Pregunta
Combine any like terms in the expression. If there are no like terms, rewrite the expressi \( 35 f^{3}+8-8+6 f^{3} \)
Ask by Nguyen Mckenzie. in the United States
Mar 07,2025
Solución de inteligencia artificial de Upstudy
Respuesta verificada por el tutor
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Combine like terms to get \(41f^{3}\).
Solución
1. Identify like terms: The terms \(35f^3\) and \(6f^3\) are like terms since they both contain the variable \(f^3\). The constant terms \(8\) and \(-8\) are also like terms.
2. Combine the like terms for \(f^3\):
\[
35f^3 + 6f^3 = (35 + 6)f^3 = 41f^3
\]
3. Combine the constant terms:
\[
8 - 8 = 0
\]
4. Write the simplified expression:
\[
41f^3 + 0 = 41f^3
\]
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Simplifique esta solución Mind Expander
In the expression \( 35 f^{3}+8-8+6 f^{3} \), you can start by combining like terms. The constant terms \( 8 \) and \( -8 \) cancel each other out, leaving you with just the \( f^{3} \) terms. Now add \( 35 f^{3} \) and \( 6 f^{3} \): \( 35 f^{3} + 6 f^{3} = 41 f^{3} \). So the simplified expression is \( 41 f^{3} \). You took a mixture and combined it—think of it like making a smoothie! Just blend everything that’s similar, and you’re left with a deliciously simpler version. Keep practicing with like terms, and you’ll become a pro in no time!
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