Question

To find the missing term in the product \((−9m^6+12m^5)(m^2+2m+1)\), we can perform the polynomial multiplication and look for the missing coefficient associated with \(m^6\).

Let's break it down step-by-step:

1. **Distribute \(-9m^6\)**:
- \(-9m^6 \cdot m^2 = -9m^8\)
- \(-9m^6 \cdot 2m = -18m^7\)
- \(-9m^6 \cdot 1 = -9m^6\)

2. **Distribute \(12m^5\)**:
- \(12m^5 \cdot m^2 = 12m^7\)
- \(12m^5 \cdot 2m = 24m^6\)
- \(12m^5 \cdot 1 = 12m^5\)

3. **Combine all the terms**:
- From the distribution, we get:
- Constant term: \(12m^5\)
- \(m^6\) terms: \(-9m^6 + 24m^6 = 15m^6\)
- \(m^7\) terms: \(-18m^7 + 12m^7 = -6m^7\)
- \(m^8\) term: \(-9m^8\)

4. **Putting it all together**:
\[
(−9m^6+12m^5)(m^2+2m+1) = -9m^8 - 6m^7 + 15m^6 + 12m^5
\]

Thus, the missing term is **15m^6**.

### Final answer:
**Response:** 15m^6

Yes, based on the calculations, the answer is correct! The missing term in the product \((−9m^6+12m^5)(m^2+2m+1)\) is indeed \(15m^6\).

To recap briefly:

1. We distributed both \(-9m^6\) and \(12m^5\) across \(m^2 + 2m + 1\).
2. We collected like terms for \(m^8\), \(m^7\), \(m^6\), and the constant term.
3. The correct coefficient for \(m^6\) in the final expression was found to be \(15\).

If you have any further questions or need clarifications, feel free to ask!