QuestionEvaluate the function $f(x)=\frac{\sqrt{x-2}}{x^{2}-7}$ for parts (b)-(d):
(b) Find $f(-5)$ : A. $f(-5)=$ or B. $f(-5)$ is undefined. (c) Find $f(3.7)$ : A. $f(3.7)=$ or B. $f(3.7)$ is undefined. (d) Find $f(-2.3)$ : A. $f(-2.3)=$ or B. $f(-2.3)$ is undefined.

Studdy Solution

STEP 1

Assumptions1. The function is defined as $f(x)=\frac{\sqrt{x-}}{x^{}-7}$

STEP 2

To evaluate $f(-5)$ , we substitute $x=-5$ into the function.
$f(-5)=\frac{\sqrt{-5-2}}{(-5)^{2}-7}$

STEP 3

implify the expression under the square root and in the denominator.
$f(-5)=\frac{\sqrt{-7}}{25-7}$

STEP 4

Since the square root of a negative number is not defined in the set of real numbers, we conclude that $f(-)$ is undefined.

STEP 5

To evaluate $f(3.7)$ , we substitute $x=3.7$ into the function.
$f(3.7)=\frac{\sqrt{3.7-2}}{(3.7)^{2}-7}$

STEP 6

implify the expression under the square root and in the denominator.
$f(3.)=\frac{\sqrt{1.}}{13.69-}$

STEP 7

Further simplify the expression.
$f(3.7)=\frac{\sqrt{1.7}}{6.69}$

STEP 8

To evaluate $f(-2.3)$ , we substitute $x=-2.3$ into the function.
$f(-2.3)=\frac{\sqrt{-2.3-2}}{(-2.3)^{2}-7}$

STEP 9

implify the expression under the square root and in the denominator.
$f(-2.3)=\frac{\sqrt{-4.3}}{5.29-7}$

STEP 10

Since the square root of a negative number is not defined in the set of real numbers, we conclude that $f(-2.3)$ is undefined.
So, the solutions areB. $f(-5)$ is undefined. A. $f(3.7)=\frac{\sqrt{.7}}{6.69}$ B. $f(-2.3)$ is undefined.

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QuestionEvaluate the function $f(x)=\frac{\sqrt{x-2}}{x^{2}-7}$ for parts (b)-(d):
(b) Find $f(-5)$ : A. $f(-5)=$ or B. $f(-5)$ is undefined. (c) Find $f(3.7)$ : A. $f(3.7)=$ or B. $f(3.7)$ is undefined. (d) Find $f(-2.3)$ : A. $f(-2.3)=$ or B. $f(-2.3)$ is undefined.

Studdy Solution

STEP 1

Assumptions1. The function is defined as $f(x)=\frac{\sqrt{x-}}{x^{}-7}$

STEP 2

To evaluate $f(-5)$ , we substitute $x=-5$ into the function.
$f(-5)=\frac{\sqrt{-5-2}}{(-5)^{2}-7}$

STEP 3

implify the expression under the square root and in the denominator.
$f(-5)=\frac{\sqrt{-7}}{25-7}$

STEP 4

Since the square root of a negative number is not defined in the set of real numbers, we conclude that $f(-)$ is undefined.

STEP 5

To evaluate $f(3.7)$ , we substitute $x=3.7$ into the function.
$f(3.7)=\frac{\sqrt{3.7-2}}{(3.7)^{2}-7}$

STEP 6

implify the expression under the square root and in the denominator.
$f(3.)=\frac{\sqrt{1.}}{13.69-}$

STEP 7

Further simplify the expression.
$f(3.7)=\frac{\sqrt{1.7}}{6.69}$

STEP 8

To evaluate $f(-2.3)$ , we substitute $x=-2.3$ into the function.
$f(-2.3)=\frac{\sqrt{-2.3-2}}{(-2.3)^{2}-7}$

STEP 9

implify the expression under the square root and in the denominator.
$f(-2.3)=\frac{\sqrt{-4.3}}{5.29-7}$

STEP 10

Since the square root of a negative number is not defined in the set of real numbers, we conclude that $f(-2.3)$ is undefined.
So, the solutions areB. $f(-5)$ is undefined. A. $f(3.7)=\frac{\sqrt{.7}}{6.69}$ B. $f(-2.3)$ is undefined.

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Studdy Solution

STEP 1

Assumptions1. The function is defined as f(x)=x−x−7f(x)=\frac{\sqrt{x-}}{x^{}-7}f(x)=x−7x−​​

STEP 2

To evaluate f(−5)f(-5)f(−5), we substitute x=−5x=-5x=−5 into the function.f(−5)=−5−2(−5)2−7f(-5)=\frac{\sqrt{-5-2}}{(-5)^{2}-7}f(−5)=(−5)2−7−5−2​​

STEP 3

implify the expression under the square root and in the denominator.f(−5)=−725−7f(-5)=\frac{\sqrt{-7}}{25-7}f(−5)=25−7−7​​

STEP 4

Since the square root of a negative number is not defined in the set of real numbers, we conclude that f(−)f(-)f(−) is undefined.

STEP 5

To evaluate f(3.7)f(3.7)f(3.7), we substitute x=3.7x=3.7x=3.7 into the function.f(3.7)=3.7−2(3.7)2−7f(3.7)=\frac{\sqrt{3.7-2}}{(3.7)^{2}-7}f(3.7)=(3.7)2−73.7−2​​

STEP 6

implify the expression under the square root and in the denominator.f(3.)=1.13.69−f(3.)=\frac{\sqrt{1.}}{13.69-}f(3.)=13.69−1.​​

STEP 7

Further simplify the expression.f(3.7)=1.76.69f(3.7)=\frac{\sqrt{1.7}}{6.69}f(3.7)=6.691.7​​

STEP 8

To evaluate f(−2.3)f(-2.3)f(−2.3), we substitute x=−2.3x=-2.3x=−2.3 into the function.f(−2.3)=−2.3−2(−2.3)2−7f(-2.3)=\frac{\sqrt{-2.3-2}}{(-2.3)^{2}-7}f(−2.3)=(−2.3)2−7−2.3−2​​

STEP 9

implify the expression under the square root and in the denominator.f(−2.3)=−4.35.29−7f(-2.3)=\frac{\sqrt{-4.3}}{5.29-7}f(−2.3)=5.29−7−4.3​​

STEP 10

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Assumptions1. The function is defined as $f(x)=\frac{\sqrt{x-}}{x^{}-7}$

To evaluate $f(-5)$ , we substitute $x=-5$ into the function.
$f(-5)=\frac{\sqrt{-5-2}}{(-5)^{2}-7}$

implify the expression under the square root and in the denominator.
$f(-5)=\frac{\sqrt{-7}}{25-7}$

Since the square root of a negative number is not defined in the set of real numbers, we conclude that $f(-)$ is undefined.

To evaluate $f(3.7)$ , we substitute $x=3.7$ into the function.
$f(3.7)=\frac{\sqrt{3.7-2}}{(3.7)^{2}-7}$

implify the expression under the square root and in the denominator.
$f(3.)=\frac{\sqrt{1.}}{13.69-}$

Further simplify the expression.
$f(3.7)=\frac{\sqrt{1.7}}{6.69}$

To evaluate $f(-2.3)$ , we substitute $x=-2.3$ into the function.
$f(-2.3)=\frac{\sqrt{-2.3-2}}{(-2.3)^{2}-7}$

implify the expression under the square root and in the denominator.
$f(-2.3)=\frac{\sqrt{-4.3}}{5.29-7}$