Divide. If the polynomial does not divide evenly, include the remainder as a fraction. $$ \left(-n^{3}-n^{2}+42 n ight) \div(n+7) $$ \begin{tabular}{|l}$$ \square $$ \ Submit \end{tabular}

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Divide. If the polynomial does not divide evenly, include the remainder as a fraction. $$ \left(-n^{3}-n^{2}+42 night) \div(n+7) $$ \begin{tabular}{|l}$$ \square $$ \ Submit \end{tabular}

UpStudy AI · Accepted Answer

To divide the polynomial $$-n^{3} - n^{2} + 42n$$ by $$n + 7$$, we perform polynomial long division.

### Division Process:

1. **Divide the leading terms:**
   $$
   \frac{-n^{3}}{n} = -n^{2}
   $$
   
2. **Multiply the entire divisor by $$-n^{2}$$:**
   $$
   (n + 7) \times (-n^{2}) = -n^{3} - 7n^{2}
   $$
   
3. **Subtract this from the original polynomial:**
   $$
   (-n^{3} - n^{2} + 42n) - (-n^{3} - 7n^{2}) = 6n^{2} + 42n
   $$
   
4. **Repeat the process with the new polynomial $$6n^{2} + 42n$$:**
   $$
   \frac{6n^{2}}{n} = 6n
   $$
   
5. **Multiply the divisor by $$6n$$:**
   $$
   (n + 7) \times 6n = 6n^{2} + 42n
   $$
   
6. **Subtract this from the current polynomial:**
   $$
   (6n^{2} + 42n) - (6n^{2} + 42n) = 0
   $$
   
Since the remainder is $$0$$, the division is exact.

### Final Answer:
$$
-n^{2} + 6n
$$
The division of $$-n^{3} - n^{2} + 42n$$ by $$n + 7$$ results in $$-n^{2} + 6n$$.

Divide. If the polynomial does not divide evenly, include the remainder as a fraction. \( \left(-n^{3}-n^{2}+42 n\right) \div(n+7) \) \begin{tabular}{|l}\( \square \) \\ Submit \end{tabular}

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