Answer a. Explanation Given: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] . Calculation: ƒ ( 2 ) = 2 2 − 4 = 0 ; ƒ ( 5 2 ) = 25 4 − 4 = 9 4 ; ƒ ( 3 ) = 3 2 − 4 = 5 ; ƒ ( 7 2 ) = 49 4 − 4 = 33 4 ; ƒ ( 4 ) = 4 2 − 4 = 12 ; ƒ ( 9 2 ) = 81 4 – 4 = 65 4 ; ƒ ( 5 ) = 25 – 4 = 21 ; ƒ ( 11 2 ) = 121 4 – 4 = 105 4 ; ƒ ( 6 ) = 36 – 4 = 32 a. Graph ƒ ( x ) = x 2 − 4 To determine To solve: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] , b. Approximate the area A by Partition [ 2 , 6 ] into four subintervals of equal length and choose u as the left endpoint of each subinterval. Answer b. 38 Explanation Given: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] . Calculation: ƒ ( 2 ) = 2 2 − 4 = 0 ; ƒ ( 5 2 ) = 25 4 − 4 = 9 4 ; ƒ ( 3 ) = 3 2 − 4 = 5 ; ƒ ( 7 2 ) = 49 4 − 4 = 33 4 ; ƒ ( 4 ) = 4 2 − 4 = 12 ; ƒ ( 9 2 ) = 81 4 – 4 = 65 4 ; ƒ ( 5 ) = 25 – 4 = 21 ; ƒ ( 11 2 ) = 121 4 – 4 = 105 4 ; ƒ ( 6 ) = 36 – 4 = 32 b. Partition [ 2 , 6 ] into four subintervals of equal length 1 and choose u as the left endpoint of each subinterval. The area A is approximated as A = f ( 2 ) 1 + f ( 3 ) 1 + f ( 4 ) 1 + f ( 5 ) 1 = 0 ( 1 ) + 5 ( 1 ) + 12 ( 1 ) + 21 ( 1 ) = 0 + 5 + 12 + 21 = 38 To determine To solve: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] , c. Approximate the area A by Partition [ 2 , 6 ] into eight subintervals of equal length and choose u as the left endpoint of each subinterval. Answer c. 91 2 Explanation Given: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] . Calculation: ƒ ( 2 ) = 2 2 − 4 = 0 ; ƒ ( 5 2 ) = 25 4 − 4 = 9 4 ; ƒ ( 3 ) = 3 2 − 4 = 5 ; ƒ ( 7 2 ) = 49 4 − 4 = 33 4 ; ƒ ( 4 ) = 4 2 − 4 = 12 ; ƒ ( 9 2 ) = 81 4 – 4 = 65 4 ; ƒ ( 5 ) = 25 – 4 = 21 ; ƒ ( 11 2 ) = 121 4 – 4 = 105 4 ; ƒ ( 6 ) = 36 – 4 = 32 c. Partition [ 2 , 6 ] into eight subintervals of equal length 1 2 and choose u as the left endpoint of each subinterval. The area A is approximated as A = f ( 2 ) ( 1 2 ) + f ( 5 2 ) ( 1 2 ) + f ( 3 ) ( 1 2 ) + f ( 7 2 ) ( 1 2 ) + f ( 4 ) ( 1 2 ) + f ( 9 2 ) ( 1 2 ) + f ( 5 ) 1 2 + f ( 11 2 ) ( 1 2 ) = 0 ( 1 2 ) + ( 9 4 ) ( 1 2 ) + 5 ( 1 2 ) + ( 33 4 ) ( 1 2 ) + 12 ( 1 2 ) + ( 65 4 ) ( 1 2 ) + 2 1 ( 1 2 ) + 105 4 ( 1 2 ) = 0 + 9 8 + 5 2 + 33 8 + 6 + 65 8 + 21 2 + 105 8 = 9 + 20 + 33 + 48 + 65 + 84 + 105 8 = 364 8 = 91 2 To determine To solve: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] , d. Express the area A as an integral. Answer d. ∫ 2 6 ( x 2 − 4 ) d x Explanation Given: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] . Calculation: ƒ ( 2 ) = 2 2 − 4 = 0 ; ƒ ( 5 2 ) = 25 4 − 4 = 9 4 ; ƒ ( 3 ) = 3 2 − 4 = 5 ; ƒ ( 7 2 ) = 49 4 − 4 = 33 4 ; ƒ ( 4 ) = 4 2 − 4 = 12 ; ƒ ( 9 2 ) = 81 4 – 4 = 65 4 ; ƒ ( 5 ) = 25 – 4 = 21 ; ƒ ( 11 2 ) = 121 4 – 4 = 105 4 ; ƒ ( 6 ) = 36 – 4 = 32 d. Express the area A as an integral. The area A as an integral is ∫ 2 6 ( x 2 − 4 ) d x . To determine To solve: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] , e. Use a graphing utility to approximate the integral. Answer e. 160 3 Explanation Given: The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] . Calculation: ƒ ( 2 ) = 2 2 − 4 = 0 ; ƒ ( 5 2 ) = 25 4 − 4 = 9 4 ; ƒ ( 3 ) = 3 2 − 4 = 5 ; ƒ ( 7 2 ) = 49 4 − 4 = 33 4 ; ƒ ( 4 ) = 4 2 − 4 = 12 ; ƒ ( 9 2 ) = 81 4 – 4 = 65 4 ; ƒ ( 5 ) = 25 – 4 = 21 ; ƒ ( 11 2 ) = 121 4 – 4 = 105 4 ; ƒ ( 6 ) = 36 – 4 = 32 e. Use a graphing utility to approximate the integral. That is evaluate the integral The value of the integral ∫ 2 6 ( x 2 − 4 ) d x is 160 3 , so the area under the graph of f from 2 to 6 is 160 3 .

