b. Does the following relation on a and y make for a function of a? {(1, 4), (-2, 6), (1, 8)} Yes, this relation describes a function of x. No, this relation does not describe a function of x. What is the domain of the relation? (Since a domain is a set of numbers, you should be using { and } in your answer.) 0 What is the range of the relation? (Since a range is a set of numbers, you should be using { and } in your answer.) 0 A c. Does the following relation on å and y make for a function of æ? {(-8, 2), (-3, 6), (−1, 6), (-10, 2)} Yes, this relation describes a function of x. ONo, this relation does not describe a function of x. What is the domain of the relation? (Since a domain is a set of numbers, you should be using { and } in your answer.)
b. Does the following relation on a and y make for a function of a? {(1, 4), (-2, 6), (1, 8)} Yes, this relation describes a function of x. No, this relation does not describe a function of x. What is the domain of the relation? (Since a domain is a set of numbers, you should be using { and } in your answer.) 0 What is the range of the relation? (Since a range is a set of numbers, you should be using { and } in your answer.) 0 A c. Does the following relation on å and y make for a function of æ? {(-8, 2), (-3, 6), (−1, 6), (-10, 2)} Yes, this relation describes a function of x. ONo, this relation does not describe a function of x. What is the domain of the relation? (Since a domain is a set of numbers, you should be using { and } in your answer.)
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
Related questions
Question
I attached 2 pictures there are 3 parts labeled B,C, and D. I need help with the range and domain for all 3 questions
![d. Does the following relation on \( x \) and \( y \) make for a function of \( x \)?
\[
\{ (-5, 3), (4, 3), (-8, 9), (-1, 6), (6, 5) \}
\]
- ○ Yes, this relation describes a function of \( x \).
- ○ No, this relation does not describe a function of \( x \).
What is the domain of the relation? (Since a domain is a *set* of numbers, you should be using \(\{ \) and \(\} \) in your answer.)
\[
\{ -5, 4, -8, -1, 6 \}
\]
What is the range of the relation? (Since a range is a *set* of numbers, you should be using \(\{ \) and \(\} \) in your answer.)
\[
\{ 3, 9, 6, 5 \}
\]](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fd627bc06-52c0-4d11-87e8-f3ff50368dcf%2Fd8ecf2e7-a4a6-4cec-922e-ce4619d6fc87%2Fvvothbc_processed.png&w=3840&q=75)
Transcribed Image Text:d. Does the following relation on \( x \) and \( y \) make for a function of \( x \)?
\[
\{ (-5, 3), (4, 3), (-8, 9), (-1, 6), (6, 5) \}
\]
- ○ Yes, this relation describes a function of \( x \).
- ○ No, this relation does not describe a function of \( x \).
What is the domain of the relation? (Since a domain is a *set* of numbers, you should be using \(\{ \) and \(\} \) in your answer.)
\[
\{ -5, 4, -8, -1, 6 \}
\]
What is the range of the relation? (Since a range is a *set* of numbers, you should be using \(\{ \) and \(\} \) in your answer.)
\[
\{ 3, 9, 6, 5 \}
\]
![b. Does the following relation on \( x \) and \( y \) make for a function of \( x \)?
\[
\{ (1, 4), (-2, 6), (1, 8) \}
\]
- [ ] Yes, this relation describes a function of \( x \).
- [x] No, this relation does not describe a function of \( x \).
What is the domain of the relation? (Since a domain is a *set* of numbers, you should be using \{ and \} in your answer.)
- Input box: [ 0 ]
What is the range of the relation? (Since a range is a *set* of numbers, you should be using \{ and \} in your answer.)
- Input box: [ 0 ]
---
c. Does the following relation on \( x \) and \( y \) make for a function of \( x \)?
\[
\{ (-8, 2), (-3, 6), (-1, 6), (-10, 2) \}
\]
- [x] Yes, this relation describes a function of \( x \).
- [ ] No, this relation does not describe a function of \( x \).
What is the domain of the relation? (Since a domain is a *set* of numbers, you should be using \{ and \} in your answer.)
- Input box: [ ]](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fd627bc06-52c0-4d11-87e8-f3ff50368dcf%2Fd8ecf2e7-a4a6-4cec-922e-ce4619d6fc87%2F1acztfg_processed.png&w=3840&q=75)
Transcribed Image Text:b. Does the following relation on \( x \) and \( y \) make for a function of \( x \)?
\[
\{ (1, 4), (-2, 6), (1, 8) \}
\]
- [ ] Yes, this relation describes a function of \( x \).
- [x] No, this relation does not describe a function of \( x \).
What is the domain of the relation? (Since a domain is a *set* of numbers, you should be using \{ and \} in your answer.)
- Input box: [ 0 ]
What is the range of the relation? (Since a range is a *set* of numbers, you should be using \{ and \} in your answer.)
- Input box: [ 0 ]
---
c. Does the following relation on \( x \) and \( y \) make for a function of \( x \)?
\[
\{ (-8, 2), (-3, 6), (-1, 6), (-10, 2) \}
\]
- [x] Yes, this relation describes a function of \( x \).
- [ ] No, this relation does not describe a function of \( x \).
What is the domain of the relation? (Since a domain is a *set* of numbers, you should be using \{ and \} in your answer.)
- Input box: [ ]
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