The factors of the term `- xy^2` are

To find the factors of the term \(-xy^2\), we can break it down step by step. ### Step-by-Step Solution: 1. **Identify the term**: We start with the term \(-xy^2\). 2. **Factor out the negative sign**: The first factor we can identify is \(-1\). So we can express the term as: \[ -xy^2 = -1 \cdot xy^2 \] 3. **Break down \(y^2\)**: The term \(y^2\) can be expressed as \(y \cdot y\). Therefore, we can rewrite the expression as: \[ -1 \cdot x \cdot (y \cdot y) \] 4. **Combine the factors**: Now we can combine all the factors together. The expression becomes: \[ -1 \cdot x \cdot y \cdot y \] 5. **List the factors**: The factors of the term \(-xy^2\) are: \[ -1, x, y, y \] ### Final Answer: The factors of the term \(-xy^2\) are \(-1\), \(x\), \(y\), and \(y\).