9th Edition

ISBN: 9780321716835

Author: Michael Sullivan

Publisher: Addison Wesley

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Question

Chapter 14.5, Problem 14AYU

To determine

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

a. Graph $ƒ$ ,

indicating the area $A$ under $f$ from 2 to 6.

Expert Solution

Answer to Problem 14AYU

Precalculus, Chapter 14.5, Problem 14AYU , additional homework tip 1

Explanation of Solution

Given:

The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ .

Calculation:

$ƒ (2) = 2^{2} - 4 = 0; ƒ (\frac{5}{2}) = \frac{25}{4} - 4 = \frac{9}{4}; ƒ (3) = 3^{2} - 4 = 5; ƒ (\frac{7}{2}) = \frac{49}{4} - 4 = \frac{33}{4}; ƒ (4) = 4^{2} - 4 = 12$ ;

$ƒ (\frac{9}{2}) = \frac{81}{4} - 4 = \frac{65}{4}; ƒ (5) = 25 - 4 = 21; ƒ (\frac{11}{2}) = \frac{121}{4} - 4 = \frac{105}{4}; ƒ (6) = 36 - 4 = 32$

a. Graph $ƒ (x) = x^{2} - 4$

Precalculus, Chapter 14.5, Problem 14AYU , additional homework tip 2

To determine

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

b. Approximate the area $A$ by Partition $[2, 6]$ into four subintervals of equal length and choose $u$ as the left endpoint of each subinterval.

Expert Solution

Answer to Problem 14AYU

b. 38

Explanation of Solution

Given:

The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ .

Calculation:

$ƒ (2) = 2^{2} - 4 = 0; ƒ (\frac{5}{2}) = \frac{25}{4} - 4 = \frac{9}{4}; ƒ (3) = 3^{2} - 4 = 5; ƒ (\frac{7}{2}) = \frac{49}{4} - 4 = \frac{33}{4}; ƒ (4) = 4^{2} - 4 = 12$ ;

$ƒ (\frac{9}{2}) = \frac{81}{4} - 4 = \frac{65}{4}; ƒ (5) = 25 - 4 = 21; ƒ (\frac{11}{2}) = \frac{121}{4} - 4 = \frac{105}{4}; ƒ (6) = 36 - 4 = 32$

b. Partition $[2, 6]$ into four subintervals of equal length 1 and choose $u$ as the left endpoint of each subinterval.

