Question
Find the number of terms and the degree of this polynomial.
-d^2 - 2d
-d^2 - 2d
Answers
GPT-4o mini
The polynomial you provided is \(-d^2 - 2d\).
To find the number of terms, we can rewrite it by identifying the individual terms:
- The first term is \(-d^2\).
- The second term is \(-2d\).
Thus, there are **2 terms** in total.
To find the degree of the polynomial, we look for the highest power of the variable \(d\) in the polynomial:
- The term \(-d^2\) has a degree of \(2\).
- The term \(-2d\) has a degree of \(1\).
The highest degree among the terms is \(2\).
Therefore, the number of terms is **2**, and the degree of the polynomial is **2**.
To find the number of terms, we can rewrite it by identifying the individual terms:
- The first term is \(-d^2\).
- The second term is \(-2d\).
Thus, there are **2 terms** in total.
To find the degree of the polynomial, we look for the highest power of the variable \(d\) in the polynomial:
- The term \(-d^2\) has a degree of \(2\).
- The term \(-2d\) has a degree of \(1\).
The highest degree among the terms is \(2\).
Therefore, the number of terms is **2**, and the degree of the polynomial is **2**.