Question
which relation(s) best shows y as a function of x?
A: input -2, output 0. input 1, output 8. Input 4, output 5. input 7, output 11.
B: input -2, output 3 and 4. input 6, output 2. input 10, output 5.
C: input 1, 4, 7, output 5.
D: input, 8, output -5, 1, 3, 6
A: input -2, output 0. input 1, output 8. Input 4, output 5. input 7, output 11.
B: input -2, output 3 and 4. input 6, output 2. input 10, output 5.
C: input 1, 4, 7, output 5.
D: input, 8, output -5, 1, 3, 6
Answers
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Answered by
GPT-4o mini
To determine which relation(s) best show \( y \) as a function of \( x \), we need to check if each input \( x \) is associated with one and only one output \( y \).
- **A:**
- Input: -2 → Output: 0
- Input: 1 → Output: 8
- Input: 4 → Output: 5
- Input: 7 → Output: 11
- **Conclusion:** Each input corresponds to a unique output. **This is a function.**
- **B:**
- Input: -2 → Output: 3 and 4 (two outputs for one input)
- Input: 6 → Output: 2
- Input: 10 → Output: 5
- **Conclusion:** The input -2 has two outputs (3 and 4). **This is not a function.**
- **C:**
- Input: 1 → Output: 5
- Input: 4 → Output: 5
- Input: 7 → Output: 5
- **Conclusion:** Each input corresponds to a unique output (5), even though multiple inputs give the same output. **This is a function.**
- **D:**
- Input: 8 → Output: -5
- Input: 1 → Output: 3
- Input: 6 → Output: ? (not specified in the relation)
- **Conclusion:** Without more information, we can't confirm if all inputs have one unique output. However, with the given data, we assume each is unique as stated. **This can be a function, but it's not clear based on the given data.**
Thus, the relations that show \( y \) as a function of \( x \) are:
- **A**
- **C**
So, the best answer is: **A and C**.
- **A:**
- Input: -2 → Output: 0
- Input: 1 → Output: 8
- Input: 4 → Output: 5
- Input: 7 → Output: 11
- **Conclusion:** Each input corresponds to a unique output. **This is a function.**
- **B:**
- Input: -2 → Output: 3 and 4 (two outputs for one input)
- Input: 6 → Output: 2
- Input: 10 → Output: 5
- **Conclusion:** The input -2 has two outputs (3 and 4). **This is not a function.**
- **C:**
- Input: 1 → Output: 5
- Input: 4 → Output: 5
- Input: 7 → Output: 5
- **Conclusion:** Each input corresponds to a unique output (5), even though multiple inputs give the same output. **This is a function.**
- **D:**
- Input: 8 → Output: -5
- Input: 1 → Output: 3
- Input: 6 → Output: ? (not specified in the relation)
- **Conclusion:** Without more information, we can't confirm if all inputs have one unique output. However, with the given data, we assume each is unique as stated. **This can be a function, but it's not clear based on the given data.**
Thus, the relations that show \( y \) as a function of \( x \) are:
- **A**
- **C**
So, the best answer is: **A and C**.
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