The area $A$ is approximated as

$A = f (2) 1 + f (3) 1 + f (4) 1 + f (5) 1$

$= 0 (1) + 5 (1) + 12 (1) + 21 (1)$

$= 0 + 5 + 12 + 21$

$= 38$

To determine

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

c. Approximate the area $A$ by Partition $[2, 6]$ into eight subintervals of equal length and choose $u$ as the left endpoint of each subinterval.

Expert Solution

Answer to Problem 14AYU

c. $\frac{91}{2}$

Explanation of Solution

Given:

The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ .

Calculation:

$ƒ (2) = 2^{2} - 4 = 0; ƒ (\frac{5}{2}) = \frac{25}{4} - 4 = \frac{9}{4}; ƒ (3) = 3^{2} - 4 = 5; ƒ (\frac{7}{2}) = \frac{49}{4} - 4 = \frac{33}{4}; ƒ (4) = 4^{2} - 4 = 12$ ;

$ƒ (\frac{9}{2}) = \frac{81}{4} - 4 = \frac{65}{4}; ƒ (5) = 25 - 4 = 21; ƒ (\frac{11}{2}) = \frac{121}{4} - 4 = \frac{105}{4}; ƒ (6) = 36 - 4 = 32$

c. Partition $[2, 6]$ into eight subintervals of equal length $\frac{1}{2}$ and choose $u$ as the left endpoint of each subinterval.

The area $A$ is approximated as

$A = f (2) (\frac{1}{2}) + f (\frac{5}{2}) (\frac{1}{2}) + f (3) (\frac{1}{2}) + f (\frac{7}{2}) (\frac{1}{2}) + f (4) (\frac{1}{2}) + f (\frac{9}{2}) (\frac{1}{2}) + f (5) \frac{1}{2} + f (\frac{11}{2}) (\frac{1}{2})$

$= 0 (\frac{1}{2}) + (\frac{9}{4}) (\frac{1}{2}) + 5 (\frac{1}{2}) + (\frac{33}{4}) (\frac{1}{2}) + 12 (\frac{1}{2}) + (\frac{65}{4}) (\frac{1}{2}) + 21 (\frac{1}{2}) + \frac{105}{4} (\frac{1}{2})$

$= 0 + \frac{9}{8} + \frac{5}{2} + \frac{33}{8} + 6 + \frac{65}{8} + \frac{21}{2} + \frac{105}{8}$

$= \frac{9 + 20 + 33 + 48 + 65 + 84 + 105}{8} = \frac{364}{8} = \frac{91}{2}$

To determine

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

d. Express the area $A$ as an integral.

Expert Solution

Answer to Problem 14AYU

d. $\int_{2}^{6} (x^{2} - 4) d x$

Explanation of Solution

Given:

The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ .

Calculation:

$ƒ (2) = 2^{2} - 4 = 0; ƒ (\frac{5}{2}) = \frac{25}{4} - 4 = \frac{9}{4}; ƒ (3) = 3^{2} - 4 = 5; ƒ (\frac{7}{2}) = \frac{49}{4} - 4 = \frac{33}{4}; ƒ (4) = 4^{2} - 4 = 12$ ;

$ƒ (\frac{9}{2}) = \frac{81}{4} - 4 = \frac{65}{4}; ƒ (5) = 25 - 4 = 21; ƒ (\frac{11}{2}) = \frac{121}{4} - 4 = \frac{105}{4}; ƒ (6) = 36 - 4 = 32$

d. Express the area $A$ as an integral.

The area $A$ as an integral is $\int_{2}^{6} (x^{2} - 4) d x$ .

To determine

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

e. Use a graphing utility to approximate the integral.

Expert Solution

Answer to Problem 14AYU

e. $\frac{160}{3}$

Explanation of Solution

Given:

The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ .

