 0 } ^ { n } C ( t ) e ^ { - r t } d t$ where $C _ { 0 }$ is the original investment, $t$ is the time in years, $r$ is the annual interest rate compounded continuously, and $C ( t )$ is the annual cost of maintenance (in dollars). Find the capitalized cost of an asset (a) for 5 years, (b) for 10 years, and (c) forever. $C _ { 0 } = \$ 300,000 , C ( t ) = 15,000 , r = 6 \%$

A)a. For

n = 5 , C

\approx

$253,901.30b. For

n = 10 , C

\approx

$807,922.43c. For

n = \infty , C

\approx

$4,466,666.67
B)a. For

n = 5 , C

\approx

$453,901.30b. For

n = 10 , C

\approx

$807,922.43c. For

n = \infty , C

\approx

$1,466,666.67
C)a. For

n = 5 , C

\approx

$453,901.30b. For

n = 10 , C

\approx

$2807,922.43c. For

n = \infty , C

\approx

$4,466,666.67
D)a. For

n = 5 , C

\approx

$453,901.30b. For

n = 10 , C

\approx

$807,922.43c. For

n = \infty , C

\approx

$4,466,666.67
E)a. For

n = 5 , C

\approx

$453,901.30b. For

n = 10 , C

\approx

$807,922.43c. For

n = \infty , C

\approx

$466,666.67

Accepted Answer

The answer of The capitalized cost $C$ of an asset...

Question 47

Find the capitalized cost C of an asset forever. The capitalized cost is given by $C = C _ { 0 } + \int _ { 0 } ^ { n } c ( t ) e ^ { - r t } d t$ where $C _ { 0 } = \$ 500,000$ is the original investment, t is the time in years, r = 12% is the annual interest rate compounded continuously, n is the total time in years over which the asset is capitalized, and $c ( t ) = 25,000 ( 1 + 0.08 t )$ is the annual cost of maintenance (measured in dollars). Round your answer to two decimal places.

A)$1,125,000.00
B)$875,000.00
C)$708,333.33
D)$899,218.75
E)$847,222.22

Accepted Answer

The answer of Find the capitalized cost C of an...

Question 48

Decide whether the integral is proper or improper. $\int _ { 0 } ^ { 5 } e ^ { - x } d x$&#10;A)The integral is improper.&#10;B)The integral is proper.

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Question 49

Determine the amount of money required to set up a charitable endowment that pays the amount $P$ each year indefinitely for the annual interest rate compounded continuously. $P = \$ 12,000 , r = 6 \%$&#10;A)$210,000&#10;B)$200,000&#10;C)$220,000&#10;D)$240,000&#10;E)$230,000

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Question 50

Decide whether the following integral is improper. $\int _ { 0 } ^ { 1 } \frac { 1 } { 3 x - 2 } d x$&#10;A)no&#10;B)yes

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Deck 13: Techniques of Integration