Question

answer the questions about the following polynomial.
$-3 - \frac{x^2}{10}$
answer attempt 1 out of 2
the expression represents a polynomial with \\(\square\\) terms. the constant term is \\(\square\\), the leading term is \\(\square\\), and the leading coefficient is \\(\square\\).

Explanation:

Step1: Identify polynomial degree

The highest power of $x$ is $2$, so it is a quadratic polynomial.

Step2: Count number of terms

The polynomial has two separate terms: $-3$ and $-\frac{x^2}{10}$.

Step3: Locate constant term

The term without $x$ is $-3$.

Step4: Identify leading term

The term with the highest power of $x$ is $-\frac{x^2}{10}$.

Step5: Find leading coefficient

The coefficient of the leading term is $-\frac{1}{10}$.

Answer:

The expression represents a quadratic polynomial with $\boldsymbol{2}$ terms. The constant term is $\boldsymbol{-3}$, the leading term is $\boldsymbol{-\frac{x^2}{10}}$, and the leading coefficient is $\boldsymbol{-\frac{1}{10}}$.