Question
Refer to the relation below to answer the following questions. \( \{(-8,-1),(-5,10),(10,8),(-1,-9)\} \) a. Find the domain and range of the relation. The domain of the relation is \( \{-8,-5,10,-1\} \). The range of the relation is \( \{-1,10,8,-9\} \). (Use a comma to separate answers as needed.) b. Determine the maximum and minimum of the \( x \)-values and of the \( y \)-values. The maximum x-value is \( \square \); the minimum \( x \)-value is \( \square \). The maximum \( y \)-value is \( \square \); the minimum \( y \)-value is \( \square \).
Ask by Pritchard French. in the United States
Jan 24,2025
Real Tutor Solution
Tutor-Verified Answer
Answer
- The maximum \( x \)-value is \( 10 \); the minimum \( x \)-value is \( -8 \).
- The maximum \( y \)-value is \( 10 \); the minimum \( y \)-value is \( -9 \).
Solution
b. Determine the maximum and minimum of the \( x \)-values and of the \( y \)-values.
- **Maximum \( x \)-value:** \( 10 \)
- **Minimum \( x \)-value:** \( -8 \)
- **Maximum \( y \)-value:** \( 10 \)
- **Minimum \( y \)-value:** \( -9 \)
So, the completed statements are:
- The maximum \( x \)-value is \( 10 \); the minimum \( x \)-value is \( -8 \).
- The maximum \( y \)-value is \( 10 \); the minimum \( y \)-value is \( -9 \).
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Simplify this solution Beyond the Answer
The maximum x-value is \( 10 \); the minimum x-value is \( -8 \). The maximum y-value is \( 10 \); the minimum y-value is \( -9 \).
