(3m^4n)^3(2m^2n^5p)/6m^4n^9p^8

2 min read Jun 16, 2024
(3m^4n)^3(2m^2n^5p)/6m^4n^9p^8

Simplifying Algebraic Expressions: A Step-by-Step Guide

This article aims to guide you through the simplification of the algebraic expression: (3m⁴n)³(2m²n⁵p) / 6m⁴n⁹p⁸. We will break down the process step-by-step to ensure clarity and understanding.

Understanding the Properties

Before we begin simplifying, let's refresh our memory on some fundamental algebraic properties:

  • Power of a Product: (ab)ⁿ = aⁿbⁿ
  • Power of a Power: (aⁿ)ᵐ = aⁿᵐ
  • Division of Exponents with the Same Base: aⁿ / aᵐ = aⁿ⁻ᵐ

Step-by-Step Simplification

  1. Simplify the Cube:

    • Apply the power of a product property to (3m⁴n)³:
      • (3m⁴n)³ = 3³ (m⁴)³ (n)³ = 27m¹²n³
  2. Combine the Numerator:

    • Multiply the simplified term with the remaining part of the numerator:
      • 27m¹²n³ * 2m²n⁵p = 54m¹⁴n⁸p
  3. Simplify the Denominator:

    • There are no further simplifications needed for the denominator.
  4. Divide the Terms:

    • Now, divide the simplified numerator by the denominator:
      • (54m¹⁴n⁸p) / (6m⁴n⁹p⁸) = 9m¹⁰n⁻¹p⁻⁷
  5. Express with Positive Exponents:

    • To express the final answer with positive exponents, use the rule for dividing exponents with the same base:
      • 9m¹⁰n⁻¹p⁻⁷ = 9m¹⁰ / np⁷

Final Answer

The simplified form of the algebraic expression (3m⁴n)³(2m²n⁵p) / 6m⁴n⁹p⁸ is 9m¹⁰ / np⁷.

By following these steps, you can effectively simplify complex algebraic expressions. Remember to utilize the fundamental properties of exponents to guide your calculations.

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