Calculation:

$ƒ (2) = 2^{2} - 4 = 0; ƒ (\frac{5}{2}) = \frac{25}{4} - 4 = \frac{9}{4}; ƒ (3) = 3^{2} - 4 = 5; ƒ (\frac{7}{2}) = \frac{49}{4} - 4 = \frac{33}{4}; ƒ (4) = 4^{2} - 4 = 12$ ;

$ƒ (\frac{9}{2}) = \frac{81}{4} - 4 = \frac{65}{4}; ƒ (5) = 25 - 4 = 21; ƒ (\frac{11}{2}) = \frac{121}{4} - 4 = \frac{105}{4}; ƒ (6) = 36 - 4 = 32$

e. Use a graphing utility to approximate the integral.

That is evaluate the integral

The value of the integral $\int_{2}^{6} (x^{2} - 4) d x$ is $\frac{160}{3}$ ,

so the area under the graph of $f$ from 2 to 6 is $\frac{160}{3}$ .

Chapter 14.5, Problem 13AYU

Chapter 14.5, Problem 15AYU

Chapter 14 Solutions

Precalculus

Ch. 14.1 - Graph f( x )={ 3x2ifx2 3ifx=2 (pp.100-102)Ch. 14.1 - Prob. 2AYU Ch. 14.1 - Prob. 3AYU Ch. 14.1 - Prob. 4AYU Ch. 14.1 - True or False lim xc f( x )=N may be described by...Ch. 14.1 - Prob. 6AYU Ch. 14.1 - lim x2 ( 4 x 3 )Ch. 14.1 - lim x3 ( 2 x 2 +1 )Ch. 14.1 - lim x0 x+1 x 2 +1 Ch. 14.1 - Prob. 10AYU

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The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] , a. Graph ƒ , indicating the area A under f from 2 to 6.

Solution Summary: The author illustrates how the function (x) = x 24 is defined on the interval.

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

a. Graph $ƒ$ ,

indicating the area $A$ under $f$ from 2 to 6.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

b. Approximate the area $A$ by Partition $[2, 6]$ into four subintervals of equal length and choose $u$ as the left endpoint of each subinterval.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

c. Approximate the area $A$ by Partition $[2, 6]$ into eight subintervals of equal length and choose $u$ as the left endpoint of each subinterval.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

d. Express the area $A$ as an integral.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

e. Use a graphing utility to approximate the integral.

Answer to Problem 14AYU

Explanation of Solution

Chapter 14 Solutions

Additional Math Textbook Solutions

The function ƒ ( x ) = x 2 − 4 is defined on the interval [ 2 , 6 ] , a. Graph ƒ , indicating the area A under f from 2 to 6.

Solution Summary: The author illustrates how the function (x) = x 24 is defined on the interval.

To solve: The function ƒ( x ) = x 2 − 4 is defined on the interval [ 2, 6 ] , a. Graph ƒ , indicating the area A under f from 2 to 6.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function ƒ( x ) = x 2 − 4 is defined on the interval [ 2, 6 ] , b. Approximate the area A by Partition [ 2, 6 ] into four subintervals of equal length and choose u as the left endpoint of each subinterval.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function ƒ( x ) = x 2 − 4 is defined on the interval [ 2, 6 ] , c. Approximate the area A by Partition [ 2, 6 ] into eight subintervals of equal length and choose u as the left endpoint of each subinterval.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function ƒ( x ) = x 2 − 4 is defined on the interval [ 2, 6 ] , d. Express the area A as an integral.

Answer to Problem 14AYU

Explanation of Solution

To solve: The function ƒ( x ) = x 2 − 4 is defined on the interval [ 2, 6 ] , e. Use a graphing utility to approximate the integral.

Answer to Problem 14AYU

Explanation of Solution

Chapter 14 Solutions

Additional Math Textbook Solutions

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

a. Graph $ƒ$ ,

indicating the area $A$ under $f$ from 2 to 6.

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

b. Approximate the area $A$ by Partition $[2, 6]$ into four subintervals of equal length and choose $u$ as the left endpoint of each subinterval.

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

c. Approximate the area $A$ by Partition $[2, 6]$ into eight subintervals of equal length and choose $u$ as the left endpoint of each subinterval.

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

d. Express the area $A$ as an integral.

To solve: The function $ƒ (x) = x^{2} - 4$ is defined on the interval $[2, 6]$ ,

e. Use a graphing utility to approximate the integral.