Question
Classify this polynomial.
10 − r
Scratchpad
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10 − r
Scratchpad
S
Answers
GPT-4o mini
The polynomial \( 10 - r \) can be classified based on its degree and number of terms.
1. **Degree**: The degree of a polynomial is the highest exponent of the variable. In this case, the variable \( r \) has an exponent of 1 (since it can be rewritten as \( -1 \cdot r^1 + 10 \)). Thus, the degree is 1.
2. **Number of Terms**: This polynomial has two terms: \( 10 \) and \( -r \).
Based on this information, we can classify the polynomial as follows:
- It is a **linear polynomial** (because the degree is 1).
- It is a **binomial** (because it has two terms).
So, \( 10 - r \) is a linear binomial.
1. **Degree**: The degree of a polynomial is the highest exponent of the variable. In this case, the variable \( r \) has an exponent of 1 (since it can be rewritten as \( -1 \cdot r^1 + 10 \)). Thus, the degree is 1.
2. **Number of Terms**: This polynomial has two terms: \( 10 \) and \( -r \).
Based on this information, we can classify the polynomial as follows:
- It is a **linear polynomial** (because the degree is 1).
- It is a **binomial** (because it has two terms).
So, \( 10 - r \) is a linear binomial.