Question
Divide. Assume that no denominator equals zero. \( \left(3 m^{5}+m^{6}-m^{8}\right) \div m^{3} \)
Ask by Carroll Pearson. in the United States
Mar 13,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
The simplified expression is \(3m^2 + m^3 - m^5\).
Solution
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Extra Insights
To divide the polynomial \( (3 m^{5} + m^{6} - m^{8}) \) by \( m^{3} \), we can separate each term in the polynomial: 1. \( \frac{3 m^{5}}{m^{3}} = 3 m^{2} \) 2. \( \frac{m^{6}}{m^{3}} = m^{3} \) 3. \( \frac{-m^{8}}{m^{3}} = -m^{5} \) Putting it all together, we have: \[ 3 m^{2} + m^{3} - m^{5} \] So, the final answer is: \[ 3 m^{2} + m^{3} - m^{5} \]
