Question
Find the number of terms and the degree of this polynomial.
-9s
-9s
Answers
GPT-4o mini
The given expression is \(-9s\).
1. **Number of Terms**: A polynomial is made up of one or more terms. In this case, \(-9s\) consists of only one term. Therefore, the number of terms is **1**.
2. **Degree of the Polynomial**: The degree of a polynomial is the highest exponent of the variable in the expression. Here, the variable \(s\) has an exponent of \(1\) (since it can be written as \(-9s^1\)). Therefore, the degree of the polynomial is **1**.
In summary:
- Number of terms: **1**
- Degree: **1**
1. **Number of Terms**: A polynomial is made up of one or more terms. In this case, \(-9s\) consists of only one term. Therefore, the number of terms is **1**.
2. **Degree of the Polynomial**: The degree of a polynomial is the highest exponent of the variable in the expression. Here, the variable \(s\) has an exponent of \(1\) (since it can be written as \(-9s^1\)). Therefore, the degree of the polynomial is **1**.
In summary:
- Number of terms: **1**
- Degree: **1**