Question
classify this polynomial 10-r
Answers
GPT-4o mini
The polynomial you provided is \(10 - r\).
To classify this polynomial:
1. **Degree**: The degree of a polynomial is the highest power of the variable in the expression. Here, the variable is \(r\) and the highest power is 1 (since it can be rewritten as \(-1r + 10\)). Thus, the degree of this polynomial is 1.
2. **Number of Terms**: This polynomial has 2 terms: \(10\) (the constant term) and \(-r\) (the linear term).
Based on these characteristics, we can classify the polynomial as follows:
- **Type**: Linear polynomial (since the degree is 1).
- **Number of terms**: Binomial (since it has 2 terms).
In summary, \(10 - r\) is a linear binomial polynomial.
To classify this polynomial:
1. **Degree**: The degree of a polynomial is the highest power of the variable in the expression. Here, the variable is \(r\) and the highest power is 1 (since it can be rewritten as \(-1r + 10\)). Thus, the degree of this polynomial is 1.
2. **Number of Terms**: This polynomial has 2 terms: \(10\) (the constant term) and \(-r\) (the linear term).
Based on these characteristics, we can classify the polynomial as follows:
- **Type**: Linear polynomial (since the degree is 1).
- **Number of terms**: Binomial (since it has 2 terms).
In summary, \(10 - r\) is a linear binomial polynomial.